8 additive_identity is 82
9 additive_inverse1 is 84
10 additive_inverse2 is 83
13 commutativity_of_add is 92
14 commutativity_of_multiply is 91
20 multiplicative_id1 is 79
21 multiplicative_id2 is 78
22 multiplicative_identity is 85
23 multiplicative_inverse1 is 81
24 multiplicative_inverse2 is 80
26 prove_associativity is 94
28 Id : 4, {_}: add ?2 ?3 =?= add ?3 ?2 [3, 2] by commutativity_of_add ?2 ?3
30 multiply ?5 ?6 =?= multiply ?6 ?5
31 [6, 5] by commutativity_of_multiply ?5 ?6
33 add (multiply ?8 ?9) ?10 =<= multiply (add ?8 ?10) (add ?9 ?10)
34 [10, 9, 8] by distributivity1 ?8 ?9 ?10
36 add ?12 (multiply ?13 ?14) =<= multiply (add ?12 ?13) (add ?12 ?14)
37 [14, 13, 12] by distributivity2 ?12 ?13 ?14
39 multiply (add ?16 ?17) ?18
41 add (multiply ?16 ?18) (multiply ?17 ?18)
42 [18, 17, 16] by distributivity3 ?16 ?17 ?18
44 multiply ?20 (add ?21 ?22)
46 add (multiply ?20 ?21) (multiply ?20 ?22)
47 [22, 21, 20] by distributivity4 ?20 ?21 ?22
49 add ?24 (inverse ?24) =>= multiplicative_identity
50 [24] by additive_inverse1 ?24
52 add (inverse ?26) ?26 =>= multiplicative_identity
53 [26] by additive_inverse2 ?26
55 multiply ?28 (inverse ?28) =>= additive_identity
56 [28] by multiplicative_inverse1 ?28
58 multiply (inverse ?30) ?30 =>= additive_identity
59 [30] by multiplicative_inverse2 ?30
61 multiply ?32 multiplicative_identity =>= ?32
62 [32] by multiplicative_id1 ?32
64 multiply multiplicative_identity ?34 =>= ?34
65 [34] by multiplicative_id2 ?34
66 Id : 28, {_}: add ?36 additive_identity =>= ?36 [36] by additive_id1 ?36
67 Id : 30, {_}: add additive_identity ?38 =>= ?38 [38] by additive_id2 ?38
70 multiply a (multiply b c) =<= multiply (multiply a b) c
71 [] by prove_associativity
72 Found proof, 50.092125s
73 % SZS status Unsatisfiable for BOO007-2.p
74 % SZS output start CNFRefutation for BOO007-2.p
75 Id : 22, {_}: multiply (inverse ?30) ?30 =>= additive_identity [30] by multiplicative_inverse2 ?30
76 Id : 24, {_}: multiply ?32 multiplicative_identity =>= ?32 [32] by multiplicative_id1 ?32
77 Id : 69, {_}: multiply (add ?160 ?161) ?162 =<= add (multiply ?160 ?162) (multiply ?161 ?162) [162, 161, 160] by distributivity3 ?160 ?161 ?162
78 Id : 28, {_}: add ?36 additive_identity =>= ?36 [36] by additive_id1 ?36
79 Id : 16, {_}: add ?24 (inverse ?24) =>= multiplicative_identity [24] by additive_inverse1 ?24
80 Id : 10, {_}: add ?12 (multiply ?13 ?14) =<= multiply (add ?12 ?13) (add ?12 ?14) [14, 13, 12] by distributivity2 ?12 ?13 ?14
81 Id : 26, {_}: multiply multiplicative_identity ?34 =>= ?34 [34] by multiplicative_id2 ?34
82 Id : 18, {_}: add (inverse ?26) ?26 =>= multiplicative_identity [26] by additive_inverse2 ?26
83 Id : 8, {_}: add (multiply ?8 ?9) ?10 =<= multiply (add ?8 ?10) (add ?9 ?10) [10, 9, 8] by distributivity1 ?8 ?9 ?10
84 Id : 30, {_}: add additive_identity ?38 =>= ?38 [38] by additive_id2 ?38
85 Id : 4, {_}: add ?2 ?3 =?= add ?3 ?2 [3, 2] by commutativity_of_add ?2 ?3
86 Id : 20, {_}: multiply ?28 (inverse ?28) =>= additive_identity [28] by multiplicative_inverse1 ?28
87 Id : 14, {_}: multiply ?20 (add ?21 ?22) =<= add (multiply ?20 ?21) (multiply ?20 ?22) [22, 21, 20] by distributivity4 ?20 ?21 ?22
88 Id : 12, {_}: multiply (add ?16 ?17) ?18 =<= add (multiply ?16 ?18) (multiply ?17 ?18) [18, 17, 16] by distributivity3 ?16 ?17 ?18
89 Id : 6, {_}: multiply ?5 ?6 =?= multiply ?6 ?5 [6, 5] by commutativity_of_multiply ?5 ?6
90 Id : 151, {_}: multiply ?356 (add ?357 (inverse ?356)) =>= add (multiply ?356 ?357) additive_identity [357, 356] by Super 14 with 20 at 2,3
91 Id : 157, {_}: multiply ?356 (add ?357 (inverse ?356)) =>= add additive_identity (multiply ?356 ?357) [357, 356] by Demod 151 with 4 at 3
92 Id : 3270, {_}: multiply ?3107 (add ?3108 (inverse ?3107)) =>= multiply ?3107 ?3108 [3108, 3107] by Demod 157 with 30 at 3
93 Id : 136, {_}: add (multiply (inverse ?335) ?336) ?335 =>= multiply multiplicative_identity (add ?336 ?335) [336, 335] by Super 8 with 18 at 1,3
94 Id : 2697, {_}: add (multiply (inverse ?335) ?336) ?335 =>= add ?336 ?335 [336, 335] by Demod 136 with 26 at 3
95 Id : 3279, {_}: multiply ?3129 (add ?3128 (inverse ?3129)) =<= multiply ?3129 (multiply (inverse (inverse ?3129)) ?3128) [3128, 3129] by Super 3270 with 2697 at 2,2
96 Id : 3256, {_}: multiply ?356 (add ?357 (inverse ?356)) =>= multiply ?356 ?357 [357, 356] by Demod 157 with 30 at 3
97 Id : 3316, {_}: multiply ?3129 ?3128 =<= multiply ?3129 (multiply (inverse (inverse ?3129)) ?3128) [3128, 3129] by Demod 3279 with 3256 at 2
98 Id : 135, {_}: add (multiply ?333 (inverse ?332)) ?332 =>= multiply (add ?333 ?332) multiplicative_identity [332, 333] by Super 8 with 18 at 2,3
99 Id : 141, {_}: add (multiply ?333 (inverse ?332)) ?332 =>= multiply multiplicative_identity (add ?333 ?332) [332, 333] by Demod 135 with 6 at 3
100 Id : 2790, {_}: add (multiply ?333 (inverse ?332)) ?332 =>= add ?333 ?332 [332, 333] by Demod 141 with 26 at 3
101 Id : 152, {_}: multiply ?359 (add (inverse ?359) ?360) =>= add additive_identity (multiply ?359 ?360) [360, 359] by Super 14 with 20 at 1,3
102 Id : 2899, {_}: multiply ?2812 (add (inverse ?2812) ?2813) =>= multiply ?2812 ?2813 [2813, 2812] by Demod 152 with 30 at 3
103 Id : 122, {_}: add ?311 (multiply (inverse ?311) ?312) =>= multiply multiplicative_identity (add ?311 ?312) [312, 311] by Super 10 with 16 at 1,3
104 Id : 1484, {_}: add ?1608 (multiply (inverse ?1608) ?1609) =>= add ?1608 ?1609 [1609, 1608] by Demod 122 with 26 at 3
105 Id : 1488, {_}: add ?1618 additive_identity =<= add ?1618 (inverse (inverse ?1618)) [1618] by Super 1484 with 20 at 2,2
106 Id : 1524, {_}: ?1618 =<= add ?1618 (inverse (inverse ?1618)) [1618] by Demod 1488 with 28 at 2
107 Id : 2914, {_}: multiply ?2849 (inverse ?2849) =<= multiply ?2849 (inverse (inverse (inverse ?2849))) [2849] by Super 2899 with 1524 at 2,2
108 Id : 2987, {_}: additive_identity =<= multiply ?2849 (inverse (inverse (inverse ?2849))) [2849] by Demod 2914 with 20 at 2
109 Id : 3172, {_}: add additive_identity (inverse (inverse ?3022)) =?= add ?3022 (inverse (inverse ?3022)) [3022] by Super 2790 with 2987 at 1,2
110 Id : 3182, {_}: inverse (inverse ?3022) =<= add ?3022 (inverse (inverse ?3022)) [3022] by Demod 3172 with 30 at 2
111 Id : 3183, {_}: inverse (inverse ?3022) =>= ?3022 [3022] by Demod 3182 with 1524 at 3
112 Id : 3317, {_}: multiply ?3129 ?3128 =<= multiply ?3129 (multiply ?3129 ?3128) [3128, 3129] by Demod 3316 with 3183 at 1,2,3
113 Id : 3479, {_}: multiply (multiply ?3373 ?3374) ?3373 =>= multiply ?3373 ?3374 [3374, 3373] by Super 6 with 3317 at 3
114 Id : 3807, {_}: multiply (add ?3814 (multiply ?3812 ?3813)) ?3812 =>= add (multiply ?3814 ?3812) (multiply ?3812 ?3813) [3813, 3812, 3814] by Super 12 with 3479 at 2,3
115 Id : 70, {_}: multiply (add ?164 ?165) ?166 =<= add (multiply ?164 ?166) (multiply ?166 ?165) [166, 165, 164] by Super 69 with 6 at 2,3
116 Id : 27040, {_}: multiply (add ?32987 (multiply ?32988 ?32989)) ?32988 =>= multiply (add ?32987 ?32989) ?32988 [32989, 32988, 32987] by Demod 3807 with 70 at 3
117 Id : 27129, {_}: multiply (multiply (add ?33340 ?33341) ?33342) ?33341 =?= multiply (add (multiply ?33340 ?33342) ?33342) ?33341 [33342, 33341, 33340] by Super 27040 with 12 at 1,2
118 Id : 1722, {_}: add (multiply ?1843 ?1842) (inverse (inverse ?1842)) =<= multiply (add ?1843 (inverse (inverse ?1842))) ?1842 [1842, 1843] by Super 8 with 1524 at 2,3
119 Id : 1739, {_}: add (inverse (inverse ?1842)) (multiply ?1843 ?1842) =<= multiply (add ?1843 (inverse (inverse ?1842))) ?1842 [1843, 1842] by Demod 1722 with 4 at 2
120 Id : 6934, {_}: add ?1842 (multiply ?1843 ?1842) =<= multiply (add ?1843 (inverse (inverse ?1842))) ?1842 [1843, 1842] by Demod 1739 with 3183 at 1,2
121 Id : 6935, {_}: add ?1842 (multiply ?1843 ?1842) =<= multiply (add ?1843 ?1842) ?1842 [1843, 1842] by Demod 6934 with 3183 at 2,1,3
122 Id : 235, {_}: add (multiply ?485 additive_identity) ?484 =<= multiply (add ?485 ?484) ?484 [484, 485] by Super 8 with 30 at 2,3
123 Id : 498, {_}: multiply ?740 (add ?739 ?740) =>= add (multiply ?739 additive_identity) ?740 [739, 740] by Super 6 with 235 at 3
124 Id : 236, {_}: add (multiply additive_identity ?488) ?487 =<= multiply ?487 (add ?488 ?487) [487, 488] by Super 8 with 30 at 1,3
125 Id : 968, {_}: add (multiply additive_identity ?739) ?740 =?= add (multiply ?739 additive_identity) ?740 [740, 739] by Demod 498 with 236 at 2
126 Id : 450, {_}: add ?682 (multiply additive_identity ?683) =<= multiply ?682 (add ?682 ?683) [683, 682] by Super 10 with 28 at 1,3
127 Id : 453, {_}: add (inverse ?690) (multiply additive_identity ?690) =>= multiply (inverse ?690) multiplicative_identity [690] by Super 450 with 18 at 2,3
128 Id : 478, {_}: add (inverse ?690) (multiply additive_identity ?690) =>= multiply multiplicative_identity (inverse ?690) [690] by Demod 453 with 6 at 3
129 Id : 479, {_}: add (inverse ?690) (multiply additive_identity ?690) =>= inverse ?690 [690] by Demod 478 with 26 at 3
130 Id : 2879, {_}: multiply ?359 (add (inverse ?359) ?360) =>= multiply ?359 ?360 [360, 359] by Demod 152 with 30 at 3
131 Id : 2886, {_}: add (inverse (add (inverse additive_identity) ?2774)) (multiply additive_identity ?2774) =>= inverse (add (inverse additive_identity) ?2774) [2774] by Super 479 with 2879 at 2,2
132 Id : 221, {_}: inverse additive_identity =>= multiplicative_identity [] by Super 18 with 28 at 2
133 Id : 2945, {_}: add (inverse (add multiplicative_identity ?2774)) (multiply additive_identity ?2774) =>= inverse (add (inverse additive_identity) ?2774) [2774] by Demod 2886 with 221 at 1,1,1,2
134 Id : 1490, {_}: add ?1622 (inverse ?1622) =>= add ?1622 multiplicative_identity [1622] by Super 1484 with 24 at 2,2
135 Id : 1526, {_}: multiplicative_identity =<= add ?1622 multiplicative_identity [1622] by Demod 1490 with 16 at 2
136 Id : 1546, {_}: add multiplicative_identity ?1675 =>= multiplicative_identity [1675] by Super 4 with 1526 at 3
137 Id : 2946, {_}: add (inverse multiplicative_identity) (multiply additive_identity ?2774) =>= inverse (add (inverse additive_identity) ?2774) [2774] by Demod 2945 with 1546 at 1,1,2
138 Id : 183, {_}: inverse multiplicative_identity =>= additive_identity [] by Super 22 with 24 at 2
139 Id : 2947, {_}: add additive_identity (multiply additive_identity ?2774) =>= inverse (add (inverse additive_identity) ?2774) [2774] by Demod 2946 with 183 at 1,2
140 Id : 2948, {_}: multiply additive_identity ?2774 =<= inverse (add (inverse additive_identity) ?2774) [2774] by Demod 2947 with 30 at 2
141 Id : 2949, {_}: multiply additive_identity ?2774 =<= inverse (add multiplicative_identity ?2774) [2774] by Demod 2948 with 221 at 1,1,3
142 Id : 2950, {_}: multiply additive_identity ?2774 =>= inverse multiplicative_identity [2774] by Demod 2949 with 1546 at 1,3
143 Id : 2951, {_}: multiply additive_identity ?2774 =>= additive_identity [2774] by Demod 2950 with 183 at 3
144 Id : 3009, {_}: add additive_identity ?740 =<= add (multiply ?739 additive_identity) ?740 [739, 740] by Demod 968 with 2951 at 1,2
145 Id : 3029, {_}: ?740 =<= add (multiply ?739 additive_identity) ?740 [739, 740] by Demod 3009 with 30 at 2
146 Id : 3031, {_}: ?484 =<= multiply (add ?485 ?484) ?484 [485, 484] by Demod 235 with 3029 at 2
147 Id : 6936, {_}: add ?1842 (multiply ?1843 ?1842) =>= ?1842 [1843, 1842] by Demod 6935 with 3031 at 3
148 Id : 6956, {_}: add (multiply ?7059 ?7058) ?7058 =>= ?7058 [7058, 7059] by Super 4 with 6936 at 3
149 Id : 52241, {_}: multiply (multiply (add ?83798 ?83799) ?83800) ?83799 =>= multiply ?83800 ?83799 [83800, 83799, 83798] by Demod 27129 with 6956 at 1,3
150 Id : 52270, {_}: multiply (multiply ?83922 ?83923) (multiply ?83921 ?83922) =>= multiply ?83923 (multiply ?83921 ?83922) [83921, 83923, 83922] by Super 52241 with 6936 at 1,1,2
151 Id : 3280, {_}: multiply ?3132 (add ?3131 (inverse ?3132)) =<= multiply ?3132 (multiply ?3131 (inverse (inverse ?3132))) [3131, 3132] by Super 3270 with 2790 at 2,2
152 Id : 3318, {_}: multiply ?3132 ?3131 =<= multiply ?3132 (multiply ?3131 (inverse (inverse ?3132))) [3131, 3132] by Demod 3280 with 3256 at 2
153 Id : 3319, {_}: multiply ?3132 ?3131 =<= multiply ?3132 (multiply ?3131 ?3132) [3131, 3132] by Demod 3318 with 3183 at 2,2,3
154 Id : 3542, {_}: multiply ?3472 (add ?3474 (multiply ?3473 ?3472)) =>= add (multiply ?3472 ?3474) (multiply ?3472 ?3473) [3473, 3474, 3472] by Super 14 with 3319 at 2,3
155 Id : 23927, {_}: multiply ?27205 (add ?27206 (multiply ?27207 ?27205)) =>= multiply ?27205 (add ?27206 ?27207) [27207, 27206, 27205] by Demod 3542 with 14 at 3
156 Id : 24009, {_}: multiply ?27527 (multiply ?27528 (add ?27526 ?27527)) =?= multiply ?27527 (add (multiply ?27528 ?27526) ?27528) [27526, 27528, 27527] by Super 23927 with 14 at 2,2
157 Id : 7091, {_}: add (multiply ?7292 ?7293) ?7293 =>= ?7293 [7293, 7292] by Super 4 with 6936 at 3
158 Id : 7092, {_}: add (multiply ?7296 ?7295) ?7296 =>= ?7296 [7295, 7296] by Super 7091 with 6 at 1,2
159 Id : 49144, {_}: multiply ?77879 (multiply ?77880 (add ?77881 ?77879)) =>= multiply ?77879 ?77880 [77881, 77880, 77879] by Demod 24009 with 7092 at 2,3
160 Id : 6968, {_}: add ?7096 (multiply ?7097 ?7096) =>= ?7096 [7097, 7096] by Demod 6935 with 3031 at 3
161 Id : 6969, {_}: add ?7099 (multiply ?7099 ?7100) =>= ?7099 [7100, 7099] by Super 6968 with 6 at 2,2
162 Id : 49175, {_}: multiply (multiply ?78012 ?78010) (multiply ?78011 ?78012) =>= multiply (multiply ?78012 ?78010) ?78011 [78011, 78010, 78012] by Super 49144 with 6969 at 2,2,2
163 Id : 77462, {_}: multiply (multiply ?134082 ?134083) ?134084 =?= multiply ?134083 (multiply ?134084 ?134082) [134084, 134083, 134082] by Demod 52270 with 49175 at 2
164 Id : 77468, {_}: multiply (multiply (add (inverse ?134104) ?134102) ?134103) ?134104 =>= multiply ?134103 (multiply ?134104 ?134102) [134103, 134102, 134104] by Super 77462 with 2879 at 2,3
165 Id : 3544, {_}: multiply (multiply ?3481 ?3480) ?3480 =>= multiply ?3480 ?3481 [3480, 3481] by Super 6 with 3319 at 3
166 Id : 3902, {_}: multiply (add ?3943 (multiply ?3941 ?3942)) ?3942 =>= add (multiply ?3943 ?3942) (multiply ?3942 ?3941) [3942, 3941, 3943] by Super 12 with 3544 at 2,3
167 Id : 27853, {_}: multiply (add ?34448 (multiply ?34449 ?34450)) ?34450 =>= multiply (add ?34448 ?34449) ?34450 [34450, 34449, 34448] by Demod 3902 with 70 at 3
168 Id : 27945, {_}: multiply (multiply ?34816 (add ?34815 ?34817)) ?34817 =?= multiply (add (multiply ?34816 ?34815) ?34816) ?34817 [34817, 34815, 34816] by Super 27853 with 14 at 1,2
169 Id : 53412, {_}: multiply (multiply ?86132 (add ?86133 ?86134)) ?86134 =>= multiply ?86132 ?86134 [86134, 86133, 86132] by Demod 27945 with 7092 at 1,3
170 Id : 53441, {_}: multiply (multiply ?86256 ?86257) (multiply ?86255 ?86257) =>= multiply ?86256 (multiply ?86255 ?86257) [86255, 86257, 86256] by Super 53412 with 6936 at 2,1,2
171 Id : 49173, {_}: multiply (multiply ?78002 ?78004) (multiply ?78003 ?78004) =>= multiply (multiply ?78002 ?78004) ?78003 [78003, 78004, 78002] by Super 49144 with 6936 at 2,2,2
172 Id : 79216, {_}: multiply (multiply ?86256 ?86257) ?86255 =?= multiply ?86256 (multiply ?86255 ?86257) [86255, 86257, 86256] by Demod 53441 with 49173 at 2
173 Id : 290220, {_}: multiply (add (inverse ?134104) ?134102) (multiply ?134104 ?134103) =>= multiply ?134103 (multiply ?134104 ?134102) [134103, 134102, 134104] by Demod 77468 with 79216 at 2
174 Id : 148, {_}: multiply (add ?349 ?350) (inverse ?349) =>= add additive_identity (multiply ?350 (inverse ?349)) [350, 349] by Super 12 with 20 at 1,3
175 Id : 160, {_}: multiply (inverse ?349) (add ?349 ?350) =>= add additive_identity (multiply ?350 (inverse ?349)) [350, 349] by Demod 148 with 6 at 2
176 Id : 4141, {_}: multiply (inverse ?4194) (add ?4194 ?4195) =>= multiply ?4195 (inverse ?4194) [4195, 4194] by Demod 160 with 30 at 3
177 Id : 3259, {_}: add (multiply (inverse ?3073) ?3072) ?3073 =<= add (add ?3072 (inverse (inverse ?3073))) ?3073 [3072, 3073] by Super 2697 with 3256 at 1,2
178 Id : 3300, {_}: add ?3072 ?3073 =<= add (add ?3072 (inverse (inverse ?3073))) ?3073 [3073, 3072] by Demod 3259 with 2697 at 2
179 Id : 3301, {_}: add ?3072 ?3073 =<= add (add ?3072 ?3073) ?3073 [3073, 3072] by Demod 3300 with 3183 at 2,1,3
180 Id : 4158, {_}: multiply (inverse (add ?4240 ?4241)) (add ?4240 ?4241) =>= multiply ?4241 (inverse (add ?4240 ?4241)) [4241, 4240] by Super 4141 with 3301 at 2,2
181 Id : 4229, {_}: additive_identity =<= multiply ?4241 (inverse (add ?4240 ?4241)) [4240, 4241] by Demod 4158 with 22 at 2
182 Id : 5045, {_}: multiply (inverse (add ?4937 ?4936)) ?4936 =>= additive_identity [4936, 4937] by Super 6 with 4229 at 3
183 Id : 7219, {_}: multiply (inverse ?7487) (multiply ?7487 ?7488) =>= additive_identity [7488, 7487] by Super 5045 with 6969 at 1,1,2
184 Id : 7871, {_}: multiply (add (inverse ?8300) ?8302) (multiply ?8300 ?8301) =>= add additive_identity (multiply ?8302 (multiply ?8300 ?8301)) [8301, 8302, 8300] by Super 12 with 7219 at 1,3
185 Id : 7967, {_}: multiply (add (inverse ?8300) ?8302) (multiply ?8300 ?8301) =>= multiply ?8302 (multiply ?8300 ?8301) [8301, 8302, 8300] by Demod 7871 with 30 at 3
186 Id : 290221, {_}: multiply ?134102 (multiply ?134104 ?134103) =?= multiply ?134103 (multiply ?134104 ?134102) [134103, 134104, 134102] by Demod 290220 with 7967 at 2
187 Id : 166, {_}: multiply (add (inverse ?383) ?384) ?383 =>= add additive_identity (multiply ?384 ?383) [384, 383] by Super 12 with 22 at 1,3
188 Id : 4249, {_}: multiply (add (inverse ?383) ?384) ?383 =>= multiply ?384 ?383 [384, 383] by Demod 166 with 30 at 3
189 Id : 77480, {_}: multiply (multiply ?134153 ?134154) (add (inverse ?134153) ?134152) =>= multiply ?134154 (multiply ?134152 ?134153) [134152, 134154, 134153] by Super 77462 with 4249 at 2,3
190 Id : 77935, {_}: multiply (add (inverse ?134153) ?134152) (multiply ?134153 ?134154) =>= multiply ?134154 (multiply ?134152 ?134153) [134154, 134152, 134153] by Demod 77480 with 6 at 2
191 Id : 295050, {_}: multiply ?134152 (multiply ?134153 ?134154) =?= multiply ?134154 (multiply ?134152 ?134153) [134154, 134153, 134152] by Demod 77935 with 7967 at 2
192 Id : 3012, {_}: add additive_identity ?487 =<= multiply ?487 (add ?488 ?487) [488, 487] by Demod 236 with 2951 at 1,2
193 Id : 3025, {_}: ?487 =<= multiply ?487 (add ?488 ?487) [488, 487] by Demod 3012 with 30 at 2
194 Id : 6954, {_}: add ?7050 (multiply ?7052 (multiply ?7051 ?7050)) =>= multiply (add ?7050 ?7052) ?7050 [7051, 7052, 7050] by Super 10 with 6936 at 2,3
195 Id : 219, {_}: add ?458 (multiply ?459 additive_identity) =<= multiply (add ?458 ?459) ?458 [459, 458] by Super 10 with 28 at 2,3
196 Id : 310, {_}: multiply ?527 (add ?527 ?528) =>= add ?527 (multiply ?528 additive_identity) [528, 527] by Super 6 with 219 at 3
197 Id : 220, {_}: add ?461 (multiply additive_identity ?462) =<= multiply ?461 (add ?461 ?462) [462, 461] by Super 10 with 28 at 1,3
198 Id : 632, {_}: add ?527 (multiply additive_identity ?528) =?= add ?527 (multiply ?528 additive_identity) [528, 527] by Demod 310 with 220 at 2
199 Id : 3013, {_}: add ?527 additive_identity =<= add ?527 (multiply ?528 additive_identity) [528, 527] by Demod 632 with 2951 at 2,2
200 Id : 3021, {_}: ?527 =<= add ?527 (multiply ?528 additive_identity) [528, 527] by Demod 3013 with 28 at 2
201 Id : 3024, {_}: ?458 =<= multiply (add ?458 ?459) ?458 [459, 458] by Demod 219 with 3021 at 2
202 Id : 7015, {_}: add ?7050 (multiply ?7052 (multiply ?7051 ?7050)) =>= ?7050 [7051, 7052, 7050] by Demod 6954 with 3024 at 3
203 Id : 54601, {_}: multiply ?88480 (multiply ?88481 ?88482) =<= multiply (multiply ?88480 (multiply ?88481 ?88482)) ?88482 [88482, 88481, 88480] by Super 3025 with 7015 at 2,3
204 Id : 54602, {_}: multiply ?88484 (multiply ?88485 ?88486) =<= multiply (multiply ?88484 (multiply ?88486 ?88485)) ?88486 [88486, 88485, 88484] by Super 54601 with 6 at 2,1,3
205 Id : 7204, {_}: add ?7439 (multiply ?7441 (multiply ?7439 ?7440)) =>= multiply (add ?7439 ?7441) ?7439 [7440, 7441, 7439] by Super 10 with 6969 at 2,3
206 Id : 7269, {_}: add ?7439 (multiply ?7441 (multiply ?7439 ?7440)) =>= ?7439 [7440, 7441, 7439] by Demod 7204 with 3024 at 3
207 Id : 30112, {_}: multiply ?38749 (multiply ?38748 ?38750) =<= multiply (multiply ?38749 (multiply ?38748 ?38750)) ?38748 [38750, 38748, 38749] by Super 3025 with 7269 at 2,3
208 Id : 81336, {_}: multiply ?88484 (multiply ?88485 ?88486) =?= multiply ?88484 (multiply ?88486 ?88485) [88486, 88485, 88484] by Demod 54602 with 30112 at 3
209 Id : 297313, {_}: multiply c (multiply b a) === multiply c (multiply b a) [] by Demod 297312 with 81336 at 2
210 Id : 297312, {_}: multiply c (multiply a b) =>= multiply c (multiply b a) [] by Demod 292477 with 295050 at 2
211 Id : 292477, {_}: multiply b (multiply c a) =>= multiply c (multiply b a) [] by Demod 255 with 290221 at 2
212 Id : 255, {_}: multiply a (multiply c b) =>= multiply c (multiply b a) [] by Demod 254 with 6 at 2,3
213 Id : 254, {_}: multiply a (multiply c b) =>= multiply c (multiply a b) [] by Demod 253 with 6 at 3
214 Id : 253, {_}: multiply a (multiply c b) =<= multiply (multiply a b) c [] by Demod 2 with 6 at 2,2
215 Id : 2, {_}: multiply a (multiply b c) =<= multiply (multiply a b) c [] by prove_associativity
216 % SZS output end CNFRefutation for BOO007-2.p
223 additive_identity is 88
224 additive_inverse1 is 83
227 commutativity_of_add is 92
228 commutativity_of_multiply is 91
229 distributivity1 is 90
230 distributivity2 is 89
232 multiplicative_id1 is 85
233 multiplicative_identity is 86
234 multiplicative_inverse1 is 82
236 prove_associativity is 94
238 Id : 4, {_}: add ?2 ?3 =?= add ?3 ?2 [3, 2] by commutativity_of_add ?2 ?3
240 multiply ?5 ?6 =?= multiply ?6 ?5
241 [6, 5] by commutativity_of_multiply ?5 ?6
243 add ?8 (multiply ?9 ?10) =<= multiply (add ?8 ?9) (add ?8 ?10)
244 [10, 9, 8] by distributivity1 ?8 ?9 ?10
246 multiply ?12 (add ?13 ?14)
248 add (multiply ?12 ?13) (multiply ?12 ?14)
249 [14, 13, 12] by distributivity2 ?12 ?13 ?14
250 Id : 12, {_}: add ?16 additive_identity =>= ?16 [16] by additive_id1 ?16
252 multiply ?18 multiplicative_identity =>= ?18
253 [18] by multiplicative_id1 ?18
255 add ?20 (inverse ?20) =>= multiplicative_identity
256 [20] by additive_inverse1 ?20
258 multiply ?22 (inverse ?22) =>= additive_identity
259 [22] by multiplicative_inverse1 ?22
262 multiply a (multiply b c) =<= multiply (multiply a b) c
263 [] by prove_associativity
264 Found proof, 74.913351s
265 % SZS status Unsatisfiable for BOO007-4.p
266 % SZS output start CNFRefutation for BOO007-4.p
267 Id : 14, {_}: multiply ?18 multiplicative_identity =>= ?18 [18] by multiplicative_id1 ?18
268 Id : 16, {_}: add ?20 (inverse ?20) =>= multiplicative_identity [20] by additive_inverse1 ?20
269 Id : 8, {_}: add ?8 (multiply ?9 ?10) =<= multiply (add ?8 ?9) (add ?8 ?10) [10, 9, 8] by distributivity1 ?8 ?9 ?10
270 Id : 12, {_}: add ?16 additive_identity =>= ?16 [16] by additive_id1 ?16
271 Id : 4, {_}: add ?2 ?3 =?= add ?3 ?2 [3, 2] by commutativity_of_add ?2 ?3
272 Id : 18, {_}: multiply ?22 (inverse ?22) =>= additive_identity [22] by multiplicative_inverse1 ?22
273 Id : 10, {_}: multiply ?12 (add ?13 ?14) =<= add (multiply ?12 ?13) (multiply ?12 ?14) [14, 13, 12] by distributivity2 ?12 ?13 ?14
274 Id : 6, {_}: multiply ?5 ?6 =?= multiply ?6 ?5 [6, 5] by commutativity_of_multiply ?5 ?6
275 Id : 81, {_}: multiply ?187 (add (inverse ?187) ?188) =>= add additive_identity (multiply ?187 ?188) [188, 187] by Super 10 with 18 at 1,3
276 Id : 57, {_}: add additive_identity ?136 =>= ?136 [136] by Super 4 with 12 at 3
277 Id : 2041, {_}: multiply ?187 (add (inverse ?187) ?188) =>= multiply ?187 ?188 [188, 187] by Demod 81 with 57 at 3
278 Id : 2049, {_}: multiply (add (inverse ?1798) ?1799) ?1798 =>= multiply ?1798 ?1799 [1799, 1798] by Super 6 with 2041 at 3
279 Id : 72, {_}: add ?169 (multiply (inverse ?169) ?170) =>= multiply multiplicative_identity (add ?169 ?170) [170, 169] by Super 8 with 16 at 1,3
280 Id : 65, {_}: multiply multiplicative_identity ?154 =>= ?154 [154] by Super 6 with 14 at 3
281 Id : 1065, {_}: add ?169 (multiply (inverse ?169) ?170) =>= add ?169 ?170 [170, 169] by Demod 72 with 65 at 3
282 Id : 80, {_}: multiply ?184 (add ?185 (inverse ?184)) =>= add (multiply ?184 ?185) additive_identity [185, 184] by Super 10 with 18 at 2,3
283 Id : 88, {_}: multiply ?184 (add ?185 (inverse ?184)) =>= add additive_identity (multiply ?184 ?185) [185, 184] by Demod 80 with 4 at 3
284 Id : 2371, {_}: multiply ?184 (add ?185 (inverse ?184)) =>= multiply ?184 ?185 [185, 184] by Demod 88 with 57 at 3
285 Id : 2380, {_}: add ?2048 (multiply (inverse ?2048) ?2047) =<= add ?2048 (add ?2047 (inverse (inverse ?2048))) [2047, 2048] by Super 1065 with 2371 at 2,2
286 Id : 2402, {_}: add ?2048 ?2047 =<= add ?2048 (add ?2047 (inverse (inverse ?2048))) [2047, 2048] by Demod 2380 with 1065 at 2
287 Id : 71, {_}: add ?166 (multiply ?167 (inverse ?166)) =>= multiply (add ?166 ?167) multiplicative_identity [167, 166] by Super 8 with 16 at 2,3
288 Id : 79, {_}: add ?166 (multiply ?167 (inverse ?166)) =>= multiply multiplicative_identity (add ?166 ?167) [167, 166] by Demod 71 with 6 at 3
289 Id : 1969, {_}: add ?166 (multiply ?167 (inverse ?166)) =>= add ?166 ?167 [167, 166] by Demod 79 with 65 at 3
290 Id : 2056, {_}: multiply ?1815 (add (inverse ?1815) ?1816) =>= multiply ?1815 ?1816 [1816, 1815] by Demod 81 with 57 at 3
291 Id : 1077, {_}: add ?1042 (multiply (inverse ?1042) ?1043) =>= add ?1042 ?1043 [1043, 1042] by Demod 72 with 65 at 3
292 Id : 1082, {_}: add ?1054 additive_identity =<= add ?1054 (inverse (inverse ?1054)) [1054] by Super 1077 with 18 at 2,2
293 Id : 1115, {_}: ?1054 =<= add ?1054 (inverse (inverse ?1054)) [1054] by Demod 1082 with 12 at 2
294 Id : 2072, {_}: multiply ?1854 (inverse ?1854) =<= multiply ?1854 (inverse (inverse (inverse ?1854))) [1854] by Super 2056 with 1115 at 2,2
295 Id : 2140, {_}: additive_identity =<= multiply ?1854 (inverse (inverse (inverse ?1854))) [1854] by Demod 2072 with 18 at 2
296 Id : 2304, {_}: add (inverse (inverse ?1984)) additive_identity =?= add (inverse (inverse ?1984)) ?1984 [1984] by Super 1969 with 2140 at 2,2
297 Id : 2314, {_}: add additive_identity (inverse (inverse ?1984)) =<= add (inverse (inverse ?1984)) ?1984 [1984] by Demod 2304 with 4 at 2
298 Id : 2315, {_}: inverse (inverse ?1984) =<= add (inverse (inverse ?1984)) ?1984 [1984] by Demod 2314 with 57 at 2
299 Id : 1260, {_}: add (inverse (inverse ?1219)) ?1219 =>= ?1219 [1219] by Super 4 with 1115 at 3
300 Id : 2316, {_}: inverse (inverse ?1984) =>= ?1984 [1984] by Demod 2315 with 1260 at 3
301 Id : 2403, {_}: add ?2048 ?2047 =<= add ?2048 (add ?2047 ?2048) [2047, 2048] by Demod 2402 with 2316 at 2,2,3
302 Id : 2435, {_}: add ?2108 (multiply ?2110 (add ?2109 ?2108)) =<= multiply (add ?2108 ?2110) (add ?2108 ?2109) [2109, 2110, 2108] by Super 8 with 2403 at 2,3
303 Id : 2463, {_}: add ?2108 (multiply ?2110 (add ?2109 ?2108)) =>= add ?2108 (multiply ?2110 ?2109) [2109, 2110, 2108] by Demod 2435 with 8 at 3
304 Id : 18875, {_}: multiply (add (inverse ?19839) (multiply ?19837 ?19838)) ?19839 =?= multiply ?19839 (multiply ?19837 (add ?19838 (inverse ?19839))) [19838, 19837, 19839] by Super 2049 with 2463 at 1,2
305 Id : 151787, {_}: multiply ?278411 (multiply ?278412 ?278413) =<= multiply ?278411 (multiply ?278412 (add ?278413 (inverse ?278411))) [278413, 278412, 278411] by Demod 18875 with 2049 at 2
306 Id : 1071, {_}: add (multiply (inverse ?1025) ?1026) ?1025 =>= add ?1025 ?1026 [1026, 1025] by Super 4 with 1065 at 3
307 Id : 151803, {_}: multiply ?278483 (multiply ?278484 (multiply (inverse (inverse ?278483)) ?278482)) =>= multiply ?278483 (multiply ?278484 (add (inverse ?278483) ?278482)) [278482, 278484, 278483] by Super 151787 with 1071 at 2,2,3
308 Id : 152295, {_}: multiply ?278483 (multiply ?278484 (multiply ?278483 ?278482)) =<= multiply ?278483 (multiply ?278484 (add (inverse ?278483) ?278482)) [278482, 278484, 278483] by Demod 151803 with 2316 at 1,2,2,2
309 Id : 228, {_}: add ?322 (multiply ?323 additive_identity) =<= multiply (add ?322 ?323) ?322 [323, 322] by Super 8 with 12 at 2,3
310 Id : 229, {_}: add ?325 (multiply ?326 additive_identity) =<= multiply (add ?326 ?325) ?325 [326, 325] by Super 228 with 4 at 1,3
311 Id : 331, {_}: add ?429 (multiply additive_identity ?430) =<= multiply ?429 (add ?429 ?430) [430, 429] by Super 8 with 12 at 1,3
312 Id : 332, {_}: add ?432 (multiply additive_identity ?433) =<= multiply ?432 (add ?433 ?432) [433, 432] by Super 331 with 4 at 2,3
313 Id : 73, {_}: add (inverse ?172) ?172 =>= multiplicative_identity [172] by Super 4 with 16 at 3
314 Id : 336, {_}: add (inverse ?441) (multiply additive_identity ?441) =>= multiply (inverse ?441) multiplicative_identity [441] by Super 331 with 73 at 2,3
315 Id : 355, {_}: add (inverse ?441) (multiply additive_identity ?441) =>= multiply multiplicative_identity (inverse ?441) [441] by Demod 336 with 6 at 3
316 Id : 356, {_}: add (inverse ?441) (multiply additive_identity ?441) =>= inverse ?441 [441] by Demod 355 with 65 at 3
317 Id : 713, {_}: add (multiply additive_identity ?819) (multiply additive_identity (inverse ?819)) =>= multiply (multiply additive_identity ?819) (inverse ?819) [819] by Super 332 with 356 at 2,3
318 Id : 726, {_}: multiply additive_identity (add ?819 (inverse ?819)) =<= multiply (multiply additive_identity ?819) (inverse ?819) [819] by Demod 713 with 10 at 2
319 Id : 727, {_}: multiply additive_identity multiplicative_identity =<= multiply (multiply additive_identity ?819) (inverse ?819) [819] by Demod 726 with 16 at 2,2
320 Id : 728, {_}: multiply multiplicative_identity additive_identity =<= multiply (multiply additive_identity ?819) (inverse ?819) [819] by Demod 727 with 6 at 2
321 Id : 729, {_}: additive_identity =<= multiply (multiply additive_identity ?819) (inverse ?819) [819] by Demod 728 with 65 at 2
322 Id : 730, {_}: additive_identity =<= multiply (inverse ?819) (multiply additive_identity ?819) [819] by Demod 729 with 6 at 3
323 Id : 1088, {_}: add ?1069 additive_identity =<= add ?1069 (multiply additive_identity ?1069) [1069] by Super 1077 with 730 at 2,2
324 Id : 1118, {_}: ?1069 =<= add ?1069 (multiply additive_identity ?1069) [1069] by Demod 1088 with 12 at 2
325 Id : 1283, {_}: add (multiply additive_identity ?1241) (multiply additive_identity ?1241) =>= multiply (multiply additive_identity ?1241) ?1241 [1241] by Super 332 with 1118 at 2,3
326 Id : 1319, {_}: multiply additive_identity (add ?1241 ?1241) =<= multiply (multiply additive_identity ?1241) ?1241 [1241] by Demod 1283 with 10 at 2
327 Id : 82, {_}: multiply (inverse ?190) ?190 =>= additive_identity [190] by Super 6 with 18 at 3
328 Id : 1083, {_}: add ?1056 additive_identity =?= add ?1056 ?1056 [1056] by Super 1077 with 82 at 2,2
329 Id : 1116, {_}: ?1056 =<= add ?1056 ?1056 [1056] by Demod 1083 with 12 at 2
330 Id : 1320, {_}: multiply additive_identity ?1241 =<= multiply (multiply additive_identity ?1241) ?1241 [1241] by Demod 1319 with 1116 at 2,2
331 Id : 1567, {_}: multiply ?1480 (multiply additive_identity ?1480) =>= multiply additive_identity ?1480 [1480] by Super 6 with 1320 at 3
332 Id : 2051, {_}: add (inverse (add (inverse additive_identity) ?1804)) (multiply additive_identity ?1804) =>= inverse (add (inverse additive_identity) ?1804) [1804] by Super 356 with 2041 at 2,2
333 Id : 92, {_}: inverse additive_identity =>= multiplicative_identity [] by Super 16 with 57 at 2
334 Id : 2095, {_}: add (inverse (add multiplicative_identity ?1804)) (multiply additive_identity ?1804) =>= inverse (add (inverse additive_identity) ?1804) [1804] by Demod 2051 with 92 at 1,1,1,2
335 Id : 1081, {_}: add ?1052 (inverse ?1052) =>= add ?1052 multiplicative_identity [1052] by Super 1077 with 14 at 2,2
336 Id : 1114, {_}: multiplicative_identity =<= add ?1052 multiplicative_identity [1052] by Demod 1081 with 16 at 2
337 Id : 1133, {_}: add multiplicative_identity ?1095 =>= multiplicative_identity [1095] by Super 4 with 1114 at 3
338 Id : 2096, {_}: add (inverse multiplicative_identity) (multiply additive_identity ?1804) =>= inverse (add (inverse additive_identity) ?1804) [1804] by Demod 2095 with 1133 at 1,1,2
339 Id : 139, {_}: inverse multiplicative_identity =>= additive_identity [] by Super 18 with 65 at 2
340 Id : 2097, {_}: add additive_identity (multiply additive_identity ?1804) =>= inverse (add (inverse additive_identity) ?1804) [1804] by Demod 2096 with 139 at 1,2
341 Id : 2098, {_}: multiply additive_identity ?1804 =<= inverse (add (inverse additive_identity) ?1804) [1804] by Demod 2097 with 57 at 2
342 Id : 2099, {_}: multiply additive_identity ?1804 =<= inverse (add multiplicative_identity ?1804) [1804] by Demod 2098 with 92 at 1,1,3
343 Id : 2100, {_}: multiply additive_identity ?1804 =>= inverse multiplicative_identity [1804] by Demod 2099 with 1133 at 1,3
344 Id : 2101, {_}: multiply additive_identity ?1804 =>= additive_identity [1804] by Demod 2100 with 139 at 3
345 Id : 2167, {_}: multiply ?1480 additive_identity =?= multiply additive_identity ?1480 [1480] by Demod 1567 with 2101 at 2,2
346 Id : 2168, {_}: multiply ?1480 additive_identity =>= additive_identity [1480] by Demod 2167 with 2101 at 3
347 Id : 2174, {_}: add ?325 additive_identity =<= multiply (add ?326 ?325) ?325 [326, 325] by Demod 229 with 2168 at 2,2
348 Id : 2180, {_}: ?325 =<= multiply (add ?326 ?325) ?325 [326, 325] by Demod 2174 with 12 at 2
349 Id : 1258, {_}: add ?1213 (multiply ?1214 (inverse (inverse ?1213))) =>= multiply (add ?1213 ?1214) ?1213 [1214, 1213] by Super 8 with 1115 at 2,3
350 Id : 55, {_}: add ?130 (multiply ?131 additive_identity) =<= multiply (add ?130 ?131) ?130 [131, 130] by Super 8 with 12 at 2,3
351 Id : 1274, {_}: add ?1213 (multiply ?1214 (inverse (inverse ?1213))) =>= add ?1213 (multiply ?1214 additive_identity) [1214, 1213] by Demod 1258 with 55 at 3
352 Id : 5845, {_}: add ?1213 (multiply ?1214 ?1213) =?= add ?1213 (multiply ?1214 additive_identity) [1214, 1213] by Demod 1274 with 2316 at 2,2,2
353 Id : 5846, {_}: add ?1213 (multiply ?1214 ?1213) =>= add ?1213 additive_identity [1214, 1213] by Demod 5845 with 2168 at 2,3
354 Id : 5877, {_}: add ?5881 (multiply ?5882 ?5881) =>= ?5881 [5882, 5881] by Demod 5846 with 12 at 3
355 Id : 5878, {_}: add ?5884 (multiply ?5884 ?5885) =>= ?5884 [5885, 5884] by Super 5877 with 6 at 2,2
356 Id : 6099, {_}: add ?6204 (multiply ?6206 (multiply ?6204 ?6205)) =>= multiply (add ?6204 ?6206) ?6204 [6205, 6206, 6204] by Super 8 with 5878 at 2,3
357 Id : 2175, {_}: add ?130 additive_identity =<= multiply (add ?130 ?131) ?130 [131, 130] by Demod 55 with 2168 at 2,2
358 Id : 2179, {_}: ?130 =<= multiply (add ?130 ?131) ?130 [131, 130] by Demod 2175 with 12 at 2
359 Id : 6162, {_}: add ?6204 (multiply ?6206 (multiply ?6204 ?6205)) =>= ?6204 [6205, 6206, 6204] by Demod 6099 with 2179 at 3
360 Id : 23650, {_}: multiply ?28445 (multiply ?28444 ?28446) =<= multiply ?28444 (multiply ?28445 (multiply ?28444 ?28446)) [28446, 28444, 28445] by Super 2180 with 6162 at 1,3
361 Id : 152296, {_}: multiply ?278484 (multiply ?278483 ?278482) =<= multiply ?278483 (multiply ?278484 (add (inverse ?278483) ?278482)) [278482, 278483, 278484] by Demod 152295 with 23650 at 2
362 Id : 2442, {_}: add ?2131 ?2132 =<= add ?2131 (add ?2132 ?2131) [2132, 2131] by Demod 2402 with 2316 at 2,2,3
363 Id : 2443, {_}: add ?2134 ?2135 =<= add ?2134 (add ?2134 ?2135) [2135, 2134] by Super 2442 with 4 at 2,3
364 Id : 2558, {_}: add ?2283 (multiply ?2285 (add ?2283 ?2284)) =<= multiply (add ?2283 ?2285) (add ?2283 ?2284) [2284, 2285, 2283] by Super 8 with 2443 at 2,3
365 Id : 2593, {_}: add ?2283 (multiply ?2285 (add ?2283 ?2284)) =>= add ?2283 (multiply ?2285 ?2284) [2284, 2285, 2283] by Demod 2558 with 8 at 3
366 Id : 19422, {_}: multiply (add (inverse ?20977) (multiply ?20975 ?20976)) ?20977 =?= multiply ?20977 (multiply ?20975 (add (inverse ?20977) ?20976)) [20976, 20975, 20977] by Super 2049 with 2593 at 1,2
367 Id : 19552, {_}: multiply ?20977 (multiply ?20975 ?20976) =<= multiply ?20977 (multiply ?20975 (add (inverse ?20977) ?20976)) [20976, 20975, 20977] by Demod 19422 with 2049 at 2
368 Id : 352787, {_}: multiply ?278484 (multiply ?278483 ?278482) =?= multiply ?278483 (multiply ?278484 ?278482) [278482, 278483, 278484] by Demod 152296 with 19552 at 3
369 Id : 2159, {_}: add ?432 additive_identity =<= multiply ?432 (add ?433 ?432) [433, 432] by Demod 332 with 2101 at 2,2
370 Id : 2194, {_}: ?432 =<= multiply ?432 (add ?433 ?432) [433, 432] by Demod 2159 with 12 at 2
371 Id : 5847, {_}: add ?1213 (multiply ?1214 ?1213) =>= ?1213 [1214, 1213] by Demod 5846 with 12 at 3
372 Id : 5862, {_}: add ?5837 (multiply ?5839 (multiply ?5838 ?5837)) =>= multiply (add ?5837 ?5839) ?5837 [5838, 5839, 5837] by Super 8 with 5847 at 2,3
373 Id : 5925, {_}: add ?5837 (multiply ?5839 (multiply ?5838 ?5837)) =>= ?5837 [5838, 5839, 5837] by Demod 5862 with 2179 at 3
374 Id : 36958, {_}: multiply ?53806 (multiply ?53807 ?53808) =<= multiply (multiply ?53806 (multiply ?53807 ?53808)) ?53808 [53808, 53807, 53806] by Super 2194 with 5925 at 2,3
375 Id : 36959, {_}: multiply ?53810 (multiply ?53811 ?53812) =<= multiply (multiply ?53810 (multiply ?53812 ?53811)) ?53812 [53812, 53811, 53810] by Super 36958 with 6 at 2,1,3
376 Id : 23651, {_}: multiply ?28449 (multiply ?28448 ?28450) =<= multiply (multiply ?28449 (multiply ?28448 ?28450)) ?28448 [28450, 28448, 28449] by Super 2194 with 6162 at 2,3
377 Id : 58893, {_}: multiply ?53810 (multiply ?53811 ?53812) =?= multiply ?53810 (multiply ?53812 ?53811) [53812, 53811, 53810] by Demod 36959 with 23651 at 3
378 Id : 355225, {_}: multiply c (multiply b a) === multiply c (multiply b a) [] by Demod 355224 with 58893 at 2
379 Id : 355224, {_}: multiply c (multiply a b) =>= multiply c (multiply b a) [] by Demod 91 with 352787 at 2
380 Id : 91, {_}: multiply a (multiply c b) =>= multiply c (multiply b a) [] by Demod 90 with 6 at 2,3
381 Id : 90, {_}: multiply a (multiply c b) =>= multiply c (multiply a b) [] by Demod 89 with 6 at 3
382 Id : 89, {_}: multiply a (multiply c b) =<= multiply (multiply a b) c [] by Demod 2 with 6 at 2,2
383 Id : 2, {_}: multiply a (multiply b c) =<= multiply (multiply a b) c [] by prove_associativity
384 % SZS output end CNFRefutation for BOO007-4.p
390 additive_inverse is 83
391 associativity_of_add is 80
392 associativity_of_multiply is 79
401 multiplicative_inverse is 81
407 prove_multiply_add_property is 93
410 add (multiply ?2 ?3) (add (multiply ?3 ?4) (multiply ?4 ?2))
412 multiply (add ?2 ?3) (multiply (add ?3 ?4) (add ?4 ?2))
413 [4, 3, 2] by distributivity ?2 ?3 ?4
415 add ?6 (multiply ?7 (multiply ?6 ?8)) =>= ?6
416 [8, 7, 6] by l1 ?6 ?7 ?8
418 add (add (multiply ?10 ?11) (multiply ?11 ?12)) ?11 =>= ?11
419 [12, 11, 10] by l3 ?10 ?11 ?12
421 multiply (add ?14 (inverse ?14)) ?15 =>= ?15
422 [15, 14] by property3 ?14 ?15
424 multiply ?17 (add ?18 (add ?17 ?19)) =>= ?17
425 [19, 18, 17] by l2 ?17 ?18 ?19
427 multiply (multiply (add ?21 ?22) (add ?22 ?23)) ?22 =>= ?22
428 [23, 22, 21] by l4 ?21 ?22 ?23
430 add (multiply ?25 (inverse ?25)) ?26 =>= ?26
431 [26, 25] by property3_dual ?25 ?26
432 Id : 18, {_}: add ?28 (inverse ?28) =>= n1 [28] by additive_inverse ?28
434 multiply ?30 (inverse ?30) =>= n0
435 [30] by multiplicative_inverse ?30
437 add (add ?32 ?33) ?34 =?= add ?32 (add ?33 ?34)
438 [34, 33, 32] by associativity_of_add ?32 ?33 ?34
440 multiply (multiply ?36 ?37) ?38 =?= multiply ?36 (multiply ?37 ?38)
441 [38, 37, 36] by associativity_of_multiply ?36 ?37 ?38
444 multiply a (add b c) =<= add (multiply b a) (multiply c a)
445 [] by prove_multiply_add_property
446 Found proof, 20.324508s
447 % SZS status Unsatisfiable for BOO031-1.p
448 % SZS output start CNFRefutation for BOO031-1.p
449 Id : 16, {_}: add (multiply ?25 (inverse ?25)) ?26 =>= ?26 [26, 25] by property3_dual ?25 ?26
450 Id : 20, {_}: multiply ?30 (inverse ?30) =>= n0 [30] by multiplicative_inverse ?30
451 Id : 18, {_}: add ?28 (inverse ?28) =>= n1 [28] by additive_inverse ?28
452 Id : 14, {_}: multiply (multiply (add ?21 ?22) (add ?22 ?23)) ?22 =>= ?22 [23, 22, 21] by l4 ?21 ?22 ?23
453 Id : 10, {_}: multiply (add ?14 (inverse ?14)) ?15 =>= ?15 [15, 14] by property3 ?14 ?15
454 Id : 64, {_}: multiply (multiply (add ?211 ?212) (add ?212 ?213)) ?212 =>= ?212 [213, 212, 211] by l4 ?211 ?212 ?213
455 Id : 24, {_}: multiply (multiply ?36 ?37) ?38 =?= multiply ?36 (multiply ?37 ?38) [38, 37, 36] by associativity_of_multiply ?36 ?37 ?38
456 Id : 4, {_}: add (multiply ?2 ?3) (add (multiply ?3 ?4) (multiply ?4 ?2)) =>= multiply (add ?2 ?3) (multiply (add ?3 ?4) (add ?4 ?2)) [4, 3, 2] by distributivity ?2 ?3 ?4
457 Id : 8, {_}: add (add (multiply ?10 ?11) (multiply ?11 ?12)) ?11 =>= ?11 [12, 11, 10] by l3 ?10 ?11 ?12
458 Id : 12, {_}: multiply ?17 (add ?18 (add ?17 ?19)) =>= ?17 [19, 18, 17] by l2 ?17 ?18 ?19
459 Id : 49, {_}: multiply ?140 (add ?141 (add ?140 ?142)) =>= ?140 [142, 141, 140] by l2 ?140 ?141 ?142
460 Id : 6, {_}: add ?6 (multiply ?7 (multiply ?6 ?8)) =>= ?6 [8, 7, 6] by l1 ?6 ?7 ?8
461 Id : 30, {_}: add (add (multiply ?60 ?61) (multiply ?61 ?62)) ?61 =>= ?61 [62, 61, 60] by l3 ?60 ?61 ?62
462 Id : 22, {_}: add (add ?32 ?33) ?34 =?= add ?32 (add ?33 ?34) [34, 33, 32] by associativity_of_add ?32 ?33 ?34
463 Id : 31, {_}: add (multiply ?65 ?66) ?66 =>= ?66 [66, 65] by Super 30 with 6 at 1,2
464 Id : 51, {_}: multiply ?151 (add ?152 ?151) =>= ?151 [152, 151] by Super 49 with 6 at 2,2,2
465 Id : 568, {_}: add ?1169 (add ?1170 ?1169) =>= add ?1170 ?1169 [1170, 1169] by Super 31 with 51 at 1,2
466 Id : 1034, {_}: add (add ?2011 ?2012) ?2011 =>= add ?2012 ?2011 [2012, 2011] by Super 22 with 568 at 3
467 Id : 47, {_}: add ?131 (multiply ?134 ?131) =>= ?131 [134, 131] by Super 6 with 12 at 2,2,2
468 Id : 54, {_}: multiply ?165 (add ?165 ?166) =>= ?165 [166, 165] by Super 49 with 8 at 2,2
469 Id : 673, {_}: add (add ?1383 ?1384) ?1383 =>= add ?1383 ?1384 [1384, 1383] by Super 47 with 54 at 2,2
470 Id : 1524, {_}: add ?2011 ?2012 =?= add ?2012 ?2011 [2012, 2011] by Demod 1034 with 673 at 2
471 Id : 161, {_}: add (multiply ?2 ?3) (add (multiply ?3 ?4) (multiply ?4 ?2)) =>= multiply (multiply (add ?2 ?3) (add ?3 ?4)) (add ?4 ?2) [4, 3, 2] by Demod 4 with 24 at 3
472 Id : 727, {_}: multiply (add ?1499 ?1500) ?1500 =>= ?1500 [1500, 1499] by Super 64 with 12 at 1,2
473 Id : 733, {_}: multiply ?1519 (multiply ?1518 ?1519) =>= multiply ?1518 ?1519 [1518, 1519] by Super 727 with 47 at 1,2
474 Id : 1435, {_}: add (multiply ?2622 ?2620) (add (multiply ?2621 ?2620) (multiply (multiply ?2621 ?2620) ?2622)) =<= multiply (multiply (add ?2622 ?2620) (add ?2620 (multiply ?2621 ?2620))) (add (multiply ?2621 ?2620) ?2622) [2621, 2620, 2622] by Super 161 with 733 at 1,2,2
475 Id : 34, {_}: add ?77 (multiply ?77 ?78) =>= ?77 [78, 77] by Super 6 with 10 at 2,2
476 Id : 1478, {_}: add (multiply ?2622 ?2620) (multiply ?2621 ?2620) =<= multiply (multiply (add ?2622 ?2620) (add ?2620 (multiply ?2621 ?2620))) (add (multiply ?2621 ?2620) ?2622) [2621, 2620, 2622] by Demod 1435 with 34 at 2,2
477 Id : 1479, {_}: add (multiply ?2622 ?2620) (multiply ?2621 ?2620) =<= multiply (multiply (add ?2622 ?2620) ?2620) (add (multiply ?2621 ?2620) ?2622) [2621, 2620, 2622] by Demod 1478 with 47 at 2,1,3
478 Id : 72, {_}: multiply (add ?249 ?250) ?250 =>= ?250 [250, 249] by Super 64 with 12 at 1,2
479 Id : 1480, {_}: add (multiply ?2622 ?2620) (multiply ?2621 ?2620) =>= multiply ?2620 (add (multiply ?2621 ?2620) ?2622) [2621, 2620, 2622] by Demod 1479 with 72 at 1,3
480 Id : 7843, {_}: multiply ?13007 ?13008 =<= multiply ?13007 (multiply (add ?13009 ?13007) ?13008) [13009, 13008, 13007] by Super 24 with 51 at 1,2
481 Id : 582, {_}: multiply ?1218 (add ?1219 ?1218) =>= ?1218 [1219, 1218] by Super 49 with 6 at 2,2,2
482 Id : 587, {_}: multiply (multiply ?1235 ?1234) ?1235 =>= multiply ?1235 ?1234 [1234, 1235] by Super 582 with 34 at 2,2
483 Id : 1123, {_}: multiply ?2124 ?2125 =<= multiply ?2124 (multiply ?2125 ?2124) [2125, 2124] by Super 24 with 587 at 2
484 Id : 1768, {_}: multiply ?2124 ?2125 =?= multiply ?2125 ?2124 [2125, 2124] by Demod 1123 with 733 at 3
485 Id : 7897, {_}: multiply ?13228 ?13229 =<= multiply ?13228 (multiply ?13229 (add ?13230 ?13228)) [13230, 13229, 13228] by Super 7843 with 1768 at 2,3
486 Id : 586, {_}: multiply ?1232 ?1232 =>= ?1232 [1232] by Super 582 with 31 at 2,2
487 Id : 618, {_}: multiply ?1282 ?1283 =<= multiply ?1282 (multiply ?1282 ?1283) [1283, 1282] by Super 24 with 586 at 1,2
488 Id : 1266, {_}: add (multiply ?2366 ?2364) (add (multiply ?2364 ?2365) (multiply (multiply ?2364 ?2365) ?2366)) =<= multiply (multiply (add ?2366 ?2364) (add ?2364 (multiply ?2364 ?2365))) (add (multiply ?2364 ?2365) ?2366) [2365, 2364, 2366] by Super 161 with 618 at 1,2,2
489 Id : 1308, {_}: add (multiply ?2366 ?2364) (multiply ?2364 ?2365) =<= multiply (multiply (add ?2366 ?2364) (add ?2364 (multiply ?2364 ?2365))) (add (multiply ?2364 ?2365) ?2366) [2365, 2364, 2366] by Demod 1266 with 34 at 2,2
490 Id : 1309, {_}: add (multiply ?2366 ?2364) (multiply ?2364 ?2365) =<= multiply (multiply (add ?2366 ?2364) ?2364) (add (multiply ?2364 ?2365) ?2366) [2365, 2364, 2366] by Demod 1308 with 34 at 2,1,3
491 Id : 16375, {_}: add (multiply ?29661 ?29662) (multiply ?29662 ?29663) =>= multiply ?29662 (add (multiply ?29662 ?29663) ?29661) [29663, 29662, 29661] by Demod 1309 with 72 at 1,3
492 Id : 16381, {_}: add (multiply ?29687 (add ?29686 ?29688)) ?29688 =<= multiply (add ?29686 ?29688) (add (multiply (add ?29686 ?29688) ?29688) ?29687) [29688, 29686, 29687] by Super 16375 with 72 at 2,2
493 Id : 16548, {_}: add (multiply ?29687 (add ?29686 ?29688)) ?29688 =>= multiply (add ?29686 ?29688) (add ?29688 ?29687) [29688, 29686, 29687] by Demod 16381 with 72 at 1,2,3
494 Id : 91, {_}: multiply n1 ?15 =>= ?15 [15] by Demod 10 with 18 at 1,2
495 Id : 101, {_}: n0 =<= inverse n1 [] by Super 91 with 20 at 2
496 Id : 206, {_}: add n1 n0 =>= n1 [] by Super 18 with 101 at 2,2
497 Id : 214, {_}: multiply n1 (add ?663 n1) =>= n1 [663] by Super 12 with 206 at 2,2,2
498 Id : 222, {_}: add ?663 n1 =>= n1 [663] by Demod 214 with 91 at 2
499 Id : 259, {_}: multiply ?726 (add ?727 n1) =>= ?726 [727, 726] by Super 12 with 222 at 2,2,2
500 Id : 268, {_}: multiply ?726 n1 =>= ?726 [726] by Demod 259 with 222 at 2,2
501 Id : 306, {_}: multiply (add ?801 n1) (add n1 ?802) =>= n1 [802, 801] by Super 14 with 268 at 2
502 Id : 312, {_}: multiply n1 (add n1 ?802) =>= n1 [802] by Demod 306 with 222 at 1,2
503 Id : 313, {_}: add n1 ?802 =>= n1 [802] by Demod 312 with 91 at 2
504 Id : 390, {_}: multiply (multiply n1 (add ?884 ?885)) ?884 =>= ?884 [885, 884] by Super 14 with 313 at 1,1,2
505 Id : 401, {_}: multiply n1 (multiply (add ?884 ?885) ?884) =>= ?884 [885, 884] by Demod 390 with 24 at 2
506 Id : 402, {_}: multiply (add ?884 ?885) ?884 =>= ?884 [885, 884] by Demod 401 with 91 at 2
507 Id : 827, {_}: multiply (multiply ?1658 (add ?1656 ?1657)) ?1656 =>= multiply ?1658 ?1656 [1657, 1656, 1658] by Super 24 with 402 at 2,3
508 Id : 77, {_}: add (multiply ?268 ?267) (multiply (inverse ?267) ?268) =<= multiply (add ?268 ?267) (multiply (add ?267 (inverse ?267)) (add (inverse ?267) ?268)) [267, 268] by Super 4 with 16 at 2,2
509 Id : 88, {_}: add (multiply ?268 ?267) (multiply (inverse ?267) ?268) =>= multiply (add ?268 ?267) (add (inverse ?267) ?268) [267, 268] by Demod 77 with 10 at 2,3
510 Id : 1310, {_}: add (multiply ?2366 ?2364) (multiply ?2364 ?2365) =>= multiply ?2364 (add (multiply ?2364 ?2365) ?2366) [2365, 2364, 2366] by Demod 1309 with 72 at 1,3
511 Id : 16342, {_}: add (multiply ?29521 ?29522) (multiply ?29520 ?29521) =>= multiply ?29521 (add (multiply ?29521 ?29522) ?29520) [29520, 29522, 29521] by Super 1524 with 1310 at 3
512 Id : 51988, {_}: multiply ?268 (add (multiply ?268 ?267) (inverse ?267)) =?= multiply (add ?268 ?267) (add (inverse ?267) ?268) [267, 268] by Demod 88 with 16342 at 2
513 Id : 51989, {_}: multiply ?268 (add (inverse ?267) (multiply ?268 ?267)) =?= multiply (add ?268 ?267) (add (inverse ?267) ?268) [267, 268] by Demod 51988 with 1524 at 2,2
514 Id : 52070, {_}: multiply (multiply (add ?105798 ?105797) (add (inverse ?105797) ?105798)) (inverse ?105797) =>= multiply ?105798 (inverse ?105797) [105797, 105798] by Super 827 with 51989 at 1,2
515 Id : 52559, {_}: multiply (add ?105798 ?105797) (inverse ?105797) =>= multiply ?105798 (inverse ?105797) [105797, 105798] by Demod 52070 with 827 at 2
516 Id : 52560, {_}: multiply (inverse ?105797) (add ?105798 ?105797) =>= multiply ?105798 (inverse ?105797) [105798, 105797] by Demod 52559 with 1768 at 2
517 Id : 54336, {_}: add (multiply ?108230 (inverse ?108229)) ?108229 =<= multiply (add ?108230 ?108229) (add ?108229 (inverse ?108229)) [108229, 108230] by Super 16548 with 52560 at 1,2
518 Id : 54743, {_}: add (multiply ?108230 (inverse ?108229)) ?108229 =>= multiply (add ?108230 ?108229) n1 [108229, 108230] by Demod 54336 with 18 at 2,3
519 Id : 55540, {_}: add (multiply ?110128 (inverse ?110129)) ?110129 =>= add ?110128 ?110129 [110129, 110128] by Demod 54743 with 268 at 3
520 Id : 57387, {_}: add (multiply (inverse ?112946) ?112947) ?112946 =>= add ?112947 ?112946 [112947, 112946] by Super 55540 with 1768 at 1,2
521 Id : 119, {_}: add (multiply ?10 ?11) (add (multiply ?11 ?12) ?11) =>= ?11 [12, 11, 10] by Demod 8 with 22 at 2
522 Id : 216, {_}: multiply (multiply n1 (add n0 ?667)) n0 =>= n0 [667] by Super 14 with 206 at 1,1,2
523 Id : 219, {_}: multiply n1 (multiply (add n0 ?667) n0) =>= n0 [667] by Demod 216 with 24 at 2
524 Id : 220, {_}: multiply (add n0 ?667) n0 =>= n0 [667] by Demod 219 with 91 at 2
525 Id : 100, {_}: add n0 ?26 =>= ?26 [26] by Demod 16 with 20 at 1,2
526 Id : 221, {_}: multiply ?667 n0 =>= n0 [667] by Demod 220 with 100 at 1,2
527 Id : 225, {_}: add ?674 (multiply ?675 n0) =>= ?674 [675, 674] by Super 6 with 221 at 2,2,2
528 Id : 251, {_}: add ?674 n0 =>= ?674 [674] by Demod 225 with 221 at 2,2
529 Id : 281, {_}: add (multiply ?753 n0) (multiply n0 ?754) =>= n0 [754, 753] by Super 119 with 251 at 2,2
530 Id : 292, {_}: add n0 (multiply n0 ?754) =>= n0 [754] by Demod 281 with 221 at 1,2
531 Id : 293, {_}: multiply n0 ?754 =>= n0 [754] by Demod 292 with 100 at 2
532 Id : 338, {_}: add n0 (add (multiply ?829 ?830) ?829) =>= ?829 [830, 829] by Super 119 with 293 at 1,2
533 Id : 377, {_}: add (multiply ?829 ?830) ?829 =>= ?829 [830, 829] by Demod 338 with 100 at 2
534 Id : 38238, {_}: add (multiply ?76482 ?76483) (multiply ?76484 ?76482) =>= multiply ?76482 (add (multiply ?76482 ?76483) ?76484) [76484, 76483, 76482] by Super 1524 with 1310 at 3
535 Id : 38322, {_}: add ?76856 (multiply ?76857 (add ?76856 ?76855)) =<= multiply (add ?76856 ?76855) (add (multiply (add ?76856 ?76855) ?76856) ?76857) [76855, 76857, 76856] by Super 38238 with 402 at 1,2
536 Id : 47380, {_}: add ?97201 (multiply ?97202 (add ?97201 ?97203)) =>= multiply (add ?97201 ?97203) (add ?97201 ?97202) [97203, 97202, 97201] by Demod 38322 with 402 at 1,2,3
537 Id : 47486, {_}: add ?97677 (multiply (add ?97677 ?97679) ?97678) =>= multiply (add ?97677 ?97679) (add ?97677 ?97678) [97678, 97679, 97677] by Super 47380 with 1768 at 2,2
538 Id : 52196, {_}: multiply ?106255 (add (inverse ?106256) (multiply ?106255 ?106256)) =?= multiply (add ?106255 ?106256) (add (inverse ?106256) ?106255) [106256, 106255] by Demod 51988 with 1524 at 2,2
539 Id : 52239, {_}: multiply ?106398 (add (inverse (inverse ?106398)) (multiply ?106398 (inverse ?106398))) =>= multiply n1 (add (inverse (inverse ?106398)) ?106398) [106398] by Super 52196 with 18 at 1,3
540 Id : 52779, {_}: multiply ?106398 (add (inverse (inverse ?106398)) n0) =?= multiply n1 (add (inverse (inverse ?106398)) ?106398) [106398] by Demod 52239 with 20 at 2,2,2
541 Id : 52780, {_}: multiply ?106398 (inverse (inverse ?106398)) =<= multiply n1 (add (inverse (inverse ?106398)) ?106398) [106398] by Demod 52779 with 251 at 2,2
542 Id : 52781, {_}: multiply ?106398 (inverse (inverse ?106398)) =<= add (inverse (inverse ?106398)) ?106398 [106398] by Demod 52780 with 91 at 3
543 Id : 53322, {_}: add (inverse (inverse ?107400)) (multiply (multiply ?107400 (inverse (inverse ?107400))) ?107401) =>= multiply (add (inverse (inverse ?107400)) ?107400) (add (inverse (inverse ?107400)) ?107401) [107401, 107400] by Super 47486 with 52781 at 1,2,2
544 Id : 177, {_}: add ?561 (multiply (multiply ?560 ?561) ?562) =>= ?561 [562, 560, 561] by Super 6 with 24 at 2,2
545 Id : 53342, {_}: inverse (inverse ?107400) =<= multiply (add (inverse (inverse ?107400)) ?107400) (add (inverse (inverse ?107400)) ?107401) [107401, 107400] by Demod 53322 with 177 at 2
546 Id : 53343, {_}: inverse (inverse ?107400) =<= multiply (multiply ?107400 (inverse (inverse ?107400))) (add (inverse (inverse ?107400)) ?107401) [107401, 107400] by Demod 53342 with 52781 at 1,3
547 Id : 670, {_}: multiply (multiply ?1373 ?1371) (add ?1371 ?1372) =>= multiply ?1373 ?1371 [1372, 1371, 1373] by Super 24 with 54 at 2,3
548 Id : 53344, {_}: inverse (inverse ?107400) =<= multiply ?107400 (inverse (inverse ?107400)) [107400] by Demod 53343 with 670 at 3
549 Id : 53988, {_}: add (inverse (inverse ?107962)) ?107962 =>= ?107962 [107962] by Super 377 with 53344 at 1,2
550 Id : 53931, {_}: inverse (inverse ?106398) =<= add (inverse (inverse ?106398)) ?106398 [106398] by Demod 52781 with 53344 at 2
551 Id : 54117, {_}: inverse (inverse ?107962) =>= ?107962 [107962] by Demod 53988 with 53931 at 2
552 Id : 57388, {_}: add (multiply ?112949 ?112950) (inverse ?112949) =>= add ?112950 (inverse ?112949) [112950, 112949] by Super 57387 with 54117 at 1,1,2
553 Id : 57660, {_}: add (inverse ?112949) (multiply ?112949 ?112950) =>= add ?112950 (inverse ?112949) [112950, 112949] by Demod 57388 with 1524 at 2
554 Id : 1445, {_}: multiply ?2651 (multiply ?2652 ?2651) =>= multiply ?2652 ?2651 [2652, 2651] by Super 727 with 47 at 1,2
555 Id : 18543, {_}: multiply ?33695 (multiply ?33696 (multiply ?33697 ?33695)) =>= multiply (multiply ?33696 ?33697) ?33695 [33697, 33696, 33695] by Super 1445 with 24 at 2,2
556 Id : 1430, {_}: multiply (multiply ?2603 ?2601) (multiply ?2602 ?2601) =>= multiply ?2603 (multiply ?2602 ?2601) [2602, 2601, 2603] by Super 24 with 733 at 2,3
557 Id : 18612, {_}: multiply ?33994 (multiply ?33993 (multiply ?33995 ?33994)) =?= multiply (multiply (multiply ?33993 ?33994) ?33995) ?33994 [33995, 33993, 33994] by Super 18543 with 1430 at 2,2
558 Id : 1449, {_}: multiply ?2666 (multiply ?2664 (multiply ?2665 ?2666)) =>= multiply (multiply ?2664 ?2665) ?2666 [2665, 2664, 2666] by Super 1445 with 24 at 2,2
559 Id : 18850, {_}: multiply (multiply ?33993 ?33995) ?33994 =<= multiply (multiply (multiply ?33993 ?33994) ?33995) ?33994 [33994, 33995, 33993] by Demod 18612 with 1449 at 2
560 Id : 4399, {_}: multiply (multiply (multiply ?6795 ?6794) ?6796) ?6794 =>= multiply (multiply ?6795 ?6794) ?6796 [6796, 6794, 6795] by Super 51 with 177 at 2,2
561 Id : 43487, {_}: multiply (multiply ?33993 ?33995) ?33994 =?= multiply (multiply ?33993 ?33994) ?33995 [33994, 33995, 33993] by Demod 18850 with 4399 at 3
562 Id : 54429, {_}: multiply (multiply (inverse ?108571) ?108573) (add ?108572 ?108571) =>= multiply (multiply ?108572 (inverse ?108571)) ?108573 [108572, 108573, 108571] by Super 43487 with 52560 at 1,3
563 Id : 54563, {_}: multiply (inverse ?108571) (multiply ?108573 (add ?108572 ?108571)) =>= multiply (multiply ?108572 (inverse ?108571)) ?108573 [108572, 108573, 108571] by Demod 54429 with 24 at 2
564 Id : 728, {_}: multiply ?1504 (multiply ?1502 (multiply ?1504 ?1503)) =>= multiply ?1502 (multiply ?1504 ?1503) [1503, 1502, 1504] by Super 727 with 6 at 1,2
565 Id : 9518, {_}: multiply (multiply ?16547 ?16548) (multiply ?16547 ?16549) =>= multiply ?16548 (multiply ?16547 ?16549) [16549, 16548, 16547] by Super 24 with 728 at 3
566 Id : 1122, {_}: multiply (multiply ?2120 ?2121) ?2122 =<= multiply (multiply ?2120 ?2121) (multiply ?2120 ?2122) [2122, 2121, 2120] by Super 24 with 587 at 1,2
567 Id : 30202, {_}: multiply (multiply ?16547 ?16548) ?16549 =?= multiply ?16548 (multiply ?16547 ?16549) [16549, 16548, 16547] by Demod 9518 with 1122 at 2
568 Id : 54564, {_}: multiply (inverse ?108571) (multiply ?108573 (add ?108572 ?108571)) =>= multiply (inverse ?108571) (multiply ?108572 ?108573) [108572, 108573, 108571] by Demod 54563 with 30202 at 3
569 Id : 145944, {_}: add (inverse (inverse ?250795)) (multiply (inverse ?250795) (multiply ?250797 ?250796)) =>= add (multiply ?250796 (add ?250797 ?250795)) (inverse (inverse ?250795)) [250796, 250797, 250795] by Super 57660 with 54564 at 2,2
570 Id : 146263, {_}: add (multiply ?250797 ?250796) (inverse (inverse ?250795)) =<= add (multiply ?250796 (add ?250797 ?250795)) (inverse (inverse ?250795)) [250795, 250796, 250797] by Demod 145944 with 57660 at 2
571 Id : 146264, {_}: add (inverse (inverse ?250795)) (multiply ?250797 ?250796) =<= add (multiply ?250796 (add ?250797 ?250795)) (inverse (inverse ?250795)) [250796, 250797, 250795] by Demod 146263 with 1524 at 2
572 Id : 146265, {_}: add ?250795 (multiply ?250797 ?250796) =<= add (multiply ?250796 (add ?250797 ?250795)) (inverse (inverse ?250795)) [250796, 250797, 250795] by Demod 146264 with 54117 at 1,2
573 Id : 146266, {_}: add ?250795 (multiply ?250797 ?250796) =<= add (inverse (inverse ?250795)) (multiply ?250796 (add ?250797 ?250795)) [250796, 250797, 250795] by Demod 146265 with 1524 at 3
574 Id : 146267, {_}: add ?250795 (multiply ?250797 ?250796) =<= add ?250795 (multiply ?250796 (add ?250797 ?250795)) [250796, 250797, 250795] by Demod 146266 with 54117 at 1,3
575 Id : 38316, {_}: add ?76835 (multiply ?76836 (add ?76834 ?76835)) =<= multiply (add ?76834 ?76835) (add (multiply (add ?76834 ?76835) ?76835) ?76836) [76834, 76836, 76835] by Super 38238 with 72 at 1,2
576 Id : 38565, {_}: add ?76835 (multiply ?76836 (add ?76834 ?76835)) =>= multiply (add ?76834 ?76835) (add ?76835 ?76836) [76834, 76836, 76835] by Demod 38316 with 72 at 1,2,3
577 Id : 146268, {_}: add ?250795 (multiply ?250797 ?250796) =<= multiply (add ?250797 ?250795) (add ?250795 ?250796) [250796, 250797, 250795] by Demod 146267 with 38565 at 3
578 Id : 147010, {_}: multiply ?252446 (add ?252445 ?252444) =<= multiply ?252446 (add ?252444 (multiply ?252445 ?252446)) [252444, 252445, 252446] by Super 7897 with 146268 at 2,3
579 Id : 152622, {_}: multiply a (add c b) === multiply a (add c b) [] by Demod 152621 with 1524 at 2,3
580 Id : 152621, {_}: multiply a (add c b) =<= multiply a (add b c) [] by Demod 19333 with 147010 at 3
581 Id : 19333, {_}: multiply a (add c b) =<= multiply a (add c (multiply b a)) [] by Demod 19332 with 1524 at 2,3
582 Id : 19332, {_}: multiply a (add c b) =<= multiply a (add (multiply b a) c) [] by Demod 1703 with 1480 at 3
583 Id : 1703, {_}: multiply a (add c b) =<= add (multiply c a) (multiply b a) [] by Demod 1702 with 1524 at 3
584 Id : 1702, {_}: multiply a (add c b) =<= add (multiply b a) (multiply c a) [] by Demod 2 with 1524 at 2,2
585 Id : 2, {_}: multiply a (add b c) =<= add (multiply b a) (multiply c a) [] by prove_multiply_add_property
586 % SZS output end CNFRefutation for BOO031-1.p
601 prove_single_axiom is 89
603 ternary_multiply_1 is 87
604 ternary_multiply_2 is 86
607 multiply (multiply ?2 ?3 ?4) ?5 (multiply ?2 ?3 ?6)
609 multiply ?2 ?3 (multiply ?4 ?5 ?6)
610 [6, 5, 4, 3, 2] by associativity ?2 ?3 ?4 ?5 ?6
611 Id : 6, {_}: multiply ?8 ?9 ?9 =>= ?9 [9, 8] by ternary_multiply_1 ?8 ?9
613 multiply ?11 ?11 ?12 =>= ?11
614 [12, 11] by ternary_multiply_2 ?11 ?12
616 multiply (inverse ?14) ?14 ?15 =>= ?15
617 [15, 14] by left_inverse ?14 ?15
619 multiply ?17 ?18 (inverse ?18) =>= ?17
620 [18, 17] by right_inverse ?17 ?18
623 multiply (multiply a (inverse a) b)
624 (inverse (multiply (multiply c d e) f (multiply c d g)))
625 (multiply d (multiply g f e) c)
628 [] by prove_single_axiom
629 Found proof, 2.692905s
630 % SZS status Unsatisfiable for BOO034-1.p
631 % SZS output start CNFRefutation for BOO034-1.p
632 Id : 8, {_}: multiply ?11 ?11 ?12 =>= ?11 [12, 11] by ternary_multiply_2 ?11 ?12
633 Id : 6, {_}: multiply ?8 ?9 ?9 =>= ?9 [9, 8] by ternary_multiply_1 ?8 ?9
634 Id : 12, {_}: multiply ?17 ?18 (inverse ?18) =>= ?17 [18, 17] by right_inverse ?17 ?18
635 Id : 10, {_}: multiply (inverse ?14) ?14 ?15 =>= ?15 [15, 14] by left_inverse ?14 ?15
636 Id : 4, {_}: multiply (multiply ?2 ?3 ?4) ?5 (multiply ?2 ?3 ?6) =>= multiply ?2 ?3 (multiply ?4 ?5 ?6) [6, 5, 4, 3, 2] by associativity ?2 ?3 ?4 ?5 ?6
637 Id : 75, {_}: multiply ?212 ?213 ?214 =<= multiply ?212 ?213 (multiply ?215 (multiply ?212 ?213 ?214) ?214) [215, 214, 213, 212] by Super 4 with 6 at 2
638 Id : 84, {_}: multiply ?257 ?258 ?259 =<= multiply ?257 ?258 (multiply ?257 ?258 ?259) [259, 258, 257] by Super 75 with 8 at 3,3
639 Id : 115, {_}: multiply (multiply ?285 ?286 ?288) ?289 (multiply ?285 ?286 ?287) =?= multiply ?285 ?286 (multiply ?288 ?289 (multiply ?285 ?286 ?287)) [287, 289, 288, 286, 285] by Super 4 with 84 at 3,2
640 Id : 298, {_}: multiply ?735 ?736 (multiply ?737 ?738 ?739) =<= multiply ?735 ?736 (multiply ?737 ?738 (multiply ?735 ?736 ?739)) [739, 738, 737, 736, 735] by Demod 115 with 4 at 2
641 Id : 184, {_}: multiply ?446 ?447 ?448 =<= multiply ?446 ?447 (multiply ?448 (multiply ?446 ?447 ?448) ?449) [449, 448, 447, 446] by Super 4 with 8 at 2
642 Id : 189, {_}: multiply ?470 ?471 (inverse ?471) =<= multiply ?470 ?471 (multiply (inverse ?471) ?470 ?472) [472, 471, 470] by Super 184 with 12 at 2,3,3
643 Id : 225, {_}: ?470 =<= multiply ?470 ?471 (multiply (inverse ?471) ?470 ?472) [472, 471, 470] by Demod 189 with 12 at 2
644 Id : 321, {_}: multiply (inverse ?865) ?864 (multiply ?864 ?865 ?866) =>= multiply (inverse ?865) ?864 ?864 [866, 864, 865] by Super 298 with 225 at 3,3
645 Id : 387, {_}: multiply (inverse ?963) ?964 (multiply ?964 ?963 ?965) =>= ?964 [965, 964, 963] by Demod 321 with 6 at 3
646 Id : 389, {_}: multiply (inverse ?974) ?973 ?974 =>= ?973 [973, 974] by Super 387 with 6 at 3,2
647 Id : 437, {_}: ?1071 =<= inverse (inverse ?1071) [1071] by Super 12 with 389 at 2
648 Id : 462, {_}: multiply ?1119 (inverse ?1119) ?1120 =>= ?1120 [1120, 1119] by Super 10 with 437 at 1,2
649 Id : 116, {_}: multiply (multiply ?291 ?292 ?293) ?294 (multiply ?291 ?292 ?295) =?= multiply ?291 ?292 (multiply (multiply ?291 ?292 ?293) ?294 ?295) [295, 294, 293, 292, 291] by Super 4 with 84 at 1,2
650 Id : 12671, {_}: multiply ?19232 ?19233 (multiply ?19234 ?19235 ?19236) =<= multiply ?19232 ?19233 (multiply (multiply ?19232 ?19233 ?19234) ?19235 ?19236) [19236, 19235, 19234, 19233, 19232] by Demod 116 with 4 at 2
651 Id : 80, {_}: multiply ?236 ?237 (inverse ?237) =<= multiply ?236 ?237 (multiply ?238 ?236 (inverse ?237)) [238, 237, 236] by Super 75 with 12 at 2,3,3
652 Id : 105, {_}: ?236 =<= multiply ?236 ?237 (multiply ?238 ?236 (inverse ?237)) [238, 237, 236] by Demod 80 with 12 at 2
653 Id : 996, {_}: ?2202 =<= multiply ?2202 (inverse ?2203) (multiply ?2204 ?2202 ?2203) [2204, 2203, 2202] by Super 105 with 437 at 3,3,3
654 Id : 1012, {_}: ?2262 =<= multiply ?2262 (inverse (multiply ?2261 ?2263 (inverse ?2262))) ?2263 [2263, 2261, 2262] by Super 996 with 105 at 3,3
655 Id : 459, {_}: ?1109 =<= multiply ?1109 (inverse ?1108) (multiply ?1108 ?1109 ?1110) [1110, 1108, 1109] by Super 225 with 437 at 1,3,3
656 Id : 1017, {_}: inverse ?2283 =<= multiply (inverse ?2283) (inverse (multiply ?2283 ?2285 ?2284)) ?2285 [2284, 2285, 2283] by Super 996 with 459 at 3,3
657 Id : 1909, {_}: ?3987 =<= multiply ?3987 (inverse (inverse ?3985)) (inverse (multiply ?3985 (inverse ?3987) ?3986)) [3986, 3985, 3987] by Super 1012 with 1017 at 1,2,3
658 Id : 1996, {_}: ?3987 =<= multiply ?3987 ?3985 (inverse (multiply ?3985 (inverse ?3987) ?3986)) [3986, 3985, 3987] by Demod 1909 with 437 at 2,3
659 Id : 2510, {_}: ?5132 =<= multiply ?5132 (multiply ?5132 (inverse ?5131) ?5133) ?5131 [5133, 5131, 5132] by Super 105 with 1996 at 3,3
660 Id : 2812, {_}: multiply ?5719 (inverse (inverse ?5721)) ?5720 =<= multiply (multiply ?5719 (inverse (inverse ?5721)) ?5720) ?5721 ?5719 [5720, 5721, 5719] by Super 105 with 2510 at 3,3
661 Id : 2874, {_}: multiply ?5719 ?5721 ?5720 =<= multiply (multiply ?5719 (inverse (inverse ?5721)) ?5720) ?5721 ?5719 [5720, 5721, 5719] by Demod 2812 with 437 at 2,2
662 Id : 2875, {_}: multiply ?5719 ?5721 ?5720 =<= multiply (multiply ?5719 ?5721 ?5720) ?5721 ?5719 [5720, 5721, 5719] by Demod 2874 with 437 at 2,1,3
663 Id : 12777, {_}: multiply ?19864 ?19863 (multiply ?19862 ?19863 ?19864) =?= multiply ?19864 ?19863 (multiply ?19864 ?19863 ?19862) [19862, 19863, 19864] by Super 12671 with 2875 at 3,3
664 Id : 12993, {_}: multiply ?20226 ?20227 (multiply ?20228 ?20227 ?20226) =>= multiply ?20226 ?20227 ?20228 [20228, 20227, 20226] by Demod 12777 with 84 at 3
665 Id : 19, {_}: multiply ?58 ?59 ?61 =<= multiply ?58 ?59 (multiply ?60 (multiply ?58 ?59 ?61) ?61) [60, 61, 59, 58] by Super 4 with 6 at 2
666 Id : 463, {_}: multiply ?1122 ?1123 (inverse ?1122) =>= ?1123 [1123, 1122] by Super 389 with 437 at 1,2
667 Id : 607, {_}: multiply ?1371 ?1372 (inverse ?1371) =<= multiply ?1371 ?1372 (multiply ?1373 ?1372 (inverse ?1371)) [1373, 1372, 1371] by Super 19 with 463 at 2,3,3
668 Id : 625, {_}: ?1372 =<= multiply ?1371 ?1372 (multiply ?1373 ?1372 (inverse ?1371)) [1373, 1371, 1372] by Demod 607 with 463 at 2
669 Id : 460, {_}: ?1113 =<= multiply ?1113 (inverse ?1112) (multiply ?1114 ?1113 ?1112) [1114, 1112, 1113] by Super 105 with 437 at 3,3,3
670 Id : 1018, {_}: inverse ?2287 =<= multiply (inverse ?2287) (inverse (multiply ?2288 ?2289 ?2287)) ?2289 [2289, 2288, 2287] by Super 996 with 460 at 3,3
671 Id : 2078, {_}: ?4356 =<= multiply ?4356 (inverse (inverse ?4354)) (inverse (multiply ?4355 (inverse ?4356) ?4354)) [4355, 4354, 4356] by Super 1012 with 1018 at 1,2,3
672 Id : 2124, {_}: ?4356 =<= multiply ?4356 ?4354 (inverse (multiply ?4355 (inverse ?4356) ?4354)) [4355, 4354, 4356] by Demod 2078 with 437 at 2,3
673 Id : 3650, {_}: ?7215 =<= multiply ?7215 (multiply ?7216 (inverse ?7214) ?7215) ?7214 [7214, 7216, 7215] by Super 105 with 2124 at 3,3
674 Id : 4032, {_}: multiply ?7968 (inverse (inverse ?7969)) ?7967 =<= multiply ?7969 (multiply ?7968 (inverse (inverse ?7969)) ?7967) ?7967 [7967, 7969, 7968] by Super 625 with 3650 at 3,3
675 Id : 4103, {_}: multiply ?7968 ?7969 ?7967 =<= multiply ?7969 (multiply ?7968 (inverse (inverse ?7969)) ?7967) ?7967 [7967, 7969, 7968] by Demod 4032 with 437 at 2,2
676 Id : 4104, {_}: multiply ?7968 ?7969 ?7967 =<= multiply ?7969 (multiply ?7968 ?7969 ?7967) ?7967 [7967, 7969, 7968] by Demod 4103 with 437 at 2,2,3
677 Id : 13062, {_}: multiply ?20502 (multiply ?20501 ?20503 ?20502) (multiply ?20501 ?20503 ?20502) =>= multiply ?20502 (multiply ?20501 ?20503 ?20502) ?20503 [20503, 20501, 20502] by Super 12993 with 4104 at 3,2
678 Id : 13612, {_}: multiply ?21322 ?21323 ?21324 =<= multiply ?21324 (multiply ?21322 ?21323 ?21324) ?21323 [21324, 21323, 21322] by Demod 13062 with 6 at 2
679 Id : 12903, {_}: multiply ?19864 ?19863 (multiply ?19862 ?19863 ?19864) =>= multiply ?19864 ?19863 ?19862 [19862, 19863, 19864] by Demod 12777 with 84 at 3
680 Id : 13625, {_}: multiply ?21368 ?21369 (multiply ?21367 ?21369 ?21368) =<= multiply (multiply ?21367 ?21369 ?21368) (multiply ?21368 ?21369 ?21367) ?21369 [21367, 21369, 21368] by Super 13612 with 12903 at 2,3
681 Id : 13783, {_}: multiply ?21368 ?21369 ?21367 =<= multiply (multiply ?21367 ?21369 ?21368) (multiply ?21368 ?21369 ?21367) ?21369 [21367, 21369, 21368] by Demod 13625 with 12903 at 2
682 Id : 34256, {_}: multiply (multiply ?56219 ?56220 ?56221) ?56222 ?56219 =<= multiply ?56219 ?56220 (multiply ?56221 ?56222 (multiply ?56223 ?56219 (inverse ?56220))) [56223, 56222, 56221, 56220, 56219] by Super 4 with 105 at 3,2
683 Id : 34781, {_}: multiply (multiply ?57676 ?57677 ?57678) ?57678 ?57676 =>= multiply ?57676 ?57677 ?57678 [57678, 57677, 57676] by Super 34256 with 8 at 3,3
684 Id : 34858, {_}: multiply (multiply ?57992 ?57993 ?57994) ?57994 ?57993 =?= multiply ?57993 (multiply ?57992 ?57993 ?57994) ?57994 [57994, 57993, 57992] by Super 34781 with 4104 at 1,2
685 Id : 35129, {_}: multiply (multiply ?57992 ?57993 ?57994) ?57994 ?57993 =>= multiply ?57992 ?57993 ?57994 [57994, 57993, 57992] by Demod 34858 with 4104 at 3
686 Id : 36343, {_}: multiply (multiply ?60132 ?60133 ?60134) ?60134 ?60133 =<= multiply (multiply ?60133 ?60134 (multiply ?60132 ?60133 ?60134)) (multiply ?60132 ?60133 ?60134) ?60134 [60134, 60133, 60132] by Super 13783 with 35129 at 2,3
687 Id : 36700, {_}: multiply ?60132 ?60133 ?60134 =<= multiply (multiply ?60133 ?60134 (multiply ?60132 ?60133 ?60134)) (multiply ?60132 ?60133 ?60134) ?60134 [60134, 60133, 60132] by Demod 36343 with 35129 at 2
688 Id : 36701, {_}: multiply ?60132 ?60133 ?60134 =<= multiply ?60133 ?60134 (multiply ?60132 ?60133 ?60134) [60134, 60133, 60132] by Demod 36700 with 35129 at 3
689 Id : 136, {_}: multiply ?291 ?292 (multiply ?293 ?294 ?295) =<= multiply ?291 ?292 (multiply (multiply ?291 ?292 ?293) ?294 ?295) [295, 294, 293, 292, 291] by Demod 116 with 4 at 2
690 Id : 2796, {_}: multiply ?5648 (inverse (inverse ?5650)) ?5649 =<= multiply ?5650 (multiply ?5648 (inverse (inverse ?5650)) ?5649) ?5648 [5649, 5650, 5648] by Super 625 with 2510 at 3,3
691 Id : 2887, {_}: multiply ?5648 ?5650 ?5649 =<= multiply ?5650 (multiply ?5648 (inverse (inverse ?5650)) ?5649) ?5648 [5649, 5650, 5648] by Demod 2796 with 437 at 2,2
692 Id : 2888, {_}: multiply ?5648 ?5650 ?5649 =<= multiply ?5650 (multiply ?5648 ?5650 ?5649) ?5648 [5649, 5650, 5648] by Demod 2887 with 437 at 2,2,3
693 Id : 34853, {_}: multiply (multiply ?57974 ?57973 ?57972) ?57974 ?57973 =?= multiply ?57973 (multiply ?57974 ?57973 ?57972) ?57974 [57972, 57973, 57974] by Super 34781 with 2888 at 1,2
694 Id : 35120, {_}: multiply (multiply ?57974 ?57973 ?57972) ?57974 ?57973 =>= multiply ?57974 ?57973 ?57972 [57972, 57973, 57974] by Demod 34853 with 2888 at 3
695 Id : 35775, {_}: multiply ?59268 ?59269 (multiply ?59270 ?59268 ?59269) =?= multiply ?59268 ?59269 (multiply ?59268 ?59269 ?59270) [59270, 59269, 59268] by Super 136 with 35120 at 3,3
696 Id : 36064, {_}: multiply ?59268 ?59269 (multiply ?59270 ?59268 ?59269) =>= multiply ?59268 ?59269 ?59270 [59270, 59269, 59268] by Demod 35775 with 84 at 3
697 Id : 37436, {_}: multiply ?60132 ?60133 ?60134 =?= multiply ?60133 ?60134 ?60132 [60134, 60133, 60132] by Demod 36701 with 36064 at 3
698 Id : 25, {_}: multiply ?84 ?85 ?86 =<= multiply ?84 ?85 (multiply ?86 (multiply ?84 ?85 ?86) ?87) [87, 86, 85, 84] by Super 4 with 8 at 2
699 Id : 317, {_}: multiply ?845 (multiply ?846 ?847 ?845) (multiply ?846 ?847 ?848) =?= multiply ?845 (multiply ?846 ?847 ?845) (multiply ?846 ?847 ?845) [848, 847, 846, 845] by Super 298 with 25 at 3,3
700 Id : 24761, {_}: multiply ?36657 (multiply ?36658 ?36659 ?36657) (multiply ?36658 ?36659 ?36660) =>= multiply ?36658 ?36659 ?36657 [36660, 36659, 36658, 36657] by Demod 317 with 6 at 3
701 Id : 24766, {_}: multiply ?36681 (multiply ?36682 ?36683 ?36681) ?36682 =>= multiply ?36682 ?36683 ?36681 [36683, 36682, 36681] by Super 24761 with 12 at 3,2
702 Id : 37850, {_}: multiply ?63783 ?63784 (multiply ?63783 ?63785 ?63784) =>= multiply ?63783 ?63785 ?63784 [63785, 63784, 63783] by Super 24766 with 37436 at 2
703 Id : 37801, {_}: multiply ?63587 ?63589 (multiply ?63587 ?63588 ?63589) =>= multiply ?63587 ?63589 ?63588 [63588, 63589, 63587] by Super 12903 with 37436 at 3,2
704 Id : 41412, {_}: multiply ?63783 ?63784 ?63785 =?= multiply ?63783 ?63785 ?63784 [63785, 63784, 63783] by Demod 37850 with 37801 at 2
705 Id : 42484, {_}: b === b [] by Demod 42483 with 12 at 2
706 Id : 42483, {_}: multiply b (multiply d c (multiply g f e)) (inverse (multiply d c (multiply g f e))) =>= b [] by Demod 42482 with 41412 at 3,1,3,2
707 Id : 42482, {_}: multiply b (multiply d c (multiply g f e)) (inverse (multiply d c (multiply g e f))) =>= b [] by Demod 42481 with 41412 at 1,3,2
708 Id : 42481, {_}: multiply b (multiply d c (multiply g f e)) (inverse (multiply d (multiply g e f) c)) =>= b [] by Demod 42480 with 41412 at 2,2
709 Id : 42480, {_}: multiply b (multiply d (multiply g f e) c) (inverse (multiply d (multiply g e f) c)) =>= b [] by Demod 38492 with 41412 at 2
710 Id : 38492, {_}: multiply b (inverse (multiply d (multiply g e f) c)) (multiply d (multiply g f e) c) =>= b [] by Demod 38491 with 37436 at 2,1,2,2
711 Id : 38491, {_}: multiply b (inverse (multiply d (multiply f g e) c)) (multiply d (multiply g f e) c) =>= b [] by Demod 38490 with 37436 at 2,1,2,2
712 Id : 38490, {_}: multiply b (inverse (multiply d (multiply e f g) c)) (multiply d (multiply g f e) c) =>= b [] by Demod 595 with 37436 at 1,2,2
713 Id : 595, {_}: multiply b (inverse (multiply c d (multiply e f g))) (multiply d (multiply g f e) c) =>= b [] by Demod 53 with 462 at 1,2
714 Id : 53, {_}: multiply (multiply a (inverse a) b) (inverse (multiply c d (multiply e f g))) (multiply d (multiply g f e) c) =>= b [] by Demod 2 with 4 at 1,2,2
715 Id : 2, {_}: multiply (multiply a (inverse a) b) (inverse (multiply (multiply c d e) f (multiply c d g))) (multiply d (multiply g f e) c) =>= b [] by prove_single_axiom
716 % SZS output end CNFRefutation for BOO034-1.p
729 (add (inverse (add (inverse (add ?2 ?3)) ?4))
731 (add ?2 (inverse (add (inverse ?4) (inverse (add ?4 ?5)))))))
734 [5, 4, 3, 2] by dn1 ?2 ?3 ?4 ?5
736 Id : 2, {_}: add b a =>= add a b [] by huntinton_1
737 Found proof, 0.405036s
738 % SZS status Unsatisfiable for BOO072-1.p
739 % SZS output start CNFRefutation for BOO072-1.p
740 Id : 5, {_}: inverse (add (inverse (add (inverse (add ?7 ?8)) ?9)) (inverse (add ?7 (inverse (add (inverse ?9) (inverse (add ?9 ?10))))))) =>= ?9 [10, 9, 8, 7] by dn1 ?7 ?8 ?9 ?10
741 Id : 4, {_}: inverse (add (inverse (add (inverse (add ?2 ?3)) ?4)) (inverse (add ?2 (inverse (add (inverse ?4) (inverse (add ?4 ?5))))))) =>= ?4 [5, 4, 3, 2] by dn1 ?2 ?3 ?4 ?5
742 Id : 17, {_}: inverse (add (inverse (add (inverse (add (inverse (add (inverse (add (inverse (inverse ?80)) ?81)) ?80)) ?82)) (inverse ?80))) ?80) =>= inverse ?80 [82, 81, 80] by Super 5 with 4 at 2,1,2
743 Id : 22, {_}: inverse (add (inverse (add ?111 (inverse ?111))) ?111) =>= inverse ?111 [111] by Super 17 with 4 at 1,1,1,1,2
744 Id : 36, {_}: inverse (add (inverse ?135) (inverse (add ?135 (inverse (add (inverse ?135) (inverse (add ?135 ?136))))))) =>= ?135 [136, 135] by Super 4 with 22 at 1,1,2
745 Id : 57, {_}: inverse (add (inverse (add (inverse (add ?192 ?193)) ?190)) (inverse (add ?192 ?190))) =>= ?190 [190, 193, 192] by Super 4 with 36 at 2,1,2,1,2
746 Id : 131, {_}: inverse (add (inverse (add (inverse (add ?400 ?401)) ?402)) (inverse (add ?400 ?402))) =>= ?402 [402, 401, 400] by Super 4 with 36 at 2,1,2,1,2
747 Id : 141, {_}: inverse (add (inverse (add ?444 ?446)) (inverse (add (inverse ?444) ?446))) =>= ?446 [446, 444] by Super 131 with 36 at 1,1,1,1,2
748 Id : 175, {_}: inverse (add ?545 (inverse (add ?544 (inverse (add (inverse ?544) ?545))))) =>= inverse (add (inverse ?544) ?545) [544, 545] by Super 57 with 141 at 1,1,2
749 Id : 341, {_}: inverse (add (inverse ?894) (inverse (add ?894 (inverse (add (inverse ?894) (inverse ?894)))))) =>= ?894 [894] by Super 36 with 175 at 2,1,2,1,2
750 Id : 390, {_}: inverse (add (inverse ?894) (inverse ?894)) =>= ?894 [894] by Demod 341 with 175 at 2
751 Id : 176, {_}: inverse (add (inverse (add ?547 ?548)) (inverse (add (inverse ?547) ?548))) =>= ?548 [548, 547] by Super 131 with 36 at 1,1,1,1,2
752 Id : 61, {_}: inverse (add (inverse ?208) (inverse (add ?208 (inverse (add (inverse ?208) (inverse (add ?208 ?209))))))) =>= ?208 [209, 208] by Super 4 with 22 at 1,1,2
753 Id : 70, {_}: inverse (add (inverse ?244) (inverse (add ?244 ?244))) =>= ?244 [244] by Super 61 with 36 at 2,1,2,1,2
754 Id : 189, {_}: inverse (add (inverse (add ?598 (inverse (add ?598 ?598)))) ?598) =>= inverse (add ?598 ?598) [598] by Super 176 with 70 at 2,1,2
755 Id : 209, {_}: inverse (add (inverse (add ?635 ?635)) (inverse (add ?635 ?635))) =>= ?635 [635] by Super 57 with 189 at 1,1,2
756 Id : 418, {_}: add ?635 ?635 =>= ?635 [635] by Demod 209 with 390 at 2
757 Id : 441, {_}: inverse (inverse ?1072) =>= ?1072 [1072] by Demod 390 with 418 at 1,2
758 Id : 447, {_}: inverse (inverse (add (inverse ?1092) ?1091)) =<= add ?1091 (inverse (add ?1092 (inverse (add (inverse ?1092) ?1091)))) [1091, 1092] by Super 441 with 175 at 1,2
759 Id : 427, {_}: inverse (inverse ?894) =>= ?894 [894] by Demod 390 with 418 at 1,2
760 Id : 835, {_}: add (inverse ?1599) ?1600 =<= add ?1600 (inverse (add ?1599 (inverse (add (inverse ?1599) ?1600)))) [1600, 1599] by Demod 447 with 427 at 2
761 Id : 839, {_}: add (inverse (inverse ?1617)) ?1618 =<= add ?1618 (inverse (add (inverse ?1617) (inverse (add ?1617 ?1618)))) [1618, 1617] by Super 835 with 427 at 1,1,2,1,2,3
762 Id : 866, {_}: add ?1617 ?1618 =<= add ?1618 (inverse (add (inverse ?1617) (inverse (add ?1617 ?1618)))) [1618, 1617] by Demod 839 with 427 at 1,2
763 Id : 459, {_}: add (inverse ?1092) ?1091 =<= add ?1091 (inverse (add ?1092 (inverse (add (inverse ?1092) ?1091)))) [1091, 1092] by Demod 447 with 427 at 2
764 Id : 8, {_}: inverse (add (inverse (add (inverse (add (inverse (add (inverse (add (inverse (inverse ?28)) ?27)) ?28)) ?30)) (inverse ?28))) ?28) =>= inverse ?28 [30, 27, 28] by Super 5 with 4 at 2,1,2
765 Id : 428, {_}: inverse (add (inverse (add (inverse (add (inverse (add (inverse (add ?28 ?27)) ?28)) ?30)) (inverse ?28))) ?28) =>= inverse ?28 [30, 27, 28] by Demod 8 with 427 at 1,1,1,1,1,1,1,1,1,1,2
766 Id : 443, {_}: inverse (inverse ?1079) =<= add (inverse (add ?1079 (inverse ?1079))) ?1079 [1079] by Super 441 with 22 at 1,2
767 Id : 476, {_}: ?1141 =<= add (inverse (add ?1141 (inverse ?1141))) ?1141 [1141] by Demod 443 with 427 at 2
768 Id : 483, {_}: inverse ?1163 =<= add (inverse (add (inverse ?1163) ?1163)) (inverse ?1163) [1163] by Super 476 with 427 at 2,1,1,3
769 Id : 545, {_}: inverse (add (inverse (add (inverse (add (inverse (inverse ?1237)) ?1238)) (inverse (inverse ?1237)))) (inverse ?1237)) =>= inverse (inverse ?1237) [1238, 1237] by Super 428 with 483 at 1,1,1,1,1,1,1,2
770 Id : 596, {_}: inverse (add (inverse (add (inverse (add ?1237 ?1238)) (inverse (inverse ?1237)))) (inverse ?1237)) =>= inverse (inverse ?1237) [1238, 1237] by Demod 545 with 427 at 1,1,1,1,1,1,2
771 Id : 597, {_}: inverse (add (inverse (add (inverse (add ?1237 ?1238)) ?1237)) (inverse ?1237)) =>= inverse (inverse ?1237) [1238, 1237] by Demod 596 with 427 at 2,1,1,1,2
772 Id : 1828, {_}: inverse (add (inverse (add (inverse (add ?2824 ?2825)) ?2824)) (inverse ?2824)) =>= ?2824 [2825, 2824] by Demod 597 with 427 at 3
773 Id : 1862, {_}: inverse (add ?2924 (inverse (inverse (add ?2923 ?2924)))) =>= inverse (add ?2923 ?2924) [2923, 2924] by Super 1828 with 57 at 1,1,2
774 Id : 1957, {_}: inverse (add ?2924 (add ?2923 ?2924)) =>= inverse (add ?2923 ?2924) [2923, 2924] by Demod 1862 with 427 at 2,1,2
775 Id : 1989, {_}: inverse (inverse (add ?3044 ?3043)) =<= add ?3043 (add ?3044 ?3043) [3043, 3044] by Super 427 with 1957 at 1,2
776 Id : 2126, {_}: add ?3204 ?3205 =<= add ?3205 (add ?3204 ?3205) [3205, 3204] by Demod 1989 with 427 at 2
777 Id : 733, {_}: inverse ?1452 =<= add (inverse (add ?1453 ?1452)) (inverse (add (inverse ?1453) ?1452)) [1453, 1452] by Super 441 with 141 at 1,2
778 Id : 738, {_}: inverse ?1475 =<= add (inverse (add (inverse ?1474) ?1475)) (inverse (add ?1474 ?1475)) [1474, 1475] by Super 733 with 427 at 1,1,2,3
779 Id : 2134, {_}: add (inverse (add (inverse ?3224) ?3223)) (inverse (add ?3224 ?3223)) =>= add (inverse (add ?3224 ?3223)) (inverse ?3223) [3223, 3224] by Super 2126 with 738 at 2,3
780 Id : 2159, {_}: inverse ?3223 =<= add (inverse (add ?3224 ?3223)) (inverse ?3223) [3224, 3223] by Demod 2134 with 738 at 2
781 Id : 2197, {_}: inverse (add (inverse (inverse ?3289)) (inverse (add ?3290 (inverse ?3289)))) =>= inverse ?3289 [3290, 3289] by Super 57 with 2159 at 1,1,1,2
782 Id : 2249, {_}: inverse (add ?3289 (inverse (add ?3290 (inverse ?3289)))) =>= inverse ?3289 [3290, 3289] by Demod 2197 with 427 at 1,1,2
783 Id : 2455, {_}: add (inverse ?3654) (inverse (add ?3653 (inverse (inverse ?3654)))) =<= add (inverse (add ?3653 (inverse (inverse ?3654)))) (inverse (add ?3654 (inverse (inverse ?3654)))) [3653, 3654] by Super 459 with 2249 at 2,1,2,3
784 Id : 2497, {_}: add (inverse ?3654) (inverse (add ?3653 ?3654)) =<= add (inverse (add ?3653 (inverse (inverse ?3654)))) (inverse (add ?3654 (inverse (inverse ?3654)))) [3653, 3654] by Demod 2455 with 427 at 2,1,2,2
785 Id : 2498, {_}: add (inverse ?3654) (inverse (add ?3653 ?3654)) =<= add (inverse (add ?3653 ?3654)) (inverse (add ?3654 (inverse (inverse ?3654)))) [3653, 3654] by Demod 2497 with 427 at 2,1,1,3
786 Id : 2499, {_}: add (inverse ?3654) (inverse (add ?3653 ?3654)) =<= add (inverse (add ?3653 ?3654)) (inverse (add ?3654 ?3654)) [3653, 3654] by Demod 2498 with 427 at 2,1,2,3
787 Id : 2500, {_}: add (inverse ?3654) (inverse (add ?3653 ?3654)) =?= add (inverse (add ?3653 ?3654)) (inverse ?3654) [3653, 3654] by Demod 2499 with 418 at 1,2,3
788 Id : 2501, {_}: add (inverse ?3654) (inverse (add ?3653 ?3654)) =>= inverse ?3654 [3653, 3654] by Demod 2500 with 2159 at 3
789 Id : 2761, {_}: add (inverse ?4078) (inverse (add ?4079 ?4078)) =>= inverse ?4078 [4079, 4078] by Demod 2500 with 2159 at 3
790 Id : 2775, {_}: add (inverse (inverse (add ?4116 (inverse (add (inverse ?4118) (inverse (add ?4118 ?4119))))))) ?4118 =>= inverse (inverse (add ?4116 (inverse (add (inverse ?4118) (inverse (add ?4118 ?4119)))))) [4119, 4118, 4116] by Super 2761 with 4 at 2,2
791 Id : 2871, {_}: add (add ?4116 (inverse (add (inverse ?4118) (inverse (add ?4118 ?4119))))) ?4118 =>= inverse (inverse (add ?4116 (inverse (add (inverse ?4118) (inverse (add ?4118 ?4119)))))) [4119, 4118, 4116] by Demod 2775 with 427 at 1,2
792 Id : 4872, {_}: add (add ?6485 (inverse (add (inverse ?6486) (inverse (add ?6486 ?6487))))) ?6486 =>= add ?6485 (inverse (add (inverse ?6486) (inverse (add ?6486 ?6487)))) [6487, 6486, 6485] by Demod 2871 with 427 at 3
793 Id : 4906, {_}: add (inverse (inverse (add ?6624 ?6625))) ?6624 =<= add (inverse (inverse (add ?6624 ?6625))) (inverse (add (inverse ?6624) (inverse (add ?6624 ?6625)))) [6625, 6624] by Super 4872 with 2501 at 1,2
794 Id : 5128, {_}: add (add ?6624 ?6625) ?6624 =<= add (inverse (inverse (add ?6624 ?6625))) (inverse (add (inverse ?6624) (inverse (add ?6624 ?6625)))) [6625, 6624] by Demod 4906 with 427 at 1,2
795 Id : 5129, {_}: add (add ?6624 ?6625) ?6624 =>= inverse (inverse (add ?6624 ?6625)) [6625, 6624] by Demod 5128 with 2501 at 3
796 Id : 5130, {_}: add (add ?6624 ?6625) ?6624 =>= add ?6624 ?6625 [6625, 6624] by Demod 5129 with 427 at 3
797 Id : 5176, {_}: add (inverse ?6745) (inverse (add ?6745 ?6746)) =>= inverse ?6745 [6746, 6745] by Super 2501 with 5130 at 1,2,2
798 Id : 5963, {_}: add ?1617 ?1618 =<= add ?1618 (inverse (inverse ?1617)) [1618, 1617] by Demod 866 with 5176 at 1,2,3
799 Id : 5973, {_}: add ?1617 ?1618 =?= add ?1618 ?1617 [1618, 1617] by Demod 5963 with 427 at 2,3
800 Id : 6201, {_}: add a b === add a b [] by Demod 2 with 5973 at 2
801 Id : 2, {_}: add b a =>= add a b [] by huntinton_1
802 % SZS output end CNFRefutation for BOO072-1.p
816 (add (inverse (add (inverse (add ?2 ?3)) ?4))
818 (add ?2 (inverse (add (inverse ?4) (inverse (add ?4 ?5)))))))
821 [5, 4, 3, 2] by dn1 ?2 ?3 ?4 ?5
823 Id : 2, {_}: add (add a b) c =>= add a (add b c) [] by huntinton_2
824 Found proof, 88.839419s
825 % SZS status Unsatisfiable for BOO073-1.p
826 % SZS output start CNFRefutation for BOO073-1.p
827 Id : 5, {_}: inverse (add (inverse (add (inverse (add ?7 ?8)) ?9)) (inverse (add ?7 (inverse (add (inverse ?9) (inverse (add ?9 ?10))))))) =>= ?9 [10, 9, 8, 7] by dn1 ?7 ?8 ?9 ?10
828 Id : 4, {_}: inverse (add (inverse (add (inverse (add ?2 ?3)) ?4)) (inverse (add ?2 (inverse (add (inverse ?4) (inverse (add ?4 ?5))))))) =>= ?4 [5, 4, 3, 2] by dn1 ?2 ?3 ?4 ?5
829 Id : 17, {_}: inverse (add (inverse (add (inverse (add (inverse (add (inverse (add (inverse (inverse ?80)) ?81)) ?80)) ?82)) (inverse ?80))) ?80) =>= inverse ?80 [82, 81, 80] by Super 5 with 4 at 2,1,2
830 Id : 22, {_}: inverse (add (inverse (add ?111 (inverse ?111))) ?111) =>= inverse ?111 [111] by Super 17 with 4 at 1,1,1,1,2
831 Id : 36, {_}: inverse (add (inverse ?135) (inverse (add ?135 (inverse (add (inverse ?135) (inverse (add ?135 ?136))))))) =>= ?135 [136, 135] by Super 4 with 22 at 1,1,2
832 Id : 57, {_}: inverse (add (inverse (add (inverse (add ?192 ?193)) ?190)) (inverse (add ?192 ?190))) =>= ?190 [190, 193, 192] by Super 4 with 36 at 2,1,2,1,2
833 Id : 131, {_}: inverse (add (inverse (add (inverse (add ?400 ?401)) ?402)) (inverse (add ?400 ?402))) =>= ?402 [402, 401, 400] by Super 4 with 36 at 2,1,2,1,2
834 Id : 141, {_}: inverse (add (inverse (add ?444 ?446)) (inverse (add (inverse ?444) ?446))) =>= ?446 [446, 444] by Super 131 with 36 at 1,1,1,1,2
835 Id : 175, {_}: inverse (add ?545 (inverse (add ?544 (inverse (add (inverse ?544) ?545))))) =>= inverse (add (inverse ?544) ?545) [544, 545] by Super 57 with 141 at 1,1,2
836 Id : 341, {_}: inverse (add (inverse ?894) (inverse (add ?894 (inverse (add (inverse ?894) (inverse ?894)))))) =>= ?894 [894] by Super 36 with 175 at 2,1,2,1,2
837 Id : 390, {_}: inverse (add (inverse ?894) (inverse ?894)) =>= ?894 [894] by Demod 341 with 175 at 2
838 Id : 176, {_}: inverse (add (inverse (add ?547 ?548)) (inverse (add (inverse ?547) ?548))) =>= ?548 [548, 547] by Super 131 with 36 at 1,1,1,1,2
839 Id : 61, {_}: inverse (add (inverse ?208) (inverse (add ?208 (inverse (add (inverse ?208) (inverse (add ?208 ?209))))))) =>= ?208 [209, 208] by Super 4 with 22 at 1,1,2
840 Id : 70, {_}: inverse (add (inverse ?244) (inverse (add ?244 ?244))) =>= ?244 [244] by Super 61 with 36 at 2,1,2,1,2
841 Id : 189, {_}: inverse (add (inverse (add ?598 (inverse (add ?598 ?598)))) ?598) =>= inverse (add ?598 ?598) [598] by Super 176 with 70 at 2,1,2
842 Id : 209, {_}: inverse (add (inverse (add ?635 ?635)) (inverse (add ?635 ?635))) =>= ?635 [635] by Super 57 with 189 at 1,1,2
843 Id : 418, {_}: add ?635 ?635 =>= ?635 [635] by Demod 209 with 390 at 2
844 Id : 441, {_}: inverse (inverse ?1072) =>= ?1072 [1072] by Demod 390 with 418 at 1,2
845 Id : 447, {_}: inverse (inverse (add (inverse ?1092) ?1091)) =<= add ?1091 (inverse (add ?1092 (inverse (add (inverse ?1092) ?1091)))) [1091, 1092] by Super 441 with 175 at 1,2
846 Id : 427, {_}: inverse (inverse ?894) =>= ?894 [894] by Demod 390 with 418 at 1,2
847 Id : 835, {_}: add (inverse ?1599) ?1600 =<= add ?1600 (inverse (add ?1599 (inverse (add (inverse ?1599) ?1600)))) [1600, 1599] by Demod 447 with 427 at 2
848 Id : 839, {_}: add (inverse (inverse ?1617)) ?1618 =<= add ?1618 (inverse (add (inverse ?1617) (inverse (add ?1617 ?1618)))) [1618, 1617] by Super 835 with 427 at 1,1,2,1,2,3
849 Id : 866, {_}: add ?1617 ?1618 =<= add ?1618 (inverse (add (inverse ?1617) (inverse (add ?1617 ?1618)))) [1618, 1617] by Demod 839 with 427 at 1,2
850 Id : 459, {_}: add (inverse ?1092) ?1091 =<= add ?1091 (inverse (add ?1092 (inverse (add (inverse ?1092) ?1091)))) [1091, 1092] by Demod 447 with 427 at 2
851 Id : 8, {_}: inverse (add (inverse (add (inverse (add (inverse (add (inverse (add (inverse (inverse ?28)) ?27)) ?28)) ?30)) (inverse ?28))) ?28) =>= inverse ?28 [30, 27, 28] by Super 5 with 4 at 2,1,2
852 Id : 428, {_}: inverse (add (inverse (add (inverse (add (inverse (add (inverse (add ?28 ?27)) ?28)) ?30)) (inverse ?28))) ?28) =>= inverse ?28 [30, 27, 28] by Demod 8 with 427 at 1,1,1,1,1,1,1,1,1,1,2
853 Id : 443, {_}: inverse (inverse ?1079) =<= add (inverse (add ?1079 (inverse ?1079))) ?1079 [1079] by Super 441 with 22 at 1,2
854 Id : 476, {_}: ?1141 =<= add (inverse (add ?1141 (inverse ?1141))) ?1141 [1141] by Demod 443 with 427 at 2
855 Id : 483, {_}: inverse ?1163 =<= add (inverse (add (inverse ?1163) ?1163)) (inverse ?1163) [1163] by Super 476 with 427 at 2,1,1,3
856 Id : 545, {_}: inverse (add (inverse (add (inverse (add (inverse (inverse ?1237)) ?1238)) (inverse (inverse ?1237)))) (inverse ?1237)) =>= inverse (inverse ?1237) [1238, 1237] by Super 428 with 483 at 1,1,1,1,1,1,1,2
857 Id : 596, {_}: inverse (add (inverse (add (inverse (add ?1237 ?1238)) (inverse (inverse ?1237)))) (inverse ?1237)) =>= inverse (inverse ?1237) [1238, 1237] by Demod 545 with 427 at 1,1,1,1,1,1,2
858 Id : 597, {_}: inverse (add (inverse (add (inverse (add ?1237 ?1238)) ?1237)) (inverse ?1237)) =>= inverse (inverse ?1237) [1238, 1237] by Demod 596 with 427 at 2,1,1,1,2
859 Id : 1828, {_}: inverse (add (inverse (add (inverse (add ?2824 ?2825)) ?2824)) (inverse ?2824)) =>= ?2824 [2825, 2824] by Demod 597 with 427 at 3
860 Id : 1862, {_}: inverse (add ?2924 (inverse (inverse (add ?2923 ?2924)))) =>= inverse (add ?2923 ?2924) [2923, 2924] by Super 1828 with 57 at 1,1,2
861 Id : 1957, {_}: inverse (add ?2924 (add ?2923 ?2924)) =>= inverse (add ?2923 ?2924) [2923, 2924] by Demod 1862 with 427 at 2,1,2
862 Id : 1989, {_}: inverse (inverse (add ?3044 ?3043)) =<= add ?3043 (add ?3044 ?3043) [3043, 3044] by Super 427 with 1957 at 1,2
863 Id : 2126, {_}: add ?3204 ?3205 =<= add ?3205 (add ?3204 ?3205) [3205, 3204] by Demod 1989 with 427 at 2
864 Id : 733, {_}: inverse ?1452 =<= add (inverse (add ?1453 ?1452)) (inverse (add (inverse ?1453) ?1452)) [1453, 1452] by Super 441 with 141 at 1,2
865 Id : 738, {_}: inverse ?1475 =<= add (inverse (add (inverse ?1474) ?1475)) (inverse (add ?1474 ?1475)) [1474, 1475] by Super 733 with 427 at 1,1,2,3
866 Id : 2134, {_}: add (inverse (add (inverse ?3224) ?3223)) (inverse (add ?3224 ?3223)) =>= add (inverse (add ?3224 ?3223)) (inverse ?3223) [3223, 3224] by Super 2126 with 738 at 2,3
867 Id : 2159, {_}: inverse ?3223 =<= add (inverse (add ?3224 ?3223)) (inverse ?3223) [3224, 3223] by Demod 2134 with 738 at 2
868 Id : 2197, {_}: inverse (add (inverse (inverse ?3289)) (inverse (add ?3290 (inverse ?3289)))) =>= inverse ?3289 [3290, 3289] by Super 57 with 2159 at 1,1,1,2
869 Id : 2249, {_}: inverse (add ?3289 (inverse (add ?3290 (inverse ?3289)))) =>= inverse ?3289 [3290, 3289] by Demod 2197 with 427 at 1,1,2
870 Id : 2455, {_}: add (inverse ?3654) (inverse (add ?3653 (inverse (inverse ?3654)))) =<= add (inverse (add ?3653 (inverse (inverse ?3654)))) (inverse (add ?3654 (inverse (inverse ?3654)))) [3653, 3654] by Super 459 with 2249 at 2,1,2,3
871 Id : 2497, {_}: add (inverse ?3654) (inverse (add ?3653 ?3654)) =<= add (inverse (add ?3653 (inverse (inverse ?3654)))) (inverse (add ?3654 (inverse (inverse ?3654)))) [3653, 3654] by Demod 2455 with 427 at 2,1,2,2
872 Id : 2498, {_}: add (inverse ?3654) (inverse (add ?3653 ?3654)) =<= add (inverse (add ?3653 ?3654)) (inverse (add ?3654 (inverse (inverse ?3654)))) [3653, 3654] by Demod 2497 with 427 at 2,1,1,3
873 Id : 2499, {_}: add (inverse ?3654) (inverse (add ?3653 ?3654)) =<= add (inverse (add ?3653 ?3654)) (inverse (add ?3654 ?3654)) [3653, 3654] by Demod 2498 with 427 at 2,1,2,3
874 Id : 2500, {_}: add (inverse ?3654) (inverse (add ?3653 ?3654)) =?= add (inverse (add ?3653 ?3654)) (inverse ?3654) [3653, 3654] by Demod 2499 with 418 at 1,2,3
875 Id : 2501, {_}: add (inverse ?3654) (inverse (add ?3653 ?3654)) =>= inverse ?3654 [3653, 3654] by Demod 2500 with 2159 at 3
876 Id : 2761, {_}: add (inverse ?4078) (inverse (add ?4079 ?4078)) =>= inverse ?4078 [4079, 4078] by Demod 2500 with 2159 at 3
877 Id : 2775, {_}: add (inverse (inverse (add ?4116 (inverse (add (inverse ?4118) (inverse (add ?4118 ?4119))))))) ?4118 =>= inverse (inverse (add ?4116 (inverse (add (inverse ?4118) (inverse (add ?4118 ?4119)))))) [4119, 4118, 4116] by Super 2761 with 4 at 2,2
878 Id : 2871, {_}: add (add ?4116 (inverse (add (inverse ?4118) (inverse (add ?4118 ?4119))))) ?4118 =>= inverse (inverse (add ?4116 (inverse (add (inverse ?4118) (inverse (add ?4118 ?4119)))))) [4119, 4118, 4116] by Demod 2775 with 427 at 1,2
879 Id : 4872, {_}: add (add ?6485 (inverse (add (inverse ?6486) (inverse (add ?6486 ?6487))))) ?6486 =>= add ?6485 (inverse (add (inverse ?6486) (inverse (add ?6486 ?6487)))) [6487, 6486, 6485] by Demod 2871 with 427 at 3
880 Id : 4906, {_}: add (inverse (inverse (add ?6624 ?6625))) ?6624 =<= add (inverse (inverse (add ?6624 ?6625))) (inverse (add (inverse ?6624) (inverse (add ?6624 ?6625)))) [6625, 6624] by Super 4872 with 2501 at 1,2
881 Id : 5128, {_}: add (add ?6624 ?6625) ?6624 =<= add (inverse (inverse (add ?6624 ?6625))) (inverse (add (inverse ?6624) (inverse (add ?6624 ?6625)))) [6625, 6624] by Demod 4906 with 427 at 1,2
882 Id : 5129, {_}: add (add ?6624 ?6625) ?6624 =>= inverse (inverse (add ?6624 ?6625)) [6625, 6624] by Demod 5128 with 2501 at 3
883 Id : 5130, {_}: add (add ?6624 ?6625) ?6624 =>= add ?6624 ?6625 [6625, 6624] by Demod 5129 with 427 at 3
884 Id : 5176, {_}: add (inverse ?6745) (inverse (add ?6745 ?6746)) =>= inverse ?6745 [6746, 6745] by Super 2501 with 5130 at 1,2,2
885 Id : 5963, {_}: add ?1617 ?1618 =<= add ?1618 (inverse (inverse ?1617)) [1618, 1617] by Demod 866 with 5176 at 1,2,3
886 Id : 5973, {_}: add ?1617 ?1618 =?= add ?1618 ?1617 [1618, 1617] by Demod 5963 with 427 at 2,3
887 Id : 445, {_}: inverse ?1086 =<= add (inverse (add (inverse (add ?1084 ?1085)) ?1086)) (inverse (add ?1084 ?1086)) [1085, 1084, 1086] by Super 441 with 57 at 1,2
888 Id : 3282, {_}: inverse ?4640 =<= add (inverse (add (inverse (add ?4641 ?4642)) ?4640)) (inverse (add ?4641 ?4640)) [4642, 4641, 4640] by Super 441 with 57 at 1,2
889 Id : 3306, {_}: inverse ?4739 =<= add (inverse (add (inverse (add ?4738 ?4740)) ?4739)) (inverse (add ?4740 ?4739)) [4740, 4738, 4739] by Super 3282 with 866 at 1,1,1,1,3
890 Id : 9402, {_}: inverse (inverse (add ?10628 ?10626)) =<= add (inverse (inverse ?10626)) (inverse (add (inverse (add ?10627 ?10628)) (inverse (add ?10628 ?10626)))) [10627, 10626, 10628] by Super 445 with 3306 at 1,1,3
891 Id : 9643, {_}: add ?10628 ?10626 =<= add (inverse (inverse ?10626)) (inverse (add (inverse (add ?10627 ?10628)) (inverse (add ?10628 ?10626)))) [10627, 10626, 10628] by Demod 9402 with 427 at 2
892 Id : 9644, {_}: add ?10628 ?10626 =<= add ?10626 (inverse (add (inverse (add ?10627 ?10628)) (inverse (add ?10628 ?10626)))) [10627, 10626, 10628] by Demod 9643 with 427 at 1,3
893 Id : 3277, {_}: add (inverse (add (inverse (add ?4621 ?4622)) ?4620)) (inverse (add ?4621 ?4620)) =<= add (inverse (add ?4621 ?4620)) (inverse (add (inverse (inverse (add (inverse (add ?4621 ?4622)) ?4620))) (inverse (inverse ?4620)))) [4620, 4622, 4621] by Super 866 with 445 at 1,2,1,2,3
894 Id : 3341, {_}: inverse ?4620 =<= add (inverse (add ?4621 ?4620)) (inverse (add (inverse (inverse (add (inverse (add ?4621 ?4622)) ?4620))) (inverse (inverse ?4620)))) [4622, 4621, 4620] by Demod 3277 with 445 at 2
895 Id : 3342, {_}: inverse ?4620 =<= add (inverse (add ?4621 ?4620)) (inverse (add (add (inverse (add ?4621 ?4622)) ?4620) (inverse (inverse ?4620)))) [4622, 4621, 4620] by Demod 3341 with 427 at 1,1,2,3
896 Id : 3343, {_}: inverse ?4620 =<= add (inverse (add ?4621 ?4620)) (inverse (add (add (inverse (add ?4621 ?4622)) ?4620) ?4620)) [4622, 4621, 4620] by Demod 3342 with 427 at 2,1,2,3
897 Id : 2463, {_}: inverse (add ?3677 (inverse (add ?3678 (inverse ?3677)))) =>= inverse ?3677 [3678, 3677] by Demod 2197 with 427 at 1,1,2
898 Id : 2485, {_}: inverse (add (add ?3744 ?3746) ?3746) =>= inverse (add ?3744 ?3746) [3746, 3744] by Super 2463 with 57 at 2,1,2
899 Id : 2605, {_}: add (add ?3852 ?3853) ?3853 =<= add ?3853 (inverse (add (inverse (add ?3852 ?3853)) (inverse (add ?3852 ?3853)))) [3853, 3852] by Super 866 with 2485 at 2,1,2,3
900 Id : 2630, {_}: add (add ?3852 ?3853) ?3853 =<= add ?3853 (inverse (inverse (add ?3852 ?3853))) [3853, 3852] by Demod 2605 with 418 at 1,2,3
901 Id : 2631, {_}: add (add ?3852 ?3853) ?3853 =?= add ?3853 (add ?3852 ?3853) [3853, 3852] by Demod 2630 with 427 at 2,3
902 Id : 2044, {_}: add ?3044 ?3043 =<= add ?3043 (add ?3044 ?3043) [3043, 3044] by Demod 1989 with 427 at 2
903 Id : 2632, {_}: add (add ?3852 ?3853) ?3853 =>= add ?3852 ?3853 [3853, 3852] by Demod 2631 with 2044 at 3
904 Id : 3344, {_}: inverse ?4620 =<= add (inverse (add ?4621 ?4620)) (inverse (add (inverse (add ?4621 ?4622)) ?4620)) [4622, 4621, 4620] by Demod 3343 with 2632 at 1,2,3
905 Id : 9856, {_}: inverse (inverse (add (inverse (add ?11316 ?11317)) ?11315)) =<= add (inverse (inverse ?11315)) (inverse (add ?11316 (inverse (add (inverse (add ?11316 ?11317)) ?11315)))) [11315, 11317, 11316] by Super 445 with 3344 at 1,1,3
906 Id : 10050, {_}: add (inverse (add ?11316 ?11317)) ?11315 =<= add (inverse (inverse ?11315)) (inverse (add ?11316 (inverse (add (inverse (add ?11316 ?11317)) ?11315)))) [11315, 11317, 11316] by Demod 9856 with 427 at 2
907 Id : 10051, {_}: add (inverse (add ?11316 ?11317)) ?11315 =<= add ?11315 (inverse (add ?11316 (inverse (add (inverse (add ?11316 ?11317)) ?11315)))) [11315, 11317, 11316] by Demod 10050 with 427 at 1,3
908 Id : 27274, {_}: add (inverse (add ?27240 ?27241)) ?27242 =<= add ?27242 (inverse (add ?27240 (inverse (add (inverse (add ?27240 ?27241)) ?27242)))) [27242, 27241, 27240] by Demod 10050 with 427 at 1,3
909 Id : 446, {_}: inverse ?1089 =<= add (inverse (add ?1088 ?1089)) (inverse (add (inverse ?1088) ?1089)) [1088, 1089] by Super 441 with 141 at 1,2
910 Id : 3303, {_}: inverse ?4728 =<= add (inverse (add (inverse (inverse ?4726)) ?4728)) (inverse (add (inverse (add ?4727 ?4726)) ?4728)) [4727, 4726, 4728] by Super 3282 with 446 at 1,1,1,1,3
911 Id : 3407, {_}: inverse ?4728 =<= add (inverse (add ?4726 ?4728)) (inverse (add (inverse (add ?4727 ?4726)) ?4728)) [4727, 4726, 4728] by Demod 3303 with 427 at 1,1,1,3
912 Id : 27388, {_}: add (inverse (add (inverse (add ?27678 ?27679)) ?27678)) ?27679 =>= add ?27679 (inverse (inverse ?27679)) [27679, 27678] by Super 27274 with 3407 at 1,2,3
913 Id : 27835, {_}: add (inverse (add (inverse (add ?27678 ?27679)) ?27678)) ?27679 =>= add ?27679 ?27679 [27679, 27678] by Demod 27388 with 427 at 2,3
914 Id : 27836, {_}: add (inverse (add (inverse (add ?27678 ?27679)) ?27678)) ?27679 =>= ?27679 [27679, 27678] by Demod 27835 with 418 at 3
915 Id : 35831, {_}: add ?35916 (inverse (add (inverse (add ?35917 ?35916)) ?35917)) =>= ?35916 [35917, 35916] by Super 5973 with 27836 at 3
916 Id : 35837, {_}: add ?35933 (inverse (add (inverse (add ?35933 ?35934)) ?35934)) =>= ?35933 [35934, 35933] by Super 35831 with 5973 at 1,1,1,2,2
917 Id : 43017, {_}: add (inverse (add ?44930 ?44931)) ?44931 =>= add ?44931 (inverse ?44930) [44931, 44930] by Super 10051 with 35837 at 1,2,3
918 Id : 43043, {_}: add (inverse (inverse ?45008)) (inverse ?45008) =<= add (inverse ?45008) (inverse (inverse (add ?45009 ?45008))) [45009, 45008] by Super 43017 with 2159 at 1,1,2
919 Id : 43373, {_}: add ?45008 (inverse ?45008) =<= add (inverse ?45008) (inverse (inverse (add ?45009 ?45008))) [45009, 45008] by Demod 43043 with 427 at 1,2
920 Id : 44805, {_}: add ?46602 (inverse ?46602) =<= add (inverse ?46602) (add ?46603 ?46602) [46603, 46602] by Demod 43373 with 427 at 2,3
921 Id : 895, {_}: inverse (inverse (add ?1666 ?1665)) =<= add (inverse (inverse ?1665)) (inverse (add (inverse (inverse (add (inverse ?1666) ?1665))) (inverse (add ?1666 ?1665)))) [1665, 1666] by Super 446 with 738 at 1,1,3
922 Id : 960, {_}: add ?1666 ?1665 =<= add (inverse (inverse ?1665)) (inverse (add (inverse (inverse (add (inverse ?1666) ?1665))) (inverse (add ?1666 ?1665)))) [1665, 1666] by Demod 895 with 427 at 2
923 Id : 961, {_}: add ?1666 ?1665 =<= add ?1665 (inverse (add (inverse (inverse (add (inverse ?1666) ?1665))) (inverse (add ?1666 ?1665)))) [1665, 1666] by Demod 960 with 427 at 1,3
924 Id : 962, {_}: add ?1666 ?1665 =<= add ?1665 (inverse (add (add (inverse ?1666) ?1665) (inverse (add ?1666 ?1665)))) [1665, 1666] by Demod 961 with 427 at 1,1,2,3
925 Id : 5181, {_}: add (add ?6762 ?6763) ?6762 =<= add ?6762 (inverse (add (add (inverse (add ?6762 ?6763)) ?6762) (inverse (add ?6762 ?6763)))) [6763, 6762] by Super 962 with 5130 at 1,2,1,2,3
926 Id : 5222, {_}: add ?6762 ?6763 =<= add ?6762 (inverse (add (add (inverse (add ?6762 ?6763)) ?6762) (inverse (add ?6762 ?6763)))) [6763, 6762] by Demod 5181 with 5130 at 2
927 Id : 6255, {_}: add ?7893 ?7894 =<= add ?7893 (inverse (add (inverse (add ?7893 ?7894)) ?7893)) [7894, 7893] by Demod 5222 with 5130 at 1,2,3
928 Id : 6261, {_}: add ?7910 ?7911 =<= add ?7910 (inverse (add (inverse (add ?7911 ?7910)) ?7910)) [7911, 7910] by Super 6255 with 5973 at 1,1,1,2,3
929 Id : 27395, {_}: add (inverse (add ?27697 ?27698)) (inverse (add ?27698 ?27697)) =?= add (inverse (add ?27698 ?27697)) (inverse (add ?27698 ?27697)) [27698, 27697] by Super 27274 with 9644 at 1,2,3
930 Id : 27857, {_}: add (inverse (add ?27697 ?27698)) (inverse (add ?27698 ?27697)) =>= inverse (add ?27698 ?27697) [27698, 27697] by Demod 27395 with 418 at 3
931 Id : 28327, {_}: add (inverse (add ?28496 ?28495)) (inverse (add ?28495 ?28496)) =<= add (inverse (add ?28496 ?28495)) (inverse (add (inverse (inverse (add ?28496 ?28495))) (inverse (add ?28496 ?28495)))) [28495, 28496] by Super 6261 with 27857 at 1,1,1,2,3
932 Id : 28628, {_}: inverse (add ?28495 ?28496) =<= add (inverse (add ?28496 ?28495)) (inverse (add (inverse (inverse (add ?28496 ?28495))) (inverse (add ?28496 ?28495)))) [28496, 28495] by Demod 28327 with 27857 at 2
933 Id : 2450, {_}: inverse (inverse ?3637) =<= add ?3637 (inverse (add ?3638 (inverse ?3637))) [3638, 3637] by Super 427 with 2249 at 1,2
934 Id : 2506, {_}: ?3637 =<= add ?3637 (inverse (add ?3638 (inverse ?3637))) [3638, 3637] by Demod 2450 with 427 at 2
935 Id : 5163, {_}: ?6702 =<= add ?6702 (inverse (add (inverse ?6702) ?6701)) [6701, 6702] by Super 2506 with 5130 at 1,2,3
936 Id : 28629, {_}: inverse (add ?28495 ?28496) =?= inverse (add ?28496 ?28495) [28496, 28495] by Demod 28628 with 5163 at 3
937 Id : 44870, {_}: add (add ?46807 ?46808) (inverse (add ?46807 ?46808)) =<= add (inverse (add ?46808 ?46807)) (add ?46809 (add ?46807 ?46808)) [46809, 46808, 46807] by Super 44805 with 28629 at 1,3
938 Id : 45240, {_}: add (inverse (add ?46807 ?46808)) (add ?46807 ?46808) =<= add (inverse (add ?46808 ?46807)) (add ?46809 (add ?46807 ?46808)) [46809, 46808, 46807] by Demod 44870 with 5973 at 2
939 Id : 75570, {_}: inverse (add ?71946 (add ?71944 ?71945)) =<= add (inverse (add ?71945 (add ?71946 (add ?71944 ?71945)))) (inverse (add (inverse (add ?71944 ?71945)) (add ?71944 ?71945))) [71945, 71944, 71946] by Super 3344 with 45240 at 1,2,3
940 Id : 2205, {_}: inverse ?3320 =<= add (inverse (add ?3321 ?3320)) (inverse ?3320) [3321, 3320] by Demod 2134 with 738 at 2
941 Id : 2209, {_}: inverse (inverse ?3338) =<= add (inverse (add ?3339 (inverse ?3338))) ?3338 [3339, 3338] by Super 2205 with 427 at 2,3
942 Id : 2281, {_}: ?3338 =<= add (inverse (add ?3339 (inverse ?3338))) ?3338 [3339, 3338] by Demod 2209 with 427 at 2
943 Id : 5175, {_}: ?6743 =<= add (inverse (add (inverse ?6743) ?6742)) ?6743 [6742, 6743] by Super 2281 with 5130 at 1,1,3
944 Id : 43053, {_}: add (inverse ?45043) ?45043 =<= add ?45043 (inverse (inverse (add (inverse ?45043) ?45042))) [45042, 45043] by Super 43017 with 5175 at 1,1,2
945 Id : 43393, {_}: add (inverse ?45043) ?45043 =<= add ?45043 (add (inverse ?45043) ?45042) [45042, 45043] by Demod 43053 with 427 at 2,3
946 Id : 46219, {_}: add (add (inverse ?47976) ?47977) ?47976 =>= add (inverse ?47976) ?47976 [47977, 47976] by Super 5973 with 43393 at 3
947 Id : 2228, {_}: inverse (inverse (add ?3386 (inverse (add (inverse ?3388) (inverse (add ?3388 ?3389)))))) =<= add ?3388 (inverse (inverse (add ?3386 (inverse (add (inverse ?3388) (inverse (add ?3388 ?3389))))))) [3389, 3388, 3386] by Super 2205 with 4 at 1,3
948 Id : 2327, {_}: add ?3386 (inverse (add (inverse ?3388) (inverse (add ?3388 ?3389)))) =<= add ?3388 (inverse (inverse (add ?3386 (inverse (add (inverse ?3388) (inverse (add ?3388 ?3389))))))) [3389, 3388, 3386] by Demod 2228 with 427 at 2
949 Id : 4116, {_}: add ?5774 (inverse (add (inverse ?5775) (inverse (add ?5775 ?5776)))) =<= add ?5775 (add ?5774 (inverse (add (inverse ?5775) (inverse (add ?5775 ?5776))))) [5776, 5775, 5774] by Demod 2327 with 427 at 2,3
950 Id : 4147, {_}: add (inverse (inverse (add ?5900 ?5901))) (inverse (add (inverse ?5900) (inverse (add ?5900 ?5901)))) =>= add ?5900 (inverse (inverse (add ?5900 ?5901))) [5901, 5900] by Super 4116 with 2501 at 2,3
951 Id : 4368, {_}: inverse (inverse (add ?5900 ?5901)) =<= add ?5900 (inverse (inverse (add ?5900 ?5901))) [5901, 5900] by Demod 4147 with 2501 at 2
952 Id : 4369, {_}: add ?5900 ?5901 =<= add ?5900 (inverse (inverse (add ?5900 ?5901))) [5901, 5900] by Demod 4368 with 427 at 2
953 Id : 4370, {_}: add ?5900 ?5901 =<= add ?5900 (add ?5900 ?5901) [5901, 5900] by Demod 4369 with 427 at 2,3
954 Id : 43050, {_}: add (inverse (add ?45034 ?45033)) (add ?45034 ?45033) =>= add (add ?45034 ?45033) (inverse ?45034) [45033, 45034] by Super 43017 with 4370 at 1,1,2
955 Id : 43389, {_}: add (inverse (add ?45034 ?45033)) (add ?45034 ?45033) =>= add (inverse ?45034) (add ?45034 ?45033) [45033, 45034] by Demod 43050 with 5973 at 3
956 Id : 43042, {_}: add (inverse (add ?45005 ?45006)) (add ?45005 ?45006) =>= add (add ?45005 ?45006) (inverse ?45006) [45006, 45005] by Super 43017 with 2044 at 1,1,2
957 Id : 43372, {_}: add (inverse (add ?45005 ?45006)) (add ?45005 ?45006) =>= add (inverse ?45006) (add ?45005 ?45006) [45006, 45005] by Demod 43042 with 5973 at 3
958 Id : 43374, {_}: add ?45008 (inverse ?45008) =<= add (inverse ?45008) (add ?45009 ?45008) [45009, 45008] by Demod 43373 with 427 at 2,3
959 Id : 48043, {_}: add (inverse (add ?45005 ?45006)) (add ?45005 ?45006) =>= add ?45006 (inverse ?45006) [45006, 45005] by Demod 43372 with 43374 at 3
960 Id : 49303, {_}: add ?45033 (inverse ?45033) =?= add (inverse ?45034) (add ?45034 ?45033) [45034, 45033] by Demod 43389 with 48043 at 2
961 Id : 5166, {_}: inverse ?6709 =<= add (inverse (add ?6709 ?6710)) (inverse ?6709) [6710, 6709] by Super 2159 with 5130 at 1,1,3
962 Id : 43052, {_}: add (inverse (inverse ?45039)) (inverse ?45039) =<= add (inverse ?45039) (inverse (inverse (add ?45039 ?45040))) [45040, 45039] by Super 43017 with 5166 at 1,1,2
963 Id : 43391, {_}: add ?45039 (inverse ?45039) =<= add (inverse ?45039) (inverse (inverse (add ?45039 ?45040))) [45040, 45039] by Demod 43052 with 427 at 1,2
964 Id : 43392, {_}: add ?45039 (inverse ?45039) =<= add (inverse ?45039) (add ?45039 ?45040) [45040, 45039] by Demod 43391 with 427 at 2,3
965 Id : 49304, {_}: add ?45033 (inverse ?45033) =?= add ?45034 (inverse ?45034) [45034, 45033] by Demod 49303 with 43392 at 3
966 Id : 49415, {_}: ?50953 =<= add (inverse (add ?50954 (inverse ?50954))) ?50953 [50954, 50953] by Super 2281 with 49304 at 1,1,3
967 Id : 50053, {_}: add ?51918 (add ?51919 (inverse ?51919)) =?= add (inverse (add ?51919 (inverse ?51919))) (add ?51919 (inverse ?51919)) [51919, 51918] by Super 46219 with 49415 at 1,2
968 Id : 50133, {_}: add ?51918 (add ?51919 (inverse ?51919)) =?= add (inverse ?51919) (inverse (inverse ?51919)) [51919, 51918] by Demod 50053 with 48043 at 3
969 Id : 50134, {_}: add ?51918 (add ?51919 (inverse ?51919)) =>= add (inverse ?51919) ?51919 [51919, 51918] by Demod 50133 with 427 at 2,3
970 Id : 50710, {_}: ?52352 =<= add ?52352 (inverse (add (inverse ?52351) ?52351)) [52351, 52352] by Super 5163 with 50134 at 1,2,3
971 Id : 75914, {_}: inverse (add ?71946 (add ?71944 ?71945)) =<= inverse (add ?71945 (add ?71946 (add ?71944 ?71945))) [71945, 71944, 71946] by Demod 75570 with 50710 at 3
972 Id : 77144, {_}: add ?73328 (add ?73326 (add ?73327 ?73328)) =<= add (add ?73326 (add ?73327 ?73328)) (inverse (add (inverse (add ?73329 ?73328)) (inverse (add ?73326 (add ?73327 ?73328))))) [73329, 73327, 73326, 73328] by Super 9644 with 75914 at 2,1,2,3
973 Id : 77399, {_}: add ?73328 (add ?73326 (add ?73327 ?73328)) =<= add (inverse (add (inverse (add ?73329 ?73328)) (inverse (add ?73326 (add ?73327 ?73328))))) (add ?73326 (add ?73327 ?73328)) [73329, 73327, 73326, 73328] by Demod 77144 with 5973 at 3
974 Id : 77889, {_}: add ?74480 (add ?74481 (add ?74482 ?74480)) =>= add ?74481 (add ?74482 ?74480) [74482, 74481, 74480] by Demod 77399 with 2281 at 3
975 Id : 77893, {_}: add ?74496 (add ?74497 (add ?74496 ?74495)) =?= add ?74497 (add (add ?74496 ?74495) ?74496) [74495, 74497, 74496] by Super 77889 with 5130 at 2,2,2
976 Id : 78169, {_}: add ?74496 (add ?74497 (add ?74496 ?74495)) =>= add ?74497 (add ?74496 ?74495) [74495, 74497, 74496] by Demod 77893 with 5130 at 2,3
977 Id : 77895, {_}: add ?74503 (add ?74504 (add ?74503 ?74505)) =>= add ?74504 (add ?74505 ?74503) [74505, 74504, 74503] by Super 77889 with 5973 at 2,2,2
978 Id : 80396, {_}: add ?74497 (add ?74495 ?74496) =?= add ?74497 (add ?74496 ?74495) [74496, 74495, 74497] by Demod 78169 with 77895 at 2
979 Id : 80521, {_}: add (add (add ?78514 ?78515) ?78516) (add ?78515 ?78514) =>= add (add ?78514 ?78515) ?78516 [78516, 78515, 78514] by Super 5130 with 80396 at 2
980 Id : 79247, {_}: add ?76425 (add ?76426 (add ?76425 ?76427)) =>= add ?76426 (add ?76427 ?76425) [76427, 76426, 76425] by Super 77889 with 5973 at 2,2,2
981 Id : 79331, {_}: add ?76775 (add (add ?76775 ?76776) ?76774) =<= add (add (add ?76775 ?76776) ?76774) (add ?76776 ?76775) [76774, 76776, 76775] by Super 79247 with 5130 at 2,2
982 Id : 79332, {_}: add ?76778 (add (add ?76778 ?76780) ?76779) =>= add ?76779 (add ?76780 ?76778) [76779, 76780, 76778] by Super 79247 with 5973 at 2,2
983 Id : 135898, {_}: add ?76774 (add ?76776 ?76775) =<= add (add (add ?76775 ?76776) ?76774) (add ?76776 ?76775) [76775, 76776, 76774] by Demod 79331 with 79332 at 2
984 Id : 140658, {_}: add ?78516 (add ?78515 ?78514) =?= add (add ?78514 ?78515) ?78516 [78514, 78515, 78516] by Demod 80521 with 135898 at 2
985 Id : 43039, {_}: add (inverse (inverse ?44995)) (inverse (add ?44996 ?44995)) =<= add (inverse (add ?44996 ?44995)) (inverse (inverse (add (inverse (add ?44996 ?44997)) ?44995))) [44997, 44996, 44995] by Super 43017 with 445 at 1,1,2
986 Id : 43360, {_}: add ?44995 (inverse (add ?44996 ?44995)) =<= add (inverse (add ?44996 ?44995)) (inverse (inverse (add (inverse (add ?44996 ?44997)) ?44995))) [44997, 44996, 44995] by Demod 43039 with 427 at 1,2
987 Id : 43361, {_}: add ?44995 (inverse (add ?44996 ?44995)) =<= add (inverse (inverse (add (inverse (add ?44996 ?44997)) ?44995))) (inverse (add ?44996 ?44995)) [44997, 44996, 44995] by Demod 43360 with 5973 at 3
988 Id : 43362, {_}: add ?44995 (inverse (add ?44996 ?44995)) =<= add (add (inverse (add ?44996 ?44997)) ?44995) (inverse (add ?44996 ?44995)) [44997, 44996, 44995] by Demod 43361 with 427 at 1,3
989 Id : 43363, {_}: add ?44995 (inverse (add ?44996 ?44995)) =<= add (inverse (add ?44996 ?44995)) (add (inverse (add ?44996 ?44997)) ?44995) [44997, 44996, 44995] by Demod 43362 with 5973 at 3
990 Id : 42258, {_}: add (inverse (add ?43873 ?43874)) ?43874 =>= add ?43874 (inverse ?43873) [43874, 43873] by Super 10051 with 35837 at 1,2,3
991 Id : 42969, {_}: add ?44778 (inverse (add ?44777 ?44778)) =>= add ?44778 (inverse ?44777) [44777, 44778] by Super 5973 with 42258 at 3
992 Id : 415299, {_}: add ?44995 (inverse ?44996) =<= add (inverse (add ?44996 ?44995)) (add (inverse (add ?44996 ?44997)) ?44995) [44997, 44996, 44995] by Demod 43363 with 42969 at 2
993 Id : 415494, {_}: add (inverse (add ?628669 ?628668)) (add (inverse (add ?628669 ?628670)) ?628668) =<= add (add (inverse (add ?628669 ?628670)) ?628668) (inverse (add ?628669 (inverse (add ?628668 (inverse ?628669))))) [628670, 628668, 628669] by Super 10051 with 415299 at 1,2,1,2,3
994 Id : 416655, {_}: add ?628668 (inverse ?628669) =<= add (add (inverse (add ?628669 ?628670)) ?628668) (inverse (add ?628669 (inverse (add ?628668 (inverse ?628669))))) [628670, 628669, 628668] by Demod 415494 with 415299 at 2
995 Id : 416656, {_}: add ?628668 (inverse ?628669) =<= add (inverse (add ?628669 (inverse (add ?628668 (inverse ?628669))))) (add (inverse (add ?628669 ?628670)) ?628668) [628670, 628669, 628668] by Demod 416655 with 5973 at 3
996 Id : 418876, {_}: add ?634385 (inverse ?634386) =<= add (inverse ?634386) (add (inverse (add ?634386 ?634387)) ?634385) [634387, 634386, 634385] by Demod 416656 with 2506 at 1,1,3
997 Id : 9436, {_}: inverse ?10759 =<= add (inverse (add (inverse (add ?10760 ?10761)) ?10759)) (inverse (add ?10761 ?10759)) [10761, 10760, 10759] by Super 3282 with 866 at 1,1,1,1,3
998 Id : 18533, {_}: inverse ?18554 =<= add (inverse (add (inverse (add ?18555 ?18556)) ?18554)) (inverse (add ?18554 ?18556)) [18556, 18555, 18554] by Super 9436 with 5973 at 1,2,3
999 Id : 18582, {_}: inverse ?18755 =<= add (inverse (add (inverse ?18756) ?18755)) (inverse (add ?18755 ?18756)) [18756, 18755] by Super 18533 with 418 at 1,1,1,1,3
1000 Id : 19155, {_}: add (inverse (add ?19200 ?19201)) (inverse (add (inverse ?19201) ?19200)) =>= inverse ?19200 [19201, 19200] by Super 5973 with 18582 at 3
1001 Id : 418883, {_}: add ?634414 (inverse (inverse (add ?634412 ?634413))) =<= add (inverse (inverse (add ?634412 ?634413))) (add (inverse (inverse ?634412)) ?634414) [634413, 634412, 634414] by Super 418876 with 19155 at 1,1,2,3
1002 Id : 420154, {_}: add ?634414 (add ?634412 ?634413) =<= add (inverse (inverse (add ?634412 ?634413))) (add (inverse (inverse ?634412)) ?634414) [634413, 634412, 634414] by Demod 418883 with 427 at 2,2
1003 Id : 420155, {_}: add ?634414 (add ?634412 ?634413) =<= add (add ?634412 ?634413) (add (inverse (inverse ?634412)) ?634414) [634413, 634412, 634414] by Demod 420154 with 427 at 1,3
1004 Id : 420156, {_}: add ?634414 (add ?634412 ?634413) =<= add (add ?634412 ?634413) (add ?634412 ?634414) [634413, 634412, 634414] by Demod 420155 with 427 at 1,2,3
1005 Id : 421396, {_}: add (add ?637936 ?637935) (add ?637937 ?637936) =>= add ?637935 (add ?637936 ?637937) [637937, 637935, 637936] by Super 140658 with 420156 at 3
1006 Id : 421337, {_}: add (add ?637673 ?637674) (add ?637672 ?637673) =>= add ?637672 (add ?637673 ?637674) [637672, 637674, 637673] by Super 80396 with 420156 at 3
1007 Id : 428375, {_}: add ?637937 (add ?637936 ?637935) =?= add ?637935 (add ?637936 ?637937) [637935, 637936, 637937] by Demod 421396 with 421337 at 2
1008 Id : 421398, {_}: add ?637944 (add ?637945 ?637946) =<= add (add ?637944 ?637945) (add ?637945 ?637946) [637946, 637945, 637944] by Super 140658 with 420156 at 2
1009 Id : 418964, {_}: add ?634834 (inverse (inverse (add ?634833 ?634832))) =<= add (inverse (inverse (add ?634833 ?634832))) (add (inverse (inverse ?634832)) ?634834) [634832, 634833, 634834] by Super 418876 with 446 at 1,1,2,3
1010 Id : 420298, {_}: add ?634834 (add ?634833 ?634832) =<= add (inverse (inverse (add ?634833 ?634832))) (add (inverse (inverse ?634832)) ?634834) [634832, 634833, 634834] by Demod 418964 with 427 at 2,2
1011 Id : 420299, {_}: add ?634834 (add ?634833 ?634832) =<= add (add ?634833 ?634832) (add (inverse (inverse ?634832)) ?634834) [634832, 634833, 634834] by Demod 420298 with 427 at 1,3
1012 Id : 420300, {_}: add ?634834 (add ?634833 ?634832) =<= add (add ?634833 ?634832) (add ?634832 ?634834) [634832, 634833, 634834] by Demod 420299 with 427 at 1,2,3
1013 Id : 431824, {_}: add ?637944 (add ?637945 ?637946) =?= add ?637946 (add ?637944 ?637945) [637946, 637945, 637944] by Demod 421398 with 420300 at 3
1014 Id : 435227, {_}: add c (add b a) === add c (add b a) [] by Demod 435226 with 80396 at 3
1015 Id : 435226, {_}: add c (add b a) =<= add c (add a b) [] by Demod 431823 with 431824 at 3
1016 Id : 431823, {_}: add c (add b a) =<= add b (add c a) [] by Demod 6203 with 428375 at 3
1017 Id : 6203, {_}: add c (add b a) =<= add a (add c b) [] by Demod 6202 with 5973 at 2,3
1018 Id : 6202, {_}: add c (add b a) =<= add a (add b c) [] by Demod 6201 with 5973 at 2,2
1019 Id : 6201, {_}: add c (add a b) =<= add a (add b c) [] by Demod 2 with 5973 at 2
1020 Id : 2, {_}: add (add a b) c =>= add a (add b c) [] by huntinton_2
1021 % SZS output end CNFRefutation for BOO073-1.p
1029 prove_meredith_2_basis_2 is 94
1033 nand (nand ?2 (nand (nand ?3 ?2) ?2)) (nand ?3 (nand ?4 ?2)) =>= ?3
1034 [4, 3, 2] by sh_1 ?2 ?3 ?4
1037 nand a (nand b (nand a c)) =<= nand (nand (nand c b) b) a
1038 [] by prove_meredith_2_basis_2
1039 Last chance: 1246037795.9
1040 Last chance: all is indexed 1246038082.63
1041 Last chance: failed over 100 goal 1246038082.65
1042 FAILURE in 0 iterations
1043 % SZS status Timeout for BOO076-1.p
1051 prove_strong_fixed_point is 95
1052 strong_fixed_point is 98
1057 apply (apply (apply b ?2) ?3) ?4 =>= apply ?2 (apply ?3 ?4)
1058 [4, 3, 2] by b_definition ?2 ?3 ?4
1060 apply (apply w ?6) ?7 =?= apply (apply ?6 ?7) ?7
1061 [7, 6] by w_definition ?6 ?7
1065 apply (apply b (apply w w)) (apply (apply b w) (apply (apply b b) b))
1066 [] by strong_fixed_point
1069 apply strong_fixed_point fixed_pt
1071 apply fixed_pt (apply strong_fixed_point fixed_pt)
1072 [] by prove_strong_fixed_point
1073 Last chance: 1246038383.09
1074 Last chance: all is indexed 1246039114.07
1075 Last chance: failed over 100 goal 1246039114.19
1076 FAILURE in 0 iterations
1077 % SZS status Timeout for COL003-12.p
1085 prove_strong_fixed_point is 96
1090 apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5)
1091 [5, 4, 3] by b_definition ?3 ?4 ?5
1093 apply (apply w ?7) ?8 =?= apply (apply ?7 ?8) ?8
1094 [8, 7] by w_definition ?7 ?8
1097 apply ?1 (f ?1) =<= apply (f ?1) (apply ?1 (f ?1))
1098 [1] by prove_strong_fixed_point ?1
1099 Last chance: 1246039420.58
1100 Last chance: all is indexed 1246040215.63
1101 Last chance: failed over 100 goal 1246040481.46
1102 FAILURE in 0 iterations
1103 % SZS status Timeout for COL003-1.p
1111 prove_strong_fixed_point is 95
1112 strong_fixed_point is 98
1117 apply (apply (apply b ?2) ?3) ?4 =>= apply ?2 (apply ?3 ?4)
1118 [4, 3, 2] by b_definition ?2 ?3 ?4
1120 apply (apply w ?6) ?7 =?= apply (apply ?6 ?7) ?7
1121 [7, 6] by w_definition ?6 ?7
1125 apply (apply b (apply w w))
1126 (apply (apply b (apply b w)) (apply (apply b b) b))
1127 [] by strong_fixed_point
1130 apply strong_fixed_point fixed_pt
1132 apply fixed_pt (apply strong_fixed_point fixed_pt)
1133 [] by prove_strong_fixed_point
1134 Last chance: 1246040786.39
1135 Last chance: all is indexed 1246041551.8
1136 Last chance: failed over 100 goal 1246041551.9
1137 FAILURE in 0 iterations
1138 % SZS status Timeout for COL003-20.p
1146 prove_strong_fixed_point is 95
1149 strong_fixed_point is 98
1152 apply (apply (apply s ?2) ?3) ?4
1154 apply (apply ?2 ?4) (apply ?3 ?4)
1155 [4, 3, 2] by s_definition ?2 ?3 ?4
1156 Id : 6, {_}: apply (apply k ?6) ?7 =>= ?6 [7, 6] by k_definition ?6 ?7
1163 (apply (apply s (apply (apply s k) k)) (apply (apply s k) k))))
1164 (apply (apply s (apply (apply s (apply k s)) k))
1166 (apply (apply s (apply (apply s k) k)) (apply (apply s k) k))))
1167 [] by strong_fixed_point
1170 apply strong_fixed_point fixed_pt
1172 apply fixed_pt (apply strong_fixed_point fixed_pt)
1173 [] by prove_strong_fixed_point
1174 Last chance: 1246041853.36
1175 Last chance: all is indexed 1246043148.51
1176 Last chance: failed over 100 goal 1246043148.61
1177 FAILURE in 0 iterations
1178 % SZS status Timeout for COL006-6.p
1186 prove_fixed_point is 96
1191 apply (apply o ?3) ?4 =?= apply ?4 (apply ?3 ?4)
1192 [4, 3] by o_definition ?3 ?4
1194 apply (apply (apply q1 ?6) ?7) ?8 =>= apply ?6 (apply ?8 ?7)
1195 [8, 7, 6] by q1_definition ?6 ?7 ?8
1197 Id : 2, {_}: ?1 =<= apply combinator ?1 [1] by prove_fixed_point ?1
1198 Last chance: 1246043453.25
1199 Last chance: all is indexed 1246044101.73
1200 Last chance: failed over 100 goal 1246044104.01
1201 FAILURE in 0 iterations
1202 % SZS status Timeout for COL011-1.p
1212 prove_fixed_point is 96
1217 apply (apply (apply s ?3) ?4) ?5
1219 apply (apply ?3 ?5) (apply ?4 ?5)
1220 [5, 4, 3] by s_definition ?3 ?4 ?5
1222 apply (apply (apply b ?7) ?8) ?9 =>= apply ?7 (apply ?8 ?9)
1223 [9, 8, 7] by b_definition ?7 ?8 ?9
1225 apply (apply (apply c ?11) ?12) ?13 =>= apply (apply ?11 ?13) ?12
1226 [13, 12, 11] by c_definition ?11 ?12 ?13
1229 apply ?1 (f ?1) =<= apply (f ?1) (apply ?1 (f ?1))
1230 [1] by prove_fixed_point ?1
1231 Last chance: 1246044405.58
1232 Last chance: all is indexed 1246045687.02
1233 Last chance: failed over 100 goal 1246047742.94
1234 FAILURE in 0 iterations
1235 % SZS status Timeout for COL037-1.p
1245 prove_fixed_point is 96
1250 apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5)
1251 [5, 4, 3] by b_definition ?3 ?4 ?5
1252 Id : 6, {_}: apply m ?7 =?= apply ?7 ?7 [7] by m_definition ?7
1254 apply (apply (apply v ?9) ?10) ?11 =>= apply (apply ?11 ?9) ?10
1255 [11, 10, 9] by v_definition ?9 ?10 ?11
1258 apply ?1 (f ?1) =<= apply (f ?1) (apply ?1 (f ?1))
1259 [1] by prove_fixed_point ?1
1260 Last chance: 1246048045.65
1261 Last chance: all is indexed 1246048609.34
1262 Last chance: failed over 100 goal 1246048629.8
1263 FAILURE in 0 iterations
1264 % SZS status Timeout for COL038-1.p
1274 prove_strong_fixed_point is 95
1275 strong_fixed_point is 98
1278 apply (apply (apply b ?2) ?3) ?4 =>= apply ?2 (apply ?3 ?4)
1279 [4, 3, 2] by b_definition ?2 ?3 ?4
1281 apply (apply (apply h ?6) ?7) ?8
1283 apply (apply (apply ?6 ?7) ?8) ?7
1284 [8, 7, 6] by h_definition ?6 ?7 ?8
1294 (apply (apply b (apply (apply b h) (apply b b)))
1295 (apply h (apply (apply b h) (apply b b))))) h)) b)) b
1296 [] by strong_fixed_point
1299 apply strong_fixed_point fixed_pt
1301 apply fixed_pt (apply strong_fixed_point fixed_pt)
1302 [] by prove_strong_fixed_point
1303 Last chance: 1246048932.
1304 Last chance: all is indexed 1246050149.29
1305 Last chance: failed over 100 goal 1246050149.38
1306 FAILURE in 0 iterations
1307 % SZS status Timeout for COL043-3.p
1317 prove_strong_fixed_point is 95
1318 strong_fixed_point is 98
1321 apply (apply (apply b ?2) ?3) ?4 =>= apply ?2 (apply ?3 ?4)
1322 [4, 3, 2] by b_definition ?2 ?3 ?4
1324 apply (apply (apply n ?6) ?7) ?8
1326 apply (apply (apply ?6 ?8) ?7) ?8
1327 [8, 7, 6] by n_definition ?6 ?7 ?8
1338 (apply (apply b (apply b b))
1339 (apply n (apply (apply b b) n))))) n)) b)) b
1340 [] by strong_fixed_point
1343 apply strong_fixed_point fixed_pt
1345 apply fixed_pt (apply strong_fixed_point fixed_pt)
1346 [] by prove_strong_fixed_point
1347 Last chance: 1246050450.39
1348 Last chance: all is indexed 1246051298.02
1349 Last chance: failed over 100 goal 1246051298.1
1350 FAILURE in 0 iterations
1351 % SZS status Timeout for COL044-8.p
1361 prove_fixed_point is 96
1366 apply (apply (apply s ?3) ?4) ?5
1368 apply (apply ?3 ?5) (apply ?4 ?5)
1369 [5, 4, 3] by s_definition ?3 ?4 ?5
1371 apply (apply (apply b ?7) ?8) ?9 =>= apply ?7 (apply ?8 ?9)
1372 [9, 8, 7] by b_definition ?7 ?8 ?9
1373 Id : 8, {_}: apply m ?11 =?= apply ?11 ?11 [11] by m_definition ?11
1376 apply ?1 (f ?1) =<= apply (f ?1) (apply ?1 (f ?1))
1377 [1] by prove_fixed_point ?1
1378 Last chance: 1246051601.26
1379 Last chance: all is indexed 1246052740.68
1380 Last chance: failed over 100 goal 1246053297.04
1381 FAILURE in 0 iterations
1382 % SZS status Timeout for COL046-1.p
1392 prove_strong_fixed_point is 96
1397 apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5)
1398 [5, 4, 3] by b_definition ?3 ?4 ?5
1400 apply (apply w ?7) ?8 =?= apply (apply ?7 ?8) ?8
1401 [8, 7] by w_definition ?7 ?8
1402 Id : 8, {_}: apply m ?10 =?= apply ?10 ?10 [10] by m_definition ?10
1405 apply ?1 (f ?1) =<= apply (f ?1) (apply ?1 (f ?1))
1406 [1] by prove_strong_fixed_point ?1
1407 Last chance: 1246053599.67
1408 Last chance: all is indexed 1246054318.64
1409 Last chance: failed over 100 goal 1246054325.15
1410 FAILURE in 0 iterations
1411 % SZS status Timeout for COL049-1.p
1423 prove_strong_fixed_point is 96
1428 apply (apply (apply s ?3) ?4) ?5
1430 apply (apply ?3 ?5) (apply ?4 ?5)
1431 [5, 4, 3] by s_definition ?3 ?4 ?5
1433 apply (apply (apply b ?7) ?8) ?9 =>= apply ?7 (apply ?8 ?9)
1434 [9, 8, 7] by b_definition ?7 ?8 ?9
1436 apply (apply (apply c ?11) ?12) ?13 =>= apply (apply ?11 ?13) ?12
1437 [13, 12, 11] by c_definition ?11 ?12 ?13
1438 Id : 10, {_}: apply i ?15 =>= ?15 [15] by i_definition ?15
1441 apply ?1 (f ?1) =<= apply (f ?1) (apply ?1 (f ?1))
1442 [1] by prove_strong_fixed_point ?1
1443 Last chance: 1246054626.38
1444 Last chance: all is indexed 1246055200.41
1445 Last chance: failed over 100 goal 1246055315.25
1446 FAILURE in 0 iterations
1447 % SZS status Timeout for COL057-1.p
1457 prove_q_combinator is 94
1462 apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5)
1463 [5, 4, 3] by b_definition ?3 ?4 ?5
1465 apply (apply t ?7) ?8 =>= apply ?8 ?7
1466 [8, 7] by t_definition ?7 ?8
1469 apply (apply (apply ?1 (f ?1)) (g ?1)) (h ?1)
1471 apply (g ?1) (apply (f ?1) (h ?1))
1472 [1] by prove_q_combinator ?1
1474 Found proof, 0.118431s
1475 % SZS status Unsatisfiable for COL060-1.p
1476 % SZS output start CNFRefutation for COL060-1.p
1477 Id : 6, {_}: apply (apply t ?7) ?8 =>= apply ?8 ?7 [8, 7] by t_definition ?7 ?8
1478 Id : 4, {_}: apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5) [5, 4, 3] by b_definition ?3 ?4 ?5
1479 Id : 410, {_}: apply (g (apply (apply b (apply t b)) (apply (apply b b) t))) (apply (f (apply (apply b (apply t b)) (apply (apply b b) t))) (h (apply (apply b (apply t b)) (apply (apply b b) t)))) === apply (g (apply (apply b (apply t b)) (apply (apply b b) t))) (apply (f (apply (apply b (apply t b)) (apply (apply b b) t))) (h (apply (apply b (apply t b)) (apply (apply b b) t)))) [] by Super 408 with 4 at 2
1480 Id : 408, {_}: apply (apply (apply ?1205 (g (apply (apply b (apply t ?1205)) (apply (apply b b) t)))) (f (apply (apply b (apply t ?1205)) (apply (apply b b) t)))) (h (apply (apply b (apply t ?1205)) (apply (apply b b) t))) =>= apply (g (apply (apply b (apply t ?1205)) (apply (apply b b) t))) (apply (f (apply (apply b (apply t ?1205)) (apply (apply b b) t))) (h (apply (apply b (apply t ?1205)) (apply (apply b b) t)))) [1205] by Super 389 with 6 at 1,2
1481 Id : 389, {_}: apply (apply (apply ?1151 (f (apply (apply b (apply t ?1152)) (apply (apply b b) ?1151)))) (apply ?1152 (g (apply (apply b (apply t ?1152)) (apply (apply b b) ?1151))))) (h (apply (apply b (apply t ?1152)) (apply (apply b b) ?1151))) =>= apply (g (apply (apply b (apply t ?1152)) (apply (apply b b) ?1151))) (apply (f (apply (apply b (apply t ?1152)) (apply (apply b b) ?1151))) (h (apply (apply b (apply t ?1152)) (apply (apply b b) ?1151)))) [1152, 1151] by Super 50 with 4 at 1,2
1482 Id : 50, {_}: apply (apply (apply (apply ?123 (apply ?124 (f (apply (apply b (apply t ?125)) (apply (apply b ?123) ?124))))) ?125) (g (apply (apply b (apply t ?125)) (apply (apply b ?123) ?124)))) (h (apply (apply b (apply t ?125)) (apply (apply b ?123) ?124))) =>= apply (g (apply (apply b (apply t ?125)) (apply (apply b ?123) ?124))) (apply (f (apply (apply b (apply t ?125)) (apply (apply b ?123) ?124))) (h (apply (apply b (apply t ?125)) (apply (apply b ?123) ?124)))) [125, 124, 123] by Super 25 with 4 at 1,1,1,2
1483 Id : 25, {_}: apply (apply (apply (apply ?58 (f (apply (apply b (apply t ?57)) ?58))) ?57) (g (apply (apply b (apply t ?57)) ?58))) (h (apply (apply b (apply t ?57)) ?58)) =>= apply (g (apply (apply b (apply t ?57)) ?58)) (apply (f (apply (apply b (apply t ?57)) ?58)) (h (apply (apply b (apply t ?57)) ?58))) [57, 58] by Super 11 with 6 at 1,1,2
1484 Id : 11, {_}: apply (apply (apply ?24 (apply ?25 (f (apply (apply b ?24) ?25)))) (g (apply (apply b ?24) ?25))) (h (apply (apply b ?24) ?25)) =>= apply (g (apply (apply b ?24) ?25)) (apply (f (apply (apply b ?24) ?25)) (h (apply (apply b ?24) ?25))) [25, 24] by Super 2 with 4 at 1,1,2
1485 Id : 2, {_}: apply (apply (apply ?1 (f ?1)) (g ?1)) (h ?1) =>= apply (g ?1) (apply (f ?1) (h ?1)) [1] by prove_q_combinator ?1
1486 % SZS output end CNFRefutation for COL060-1.p
1496 prove_q1_combinator is 94
1501 apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5)
1502 [5, 4, 3] by b_definition ?3 ?4 ?5
1504 apply (apply t ?7) ?8 =>= apply ?8 ?7
1505 [8, 7] by t_definition ?7 ?8
1508 apply (apply (apply ?1 (f ?1)) (g ?1)) (h ?1)
1510 apply (f ?1) (apply (h ?1) (g ?1))
1511 [1] by prove_q1_combinator ?1
1513 Found proof, 0.119590s
1514 % SZS status Unsatisfiable for COL061-1.p
1515 % SZS output start CNFRefutation for COL061-1.p
1516 Id : 6, {_}: apply (apply t ?7) ?8 =>= apply ?8 ?7 [8, 7] by t_definition ?7 ?8
1517 Id : 4, {_}: apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5) [5, 4, 3] by b_definition ?3 ?4 ?5
1518 Id : 410, {_}: apply (f (apply (apply b (apply t t)) (apply (apply b b) b))) (apply (h (apply (apply b (apply t t)) (apply (apply b b) b))) (g (apply (apply b (apply t t)) (apply (apply b b) b)))) === apply (f (apply (apply b (apply t t)) (apply (apply b b) b))) (apply (h (apply (apply b (apply t t)) (apply (apply b b) b))) (g (apply (apply b (apply t t)) (apply (apply b b) b)))) [] by Super 409 with 6 at 2,2
1519 Id : 409, {_}: apply (f (apply (apply b (apply t ?1207)) (apply (apply b b) b))) (apply (apply ?1207 (g (apply (apply b (apply t ?1207)) (apply (apply b b) b)))) (h (apply (apply b (apply t ?1207)) (apply (apply b b) b)))) =>= apply (f (apply (apply b (apply t ?1207)) (apply (apply b b) b))) (apply (h (apply (apply b (apply t ?1207)) (apply (apply b b) b))) (g (apply (apply b (apply t ?1207)) (apply (apply b b) b)))) [1207] by Super 389 with 4 at 2
1520 Id : 389, {_}: apply (apply (apply ?1151 (f (apply (apply b (apply t ?1152)) (apply (apply b b) ?1151)))) (apply ?1152 (g (apply (apply b (apply t ?1152)) (apply (apply b b) ?1151))))) (h (apply (apply b (apply t ?1152)) (apply (apply b b) ?1151))) =>= apply (f (apply (apply b (apply t ?1152)) (apply (apply b b) ?1151))) (apply (h (apply (apply b (apply t ?1152)) (apply (apply b b) ?1151))) (g (apply (apply b (apply t ?1152)) (apply (apply b b) ?1151)))) [1152, 1151] by Super 50 with 4 at 1,2
1521 Id : 50, {_}: apply (apply (apply (apply ?123 (apply ?124 (f (apply (apply b (apply t ?125)) (apply (apply b ?123) ?124))))) ?125) (g (apply (apply b (apply t ?125)) (apply (apply b ?123) ?124)))) (h (apply (apply b (apply t ?125)) (apply (apply b ?123) ?124))) =>= apply (f (apply (apply b (apply t ?125)) (apply (apply b ?123) ?124))) (apply (h (apply (apply b (apply t ?125)) (apply (apply b ?123) ?124))) (g (apply (apply b (apply t ?125)) (apply (apply b ?123) ?124)))) [125, 124, 123] by Super 25 with 4 at 1,1,1,2
1522 Id : 25, {_}: apply (apply (apply (apply ?58 (f (apply (apply b (apply t ?57)) ?58))) ?57) (g (apply (apply b (apply t ?57)) ?58))) (h (apply (apply b (apply t ?57)) ?58)) =>= apply (f (apply (apply b (apply t ?57)) ?58)) (apply (h (apply (apply b (apply t ?57)) ?58)) (g (apply (apply b (apply t ?57)) ?58))) [57, 58] by Super 11 with 6 at 1,1,2
1523 Id : 11, {_}: apply (apply (apply ?24 (apply ?25 (f (apply (apply b ?24) ?25)))) (g (apply (apply b ?24) ?25))) (h (apply (apply b ?24) ?25)) =>= apply (f (apply (apply b ?24) ?25)) (apply (h (apply (apply b ?24) ?25)) (g (apply (apply b ?24) ?25))) [25, 24] by Super 2 with 4 at 1,1,2
1524 Id : 2, {_}: apply (apply (apply ?1 (f ?1)) (g ?1)) (h ?1) =>= apply (f ?1) (apply (h ?1) (g ?1)) [1] by prove_q1_combinator ?1
1525 % SZS output end CNFRefutation for COL061-1.p
1535 prove_f_combinator is 94
1540 apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5)
1541 [5, 4, 3] by b_definition ?3 ?4 ?5
1543 apply (apply t ?7) ?8 =>= apply ?8 ?7
1544 [8, 7] by t_definition ?7 ?8
1547 apply (apply (apply ?1 (f ?1)) (g ?1)) (h ?1)
1549 apply (apply (h ?1) (g ?1)) (f ?1)
1550 [1] by prove_f_combinator ?1
1552 Found proof, 2.017016s
1553 % SZS status Unsatisfiable for COL063-1.p
1554 % SZS output start CNFRefutation for COL063-1.p
1555 Id : 6, {_}: apply (apply t ?7) ?8 =>= apply ?8 ?7 [8, 7] by t_definition ?7 ?8
1556 Id : 4, {_}: apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5) [5, 4, 3] by b_definition ?3 ?4 ?5
1557 Id : 3084, {_}: apply (apply (h (apply (apply b (apply t t)) (apply (apply b b) (apply (apply b b) t)))) (g (apply (apply b (apply t t)) (apply (apply b b) (apply (apply b b) t))))) (f (apply (apply b (apply t t)) (apply (apply b b) (apply (apply b b) t)))) === apply (apply (h (apply (apply b (apply t t)) (apply (apply b b) (apply (apply b b) t)))) (g (apply (apply b (apply t t)) (apply (apply b b) (apply (apply b b) t))))) (f (apply (apply b (apply t t)) (apply (apply b b) (apply (apply b b) t)))) [] by Super 3079 with 6 at 2
1558 Id : 3079, {_}: apply (apply ?9991 (f (apply (apply b (apply t t)) (apply (apply b b) (apply (apply b b) ?9991))))) (apply (h (apply (apply b (apply t t)) (apply (apply b b) (apply (apply b b) ?9991)))) (g (apply (apply b (apply t t)) (apply (apply b b) (apply (apply b b) ?9991))))) =>= apply (apply (h (apply (apply b (apply t t)) (apply (apply b b) (apply (apply b b) ?9991)))) (g (apply (apply b (apply t t)) (apply (apply b b) (apply (apply b b) ?9991))))) (f (apply (apply b (apply t t)) (apply (apply b b) (apply (apply b b) ?9991)))) [9991] by Super 3059 with 6 at 2,2
1559 Id : 3059, {_}: apply (apply ?9940 (f (apply (apply b (apply t ?9941)) (apply (apply b b) (apply (apply b b) ?9940))))) (apply (apply ?9941 (g (apply (apply b (apply t ?9941)) (apply (apply b b) (apply (apply b b) ?9940))))) (h (apply (apply b (apply t ?9941)) (apply (apply b b) (apply (apply b b) ?9940))))) =>= apply (apply (h (apply (apply b (apply t ?9941)) (apply (apply b b) (apply (apply b b) ?9940)))) (g (apply (apply b (apply t ?9941)) (apply (apply b b) (apply (apply b b) ?9940))))) (f (apply (apply b (apply t ?9941)) (apply (apply b b) (apply (apply b b) ?9940)))) [9941, 9940] by Super 405 with 4 at 2
1560 Id : 405, {_}: apply (apply (apply ?1195 (apply ?1196 (f (apply (apply b (apply t ?1197)) (apply (apply b b) (apply (apply b ?1195) ?1196)))))) (apply ?1197 (g (apply (apply b (apply t ?1197)) (apply (apply b b) (apply (apply b ?1195) ?1196)))))) (h (apply (apply b (apply t ?1197)) (apply (apply b b) (apply (apply b ?1195) ?1196)))) =>= apply (apply (h (apply (apply b (apply t ?1197)) (apply (apply b b) (apply (apply b ?1195) ?1196)))) (g (apply (apply b (apply t ?1197)) (apply (apply b b) (apply (apply b ?1195) ?1196))))) (f (apply (apply b (apply t ?1197)) (apply (apply b b) (apply (apply b ?1195) ?1196)))) [1197, 1196, 1195] by Super 389 with 4 at 1,1,2
1561 Id : 389, {_}: apply (apply (apply ?1151 (f (apply (apply b (apply t ?1152)) (apply (apply b b) ?1151)))) (apply ?1152 (g (apply (apply b (apply t ?1152)) (apply (apply b b) ?1151))))) (h (apply (apply b (apply t ?1152)) (apply (apply b b) ?1151))) =>= apply (apply (h (apply (apply b (apply t ?1152)) (apply (apply b b) ?1151))) (g (apply (apply b (apply t ?1152)) (apply (apply b b) ?1151)))) (f (apply (apply b (apply t ?1152)) (apply (apply b b) ?1151))) [1152, 1151] by Super 50 with 4 at 1,2
1562 Id : 50, {_}: apply (apply (apply (apply ?123 (apply ?124 (f (apply (apply b (apply t ?125)) (apply (apply b ?123) ?124))))) ?125) (g (apply (apply b (apply t ?125)) (apply (apply b ?123) ?124)))) (h (apply (apply b (apply t ?125)) (apply (apply b ?123) ?124))) =>= apply (apply (h (apply (apply b (apply t ?125)) (apply (apply b ?123) ?124))) (g (apply (apply b (apply t ?125)) (apply (apply b ?123) ?124)))) (f (apply (apply b (apply t ?125)) (apply (apply b ?123) ?124))) [125, 124, 123] by Super 25 with 4 at 1,1,1,2
1563 Id : 25, {_}: apply (apply (apply (apply ?58 (f (apply (apply b (apply t ?57)) ?58))) ?57) (g (apply (apply b (apply t ?57)) ?58))) (h (apply (apply b (apply t ?57)) ?58)) =>= apply (apply (h (apply (apply b (apply t ?57)) ?58)) (g (apply (apply b (apply t ?57)) ?58))) (f (apply (apply b (apply t ?57)) ?58)) [57, 58] by Super 11 with 6 at 1,1,2
1564 Id : 11, {_}: apply (apply (apply ?24 (apply ?25 (f (apply (apply b ?24) ?25)))) (g (apply (apply b ?24) ?25))) (h (apply (apply b ?24) ?25)) =>= apply (apply (h (apply (apply b ?24) ?25)) (g (apply (apply b ?24) ?25))) (f (apply (apply b ?24) ?25)) [25, 24] by Super 2 with 4 at 1,1,2
1565 Id : 2, {_}: apply (apply (apply ?1 (f ?1)) (g ?1)) (h ?1) =>= apply (apply (h ?1) (g ?1)) (f ?1) [1] by prove_f_combinator ?1
1566 % SZS output end CNFRefutation for COL063-1.p
1576 prove_v_combinator is 94
1581 apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5)
1582 [5, 4, 3] by b_definition ?3 ?4 ?5
1584 apply (apply t ?7) ?8 =>= apply ?8 ?7
1585 [8, 7] by t_definition ?7 ?8
1588 apply (apply (apply ?1 (f ?1)) (g ?1)) (h ?1)
1590 apply (apply (h ?1) (f ?1)) (g ?1)
1591 [1] by prove_v_combinator ?1
1593 Found proof, 14.407016s
1594 % SZS status Unsatisfiable for COL064-1.p
1595 % SZS output start CNFRefutation for COL064-1.p
1596 Id : 6, {_}: apply (apply t ?7) ?8 =>= apply ?8 ?7 [8, 7] by t_definition ?7 ?8
1597 Id : 4, {_}: apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5) [5, 4, 3] by b_definition ?3 ?4 ?5
1598 Id : 10866, {_}: apply (apply (h (apply (apply b (apply t (apply (apply b b) t))) (apply (apply b b) (apply (apply b b) t)))) (f (apply (apply b (apply t (apply (apply b b) t))) (apply (apply b b) (apply (apply b b) t))))) (g (apply (apply b (apply t (apply (apply b b) t))) (apply (apply b b) (apply (apply b b) t)))) === apply (apply (h (apply (apply b (apply t (apply (apply b b) t))) (apply (apply b b) (apply (apply b b) t)))) (f (apply (apply b (apply t (apply (apply b b) t))) (apply (apply b b) (apply (apply b b) t))))) (g (apply (apply b (apply t (apply (apply b b) t))) (apply (apply b b) (apply (apply b b) t)))) [] by Super 10865 with 6 at 2
1599 Id : 10865, {_}: apply (apply ?36992 (g (apply (apply b (apply t (apply (apply b b) ?36992))) (apply (apply b b) (apply (apply b b) t))))) (apply (h (apply (apply b (apply t (apply (apply b b) ?36992))) (apply (apply b b) (apply (apply b b) t)))) (f (apply (apply b (apply t (apply (apply b b) ?36992))) (apply (apply b b) (apply (apply b b) t))))) =>= apply (apply (h (apply (apply b (apply t (apply (apply b b) ?36992))) (apply (apply b b) (apply (apply b b) t)))) (f (apply (apply b (apply t (apply (apply b b) ?36992))) (apply (apply b b) (apply (apply b b) t))))) (g (apply (apply b (apply t (apply (apply b b) ?36992))) (apply (apply b b) (apply (apply b b) t)))) [36992] by Super 3088 with 4 at 2
1600 Id : 3088, {_}: apply (apply (apply ?10013 (apply ?10014 (g (apply (apply b (apply t (apply (apply b ?10013) ?10014))) (apply (apply b b) (apply (apply b b) t)))))) (h (apply (apply b (apply t (apply (apply b ?10013) ?10014))) (apply (apply b b) (apply (apply b b) t))))) (f (apply (apply b (apply t (apply (apply b ?10013) ?10014))) (apply (apply b b) (apply (apply b b) t)))) =>= apply (apply (h (apply (apply b (apply t (apply (apply b ?10013) ?10014))) (apply (apply b b) (apply (apply b b) t)))) (f (apply (apply b (apply t (apply (apply b ?10013) ?10014))) (apply (apply b b) (apply (apply b b) t))))) (g (apply (apply b (apply t (apply (apply b ?10013) ?10014))) (apply (apply b b) (apply (apply b b) t)))) [10014, 10013] by Super 3083 with 4 at 1,1,2
1601 Id : 3083, {_}: apply (apply (apply ?10003 (g (apply (apply b (apply t ?10003)) (apply (apply b b) (apply (apply b b) t))))) (h (apply (apply b (apply t ?10003)) (apply (apply b b) (apply (apply b b) t))))) (f (apply (apply b (apply t ?10003)) (apply (apply b b) (apply (apply b b) t)))) =>= apply (apply (h (apply (apply b (apply t ?10003)) (apply (apply b b) (apply (apply b b) t)))) (f (apply (apply b (apply t ?10003)) (apply (apply b b) (apply (apply b b) t))))) (g (apply (apply b (apply t ?10003)) (apply (apply b b) (apply (apply b b) t)))) [10003] by Super 3059 with 6 at 2
1602 Id : 3059, {_}: apply (apply ?9940 (f (apply (apply b (apply t ?9941)) (apply (apply b b) (apply (apply b b) ?9940))))) (apply (apply ?9941 (g (apply (apply b (apply t ?9941)) (apply (apply b b) (apply (apply b b) ?9940))))) (h (apply (apply b (apply t ?9941)) (apply (apply b b) (apply (apply b b) ?9940))))) =>= apply (apply (h (apply (apply b (apply t ?9941)) (apply (apply b b) (apply (apply b b) ?9940)))) (f (apply (apply b (apply t ?9941)) (apply (apply b b) (apply (apply b b) ?9940))))) (g (apply (apply b (apply t ?9941)) (apply (apply b b) (apply (apply b b) ?9940)))) [9941, 9940] by Super 405 with 4 at 2
1603 Id : 405, {_}: apply (apply (apply ?1195 (apply ?1196 (f (apply (apply b (apply t ?1197)) (apply (apply b b) (apply (apply b ?1195) ?1196)))))) (apply ?1197 (g (apply (apply b (apply t ?1197)) (apply (apply b b) (apply (apply b ?1195) ?1196)))))) (h (apply (apply b (apply t ?1197)) (apply (apply b b) (apply (apply b ?1195) ?1196)))) =>= apply (apply (h (apply (apply b (apply t ?1197)) (apply (apply b b) (apply (apply b ?1195) ?1196)))) (f (apply (apply b (apply t ?1197)) (apply (apply b b) (apply (apply b ?1195) ?1196))))) (g (apply (apply b (apply t ?1197)) (apply (apply b b) (apply (apply b ?1195) ?1196)))) [1197, 1196, 1195] by Super 389 with 4 at 1,1,2
1604 Id : 389, {_}: apply (apply (apply ?1151 (f (apply (apply b (apply t ?1152)) (apply (apply b b) ?1151)))) (apply ?1152 (g (apply (apply b (apply t ?1152)) (apply (apply b b) ?1151))))) (h (apply (apply b (apply t ?1152)) (apply (apply b b) ?1151))) =>= apply (apply (h (apply (apply b (apply t ?1152)) (apply (apply b b) ?1151))) (f (apply (apply b (apply t ?1152)) (apply (apply b b) ?1151)))) (g (apply (apply b (apply t ?1152)) (apply (apply b b) ?1151))) [1152, 1151] by Super 50 with 4 at 1,2
1605 Id : 50, {_}: apply (apply (apply (apply ?123 (apply ?124 (f (apply (apply b (apply t ?125)) (apply (apply b ?123) ?124))))) ?125) (g (apply (apply b (apply t ?125)) (apply (apply b ?123) ?124)))) (h (apply (apply b (apply t ?125)) (apply (apply b ?123) ?124))) =>= apply (apply (h (apply (apply b (apply t ?125)) (apply (apply b ?123) ?124))) (f (apply (apply b (apply t ?125)) (apply (apply b ?123) ?124)))) (g (apply (apply b (apply t ?125)) (apply (apply b ?123) ?124))) [125, 124, 123] by Super 25 with 4 at 1,1,1,2
1606 Id : 25, {_}: apply (apply (apply (apply ?58 (f (apply (apply b (apply t ?57)) ?58))) ?57) (g (apply (apply b (apply t ?57)) ?58))) (h (apply (apply b (apply t ?57)) ?58)) =>= apply (apply (h (apply (apply b (apply t ?57)) ?58)) (f (apply (apply b (apply t ?57)) ?58))) (g (apply (apply b (apply t ?57)) ?58)) [57, 58] by Super 11 with 6 at 1,1,2
1607 Id : 11, {_}: apply (apply (apply ?24 (apply ?25 (f (apply (apply b ?24) ?25)))) (g (apply (apply b ?24) ?25))) (h (apply (apply b ?24) ?25)) =>= apply (apply (h (apply (apply b ?24) ?25)) (f (apply (apply b ?24) ?25))) (g (apply (apply b ?24) ?25)) [25, 24] by Super 2 with 4 at 1,1,2
1608 Id : 2, {_}: apply (apply (apply ?1 (f ?1)) (g ?1)) (h ?1) =>= apply (apply (h ?1) (f ?1)) (g ?1) [1] by prove_v_combinator ?1
1609 % SZS output end CNFRefutation for COL064-1.p
1620 prove_g_combinator is 93
1625 apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5)
1626 [5, 4, 3] by b_definition ?3 ?4 ?5
1628 apply (apply t ?7) ?8 =>= apply ?8 ?7
1629 [8, 7] by t_definition ?7 ?8
1632 apply (apply (apply (apply ?1 (f ?1)) (g ?1)) (h ?1)) (i ?1)
1634 apply (apply (f ?1) (i ?1)) (apply (g ?1) (h ?1))
1635 [1] by prove_g_combinator ?1
1637 Found proof, 71.220473s
1638 % SZS status Unsatisfiable for COL065-1.p
1639 % SZS output start CNFRefutation for COL065-1.p
1640 Id : 6, {_}: apply (apply t ?7) ?8 =>= apply ?8 ?7 [8, 7] by t_definition ?7 ?8
1641 Id : 4, {_}: apply (apply (apply b ?3) ?4) ?5 =>= apply ?3 (apply ?4 ?5) [5, 4, 3] by b_definition ?3 ?4 ?5
1642 Id : 24512, {_}: apply (apply (f (apply (apply b b) (apply (apply b (apply t (apply (apply b b) t))) (apply (apply b b) t)))) (i (apply (apply b b) (apply (apply b (apply t (apply (apply b b) t))) (apply (apply b b) t))))) (apply (g (apply (apply b b) (apply (apply b (apply t (apply (apply b b) t))) (apply (apply b b) t)))) (h (apply (apply b b) (apply (apply b (apply t (apply (apply b b) t))) (apply (apply b b) t))))) === apply (apply (f (apply (apply b b) (apply (apply b (apply t (apply (apply b b) t))) (apply (apply b b) t)))) (i (apply (apply b b) (apply (apply b (apply t (apply (apply b b) t))) (apply (apply b b) t))))) (apply (g (apply (apply b b) (apply (apply b (apply t (apply (apply b b) t))) (apply (apply b b) t)))) (h (apply (apply b b) (apply (apply b (apply t (apply (apply b b) t))) (apply (apply b b) t))))) [] by Super 24511 with 6 at 2
1643 Id : 24511, {_}: apply (apply ?78509 (apply (g (apply (apply b b) (apply (apply b (apply t (apply (apply b b) ?78509))) (apply (apply b b) t)))) (h (apply (apply b b) (apply (apply b (apply t (apply (apply b b) ?78509))) (apply (apply b b) t)))))) (apply (f (apply (apply b b) (apply (apply b (apply t (apply (apply b b) ?78509))) (apply (apply b b) t)))) (i (apply (apply b b) (apply (apply b (apply t (apply (apply b b) ?78509))) (apply (apply b b) t))))) =>= apply (apply (f (apply (apply b b) (apply (apply b (apply t (apply (apply b b) ?78509))) (apply (apply b b) t)))) (i (apply (apply b b) (apply (apply b (apply t (apply (apply b b) ?78509))) (apply (apply b b) t))))) (apply (g (apply (apply b b) (apply (apply b (apply t (apply (apply b b) ?78509))) (apply (apply b b) t)))) (h (apply (apply b b) (apply (apply b (apply t (apply (apply b b) ?78509))) (apply (apply b b) t))))) [78509] by Super 5051 with 4 at 2
1644 Id : 5051, {_}: apply (apply (apply ?14812 (apply ?14813 (apply (g (apply (apply b b) (apply (apply b (apply t (apply (apply b ?14812) ?14813))) (apply (apply b b) t)))) (h (apply (apply b b) (apply (apply b (apply t (apply (apply b ?14812) ?14813))) (apply (apply b b) t))))))) (f (apply (apply b b) (apply (apply b (apply t (apply (apply b ?14812) ?14813))) (apply (apply b b) t))))) (i (apply (apply b b) (apply (apply b (apply t (apply (apply b ?14812) ?14813))) (apply (apply b b) t)))) =>= apply (apply (f (apply (apply b b) (apply (apply b (apply t (apply (apply b ?14812) ?14813))) (apply (apply b b) t)))) (i (apply (apply b b) (apply (apply b (apply t (apply (apply b ?14812) ?14813))) (apply (apply b b) t))))) (apply (g (apply (apply b b) (apply (apply b (apply t (apply (apply b ?14812) ?14813))) (apply (apply b b) t)))) (h (apply (apply b b) (apply (apply b (apply t (apply (apply b ?14812) ?14813))) (apply (apply b b) t))))) [14813, 14812] by Super 5049 with 4 at 1,1,2
1645 Id : 5049, {_}: apply (apply (apply ?14808 (apply (g (apply (apply b b) (apply (apply b (apply t ?14808)) (apply (apply b b) t)))) (h (apply (apply b b) (apply (apply b (apply t ?14808)) (apply (apply b b) t)))))) (f (apply (apply b b) (apply (apply b (apply t ?14808)) (apply (apply b b) t))))) (i (apply (apply b b) (apply (apply b (apply t ?14808)) (apply (apply b b) t)))) =>= apply (apply (f (apply (apply b b) (apply (apply b (apply t ?14808)) (apply (apply b b) t)))) (i (apply (apply b b) (apply (apply b (apply t ?14808)) (apply (apply b b) t))))) (apply (g (apply (apply b b) (apply (apply b (apply t ?14808)) (apply (apply b b) t)))) (h (apply (apply b b) (apply (apply b (apply t ?14808)) (apply (apply b b) t))))) [14808] by Super 5030 with 6 at 1,2
1646 Id : 5030, {_}: apply (apply (apply ?14754 (f (apply (apply b b) (apply (apply b (apply t ?14755)) (apply (apply b b) ?14754))))) (apply ?14755 (apply (g (apply (apply b b) (apply (apply b (apply t ?14755)) (apply (apply b b) ?14754)))) (h (apply (apply b b) (apply (apply b (apply t ?14755)) (apply (apply b b) ?14754))))))) (i (apply (apply b b) (apply (apply b (apply t ?14755)) (apply (apply b b) ?14754)))) =>= apply (apply (f (apply (apply b b) (apply (apply b (apply t ?14755)) (apply (apply b b) ?14754)))) (i (apply (apply b b) (apply (apply b (apply t ?14755)) (apply (apply b b) ?14754))))) (apply (g (apply (apply b b) (apply (apply b (apply t ?14755)) (apply (apply b b) ?14754)))) (h (apply (apply b b) (apply (apply b (apply t ?14755)) (apply (apply b b) ?14754))))) [14755, 14754] by Super 388 with 4 at 1,2
1647 Id : 388, {_}: apply (apply (apply (apply ?1025 (apply ?1026 (f (apply (apply b b) (apply (apply b (apply t ?1027)) (apply (apply b ?1025) ?1026)))))) ?1027) (apply (g (apply (apply b b) (apply (apply b (apply t ?1027)) (apply (apply b ?1025) ?1026)))) (h (apply (apply b b) (apply (apply b (apply t ?1027)) (apply (apply b ?1025) ?1026)))))) (i (apply (apply b b) (apply (apply b (apply t ?1027)) (apply (apply b ?1025) ?1026)))) =>= apply (apply (f (apply (apply b b) (apply (apply b (apply t ?1027)) (apply (apply b ?1025) ?1026)))) (i (apply (apply b b) (apply (apply b (apply t ?1027)) (apply (apply b ?1025) ?1026))))) (apply (g (apply (apply b b) (apply (apply b (apply t ?1027)) (apply (apply b ?1025) ?1026)))) (h (apply (apply b b) (apply (apply b (apply t ?1027)) (apply (apply b ?1025) ?1026))))) [1027, 1026, 1025] by Super 132 with 4 at 1,1,1,2
1648 Id : 132, {_}: apply (apply (apply (apply ?316 (f (apply (apply b b) (apply (apply b (apply t ?315)) ?316)))) ?315) (apply (g (apply (apply b b) (apply (apply b (apply t ?315)) ?316))) (h (apply (apply b b) (apply (apply b (apply t ?315)) ?316))))) (i (apply (apply b b) (apply (apply b (apply t ?315)) ?316))) =>= apply (apply (f (apply (apply b b) (apply (apply b (apply t ?315)) ?316))) (i (apply (apply b b) (apply (apply b (apply t ?315)) ?316)))) (apply (g (apply (apply b b) (apply (apply b (apply t ?315)) ?316))) (h (apply (apply b b) (apply (apply b (apply t ?315)) ?316)))) [315, 316] by Super 34 with 6 at 1,1,2
1649 Id : 34, {_}: apply (apply (apply ?76 (apply ?77 (f (apply (apply b b) (apply (apply b ?76) ?77))))) (apply (g (apply (apply b b) (apply (apply b ?76) ?77))) (h (apply (apply b b) (apply (apply b ?76) ?77))))) (i (apply (apply b b) (apply (apply b ?76) ?77))) =>= apply (apply (f (apply (apply b b) (apply (apply b ?76) ?77))) (i (apply (apply b b) (apply (apply b ?76) ?77)))) (apply (g (apply (apply b b) (apply (apply b ?76) ?77))) (h (apply (apply b b) (apply (apply b ?76) ?77)))) [77, 76] by Super 31 with 4 at 1,1,2
1650 Id : 31, {_}: apply (apply (apply ?69 (f (apply (apply b b) ?69))) (apply (g (apply (apply b b) ?69)) (h (apply (apply b b) ?69)))) (i (apply (apply b b) ?69)) =>= apply (apply (f (apply (apply b b) ?69)) (i (apply (apply b b) ?69))) (apply (g (apply (apply b b) ?69)) (h (apply (apply b b) ?69))) [69] by Super 11 with 4 at 1,2
1651 Id : 11, {_}: apply (apply (apply (apply ?24 (apply ?25 (f (apply (apply b ?24) ?25)))) (g (apply (apply b ?24) ?25))) (h (apply (apply b ?24) ?25))) (i (apply (apply b ?24) ?25)) =>= apply (apply (f (apply (apply b ?24) ?25)) (i (apply (apply b ?24) ?25))) (apply (g (apply (apply b ?24) ?25)) (h (apply (apply b ?24) ?25))) [25, 24] by Super 2 with 4 at 1,1,1,2
1652 Id : 2, {_}: apply (apply (apply (apply ?1 (f ?1)) (g ?1)) (h ?1)) (i ?1) =>= apply (apply (f ?1) (i ?1)) (apply (g ?1) (h ?1)) [1] by prove_g_combinator ?1
1653 % SZS output end CNFRefutation for COL065-1.p
1663 prove_associativity is 94
1670 (inverse (multiply (inverse ?3) (multiply (inverse ?2) ?4)))
1671 ?5) (inverse (multiply ?3 ?5))))
1674 [5, 4, 3, 2] by group_axiom ?2 ?3 ?4 ?5
1677 multiply a (multiply b c) =<= multiply (multiply a b) c
1678 [] by prove_associativity
1679 Found proof, 3.169341s
1680 % SZS status Unsatisfiable for GRP014-1.p
1681 % SZS output start CNFRefutation for GRP014-1.p
1682 Id : 5, {_}: multiply ?7 (inverse (multiply (multiply (inverse (multiply (inverse ?8) (multiply (inverse ?7) ?9))) ?10) (inverse (multiply ?8 ?10)))) =>= ?9 [10, 9, 8, 7] by group_axiom ?7 ?8 ?9 ?10
1683 Id : 4, {_}: multiply ?2 (inverse (multiply (multiply (inverse (multiply (inverse ?3) (multiply (inverse ?2) ?4))) ?5) (inverse (multiply ?3 ?5)))) =>= ?4 [5, 4, 3, 2] by group_axiom ?2 ?3 ?4 ?5
1684 Id : 7, {_}: multiply ?22 (inverse (multiply (multiply (inverse (multiply (inverse ?23) ?20)) ?24) (inverse (multiply ?23 ?24)))) =?= inverse (multiply (multiply (inverse (multiply (inverse ?19) (multiply (inverse (inverse ?22)) ?20))) ?21) (inverse (multiply ?19 ?21))) [21, 19, 24, 20, 23, 22] by Super 5 with 4 at 2,1,1,1,1,2,2
1685 Id : 65, {_}: multiply (inverse ?586) (multiply ?586 (inverse (multiply (multiply (inverse (multiply (inverse ?587) ?588)) ?589) (inverse (multiply ?587 ?589))))) =>= ?588 [589, 588, 587, 586] by Super 4 with 7 at 2,2
1686 Id : 66, {_}: inverse (multiply (multiply (inverse (multiply (inverse ?596) (multiply (inverse (inverse ?593)) (multiply (inverse ?593) ?598)))) ?597) (inverse (multiply ?596 ?597))) =>= ?598 [597, 598, 593, 596] by Super 4 with 7 at 2
1687 Id : 285, {_}: multiply (inverse ?2327) (multiply ?2327 ?2328) =?= multiply (inverse (inverse ?2329)) (multiply (inverse ?2329) ?2328) [2329, 2328, 2327] by Super 65 with 66 at 2,2,2
1688 Id : 188, {_}: multiply (inverse ?1696) (multiply ?1696 ?1694) =?= multiply (inverse (inverse ?1693)) (multiply (inverse ?1693) ?1694) [1693, 1694, 1696] by Super 65 with 66 at 2,2,2
1689 Id : 299, {_}: multiply (inverse ?2421) (multiply ?2421 ?2422) =?= multiply (inverse ?2420) (multiply ?2420 ?2422) [2420, 2422, 2421] by Super 285 with 188 at 3
1690 Id : 379, {_}: multiply ?2799 (inverse (multiply (multiply (inverse ?2798) (multiply ?2798 ?2797)) (inverse (multiply ?2800 (multiply (multiply (inverse ?2800) (multiply (inverse ?2799) ?2801)) ?2797))))) =>= ?2801 [2801, 2800, 2797, 2798, 2799] by Super 4 with 299 at 1,1,2,2
1691 Id : 550, {_}: multiply ?3835 (inverse (multiply (multiply (inverse (multiply (inverse ?3836) (multiply ?3836 ?3837))) ?3838) (inverse (multiply (inverse ?3835) ?3838)))) =>= ?3837 [3838, 3837, 3836, 3835] by Super 4 with 188 at 1,1,1,1,2,2
1692 Id : 2860, {_}: multiply ?17926 (inverse (multiply (multiply (inverse (multiply (inverse ?17927) (multiply ?17927 ?17928))) (multiply ?17926 ?17929)) (inverse (multiply (inverse ?17930) (multiply ?17930 ?17929))))) =>= ?17928 [17930, 17929, 17928, 17927, 17926] by Super 550 with 299 at 1,2,1,2,2
1693 Id : 2947, {_}: multiply (multiply (inverse ?18671) (multiply ?18671 ?18672)) (inverse (multiply ?18669 (inverse (multiply (inverse ?18673) (multiply ?18673 (inverse (multiply (multiply (inverse (multiply (inverse ?18668) ?18669)) ?18670) (inverse (multiply ?18668 ?18670))))))))) =>= ?18672 [18670, 18668, 18673, 18669, 18672, 18671] by Super 2860 with 65 at 1,1,2,2
1694 Id : 2989, {_}: multiply (multiply (inverse ?18671) (multiply ?18671 ?18672)) (inverse (multiply ?18669 (inverse ?18669))) =>= ?18672 [18669, 18672, 18671] by Demod 2947 with 65 at 1,2,1,2,2
1695 Id : 3000, {_}: multiply ?18805 (inverse (multiply (multiply (inverse ?18806) (multiply ?18806 (inverse (multiply ?18804 (inverse ?18804))))) (inverse (multiply (inverse ?18805) ?18803)))) =>= ?18803 [18803, 18804, 18806, 18805] by Super 379 with 2989 at 2,1,2,1,2,2
1696 Id : 7432, {_}: multiply (inverse ?40377) (multiply (multiply (inverse (inverse ?40377)) ?40378) (inverse (multiply ?40379 (inverse ?40379)))) =>= ?40378 [40379, 40378, 40377] by Super 65 with 3000 at 2,2
1697 Id : 3646, {_}: multiply ?23036 (inverse (multiply (multiply (inverse ?23037) (multiply ?23037 (inverse (multiply ?23038 (inverse ?23038))))) (inverse (multiply (inverse ?23036) ?23039)))) =>= ?23039 [23039, 23038, 23037, 23036] by Super 379 with 2989 at 2,1,2,1,2,2
1698 Id : 3702, {_}: multiply ?23470 (inverse (inverse (multiply ?23472 (inverse ?23472)))) =>= inverse (inverse ?23470) [23472, 23470] by Super 3646 with 2989 at 1,2,2
1699 Id : 3804, {_}: multiply (inverse ?23847) (multiply ?23847 (inverse (inverse (multiply ?23846 (inverse ?23846))))) =?= multiply (inverse ?23845) (inverse (inverse ?23845)) [23845, 23846, 23847] by Super 299 with 3702 at 2,3
1700 Id : 4420, {_}: multiply (inverse ?26554) (inverse (inverse ?26554)) =?= multiply (inverse ?26555) (inverse (inverse ?26555)) [26555, 26554] by Demod 3804 with 3702 at 2,2
1701 Id : 190, {_}: inverse (multiply (multiply (inverse (multiply (inverse ?1706) (multiply (inverse (inverse ?1707)) (multiply (inverse ?1707) ?1708)))) ?1709) (inverse (multiply ?1706 ?1709))) =>= ?1708 [1709, 1708, 1707, 1706] by Super 4 with 7 at 2
1702 Id : 198, {_}: inverse (multiply (multiply (inverse (multiply (inverse ?1772) (multiply (inverse (inverse (multiply (multiply (inverse (multiply (inverse ?1768) (multiply (inverse (inverse ?1769)) (multiply (inverse ?1769) ?1770)))) ?1771) (inverse (multiply ?1768 ?1771))))) (multiply ?1770 ?1773)))) ?1774) (inverse (multiply ?1772 ?1774))) =>= ?1773 [1774, 1773, 1771, 1770, 1769, 1768, 1772] by Super 190 with 66 at 1,2,2,1,1,1,1,2
1703 Id : 223, {_}: inverse (multiply (multiply (inverse (multiply (inverse ?1772) (multiply (inverse ?1770) (multiply ?1770 ?1773)))) ?1774) (inverse (multiply ?1772 ?1774))) =>= ?1773 [1774, 1773, 1770, 1772] by Demod 198 with 66 at 1,1,2,1,1,1,1,2
1704 Id : 4421, {_}: multiply (inverse ?26561) (inverse (inverse ?26561)) =?= multiply (inverse (multiply (multiply (inverse (multiply (inverse ?26557) (multiply (inverse ?26558) (multiply ?26558 ?26559)))) ?26560) (inverse (multiply ?26557 ?26560)))) (inverse ?26559) [26560, 26559, 26558, 26557, 26561] by Super 4420 with 223 at 1,2,3
1705 Id : 4696, {_}: multiply (inverse ?27771) (inverse (inverse ?27771)) =?= multiply ?27772 (inverse ?27772) [27772, 27771] by Demod 4421 with 223 at 1,3
1706 Id : 4493, {_}: multiply (inverse ?26561) (inverse (inverse ?26561)) =?= multiply ?26559 (inverse ?26559) [26559, 26561] by Demod 4421 with 223 at 1,3
1707 Id : 4736, {_}: multiply ?27992 (inverse ?27992) =?= multiply ?27994 (inverse ?27994) [27994, 27992] by Super 4696 with 4493 at 2
1708 Id : 7526, {_}: multiply (inverse ?40902) (multiply ?40901 (inverse ?40901)) =>= inverse (inverse (inverse ?40902)) [40901, 40902] by Super 7432 with 4736 at 2,2
1709 Id : 7653, {_}: multiply (inverse ?41400) (multiply ?41400 (inverse ?41399)) =>= inverse (inverse (inverse ?41399)) [41399, 41400] by Super 299 with 7526 at 3
1710 Id : 8053, {_}: multiply ?18805 (inverse (multiply (inverse (inverse (inverse (multiply ?18804 (inverse ?18804))))) (inverse (multiply (inverse ?18805) ?18803)))) =>= ?18803 [18803, 18804, 18805] by Demod 3000 with 7653 at 1,1,2,2
1711 Id : 395, {_}: multiply (inverse ?2916) (multiply ?2916 (inverse (multiply (multiply (inverse (multiply (inverse ?2915) (multiply ?2915 ?2914))) ?2917) (inverse (multiply ?2913 ?2917))))) =>= multiply ?2913 ?2914 [2913, 2917, 2914, 2915, 2916] by Super 65 with 299 at 1,1,1,1,2,2,2
1712 Id : 8051, {_}: inverse (inverse (inverse (multiply (multiply (inverse (multiply (inverse ?2915) (multiply ?2915 ?2914))) ?2917) (inverse (multiply ?2913 ?2917))))) =>= multiply ?2913 ?2914 [2913, 2917, 2914, 2915] by Demod 395 with 7653 at 2
1713 Id : 8154, {_}: multiply (inverse ?43172) (multiply ?43172 (inverse ?43173)) =>= inverse (inverse (inverse ?43173)) [43173, 43172] by Super 299 with 7526 at 3
1714 Id : 474, {_}: inverse (multiply (multiply (inverse (multiply (inverse ?3355) (multiply (inverse ?3356) (multiply ?3356 ?3357)))) ?3358) (inverse (multiply ?3355 ?3358))) =>= ?3357 [3358, 3357, 3356, 3355] by Demod 198 with 66 at 1,1,2,1,1,1,1,2
1715 Id : 505, {_}: inverse (multiply (multiply (inverse ?3589) (multiply ?3589 ?3588)) (inverse (multiply ?3590 (multiply (multiply (inverse ?3590) (multiply (inverse ?3591) (multiply ?3591 ?3592))) ?3588)))) =>= ?3592 [3592, 3591, 3590, 3588, 3589] by Super 474 with 299 at 1,1,2
1716 Id : 3283, {_}: inverse (multiply (multiply (inverse ?20660) (multiply ?20660 (inverse (multiply ?20661 (inverse ?20661))))) (inverse (multiply (inverse ?20662) (multiply ?20662 ?20663)))) =>= ?20663 [20663, 20662, 20661, 20660] by Super 505 with 2989 at 2,1,2,1,2
1717 Id : 251, {_}: multiply ?2088 (inverse (multiply (multiply (inverse (multiply (inverse ?2086) (multiply ?2086 ?2087))) ?2089) (inverse (multiply (inverse ?2088) ?2089)))) =>= ?2087 [2089, 2087, 2086, 2088] by Super 4 with 188 at 1,1,1,1,2,2
1718 Id : 3330, {_}: inverse (multiply (multiply (inverse (multiply (inverse ?21019) (multiply ?21019 ?21020))) ?21020) (inverse (multiply (inverse ?21022) (multiply ?21022 ?21023)))) =>= ?21023 [21023, 21022, 21020, 21019] by Super 3283 with 251 at 2,1,1,2
1719 Id : 8160, {_}: multiply (inverse ?43212) (multiply ?43212 ?43211) =?= inverse (inverse (inverse (multiply (multiply (inverse (multiply (inverse ?43208) (multiply ?43208 ?43209))) ?43209) (inverse (multiply (inverse ?43210) (multiply ?43210 ?43211)))))) [43210, 43209, 43208, 43211, 43212] by Super 8154 with 3330 at 2,2,2
1720 Id : 8246, {_}: multiply (inverse ?43212) (multiply ?43212 ?43211) =>= inverse (inverse ?43211) [43211, 43212] by Demod 8160 with 3330 at 1,1,3
1721 Id : 8276, {_}: inverse (inverse (inverse (multiply (multiply (inverse (inverse (inverse ?2914))) ?2917) (inverse (multiply ?2913 ?2917))))) =>= multiply ?2913 ?2914 [2913, 2917, 2914] by Demod 8051 with 8246 at 1,1,1,1,1,1,2
1722 Id : 3034, {_}: multiply (multiply (inverse ?19018) (multiply ?19018 ?19019)) (inverse (multiply ?19020 (inverse ?19020))) =>= ?19019 [19020, 19019, 19018] by Demod 2947 with 65 at 1,2,1,2,2
1723 Id : 3049, {_}: multiply (multiply (inverse (inverse ?19126)) (multiply (inverse ?19128) (multiply ?19128 ?19127))) (inverse (multiply ?19129 (inverse ?19129))) =>= multiply ?19126 ?19127 [19129, 19127, 19128, 19126] by Super 3034 with 299 at 2,1,2
1724 Id : 7592, {_}: multiply (multiply (inverse (inverse ?41055)) (multiply (inverse (inverse ?41053)) (inverse (inverse (inverse ?41053))))) (inverse (multiply ?41056 (inverse ?41056))) =?= multiply ?41055 (multiply ?41054 (inverse ?41054)) [41054, 41056, 41053, 41055] by Super 3049 with 7526 at 2,2,1,2
1725 Id : 6756, {_}: multiply (multiply (inverse ?37293) (multiply ?37294 (inverse ?37294))) (inverse (multiply ?37295 (inverse ?37295))) =>= inverse ?37293 [37295, 37294, 37293] by Super 2989 with 4736 at 2,1,2
1726 Id : 6813, {_}: multiply (multiply ?37621 (multiply ?37623 (inverse ?37623))) (inverse (multiply ?37624 (inverse ?37624))) =?= inverse (multiply (multiply (inverse (multiply (inverse ?37619) (multiply (inverse ?37620) (multiply ?37620 ?37621)))) ?37622) (inverse (multiply ?37619 ?37622))) [37622, 37620, 37619, 37624, 37623, 37621] by Super 6756 with 223 at 1,1,2
1727 Id : 6857, {_}: multiply (multiply ?37621 (multiply ?37623 (inverse ?37623))) (inverse (multiply ?37624 (inverse ?37624))) =>= ?37621 [37624, 37623, 37621] by Demod 6813 with 223 at 3
1728 Id : 7919, {_}: inverse (inverse ?42462) =<= multiply ?42462 (multiply ?42463 (inverse ?42463)) [42463, 42462] by Demod 7592 with 6857 at 2
1729 Id : 2998, {_}: inverse (multiply (multiply (inverse ?18792) (multiply ?18792 (inverse (multiply ?18791 (inverse ?18791))))) (inverse (multiply (inverse ?18793) (multiply ?18793 ?18794)))) =>= ?18794 [18794, 18793, 18791, 18792] by Super 505 with 2989 at 2,1,2,1,2
1730 Id : 5265, {_}: inverse (multiply ?30443 (inverse ?30443)) =?= inverse (multiply ?30444 (inverse ?30444)) [30444, 30443] by Super 2998 with 4736 at 1,2
1731 Id : 5279, {_}: inverse (multiply ?30523 (inverse ?30523)) =?= inverse (inverse (inverse (inverse (multiply ?30522 (inverse ?30522))))) [30522, 30523] by Super 5265 with 3702 at 1,3
1732 Id : 7936, {_}: inverse (inverse ?42552) =<= multiply ?42552 (multiply (inverse (inverse (inverse (multiply ?42551 (inverse ?42551))))) (inverse (multiply ?42550 (inverse ?42550)))) [42550, 42551, 42552] by Super 7919 with 5279 at 2,2,3
1733 Id : 7778, {_}: inverse (inverse ?41055) =<= multiply ?41055 (multiply ?41054 (inverse ?41054)) [41054, 41055] by Demod 7592 with 6857 at 2
1734 Id : 7804, {_}: multiply (inverse (inverse ?37621)) (inverse (multiply ?37624 (inverse ?37624))) =>= ?37621 [37624, 37621] by Demod 6857 with 7778 at 1,2
1735 Id : 8036, {_}: inverse (inverse ?42552) =<= multiply ?42552 (inverse (multiply ?42551 (inverse ?42551))) [42551, 42552] by Demod 7936 with 7804 at 2,3
1736 Id : 8529, {_}: inverse (inverse (inverse (multiply (multiply (inverse (inverse (inverse ?44275))) (inverse (multiply ?44274 (inverse ?44274)))) (inverse (inverse (inverse ?44273)))))) =>= multiply ?44273 ?44275 [44273, 44274, 44275] by Super 8276 with 8036 at 1,2,1,1,1,2
1737 Id : 8588, {_}: inverse (inverse (inverse (multiply (inverse (inverse (inverse (inverse (inverse ?44275))))) (inverse (inverse (inverse ?44273)))))) =>= multiply ?44273 ?44275 [44273, 44275] by Demod 8529 with 8036 at 1,1,1,1,2
1738 Id : 401, {_}: multiply (inverse ?2949) (multiply ?2949 ?2950) =?= multiply (inverse ?2951) (multiply ?2951 ?2950) [2951, 2950, 2949] by Super 285 with 188 at 3
1739 Id : 407, {_}: multiply (inverse ?2992) (multiply ?2992 (multiply ?2989 ?2990)) =?= multiply (inverse (inverse ?2989)) (multiply (inverse ?2991) (multiply ?2991 ?2990)) [2991, 2990, 2989, 2992] by Super 401 with 299 at 2,3
1740 Id : 8291, {_}: inverse (inverse (multiply ?2989 ?2990)) =<= multiply (inverse (inverse ?2989)) (multiply (inverse ?2991) (multiply ?2991 ?2990)) [2991, 2990, 2989] by Demod 407 with 8246 at 2
1741 Id : 8292, {_}: inverse (inverse (multiply ?2989 ?2990)) =<= multiply (inverse (inverse ?2989)) (inverse (inverse ?2990)) [2990, 2989] by Demod 8291 with 8246 at 2,3
1742 Id : 8589, {_}: inverse (inverse (inverse (inverse (inverse (multiply (inverse (inverse (inverse ?44275))) (inverse ?44273)))))) =>= multiply ?44273 ?44275 [44273, 44275] by Demod 8588 with 8292 at 1,1,1,2
1743 Id : 8446, {_}: inverse (inverse (inverse (inverse ?37621))) =>= ?37621 [37621] by Demod 7804 with 8036 at 2
1744 Id : 8590, {_}: inverse (multiply (inverse (inverse (inverse ?44275))) (inverse ?44273)) =>= multiply ?44273 ?44275 [44273, 44275] by Demod 8589 with 8446 at 2
1745 Id : 8757, {_}: multiply ?18805 (multiply (multiply (inverse ?18805) ?18803) (multiply ?18804 (inverse ?18804))) =>= ?18803 [18804, 18803, 18805] by Demod 8053 with 8590 at 2,2
1746 Id : 8758, {_}: multiply ?18805 (inverse (inverse (multiply (inverse ?18805) ?18803))) =>= ?18803 [18803, 18805] by Demod 8757 with 7778 at 2,2
1747 Id : 8857, {_}: inverse (multiply (inverse (inverse (inverse ?44963))) (inverse ?44964)) =>= multiply ?44964 ?44963 [44964, 44963] by Demod 8589 with 8446 at 2
1748 Id : 8919, {_}: inverse (multiply ?45241 (inverse ?45242)) =>= multiply ?45242 (inverse ?45241) [45242, 45241] by Super 8857 with 8446 at 1,1,2
1749 Id : 9051, {_}: multiply ?2 (multiply (multiply ?3 ?5) (inverse (multiply (inverse (multiply (inverse ?3) (multiply (inverse ?2) ?4))) ?5))) =>= ?4 [4, 5, 3, 2] by Demod 4 with 8919 at 2,2
1750 Id : 137, {_}: multiply (inverse ?1284) (multiply ?1284 (inverse (multiply (multiply (inverse (multiply (inverse ?1285) ?1286)) ?1287) (inverse (multiply ?1285 ?1287))))) =>= ?1286 [1287, 1286, 1285, 1284] by Super 4 with 7 at 2,2
1751 Id : 156, {_}: multiply (inverse ?1443) (multiply ?1443 (multiply ?1439 (inverse (multiply (multiply (inverse (multiply (inverse ?1440) ?1441)) ?1442) (inverse (multiply ?1440 ?1442)))))) =>= multiply (inverse (inverse ?1439)) ?1441 [1442, 1441, 1440, 1439, 1443] by Super 137 with 7 at 2,2,2
1752 Id : 8285, {_}: inverse (inverse (multiply ?1439 (inverse (multiply (multiply (inverse (multiply (inverse ?1440) ?1441)) ?1442) (inverse (multiply ?1440 ?1442)))))) =>= multiply (inverse (inverse ?1439)) ?1441 [1442, 1441, 1440, 1439] by Demod 156 with 8246 at 2
1753 Id : 9071, {_}: inverse (multiply (multiply (multiply (inverse (multiply (inverse ?1440) ?1441)) ?1442) (inverse (multiply ?1440 ?1442))) (inverse ?1439)) =>= multiply (inverse (inverse ?1439)) ?1441 [1439, 1442, 1441, 1440] by Demod 8285 with 8919 at 1,2
1754 Id : 9072, {_}: multiply ?1439 (inverse (multiply (multiply (inverse (multiply (inverse ?1440) ?1441)) ?1442) (inverse (multiply ?1440 ?1442)))) =>= multiply (inverse (inverse ?1439)) ?1441 [1442, 1441, 1440, 1439] by Demod 9071 with 8919 at 2
1755 Id : 9073, {_}: multiply ?1439 (multiply (multiply ?1440 ?1442) (inverse (multiply (inverse (multiply (inverse ?1440) ?1441)) ?1442))) =>= multiply (inverse (inverse ?1439)) ?1441 [1441, 1442, 1440, 1439] by Demod 9072 with 8919 at 2,2
1756 Id : 9086, {_}: multiply (inverse (inverse ?2)) (multiply (inverse ?2) ?4) =>= ?4 [4, 2] by Demod 9051 with 9073 at 2
1757 Id : 9087, {_}: inverse (inverse ?4) =>= ?4 [4] by Demod 9086 with 8246 at 2
1758 Id : 9094, {_}: multiply ?18805 (multiply (inverse ?18805) ?18803) =>= ?18803 [18803, 18805] by Demod 8758 with 9087 at 2,2
1759 Id : 9160, {_}: inverse (multiply ?45446 (inverse ?45447)) =>= multiply ?45447 (inverse ?45446) [45447, 45446] by Super 8857 with 8446 at 1,1,2
1760 Id : 9162, {_}: inverse (multiply ?45454 ?45453) =<= multiply (inverse ?45453) (inverse ?45454) [45453, 45454] by Super 9160 with 9087 at 2,1,2
1761 Id : 9195, {_}: multiply ?45501 (inverse (multiply ?45500 ?45501)) =>= inverse ?45500 [45500, 45501] by Super 9094 with 9162 at 2,2
1762 Id : 8933, {_}: inverse ?45303 =<= multiply (inverse (multiply (inverse (inverse (inverse (inverse ?45304)))) ?45303)) ?45304 [45304, 45303] by Super 8857 with 8758 at 1,2
1763 Id : 9467, {_}: inverse ?46002 =<= multiply (inverse (multiply ?46003 ?46002)) ?46003 [46003, 46002] by Demod 8933 with 8446 at 1,1,1,3
1764 Id : 8287, {_}: inverse (multiply (multiply (inverse (multiply (inverse ?1772) (inverse (inverse ?1773)))) ?1774) (inverse (multiply ?1772 ?1774))) =>= ?1773 [1774, 1773, 1772] by Demod 223 with 8246 at 2,1,1,1,1,2
1765 Id : 9069, {_}: multiply (multiply ?1772 ?1774) (inverse (multiply (inverse (multiply (inverse ?1772) (inverse (inverse ?1773)))) ?1774)) =>= ?1773 [1773, 1774, 1772] by Demod 8287 with 8919 at 2
1766 Id : 9070, {_}: multiply (multiply ?1772 ?1774) (inverse (multiply (multiply (inverse ?1773) (inverse (inverse ?1772))) ?1774)) =>= ?1773 [1773, 1774, 1772] by Demod 9069 with 8919 at 1,1,2,2
1767 Id : 9090, {_}: multiply (multiply ?1772 ?1774) (inverse (multiply (multiply (inverse ?1773) ?1772) ?1774)) =>= ?1773 [1773, 1774, 1772] by Demod 9070 with 9087 at 2,1,1,2,2
1768 Id : 9469, {_}: inverse (inverse (multiply (multiply (inverse ?46010) ?46008) ?46009)) =>= multiply (inverse ?46010) (multiply ?46008 ?46009) [46009, 46008, 46010] by Super 9467 with 9090 at 1,1,3
1769 Id : 9509, {_}: multiply (multiply (inverse ?46010) ?46008) ?46009 =>= multiply (inverse ?46010) (multiply ?46008 ?46009) [46009, 46008, 46010] by Demod 9469 with 9087 at 2
1770 Id : 9851, {_}: multiply ?46565 (inverse (multiply (inverse ?46563) (multiply ?46564 ?46565))) =>= inverse (multiply (inverse ?46563) ?46564) [46564, 46563, 46565] by Super 9195 with 9509 at 1,2,2
1771 Id : 9213, {_}: inverse (multiply ?45576 ?45577) =<= multiply (inverse ?45577) (inverse ?45576) [45577, 45576] by Super 9160 with 9087 at 2,1,2
1772 Id : 9215, {_}: inverse (multiply (inverse ?45583) ?45584) =>= multiply (inverse ?45584) ?45583 [45584, 45583] by Super 9213 with 9087 at 2,3
1773 Id : 9934, {_}: multiply ?46565 (multiply (inverse (multiply ?46564 ?46565)) ?46563) =>= inverse (multiply (inverse ?46563) ?46564) [46563, 46564, 46565] by Demod 9851 with 9215 at 2,2
1774 Id : 12550, {_}: multiply ?50696 (multiply (inverse (multiply ?50697 ?50696)) ?50698) =>= multiply (inverse ?50697) ?50698 [50698, 50697, 50696] by Demod 9934 with 9215 at 3
1775 Id : 9075, {_}: inverse (inverse (multiply (multiply ?2913 ?2917) (inverse (multiply (inverse (inverse (inverse ?2914))) ?2917)))) =>= multiply ?2913 ?2914 [2914, 2917, 2913] by Demod 8276 with 8919 at 1,1,2
1776 Id : 9076, {_}: inverse (multiply (multiply (inverse (inverse (inverse ?2914))) ?2917) (inverse (multiply ?2913 ?2917))) =>= multiply ?2913 ?2914 [2913, 2917, 2914] by Demod 9075 with 8919 at 1,2
1777 Id : 9077, {_}: multiply (multiply ?2913 ?2917) (inverse (multiply (inverse (inverse (inverse ?2914))) ?2917)) =>= multiply ?2913 ?2914 [2914, 2917, 2913] by Demod 9076 with 8919 at 2
1778 Id : 9102, {_}: multiply (multiply ?2913 ?2917) (inverse (multiply (inverse ?2914) ?2917)) =>= multiply ?2913 ?2914 [2914, 2917, 2913] by Demod 9077 with 9087 at 1,1,2,2
1779 Id : 9248, {_}: multiply (multiply ?2913 ?2917) (multiply (inverse ?2917) ?2914) =>= multiply ?2913 ?2914 [2914, 2917, 2913] by Demod 9102 with 9215 at 2,2
1780 Id : 9533, {_}: multiply (inverse ?46084) (multiply (inverse (inverse (multiply ?46084 ?46083))) ?46085) =>= multiply ?46083 ?46085 [46085, 46083, 46084] by Super 9248 with 9195 at 1,2
1781 Id : 9598, {_}: multiply (inverse ?46084) (multiply (multiply ?46084 ?46083) ?46085) =>= multiply ?46083 ?46085 [46085, 46083, 46084] by Demod 9533 with 9087 at 1,2,2
1782 Id : 12590, {_}: multiply ?50874 (multiply ?50872 ?50873) =<= multiply (inverse ?50875) (multiply (multiply (multiply ?50875 ?50874) ?50872) ?50873) [50875, 50873, 50872, 50874] by Super 12550 with 9598 at 2,2
1783 Id : 12312, {_}: multiply (multiply ?50214 ?50215) ?50216 =<= multiply (inverse ?50213) (multiply (multiply (multiply ?50213 ?50214) ?50215) ?50216) [50213, 50216, 50215, 50214] by Super 9509 with 9598 at 1,2
1784 Id : 29878, {_}: multiply ?50874 (multiply ?50872 ?50873) =?= multiply (multiply ?50874 ?50872) ?50873 [50873, 50872, 50874] by Demod 12590 with 12312 at 3
1785 Id : 30629, {_}: multiply a (multiply b c) === multiply a (multiply b c) [] by Demod 2 with 29878 at 3
1786 Id : 2, {_}: multiply a (multiply b c) =<= multiply (multiply a b) c [] by prove_associativity
1787 % SZS output end CNFRefutation for GRP014-1.p
1793 associativity_of_commutator is 86
1805 Id : 4, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
1806 Id : 6, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
1808 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
1809 [8, 7, 6] by associativity ?6 ?7 ?8
1813 multiply (inverse ?10) (multiply (inverse ?11) (multiply ?10 ?11))
1814 [11, 10] by name ?10 ?11
1816 commutator (commutator ?13 ?14) ?15
1818 commutator ?13 (commutator ?14 ?15)
1819 [15, 14, 13] by associativity_of_commutator ?13 ?14 ?15
1822 multiply a (commutator b c) =<= multiply (commutator b c) a
1824 Last chance: 1246055716.7
1825 Last chance: all is indexed 1246056832.19
1826 Last chance: failed over 100 goal 1246056832.19
1827 FAILURE in 0 iterations
1828 % SZS status Timeout for GRP024-5.p
1836 intersection_associative is 79
1837 intersection_commutative is 81
1838 intersection_idempotent is 84
1839 intersection_union_absorbtion is 76
1841 inverse_involution is 87
1842 inverse_of_identity is 88
1843 inverse_product_lemma is 86
1847 multiply_intersection1 is 74
1848 multiply_intersection2 is 72
1849 multiply_union1 is 75
1850 multiply_union2 is 73
1855 union_associative is 78
1856 union_commutative is 80
1857 union_idempotent is 82
1858 union_intersection_absorbtion is 77
1860 Id : 4, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
1861 Id : 6, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
1863 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
1864 [8, 7, 6] by associativity ?6 ?7 ?8
1865 Id : 10, {_}: inverse identity =>= identity [] by inverse_of_identity
1866 Id : 12, {_}: inverse (inverse ?11) =>= ?11 [11] by inverse_involution ?11
1868 inverse (multiply ?13 ?14) =<= multiply (inverse ?14) (inverse ?13)
1869 [14, 13] by inverse_product_lemma ?13 ?14
1870 Id : 16, {_}: intersection ?16 ?16 =>= ?16 [16] by intersection_idempotent ?16
1871 Id : 18, {_}: union ?18 ?18 =>= ?18 [18] by union_idempotent ?18
1873 intersection ?20 ?21 =?= intersection ?21 ?20
1874 [21, 20] by intersection_commutative ?20 ?21
1876 union ?23 ?24 =?= union ?24 ?23
1877 [24, 23] by union_commutative ?23 ?24
1879 intersection ?26 (intersection ?27 ?28)
1881 intersection (intersection ?26 ?27) ?28
1882 [28, 27, 26] by intersection_associative ?26 ?27 ?28
1884 union ?30 (union ?31 ?32) =?= union (union ?30 ?31) ?32
1885 [32, 31, 30] by union_associative ?30 ?31 ?32
1887 union (intersection ?34 ?35) ?35 =>= ?35
1888 [35, 34] by union_intersection_absorbtion ?34 ?35
1890 intersection (union ?37 ?38) ?38 =>= ?38
1891 [38, 37] by intersection_union_absorbtion ?37 ?38
1893 multiply ?40 (union ?41 ?42)
1895 union (multiply ?40 ?41) (multiply ?40 ?42)
1896 [42, 41, 40] by multiply_union1 ?40 ?41 ?42
1898 multiply ?44 (intersection ?45 ?46)
1900 intersection (multiply ?44 ?45) (multiply ?44 ?46)
1901 [46, 45, 44] by multiply_intersection1 ?44 ?45 ?46
1903 multiply (union ?48 ?49) ?50
1905 union (multiply ?48 ?50) (multiply ?49 ?50)
1906 [50, 49, 48] by multiply_union2 ?48 ?49 ?50
1908 multiply (intersection ?52 ?53) ?54
1910 intersection (multiply ?52 ?54) (multiply ?53 ?54)
1911 [54, 53, 52] by multiply_intersection2 ?52 ?53 ?54
1913 positive_part ?56 =<= union ?56 identity
1914 [56] by positive_part ?56
1916 negative_part ?58 =<= intersection ?58 identity
1917 [58] by negative_part ?58
1920 multiply (positive_part a) (negative_part a) =>= a
1922 Found proof, 2.752118s
1923 % SZS status Unsatisfiable for GRP114-1.p
1924 % SZS output start CNFRefutation for GRP114-1.p
1925 Id : 16, {_}: intersection ?16 ?16 =>= ?16 [16] by intersection_idempotent ?16
1926 Id : 24, {_}: intersection ?26 (intersection ?27 ?28) =?= intersection (intersection ?26 ?27) ?28 [28, 27, 26] by intersection_associative ?26 ?27 ?28
1927 Id : 34, {_}: multiply ?44 (intersection ?45 ?46) =<= intersection (multiply ?44 ?45) (multiply ?44 ?46) [46, 45, 44] by multiply_intersection1 ?44 ?45 ?46
1928 Id : 28, {_}: union (intersection ?34 ?35) ?35 =>= ?35 [35, 34] by union_intersection_absorbtion ?34 ?35
1929 Id : 26, {_}: union ?30 (union ?31 ?32) =?= union (union ?30 ?31) ?32 [32, 31, 30] by union_associative ?30 ?31 ?32
1930 Id : 267, {_}: multiply (union ?680 ?681) ?682 =<= union (multiply ?680 ?682) (multiply ?681 ?682) [682, 681, 680] by multiply_union2 ?680 ?681 ?682
1931 Id : 30, {_}: intersection (union ?37 ?38) ?38 =>= ?38 [38, 37] by intersection_union_absorbtion ?37 ?38
1932 Id : 230, {_}: multiply ?593 (intersection ?594 ?595) =<= intersection (multiply ?593 ?594) (multiply ?593 ?595) [595, 594, 593] by multiply_intersection1 ?593 ?594 ?595
1933 Id : 42, {_}: negative_part ?58 =<= intersection ?58 identity [58] by negative_part ?58
1934 Id : 20, {_}: intersection ?20 ?21 =?= intersection ?21 ?20 [21, 20] by intersection_commutative ?20 ?21
1935 Id : 303, {_}: multiply (intersection ?770 ?771) ?772 =<= intersection (multiply ?770 ?772) (multiply ?771 ?772) [772, 771, 770] by multiply_intersection2 ?770 ?771 ?772
1936 Id : 14, {_}: inverse (multiply ?13 ?14) =<= multiply (inverse ?14) (inverse ?13) [14, 13] by inverse_product_lemma ?13 ?14
1937 Id : 22, {_}: union ?23 ?24 =?= union ?24 ?23 [24, 23] by union_commutative ?23 ?24
1938 Id : 40, {_}: positive_part ?56 =<= union ?56 identity [56] by positive_part ?56
1939 Id : 10, {_}: inverse identity =>= identity [] by inverse_of_identity
1940 Id : 32, {_}: multiply ?40 (union ?41 ?42) =<= union (multiply ?40 ?41) (multiply ?40 ?42) [42, 41, 40] by multiply_union1 ?40 ?41 ?42
1941 Id : 12, {_}: inverse (inverse ?11) =>= ?11 [11] by inverse_involution ?11
1942 Id : 79, {_}: inverse (multiply ?142 ?143) =<= multiply (inverse ?143) (inverse ?142) [143, 142] by inverse_product_lemma ?142 ?143
1943 Id : 4, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
1944 Id : 6, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
1945 Id : 47, {_}: multiply (multiply ?68 ?69) ?70 =?= multiply ?68 (multiply ?69 ?70) [70, 69, 68] by associativity ?68 ?69 ?70
1946 Id : 56, {_}: multiply identity ?103 =<= multiply (inverse ?102) (multiply ?102 ?103) [102, 103] by Super 47 with 6 at 1,2
1947 Id : 8890, {_}: ?10861 =<= multiply (inverse ?10862) (multiply ?10862 ?10861) [10862, 10861] by Demod 56 with 4 at 2
1948 Id : 81, {_}: inverse (multiply (inverse ?147) ?148) =>= multiply (inverse ?148) ?147 [148, 147] by Super 79 with 12 at 2,3
1949 Id : 80, {_}: inverse (multiply identity ?145) =<= multiply (inverse ?145) identity [145] by Super 79 with 10 at 2,3
1950 Id : 450, {_}: inverse ?990 =<= multiply (inverse ?990) identity [990] by Demod 80 with 4 at 1,2
1951 Id : 452, {_}: inverse (inverse ?993) =<= multiply ?993 identity [993] by Super 450 with 12 at 1,3
1952 Id : 467, {_}: ?993 =<= multiply ?993 identity [993] by Demod 452 with 12 at 2
1953 Id : 472, {_}: multiply ?1004 (union ?1005 identity) =?= union (multiply ?1004 ?1005) ?1004 [1005, 1004] by Super 32 with 467 at 2,3
1954 Id : 3162, {_}: multiply ?4224 (positive_part ?4225) =<= union (multiply ?4224 ?4225) ?4224 [4225, 4224] by Demod 472 with 40 at 2,2
1955 Id : 3164, {_}: multiply (inverse ?4229) (positive_part ?4229) =>= union identity (inverse ?4229) [4229] by Super 3162 with 6 at 1,3
1956 Id : 336, {_}: union identity ?835 =>= positive_part ?835 [835] by Super 22 with 40 at 3
1957 Id : 3201, {_}: multiply (inverse ?4229) (positive_part ?4229) =>= positive_part (inverse ?4229) [4229] by Demod 3164 with 336 at 3
1958 Id : 3231, {_}: inverse (positive_part (inverse ?4304)) =<= multiply (inverse (positive_part ?4304)) ?4304 [4304] by Super 81 with 3201 at 1,2
1959 Id : 8905, {_}: ?10899 =<= multiply (inverse (inverse (positive_part ?10899))) (inverse (positive_part (inverse ?10899))) [10899] by Super 8890 with 3231 at 2,3
1960 Id : 8940, {_}: ?10899 =<= inverse (multiply (positive_part (inverse ?10899)) (inverse (positive_part ?10899))) [10899] by Demod 8905 with 14 at 3
1961 Id : 83, {_}: inverse (multiply ?153 (inverse ?152)) =>= multiply ?152 (inverse ?153) [152, 153] by Super 79 with 12 at 1,3
1962 Id : 8941, {_}: ?10899 =<= multiply (positive_part ?10899) (inverse (positive_part (inverse ?10899))) [10899] by Demod 8940 with 83 at 3
1963 Id : 310, {_}: multiply (intersection (inverse ?798) ?797) ?798 =>= intersection identity (multiply ?797 ?798) [797, 798] by Super 303 with 6 at 1,3
1964 Id : 355, {_}: intersection identity ?867 =>= negative_part ?867 [867] by Super 20 with 42 at 3
1965 Id : 15926, {_}: multiply (intersection (inverse ?16735) ?16736) ?16735 =>= negative_part (multiply ?16736 ?16735) [16736, 16735] by Demod 310 with 355 at 3
1966 Id : 15951, {_}: multiply (negative_part (inverse ?16817)) ?16817 =>= negative_part (multiply identity ?16817) [16817] by Super 15926 with 42 at 1,2
1967 Id : 15996, {_}: multiply (negative_part (inverse ?16817)) ?16817 =>= negative_part ?16817 [16817] by Demod 15951 with 4 at 1,3
1968 Id : 237, {_}: multiply (inverse ?620) (intersection ?620 ?621) =>= intersection identity (multiply (inverse ?620) ?621) [621, 620] by Super 230 with 6 at 1,3
1969 Id : 9389, {_}: multiply (inverse ?620) (intersection ?620 ?621) =>= negative_part (multiply (inverse ?620) ?621) [621, 620] by Demod 237 with 355 at 3
1970 Id : 387, {_}: intersection (positive_part ?915) ?915 =>= ?915 [915] by Super 30 with 336 at 1,2
1971 Id : 274, {_}: multiply (union (inverse ?708) ?707) ?708 =>= union identity (multiply ?707 ?708) [707, 708] by Super 267 with 6 at 1,3
1972 Id : 9866, {_}: multiply (union (inverse ?12356) ?12357) ?12356 =>= positive_part (multiply ?12357 ?12356) [12357, 12356] by Demod 274 with 336 at 3
1973 Id : 384, {_}: union identity (union ?906 ?907) =>= union (positive_part ?906) ?907 [907, 906] by Super 26 with 336 at 1,3
1974 Id : 394, {_}: positive_part (union ?906 ?907) =>= union (positive_part ?906) ?907 [907, 906] by Demod 384 with 336 at 2
1975 Id : 339, {_}: union ?842 (union ?843 identity) =>= positive_part (union ?842 ?843) [843, 842] by Super 26 with 40 at 3
1976 Id : 350, {_}: union ?842 (positive_part ?843) =<= positive_part (union ?842 ?843) [843, 842] by Demod 339 with 40 at 2,2
1977 Id : 667, {_}: union ?906 (positive_part ?907) =?= union (positive_part ?906) ?907 [907, 906] by Demod 394 with 350 at 2
1978 Id : 414, {_}: union (negative_part ?942) ?942 =>= ?942 [942] by Super 28 with 355 at 1,2
1979 Id : 479, {_}: multiply ?1021 (intersection ?1022 identity) =?= intersection (multiply ?1021 ?1022) ?1021 [1022, 1021] by Super 34 with 467 at 2,3
1980 Id : 2583, {_}: multiply ?3618 (negative_part ?3619) =<= intersection (multiply ?3618 ?3619) ?3618 [3619, 3618] by Demod 479 with 42 at 2,2
1981 Id : 2585, {_}: multiply (inverse ?3623) (negative_part ?3623) =>= intersection identity (inverse ?3623) [3623] by Super 2583 with 6 at 1,3
1982 Id : 2636, {_}: multiply (inverse ?3692) (negative_part ?3692) =>= negative_part (inverse ?3692) [3692] by Demod 2585 with 355 at 3
1983 Id : 358, {_}: intersection ?874 (intersection ?875 identity) =>= negative_part (intersection ?874 ?875) [875, 874] by Super 24 with 42 at 3
1984 Id : 603, {_}: intersection ?1157 (negative_part ?1158) =<= negative_part (intersection ?1157 ?1158) [1158, 1157] by Demod 358 with 42 at 2,2
1985 Id : 613, {_}: intersection ?1189 (negative_part identity) =>= negative_part (negative_part ?1189) [1189] by Super 603 with 42 at 1,3
1986 Id : 354, {_}: negative_part identity =>= identity [] by Super 16 with 42 at 2
1987 Id : 624, {_}: intersection ?1189 identity =<= negative_part (negative_part ?1189) [1189] by Demod 613 with 354 at 2,2
1988 Id : 625, {_}: negative_part ?1189 =<= negative_part (negative_part ?1189) [1189] by Demod 624 with 42 at 2
1989 Id : 2642, {_}: multiply (inverse (negative_part ?3706)) (negative_part ?3706) =>= negative_part (inverse (negative_part ?3706)) [3706] by Super 2636 with 625 at 2,2
1990 Id : 2662, {_}: identity =<= negative_part (inverse (negative_part ?3706)) [3706] by Demod 2642 with 6 at 2
1991 Id : 2732, {_}: union identity (inverse (negative_part ?3792)) =>= inverse (negative_part ?3792) [3792] by Super 414 with 2662 at 1,2
1992 Id : 2769, {_}: positive_part (inverse (negative_part ?3792)) =>= inverse (negative_part ?3792) [3792] by Demod 2732 with 336 at 2
1993 Id : 2879, {_}: union (inverse (negative_part ?3906)) (positive_part ?3907) =>= union (inverse (negative_part ?3906)) ?3907 [3907, 3906] by Super 667 with 2769 at 1,3
1994 Id : 9889, {_}: multiply (union (inverse (negative_part ?12432)) ?12433) (negative_part ?12432) =>= positive_part (multiply (positive_part ?12433) (negative_part ?12432)) [12433, 12432] by Super 9866 with 2879 at 1,2
1995 Id : 9846, {_}: multiply (union (inverse ?708) ?707) ?708 =>= positive_part (multiply ?707 ?708) [707, 708] by Demod 274 with 336 at 3
1996 Id : 9923, {_}: positive_part (multiply ?12433 (negative_part ?12432)) =<= positive_part (multiply (positive_part ?12433) (negative_part ?12432)) [12432, 12433] by Demod 9889 with 9846 at 2
1997 Id : 492, {_}: multiply ?1021 (negative_part ?1022) =<= intersection (multiply ?1021 ?1022) ?1021 [1022, 1021] by Demod 479 with 42 at 2,2
1998 Id : 9892, {_}: multiply (positive_part (inverse ?12441)) ?12441 =>= positive_part (multiply identity ?12441) [12441] by Super 9866 with 40 at 1,2
1999 Id : 9926, {_}: multiply (positive_part (inverse ?12441)) ?12441 =>= positive_part ?12441 [12441] by Demod 9892 with 4 at 1,3
2000 Id : 9949, {_}: multiply (positive_part (inverse ?12495)) (negative_part ?12495) =>= intersection (positive_part ?12495) (positive_part (inverse ?12495)) [12495] by Super 492 with 9926 at 1,3
2001 Id : 10776, {_}: positive_part (multiply (inverse ?13313) (negative_part ?13313)) =<= positive_part (intersection (positive_part ?13313) (positive_part (inverse ?13313))) [13313] by Super 9923 with 9949 at 1,3
2002 Id : 2613, {_}: multiply (inverse ?3623) (negative_part ?3623) =>= negative_part (inverse ?3623) [3623] by Demod 2585 with 355 at 3
2003 Id : 10814, {_}: positive_part (negative_part (inverse ?13313)) =<= positive_part (intersection (positive_part ?13313) (positive_part (inverse ?13313))) [13313] by Demod 10776 with 2613 at 1,2
2004 Id : 334, {_}: positive_part (intersection ?832 identity) =>= identity [832] by Super 28 with 40 at 2
2005 Id : 507, {_}: positive_part (negative_part ?832) =>= identity [832] by Demod 334 with 42 at 1,2
2006 Id : 10815, {_}: identity =<= positive_part (intersection (positive_part ?13313) (positive_part (inverse ?13313))) [13313] by Demod 10814 with 507 at 2
2007 Id : 51491, {_}: intersection identity (intersection (positive_part ?50477) (positive_part (inverse ?50477))) =>= intersection (positive_part ?50477) (positive_part (inverse ?50477)) [50477] by Super 387 with 10815 at 1,2
2008 Id : 51798, {_}: negative_part (intersection (positive_part ?50477) (positive_part (inverse ?50477))) =>= intersection (positive_part ?50477) (positive_part (inverse ?50477)) [50477] by Demod 51491 with 355 at 2
2009 Id : 369, {_}: intersection ?874 (negative_part ?875) =<= negative_part (intersection ?874 ?875) [875, 874] by Demod 358 with 42 at 2,2
2010 Id : 51799, {_}: intersection (positive_part ?50477) (negative_part (positive_part (inverse ?50477))) =>= intersection (positive_part ?50477) (positive_part (inverse ?50477)) [50477] by Demod 51798 with 369 at 2
2011 Id : 51800, {_}: intersection (negative_part (positive_part (inverse ?50477))) (positive_part ?50477) =>= intersection (positive_part ?50477) (positive_part (inverse ?50477)) [50477] by Demod 51799 with 20 at 2
2012 Id : 411, {_}: intersection identity (intersection ?933 ?934) =>= intersection (negative_part ?933) ?934 [934, 933] by Super 24 with 355 at 1,3
2013 Id : 421, {_}: negative_part (intersection ?933 ?934) =>= intersection (negative_part ?933) ?934 [934, 933] by Demod 411 with 355 at 2
2014 Id : 795, {_}: intersection ?1452 (negative_part ?1453) =?= intersection (negative_part ?1452) ?1453 [1453, 1452] by Demod 421 with 369 at 2
2015 Id : 353, {_}: negative_part (union ?864 identity) =>= identity [864] by Super 30 with 42 at 2
2016 Id : 371, {_}: negative_part (positive_part ?864) =>= identity [864] by Demod 353 with 40 at 1,2
2017 Id : 797, {_}: intersection (positive_part ?1457) (negative_part ?1458) =>= intersection identity ?1458 [1458, 1457] by Super 795 with 371 at 1,3
2018 Id : 834, {_}: intersection (negative_part ?1458) (positive_part ?1457) =>= intersection identity ?1458 [1457, 1458] by Demod 797 with 20 at 2
2019 Id : 835, {_}: intersection (negative_part ?1458) (positive_part ?1457) =>= negative_part ?1458 [1457, 1458] by Demod 834 with 355 at 3
2020 Id : 51801, {_}: negative_part (positive_part (inverse ?50477)) =<= intersection (positive_part ?50477) (positive_part (inverse ?50477)) [50477] by Demod 51800 with 835 at 2
2021 Id : 51802, {_}: identity =<= intersection (positive_part ?50477) (positive_part (inverse ?50477)) [50477] by Demod 51801 with 371 at 2
2022 Id : 52174, {_}: multiply (inverse (positive_part ?50853)) identity =<= negative_part (multiply (inverse (positive_part ?50853)) (positive_part (inverse ?50853))) [50853] by Super 9389 with 51802 at 2,2
2023 Id : 52262, {_}: inverse (positive_part ?50853) =<= negative_part (multiply (inverse (positive_part ?50853)) (positive_part (inverse ?50853))) [50853] by Demod 52174 with 467 at 2
2024 Id : 65, {_}: ?103 =<= multiply (inverse ?102) (multiply ?102 ?103) [102, 103] by Demod 56 with 4 at 2
2025 Id : 9954, {_}: multiply (positive_part (inverse ?12505)) ?12505 =>= positive_part ?12505 [12505] by Demod 9892 with 4 at 1,3
2026 Id : 9956, {_}: multiply (positive_part ?12508) (inverse ?12508) =>= positive_part (inverse ?12508) [12508] by Super 9954 with 12 at 1,1,2
2027 Id : 10049, {_}: inverse ?12562 =<= multiply (inverse (positive_part ?12562)) (positive_part (inverse ?12562)) [12562] by Super 65 with 9956 at 2,3
2028 Id : 52263, {_}: inverse (positive_part ?50853) =<= negative_part (inverse ?50853) [50853] by Demod 52262 with 10049 at 1,3
2029 Id : 52532, {_}: multiply (inverse (positive_part ?16817)) ?16817 =>= negative_part ?16817 [16817] by Demod 15996 with 52263 at 1,2
2030 Id : 52563, {_}: inverse (positive_part (inverse ?16817)) =>= negative_part ?16817 [16817] by Demod 52532 with 3231 at 2
2031 Id : 52572, {_}: ?10899 =<= multiply (positive_part ?10899) (negative_part ?10899) [10899] by Demod 8941 with 52563 at 2,3
2032 Id : 52951, {_}: a === a [] by Demod 2 with 52572 at 2
2033 Id : 2, {_}: multiply (positive_part a) (negative_part a) =>= a [] by prove_product
2034 % SZS output end CNFRefutation for GRP114-1.p
2040 associativity_of_glb is 84
2041 associativity_of_lub is 83
2044 glb_absorbtion is 79
2045 greatest_lower_bound is 94
2046 idempotence_of_gld is 81
2047 idempotence_of_lub is 82
2050 least_upper_bound is 95
2053 lub_absorbtion is 80
2060 symmetry_of_glb is 86
2061 symmetry_of_lub is 85
2063 Id : 4, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
2064 Id : 6, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
2066 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
2067 [8, 7, 6] by associativity ?6 ?7 ?8
2069 greatest_lower_bound ?10 ?11 =?= greatest_lower_bound ?11 ?10
2070 [11, 10] by symmetry_of_glb ?10 ?11
2072 least_upper_bound ?13 ?14 =?= least_upper_bound ?14 ?13
2073 [14, 13] by symmetry_of_lub ?13 ?14
2075 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
2077 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
2078 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
2080 least_upper_bound ?20 (least_upper_bound ?21 ?22)
2082 least_upper_bound (least_upper_bound ?20 ?21) ?22
2083 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
2084 Id : 18, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
2086 greatest_lower_bound ?26 ?26 =>= ?26
2087 [26] by idempotence_of_gld ?26
2089 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
2090 [29, 28] by lub_absorbtion ?28 ?29
2092 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
2093 [32, 31] by glb_absorbtion ?31 ?32
2095 multiply ?34 (least_upper_bound ?35 ?36)
2097 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
2098 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
2100 multiply ?38 (greatest_lower_bound ?39 ?40)
2102 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
2103 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
2105 multiply (least_upper_bound ?42 ?43) ?44
2107 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
2108 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
2110 multiply (greatest_lower_bound ?46 ?47) ?48
2112 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
2113 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
2116 greatest_lower_bound a (least_upper_bound b c)
2118 least_upper_bound (greatest_lower_bound a b)
2119 (greatest_lower_bound a c)
2121 Last chance: 1246057135.58
2122 Last chance: all is indexed 1246058747.63
2123 Last chance: failed over 100 goal 1246058747.74
2124 FAILURE in 0 iterations
2125 % SZS status Timeout for GRP164-2.p
2131 associativity_of_glb is 84
2132 associativity_of_lub is 83
2133 glb_absorbtion is 79
2134 greatest_lower_bound is 88
2135 idempotence_of_gld is 81
2136 idempotence_of_lub is 82
2143 least_upper_bound is 86
2146 lub_absorbtion is 80
2155 symmetry_of_glb is 87
2156 symmetry_of_lub is 85
2158 Id : 4, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
2159 Id : 6, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
2161 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
2162 [8, 7, 6] by associativity ?6 ?7 ?8
2164 greatest_lower_bound ?10 ?11 =?= greatest_lower_bound ?11 ?10
2165 [11, 10] by symmetry_of_glb ?10 ?11
2167 least_upper_bound ?13 ?14 =?= least_upper_bound ?14 ?13
2168 [14, 13] by symmetry_of_lub ?13 ?14
2170 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
2172 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
2173 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
2175 least_upper_bound ?20 (least_upper_bound ?21 ?22)
2177 least_upper_bound (least_upper_bound ?20 ?21) ?22
2178 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
2179 Id : 18, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
2181 greatest_lower_bound ?26 ?26 =>= ?26
2182 [26] by idempotence_of_gld ?26
2184 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
2185 [29, 28] by lub_absorbtion ?28 ?29
2187 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
2188 [32, 31] by glb_absorbtion ?31 ?32
2190 multiply ?34 (least_upper_bound ?35 ?36)
2192 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
2193 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
2195 multiply ?38 (greatest_lower_bound ?39 ?40)
2197 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
2198 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
2200 multiply (least_upper_bound ?42 ?43) ?44
2202 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
2203 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
2205 multiply (greatest_lower_bound ?46 ?47) ?48
2207 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
2208 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
2210 positive_part ?50 =<= least_upper_bound ?50 identity
2213 negative_part ?52 =<= greatest_lower_bound ?52 identity
2216 least_upper_bound ?54 (greatest_lower_bound ?55 ?56)
2218 greatest_lower_bound (least_upper_bound ?54 ?55)
2219 (least_upper_bound ?54 ?56)
2220 [56, 55, 54] by lat4_3 ?54 ?55 ?56
2222 greatest_lower_bound ?58 (least_upper_bound ?59 ?60)
2224 least_upper_bound (greatest_lower_bound ?58 ?59)
2225 (greatest_lower_bound ?58 ?60)
2226 [60, 59, 58] by lat4_4 ?58 ?59 ?60
2229 a =<= multiply (positive_part a) (negative_part a)
2231 Found proof, 4.771401s
2232 % SZS status Unsatisfiable for GRP167-1.p
2233 % SZS output start CNFRefutation for GRP167-1.p
2234 Id : 202, {_}: multiply ?551 (greatest_lower_bound ?552 ?553) =<= greatest_lower_bound (multiply ?551 ?552) (multiply ?551 ?553) [553, 552, 551] by monotony_glb1 ?551 ?552 ?553
2235 Id : 22, {_}: least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28 [29, 28] by lub_absorbtion ?28 ?29
2236 Id : 18, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
2237 Id : 16, {_}: least_upper_bound ?20 (least_upper_bound ?21 ?22) =?= least_upper_bound (least_upper_bound ?20 ?21) ?22 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
2238 Id : 24, {_}: greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31 [32, 31] by glb_absorbtion ?31 ?32
2239 Id : 171, {_}: multiply ?475 (least_upper_bound ?476 ?477) =<= least_upper_bound (multiply ?475 ?476) (multiply ?475 ?477) [477, 476, 475] by monotony_lub1 ?475 ?476 ?477
2240 Id : 14, {_}: greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18) =?= greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
2241 Id : 32, {_}: multiply (greatest_lower_bound ?46 ?47) ?48 =<= greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48) [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
2242 Id : 384, {_}: greatest_lower_bound ?977 (least_upper_bound ?978 ?979) =<= least_upper_bound (greatest_lower_bound ?977 ?978) (greatest_lower_bound ?977 ?979) [979, 978, 977] by lat4_4 ?977 ?978 ?979
2243 Id : 34, {_}: positive_part ?50 =<= least_upper_bound ?50 identity [50] by lat4_1 ?50
2244 Id : 12, {_}: least_upper_bound ?13 ?14 =?= least_upper_bound ?14 ?13 [14, 13] by symmetry_of_lub ?13 ?14
2245 Id : 236, {_}: multiply (least_upper_bound ?630 ?631) ?632 =<= least_upper_bound (multiply ?630 ?632) (multiply ?631 ?632) [632, 631, 630] by monotony_lub2 ?630 ?631 ?632
2246 Id : 36, {_}: negative_part ?52 =<= greatest_lower_bound ?52 identity [52] by lat4_2 ?52
2247 Id : 10, {_}: greatest_lower_bound ?10 ?11 =?= greatest_lower_bound ?11 ?10 [11, 10] by symmetry_of_glb ?10 ?11
2248 Id : 269, {_}: multiply (greatest_lower_bound ?712 ?713) ?714 =<= greatest_lower_bound (multiply ?712 ?714) (multiply ?713 ?714) [714, 713, 712] by monotony_glb2 ?712 ?713 ?714
2249 Id : 4, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
2250 Id : 6, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
2251 Id : 45, {_}: multiply (multiply ?70 ?71) ?72 =?= multiply ?70 (multiply ?71 ?72) [72, 71, 70] by associativity ?70 ?71 ?72
2252 Id : 54, {_}: multiply identity ?105 =<= multiply (inverse ?104) (multiply ?104 ?105) [104, 105] by Super 45 with 6 at 1,2
2253 Id : 63, {_}: ?105 =<= multiply (inverse ?104) (multiply ?104 ?105) [104, 105] by Demod 54 with 4 at 2
2254 Id : 275, {_}: multiply (greatest_lower_bound (inverse ?736) ?735) ?736 =>= greatest_lower_bound identity (multiply ?735 ?736) [735, 736] by Super 269 with 6 at 1,3
2255 Id : 314, {_}: greatest_lower_bound identity ?795 =>= negative_part ?795 [795] by Super 10 with 36 at 3
2256 Id : 16391, {_}: multiply (greatest_lower_bound (inverse ?19768) ?19769) ?19768 =>= negative_part (multiply ?19769 ?19768) [19769, 19768] by Demod 275 with 314 at 3
2257 Id : 16415, {_}: multiply (negative_part (inverse ?19845)) ?19845 =>= negative_part (multiply identity ?19845) [19845] by Super 16391 with 36 at 1,2
2258 Id : 16452, {_}: multiply (negative_part (inverse ?19845)) ?19845 =>= negative_part ?19845 [19845] by Demod 16415 with 4 at 1,3
2259 Id : 16463, {_}: ?19856 =<= multiply (inverse (negative_part (inverse ?19856))) (negative_part ?19856) [19856] by Super 63 with 16452 at 2,3
2260 Id : 242, {_}: multiply (least_upper_bound (inverse ?654) ?653) ?654 =>= least_upper_bound identity (multiply ?653 ?654) [653, 654] by Super 236 with 6 at 1,3
2261 Id : 298, {_}: least_upper_bound identity ?767 =>= positive_part ?767 [767] by Super 12 with 34 at 3
2262 Id : 14215, {_}: multiply (least_upper_bound (inverse ?17599) ?17600) ?17599 =>= positive_part (multiply ?17600 ?17599) [17600, 17599] by Demod 242 with 298 at 3
2263 Id : 14238, {_}: multiply (positive_part (inverse ?17673)) ?17673 =>= positive_part (multiply identity ?17673) [17673] by Super 14215 with 34 at 1,2
2264 Id : 14268, {_}: multiply (positive_part (inverse ?17673)) ?17673 =>= positive_part ?17673 [17673] by Demod 14238 with 4 at 1,3
2265 Id : 14200, {_}: multiply (least_upper_bound (inverse ?654) ?653) ?654 =>= positive_part (multiply ?653 ?654) [653, 654] by Demod 242 with 298 at 3
2266 Id : 393, {_}: greatest_lower_bound ?1016 (least_upper_bound ?1017 identity) =<= least_upper_bound (greatest_lower_bound ?1016 ?1017) (negative_part ?1016) [1017, 1016] by Super 384 with 36 at 2,3
2267 Id : 17844, {_}: greatest_lower_bound ?21384 (positive_part ?21385) =<= least_upper_bound (greatest_lower_bound ?21384 ?21385) (negative_part ?21384) [21385, 21384] by Demod 393 with 34 at 2,2
2268 Id : 17873, {_}: greatest_lower_bound ?21489 (positive_part ?21490) =<= least_upper_bound (greatest_lower_bound ?21490 ?21489) (negative_part ?21489) [21490, 21489] by Super 17844 with 10 at 1,3
2269 Id : 16475, {_}: multiply (greatest_lower_bound (negative_part (inverse ?19889)) ?19890) ?19889 =>= greatest_lower_bound (negative_part ?19889) (multiply ?19890 ?19889) [19890, 19889] by Super 32 with 16452 at 1,3
2270 Id : 480, {_}: greatest_lower_bound identity (greatest_lower_bound ?1137 ?1138) =>= greatest_lower_bound (negative_part ?1137) ?1138 [1138, 1137] by Super 14 with 314 at 1,3
2271 Id : 492, {_}: negative_part (greatest_lower_bound ?1137 ?1138) =>= greatest_lower_bound (negative_part ?1137) ?1138 [1138, 1137] by Demod 480 with 314 at 2
2272 Id : 317, {_}: greatest_lower_bound ?802 (greatest_lower_bound ?803 identity) =>= negative_part (greatest_lower_bound ?802 ?803) [803, 802] by Super 14 with 36 at 3
2273 Id : 326, {_}: greatest_lower_bound ?802 (negative_part ?803) =<= negative_part (greatest_lower_bound ?802 ?803) [803, 802] by Demod 317 with 36 at 2,2
2274 Id : 770, {_}: greatest_lower_bound ?1137 (negative_part ?1138) =?= greatest_lower_bound (negative_part ?1137) ?1138 [1138, 1137] by Demod 492 with 326 at 2
2275 Id : 16503, {_}: multiply (greatest_lower_bound (inverse ?19889) (negative_part ?19890)) ?19889 =>= greatest_lower_bound (negative_part ?19889) (multiply ?19890 ?19889) [19890, 19889] by Demod 16475 with 770 at 1,2
2276 Id : 16376, {_}: multiply (greatest_lower_bound (inverse ?736) ?735) ?736 =>= negative_part (multiply ?735 ?736) [735, 736] by Demod 275 with 314 at 3
2277 Id : 16504, {_}: negative_part (multiply (negative_part ?19890) ?19889) =<= greatest_lower_bound (negative_part ?19889) (multiply ?19890 ?19889) [19889, 19890] by Demod 16503 with 16376 at 2
2278 Id : 16505, {_}: negative_part (multiply (negative_part ?19890) ?19889) =<= greatest_lower_bound (multiply ?19890 ?19889) (negative_part ?19889) [19889, 19890] by Demod 16504 with 10 at 3
2279 Id : 47, {_}: multiply (multiply ?77 (inverse ?78)) ?78 =>= multiply ?77 identity [78, 77] by Super 45 with 6 at 2,3
2280 Id : 4534, {_}: multiply (multiply ?6403 (inverse ?6404)) ?6404 =>= multiply ?6403 identity [6404, 6403] by Super 45 with 6 at 2,3
2281 Id : 4537, {_}: multiply identity ?6410 =<= multiply (inverse (inverse ?6410)) identity [6410] by Super 4534 with 6 at 1,2
2282 Id : 4552, {_}: ?6410 =<= multiply (inverse (inverse ?6410)) identity [6410] by Demod 4537 with 4 at 2
2283 Id : 46, {_}: multiply (multiply ?74 identity) ?75 =>= multiply ?74 ?75 [75, 74] by Super 45 with 4 at 2,3
2284 Id : 4557, {_}: multiply ?6432 ?6433 =<= multiply (inverse (inverse ?6432)) ?6433 [6433, 6432] by Super 46 with 4552 at 1,2
2285 Id : 4577, {_}: ?6410 =<= multiply ?6410 identity [6410] by Demod 4552 with 4557 at 3
2286 Id : 4578, {_}: multiply (multiply ?77 (inverse ?78)) ?78 =>= ?77 [78, 77] by Demod 47 with 4577 at 3
2287 Id : 4593, {_}: inverse (inverse ?6519) =<= multiply ?6519 identity [6519] by Super 4577 with 4557 at 3
2288 Id : 4599, {_}: inverse (inverse ?6519) =>= ?6519 [6519] by Demod 4593 with 4577 at 3
2289 Id : 4627, {_}: multiply (multiply ?6536 ?6535) (inverse ?6535) =>= ?6536 [6535, 6536] by Super 4578 with 4599 at 2,1,2
2290 Id : 62773, {_}: inverse ?65768 =<= multiply (inverse (multiply ?65769 ?65768)) ?65769 [65769, 65768] by Super 63 with 4627 at 2,3
2291 Id : 177, {_}: multiply (inverse ?498) (least_upper_bound ?498 ?499) =>= least_upper_bound identity (multiply (inverse ?498) ?499) [499, 498] by Super 171 with 6 at 1,3
2292 Id : 4722, {_}: multiply (inverse ?6711) (least_upper_bound ?6711 ?6712) =>= positive_part (multiply (inverse ?6711) ?6712) [6712, 6711] by Demod 177 with 298 at 3
2293 Id : 4745, {_}: multiply (inverse ?6778) (positive_part ?6778) =?= positive_part (multiply (inverse ?6778) identity) [6778] by Super 4722 with 34 at 2,2
2294 Id : 4793, {_}: multiply (inverse ?6833) (positive_part ?6833) =>= positive_part (inverse ?6833) [6833] by Demod 4745 with 4577 at 1,3
2295 Id : 4805, {_}: multiply ?6862 (positive_part (inverse ?6862)) =>= positive_part (inverse (inverse ?6862)) [6862] by Super 4793 with 4599 at 1,2
2296 Id : 4824, {_}: multiply ?6862 (positive_part (inverse ?6862)) =>= positive_part ?6862 [6862] by Demod 4805 with 4599 at 1,3
2297 Id : 62790, {_}: inverse (positive_part (inverse ?65816)) =<= multiply (inverse (positive_part ?65816)) ?65816 [65816] by Super 62773 with 4824 at 1,1,3
2298 Id : 63210, {_}: negative_part (multiply (negative_part (inverse (positive_part ?66345))) ?66345) =>= greatest_lower_bound (inverse (positive_part (inverse ?66345))) (negative_part ?66345) [66345] by Super 16505 with 62790 at 1,3
2299 Id : 303, {_}: greatest_lower_bound ?780 (positive_part ?780) =>= ?780 [780] by Super 24 with 34 at 2,2
2300 Id : 535, {_}: greatest_lower_bound (positive_part ?1185) ?1185 =>= ?1185 [1185] by Super 10 with 303 at 3
2301 Id : 301, {_}: least_upper_bound ?774 (least_upper_bound ?775 identity) =>= positive_part (least_upper_bound ?774 ?775) [775, 774] by Super 16 with 34 at 3
2302 Id : 566, {_}: least_upper_bound ?1228 (positive_part ?1229) =<= positive_part (least_upper_bound ?1228 ?1229) [1229, 1228] by Demod 301 with 34 at 2,2
2303 Id : 576, {_}: least_upper_bound ?1260 (positive_part identity) =>= positive_part (positive_part ?1260) [1260] by Super 566 with 34 at 1,3
2304 Id : 297, {_}: positive_part identity =>= identity [] by Super 18 with 34 at 2
2305 Id : 590, {_}: least_upper_bound ?1260 identity =<= positive_part (positive_part ?1260) [1260] by Demod 576 with 297 at 2,2
2306 Id : 591, {_}: positive_part ?1260 =<= positive_part (positive_part ?1260) [1260] by Demod 590 with 34 at 2
2307 Id : 4802, {_}: multiply (inverse (positive_part ?6856)) (positive_part ?6856) =>= positive_part (inverse (positive_part ?6856)) [6856] by Super 4793 with 591 at 2,2
2308 Id : 4819, {_}: identity =<= positive_part (inverse (positive_part ?6856)) [6856] by Demod 4802 with 6 at 2
2309 Id : 4905, {_}: greatest_lower_bound identity (inverse (positive_part ?6968)) =>= inverse (positive_part ?6968) [6968] by Super 535 with 4819 at 1,2
2310 Id : 4952, {_}: negative_part (inverse (positive_part ?6968)) =>= inverse (positive_part ?6968) [6968] by Demod 4905 with 314 at 2
2311 Id : 63307, {_}: negative_part (multiply (inverse (positive_part ?66345)) ?66345) =<= greatest_lower_bound (inverse (positive_part (inverse ?66345))) (negative_part ?66345) [66345] by Demod 63210 with 4952 at 1,1,2
2312 Id : 63308, {_}: negative_part (inverse (positive_part (inverse ?66345))) =<= greatest_lower_bound (inverse (positive_part (inverse ?66345))) (negative_part ?66345) [66345] by Demod 63307 with 62790 at 1,2
2313 Id : 63309, {_}: inverse (positive_part (inverse ?66345)) =<= greatest_lower_bound (inverse (positive_part (inverse ?66345))) (negative_part ?66345) [66345] by Demod 63308 with 4952 at 2
2314 Id : 5097, {_}: greatest_lower_bound (inverse (positive_part ?7140)) (negative_part ?7141) =>= greatest_lower_bound (inverse (positive_part ?7140)) ?7141 [7141, 7140] by Super 770 with 4952 at 1,3
2315 Id : 63310, {_}: inverse (positive_part (inverse ?66345)) =<= greatest_lower_bound (inverse (positive_part (inverse ?66345))) ?66345 [66345] by Demod 63309 with 5097 at 3
2316 Id : 63817, {_}: greatest_lower_bound ?66966 (positive_part (inverse (positive_part (inverse ?66966)))) =>= least_upper_bound (inverse (positive_part (inverse ?66966))) (negative_part ?66966) [66966] by Super 17873 with 63310 at 1,3
2317 Id : 64085, {_}: greatest_lower_bound ?66966 identity =<= least_upper_bound (inverse (positive_part (inverse ?66966))) (negative_part ?66966) [66966] by Demod 63817 with 4819 at 2,2
2318 Id : 64086, {_}: negative_part ?66966 =<= least_upper_bound (inverse (positive_part (inverse ?66966))) (negative_part ?66966) [66966] by Demod 64085 with 36 at 2
2319 Id : 81154, {_}: multiply (negative_part ?80770) (positive_part (inverse ?80770)) =<= positive_part (multiply (negative_part ?80770) (positive_part (inverse ?80770))) [80770] by Super 14200 with 64086 at 1,2
2320 Id : 4710, {_}: multiply (inverse ?498) (least_upper_bound ?498 ?499) =>= positive_part (multiply (inverse ?498) ?499) [499, 498] by Demod 177 with 298 at 3
2321 Id : 444, {_}: least_upper_bound identity (least_upper_bound ?1100 ?1101) =>= least_upper_bound (positive_part ?1100) ?1101 [1101, 1100] by Super 16 with 298 at 1,3
2322 Id : 455, {_}: positive_part (least_upper_bound ?1100 ?1101) =>= least_upper_bound (positive_part ?1100) ?1101 [1101, 1100] by Demod 444 with 298 at 2
2323 Id : 310, {_}: least_upper_bound ?774 (positive_part ?775) =<= positive_part (least_upper_bound ?774 ?775) [775, 774] by Demod 301 with 34 at 2,2
2324 Id : 677, {_}: least_upper_bound ?1100 (positive_part ?1101) =?= least_upper_bound (positive_part ?1100) ?1101 [1101, 1100] by Demod 455 with 310 at 2
2325 Id : 483, {_}: least_upper_bound identity (negative_part ?1146) =>= identity [1146] by Super 22 with 314 at 2,2
2326 Id : 491, {_}: positive_part (negative_part ?1146) =>= identity [1146] by Demod 483 with 298 at 2
2327 Id : 4795, {_}: multiply (inverse (negative_part ?6836)) identity =>= positive_part (inverse (negative_part ?6836)) [6836] by Super 4793 with 491 at 2,2
2328 Id : 4816, {_}: inverse (negative_part ?6836) =<= positive_part (inverse (negative_part ?6836)) [6836] by Demod 4795 with 4577 at 2
2329 Id : 4838, {_}: least_upper_bound (inverse (negative_part ?6900)) (positive_part ?6901) =>= least_upper_bound (inverse (negative_part ?6900)) ?6901 [6901, 6900] by Super 677 with 4816 at 1,3
2330 Id : 6365, {_}: multiply (inverse (inverse (negative_part ?8525))) (least_upper_bound (inverse (negative_part ?8525)) ?8526) =>= positive_part (multiply (inverse (inverse (negative_part ?8525))) (positive_part ?8526)) [8526, 8525] by Super 4710 with 4838 at 2,2
2331 Id : 6403, {_}: positive_part (multiply (inverse (inverse (negative_part ?8525))) ?8526) =<= positive_part (multiply (inverse (inverse (negative_part ?8525))) (positive_part ?8526)) [8526, 8525] by Demod 6365 with 4710 at 2
2332 Id : 6404, {_}: positive_part (multiply (negative_part ?8525) ?8526) =<= positive_part (multiply (inverse (inverse (negative_part ?8525))) (positive_part ?8526)) [8526, 8525] by Demod 6403 with 4599 at 1,1,2
2333 Id : 6405, {_}: positive_part (multiply (negative_part ?8525) ?8526) =<= positive_part (multiply (negative_part ?8525) (positive_part ?8526)) [8526, 8525] by Demod 6404 with 4599 at 1,1,3
2334 Id : 81274, {_}: multiply (negative_part ?80770) (positive_part (inverse ?80770)) =<= positive_part (multiply (negative_part ?80770) (inverse ?80770)) [80770] by Demod 81154 with 6405 at 3
2335 Id : 16478, {_}: multiply (negative_part (inverse ?19896)) ?19896 =>= negative_part ?19896 [19896] by Demod 16415 with 4 at 1,3
2336 Id : 16480, {_}: multiply (negative_part ?19899) (inverse ?19899) =>= negative_part (inverse ?19899) [19899] by Super 16478 with 4599 at 1,1,2
2337 Id : 81275, {_}: multiply (negative_part ?80770) (positive_part (inverse ?80770)) =>= positive_part (negative_part (inverse ?80770)) [80770] by Demod 81274 with 16480 at 1,3
2338 Id : 81276, {_}: multiply (negative_part ?80770) (positive_part (inverse ?80770)) =>= identity [80770] by Demod 81275 with 491 at 3
2339 Id : 81601, {_}: positive_part (inverse ?81005) =<= multiply (inverse (negative_part ?81005)) identity [81005] by Super 63 with 81276 at 2,3
2340 Id : 81716, {_}: positive_part (inverse ?81005) =>= inverse (negative_part ?81005) [81005] by Demod 81601 with 4577 at 3
2341 Id : 81904, {_}: multiply (inverse (negative_part ?17673)) ?17673 =>= positive_part ?17673 [17673] by Demod 14268 with 81716 at 1,2
2342 Id : 208, {_}: multiply (inverse ?574) (greatest_lower_bound ?574 ?575) =>= greatest_lower_bound identity (multiply (inverse ?574) ?575) [575, 574] by Super 202 with 6 at 1,3
2343 Id : 13518, {_}: multiply (inverse ?16653) (greatest_lower_bound ?16653 ?16654) =>= negative_part (multiply (inverse ?16653) ?16654) [16654, 16653] by Demod 208 with 314 at 3
2344 Id : 13544, {_}: multiply (inverse ?16729) (negative_part ?16729) =?= negative_part (multiply (inverse ?16729) identity) [16729] by Super 13518 with 36 at 2,2
2345 Id : 13624, {_}: multiply (inverse ?16816) (negative_part ?16816) =>= negative_part (inverse ?16816) [16816] by Demod 13544 with 4577 at 1,3
2346 Id : 13651, {_}: multiply ?16885 (negative_part (inverse ?16885)) =>= negative_part (inverse (inverse ?16885)) [16885] by Super 13624 with 4599 at 1,2
2347 Id : 13713, {_}: multiply ?16885 (negative_part (inverse ?16885)) =>= negative_part ?16885 [16885] by Demod 13651 with 4599 at 1,3
2348 Id : 62794, {_}: inverse (negative_part (inverse ?65826)) =<= multiply (inverse (negative_part ?65826)) ?65826 [65826] by Super 62773 with 13713 at 1,1,3
2349 Id : 81928, {_}: inverse (negative_part (inverse ?17673)) =>= positive_part ?17673 [17673] by Demod 81904 with 62794 at 2
2350 Id : 81935, {_}: ?19856 =<= multiply (positive_part ?19856) (negative_part ?19856) [19856] by Demod 16463 with 81928 at 1,3
2351 Id : 82404, {_}: a === a [] by Demod 2 with 81935 at 3
2352 Id : 2, {_}: a =<= multiply (positive_part a) (negative_part a) [] by prove_lat4
2353 % SZS output end CNFRefutation for GRP167-1.p
2359 associativity_of_glb is 84
2360 associativity_of_lub is 83
2363 glb_absorbtion is 79
2364 greatest_lower_bound is 94
2365 idempotence_of_gld is 81
2366 idempotence_of_lub is 82
2369 least_upper_bound is 86
2372 lub_absorbtion is 80
2383 symmetry_of_glb is 87
2384 symmetry_of_lub is 85
2386 Id : 4, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
2387 Id : 6, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
2389 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
2390 [8, 7, 6] by associativity ?6 ?7 ?8
2392 greatest_lower_bound ?10 ?11 =?= greatest_lower_bound ?11 ?10
2393 [11, 10] by symmetry_of_glb ?10 ?11
2395 least_upper_bound ?13 ?14 =?= least_upper_bound ?14 ?13
2396 [14, 13] by symmetry_of_lub ?13 ?14
2398 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
2400 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
2401 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
2403 least_upper_bound ?20 (least_upper_bound ?21 ?22)
2405 least_upper_bound (least_upper_bound ?20 ?21) ?22
2406 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
2407 Id : 18, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
2409 greatest_lower_bound ?26 ?26 =>= ?26
2410 [26] by idempotence_of_gld ?26
2412 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
2413 [29, 28] by lub_absorbtion ?28 ?29
2415 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
2416 [32, 31] by glb_absorbtion ?31 ?32
2418 multiply ?34 (least_upper_bound ?35 ?36)
2420 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
2421 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
2423 multiply ?38 (greatest_lower_bound ?39 ?40)
2425 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
2426 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
2428 multiply (least_upper_bound ?42 ?43) ?44
2430 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
2431 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
2433 multiply (greatest_lower_bound ?46 ?47) ?48
2435 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
2436 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
2437 Id : 34, {_}: greatest_lower_bound identity a =>= identity [] by p09b_1
2438 Id : 36, {_}: greatest_lower_bound identity b =>= identity [] by p09b_2
2439 Id : 38, {_}: greatest_lower_bound identity c =>= identity [] by p09b_3
2440 Id : 40, {_}: greatest_lower_bound a b =>= identity [] by p09b_4
2443 greatest_lower_bound a (multiply b c) =>= greatest_lower_bound a c
2445 Found proof, 197.640612s
2446 % SZS status Unsatisfiable for GRP178-2.p
2447 % SZS output start CNFRefutation for GRP178-2.p
2448 Id : 38, {_}: greatest_lower_bound identity c =>= identity [] by p09b_3
2449 Id : 30, {_}: multiply (least_upper_bound ?42 ?43) ?44 =<= least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44) [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
2450 Id : 32, {_}: multiply (greatest_lower_bound ?46 ?47) ?48 =<= greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48) [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
2451 Id : 20, {_}: greatest_lower_bound ?26 ?26 =>= ?26 [26] by idempotence_of_gld ?26
2452 Id : 34, {_}: greatest_lower_bound identity a =>= identity [] by p09b_1
2453 Id : 16, {_}: least_upper_bound ?20 (least_upper_bound ?21 ?22) =?= least_upper_bound (least_upper_bound ?20 ?21) ?22 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
2454 Id : 40, {_}: greatest_lower_bound a b =>= identity [] by p09b_4
2455 Id : 22, {_}: least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28 [29, 28] by lub_absorbtion ?28 ?29
2456 Id : 171, {_}: multiply ?467 (least_upper_bound ?468 ?469) =<= least_upper_bound (multiply ?467 ?468) (multiply ?467 ?469) [469, 468, 467] by monotony_lub1 ?467 ?468 ?469
2457 Id : 12, {_}: least_upper_bound ?13 ?14 =?= least_upper_bound ?14 ?13 [14, 13] by symmetry_of_lub ?13 ?14
2458 Id : 24, {_}: greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31 [32, 31] by glb_absorbtion ?31 ?32
2459 Id : 14, {_}: greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18) =?= greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
2460 Id : 202, {_}: multiply ?543 (greatest_lower_bound ?544 ?545) =<= greatest_lower_bound (multiply ?543 ?544) (multiply ?543 ?545) [545, 544, 543] by monotony_glb1 ?543 ?544 ?545
2461 Id : 28, {_}: multiply ?38 (greatest_lower_bound ?39 ?40) =<= greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40) [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
2462 Id : 4, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
2463 Id : 6, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
2464 Id : 45, {_}: multiply (multiply ?62 ?63) ?64 =?= multiply ?62 (multiply ?63 ?64) [64, 63, 62] by associativity ?62 ?63 ?64
2465 Id : 8, {_}: multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8) [8, 7, 6] by associativity ?6 ?7 ?8
2466 Id : 10, {_}: greatest_lower_bound ?10 ?11 =?= greatest_lower_bound ?11 ?10 [11, 10] by symmetry_of_glb ?10 ?11
2467 Id : 54, {_}: multiply identity ?97 =<= multiply (inverse ?96) (multiply ?96 ?97) [96, 97] by Super 45 with 6 at 1,2
2468 Id : 63, {_}: ?97 =<= multiply (inverse ?96) (multiply ?96 ?97) [96, 97] by Demod 54 with 4 at 2
2469 Id : 47, {_}: multiply (multiply ?69 (inverse ?70)) ?70 =>= multiply ?69 identity [70, 69] by Super 45 with 6 at 2,3
2470 Id : 9265, {_}: multiply (multiply ?8232 (inverse ?8233)) ?8233 =>= multiply ?8232 identity [8233, 8232] by Super 45 with 6 at 2,3
2471 Id : 9268, {_}: multiply identity ?8239 =<= multiply (inverse (inverse ?8239)) identity [8239] by Super 9265 with 6 at 1,2
2472 Id : 9283, {_}: ?8239 =<= multiply (inverse (inverse ?8239)) identity [8239] by Demod 9268 with 4 at 2
2473 Id : 46, {_}: multiply (multiply ?66 identity) ?67 =>= multiply ?66 ?67 [67, 66] by Super 45 with 4 at 2,3
2474 Id : 9288, {_}: multiply ?8261 ?8262 =<= multiply (inverse (inverse ?8261)) ?8262 [8262, 8261] by Super 46 with 9283 at 1,2
2475 Id : 9304, {_}: ?8239 =<= multiply ?8239 identity [8239] by Demod 9283 with 9288 at 3
2476 Id : 9305, {_}: multiply (multiply ?69 (inverse ?70)) ?70 =>= ?69 [70, 69] by Demod 47 with 9304 at 3
2477 Id : 9320, {_}: inverse (inverse ?8348) =<= multiply ?8348 identity [8348] by Super 9304 with 9288 at 3
2478 Id : 9326, {_}: inverse (inverse ?8348) =>= ?8348 [8348] by Demod 9320 with 9304 at 3
2479 Id : 9354, {_}: multiply (multiply ?8365 ?8364) (inverse ?8364) =>= ?8365 [8364, 8365] by Super 9305 with 9326 at 2,1,2
2480 Id : 9315, {_}: multiply ?8330 (inverse ?8330) =>= identity [8330] by Super 6 with 9288 at 2
2481 Id : 9365, {_}: multiply ?8382 (greatest_lower_bound ?8383 (inverse ?8382)) =>= greatest_lower_bound (multiply ?8382 ?8383) identity [8383, 8382] by Super 28 with 9315 at 2,3
2482 Id : 9386, {_}: multiply ?8382 (greatest_lower_bound ?8383 (inverse ?8382)) =>= greatest_lower_bound identity (multiply ?8382 ?8383) [8383, 8382] by Demod 9365 with 10 at 3
2483 Id : 137579, {_}: multiply (inverse ?85743) (greatest_lower_bound ?85743 ?85744) =>= greatest_lower_bound identity (multiply (inverse ?85743) ?85744) [85744, 85743] by Super 202 with 6 at 1,3
2484 Id : 4862, {_}: greatest_lower_bound (least_upper_bound ?4719 ?4720) ?4719 =>= ?4719 [4720, 4719] by Super 10 with 24 at 3
2485 Id : 4863, {_}: greatest_lower_bound (least_upper_bound ?4723 ?4722) ?4722 =>= ?4722 [4722, 4723] by Super 4862 with 12 at 1,2
2486 Id : 173, {_}: multiply (inverse ?475) (least_upper_bound ?474 ?475) =>= least_upper_bound (multiply (inverse ?475) ?474) identity [474, 475] by Super 171 with 6 at 2,3
2487 Id : 9616, {_}: multiply (inverse ?8736) (least_upper_bound ?8737 ?8736) =>= least_upper_bound identity (multiply (inverse ?8736) ?8737) [8737, 8736] by Demod 173 with 12 at 3
2488 Id : 336, {_}: greatest_lower_bound b a =>= identity [] by Demod 40 with 10 at 2
2489 Id : 337, {_}: least_upper_bound b identity =>= b [] by Super 22 with 336 at 2,2
2490 Id : 349, {_}: least_upper_bound identity b =>= b [] by Demod 337 with 12 at 2
2491 Id : 9624, {_}: multiply (inverse b) b =<= least_upper_bound identity (multiply (inverse b) identity) [] by Super 9616 with 349 at 2,2
2492 Id : 9699, {_}: identity =<= least_upper_bound identity (multiply (inverse b) identity) [] by Demod 9624 with 6 at 2
2493 Id : 9700, {_}: identity =<= least_upper_bound identity (inverse b) [] by Demod 9699 with 9304 at 2,3
2494 Id : 9734, {_}: greatest_lower_bound identity (inverse b) =>= inverse b [] by Super 4863 with 9700 at 1,2
2495 Id : 9886, {_}: greatest_lower_bound ?8962 (inverse b) =<= greatest_lower_bound (greatest_lower_bound ?8962 identity) (inverse b) [8962] by Super 14 with 9734 at 2,2
2496 Id : 9910, {_}: greatest_lower_bound ?8962 (inverse b) =<= greatest_lower_bound (inverse b) (greatest_lower_bound ?8962 identity) [8962] by Demod 9886 with 10 at 3
2497 Id : 138060, {_}: multiply (inverse (inverse b)) (greatest_lower_bound ?86438 (inverse b)) =<= greatest_lower_bound identity (multiply (inverse (inverse b)) (greatest_lower_bound ?86438 identity)) [86438] by Super 137579 with 9910 at 2,2
2498 Id : 139832, {_}: multiply b (greatest_lower_bound ?86438 (inverse b)) =<= greatest_lower_bound identity (multiply (inverse (inverse b)) (greatest_lower_bound ?86438 identity)) [86438] by Demod 138060 with 9326 at 1,2
2499 Id : 139833, {_}: multiply b (greatest_lower_bound ?86438 (inverse b)) =<= greatest_lower_bound identity (multiply b (greatest_lower_bound ?86438 identity)) [86438] by Demod 139832 with 9326 at 1,2,3
2500 Id : 190, {_}: multiply (inverse ?475) (least_upper_bound ?474 ?475) =>= least_upper_bound identity (multiply (inverse ?475) ?474) [474, 475] by Demod 173 with 12 at 3
2501 Id : 299, {_}: greatest_lower_bound ?761 identity =<= greatest_lower_bound (greatest_lower_bound ?761 identity) a [761] by Super 14 with 34 at 2,2
2502 Id : 308, {_}: greatest_lower_bound ?761 identity =<= greatest_lower_bound a (greatest_lower_bound ?761 identity) [761] by Demod 299 with 10 at 3
2503 Id : 691, {_}: least_upper_bound a (greatest_lower_bound ?1150 identity) =>= a [1150] by Super 22 with 308 at 2,2
2504 Id : 693, {_}: least_upper_bound a identity =>= a [] by Super 691 with 20 at 2,2
2505 Id : 704, {_}: least_upper_bound identity a =>= a [] by Demod 693 with 12 at 2
2506 Id : 707, {_}: least_upper_bound ?1166 a =<= least_upper_bound (least_upper_bound ?1166 identity) a [1166] by Super 16 with 704 at 2,2
2507 Id : 1790, {_}: least_upper_bound ?1985 a =<= least_upper_bound a (least_upper_bound ?1985 identity) [1985] by Demod 707 with 12 at 3
2508 Id : 1791, {_}: least_upper_bound ?1987 a =<= least_upper_bound a (least_upper_bound identity ?1987) [1987] by Super 1790 with 12 at 2,3
2509 Id : 9745, {_}: least_upper_bound (inverse b) a =>= least_upper_bound a identity [] by Super 1791 with 9700 at 2,3
2510 Id : 9760, {_}: least_upper_bound a (inverse b) =>= least_upper_bound a identity [] by Demod 9745 with 12 at 2
2511 Id : 9761, {_}: least_upper_bound a (inverse b) =>= least_upper_bound identity a [] by Demod 9760 with 12 at 3
2512 Id : 9762, {_}: least_upper_bound a (inverse b) =>= a [] by Demod 9761 with 704 at 3
2513 Id : 9940, {_}: multiply (inverse (inverse b)) a =<= least_upper_bound identity (multiply (inverse (inverse b)) a) [] by Super 190 with 9762 at 2,2
2514 Id : 9943, {_}: multiply b a =<= least_upper_bound identity (multiply (inverse (inverse b)) a) [] by Demod 9940 with 9326 at 1,2
2515 Id : 9944, {_}: multiply b a =<= least_upper_bound identity (multiply b a) [] by Demod 9943 with 9326 at 1,2,3
2516 Id : 10784, {_}: greatest_lower_bound identity (multiply b a) =>= identity [] by Super 24 with 9944 at 2,2
2517 Id : 47323, {_}: greatest_lower_bound identity (greatest_lower_bound (multiply b a) ?32510) =>= greatest_lower_bound identity ?32510 [32510] by Super 14 with 10784 at 1,3
2518 Id : 69234, {_}: greatest_lower_bound identity (multiply b (greatest_lower_bound a ?46169)) =>= greatest_lower_bound identity (multiply b ?46169) [46169] by Super 47323 with 28 at 2,2
2519 Id : 339, {_}: greatest_lower_bound ?788 identity =<= greatest_lower_bound (greatest_lower_bound ?788 b) a [788] by Super 14 with 336 at 2,2
2520 Id : 348, {_}: greatest_lower_bound ?788 identity =<= greatest_lower_bound a (greatest_lower_bound ?788 b) [788] by Demod 339 with 10 at 3
2521 Id : 69253, {_}: greatest_lower_bound identity (multiply b (greatest_lower_bound ?46206 identity)) =<= greatest_lower_bound identity (multiply b (greatest_lower_bound ?46206 b)) [46206] by Super 69234 with 348 at 2,2,2
2522 Id : 353, {_}: least_upper_bound ?797 b =<= least_upper_bound (least_upper_bound ?797 identity) b [797] by Super 16 with 349 at 2,2
2523 Id : 607, {_}: least_upper_bound ?1066 b =<= least_upper_bound b (least_upper_bound ?1066 identity) [1066] by Demod 353 with 12 at 3
2524 Id : 608, {_}: least_upper_bound ?1068 b =<= least_upper_bound b (least_upper_bound identity ?1068) [1068] by Super 607 with 12 at 2,3
2525 Id : 9739, {_}: least_upper_bound (inverse b) b =>= least_upper_bound b identity [] by Super 608 with 9700 at 2,3
2526 Id : 9768, {_}: least_upper_bound b (inverse b) =>= least_upper_bound b identity [] by Demod 9739 with 12 at 2
2527 Id : 9769, {_}: least_upper_bound b (inverse b) =>= least_upper_bound identity b [] by Demod 9768 with 12 at 3
2528 Id : 9770, {_}: least_upper_bound b (inverse b) =>= b [] by Demod 9769 with 349 at 3
2529 Id : 9967, {_}: multiply (inverse (inverse b)) b =<= least_upper_bound identity (multiply (inverse (inverse b)) b) [] by Super 190 with 9770 at 2,2
2530 Id : 10010, {_}: multiply b b =<= least_upper_bound identity (multiply (inverse (inverse b)) b) [] by Demod 9967 with 9326 at 1,2
2531 Id : 10011, {_}: multiply b b =<= least_upper_bound identity (multiply b b) [] by Demod 10010 with 9326 at 1,2,3
2532 Id : 10830, {_}: greatest_lower_bound identity (multiply b b) =>= identity [] by Super 24 with 10011 at 2,2
2533 Id : 11235, {_}: greatest_lower_bound ?9614 identity =<= greatest_lower_bound (greatest_lower_bound ?9614 identity) (multiply b b) [9614] by Super 14 with 10830 at 2,2
2534 Id : 394, {_}: greatest_lower_bound ?844 identity =<= greatest_lower_bound a (greatest_lower_bound ?844 identity) [844] by Demod 299 with 10 at 3
2535 Id : 395, {_}: greatest_lower_bound ?846 identity =<= greatest_lower_bound a (greatest_lower_bound identity ?846) [846] by Super 394 with 10 at 2,3
2536 Id : 721, {_}: greatest_lower_bound a (greatest_lower_bound (greatest_lower_bound identity ?1178) ?1179) =>= greatest_lower_bound (greatest_lower_bound ?1178 identity) ?1179 [1179, 1178] by Super 14 with 395 at 1,3
2537 Id : 751, {_}: greatest_lower_bound a (greatest_lower_bound identity (greatest_lower_bound ?1178 ?1179)) =>= greatest_lower_bound (greatest_lower_bound ?1178 identity) ?1179 [1179, 1178] by Demod 721 with 14 at 2,2
2538 Id : 752, {_}: greatest_lower_bound (greatest_lower_bound ?1178 ?1179) identity =?= greatest_lower_bound (greatest_lower_bound ?1178 identity) ?1179 [1179, 1178] by Demod 751 with 395 at 2
2539 Id : 753, {_}: greatest_lower_bound identity (greatest_lower_bound ?1178 ?1179) =<= greatest_lower_bound (greatest_lower_bound ?1178 identity) ?1179 [1179, 1178] by Demod 752 with 10 at 2
2540 Id : 47765, {_}: greatest_lower_bound ?32774 identity =<= greatest_lower_bound identity (greatest_lower_bound ?32774 (multiply b b)) [32774] by Demod 11235 with 753 at 3
2541 Id : 47777, {_}: greatest_lower_bound (multiply b ?32794) identity =<= greatest_lower_bound identity (multiply b (greatest_lower_bound ?32794 b)) [32794] by Super 47765 with 28 at 2,3
2542 Id : 47888, {_}: greatest_lower_bound identity (multiply b ?32794) =<= greatest_lower_bound identity (multiply b (greatest_lower_bound ?32794 b)) [32794] by Demod 47777 with 10 at 2
2543 Id : 112860, {_}: greatest_lower_bound identity (multiply b (greatest_lower_bound ?46206 identity)) =>= greatest_lower_bound identity (multiply b ?46206) [46206] by Demod 69253 with 47888 at 3
2544 Id : 139834, {_}: multiply b (greatest_lower_bound ?86438 (inverse b)) =>= greatest_lower_bound identity (multiply b ?86438) [86438] by Demod 139833 with 112860 at 3
2545 Id : 758814, {_}: greatest_lower_bound ?433915 (inverse b) =<= multiply (inverse b) (greatest_lower_bound identity (multiply b ?433915)) [433915] by Super 63 with 139834 at 2,3
2546 Id : 9363, {_}: multiply (greatest_lower_bound ?8377 ?8376) (inverse ?8376) =>= greatest_lower_bound (multiply ?8377 (inverse ?8376)) identity [8376, 8377] by Super 32 with 9315 at 2,3
2547 Id : 389839, {_}: multiply (greatest_lower_bound ?219201 ?219202) (inverse ?219202) =>= greatest_lower_bound identity (multiply ?219201 (inverse ?219202)) [219202, 219201] by Demod 9363 with 10 at 3
2548 Id : 389867, {_}: multiply identity (inverse a) =<= greatest_lower_bound identity (multiply b (inverse a)) [] by Super 389839 with 336 at 1,2
2549 Id : 390920, {_}: inverse a =<= greatest_lower_bound identity (multiply b (inverse a)) [] by Demod 389867 with 4 at 2
2550 Id : 758889, {_}: greatest_lower_bound (inverse a) (inverse b) =<= multiply (inverse b) (inverse a) [] by Super 758814 with 390920 at 2,3
2551 Id : 759137, {_}: greatest_lower_bound (inverse b) (inverse a) =<= multiply (inverse b) (inverse a) [] by Demod 758889 with 10 at 2
2552 Id : 9373, {_}: multiply (least_upper_bound ?8405 ?8404) (inverse ?8404) =>= least_upper_bound (multiply ?8405 (inverse ?8404)) identity [8404, 8405] by Super 30 with 9315 at 2,3
2553 Id : 379748, {_}: multiply (least_upper_bound ?213200 ?213201) (inverse ?213201) =>= least_upper_bound identity (multiply ?213200 (inverse ?213201)) [213201, 213200] by Demod 9373 with 12 at 3
2554 Id : 9632, {_}: multiply (inverse a) a =<= least_upper_bound identity (multiply (inverse a) identity) [] by Super 9616 with 704 at 2,2
2555 Id : 9704, {_}: identity =<= least_upper_bound identity (multiply (inverse a) identity) [] by Demod 9632 with 6 at 2
2556 Id : 9705, {_}: identity =<= least_upper_bound identity (inverse a) [] by Demod 9704 with 9304 at 2,3
2557 Id : 9791, {_}: least_upper_bound (inverse a) b =>= least_upper_bound b identity [] by Super 608 with 9705 at 2,3
2558 Id : 9810, {_}: least_upper_bound b (inverse a) =>= least_upper_bound b identity [] by Demod 9791 with 12 at 2
2559 Id : 9811, {_}: least_upper_bound b (inverse a) =>= least_upper_bound identity b [] by Demod 9810 with 12 at 3
2560 Id : 9812, {_}: least_upper_bound b (inverse a) =>= b [] by Demod 9811 with 349 at 3
2561 Id : 10144, {_}: multiply (inverse (inverse a)) b =<= least_upper_bound identity (multiply (inverse (inverse a)) b) [] by Super 190 with 9812 at 2,2
2562 Id : 10186, {_}: multiply a b =<= least_upper_bound identity (multiply (inverse (inverse a)) b) [] by Demod 10144 with 9326 at 1,2
2563 Id : 10187, {_}: multiply a b =<= least_upper_bound identity (multiply a b) [] by Demod 10186 with 9326 at 1,2,3
2564 Id : 380544, {_}: multiply (multiply a b) (inverse (multiply a b)) =>= least_upper_bound identity (multiply identity (inverse (multiply a b))) [] by Super 379748 with 10187 at 1,2
2565 Id : 382056, {_}: multiply a (multiply b (inverse (multiply a b))) =>= least_upper_bound identity (multiply identity (inverse (multiply a b))) [] by Demod 380544 with 8 at 2
2566 Id : 382057, {_}: multiply a (multiply b (inverse (multiply a b))) =>= least_upper_bound identity (inverse (multiply a b)) [] by Demod 382056 with 4 at 2,3
2567 Id : 10969, {_}: multiply (inverse (multiply a b)) (multiply a b) =>= least_upper_bound identity (multiply (inverse (multiply a b)) identity) [] by Super 190 with 10187 at 2,2
2568 Id : 10972, {_}: identity =<= least_upper_bound identity (multiply (inverse (multiply a b)) identity) [] by Demod 10969 with 6 at 2
2569 Id : 10973, {_}: identity =<= least_upper_bound identity (inverse (multiply a b)) [] by Demod 10972 with 9304 at 2,3
2570 Id : 382058, {_}: multiply a (multiply b (inverse (multiply a b))) =>= identity [] by Demod 382057 with 10973 at 3
2571 Id : 383433, {_}: multiply b (inverse (multiply a b)) =>= multiply (inverse a) identity [] by Super 63 with 382058 at 2,3
2572 Id : 383436, {_}: multiply b (inverse (multiply a b)) =>= inverse a [] by Demod 383433 with 9304 at 3
2573 Id : 383449, {_}: inverse (multiply a b) =<= multiply (inverse b) (inverse a) [] by Super 63 with 383436 at 2,3
2574 Id : 759138, {_}: greatest_lower_bound (inverse b) (inverse a) =>= inverse (multiply a b) [] by Demod 759137 with 383449 at 3
2575 Id : 759204, {_}: multiply a (inverse (multiply a b)) =>= greatest_lower_bound identity (multiply a (inverse b)) [] by Super 9386 with 759138 at 2,2
2576 Id : 368035, {_}: multiply (greatest_lower_bound ?208569 ?208570) (inverse ?208569) =>= greatest_lower_bound identity (multiply ?208570 (inverse ?208569)) [208570, 208569] by Super 32 with 9315 at 1,3
2577 Id : 368063, {_}: multiply identity (inverse b) =<= greatest_lower_bound identity (multiply a (inverse b)) [] by Super 368035 with 336 at 1,2
2578 Id : 369182, {_}: inverse b =<= greatest_lower_bound identity (multiply a (inverse b)) [] by Demod 368063 with 4 at 2
2579 Id : 759234, {_}: multiply a (inverse (multiply a b)) =>= inverse b [] by Demod 759204 with 369182 at 3
2580 Id : 759348, {_}: inverse (multiply a b) =<= multiply (inverse a) (inverse b) [] by Super 63 with 759234 at 2,3
2581 Id : 380530, {_}: multiply (multiply b a) (inverse (multiply b a)) =>= least_upper_bound identity (multiply identity (inverse (multiply b a))) [] by Super 379748 with 9944 at 1,2
2582 Id : 382029, {_}: multiply b (multiply a (inverse (multiply b a))) =>= least_upper_bound identity (multiply identity (inverse (multiply b a))) [] by Demod 380530 with 8 at 2
2583 Id : 382030, {_}: multiply b (multiply a (inverse (multiply b a))) =>= least_upper_bound identity (inverse (multiply b a)) [] by Demod 382029 with 4 at 2,3
2584 Id : 10793, {_}: multiply (inverse (multiply b a)) (multiply b a) =>= least_upper_bound identity (multiply (inverse (multiply b a)) identity) [] by Super 190 with 9944 at 2,2
2585 Id : 10796, {_}: identity =<= least_upper_bound identity (multiply (inverse (multiply b a)) identity) [] by Demod 10793 with 6 at 2
2586 Id : 10797, {_}: identity =<= least_upper_bound identity (inverse (multiply b a)) [] by Demod 10796 with 9304 at 2,3
2587 Id : 382031, {_}: multiply b (multiply a (inverse (multiply b a))) =>= identity [] by Demod 382030 with 10797 at 3
2588 Id : 382929, {_}: multiply a (inverse (multiply b a)) =>= multiply (inverse b) identity [] by Super 63 with 382031 at 2,3
2589 Id : 382932, {_}: multiply a (inverse (multiply b a)) =>= inverse b [] by Demod 382929 with 9304 at 3
2590 Id : 382945, {_}: inverse (multiply b a) =<= multiply (inverse a) (inverse b) [] by Super 63 with 382932 at 2,3
2591 Id : 759368, {_}: inverse (multiply a b) =>= inverse (multiply b a) [] by Demod 759348 with 382945 at 3
2592 Id : 759573, {_}: inverse (inverse (multiply b a)) =>= multiply a b [] by Super 9326 with 759368 at 1,2
2593 Id : 759596, {_}: multiply b a =<= multiply a b [] by Demod 759573 with 9326 at 2
2594 Id : 760017, {_}: multiply (multiply b a) (inverse b) =>= a [] by Super 9354 with 759596 at 1,2
2595 Id : 760034, {_}: multiply b (multiply a (inverse b)) =>= a [] by Demod 760017 with 8 at 2
2596 Id : 760418, {_}: multiply a (inverse b) =<= multiply (inverse b) a [] by Super 63 with 760034 at 2,3
2597 Id : 760473, {_}: multiply (multiply a (inverse b)) ?434336 =>= multiply (inverse b) (multiply a ?434336) [434336] by Super 8 with 760418 at 1,2
2598 Id : 760489, {_}: multiply a (multiply (inverse b) ?434336) =<= multiply (inverse b) (multiply a ?434336) [434336] by Demod 760473 with 8 at 2
2599 Id : 763912, {_}: multiply a (greatest_lower_bound b ?436084) =<= greatest_lower_bound (multiply b a) (multiply a ?436084) [436084] by Super 28 with 759596 at 1,3
2600 Id : 760023, {_}: multiply (multiply b a) ?434182 =>= multiply a (multiply b ?434182) [434182] by Super 8 with 759596 at 1,2
2601 Id : 760032, {_}: multiply b (multiply a ?434182) =<= multiply a (multiply b ?434182) [434182] by Demod 760023 with 8 at 2
2602 Id : 763932, {_}: multiply a (greatest_lower_bound b (multiply b ?436118)) =<= greatest_lower_bound (multiply b a) (multiply b (multiply a ?436118)) [436118] by Super 763912 with 760032 at 2,3
2603 Id : 764080, {_}: multiply a (greatest_lower_bound b (multiply b ?436118)) =>= multiply b (greatest_lower_bound a (multiply a ?436118)) [436118] by Demod 763932 with 28 at 3
2604 Id : 768933, {_}: multiply a (multiply (inverse b) (greatest_lower_bound b (multiply b ?438632))) =<= multiply (inverse b) (multiply b (greatest_lower_bound a (multiply a ?438632))) [438632] by Super 760489 with 764080 at 2,3
2605 Id : 208, {_}: multiply (inverse ?566) (greatest_lower_bound ?566 ?567) =>= greatest_lower_bound identity (multiply (inverse ?566) ?567) [567, 566] by Super 202 with 6 at 1,3
2606 Id : 768988, {_}: multiply a (greatest_lower_bound identity (multiply (inverse b) (multiply b ?438632))) =<= multiply (inverse b) (multiply b (greatest_lower_bound a (multiply a ?438632))) [438632] by Demod 768933 with 208 at 2,2
2607 Id : 768989, {_}: multiply a (greatest_lower_bound identity ?438632) =<= multiply (inverse b) (multiply b (greatest_lower_bound a (multiply a ?438632))) [438632] by Demod 768988 with 63 at 2,2,2
2608 Id : 769075, {_}: multiply a (greatest_lower_bound identity ?438774) =>= greatest_lower_bound a (multiply a ?438774) [438774] by Demod 768989 with 63 at 3
2609 Id : 325, {_}: greatest_lower_bound ?779 identity =<= greatest_lower_bound (greatest_lower_bound ?779 identity) c [779] by Super 14 with 38 at 2,2
2610 Id : 334, {_}: greatest_lower_bound ?779 identity =<= greatest_lower_bound c (greatest_lower_bound ?779 identity) [779] by Demod 325 with 10 at 3
2611 Id : 1055, {_}: least_upper_bound c (greatest_lower_bound ?1435 identity) =>= c [1435] by Super 22 with 334 at 2,2
2612 Id : 1057, {_}: least_upper_bound c identity =>= c [] by Super 1055 with 20 at 2,2
2613 Id : 1068, {_}: least_upper_bound identity c =>= c [] by Demod 1057 with 12 at 2
2614 Id : 1072, {_}: least_upper_bound ?1452 c =<= least_upper_bound (least_upper_bound ?1452 identity) c [1452] by Super 16 with 1068 at 2,2
2615 Id : 2044, {_}: least_upper_bound ?2196 c =<= least_upper_bound c (least_upper_bound ?2196 identity) [2196] by Demod 1072 with 12 at 3
2616 Id : 2045, {_}: least_upper_bound ?2198 c =<= least_upper_bound c (least_upper_bound identity ?2198) [2198] by Super 2044 with 12 at 2,3
2617 Id : 9738, {_}: least_upper_bound (inverse b) c =>= least_upper_bound c identity [] by Super 2045 with 9700 at 2,3
2618 Id : 9771, {_}: least_upper_bound c (inverse b) =>= least_upper_bound c identity [] by Demod 9738 with 12 at 2
2619 Id : 9772, {_}: least_upper_bound c (inverse b) =>= least_upper_bound identity c [] by Demod 9771 with 12 at 3
2620 Id : 9773, {_}: least_upper_bound c (inverse b) =>= c [] by Demod 9772 with 1068 at 3
2621 Id : 10029, {_}: multiply (inverse (inverse b)) c =<= least_upper_bound identity (multiply (inverse (inverse b)) c) [] by Super 190 with 9773 at 2,2
2622 Id : 10032, {_}: multiply b c =<= least_upper_bound identity (multiply (inverse (inverse b)) c) [] by Demod 10029 with 9326 at 1,2
2623 Id : 10033, {_}: multiply b c =<= least_upper_bound identity (multiply b c) [] by Demod 10032 with 9326 at 1,2,3
2624 Id : 10872, {_}: greatest_lower_bound identity (multiply b c) =>= identity [] by Super 24 with 10033 at 2,2
2625 Id : 47955, {_}: greatest_lower_bound identity (greatest_lower_bound (multiply b c) ?32868) =>= greatest_lower_bound identity ?32868 [32868] by Super 14 with 10872 at 1,3
2626 Id : 70757, {_}: greatest_lower_bound identity (multiply (greatest_lower_bound b ?47489) c) =>= greatest_lower_bound identity (multiply ?47489 c) [47489] by Super 47955 with 32 at 2,2
2627 Id : 338, {_}: greatest_lower_bound b (greatest_lower_bound a ?786) =>= greatest_lower_bound identity ?786 [786] by Super 14 with 336 at 1,3
2628 Id : 70764, {_}: greatest_lower_bound identity (multiply (greatest_lower_bound identity ?47501) c) =<= greatest_lower_bound identity (multiply (greatest_lower_bound a ?47501) c) [47501] by Super 70757 with 338 at 1,2,2
2629 Id : 9792, {_}: least_upper_bound (inverse a) c =>= least_upper_bound c identity [] by Super 2045 with 9705 at 2,3
2630 Id : 9807, {_}: least_upper_bound c (inverse a) =>= least_upper_bound c identity [] by Demod 9792 with 12 at 2
2631 Id : 9808, {_}: least_upper_bound c (inverse a) =>= least_upper_bound identity c [] by Demod 9807 with 12 at 3
2632 Id : 9809, {_}: least_upper_bound c (inverse a) =>= c [] by Demod 9808 with 1068 at 3
2633 Id : 10119, {_}: multiply (inverse (inverse a)) c =<= least_upper_bound identity (multiply (inverse (inverse a)) c) [] by Super 190 with 9809 at 2,2
2634 Id : 10122, {_}: multiply a c =<= least_upper_bound identity (multiply (inverse (inverse a)) c) [] by Demod 10119 with 9326 at 1,2
2635 Id : 10123, {_}: multiply a c =<= least_upper_bound identity (multiply a c) [] by Demod 10122 with 9326 at 1,2,3
2636 Id : 10918, {_}: greatest_lower_bound identity (multiply a c) =>= identity [] by Super 24 with 10123 at 2,2
2637 Id : 48295, {_}: greatest_lower_bound identity (greatest_lower_bound (multiply a c) ?33053) =>= greatest_lower_bound identity ?33053 [33053] by Super 14 with 10918 at 1,3
2638 Id : 48305, {_}: greatest_lower_bound identity (multiply (greatest_lower_bound a ?33073) c) =>= greatest_lower_bound identity (multiply ?33073 c) [33073] by Super 48295 with 32 at 2,2
2639 Id : 115728, {_}: greatest_lower_bound identity (multiply (greatest_lower_bound identity ?47501) c) =>= greatest_lower_bound identity (multiply ?47501 c) [47501] by Demod 70764 with 48305 at 3
2640 Id : 204, {_}: multiply (inverse ?551) (greatest_lower_bound ?550 ?551) =>= greatest_lower_bound (multiply (inverse ?551) ?550) identity [550, 551] by Super 202 with 6 at 2,3
2641 Id : 142360, {_}: multiply (inverse ?87937) (greatest_lower_bound ?87938 ?87937) =>= greatest_lower_bound identity (multiply (inverse ?87937) ?87938) [87938, 87937] by Demod 204 with 10 at 3
2642 Id : 142374, {_}: multiply (inverse a) identity =<= greatest_lower_bound identity (multiply (inverse a) b) [] by Super 142360 with 336 at 2,2
2643 Id : 143139, {_}: inverse a =<= greatest_lower_bound identity (multiply (inverse a) b) [] by Demod 142374 with 9304 at 2
2644 Id : 144455, {_}: greatest_lower_bound identity (multiply (inverse a) c) =<= greatest_lower_bound identity (multiply (multiply (inverse a) b) c) [] by Super 115728 with 143139 at 1,2,2
2645 Id : 144470, {_}: greatest_lower_bound identity (multiply (inverse a) c) =<= greatest_lower_bound identity (multiply (inverse a) (multiply b c)) [] by Demod 144455 with 8 at 2,3
2646 Id : 769471, {_}: multiply a (greatest_lower_bound identity (multiply (inverse a) c)) =<= greatest_lower_bound a (multiply a (multiply (inverse a) (multiply b c))) [] by Super 769075 with 144470 at 2,2
2647 Id : 768990, {_}: multiply a (greatest_lower_bound identity ?438632) =>= greatest_lower_bound a (multiply a ?438632) [438632] by Demod 768989 with 63 at 3
2648 Id : 770016, {_}: greatest_lower_bound a (multiply a (multiply (inverse a) c)) =<= greatest_lower_bound a (multiply a (multiply (inverse a) (multiply b c))) [] by Demod 769471 with 768990 at 2
2649 Id : 9368, {_}: multiply identity ?8392 =<= multiply ?8391 (multiply (inverse ?8391) ?8392) [8391, 8392] by Super 8 with 9315 at 1,2
2650 Id : 9385, {_}: ?8392 =<= multiply ?8391 (multiply (inverse ?8391) ?8392) [8391, 8392] by Demod 9368 with 4 at 2
2651 Id : 770017, {_}: greatest_lower_bound a c =<= greatest_lower_bound a (multiply a (multiply (inverse a) (multiply b c))) [] by Demod 770016 with 9385 at 2,2
2652 Id : 770018, {_}: greatest_lower_bound c a =<= greatest_lower_bound a (multiply a (multiply (inverse a) (multiply b c))) [] by Demod 770017 with 10 at 2
2653 Id : 770019, {_}: greatest_lower_bound c a =<= greatest_lower_bound a (multiply b c) [] by Demod 770018 with 9385 at 2,3
2654 Id : 770827, {_}: greatest_lower_bound c a === greatest_lower_bound c a [] by Demod 350 with 770019 at 2
2655 Id : 350, {_}: greatest_lower_bound a (multiply b c) =>= greatest_lower_bound c a [] by Demod 2 with 10 at 3
2656 Id : 2, {_}: greatest_lower_bound a (multiply b c) =>= greatest_lower_bound a c [] by prove_p09b
2657 % SZS output end CNFRefutation for GRP178-2.p
2663 associativity_of_glb is 85
2664 associativity_of_lub is 84
2667 glb_absorbtion is 80
2668 greatest_lower_bound is 89
2669 idempotence_of_gld is 82
2670 idempotence_of_lub is 83
2673 least_upper_bound is 87
2676 lub_absorbtion is 81
2690 symmetry_of_glb is 88
2691 symmetry_of_lub is 86
2693 Id : 4, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
2694 Id : 6, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
2696 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
2697 [8, 7, 6] by associativity ?6 ?7 ?8
2699 greatest_lower_bound ?10 ?11 =?= greatest_lower_bound ?11 ?10
2700 [11, 10] by symmetry_of_glb ?10 ?11
2702 least_upper_bound ?13 ?14 =?= least_upper_bound ?14 ?13
2703 [14, 13] by symmetry_of_lub ?13 ?14
2705 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
2707 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
2708 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
2710 least_upper_bound ?20 (least_upper_bound ?21 ?22)
2712 least_upper_bound (least_upper_bound ?20 ?21) ?22
2713 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
2714 Id : 18, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
2716 greatest_lower_bound ?26 ?26 =>= ?26
2717 [26] by idempotence_of_gld ?26
2719 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
2720 [29, 28] by lub_absorbtion ?28 ?29
2722 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
2723 [32, 31] by glb_absorbtion ?31 ?32
2725 multiply ?34 (least_upper_bound ?35 ?36)
2727 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
2728 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
2730 multiply ?38 (greatest_lower_bound ?39 ?40)
2732 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
2733 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
2735 multiply (least_upper_bound ?42 ?43) ?44
2737 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
2738 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
2740 multiply (greatest_lower_bound ?46 ?47) ?48
2742 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
2743 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
2744 Id : 34, {_}: inverse identity =>= identity [] by p12x_1
2745 Id : 36, {_}: inverse (inverse ?51) =>= ?51 [51] by p12x_2 ?51
2747 inverse (multiply ?53 ?54) =<= multiply (inverse ?54) (inverse ?53)
2748 [54, 53] by p12x_3 ?53 ?54
2750 greatest_lower_bound a c =>= greatest_lower_bound b c
2752 Id : 42, {_}: least_upper_bound a c =>= least_upper_bound b c [] by p12x_5
2754 inverse (greatest_lower_bound ?58 ?59)
2756 least_upper_bound (inverse ?58) (inverse ?59)
2757 [59, 58] by p12x_6 ?58 ?59
2759 inverse (least_upper_bound ?61 ?62)
2761 greatest_lower_bound (inverse ?61) (inverse ?62)
2762 [62, 61] by p12x_7 ?61 ?62
2764 Id : 2, {_}: a =>= b [] by prove_p12x
2765 Found proof, 11.818806s
2766 % SZS status Unsatisfiable for GRP181-4.p
2767 % SZS output start CNFRefutation for GRP181-4.p
2768 Id : 20, {_}: greatest_lower_bound ?26 ?26 =>= ?26 [26] by idempotence_of_gld ?26
2769 Id : 42, {_}: least_upper_bound a c =>= least_upper_bound b c [] by p12x_5
2770 Id : 177, {_}: multiply ?477 (least_upper_bound ?478 ?479) =<= least_upper_bound (multiply ?477 ?478) (multiply ?477 ?479) [479, 478, 477] by monotony_lub1 ?477 ?478 ?479
2771 Id : 46, {_}: inverse (least_upper_bound ?61 ?62) =<= greatest_lower_bound (inverse ?61) (inverse ?62) [62, 61] by p12x_7 ?61 ?62
2772 Id : 18, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
2773 Id : 40, {_}: greatest_lower_bound a c =>= greatest_lower_bound b c [] by p12x_4
2774 Id : 14, {_}: greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18) =?= greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
2775 Id : 16, {_}: least_upper_bound ?20 (least_upper_bound ?21 ?22) =?= least_upper_bound (least_upper_bound ?20 ?21) ?22 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
2776 Id : 12, {_}: least_upper_bound ?13 ?14 =?= least_upper_bound ?14 ?13 [14, 13] by symmetry_of_lub ?13 ?14
2777 Id : 44, {_}: inverse (greatest_lower_bound ?58 ?59) =<= least_upper_bound (inverse ?58) (inverse ?59) [59, 58] by p12x_6 ?58 ?59
2778 Id : 375, {_}: inverse (greatest_lower_bound ?877 ?878) =<= least_upper_bound (inverse ?877) (inverse ?878) [878, 877] by p12x_6 ?877 ?878
2779 Id : 398, {_}: inverse (least_upper_bound ?920 ?921) =<= greatest_lower_bound (inverse ?920) (inverse ?921) [921, 920] by p12x_7 ?920 ?921
2780 Id : 10, {_}: greatest_lower_bound ?10 ?11 =?= greatest_lower_bound ?11 ?10 [11, 10] by symmetry_of_glb ?10 ?11
2781 Id : 208, {_}: multiply ?553 (greatest_lower_bound ?554 ?555) =<= greatest_lower_bound (multiply ?553 ?554) (multiply ?553 ?555) [555, 554, 553] by monotony_glb1 ?553 ?554 ?555
2782 Id : 8, {_}: multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8) [8, 7, 6] by associativity ?6 ?7 ?8
2783 Id : 38, {_}: inverse (multiply ?53 ?54) =<= multiply (inverse ?54) (inverse ?53) [54, 53] by p12x_3 ?53 ?54
2784 Id : 4, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
2785 Id : 34, {_}: inverse identity =>= identity [] by p12x_1
2786 Id : 6, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
2787 Id : 51, {_}: multiply (multiply ?72 ?73) ?74 =?= multiply ?72 (multiply ?73 ?74) [74, 73, 72] by associativity ?72 ?73 ?74
2788 Id : 36, {_}: inverse (inverse ?51) =>= ?51 [51] by p12x_2 ?51
2789 Id : 324, {_}: inverse (multiply ?822 ?823) =<= multiply (inverse ?823) (inverse ?822) [823, 822] by p12x_3 ?822 ?823
2790 Id : 328, {_}: inverse (multiply ?833 (inverse ?832)) =>= multiply ?832 (inverse ?833) [832, 833] by Super 324 with 36 at 1,3
2791 Id : 53, {_}: multiply (multiply ?79 (inverse ?80)) ?80 =>= multiply ?79 identity [80, 79] by Super 51 with 6 at 2,3
2792 Id : 325, {_}: inverse (multiply identity ?825) =<= multiply (inverse ?825) identity [825] by Super 324 with 34 at 2,3
2793 Id : 428, {_}: inverse ?975 =<= multiply (inverse ?975) identity [975] by Demod 325 with 4 at 1,2
2794 Id : 430, {_}: inverse (inverse ?978) =<= multiply ?978 identity [978] by Super 428 with 36 at 1,3
2795 Id : 441, {_}: ?978 =<= multiply ?978 identity [978] by Demod 430 with 36 at 2
2796 Id : 28686, {_}: multiply (multiply ?79 (inverse ?80)) ?80 =>= ?79 [80, 79] by Demod 53 with 441 at 3
2797 Id : 28700, {_}: inverse ?20638 =<= multiply ?20639 (inverse (multiply ?20638 (inverse (inverse ?20639)))) [20639, 20638] by Super 328 with 28686 at 1,2
2798 Id : 28729, {_}: inverse ?20638 =<= multiply ?20639 (multiply (inverse ?20639) (inverse ?20638)) [20639, 20638] by Demod 28700 with 328 at 2,3
2799 Id : 28730, {_}: inverse ?20638 =<= multiply ?20639 (inverse (multiply ?20638 ?20639)) [20639, 20638] by Demod 28729 with 38 at 2,3
2800 Id : 307, {_}: multiply ?771 (inverse ?771) =>= identity [771] by Super 6 with 36 at 1,2
2801 Id : 598, {_}: multiply (multiply ?1178 ?1177) (inverse ?1177) =>= multiply ?1178 identity [1177, 1178] by Super 8 with 307 at 2,3
2802 Id : 42163, {_}: multiply (multiply ?33679 ?33680) (inverse ?33680) =>= ?33679 [33680, 33679] by Demod 598 with 441 at 3
2803 Id : 210, {_}: multiply (inverse ?561) (greatest_lower_bound ?560 ?561) =>= greatest_lower_bound (multiply (inverse ?561) ?560) identity [560, 561] by Super 208 with 6 at 2,3
2804 Id : 229, {_}: multiply (inverse ?561) (greatest_lower_bound ?560 ?561) =>= greatest_lower_bound identity (multiply (inverse ?561) ?560) [560, 561] by Demod 210 with 10 at 3
2805 Id : 401, {_}: inverse (least_upper_bound identity ?928) =>= greatest_lower_bound identity (inverse ?928) [928] by Super 398 with 34 at 1,3
2806 Id : 534, {_}: inverse (multiply (least_upper_bound identity ?1106) ?1107) =<= multiply (inverse ?1107) (greatest_lower_bound identity (inverse ?1106)) [1107, 1106] by Super 38 with 401 at 2,3
2807 Id : 34883, {_}: inverse (multiply (least_upper_bound identity ?27004) (inverse ?27004)) =>= greatest_lower_bound identity (multiply (inverse (inverse ?27004)) identity) [27004] by Super 229 with 534 at 2
2808 Id : 34945, {_}: multiply ?27004 (inverse (least_upper_bound identity ?27004)) =?= greatest_lower_bound identity (multiply (inverse (inverse ?27004)) identity) [27004] by Demod 34883 with 328 at 2
2809 Id : 34946, {_}: multiply ?27004 (greatest_lower_bound identity (inverse ?27004)) =?= greatest_lower_bound identity (multiply (inverse (inverse ?27004)) identity) [27004] by Demod 34945 with 401 at 2,2
2810 Id : 34947, {_}: multiply ?27004 (greatest_lower_bound identity (inverse ?27004)) =>= greatest_lower_bound identity (inverse (inverse ?27004)) [27004] by Demod 34946 with 441 at 2,3
2811 Id : 34948, {_}: multiply ?27004 (greatest_lower_bound identity (inverse ?27004)) =>= greatest_lower_bound identity ?27004 [27004] by Demod 34947 with 36 at 2,3
2812 Id : 42223, {_}: multiply (greatest_lower_bound identity ?33882) (inverse (greatest_lower_bound identity (inverse ?33882))) =>= ?33882 [33882] by Super 42163 with 34948 at 1,2
2813 Id : 377, {_}: inverse (greatest_lower_bound ?883 (inverse ?882)) =>= least_upper_bound (inverse ?883) ?882 [882, 883] by Super 375 with 36 at 2,3
2814 Id : 42257, {_}: multiply (greatest_lower_bound identity ?33882) (least_upper_bound (inverse identity) ?33882) =>= ?33882 [33882] by Demod 42223 with 377 at 2,2
2815 Id : 118341, {_}: multiply (greatest_lower_bound identity ?85951) (least_upper_bound identity ?85951) =>= ?85951 [85951] by Demod 42257 with 34 at 1,2,2
2816 Id : 376, {_}: inverse (greatest_lower_bound ?880 identity) =>= least_upper_bound (inverse ?880) identity [880] by Super 375 with 34 at 2,3
2817 Id : 388, {_}: inverse (greatest_lower_bound ?880 identity) =>= least_upper_bound identity (inverse ?880) [880] by Demod 376 with 12 at 3
2818 Id : 509, {_}: inverse (greatest_lower_bound ?1077 (greatest_lower_bound ?1076 identity)) =<= least_upper_bound (inverse ?1077) (least_upper_bound identity (inverse ?1076)) [1076, 1077] by Super 44 with 388 at 2,3
2819 Id : 519, {_}: inverse (greatest_lower_bound ?1077 (greatest_lower_bound ?1076 identity)) =<= least_upper_bound (least_upper_bound identity (inverse ?1076)) (inverse ?1077) [1076, 1077] by Demod 509 with 12 at 3
2820 Id : 520, {_}: inverse (greatest_lower_bound ?1077 (greatest_lower_bound ?1076 identity)) =<= least_upper_bound identity (least_upper_bound (inverse ?1076) (inverse ?1077)) [1076, 1077] by Demod 519 with 16 at 3
2821 Id : 521, {_}: inverse (greatest_lower_bound ?1077 (greatest_lower_bound ?1076 identity)) =>= least_upper_bound identity (inverse (greatest_lower_bound ?1076 ?1077)) [1076, 1077] by Demod 520 with 44 at 2,3
2822 Id : 512, {_}: inverse (greatest_lower_bound ?1083 identity) =>= least_upper_bound identity (inverse ?1083) [1083] by Demod 376 with 12 at 3
2823 Id : 516, {_}: inverse (greatest_lower_bound ?1090 (greatest_lower_bound ?1091 identity)) =>= least_upper_bound identity (inverse (greatest_lower_bound ?1090 ?1091)) [1091, 1090] by Super 512 with 14 at 1,2
2824 Id : 2150, {_}: least_upper_bound identity (inverse (greatest_lower_bound ?1077 ?1076)) =?= least_upper_bound identity (inverse (greatest_lower_bound ?1076 ?1077)) [1076, 1077] by Demod 521 with 516 at 2
2825 Id : 30474, {_}: multiply (inverse ?22001) (greatest_lower_bound ?22001 ?22002) =>= greatest_lower_bound identity (multiply (inverse ?22001) ?22002) [22002, 22001] by Super 208 with 6 at 1,3
2826 Id : 337, {_}: greatest_lower_bound c a =<= greatest_lower_bound b c [] by Demod 40 with 10 at 2
2827 Id : 338, {_}: greatest_lower_bound c a =>= greatest_lower_bound c b [] by Demod 337 with 10 at 3
2828 Id : 30482, {_}: multiply (inverse c) (greatest_lower_bound c b) =>= greatest_lower_bound identity (multiply (inverse c) a) [] by Super 30474 with 338 at 2,2
2829 Id : 214, {_}: multiply (inverse ?576) (greatest_lower_bound ?576 ?577) =>= greatest_lower_bound identity (multiply (inverse ?576) ?577) [577, 576] by Super 208 with 6 at 1,3
2830 Id : 30627, {_}: greatest_lower_bound identity (multiply (inverse c) b) =<= greatest_lower_bound identity (multiply (inverse c) a) [] by Demod 30482 with 214 at 2
2831 Id : 30842, {_}: least_upper_bound identity (inverse (greatest_lower_bound (multiply (inverse c) a) identity)) =>= least_upper_bound identity (inverse (greatest_lower_bound identity (multiply (inverse c) b))) [] by Super 2150 with 30627 at 1,2,3
2832 Id : 30855, {_}: least_upper_bound identity (inverse (greatest_lower_bound identity (multiply (inverse c) a))) =>= least_upper_bound identity (inverse (greatest_lower_bound identity (multiply (inverse c) b))) [] by Demod 30842 with 2150 at 2
2833 Id : 378, {_}: inverse (greatest_lower_bound identity ?885) =>= least_upper_bound identity (inverse ?885) [885] by Super 375 with 34 at 1,3
2834 Id : 30856, {_}: least_upper_bound identity (least_upper_bound identity (inverse (multiply (inverse c) a))) =<= least_upper_bound identity (inverse (greatest_lower_bound identity (multiply (inverse c) b))) [] by Demod 30855 with 378 at 2,2
2835 Id : 112, {_}: least_upper_bound ?298 (least_upper_bound ?298 ?299) =>= least_upper_bound ?298 ?299 [299, 298] by Super 16 with 18 at 1,3
2836 Id : 30857, {_}: least_upper_bound identity (inverse (multiply (inverse c) a)) =<= least_upper_bound identity (inverse (greatest_lower_bound identity (multiply (inverse c) b))) [] by Demod 30856 with 112 at 2
2837 Id : 326, {_}: inverse (multiply (inverse ?827) ?828) =>= multiply (inverse ?828) ?827 [828, 827] by Super 324 with 36 at 2,3
2838 Id : 30858, {_}: least_upper_bound identity (multiply (inverse a) c) =<= least_upper_bound identity (inverse (greatest_lower_bound identity (multiply (inverse c) b))) [] by Demod 30857 with 326 at 2,2
2839 Id : 30859, {_}: least_upper_bound identity (multiply (inverse a) c) =<= least_upper_bound identity (least_upper_bound identity (inverse (multiply (inverse c) b))) [] by Demod 30858 with 378 at 2,3
2840 Id : 30860, {_}: least_upper_bound identity (multiply (inverse a) c) =<= least_upper_bound identity (inverse (multiply (inverse c) b)) [] by Demod 30859 with 112 at 3
2841 Id : 30861, {_}: least_upper_bound identity (multiply (inverse a) c) =>= least_upper_bound identity (multiply (inverse b) c) [] by Demod 30860 with 326 at 2,3
2842 Id : 118363, {_}: multiply (greatest_lower_bound identity (multiply (inverse a) c)) (least_upper_bound identity (multiply (inverse b) c)) =>= multiply (inverse a) c [] by Super 118341 with 30861 at 2,2
2843 Id : 399, {_}: inverse (least_upper_bound ?923 identity) =>= greatest_lower_bound (inverse ?923) identity [923] by Super 398 with 34 at 2,3
2844 Id : 413, {_}: inverse (least_upper_bound ?923 identity) =>= greatest_lower_bound identity (inverse ?923) [923] by Demod 399 with 10 at 3
2845 Id : 560, {_}: inverse (least_upper_bound ?1130 (least_upper_bound ?1129 identity)) =<= greatest_lower_bound (inverse ?1130) (greatest_lower_bound identity (inverse ?1129)) [1129, 1130] by Super 46 with 413 at 2,3
2846 Id : 580, {_}: inverse (least_upper_bound ?1130 (least_upper_bound ?1129 identity)) =<= greatest_lower_bound (greatest_lower_bound identity (inverse ?1129)) (inverse ?1130) [1129, 1130] by Demod 560 with 10 at 3
2847 Id : 581, {_}: inverse (least_upper_bound ?1130 (least_upper_bound ?1129 identity)) =<= greatest_lower_bound identity (greatest_lower_bound (inverse ?1129) (inverse ?1130)) [1129, 1130] by Demod 580 with 14 at 3
2848 Id : 582, {_}: inverse (least_upper_bound ?1130 (least_upper_bound ?1129 identity)) =>= greatest_lower_bound identity (inverse (least_upper_bound ?1129 ?1130)) [1129, 1130] by Demod 581 with 46 at 2,3
2849 Id : 569, {_}: inverse (least_upper_bound ?1152 identity) =>= greatest_lower_bound identity (inverse ?1152) [1152] by Demod 399 with 10 at 3
2850 Id : 573, {_}: inverse (least_upper_bound ?1159 (least_upper_bound ?1160 identity)) =>= greatest_lower_bound identity (inverse (least_upper_bound ?1159 ?1160)) [1160, 1159] by Super 569 with 16 at 1,2
2851 Id : 2778, {_}: greatest_lower_bound identity (inverse (least_upper_bound ?1130 ?1129)) =?= greatest_lower_bound identity (inverse (least_upper_bound ?1129 ?1130)) [1129, 1130] by Demod 582 with 573 at 2
2852 Id : 28815, {_}: multiply (inverse ?20915) (least_upper_bound ?20915 ?20916) =>= least_upper_bound identity (multiply (inverse ?20915) ?20916) [20916, 20915] by Super 177 with 6 at 1,3
2853 Id : 353, {_}: least_upper_bound c a =<= least_upper_bound b c [] by Demod 42 with 12 at 2
2854 Id : 354, {_}: least_upper_bound c a =>= least_upper_bound c b [] by Demod 353 with 12 at 3
2855 Id : 28823, {_}: multiply (inverse c) (least_upper_bound c b) =>= least_upper_bound identity (multiply (inverse c) a) [] by Super 28815 with 354 at 2,2
2856 Id : 183, {_}: multiply (inverse ?500) (least_upper_bound ?500 ?501) =>= least_upper_bound identity (multiply (inverse ?500) ?501) [501, 500] by Super 177 with 6 at 1,3
2857 Id : 28958, {_}: least_upper_bound identity (multiply (inverse c) b) =<= least_upper_bound identity (multiply (inverse c) a) [] by Demod 28823 with 183 at 2
2858 Id : 29161, {_}: greatest_lower_bound identity (inverse (least_upper_bound (multiply (inverse c) a) identity)) =>= greatest_lower_bound identity (inverse (least_upper_bound identity (multiply (inverse c) b))) [] by Super 2778 with 28958 at 1,2,3
2859 Id : 29185, {_}: greatest_lower_bound identity (inverse (least_upper_bound identity (multiply (inverse c) a))) =>= greatest_lower_bound identity (inverse (least_upper_bound identity (multiply (inverse c) b))) [] by Demod 29161 with 2778 at 2
2860 Id : 29186, {_}: greatest_lower_bound identity (greatest_lower_bound identity (inverse (multiply (inverse c) a))) =<= greatest_lower_bound identity (inverse (least_upper_bound identity (multiply (inverse c) b))) [] by Demod 29185 with 401 at 2,2
2861 Id : 124, {_}: greatest_lower_bound ?324 (greatest_lower_bound ?324 ?325) =>= greatest_lower_bound ?324 ?325 [325, 324] by Super 14 with 20 at 1,3
2862 Id : 29187, {_}: greatest_lower_bound identity (inverse (multiply (inverse c) a)) =<= greatest_lower_bound identity (inverse (least_upper_bound identity (multiply (inverse c) b))) [] by Demod 29186 with 124 at 2
2863 Id : 29188, {_}: greatest_lower_bound identity (multiply (inverse a) c) =<= greatest_lower_bound identity (inverse (least_upper_bound identity (multiply (inverse c) b))) [] by Demod 29187 with 326 at 2,2
2864 Id : 29189, {_}: greatest_lower_bound identity (multiply (inverse a) c) =<= greatest_lower_bound identity (greatest_lower_bound identity (inverse (multiply (inverse c) b))) [] by Demod 29188 with 401 at 2,3
2865 Id : 29190, {_}: greatest_lower_bound identity (multiply (inverse a) c) =<= greatest_lower_bound identity (inverse (multiply (inverse c) b)) [] by Demod 29189 with 124 at 3
2866 Id : 29191, {_}: greatest_lower_bound identity (multiply (inverse a) c) =>= greatest_lower_bound identity (multiply (inverse b) c) [] by Demod 29190 with 326 at 2,3
2867 Id : 118571, {_}: multiply (greatest_lower_bound identity (multiply (inverse b) c)) (least_upper_bound identity (multiply (inverse b) c)) =>= multiply (inverse a) c [] by Demod 118363 with 29191 at 1,2
2868 Id : 42258, {_}: multiply (greatest_lower_bound identity ?33882) (least_upper_bound identity ?33882) =>= ?33882 [33882] by Demod 42257 with 34 at 1,2,2
2869 Id : 118572, {_}: multiply (inverse b) c =<= multiply (inverse a) c [] by Demod 118571 with 42258 at 2
2870 Id : 118655, {_}: inverse (inverse a) =<= multiply c (inverse (multiply (inverse b) c)) [] by Super 28730 with 118572 at 1,2,3
2871 Id : 118658, {_}: a =<= multiply c (inverse (multiply (inverse b) c)) [] by Demod 118655 with 36 at 2
2872 Id : 118659, {_}: a =<= inverse (inverse b) [] by Demod 118658 with 28730 at 3
2873 Id : 118660, {_}: a =>= b [] by Demod 118659 with 36 at 3
2874 Id : 119303, {_}: b === b [] by Demod 2 with 118660 at 2
2875 Id : 2, {_}: a =>= b [] by prove_p12x
2876 % SZS output end CNFRefutation for GRP181-4.p
2882 associativity_of_glb is 86
2883 associativity_of_lub is 85
2884 glb_absorbtion is 81
2885 greatest_lower_bound is 94
2886 idempotence_of_gld is 83
2887 idempotence_of_lub is 84
2890 least_upper_bound is 96
2893 lub_absorbtion is 82
2902 symmetry_of_glb is 88
2903 symmetry_of_lub is 87
2905 Id : 4, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
2906 Id : 6, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
2908 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
2909 [8, 7, 6] by associativity ?6 ?7 ?8
2911 greatest_lower_bound ?10 ?11 =?= greatest_lower_bound ?11 ?10
2912 [11, 10] by symmetry_of_glb ?10 ?11
2914 least_upper_bound ?13 ?14 =?= least_upper_bound ?14 ?13
2915 [14, 13] by symmetry_of_lub ?13 ?14
2917 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
2919 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
2920 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
2922 least_upper_bound ?20 (least_upper_bound ?21 ?22)
2924 least_upper_bound (least_upper_bound ?20 ?21) ?22
2925 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
2926 Id : 18, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
2928 greatest_lower_bound ?26 ?26 =>= ?26
2929 [26] by idempotence_of_gld ?26
2931 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
2932 [29, 28] by lub_absorbtion ?28 ?29
2934 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
2935 [32, 31] by glb_absorbtion ?31 ?32
2937 multiply ?34 (least_upper_bound ?35 ?36)
2939 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
2940 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
2942 multiply ?38 (greatest_lower_bound ?39 ?40)
2944 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
2945 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
2947 multiply (least_upper_bound ?42 ?43) ?44
2949 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
2950 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
2952 multiply (greatest_lower_bound ?46 ?47) ?48
2954 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
2955 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
2956 Id : 34, {_}: inverse identity =>= identity [] by p20x_1
2957 Id : 36, {_}: inverse (inverse ?51) =>= ?51 [51] by p20x_1 ?51
2959 inverse (multiply ?53 ?54) =<= multiply (inverse ?54) (inverse ?53)
2960 [54, 53] by p20x_3 ?53 ?54
2963 greatest_lower_bound (least_upper_bound a identity)
2964 (least_upper_bound (inverse a) identity)
2968 Last chance: 1246059266.52
2969 Last chance: all is indexed 1246060713.99
2970 Last chance: failed over 100 goal 1246060714.1
2971 FAILURE in 0 iterations
2972 % SZS status Timeout for GRP183-4.p
2978 associativity_of_glb is 86
2979 associativity_of_lub is 85
2980 glb_absorbtion is 81
2981 greatest_lower_bound is 95
2982 idempotence_of_gld is 83
2983 idempotence_of_lub is 84
2986 least_upper_bound is 96
2989 lub_absorbtion is 82
2996 symmetry_of_glb is 88
2997 symmetry_of_lub is 87
2999 Id : 4, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
3000 Id : 6, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
3002 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
3003 [8, 7, 6] by associativity ?6 ?7 ?8
3005 greatest_lower_bound ?10 ?11 =?= greatest_lower_bound ?11 ?10
3006 [11, 10] by symmetry_of_glb ?10 ?11
3008 least_upper_bound ?13 ?14 =?= least_upper_bound ?14 ?13
3009 [14, 13] by symmetry_of_lub ?13 ?14
3011 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
3013 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
3014 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
3016 least_upper_bound ?20 (least_upper_bound ?21 ?22)
3018 least_upper_bound (least_upper_bound ?20 ?21) ?22
3019 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
3020 Id : 18, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
3022 greatest_lower_bound ?26 ?26 =>= ?26
3023 [26] by idempotence_of_gld ?26
3025 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
3026 [29, 28] by lub_absorbtion ?28 ?29
3028 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
3029 [32, 31] by glb_absorbtion ?31 ?32
3031 multiply ?34 (least_upper_bound ?35 ?36)
3033 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
3034 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
3036 multiply ?38 (greatest_lower_bound ?39 ?40)
3038 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
3039 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
3041 multiply (least_upper_bound ?42 ?43) ?44
3043 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
3044 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
3046 multiply (greatest_lower_bound ?46 ?47) ?48
3048 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
3049 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
3052 multiply (least_upper_bound a identity)
3053 (inverse (greatest_lower_bound a identity))
3055 multiply (inverse (greatest_lower_bound a identity))
3056 (least_upper_bound a identity)
3058 Found proof, 112.909833s
3059 % SZS status Unsatisfiable for GRP184-1.p
3060 % SZS output start CNFRefutation for GRP184-1.p
3061 Id : 265, {_}: multiply (greatest_lower_bound ?703 ?704) ?705 =<= greatest_lower_bound (multiply ?703 ?705) (multiply ?704 ?705) [705, 704, 703] by monotony_glb2 ?703 ?704 ?705
3062 Id : 28, {_}: multiply ?38 (greatest_lower_bound ?39 ?40) =<= greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40) [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
3063 Id : 145, {_}: greatest_lower_bound ?406 (least_upper_bound ?406 ?407) =>= ?406 [407, 406] by glb_absorbtion ?406 ?407
3064 Id : 20, {_}: greatest_lower_bound ?26 ?26 =>= ?26 [26] by idempotence_of_gld ?26
3065 Id : 127, {_}: least_upper_bound ?353 (greatest_lower_bound ?353 ?354) =>= ?353 [354, 353] by lub_absorbtion ?353 ?354
3066 Id : 8, {_}: multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8) [8, 7, 6] by associativity ?6 ?7 ?8
3067 Id : 18, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
3068 Id : 14, {_}: greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18) =?= greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
3069 Id : 30, {_}: multiply (least_upper_bound ?42 ?43) ?44 =<= least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44) [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
3070 Id : 24, {_}: greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31 [32, 31] by glb_absorbtion ?31 ?32
3071 Id : 22, {_}: least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28 [29, 28] by lub_absorbtion ?28 ?29
3072 Id : 16, {_}: least_upper_bound ?20 (least_upper_bound ?21 ?22) =?= least_upper_bound (least_upper_bound ?20 ?21) ?22 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
3073 Id : 230, {_}: multiply (least_upper_bound ?621 ?622) ?623 =<= least_upper_bound (multiply ?621 ?623) (multiply ?622 ?623) [623, 622, 621] by monotony_lub2 ?621 ?622 ?623
3074 Id : 4, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
3075 Id : 6, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
3076 Id : 38, {_}: multiply (multiply ?61 ?62) ?63 =?= multiply ?61 (multiply ?62 ?63) [63, 62, 61] by associativity ?61 ?62 ?63
3077 Id : 26, {_}: multiply ?34 (least_upper_bound ?35 ?36) =<= least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36) [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
3078 Id : 10, {_}: greatest_lower_bound ?10 ?11 =?= greatest_lower_bound ?11 ?10 [11, 10] by symmetry_of_glb ?10 ?11
3079 Id : 12, {_}: least_upper_bound ?13 ?14 =?= least_upper_bound ?14 ?13 [14, 13] by symmetry_of_lub ?13 ?14
3080 Id : 2065, {_}: multiply (multiply ?3204 (inverse ?3205)) ?3205 =>= multiply ?3204 identity [3205, 3204] by Super 38 with 6 at 2,3
3081 Id : 2068, {_}: multiply identity ?3211 =<= multiply (inverse (inverse ?3211)) identity [3211] by Super 2065 with 6 at 1,2
3082 Id : 2091, {_}: ?3211 =<= multiply (inverse (inverse ?3211)) identity [3211] by Demod 2068 with 4 at 2
3083 Id : 2111, {_}: multiply (inverse (inverse ?3262)) (least_upper_bound ?3263 identity) =<= least_upper_bound (multiply (inverse (inverse ?3262)) ?3263) ?3262 [3263, 3262] by Super 26 with 2091 at 2,3
3084 Id : 39, {_}: multiply (multiply ?65 identity) ?66 =>= multiply ?65 ?66 [66, 65] by Super 38 with 4 at 2,3
3085 Id : 2108, {_}: multiply ?3253 ?3254 =<= multiply (inverse (inverse ?3253)) ?3254 [3254, 3253] by Super 39 with 2091 at 1,2
3086 Id : 2129, {_}: ?3211 =<= multiply ?3211 identity [3211] by Demod 2091 with 2108 at 3
3087 Id : 2149, {_}: inverse (inverse ?3356) =>= multiply ?3356 identity [3356] by Super 2129 with 2108 at 3
3088 Id : 2156, {_}: inverse (inverse ?3356) =>= ?3356 [3356] by Demod 2149 with 2129 at 3
3089 Id : 9722, {_}: multiply ?3262 (least_upper_bound ?3263 identity) =<= least_upper_bound (multiply (inverse (inverse ?3262)) ?3263) ?3262 [3263, 3262] by Demod 2111 with 2156 at 1,2
3090 Id : 9764, {_}: multiply ?11921 (least_upper_bound ?11922 identity) =<= least_upper_bound (multiply ?11921 ?11922) ?11921 [11922, 11921] by Demod 9722 with 2156 at 1,1,3
3091 Id : 701, {_}: multiply (least_upper_bound ?1544 identity) ?1545 =<= least_upper_bound (multiply ?1544 ?1545) ?1545 [1545, 1544] by Super 230 with 4 at 2,3
3092 Id : 703, {_}: multiply (least_upper_bound (inverse ?1549) identity) ?1549 =>= least_upper_bound identity ?1549 [1549] by Super 701 with 6 at 1,3
3093 Id : 729, {_}: multiply (least_upper_bound identity (inverse ?1549)) ?1549 =>= least_upper_bound identity ?1549 [1549] by Demod 703 with 12 at 1,2
3094 Id : 2193, {_}: multiply (least_upper_bound identity ?3378) (inverse ?3378) =>= least_upper_bound identity (inverse ?3378) [3378] by Super 729 with 2156 at 2,1,2
3095 Id : 9777, {_}: multiply (least_upper_bound identity ?11957) (least_upper_bound (inverse ?11957) identity) =<= least_upper_bound (least_upper_bound identity (inverse ?11957)) (least_upper_bound identity ?11957) [11957] by Super 9764 with 2193 at 1,3
3096 Id : 9888, {_}: multiply (least_upper_bound identity ?11957) (least_upper_bound identity (inverse ?11957)) =<= least_upper_bound (least_upper_bound identity (inverse ?11957)) (least_upper_bound identity ?11957) [11957] by Demod 9777 with 12 at 2,2
3097 Id : 9889, {_}: multiply (least_upper_bound identity ?11957) (least_upper_bound identity (inverse ?11957)) =<= least_upper_bound identity (least_upper_bound (inverse ?11957) (least_upper_bound identity ?11957)) [11957] by Demod 9888 with 16 at 3
3098 Id : 523, {_}: least_upper_bound (greatest_lower_bound ?1203 ?1204) ?1203 =>= ?1203 [1204, 1203] by Super 12 with 22 at 3
3099 Id : 524, {_}: least_upper_bound (greatest_lower_bound ?1207 ?1206) ?1206 =>= ?1206 [1206, 1207] by Super 523 with 10 at 1,2
3100 Id : 139, {_}: greatest_lower_bound (least_upper_bound ?385 ?386) ?385 =>= ?385 [386, 385] by Super 10 with 24 at 3
3101 Id : 40, {_}: multiply (multiply ?68 (inverse ?69)) ?69 =>= multiply ?68 identity [69, 68] by Super 38 with 6 at 2,3
3102 Id : 2130, {_}: multiply (multiply ?68 (inverse ?69)) ?69 =>= ?68 [69, 68] by Demod 40 with 2129 at 3
3103 Id : 231, {_}: multiply (least_upper_bound ?625 identity) ?626 =<= least_upper_bound (multiply ?625 ?626) ?626 [626, 625] by Super 230 with 4 at 2,3
3104 Id : 693, {_}: least_upper_bound ?1518 (multiply ?1517 ?1518) =>= multiply (least_upper_bound ?1517 identity) ?1518 [1517, 1518] by Super 12 with 231 at 3
3105 Id : 235, {_}: multiply (least_upper_bound identity ?641) ?642 =<= least_upper_bound ?642 (multiply ?641 ?642) [642, 641] by Super 230 with 4 at 1,3
3106 Id : 1616, {_}: multiply (least_upper_bound identity ?1517) ?1518 =?= multiply (least_upper_bound ?1517 identity) ?1518 [1518, 1517] by Demod 693 with 235 at 2
3107 Id : 1625, {_}: multiply (least_upper_bound (least_upper_bound identity ?2728) ?2730) ?2729 =<= least_upper_bound (multiply (least_upper_bound ?2728 identity) ?2729) (multiply ?2730 ?2729) [2729, 2730, 2728] by Super 30 with 1616 at 1,3
3108 Id : 1699, {_}: multiply (least_upper_bound identity (least_upper_bound ?2728 ?2730)) ?2729 =<= least_upper_bound (multiply (least_upper_bound ?2728 identity) ?2729) (multiply ?2730 ?2729) [2729, 2730, 2728] by Demod 1625 with 16 at 1,2
3109 Id : 1700, {_}: multiply (least_upper_bound identity (least_upper_bound ?2728 ?2730)) ?2729 =<= multiply (least_upper_bound (least_upper_bound ?2728 identity) ?2730) ?2729 [2729, 2730, 2728] by Demod 1699 with 30 at 3
3110 Id : 4487, {_}: multiply (multiply (least_upper_bound identity (least_upper_bound ?5822 ?5823)) (inverse ?5824)) ?5824 =>= least_upper_bound (least_upper_bound ?5822 identity) ?5823 [5824, 5823, 5822] by Super 2130 with 1700 at 1,2
3111 Id : 4634, {_}: least_upper_bound identity (least_upper_bound ?6053 ?6054) =<= least_upper_bound (least_upper_bound ?6053 identity) ?6054 [6054, 6053] by Demod 4487 with 2130 at 2
3112 Id : 122, {_}: least_upper_bound (greatest_lower_bound ?335 ?336) ?335 =>= ?335 [336, 335] by Super 12 with 22 at 3
3113 Id : 4738, {_}: least_upper_bound identity (least_upper_bound (greatest_lower_bound identity ?6182) ?6183) =>= least_upper_bound identity ?6183 [6183, 6182] by Super 4634 with 122 at 1,3
3114 Id : 4751, {_}: least_upper_bound identity (least_upper_bound ?6221 (greatest_lower_bound identity ?6220)) =>= least_upper_bound identity ?6221 [6220, 6221] by Super 4738 with 12 at 2,2
3115 Id : 4923, {_}: least_upper_bound identity ?6418 =<= least_upper_bound (least_upper_bound identity ?6418) (greatest_lower_bound identity ?6419) [6419, 6418] by Super 16 with 4751 at 2
3116 Id : 4974, {_}: least_upper_bound identity ?6418 =<= least_upper_bound (greatest_lower_bound identity ?6419) (least_upper_bound identity ?6418) [6419, 6418] by Demod 4923 with 12 at 3
3117 Id : 5424, {_}: greatest_lower_bound (least_upper_bound identity ?7110) (greatest_lower_bound identity ?7111) =>= greatest_lower_bound identity ?7111 [7111, 7110] by Super 139 with 4974 at 1,2
3118 Id : 5471, {_}: greatest_lower_bound (greatest_lower_bound identity ?7111) (least_upper_bound identity ?7110) =>= greatest_lower_bound identity ?7111 [7110, 7111] by Demod 5424 with 10 at 2
3119 Id : 6383, {_}: greatest_lower_bound identity (greatest_lower_bound ?8259 (least_upper_bound identity ?8260)) =>= greatest_lower_bound identity ?8259 [8260, 8259] by Demod 5471 with 14 at 2
3120 Id : 605, {_}: greatest_lower_bound (least_upper_bound ?1361 ?1362) ?1361 =>= ?1361 [1362, 1361] by Super 10 with 24 at 3
3121 Id : 606, {_}: greatest_lower_bound (least_upper_bound ?1365 ?1364) ?1364 =>= ?1364 [1364, 1365] by Super 605 with 12 at 1,2
3122 Id : 6408, {_}: greatest_lower_bound identity (least_upper_bound identity ?8337) =<= greatest_lower_bound identity (least_upper_bound ?8336 (least_upper_bound identity ?8337)) [8336, 8337] by Super 6383 with 606 at 2,2
3123 Id : 6477, {_}: identity =<= greatest_lower_bound identity (least_upper_bound ?8336 (least_upper_bound identity ?8337)) [8337, 8336] by Demod 6408 with 24 at 2
3124 Id : 8574, {_}: least_upper_bound identity (least_upper_bound ?10550 (least_upper_bound identity ?10551)) =>= least_upper_bound ?10550 (least_upper_bound identity ?10551) [10551, 10550] by Super 524 with 6477 at 1,2
3125 Id : 9890, {_}: multiply (least_upper_bound identity ?11957) (least_upper_bound identity (inverse ?11957)) =>= least_upper_bound (inverse ?11957) (least_upper_bound identity ?11957) [11957] by Demod 9889 with 8574 at 3
3126 Id : 382, {_}: least_upper_bound ?896 (least_upper_bound ?896 ?897) =>= least_upper_bound ?896 ?897 [897, 896] by Super 16 with 18 at 1,3
3127 Id : 383, {_}: least_upper_bound ?899 (least_upper_bound ?900 ?899) =>= least_upper_bound ?899 ?900 [900, 899] by Super 382 with 12 at 2,2
3128 Id : 9723, {_}: multiply ?3262 (least_upper_bound ?3263 identity) =<= least_upper_bound (multiply ?3262 ?3263) ?3262 [3263, 3262] by Demod 9722 with 2156 at 1,1,3
3129 Id : 9944, {_}: least_upper_bound ?12111 (multiply ?12111 ?12112) =>= multiply ?12111 (least_upper_bound ?12112 identity) [12112, 12111] by Super 12 with 9723 at 3
3130 Id : 9957, {_}: least_upper_bound (least_upper_bound identity ?12147) (least_upper_bound identity (inverse ?12147)) =>= multiply (least_upper_bound identity ?12147) (least_upper_bound (inverse ?12147) identity) [12147] by Super 9944 with 2193 at 2,2
3131 Id : 10090, {_}: least_upper_bound identity (least_upper_bound ?12147 (least_upper_bound identity (inverse ?12147))) =>= multiply (least_upper_bound identity ?12147) (least_upper_bound (inverse ?12147) identity) [12147] by Demod 9957 with 16 at 2
3132 Id : 10091, {_}: least_upper_bound ?12147 (least_upper_bound identity (inverse ?12147)) =<= multiply (least_upper_bound identity ?12147) (least_upper_bound (inverse ?12147) identity) [12147] by Demod 10090 with 8574 at 2
3133 Id : 10092, {_}: least_upper_bound ?12147 (least_upper_bound identity (inverse ?12147)) =<= multiply (least_upper_bound identity ?12147) (least_upper_bound identity (inverse ?12147)) [12147] by Demod 10091 with 12 at 2,3
3134 Id : 50296, {_}: least_upper_bound ?12147 (least_upper_bound identity (inverse ?12147)) =?= least_upper_bound (inverse ?12147) (least_upper_bound identity ?12147) [12147] by Demod 10092 with 9890 at 3
3135 Id : 50343, {_}: least_upper_bound (least_upper_bound identity (inverse ?46312)) (least_upper_bound (inverse ?46312) (least_upper_bound identity ?46312)) =>= least_upper_bound (least_upper_bound identity (inverse ?46312)) ?46312 [46312] by Super 383 with 50296 at 2,2
3136 Id : 50540, {_}: least_upper_bound identity (least_upper_bound (inverse ?46312) (least_upper_bound (inverse ?46312) (least_upper_bound identity ?46312))) =>= least_upper_bound (least_upper_bound identity (inverse ?46312)) ?46312 [46312] by Demod 50343 with 16 at 2
3137 Id : 100, {_}: least_upper_bound ?287 (least_upper_bound ?287 ?288) =>= least_upper_bound ?287 ?288 [288, 287] by Super 16 with 18 at 1,3
3138 Id : 50541, {_}: least_upper_bound identity (least_upper_bound (inverse ?46312) (least_upper_bound identity ?46312)) =>= least_upper_bound (least_upper_bound identity (inverse ?46312)) ?46312 [46312] by Demod 50540 with 100 at 2,2
3139 Id : 50542, {_}: least_upper_bound (inverse ?46312) (least_upper_bound identity ?46312) =<= least_upper_bound (least_upper_bound identity (inverse ?46312)) ?46312 [46312] by Demod 50541 with 8574 at 2
3140 Id : 50543, {_}: least_upper_bound (inverse ?46312) (least_upper_bound identity ?46312) =>= least_upper_bound identity (least_upper_bound (inverse ?46312) ?46312) [46312] by Demod 50542 with 16 at 3
3141 Id : 51165, {_}: multiply (least_upper_bound identity ?11957) (least_upper_bound identity (inverse ?11957)) =>= least_upper_bound identity (least_upper_bound (inverse ?11957) ?11957) [11957] by Demod 9890 with 50543 at 3
3142 Id : 51164, {_}: least_upper_bound ?12147 (least_upper_bound identity (inverse ?12147)) =?= least_upper_bound identity (least_upper_bound (inverse ?12147) ?12147) [12147] by Demod 50296 with 50543 at 3
3143 Id : 1772, {_}: multiply (multiply ?2886 (least_upper_bound identity (inverse ?2885))) ?2885 =>= multiply ?2886 (least_upper_bound identity ?2885) [2885, 2886] by Super 8 with 729 at 2,3
3144 Id : 2194, {_}: multiply (multiply ?3381 ?3380) (inverse ?3380) =>= ?3381 [3380, 3381] by Super 2130 with 2156 at 2,1,2
3145 Id : 2142, {_}: multiply ?3332 (inverse ?3332) =>= identity [3332] by Super 6 with 2108 at 2
3146 Id : 2212, {_}: multiply identity ?3416 =<= multiply ?3415 (multiply (inverse ?3415) ?3416) [3415, 3416] by Super 8 with 2142 at 1,2
3147 Id : 2238, {_}: ?3416 =<= multiply ?3415 (multiply (inverse ?3415) ?3416) [3415, 3416] by Demod 2212 with 4 at 2
3148 Id : 4219, {_}: multiply ?5438 (inverse (multiply (inverse ?5439) ?5438)) =>= ?5439 [5439, 5438] by Super 2194 with 2238 at 1,2
3149 Id : 18113, {_}: inverse (multiply (inverse ?20071) (inverse ?20072)) =>= multiply ?20072 ?20071 [20072, 20071] by Super 2238 with 4219 at 2,3
3150 Id : 18209, {_}: inverse (multiply ?20210 ?20209) =<= multiply (inverse ?20209) (inverse ?20210) [20209, 20210] by Super 2156 with 18113 at 1,2
3151 Id : 18309, {_}: multiply (inverse (multiply ?20330 ?20331)) ?20330 =>= inverse ?20331 [20331, 20330] by Super 2130 with 18209 at 1,2
3152 Id : 20618, {_}: multiply (least_upper_bound identity (inverse (multiply ?22269 ?22270))) ?22269 =>= least_upper_bound ?22269 (inverse ?22270) [22270, 22269] by Super 235 with 18309 at 2,3
3153 Id : 379959, {_}: multiply (least_upper_bound ?332905 (inverse ?332906)) (inverse ?332905) =>= least_upper_bound identity (inverse (multiply ?332905 ?332906)) [332906, 332905] by Super 2194 with 20618 at 1,2
3154 Id : 243389, {_}: multiply (least_upper_bound identity (multiply ?228491 ?228492)) (inverse ?228492) =>= least_upper_bound (inverse ?228492) ?228491 [228492, 228491] by Super 235 with 2194 at 2,3
3155 Id : 177106, {_}: multiply (multiply ?175304 (least_upper_bound identity (inverse ?175305))) ?175305 =>= multiply ?175304 (least_upper_bound identity ?175305) [175305, 175304] by Super 8 with 729 at 2,3
3156 Id : 10132, {_}: multiply (inverse ?12250) (least_upper_bound ?12250 identity) =>= least_upper_bound identity (inverse ?12250) [12250] by Super 9764 with 6 at 1,3
3157 Id : 10133, {_}: multiply (inverse ?12252) (least_upper_bound identity ?12252) =>= least_upper_bound identity (inverse ?12252) [12252] by Super 10132 with 12 at 2,2
3158 Id : 10242, {_}: multiply (least_upper_bound identity (inverse ?12325)) (least_upper_bound identity ?12325) =<= least_upper_bound (least_upper_bound identity ?12325) (least_upper_bound identity (inverse ?12325)) [12325] by Super 235 with 10133 at 2,3
3159 Id : 10288, {_}: multiply (least_upper_bound identity (inverse ?12325)) (least_upper_bound identity ?12325) =<= least_upper_bound identity (least_upper_bound ?12325 (least_upper_bound identity (inverse ?12325))) [12325] by Demod 10242 with 16 at 3
3160 Id : 10289, {_}: multiply (least_upper_bound identity (inverse ?12325)) (least_upper_bound identity ?12325) =>= least_upper_bound ?12325 (least_upper_bound identity (inverse ?12325)) [12325] by Demod 10288 with 8574 at 3
3161 Id : 177160, {_}: multiply (least_upper_bound (inverse ?175487) (least_upper_bound identity (inverse (inverse ?175487)))) ?175487 =>= multiply (least_upper_bound identity (inverse (inverse ?175487))) (least_upper_bound identity ?175487) [175487] by Super 177106 with 10289 at 1,2
3162 Id : 236, {_}: multiply (least_upper_bound (inverse ?645) ?644) ?645 =>= least_upper_bound identity (multiply ?644 ?645) [644, 645] by Super 230 with 6 at 1,3
3163 Id : 177356, {_}: least_upper_bound identity (multiply (least_upper_bound identity (inverse (inverse ?175487))) ?175487) =>= multiply (least_upper_bound identity (inverse (inverse ?175487))) (least_upper_bound identity ?175487) [175487] by Demod 177160 with 236 at 2
3164 Id : 177357, {_}: least_upper_bound identity (multiply (least_upper_bound identity ?175487) ?175487) =<= multiply (least_upper_bound identity (inverse (inverse ?175487))) (least_upper_bound identity ?175487) [175487] by Demod 177356 with 2156 at 2,1,2,2
3165 Id : 177519, {_}: least_upper_bound identity (multiply (least_upper_bound identity ?175800) ?175800) =>= multiply (least_upper_bound identity ?175800) (least_upper_bound identity ?175800) [175800] by Demod 177357 with 2156 at 2,1,3
3166 Id : 177520, {_}: least_upper_bound identity (multiply (least_upper_bound ?175802 identity) ?175802) =>= multiply (least_upper_bound identity ?175802) (least_upper_bound identity ?175802) [175802] by Super 177519 with 12 at 1,2,2
3167 Id : 3515, {_}: multiply (least_upper_bound identity (least_upper_bound (inverse ?4381) ?4382)) ?4381 =>= least_upper_bound ?4381 (least_upper_bound identity (multiply ?4382 ?4381)) [4382, 4381] by Super 235 with 236 at 2,3
3168 Id : 1778, {_}: multiply (least_upper_bound (least_upper_bound identity (inverse ?2903)) ?2904) ?2903 =>= least_upper_bound (least_upper_bound identity ?2903) (multiply ?2904 ?2903) [2904, 2903] by Super 30 with 729 at 1,3
3169 Id : 1803, {_}: multiply (least_upper_bound identity (least_upper_bound (inverse ?2903) ?2904)) ?2903 =>= least_upper_bound (least_upper_bound identity ?2903) (multiply ?2904 ?2903) [2904, 2903] by Demod 1778 with 16 at 1,2
3170 Id : 1804, {_}: multiply (least_upper_bound identity (least_upper_bound (inverse ?2903) ?2904)) ?2903 =>= least_upper_bound (multiply ?2904 ?2903) (least_upper_bound identity ?2903) [2904, 2903] by Demod 1803 with 12 at 3
3171 Id : 102, {_}: least_upper_bound ?294 ?293 =<= least_upper_bound (least_upper_bound ?294 ?293) ?293 [293, 294] by Super 16 with 18 at 2,2
3172 Id : 29053, {_}: least_upper_bound identity (least_upper_bound (least_upper_bound ?27543 ?27544) ?27545) =<= least_upper_bound (least_upper_bound ?27543 (least_upper_bound ?27544 identity)) ?27545 [27545, 27544, 27543] by Super 4634 with 16 at 1,3
3173 Id : 29054, {_}: least_upper_bound identity (least_upper_bound (least_upper_bound ?27547 ?27548) ?27549) =<= least_upper_bound (least_upper_bound ?27547 (least_upper_bound identity ?27548)) ?27549 [27549, 27548, 27547] by Super 29053 with 12 at 2,1,3
3174 Id : 93172, {_}: least_upper_bound ?78323 (least_upper_bound identity ?78324) =<= least_upper_bound identity (least_upper_bound (least_upper_bound ?78323 ?78324) (least_upper_bound identity ?78324)) [78324, 78323] by Super 102 with 29054 at 3
3175 Id : 93561, {_}: least_upper_bound ?78323 (least_upper_bound identity ?78324) =<= least_upper_bound (least_upper_bound ?78323 ?78324) (least_upper_bound identity ?78324) [78324, 78323] by Demod 93172 with 8574 at 3
3176 Id : 4534, {_}: least_upper_bound identity (least_upper_bound ?5822 ?5823) =<= least_upper_bound (least_upper_bound ?5822 identity) ?5823 [5823, 5822] by Demod 4487 with 2130 at 2
3177 Id : 27996, {_}: least_upper_bound ?26567 (least_upper_bound identity (least_upper_bound ?26568 ?26567)) =>= least_upper_bound ?26567 (least_upper_bound ?26568 identity) [26568, 26567] by Super 383 with 4534 at 2,2
3178 Id : 28002, {_}: least_upper_bound ?26586 (least_upper_bound identity ?26586) =<= least_upper_bound ?26586 (least_upper_bound (greatest_lower_bound ?26586 ?26585) identity) [26585, 26586] by Super 27996 with 122 at 2,2,2
3179 Id : 28236, {_}: least_upper_bound ?26586 identity =<= least_upper_bound ?26586 (least_upper_bound (greatest_lower_bound ?26586 ?26585) identity) [26585, 26586] by Demod 28002 with 383 at 2
3180 Id : 8916, {_}: least_upper_bound identity (least_upper_bound ?11024 (least_upper_bound identity ?11025)) =>= least_upper_bound ?11024 (least_upper_bound identity ?11025) [11025, 11024] by Super 524 with 6477 at 1,2
3181 Id : 8917, {_}: least_upper_bound identity (least_upper_bound ?11027 (least_upper_bound ?11028 identity)) =>= least_upper_bound ?11027 (least_upper_bound identity ?11028) [11028, 11027] by Super 8916 with 12 at 2,2,2
3182 Id : 4835, {_}: least_upper_bound identity (least_upper_bound (greatest_lower_bound ?6313 identity) ?6314) =>= least_upper_bound identity ?6314 [6314, 6313] by Super 4634 with 524 at 1,3
3183 Id : 4847, {_}: least_upper_bound identity (greatest_lower_bound ?6349 identity) =<= least_upper_bound identity (greatest_lower_bound (greatest_lower_bound ?6349 identity) ?6348) [6348, 6349] by Super 4835 with 22 at 2,2
3184 Id : 128, {_}: least_upper_bound ?356 (greatest_lower_bound ?357 ?356) =>= ?356 [357, 356] by Super 127 with 10 at 2,2
3185 Id : 4903, {_}: identity =<= least_upper_bound identity (greatest_lower_bound (greatest_lower_bound ?6349 identity) ?6348) [6348, 6349] by Demod 4847 with 128 at 2
3186 Id : 5840, {_}: greatest_lower_bound identity (greatest_lower_bound (greatest_lower_bound ?7630 identity) ?7631) =>= greatest_lower_bound (greatest_lower_bound ?7630 identity) ?7631 [7631, 7630] by Super 606 with 4903 at 1,2
3187 Id : 5845, {_}: greatest_lower_bound identity (greatest_lower_bound identity ?7645) =<= greatest_lower_bound (greatest_lower_bound (least_upper_bound ?7644 identity) identity) ?7645 [7644, 7645] by Super 5840 with 606 at 1,2,2
3188 Id : 112, {_}: greatest_lower_bound ?313 (greatest_lower_bound ?313 ?314) =>= greatest_lower_bound ?313 ?314 [314, 313] by Super 14 with 20 at 1,3
3189 Id : 5908, {_}: greatest_lower_bound identity ?7645 =<= greatest_lower_bound (greatest_lower_bound (least_upper_bound ?7644 identity) identity) ?7645 [7644, 7645] by Demod 5845 with 112 at 2
3190 Id : 5909, {_}: greatest_lower_bound identity ?7645 =<= greatest_lower_bound (greatest_lower_bound identity (least_upper_bound ?7644 identity)) ?7645 [7644, 7645] by Demod 5908 with 10 at 1,3
3191 Id : 7862, {_}: greatest_lower_bound identity ?10013 =<= greatest_lower_bound identity (greatest_lower_bound (least_upper_bound ?10014 identity) ?10013) [10014, 10013] by Demod 5909 with 14 at 3
3192 Id : 146, {_}: greatest_lower_bound ?409 (least_upper_bound ?410 ?409) =>= ?409 [410, 409] by Super 145 with 12 at 2,2
3193 Id : 7879, {_}: greatest_lower_bound identity (least_upper_bound ?10063 (least_upper_bound ?10064 identity)) =>= greatest_lower_bound identity (least_upper_bound ?10064 identity) [10064, 10063] by Super 7862 with 146 at 2,3
3194 Id : 7984, {_}: greatest_lower_bound identity (least_upper_bound ?10063 (least_upper_bound ?10064 identity)) =>= identity [10064, 10063] by Demod 7879 with 146 at 3
3195 Id : 8758, {_}: least_upper_bound identity (least_upper_bound ?10813 (least_upper_bound ?10814 identity)) =>= least_upper_bound ?10813 (least_upper_bound ?10814 identity) [10814, 10813] by Super 524 with 7984 at 1,2
3196 Id : 9284, {_}: least_upper_bound ?11027 (least_upper_bound ?11028 identity) =?= least_upper_bound ?11027 (least_upper_bound identity ?11028) [11028, 11027] by Demod 8917 with 8758 at 2
3197 Id : 89245, {_}: least_upper_bound ?75550 identity =<= least_upper_bound ?75550 (least_upper_bound identity (greatest_lower_bound ?75550 ?75551)) [75551, 75550] by Demod 28236 with 9284 at 3
3198 Id : 89255, {_}: least_upper_bound (least_upper_bound ?75580 ?75581) identity =<= least_upper_bound (least_upper_bound ?75580 ?75581) (least_upper_bound identity ?75581) [75581, 75580] by Super 89245 with 606 at 2,2,3
3199 Id : 89821, {_}: least_upper_bound identity (least_upper_bound ?75580 ?75581) =<= least_upper_bound (least_upper_bound ?75580 ?75581) (least_upper_bound identity ?75581) [75581, 75580] by Demod 89255 with 12 at 2
3200 Id : 113848, {_}: least_upper_bound ?78323 (least_upper_bound identity ?78324) =?= least_upper_bound identity (least_upper_bound ?78323 ?78324) [78324, 78323] by Demod 93561 with 89821 at 3
3201 Id : 181989, {_}: multiply (least_upper_bound identity (least_upper_bound (inverse ?2903) ?2904)) ?2903 =>= least_upper_bound identity (least_upper_bound (multiply ?2904 ?2903) ?2903) [2904, 2903] by Demod 1804 with 113848 at 3
3202 Id : 181990, {_}: multiply (least_upper_bound identity (least_upper_bound (inverse ?2903) ?2904)) ?2903 =>= least_upper_bound identity (multiply (least_upper_bound ?2904 identity) ?2903) [2904, 2903] by Demod 181989 with 231 at 2,3
3203 Id : 230272, {_}: least_upper_bound identity (multiply (least_upper_bound ?4382 identity) ?4381) =?= least_upper_bound ?4381 (least_upper_bound identity (multiply ?4382 ?4381)) [4381, 4382] by Demod 3515 with 181990 at 2
3204 Id : 230301, {_}: least_upper_bound ?219571 (least_upper_bound identity (multiply ?219571 ?219571)) =>= multiply (least_upper_bound identity ?219571) (least_upper_bound identity ?219571) [219571] by Super 177520 with 230272 at 2
3205 Id : 232386, {_}: multiply (least_upper_bound identity ?221067) (least_upper_bound identity ?221067) =<= least_upper_bound (least_upper_bound ?221067 identity) (multiply ?221067 ?221067) [221067] by Super 16 with 230301 at 2
3206 Id : 233006, {_}: multiply (least_upper_bound identity ?221067) (least_upper_bound identity ?221067) =<= least_upper_bound (multiply ?221067 ?221067) (least_upper_bound ?221067 identity) [221067] by Demod 232386 with 12 at 3
3207 Id : 4614, {_}: greatest_lower_bound ?5993 (least_upper_bound identity (least_upper_bound ?5992 ?5993)) =>= ?5993 [5992, 5993] by Super 146 with 4534 at 2,2
3208 Id : 27608, {_}: least_upper_bound ?26112 (least_upper_bound identity (least_upper_bound ?26113 ?26112)) =>= least_upper_bound identity (least_upper_bound ?26113 ?26112) [26113, 26112] by Super 524 with 4614 at 1,2
3209 Id : 4631, {_}: least_upper_bound ?6045 (least_upper_bound identity (least_upper_bound ?6044 ?6045)) =>= least_upper_bound ?6045 (least_upper_bound ?6044 identity) [6044, 6045] by Super 383 with 4534 at 2,2
3210 Id : 83798, {_}: least_upper_bound ?26112 (least_upper_bound ?26113 identity) =?= least_upper_bound identity (least_upper_bound ?26113 ?26112) [26113, 26112] by Demod 27608 with 4631 at 2
3211 Id : 233007, {_}: multiply (least_upper_bound identity ?221067) (least_upper_bound identity ?221067) =<= least_upper_bound identity (least_upper_bound ?221067 (multiply ?221067 ?221067)) [221067] by Demod 233006 with 83798 at 3
3212 Id : 9743, {_}: least_upper_bound ?11859 (multiply ?11859 ?11860) =>= multiply ?11859 (least_upper_bound ?11860 identity) [11860, 11859] by Super 12 with 9723 at 3
3213 Id : 233595, {_}: multiply (least_upper_bound identity ?221617) (least_upper_bound identity ?221617) =<= least_upper_bound identity (multiply ?221617 (least_upper_bound ?221617 identity)) [221617] by Demod 233007 with 9743 at 2,3
3214 Id : 233596, {_}: multiply (least_upper_bound identity ?221619) (least_upper_bound identity ?221619) =<= least_upper_bound identity (multiply ?221619 (least_upper_bound identity ?221619)) [221619] by Super 233595 with 12 at 2,2,3
3215 Id : 243525, {_}: multiply (multiply (least_upper_bound identity ?228868) (least_upper_bound identity ?228868)) (inverse (least_upper_bound identity ?228868)) =>= least_upper_bound (inverse (least_upper_bound identity ?228868)) ?228868 [228868] by Super 243389 with 233596 at 1,2
3216 Id : 243950, {_}: least_upper_bound identity ?228868 =<= least_upper_bound (inverse (least_upper_bound identity ?228868)) ?228868 [228868] by Demod 243525 with 2194 at 2
3217 Id : 244049, {_}: least_upper_bound ?229075 (inverse (least_upper_bound identity ?229075)) =>= least_upper_bound identity ?229075 [229075] by Super 12 with 243950 at 3
3218 Id : 380052, {_}: multiply (least_upper_bound identity ?333235) (inverse ?333235) =<= least_upper_bound identity (inverse (multiply ?333235 (least_upper_bound identity ?333235))) [333235] by Super 379959 with 244049 at 1,2
3219 Id : 381402, {_}: least_upper_bound identity (inverse ?334503) =<= least_upper_bound identity (inverse (multiply ?334503 (least_upper_bound identity ?334503))) [334503] by Demod 380052 with 2193 at 2
3220 Id : 177358, {_}: least_upper_bound identity (multiply (least_upper_bound identity ?175487) ?175487) =>= multiply (least_upper_bound identity ?175487) (least_upper_bound identity ?175487) [175487] by Demod 177357 with 2156 at 2,1,3
3221 Id : 177476, {_}: multiply (inverse (multiply (least_upper_bound identity ?175688) ?175688)) (multiply (least_upper_bound identity ?175688) (least_upper_bound identity ?175688)) =>= least_upper_bound identity (inverse (multiply (least_upper_bound identity ?175688) ?175688)) [175688] by Super 10133 with 177358 at 2,2
3222 Id : 177670, {_}: multiply (multiply (inverse (multiply (least_upper_bound identity ?175688) ?175688)) (least_upper_bound identity ?175688)) (least_upper_bound identity ?175688) =>= least_upper_bound identity (inverse (multiply (least_upper_bound identity ?175688) ?175688)) [175688] by Demod 177476 with 8 at 2
3223 Id : 177671, {_}: multiply (inverse ?175688) (least_upper_bound identity ?175688) =<= least_upper_bound identity (inverse (multiply (least_upper_bound identity ?175688) ?175688)) [175688] by Demod 177670 with 18309 at 1,2
3224 Id : 177672, {_}: least_upper_bound identity (inverse ?175688) =<= least_upper_bound identity (inverse (multiply (least_upper_bound identity ?175688) ?175688)) [175688] by Demod 177671 with 10133 at 2
3225 Id : 381492, {_}: least_upper_bound identity (inverse (inverse (multiply (least_upper_bound identity ?334735) ?334735))) =<= least_upper_bound identity (inverse (multiply (inverse (multiply (least_upper_bound identity ?334735) ?334735)) (least_upper_bound identity (inverse ?334735)))) [334735] by Super 381402 with 177672 at 2,1,2,3
3226 Id : 382266, {_}: least_upper_bound identity (multiply (least_upper_bound identity ?334735) ?334735) =<= least_upper_bound identity (inverse (multiply (inverse (multiply (least_upper_bound identity ?334735) ?334735)) (least_upper_bound identity (inverse ?334735)))) [334735] by Demod 381492 with 2156 at 2,2
3227 Id : 382267, {_}: multiply (least_upper_bound identity ?334735) (least_upper_bound identity ?334735) =<= least_upper_bound identity (inverse (multiply (inverse (multiply (least_upper_bound identity ?334735) ?334735)) (least_upper_bound identity (inverse ?334735)))) [334735] by Demod 382266 with 177358 at 2
3228 Id : 18224, {_}: inverse (multiply (inverse ?20261) (inverse ?20262)) =>= multiply ?20262 ?20261 [20262, 20261] by Super 2238 with 4219 at 2,3
3229 Id : 18226, {_}: inverse (multiply (inverse ?20267) ?20266) =>= multiply (inverse ?20266) ?20267 [20266, 20267] by Super 18224 with 2156 at 2,1,2
3230 Id : 382268, {_}: multiply (least_upper_bound identity ?334735) (least_upper_bound identity ?334735) =<= least_upper_bound identity (multiply (inverse (least_upper_bound identity (inverse ?334735))) (multiply (least_upper_bound identity ?334735) ?334735)) [334735] by Demod 382267 with 18226 at 2,3
3231 Id : 382269, {_}: multiply (least_upper_bound identity ?334735) (least_upper_bound identity ?334735) =<= least_upper_bound identity (multiply (multiply (inverse (least_upper_bound identity (inverse ?334735))) (least_upper_bound identity ?334735)) ?334735) [334735] by Demod 382268 with 8 at 2,3
3232 Id : 18545, {_}: inverse (multiply ?20706 (inverse ?20707)) =>= multiply ?20707 (inverse ?20706) [20707, 20706] by Super 18224 with 2156 at 1,1,2
3233 Id : 18566, {_}: inverse (least_upper_bound identity (inverse ?20767)) =<= multiply ?20767 (inverse (least_upper_bound identity ?20767)) [20767] by Super 18545 with 2193 at 1,2
3234 Id : 19741, {_}: multiply (inverse (least_upper_bound identity (inverse ?21554))) (least_upper_bound identity ?21554) =>= ?21554 [21554] by Super 2130 with 18566 at 1,2
3235 Id : 382270, {_}: multiply (least_upper_bound identity ?334735) (least_upper_bound identity ?334735) =>= least_upper_bound identity (multiply ?334735 ?334735) [334735] by Demod 382269 with 19741 at 1,2,3
3236 Id : 382385, {_}: multiply (least_upper_bound identity (multiply (inverse ?334827) (inverse ?334827))) ?334827 =>= multiply (least_upper_bound identity (inverse ?334827)) (least_upper_bound identity ?334827) [334827] by Super 1772 with 382270 at 1,2
3237 Id : 2064, {_}: multiply (least_upper_bound identity (multiply ?3201 (inverse ?3202))) ?3202 =>= least_upper_bound ?3202 (multiply ?3201 identity) [3202, 3201] by Super 235 with 40 at 2,3
3238 Id : 223367, {_}: multiply (least_upper_bound identity (multiply ?3201 (inverse ?3202))) ?3202 =>= least_upper_bound ?3202 ?3201 [3202, 3201] by Demod 2064 with 2129 at 2,3
3239 Id : 382807, {_}: least_upper_bound ?334827 (inverse ?334827) =<= multiply (least_upper_bound identity (inverse ?334827)) (least_upper_bound identity ?334827) [334827] by Demod 382385 with 223367 at 2
3240 Id : 382808, {_}: least_upper_bound ?334827 (inverse ?334827) =<= least_upper_bound ?334827 (least_upper_bound identity (inverse ?334827)) [334827] by Demod 382807 with 10289 at 3
3241 Id : 383798, {_}: least_upper_bound ?12147 (inverse ?12147) =<= least_upper_bound identity (least_upper_bound (inverse ?12147) ?12147) [12147] by Demod 51164 with 382808 at 2
3242 Id : 383800, {_}: multiply (least_upper_bound identity ?11957) (least_upper_bound identity (inverse ?11957)) =>= least_upper_bound ?11957 (inverse ?11957) [11957] by Demod 51165 with 383798 at 3
3243 Id : 2115, {_}: multiply (inverse (inverse ?3274)) (greatest_lower_bound ?3275 identity) =<= greatest_lower_bound (multiply (inverse (inverse ?3274)) ?3275) ?3274 [3275, 3274] by Super 28 with 2091 at 2,3
3244 Id : 10659, {_}: multiply ?3274 (greatest_lower_bound ?3275 identity) =<= greatest_lower_bound (multiply (inverse (inverse ?3274)) ?3275) ?3274 [3275, 3274] by Demod 2115 with 2156 at 1,2
3245 Id : 10660, {_}: multiply ?3274 (greatest_lower_bound ?3275 identity) =<= greatest_lower_bound (multiply ?3274 ?3275) ?3274 [3275, 3274] by Demod 10659 with 2156 at 1,1,3
3246 Id : 10678, {_}: greatest_lower_bound ?12834 (multiply ?12834 ?12835) =>= multiply ?12834 (greatest_lower_bound ?12835 identity) [12835, 12834] by Super 10 with 10660 at 3
3247 Id : 18328, {_}: greatest_lower_bound (inverse ?20397) (inverse (multiply ?20396 ?20397)) =>= multiply (inverse ?20397) (greatest_lower_bound (inverse ?20396) identity) [20396, 20397] by Super 10678 with 18209 at 2,2
3248 Id : 2116, {_}: multiply (inverse (inverse ?3277)) (greatest_lower_bound identity ?3278) =<= greatest_lower_bound ?3277 (multiply (inverse (inverse ?3277)) ?3278) [3278, 3277] by Super 28 with 2091 at 1,3
3249 Id : 11396, {_}: multiply ?3277 (greatest_lower_bound identity ?3278) =<= greatest_lower_bound ?3277 (multiply (inverse (inverse ?3277)) ?3278) [3278, 3277] by Demod 2116 with 2156 at 1,2
3250 Id : 11397, {_}: multiply ?3277 (greatest_lower_bound identity ?3278) =<= greatest_lower_bound ?3277 (multiply ?3277 ?3278) [3278, 3277] by Demod 11396 with 2156 at 1,2,3
3251 Id : 11398, {_}: multiply ?3277 (greatest_lower_bound identity ?3278) =?= multiply ?3277 (greatest_lower_bound ?3278 identity) [3278, 3277] by Demod 11397 with 10678 at 3
3252 Id : 78468, {_}: greatest_lower_bound (inverse ?65596) (inverse (multiply ?65597 ?65596)) =>= multiply (inverse ?65596) (greatest_lower_bound identity (inverse ?65597)) [65597, 65596] by Demod 18328 with 11398 at 3
3253 Id : 78507, {_}: greatest_lower_bound (inverse ?65693) (inverse (inverse ?65692)) =<= multiply (inverse ?65693) (greatest_lower_bound identity (inverse (inverse (multiply ?65693 ?65692)))) [65692, 65693] by Super 78468 with 18309 at 1,2,2
3254 Id : 78731, {_}: greatest_lower_bound (inverse ?65693) ?65692 =<= multiply (inverse ?65693) (greatest_lower_bound identity (inverse (inverse (multiply ?65693 ?65692)))) [65692, 65693] by Demod 78507 with 2156 at 2,2
3255 Id : 443714, {_}: greatest_lower_bound (inverse ?378148) ?378149 =<= multiply (inverse ?378148) (greatest_lower_bound identity (multiply ?378148 ?378149)) [378149, 378148] by Demod 78731 with 2156 at 2,2,3
3256 Id : 842, {_}: multiply (greatest_lower_bound ?1730 identity) ?1731 =<= greatest_lower_bound (multiply ?1730 ?1731) ?1731 [1731, 1730] by Super 265 with 4 at 2,3
3257 Id : 844, {_}: multiply (greatest_lower_bound (inverse ?1735) identity) ?1735 =>= greatest_lower_bound identity ?1735 [1735] by Super 842 with 6 at 1,3
3258 Id : 874, {_}: multiply (greatest_lower_bound identity (inverse ?1735)) ?1735 =>= greatest_lower_bound identity ?1735 [1735] by Demod 844 with 10 at 1,2
3259 Id : 2191, {_}: multiply (greatest_lower_bound identity ?3374) (inverse ?3374) =>= greatest_lower_bound identity (inverse ?3374) [3374] by Super 874 with 2156 at 2,1,2
3260 Id : 9776, {_}: multiply (greatest_lower_bound identity ?11955) (least_upper_bound (inverse ?11955) identity) =<= least_upper_bound (greatest_lower_bound identity (inverse ?11955)) (greatest_lower_bound identity ?11955) [11955] by Super 9764 with 2191 at 1,3
3261 Id : 47906, {_}: multiply (greatest_lower_bound identity ?45245) (least_upper_bound identity (inverse ?45245)) =<= least_upper_bound (greatest_lower_bound identity (inverse ?45245)) (greatest_lower_bound identity ?45245) [45245] by Demod 9776 with 12 at 2,2
3262 Id : 47957, {_}: multiply (greatest_lower_bound identity (inverse ?45371)) (least_upper_bound identity (inverse (inverse ?45371))) =>= least_upper_bound (greatest_lower_bound identity ?45371) (greatest_lower_bound identity (inverse ?45371)) [45371] by Super 47906 with 2156 at 2,1,3
3263 Id : 48268, {_}: multiply (greatest_lower_bound identity (inverse ?45371)) (least_upper_bound identity ?45371) =<= least_upper_bound (greatest_lower_bound identity ?45371) (greatest_lower_bound identity (inverse ?45371)) [45371] by Demod 47957 with 2156 at 2,2,2
3264 Id : 9956, {_}: least_upper_bound (greatest_lower_bound identity ?12145) (greatest_lower_bound identity (inverse ?12145)) =>= multiply (greatest_lower_bound identity ?12145) (least_upper_bound (inverse ?12145) identity) [12145] by Super 9944 with 2191 at 2,2
3265 Id : 10089, {_}: least_upper_bound (greatest_lower_bound identity ?12145) (greatest_lower_bound identity (inverse ?12145)) =>= multiply (greatest_lower_bound identity ?12145) (least_upper_bound identity (inverse ?12145)) [12145] by Demod 9956 with 12 at 2,3
3266 Id : 105582, {_}: multiply (greatest_lower_bound identity (inverse ?45371)) (least_upper_bound identity ?45371) =?= multiply (greatest_lower_bound identity ?45371) (least_upper_bound identity (inverse ?45371)) [45371] by Demod 48268 with 10089 at 3
3267 Id : 443814, {_}: greatest_lower_bound (inverse (greatest_lower_bound identity (inverse ?378412))) (least_upper_bound identity ?378412) =<= multiply (inverse (greatest_lower_bound identity (inverse ?378412))) (greatest_lower_bound identity (multiply (greatest_lower_bound identity ?378412) (least_upper_bound identity (inverse ?378412)))) [378412] by Super 443714 with 105582 at 2,2,3
3268 Id : 5843, {_}: greatest_lower_bound identity (greatest_lower_bound identity ?7639) =<= greatest_lower_bound (greatest_lower_bound (least_upper_bound identity ?7638) identity) ?7639 [7638, 7639] by Super 5840 with 139 at 1,2,2
3269 Id : 5900, {_}: greatest_lower_bound identity ?7639 =<= greatest_lower_bound (greatest_lower_bound (least_upper_bound identity ?7638) identity) ?7639 [7638, 7639] by Demod 5843 with 112 at 2
3270 Id : 5901, {_}: greatest_lower_bound identity ?7639 =<= greatest_lower_bound (greatest_lower_bound identity (least_upper_bound identity ?7638)) ?7639 [7638, 7639] by Demod 5900 with 10 at 1,3
3271 Id : 7645, {_}: greatest_lower_bound identity ?9767 =<= greatest_lower_bound identity (greatest_lower_bound (least_upper_bound identity ?9768) ?9767) [9768, 9767] by Demod 5901 with 14 at 3
3272 Id : 270, {_}: multiply (greatest_lower_bound identity ?723) ?724 =<= greatest_lower_bound ?724 (multiply ?723 ?724) [724, 723] by Super 265 with 4 at 1,3
3273 Id : 7676, {_}: greatest_lower_bound identity (multiply ?9863 (least_upper_bound identity ?9864)) =<= greatest_lower_bound identity (multiply (greatest_lower_bound identity ?9863) (least_upper_bound identity ?9864)) [9864, 9863] by Super 7645 with 270 at 2,3
3274 Id : 444411, {_}: greatest_lower_bound (inverse (greatest_lower_bound identity (inverse ?378412))) (least_upper_bound identity ?378412) =<= multiply (inverse (greatest_lower_bound identity (inverse ?378412))) (greatest_lower_bound identity (multiply ?378412 (least_upper_bound identity (inverse ?378412)))) [378412] by Demod 443814 with 7676 at 2,3
3275 Id : 2215, {_}: multiply ?3422 (least_upper_bound ?3423 (inverse ?3422)) =>= least_upper_bound (multiply ?3422 ?3423) identity [3423, 3422] by Super 26 with 2142 at 2,3
3276 Id : 2235, {_}: multiply ?3422 (least_upper_bound ?3423 (inverse ?3422)) =>= least_upper_bound identity (multiply ?3422 ?3423) [3423, 3422] by Demod 2215 with 12 at 3
3277 Id : 444412, {_}: greatest_lower_bound (inverse (greatest_lower_bound identity (inverse ?378412))) (least_upper_bound identity ?378412) =<= multiply (inverse (greatest_lower_bound identity (inverse ?378412))) (greatest_lower_bound identity (least_upper_bound identity (multiply ?378412 identity))) [378412] by Demod 444411 with 2235 at 2,2,3
3278 Id : 444413, {_}: greatest_lower_bound (inverse (greatest_lower_bound identity (inverse ?378412))) (least_upper_bound identity ?378412) =>= multiply (inverse (greatest_lower_bound identity (inverse ?378412))) identity [378412] by Demod 444412 with 24 at 2,3
3279 Id : 444414, {_}: greatest_lower_bound (inverse (greatest_lower_bound identity (inverse ?378412))) (least_upper_bound identity ?378412) =>= inverse (greatest_lower_bound identity (inverse ?378412)) [378412] by Demod 444413 with 2129 at 3
3280 Id : 761747, {_}: least_upper_bound (least_upper_bound identity ?693163) (inverse (greatest_lower_bound identity (inverse ?693163))) =>= least_upper_bound identity ?693163 [693163] by Super 128 with 444414 at 2,2
3281 Id : 762288, {_}: least_upper_bound (inverse (greatest_lower_bound identity (inverse ?693163))) (least_upper_bound identity ?693163) =>= least_upper_bound identity ?693163 [693163] by Demod 761747 with 12 at 2
3282 Id : 1150, {_}: least_upper_bound (least_upper_bound ?2078 ?2079) ?2078 =>= least_upper_bound ?2078 ?2079 [2079, 2078] by Super 12 with 100 at 3
3283 Id : 158742, {_}: least_upper_bound (least_upper_bound (least_upper_bound ?149635 ?149636) ?149637) ?149635 =>= least_upper_bound ?149635 (least_upper_bound ?149636 ?149637) [149637, 149636, 149635] by Super 1150 with 16 at 1,2
3284 Id : 375, {_}: least_upper_bound (least_upper_bound ?872 ?873) ?872 =>= least_upper_bound ?872 ?873 [873, 872] by Super 12 with 100 at 3
3285 Id : 1142, {_}: least_upper_bound (least_upper_bound ?2051 ?2052) (least_upper_bound ?2051 ?2053) =>= least_upper_bound (least_upper_bound ?2051 ?2052) ?2053 [2053, 2052, 2051] by Super 16 with 375 at 1,3
3286 Id : 158880, {_}: least_upper_bound (least_upper_bound (least_upper_bound ?150190 ?150191) ?150189) ?150190 =?= least_upper_bound ?150190 (least_upper_bound ?150191 (least_upper_bound ?150190 ?150189)) [150189, 150191, 150190] by Super 158742 with 1142 at 1,2
3287 Id : 1152, {_}: least_upper_bound (least_upper_bound (least_upper_bound ?2086 ?2084) ?2085) ?2086 =>= least_upper_bound ?2086 (least_upper_bound ?2084 ?2085) [2085, 2084, 2086] by Super 1150 with 16 at 1,2
3288 Id : 159604, {_}: least_upper_bound ?150190 (least_upper_bound ?150191 ?150189) =<= least_upper_bound ?150190 (least_upper_bound ?150191 (least_upper_bound ?150190 ?150189)) [150189, 150191, 150190] by Demod 158880 with 1152 at 2
3289 Id : 126, {_}: least_upper_bound ?351 ?349 =<= least_upper_bound (least_upper_bound ?351 ?349) (greatest_lower_bound ?349 ?350) [350, 349, 351] by Super 16 with 22 at 2,2
3290 Id : 135029, {_}: least_upper_bound ?113864 ?113865 =<= least_upper_bound (greatest_lower_bound ?113865 ?113866) (least_upper_bound ?113864 ?113865) [113866, 113865, 113864] by Demod 126 with 12 at 3
3291 Id : 135153, {_}: least_upper_bound ?114345 (least_upper_bound ?114346 ?114344) =<= least_upper_bound ?114346 (least_upper_bound ?114345 (least_upper_bound ?114346 ?114344)) [114344, 114346, 114345] by Super 135029 with 139 at 1,3
3292 Id : 503059, {_}: least_upper_bound ?150190 (least_upper_bound ?150191 ?150189) =?= least_upper_bound ?150191 (least_upper_bound ?150190 ?150189) [150189, 150191, 150190] by Demod 159604 with 135153 at 3
3293 Id : 762289, {_}: least_upper_bound identity (least_upper_bound (inverse (greatest_lower_bound identity (inverse ?693163))) ?693163) =>= least_upper_bound identity ?693163 [693163] by Demod 762288 with 503059 at 2
3294 Id : 2280, {_}: multiply (greatest_lower_bound identity ?3504) (inverse ?3504) =>= greatest_lower_bound identity (inverse ?3504) [3504] by Super 874 with 2156 at 2,1,2
3295 Id : 2286, {_}: multiply (greatest_lower_bound identity ?3514) (inverse (greatest_lower_bound identity ?3514)) =>= greatest_lower_bound identity (inverse (greatest_lower_bound identity ?3514)) [3514] by Super 2280 with 112 at 1,2
3296 Id : 2335, {_}: identity =<= greatest_lower_bound identity (inverse (greatest_lower_bound identity ?3514)) [3514] by Demod 2286 with 2142 at 2
3297 Id : 2422, {_}: least_upper_bound identity (inverse (greatest_lower_bound identity ?3608)) =>= inverse (greatest_lower_bound identity ?3608) [3608] by Super 524 with 2335 at 1,2
3298 Id : 2722, {_}: least_upper_bound identity (least_upper_bound (inverse (greatest_lower_bound identity ?3826)) ?3827) =>= least_upper_bound (inverse (greatest_lower_bound identity ?3826)) ?3827 [3827, 3826] by Super 16 with 2422 at 1,3
3299 Id : 762290, {_}: least_upper_bound (inverse (greatest_lower_bound identity (inverse ?693163))) ?693163 =>= least_upper_bound identity ?693163 [693163] by Demod 762289 with 2722 at 2
3300 Id : 18327, {_}: multiply (inverse ?20394) (least_upper_bound (inverse ?20393) identity) =<= least_upper_bound (inverse (multiply ?20393 ?20394)) (inverse ?20394) [20393, 20394] by Super 9723 with 18209 at 1,3
3301 Id : 2112, {_}: multiply (inverse (inverse ?3265)) (least_upper_bound identity ?3266) =<= least_upper_bound ?3265 (multiply (inverse (inverse ?3265)) ?3266) [3266, 3265] by Super 26 with 2091 at 1,3
3302 Id : 10376, {_}: multiply ?3265 (least_upper_bound identity ?3266) =<= least_upper_bound ?3265 (multiply (inverse (inverse ?3265)) ?3266) [3266, 3265] by Demod 2112 with 2156 at 1,2
3303 Id : 10377, {_}: multiply ?3265 (least_upper_bound identity ?3266) =<= least_upper_bound ?3265 (multiply ?3265 ?3266) [3266, 3265] by Demod 10376 with 2156 at 1,2,3
3304 Id : 10378, {_}: multiply ?3265 (least_upper_bound identity ?3266) =?= multiply ?3265 (least_upper_bound ?3266 identity) [3266, 3265] by Demod 10377 with 9743 at 3
3305 Id : 18347, {_}: multiply (inverse ?20394) (least_upper_bound identity (inverse ?20393)) =<= least_upper_bound (inverse (multiply ?20393 ?20394)) (inverse ?20394) [20393, 20394] by Demod 18327 with 10378 at 2
3306 Id : 2048, {_}: multiply (greatest_lower_bound identity (multiply ?3142 (inverse ?3143))) ?3143 =>= greatest_lower_bound ?3143 (multiply ?3142 identity) [3143, 3142] by Super 270 with 40 at 2,3
3307 Id : 194485, {_}: multiply (greatest_lower_bound identity (multiply ?3142 (inverse ?3143))) ?3143 =>= greatest_lower_bound ?3143 ?3142 [3143, 3142] by Demod 2048 with 2129 at 2,3
3308 Id : 194529, {_}: multiply (inverse ?186266) (least_upper_bound identity (inverse (greatest_lower_bound identity (multiply ?186265 (inverse ?186266))))) =>= least_upper_bound (inverse (greatest_lower_bound ?186266 ?186265)) (inverse ?186266) [186265, 186266] by Super 18347 with 194485 at 1,1,3
3309 Id : 194632, {_}: multiply (inverse ?186266) (inverse (greatest_lower_bound identity (multiply ?186265 (inverse ?186266)))) =>= least_upper_bound (inverse (greatest_lower_bound ?186266 ?186265)) (inverse ?186266) [186265, 186266] by Demod 194529 with 2422 at 2,2
3310 Id : 194633, {_}: inverse (multiply (greatest_lower_bound identity (multiply ?186265 (inverse ?186266))) ?186266) =>= least_upper_bound (inverse (greatest_lower_bound ?186266 ?186265)) (inverse ?186266) [186266, 186265] by Demod 194632 with 18209 at 2
3311 Id : 195668, {_}: inverse (greatest_lower_bound ?187604 ?187605) =<= least_upper_bound (inverse (greatest_lower_bound ?187604 ?187605)) (inverse ?187604) [187605, 187604] by Demod 194633 with 194485 at 1,2
3312 Id : 201008, {_}: inverse (greatest_lower_bound (inverse ?193412) ?193413) =<= least_upper_bound (inverse (greatest_lower_bound (inverse ?193412) ?193413)) ?193412 [193413, 193412] by Super 195668 with 2156 at 2,3
3313 Id : 201035, {_}: inverse (greatest_lower_bound (inverse ?193516) ?193517) =<= least_upper_bound (inverse (greatest_lower_bound ?193517 (inverse ?193516))) ?193516 [193517, 193516] by Super 201008 with 10 at 1,1,3
3314 Id : 762291, {_}: inverse (greatest_lower_bound (inverse ?693163) identity) =>= least_upper_bound identity ?693163 [693163] by Demod 762290 with 201035 at 2
3315 Id : 18116, {_}: multiply ?20080 (inverse (multiply (inverse ?20081) ?20080)) =>= ?20081 [20081, 20080] by Super 2194 with 2238 at 1,2
3316 Id : 20397, {_}: multiply ?22035 (inverse (multiply ?22036 ?22035)) =>= inverse ?22036 [22036, 22035] by Super 18116 with 2156 at 1,1,2,2
3317 Id : 267, {_}: multiply (greatest_lower_bound ?710 (inverse ?711)) ?711 =>= greatest_lower_bound (multiply ?710 ?711) identity [711, 710] by Super 265 with 6 at 2,3
3318 Id : 287, {_}: multiply (greatest_lower_bound ?710 (inverse ?711)) ?711 =>= greatest_lower_bound identity (multiply ?710 ?711) [711, 710] by Demod 267 with 10 at 3
3319 Id : 20404, {_}: multiply ?22056 (inverse (greatest_lower_bound identity (multiply ?22055 ?22056))) =>= inverse (greatest_lower_bound ?22055 (inverse ?22056)) [22055, 22056] by Super 20397 with 287 at 1,2,2
3320 Id : 271, {_}: multiply (greatest_lower_bound (inverse ?727) ?726) ?727 =>= greatest_lower_bound identity (multiply ?726 ?727) [726, 727] by Super 265 with 6 at 1,3
3321 Id : 20403, {_}: multiply ?22053 (inverse (greatest_lower_bound identity (multiply ?22052 ?22053))) =>= inverse (greatest_lower_bound (inverse ?22053) ?22052) [22052, 22053] by Super 20397 with 271 at 1,2,2
3322 Id : 354211, {_}: inverse (greatest_lower_bound (inverse ?22056) ?22055) =?= inverse (greatest_lower_bound ?22055 (inverse ?22056)) [22055, 22056] by Demod 20404 with 20403 at 2
3323 Id : 763705, {_}: inverse (greatest_lower_bound identity (inverse ?694794)) =>= least_upper_bound identity ?694794 [694794] by Demod 762291 with 354211 at 2
3324 Id : 763707, {_}: inverse (greatest_lower_bound identity ?694797) =<= least_upper_bound identity (inverse ?694797) [694797] by Super 763705 with 2156 at 2,1,2
3325 Id : 766509, {_}: multiply (least_upper_bound identity ?11957) (inverse (greatest_lower_bound identity ?11957)) =>= least_upper_bound ?11957 (inverse ?11957) [11957] by Demod 383800 with 763707 at 2,2
3326 Id : 383797, {_}: multiply (least_upper_bound identity (inverse ?12325)) (least_upper_bound identity ?12325) =>= least_upper_bound ?12325 (inverse ?12325) [12325] by Demod 10289 with 382808 at 3
3327 Id : 766508, {_}: multiply (inverse (greatest_lower_bound identity ?12325)) (least_upper_bound identity ?12325) =>= least_upper_bound ?12325 (inverse ?12325) [12325] by Demod 383797 with 763707 at 1,2
3328 Id : 768092, {_}: least_upper_bound a (inverse a) === least_upper_bound a (inverse a) [] by Demod 768091 with 766508 at 3
3329 Id : 768091, {_}: least_upper_bound a (inverse a) =<= multiply (inverse (greatest_lower_bound identity a)) (least_upper_bound identity a) [] by Demod 298 with 766509 at 2
3330 Id : 298, {_}: multiply (least_upper_bound identity a) (inverse (greatest_lower_bound identity a)) =>= multiply (inverse (greatest_lower_bound identity a)) (least_upper_bound identity a) [] by Demod 297 with 12 at 2,3
3331 Id : 297, {_}: multiply (least_upper_bound identity a) (inverse (greatest_lower_bound identity a)) =>= multiply (inverse (greatest_lower_bound identity a)) (least_upper_bound a identity) [] by Demod 296 with 10 at 1,1,3
3332 Id : 296, {_}: multiply (least_upper_bound identity a) (inverse (greatest_lower_bound identity a)) =>= multiply (inverse (greatest_lower_bound a identity)) (least_upper_bound a identity) [] by Demod 295 with 10 at 1,2,2
3333 Id : 295, {_}: multiply (least_upper_bound identity a) (inverse (greatest_lower_bound a identity)) =>= multiply (inverse (greatest_lower_bound a identity)) (least_upper_bound a identity) [] by Demod 2 with 12 at 1,2
3334 Id : 2, {_}: multiply (least_upper_bound a identity) (inverse (greatest_lower_bound a identity)) =>= multiply (inverse (greatest_lower_bound a identity)) (least_upper_bound a identity) [] by prove_p21
3335 % SZS output end CNFRefutation for GRP184-1.p
3341 associativity_of_glb is 86
3342 associativity_of_lub is 85
3343 glb_absorbtion is 81
3344 greatest_lower_bound is 95
3345 idempotence_of_gld is 83
3346 idempotence_of_lub is 84
3349 least_upper_bound is 96
3352 lub_absorbtion is 82
3359 symmetry_of_glb is 88
3360 symmetry_of_lub is 87
3362 Id : 4, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
3363 Id : 6, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
3365 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
3366 [8, 7, 6] by associativity ?6 ?7 ?8
3368 greatest_lower_bound ?10 ?11 =?= greatest_lower_bound ?11 ?10
3369 [11, 10] by symmetry_of_glb ?10 ?11
3371 least_upper_bound ?13 ?14 =?= least_upper_bound ?14 ?13
3372 [14, 13] by symmetry_of_lub ?13 ?14
3374 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
3376 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
3377 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
3379 least_upper_bound ?20 (least_upper_bound ?21 ?22)
3381 least_upper_bound (least_upper_bound ?20 ?21) ?22
3382 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
3383 Id : 18, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
3385 greatest_lower_bound ?26 ?26 =>= ?26
3386 [26] by idempotence_of_gld ?26
3388 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
3389 [29, 28] by lub_absorbtion ?28 ?29
3391 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
3392 [32, 31] by glb_absorbtion ?31 ?32
3394 multiply ?34 (least_upper_bound ?35 ?36)
3396 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
3397 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
3399 multiply ?38 (greatest_lower_bound ?39 ?40)
3401 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
3402 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
3404 multiply (least_upper_bound ?42 ?43) ?44
3406 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
3407 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
3409 multiply (greatest_lower_bound ?46 ?47) ?48
3411 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
3412 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
3415 multiply (least_upper_bound a identity)
3416 (inverse (greatest_lower_bound a identity))
3418 multiply (inverse (greatest_lower_bound a identity))
3419 (least_upper_bound a identity)
3421 Found proof, 111.372968s
3422 % SZS status Unsatisfiable for GRP184-3.p
3423 % SZS output start CNFRefutation for GRP184-3.p
3424 Id : 265, {_}: multiply (greatest_lower_bound ?703 ?704) ?705 =<= greatest_lower_bound (multiply ?703 ?705) (multiply ?704 ?705) [705, 704, 703] by monotony_glb2 ?703 ?704 ?705
3425 Id : 28, {_}: multiply ?38 (greatest_lower_bound ?39 ?40) =<= greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40) [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
3426 Id : 145, {_}: greatest_lower_bound ?406 (least_upper_bound ?406 ?407) =>= ?406 [407, 406] by glb_absorbtion ?406 ?407
3427 Id : 20, {_}: greatest_lower_bound ?26 ?26 =>= ?26 [26] by idempotence_of_gld ?26
3428 Id : 127, {_}: least_upper_bound ?353 (greatest_lower_bound ?353 ?354) =>= ?353 [354, 353] by lub_absorbtion ?353 ?354
3429 Id : 8, {_}: multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8) [8, 7, 6] by associativity ?6 ?7 ?8
3430 Id : 18, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
3431 Id : 14, {_}: greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18) =?= greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
3432 Id : 30, {_}: multiply (least_upper_bound ?42 ?43) ?44 =<= least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44) [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
3433 Id : 24, {_}: greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31 [32, 31] by glb_absorbtion ?31 ?32
3434 Id : 22, {_}: least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28 [29, 28] by lub_absorbtion ?28 ?29
3435 Id : 16, {_}: least_upper_bound ?20 (least_upper_bound ?21 ?22) =?= least_upper_bound (least_upper_bound ?20 ?21) ?22 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
3436 Id : 230, {_}: multiply (least_upper_bound ?621 ?622) ?623 =<= least_upper_bound (multiply ?621 ?623) (multiply ?622 ?623) [623, 622, 621] by monotony_lub2 ?621 ?622 ?623
3437 Id : 4, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
3438 Id : 6, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
3439 Id : 38, {_}: multiply (multiply ?61 ?62) ?63 =?= multiply ?61 (multiply ?62 ?63) [63, 62, 61] by associativity ?61 ?62 ?63
3440 Id : 26, {_}: multiply ?34 (least_upper_bound ?35 ?36) =<= least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36) [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
3441 Id : 10, {_}: greatest_lower_bound ?10 ?11 =?= greatest_lower_bound ?11 ?10 [11, 10] by symmetry_of_glb ?10 ?11
3442 Id : 12, {_}: least_upper_bound ?13 ?14 =?= least_upper_bound ?14 ?13 [14, 13] by symmetry_of_lub ?13 ?14
3443 Id : 2065, {_}: multiply (multiply ?3204 (inverse ?3205)) ?3205 =>= multiply ?3204 identity [3205, 3204] by Super 38 with 6 at 2,3
3444 Id : 2068, {_}: multiply identity ?3211 =<= multiply (inverse (inverse ?3211)) identity [3211] by Super 2065 with 6 at 1,2
3445 Id : 2091, {_}: ?3211 =<= multiply (inverse (inverse ?3211)) identity [3211] by Demod 2068 with 4 at 2
3446 Id : 2111, {_}: multiply (inverse (inverse ?3262)) (least_upper_bound ?3263 identity) =<= least_upper_bound (multiply (inverse (inverse ?3262)) ?3263) ?3262 [3263, 3262] by Super 26 with 2091 at 2,3
3447 Id : 39, {_}: multiply (multiply ?65 identity) ?66 =>= multiply ?65 ?66 [66, 65] by Super 38 with 4 at 2,3
3448 Id : 2108, {_}: multiply ?3253 ?3254 =<= multiply (inverse (inverse ?3253)) ?3254 [3254, 3253] by Super 39 with 2091 at 1,2
3449 Id : 2129, {_}: ?3211 =<= multiply ?3211 identity [3211] by Demod 2091 with 2108 at 3
3450 Id : 2149, {_}: inverse (inverse ?3356) =>= multiply ?3356 identity [3356] by Super 2129 with 2108 at 3
3451 Id : 2156, {_}: inverse (inverse ?3356) =>= ?3356 [3356] by Demod 2149 with 2129 at 3
3452 Id : 9722, {_}: multiply ?3262 (least_upper_bound ?3263 identity) =<= least_upper_bound (multiply (inverse (inverse ?3262)) ?3263) ?3262 [3263, 3262] by Demod 2111 with 2156 at 1,2
3453 Id : 9764, {_}: multiply ?11921 (least_upper_bound ?11922 identity) =<= least_upper_bound (multiply ?11921 ?11922) ?11921 [11922, 11921] by Demod 9722 with 2156 at 1,1,3
3454 Id : 701, {_}: multiply (least_upper_bound ?1544 identity) ?1545 =<= least_upper_bound (multiply ?1544 ?1545) ?1545 [1545, 1544] by Super 230 with 4 at 2,3
3455 Id : 703, {_}: multiply (least_upper_bound (inverse ?1549) identity) ?1549 =>= least_upper_bound identity ?1549 [1549] by Super 701 with 6 at 1,3
3456 Id : 729, {_}: multiply (least_upper_bound identity (inverse ?1549)) ?1549 =>= least_upper_bound identity ?1549 [1549] by Demod 703 with 12 at 1,2
3457 Id : 2193, {_}: multiply (least_upper_bound identity ?3378) (inverse ?3378) =>= least_upper_bound identity (inverse ?3378) [3378] by Super 729 with 2156 at 2,1,2
3458 Id : 9777, {_}: multiply (least_upper_bound identity ?11957) (least_upper_bound (inverse ?11957) identity) =<= least_upper_bound (least_upper_bound identity (inverse ?11957)) (least_upper_bound identity ?11957) [11957] by Super 9764 with 2193 at 1,3
3459 Id : 9888, {_}: multiply (least_upper_bound identity ?11957) (least_upper_bound identity (inverse ?11957)) =<= least_upper_bound (least_upper_bound identity (inverse ?11957)) (least_upper_bound identity ?11957) [11957] by Demod 9777 with 12 at 2,2
3460 Id : 9889, {_}: multiply (least_upper_bound identity ?11957) (least_upper_bound identity (inverse ?11957)) =<= least_upper_bound identity (least_upper_bound (inverse ?11957) (least_upper_bound identity ?11957)) [11957] by Demod 9888 with 16 at 3
3461 Id : 523, {_}: least_upper_bound (greatest_lower_bound ?1203 ?1204) ?1203 =>= ?1203 [1204, 1203] by Super 12 with 22 at 3
3462 Id : 524, {_}: least_upper_bound (greatest_lower_bound ?1207 ?1206) ?1206 =>= ?1206 [1206, 1207] by Super 523 with 10 at 1,2
3463 Id : 139, {_}: greatest_lower_bound (least_upper_bound ?385 ?386) ?385 =>= ?385 [386, 385] by Super 10 with 24 at 3
3464 Id : 40, {_}: multiply (multiply ?68 (inverse ?69)) ?69 =>= multiply ?68 identity [69, 68] by Super 38 with 6 at 2,3
3465 Id : 2130, {_}: multiply (multiply ?68 (inverse ?69)) ?69 =>= ?68 [69, 68] by Demod 40 with 2129 at 3
3466 Id : 231, {_}: multiply (least_upper_bound ?625 identity) ?626 =<= least_upper_bound (multiply ?625 ?626) ?626 [626, 625] by Super 230 with 4 at 2,3
3467 Id : 693, {_}: least_upper_bound ?1518 (multiply ?1517 ?1518) =>= multiply (least_upper_bound ?1517 identity) ?1518 [1517, 1518] by Super 12 with 231 at 3
3468 Id : 235, {_}: multiply (least_upper_bound identity ?641) ?642 =<= least_upper_bound ?642 (multiply ?641 ?642) [642, 641] by Super 230 with 4 at 1,3
3469 Id : 1616, {_}: multiply (least_upper_bound identity ?1517) ?1518 =?= multiply (least_upper_bound ?1517 identity) ?1518 [1518, 1517] by Demod 693 with 235 at 2
3470 Id : 1625, {_}: multiply (least_upper_bound (least_upper_bound identity ?2728) ?2730) ?2729 =<= least_upper_bound (multiply (least_upper_bound ?2728 identity) ?2729) (multiply ?2730 ?2729) [2729, 2730, 2728] by Super 30 with 1616 at 1,3
3471 Id : 1699, {_}: multiply (least_upper_bound identity (least_upper_bound ?2728 ?2730)) ?2729 =<= least_upper_bound (multiply (least_upper_bound ?2728 identity) ?2729) (multiply ?2730 ?2729) [2729, 2730, 2728] by Demod 1625 with 16 at 1,2
3472 Id : 1700, {_}: multiply (least_upper_bound identity (least_upper_bound ?2728 ?2730)) ?2729 =<= multiply (least_upper_bound (least_upper_bound ?2728 identity) ?2730) ?2729 [2729, 2730, 2728] by Demod 1699 with 30 at 3
3473 Id : 4487, {_}: multiply (multiply (least_upper_bound identity (least_upper_bound ?5822 ?5823)) (inverse ?5824)) ?5824 =>= least_upper_bound (least_upper_bound ?5822 identity) ?5823 [5824, 5823, 5822] by Super 2130 with 1700 at 1,2
3474 Id : 4634, {_}: least_upper_bound identity (least_upper_bound ?6053 ?6054) =<= least_upper_bound (least_upper_bound ?6053 identity) ?6054 [6054, 6053] by Demod 4487 with 2130 at 2
3475 Id : 122, {_}: least_upper_bound (greatest_lower_bound ?335 ?336) ?335 =>= ?335 [336, 335] by Super 12 with 22 at 3
3476 Id : 4738, {_}: least_upper_bound identity (least_upper_bound (greatest_lower_bound identity ?6182) ?6183) =>= least_upper_bound identity ?6183 [6183, 6182] by Super 4634 with 122 at 1,3
3477 Id : 4751, {_}: least_upper_bound identity (least_upper_bound ?6221 (greatest_lower_bound identity ?6220)) =>= least_upper_bound identity ?6221 [6220, 6221] by Super 4738 with 12 at 2,2
3478 Id : 4923, {_}: least_upper_bound identity ?6418 =<= least_upper_bound (least_upper_bound identity ?6418) (greatest_lower_bound identity ?6419) [6419, 6418] by Super 16 with 4751 at 2
3479 Id : 4974, {_}: least_upper_bound identity ?6418 =<= least_upper_bound (greatest_lower_bound identity ?6419) (least_upper_bound identity ?6418) [6419, 6418] by Demod 4923 with 12 at 3
3480 Id : 5424, {_}: greatest_lower_bound (least_upper_bound identity ?7110) (greatest_lower_bound identity ?7111) =>= greatest_lower_bound identity ?7111 [7111, 7110] by Super 139 with 4974 at 1,2
3481 Id : 5471, {_}: greatest_lower_bound (greatest_lower_bound identity ?7111) (least_upper_bound identity ?7110) =>= greatest_lower_bound identity ?7111 [7110, 7111] by Demod 5424 with 10 at 2
3482 Id : 6383, {_}: greatest_lower_bound identity (greatest_lower_bound ?8259 (least_upper_bound identity ?8260)) =>= greatest_lower_bound identity ?8259 [8260, 8259] by Demod 5471 with 14 at 2
3483 Id : 605, {_}: greatest_lower_bound (least_upper_bound ?1361 ?1362) ?1361 =>= ?1361 [1362, 1361] by Super 10 with 24 at 3
3484 Id : 606, {_}: greatest_lower_bound (least_upper_bound ?1365 ?1364) ?1364 =>= ?1364 [1364, 1365] by Super 605 with 12 at 1,2
3485 Id : 6408, {_}: greatest_lower_bound identity (least_upper_bound identity ?8337) =<= greatest_lower_bound identity (least_upper_bound ?8336 (least_upper_bound identity ?8337)) [8336, 8337] by Super 6383 with 606 at 2,2
3486 Id : 6477, {_}: identity =<= greatest_lower_bound identity (least_upper_bound ?8336 (least_upper_bound identity ?8337)) [8337, 8336] by Demod 6408 with 24 at 2
3487 Id : 8574, {_}: least_upper_bound identity (least_upper_bound ?10550 (least_upper_bound identity ?10551)) =>= least_upper_bound ?10550 (least_upper_bound identity ?10551) [10551, 10550] by Super 524 with 6477 at 1,2
3488 Id : 9890, {_}: multiply (least_upper_bound identity ?11957) (least_upper_bound identity (inverse ?11957)) =>= least_upper_bound (inverse ?11957) (least_upper_bound identity ?11957) [11957] by Demod 9889 with 8574 at 3
3489 Id : 382, {_}: least_upper_bound ?896 (least_upper_bound ?896 ?897) =>= least_upper_bound ?896 ?897 [897, 896] by Super 16 with 18 at 1,3
3490 Id : 383, {_}: least_upper_bound ?899 (least_upper_bound ?900 ?899) =>= least_upper_bound ?899 ?900 [900, 899] by Super 382 with 12 at 2,2
3491 Id : 9723, {_}: multiply ?3262 (least_upper_bound ?3263 identity) =<= least_upper_bound (multiply ?3262 ?3263) ?3262 [3263, 3262] by Demod 9722 with 2156 at 1,1,3
3492 Id : 9944, {_}: least_upper_bound ?12111 (multiply ?12111 ?12112) =>= multiply ?12111 (least_upper_bound ?12112 identity) [12112, 12111] by Super 12 with 9723 at 3
3493 Id : 9957, {_}: least_upper_bound (least_upper_bound identity ?12147) (least_upper_bound identity (inverse ?12147)) =>= multiply (least_upper_bound identity ?12147) (least_upper_bound (inverse ?12147) identity) [12147] by Super 9944 with 2193 at 2,2
3494 Id : 10090, {_}: least_upper_bound identity (least_upper_bound ?12147 (least_upper_bound identity (inverse ?12147))) =>= multiply (least_upper_bound identity ?12147) (least_upper_bound (inverse ?12147) identity) [12147] by Demod 9957 with 16 at 2
3495 Id : 10091, {_}: least_upper_bound ?12147 (least_upper_bound identity (inverse ?12147)) =<= multiply (least_upper_bound identity ?12147) (least_upper_bound (inverse ?12147) identity) [12147] by Demod 10090 with 8574 at 2
3496 Id : 10092, {_}: least_upper_bound ?12147 (least_upper_bound identity (inverse ?12147)) =<= multiply (least_upper_bound identity ?12147) (least_upper_bound identity (inverse ?12147)) [12147] by Demod 10091 with 12 at 2,3
3497 Id : 50296, {_}: least_upper_bound ?12147 (least_upper_bound identity (inverse ?12147)) =?= least_upper_bound (inverse ?12147) (least_upper_bound identity ?12147) [12147] by Demod 10092 with 9890 at 3
3498 Id : 50343, {_}: least_upper_bound (least_upper_bound identity (inverse ?46312)) (least_upper_bound (inverse ?46312) (least_upper_bound identity ?46312)) =>= least_upper_bound (least_upper_bound identity (inverse ?46312)) ?46312 [46312] by Super 383 with 50296 at 2,2
3499 Id : 50540, {_}: least_upper_bound identity (least_upper_bound (inverse ?46312) (least_upper_bound (inverse ?46312) (least_upper_bound identity ?46312))) =>= least_upper_bound (least_upper_bound identity (inverse ?46312)) ?46312 [46312] by Demod 50343 with 16 at 2
3500 Id : 100, {_}: least_upper_bound ?287 (least_upper_bound ?287 ?288) =>= least_upper_bound ?287 ?288 [288, 287] by Super 16 with 18 at 1,3
3501 Id : 50541, {_}: least_upper_bound identity (least_upper_bound (inverse ?46312) (least_upper_bound identity ?46312)) =>= least_upper_bound (least_upper_bound identity (inverse ?46312)) ?46312 [46312] by Demod 50540 with 100 at 2,2
3502 Id : 50542, {_}: least_upper_bound (inverse ?46312) (least_upper_bound identity ?46312) =<= least_upper_bound (least_upper_bound identity (inverse ?46312)) ?46312 [46312] by Demod 50541 with 8574 at 2
3503 Id : 50543, {_}: least_upper_bound (inverse ?46312) (least_upper_bound identity ?46312) =>= least_upper_bound identity (least_upper_bound (inverse ?46312) ?46312) [46312] by Demod 50542 with 16 at 3
3504 Id : 51165, {_}: multiply (least_upper_bound identity ?11957) (least_upper_bound identity (inverse ?11957)) =>= least_upper_bound identity (least_upper_bound (inverse ?11957) ?11957) [11957] by Demod 9890 with 50543 at 3
3505 Id : 51164, {_}: least_upper_bound ?12147 (least_upper_bound identity (inverse ?12147)) =?= least_upper_bound identity (least_upper_bound (inverse ?12147) ?12147) [12147] by Demod 50296 with 50543 at 3
3506 Id : 1772, {_}: multiply (multiply ?2886 (least_upper_bound identity (inverse ?2885))) ?2885 =>= multiply ?2886 (least_upper_bound identity ?2885) [2885, 2886] by Super 8 with 729 at 2,3
3507 Id : 2194, {_}: multiply (multiply ?3381 ?3380) (inverse ?3380) =>= ?3381 [3380, 3381] by Super 2130 with 2156 at 2,1,2
3508 Id : 2142, {_}: multiply ?3332 (inverse ?3332) =>= identity [3332] by Super 6 with 2108 at 2
3509 Id : 2212, {_}: multiply identity ?3416 =<= multiply ?3415 (multiply (inverse ?3415) ?3416) [3415, 3416] by Super 8 with 2142 at 1,2
3510 Id : 2238, {_}: ?3416 =<= multiply ?3415 (multiply (inverse ?3415) ?3416) [3415, 3416] by Demod 2212 with 4 at 2
3511 Id : 4219, {_}: multiply ?5438 (inverse (multiply (inverse ?5439) ?5438)) =>= ?5439 [5439, 5438] by Super 2194 with 2238 at 1,2
3512 Id : 18113, {_}: inverse (multiply (inverse ?20071) (inverse ?20072)) =>= multiply ?20072 ?20071 [20072, 20071] by Super 2238 with 4219 at 2,3
3513 Id : 18209, {_}: inverse (multiply ?20210 ?20209) =<= multiply (inverse ?20209) (inverse ?20210) [20209, 20210] by Super 2156 with 18113 at 1,2
3514 Id : 18309, {_}: multiply (inverse (multiply ?20330 ?20331)) ?20330 =>= inverse ?20331 [20331, 20330] by Super 2130 with 18209 at 1,2
3515 Id : 20618, {_}: multiply (least_upper_bound identity (inverse (multiply ?22269 ?22270))) ?22269 =>= least_upper_bound ?22269 (inverse ?22270) [22270, 22269] by Super 235 with 18309 at 2,3
3516 Id : 379959, {_}: multiply (least_upper_bound ?332905 (inverse ?332906)) (inverse ?332905) =>= least_upper_bound identity (inverse (multiply ?332905 ?332906)) [332906, 332905] by Super 2194 with 20618 at 1,2
3517 Id : 243389, {_}: multiply (least_upper_bound identity (multiply ?228491 ?228492)) (inverse ?228492) =>= least_upper_bound (inverse ?228492) ?228491 [228492, 228491] by Super 235 with 2194 at 2,3
3518 Id : 177106, {_}: multiply (multiply ?175304 (least_upper_bound identity (inverse ?175305))) ?175305 =>= multiply ?175304 (least_upper_bound identity ?175305) [175305, 175304] by Super 8 with 729 at 2,3
3519 Id : 10132, {_}: multiply (inverse ?12250) (least_upper_bound ?12250 identity) =>= least_upper_bound identity (inverse ?12250) [12250] by Super 9764 with 6 at 1,3
3520 Id : 10133, {_}: multiply (inverse ?12252) (least_upper_bound identity ?12252) =>= least_upper_bound identity (inverse ?12252) [12252] by Super 10132 with 12 at 2,2
3521 Id : 10242, {_}: multiply (least_upper_bound identity (inverse ?12325)) (least_upper_bound identity ?12325) =<= least_upper_bound (least_upper_bound identity ?12325) (least_upper_bound identity (inverse ?12325)) [12325] by Super 235 with 10133 at 2,3
3522 Id : 10288, {_}: multiply (least_upper_bound identity (inverse ?12325)) (least_upper_bound identity ?12325) =<= least_upper_bound identity (least_upper_bound ?12325 (least_upper_bound identity (inverse ?12325))) [12325] by Demod 10242 with 16 at 3
3523 Id : 10289, {_}: multiply (least_upper_bound identity (inverse ?12325)) (least_upper_bound identity ?12325) =>= least_upper_bound ?12325 (least_upper_bound identity (inverse ?12325)) [12325] by Demod 10288 with 8574 at 3
3524 Id : 177160, {_}: multiply (least_upper_bound (inverse ?175487) (least_upper_bound identity (inverse (inverse ?175487)))) ?175487 =>= multiply (least_upper_bound identity (inverse (inverse ?175487))) (least_upper_bound identity ?175487) [175487] by Super 177106 with 10289 at 1,2
3525 Id : 236, {_}: multiply (least_upper_bound (inverse ?645) ?644) ?645 =>= least_upper_bound identity (multiply ?644 ?645) [644, 645] by Super 230 with 6 at 1,3
3526 Id : 177356, {_}: least_upper_bound identity (multiply (least_upper_bound identity (inverse (inverse ?175487))) ?175487) =>= multiply (least_upper_bound identity (inverse (inverse ?175487))) (least_upper_bound identity ?175487) [175487] by Demod 177160 with 236 at 2
3527 Id : 177357, {_}: least_upper_bound identity (multiply (least_upper_bound identity ?175487) ?175487) =<= multiply (least_upper_bound identity (inverse (inverse ?175487))) (least_upper_bound identity ?175487) [175487] by Demod 177356 with 2156 at 2,1,2,2
3528 Id : 177519, {_}: least_upper_bound identity (multiply (least_upper_bound identity ?175800) ?175800) =>= multiply (least_upper_bound identity ?175800) (least_upper_bound identity ?175800) [175800] by Demod 177357 with 2156 at 2,1,3
3529 Id : 177520, {_}: least_upper_bound identity (multiply (least_upper_bound ?175802 identity) ?175802) =>= multiply (least_upper_bound identity ?175802) (least_upper_bound identity ?175802) [175802] by Super 177519 with 12 at 1,2,2
3530 Id : 3515, {_}: multiply (least_upper_bound identity (least_upper_bound (inverse ?4381) ?4382)) ?4381 =>= least_upper_bound ?4381 (least_upper_bound identity (multiply ?4382 ?4381)) [4382, 4381] by Super 235 with 236 at 2,3
3531 Id : 1778, {_}: multiply (least_upper_bound (least_upper_bound identity (inverse ?2903)) ?2904) ?2903 =>= least_upper_bound (least_upper_bound identity ?2903) (multiply ?2904 ?2903) [2904, 2903] by Super 30 with 729 at 1,3
3532 Id : 1803, {_}: multiply (least_upper_bound identity (least_upper_bound (inverse ?2903) ?2904)) ?2903 =>= least_upper_bound (least_upper_bound identity ?2903) (multiply ?2904 ?2903) [2904, 2903] by Demod 1778 with 16 at 1,2
3533 Id : 1804, {_}: multiply (least_upper_bound identity (least_upper_bound (inverse ?2903) ?2904)) ?2903 =>= least_upper_bound (multiply ?2904 ?2903) (least_upper_bound identity ?2903) [2904, 2903] by Demod 1803 with 12 at 3
3534 Id : 102, {_}: least_upper_bound ?294 ?293 =<= least_upper_bound (least_upper_bound ?294 ?293) ?293 [293, 294] by Super 16 with 18 at 2,2
3535 Id : 29053, {_}: least_upper_bound identity (least_upper_bound (least_upper_bound ?27543 ?27544) ?27545) =<= least_upper_bound (least_upper_bound ?27543 (least_upper_bound ?27544 identity)) ?27545 [27545, 27544, 27543] by Super 4634 with 16 at 1,3
3536 Id : 29054, {_}: least_upper_bound identity (least_upper_bound (least_upper_bound ?27547 ?27548) ?27549) =<= least_upper_bound (least_upper_bound ?27547 (least_upper_bound identity ?27548)) ?27549 [27549, 27548, 27547] by Super 29053 with 12 at 2,1,3
3537 Id : 93172, {_}: least_upper_bound ?78323 (least_upper_bound identity ?78324) =<= least_upper_bound identity (least_upper_bound (least_upper_bound ?78323 ?78324) (least_upper_bound identity ?78324)) [78324, 78323] by Super 102 with 29054 at 3
3538 Id : 93561, {_}: least_upper_bound ?78323 (least_upper_bound identity ?78324) =<= least_upper_bound (least_upper_bound ?78323 ?78324) (least_upper_bound identity ?78324) [78324, 78323] by Demod 93172 with 8574 at 3
3539 Id : 4534, {_}: least_upper_bound identity (least_upper_bound ?5822 ?5823) =<= least_upper_bound (least_upper_bound ?5822 identity) ?5823 [5823, 5822] by Demod 4487 with 2130 at 2
3540 Id : 27996, {_}: least_upper_bound ?26567 (least_upper_bound identity (least_upper_bound ?26568 ?26567)) =>= least_upper_bound ?26567 (least_upper_bound ?26568 identity) [26568, 26567] by Super 383 with 4534 at 2,2
3541 Id : 28002, {_}: least_upper_bound ?26586 (least_upper_bound identity ?26586) =<= least_upper_bound ?26586 (least_upper_bound (greatest_lower_bound ?26586 ?26585) identity) [26585, 26586] by Super 27996 with 122 at 2,2,2
3542 Id : 28236, {_}: least_upper_bound ?26586 identity =<= least_upper_bound ?26586 (least_upper_bound (greatest_lower_bound ?26586 ?26585) identity) [26585, 26586] by Demod 28002 with 383 at 2
3543 Id : 8916, {_}: least_upper_bound identity (least_upper_bound ?11024 (least_upper_bound identity ?11025)) =>= least_upper_bound ?11024 (least_upper_bound identity ?11025) [11025, 11024] by Super 524 with 6477 at 1,2
3544 Id : 8917, {_}: least_upper_bound identity (least_upper_bound ?11027 (least_upper_bound ?11028 identity)) =>= least_upper_bound ?11027 (least_upper_bound identity ?11028) [11028, 11027] by Super 8916 with 12 at 2,2,2
3545 Id : 4835, {_}: least_upper_bound identity (least_upper_bound (greatest_lower_bound ?6313 identity) ?6314) =>= least_upper_bound identity ?6314 [6314, 6313] by Super 4634 with 524 at 1,3
3546 Id : 4847, {_}: least_upper_bound identity (greatest_lower_bound ?6349 identity) =<= least_upper_bound identity (greatest_lower_bound (greatest_lower_bound ?6349 identity) ?6348) [6348, 6349] by Super 4835 with 22 at 2,2
3547 Id : 128, {_}: least_upper_bound ?356 (greatest_lower_bound ?357 ?356) =>= ?356 [357, 356] by Super 127 with 10 at 2,2
3548 Id : 4903, {_}: identity =<= least_upper_bound identity (greatest_lower_bound (greatest_lower_bound ?6349 identity) ?6348) [6348, 6349] by Demod 4847 with 128 at 2
3549 Id : 5840, {_}: greatest_lower_bound identity (greatest_lower_bound (greatest_lower_bound ?7630 identity) ?7631) =>= greatest_lower_bound (greatest_lower_bound ?7630 identity) ?7631 [7631, 7630] by Super 606 with 4903 at 1,2
3550 Id : 5845, {_}: greatest_lower_bound identity (greatest_lower_bound identity ?7645) =<= greatest_lower_bound (greatest_lower_bound (least_upper_bound ?7644 identity) identity) ?7645 [7644, 7645] by Super 5840 with 606 at 1,2,2
3551 Id : 112, {_}: greatest_lower_bound ?313 (greatest_lower_bound ?313 ?314) =>= greatest_lower_bound ?313 ?314 [314, 313] by Super 14 with 20 at 1,3
3552 Id : 5908, {_}: greatest_lower_bound identity ?7645 =<= greatest_lower_bound (greatest_lower_bound (least_upper_bound ?7644 identity) identity) ?7645 [7644, 7645] by Demod 5845 with 112 at 2
3553 Id : 5909, {_}: greatest_lower_bound identity ?7645 =<= greatest_lower_bound (greatest_lower_bound identity (least_upper_bound ?7644 identity)) ?7645 [7644, 7645] by Demod 5908 with 10 at 1,3
3554 Id : 7862, {_}: greatest_lower_bound identity ?10013 =<= greatest_lower_bound identity (greatest_lower_bound (least_upper_bound ?10014 identity) ?10013) [10014, 10013] by Demod 5909 with 14 at 3
3555 Id : 146, {_}: greatest_lower_bound ?409 (least_upper_bound ?410 ?409) =>= ?409 [410, 409] by Super 145 with 12 at 2,2
3556 Id : 7879, {_}: greatest_lower_bound identity (least_upper_bound ?10063 (least_upper_bound ?10064 identity)) =>= greatest_lower_bound identity (least_upper_bound ?10064 identity) [10064, 10063] by Super 7862 with 146 at 2,3
3557 Id : 7984, {_}: greatest_lower_bound identity (least_upper_bound ?10063 (least_upper_bound ?10064 identity)) =>= identity [10064, 10063] by Demod 7879 with 146 at 3
3558 Id : 8758, {_}: least_upper_bound identity (least_upper_bound ?10813 (least_upper_bound ?10814 identity)) =>= least_upper_bound ?10813 (least_upper_bound ?10814 identity) [10814, 10813] by Super 524 with 7984 at 1,2
3559 Id : 9284, {_}: least_upper_bound ?11027 (least_upper_bound ?11028 identity) =?= least_upper_bound ?11027 (least_upper_bound identity ?11028) [11028, 11027] by Demod 8917 with 8758 at 2
3560 Id : 89245, {_}: least_upper_bound ?75550 identity =<= least_upper_bound ?75550 (least_upper_bound identity (greatest_lower_bound ?75550 ?75551)) [75551, 75550] by Demod 28236 with 9284 at 3
3561 Id : 89255, {_}: least_upper_bound (least_upper_bound ?75580 ?75581) identity =<= least_upper_bound (least_upper_bound ?75580 ?75581) (least_upper_bound identity ?75581) [75581, 75580] by Super 89245 with 606 at 2,2,3
3562 Id : 89821, {_}: least_upper_bound identity (least_upper_bound ?75580 ?75581) =<= least_upper_bound (least_upper_bound ?75580 ?75581) (least_upper_bound identity ?75581) [75581, 75580] by Demod 89255 with 12 at 2
3563 Id : 113848, {_}: least_upper_bound ?78323 (least_upper_bound identity ?78324) =?= least_upper_bound identity (least_upper_bound ?78323 ?78324) [78324, 78323] by Demod 93561 with 89821 at 3
3564 Id : 181989, {_}: multiply (least_upper_bound identity (least_upper_bound (inverse ?2903) ?2904)) ?2903 =>= least_upper_bound identity (least_upper_bound (multiply ?2904 ?2903) ?2903) [2904, 2903] by Demod 1804 with 113848 at 3
3565 Id : 181990, {_}: multiply (least_upper_bound identity (least_upper_bound (inverse ?2903) ?2904)) ?2903 =>= least_upper_bound identity (multiply (least_upper_bound ?2904 identity) ?2903) [2904, 2903] by Demod 181989 with 231 at 2,3
3566 Id : 230272, {_}: least_upper_bound identity (multiply (least_upper_bound ?4382 identity) ?4381) =?= least_upper_bound ?4381 (least_upper_bound identity (multiply ?4382 ?4381)) [4381, 4382] by Demod 3515 with 181990 at 2
3567 Id : 230301, {_}: least_upper_bound ?219571 (least_upper_bound identity (multiply ?219571 ?219571)) =>= multiply (least_upper_bound identity ?219571) (least_upper_bound identity ?219571) [219571] by Super 177520 with 230272 at 2
3568 Id : 232386, {_}: multiply (least_upper_bound identity ?221067) (least_upper_bound identity ?221067) =<= least_upper_bound (least_upper_bound ?221067 identity) (multiply ?221067 ?221067) [221067] by Super 16 with 230301 at 2
3569 Id : 233006, {_}: multiply (least_upper_bound identity ?221067) (least_upper_bound identity ?221067) =<= least_upper_bound (multiply ?221067 ?221067) (least_upper_bound ?221067 identity) [221067] by Demod 232386 with 12 at 3
3570 Id : 4614, {_}: greatest_lower_bound ?5993 (least_upper_bound identity (least_upper_bound ?5992 ?5993)) =>= ?5993 [5992, 5993] by Super 146 with 4534 at 2,2
3571 Id : 27608, {_}: least_upper_bound ?26112 (least_upper_bound identity (least_upper_bound ?26113 ?26112)) =>= least_upper_bound identity (least_upper_bound ?26113 ?26112) [26113, 26112] by Super 524 with 4614 at 1,2
3572 Id : 4631, {_}: least_upper_bound ?6045 (least_upper_bound identity (least_upper_bound ?6044 ?6045)) =>= least_upper_bound ?6045 (least_upper_bound ?6044 identity) [6044, 6045] by Super 383 with 4534 at 2,2
3573 Id : 83798, {_}: least_upper_bound ?26112 (least_upper_bound ?26113 identity) =?= least_upper_bound identity (least_upper_bound ?26113 ?26112) [26113, 26112] by Demod 27608 with 4631 at 2
3574 Id : 233007, {_}: multiply (least_upper_bound identity ?221067) (least_upper_bound identity ?221067) =<= least_upper_bound identity (least_upper_bound ?221067 (multiply ?221067 ?221067)) [221067] by Demod 233006 with 83798 at 3
3575 Id : 9743, {_}: least_upper_bound ?11859 (multiply ?11859 ?11860) =>= multiply ?11859 (least_upper_bound ?11860 identity) [11860, 11859] by Super 12 with 9723 at 3
3576 Id : 233595, {_}: multiply (least_upper_bound identity ?221617) (least_upper_bound identity ?221617) =<= least_upper_bound identity (multiply ?221617 (least_upper_bound ?221617 identity)) [221617] by Demod 233007 with 9743 at 2,3
3577 Id : 233596, {_}: multiply (least_upper_bound identity ?221619) (least_upper_bound identity ?221619) =<= least_upper_bound identity (multiply ?221619 (least_upper_bound identity ?221619)) [221619] by Super 233595 with 12 at 2,2,3
3578 Id : 243525, {_}: multiply (multiply (least_upper_bound identity ?228868) (least_upper_bound identity ?228868)) (inverse (least_upper_bound identity ?228868)) =>= least_upper_bound (inverse (least_upper_bound identity ?228868)) ?228868 [228868] by Super 243389 with 233596 at 1,2
3579 Id : 243950, {_}: least_upper_bound identity ?228868 =<= least_upper_bound (inverse (least_upper_bound identity ?228868)) ?228868 [228868] by Demod 243525 with 2194 at 2
3580 Id : 244049, {_}: least_upper_bound ?229075 (inverse (least_upper_bound identity ?229075)) =>= least_upper_bound identity ?229075 [229075] by Super 12 with 243950 at 3
3581 Id : 380052, {_}: multiply (least_upper_bound identity ?333235) (inverse ?333235) =<= least_upper_bound identity (inverse (multiply ?333235 (least_upper_bound identity ?333235))) [333235] by Super 379959 with 244049 at 1,2
3582 Id : 381402, {_}: least_upper_bound identity (inverse ?334503) =<= least_upper_bound identity (inverse (multiply ?334503 (least_upper_bound identity ?334503))) [334503] by Demod 380052 with 2193 at 2
3583 Id : 177358, {_}: least_upper_bound identity (multiply (least_upper_bound identity ?175487) ?175487) =>= multiply (least_upper_bound identity ?175487) (least_upper_bound identity ?175487) [175487] by Demod 177357 with 2156 at 2,1,3
3584 Id : 177476, {_}: multiply (inverse (multiply (least_upper_bound identity ?175688) ?175688)) (multiply (least_upper_bound identity ?175688) (least_upper_bound identity ?175688)) =>= least_upper_bound identity (inverse (multiply (least_upper_bound identity ?175688) ?175688)) [175688] by Super 10133 with 177358 at 2,2
3585 Id : 177670, {_}: multiply (multiply (inverse (multiply (least_upper_bound identity ?175688) ?175688)) (least_upper_bound identity ?175688)) (least_upper_bound identity ?175688) =>= least_upper_bound identity (inverse (multiply (least_upper_bound identity ?175688) ?175688)) [175688] by Demod 177476 with 8 at 2
3586 Id : 177671, {_}: multiply (inverse ?175688) (least_upper_bound identity ?175688) =<= least_upper_bound identity (inverse (multiply (least_upper_bound identity ?175688) ?175688)) [175688] by Demod 177670 with 18309 at 1,2
3587 Id : 177672, {_}: least_upper_bound identity (inverse ?175688) =<= least_upper_bound identity (inverse (multiply (least_upper_bound identity ?175688) ?175688)) [175688] by Demod 177671 with 10133 at 2
3588 Id : 381492, {_}: least_upper_bound identity (inverse (inverse (multiply (least_upper_bound identity ?334735) ?334735))) =<= least_upper_bound identity (inverse (multiply (inverse (multiply (least_upper_bound identity ?334735) ?334735)) (least_upper_bound identity (inverse ?334735)))) [334735] by Super 381402 with 177672 at 2,1,2,3
3589 Id : 382266, {_}: least_upper_bound identity (multiply (least_upper_bound identity ?334735) ?334735) =<= least_upper_bound identity (inverse (multiply (inverse (multiply (least_upper_bound identity ?334735) ?334735)) (least_upper_bound identity (inverse ?334735)))) [334735] by Demod 381492 with 2156 at 2,2
3590 Id : 382267, {_}: multiply (least_upper_bound identity ?334735) (least_upper_bound identity ?334735) =<= least_upper_bound identity (inverse (multiply (inverse (multiply (least_upper_bound identity ?334735) ?334735)) (least_upper_bound identity (inverse ?334735)))) [334735] by Demod 382266 with 177358 at 2
3591 Id : 18224, {_}: inverse (multiply (inverse ?20261) (inverse ?20262)) =>= multiply ?20262 ?20261 [20262, 20261] by Super 2238 with 4219 at 2,3
3592 Id : 18226, {_}: inverse (multiply (inverse ?20267) ?20266) =>= multiply (inverse ?20266) ?20267 [20266, 20267] by Super 18224 with 2156 at 2,1,2
3593 Id : 382268, {_}: multiply (least_upper_bound identity ?334735) (least_upper_bound identity ?334735) =<= least_upper_bound identity (multiply (inverse (least_upper_bound identity (inverse ?334735))) (multiply (least_upper_bound identity ?334735) ?334735)) [334735] by Demod 382267 with 18226 at 2,3
3594 Id : 382269, {_}: multiply (least_upper_bound identity ?334735) (least_upper_bound identity ?334735) =<= least_upper_bound identity (multiply (multiply (inverse (least_upper_bound identity (inverse ?334735))) (least_upper_bound identity ?334735)) ?334735) [334735] by Demod 382268 with 8 at 2,3
3595 Id : 18545, {_}: inverse (multiply ?20706 (inverse ?20707)) =>= multiply ?20707 (inverse ?20706) [20707, 20706] by Super 18224 with 2156 at 1,1,2
3596 Id : 18566, {_}: inverse (least_upper_bound identity (inverse ?20767)) =<= multiply ?20767 (inverse (least_upper_bound identity ?20767)) [20767] by Super 18545 with 2193 at 1,2
3597 Id : 19741, {_}: multiply (inverse (least_upper_bound identity (inverse ?21554))) (least_upper_bound identity ?21554) =>= ?21554 [21554] by Super 2130 with 18566 at 1,2
3598 Id : 382270, {_}: multiply (least_upper_bound identity ?334735) (least_upper_bound identity ?334735) =>= least_upper_bound identity (multiply ?334735 ?334735) [334735] by Demod 382269 with 19741 at 1,2,3
3599 Id : 382385, {_}: multiply (least_upper_bound identity (multiply (inverse ?334827) (inverse ?334827))) ?334827 =>= multiply (least_upper_bound identity (inverse ?334827)) (least_upper_bound identity ?334827) [334827] by Super 1772 with 382270 at 1,2
3600 Id : 2064, {_}: multiply (least_upper_bound identity (multiply ?3201 (inverse ?3202))) ?3202 =>= least_upper_bound ?3202 (multiply ?3201 identity) [3202, 3201] by Super 235 with 40 at 2,3
3601 Id : 223367, {_}: multiply (least_upper_bound identity (multiply ?3201 (inverse ?3202))) ?3202 =>= least_upper_bound ?3202 ?3201 [3202, 3201] by Demod 2064 with 2129 at 2,3
3602 Id : 382807, {_}: least_upper_bound ?334827 (inverse ?334827) =<= multiply (least_upper_bound identity (inverse ?334827)) (least_upper_bound identity ?334827) [334827] by Demod 382385 with 223367 at 2
3603 Id : 382808, {_}: least_upper_bound ?334827 (inverse ?334827) =<= least_upper_bound ?334827 (least_upper_bound identity (inverse ?334827)) [334827] by Demod 382807 with 10289 at 3
3604 Id : 383798, {_}: least_upper_bound ?12147 (inverse ?12147) =<= least_upper_bound identity (least_upper_bound (inverse ?12147) ?12147) [12147] by Demod 51164 with 382808 at 2
3605 Id : 383800, {_}: multiply (least_upper_bound identity ?11957) (least_upper_bound identity (inverse ?11957)) =>= least_upper_bound ?11957 (inverse ?11957) [11957] by Demod 51165 with 383798 at 3
3606 Id : 2115, {_}: multiply (inverse (inverse ?3274)) (greatest_lower_bound ?3275 identity) =<= greatest_lower_bound (multiply (inverse (inverse ?3274)) ?3275) ?3274 [3275, 3274] by Super 28 with 2091 at 2,3
3607 Id : 10659, {_}: multiply ?3274 (greatest_lower_bound ?3275 identity) =<= greatest_lower_bound (multiply (inverse (inverse ?3274)) ?3275) ?3274 [3275, 3274] by Demod 2115 with 2156 at 1,2
3608 Id : 10660, {_}: multiply ?3274 (greatest_lower_bound ?3275 identity) =<= greatest_lower_bound (multiply ?3274 ?3275) ?3274 [3275, 3274] by Demod 10659 with 2156 at 1,1,3
3609 Id : 10678, {_}: greatest_lower_bound ?12834 (multiply ?12834 ?12835) =>= multiply ?12834 (greatest_lower_bound ?12835 identity) [12835, 12834] by Super 10 with 10660 at 3
3610 Id : 18328, {_}: greatest_lower_bound (inverse ?20397) (inverse (multiply ?20396 ?20397)) =>= multiply (inverse ?20397) (greatest_lower_bound (inverse ?20396) identity) [20396, 20397] by Super 10678 with 18209 at 2,2
3611 Id : 2116, {_}: multiply (inverse (inverse ?3277)) (greatest_lower_bound identity ?3278) =<= greatest_lower_bound ?3277 (multiply (inverse (inverse ?3277)) ?3278) [3278, 3277] by Super 28 with 2091 at 1,3
3612 Id : 11396, {_}: multiply ?3277 (greatest_lower_bound identity ?3278) =<= greatest_lower_bound ?3277 (multiply (inverse (inverse ?3277)) ?3278) [3278, 3277] by Demod 2116 with 2156 at 1,2
3613 Id : 11397, {_}: multiply ?3277 (greatest_lower_bound identity ?3278) =<= greatest_lower_bound ?3277 (multiply ?3277 ?3278) [3278, 3277] by Demod 11396 with 2156 at 1,2,3
3614 Id : 11398, {_}: multiply ?3277 (greatest_lower_bound identity ?3278) =?= multiply ?3277 (greatest_lower_bound ?3278 identity) [3278, 3277] by Demod 11397 with 10678 at 3
3615 Id : 78468, {_}: greatest_lower_bound (inverse ?65596) (inverse (multiply ?65597 ?65596)) =>= multiply (inverse ?65596) (greatest_lower_bound identity (inverse ?65597)) [65597, 65596] by Demod 18328 with 11398 at 3
3616 Id : 78507, {_}: greatest_lower_bound (inverse ?65693) (inverse (inverse ?65692)) =<= multiply (inverse ?65693) (greatest_lower_bound identity (inverse (inverse (multiply ?65693 ?65692)))) [65692, 65693] by Super 78468 with 18309 at 1,2,2
3617 Id : 78731, {_}: greatest_lower_bound (inverse ?65693) ?65692 =<= multiply (inverse ?65693) (greatest_lower_bound identity (inverse (inverse (multiply ?65693 ?65692)))) [65692, 65693] by Demod 78507 with 2156 at 2,2
3618 Id : 443714, {_}: greatest_lower_bound (inverse ?378148) ?378149 =<= multiply (inverse ?378148) (greatest_lower_bound identity (multiply ?378148 ?378149)) [378149, 378148] by Demod 78731 with 2156 at 2,2,3
3619 Id : 842, {_}: multiply (greatest_lower_bound ?1730 identity) ?1731 =<= greatest_lower_bound (multiply ?1730 ?1731) ?1731 [1731, 1730] by Super 265 with 4 at 2,3
3620 Id : 844, {_}: multiply (greatest_lower_bound (inverse ?1735) identity) ?1735 =>= greatest_lower_bound identity ?1735 [1735] by Super 842 with 6 at 1,3
3621 Id : 874, {_}: multiply (greatest_lower_bound identity (inverse ?1735)) ?1735 =>= greatest_lower_bound identity ?1735 [1735] by Demod 844 with 10 at 1,2
3622 Id : 2191, {_}: multiply (greatest_lower_bound identity ?3374) (inverse ?3374) =>= greatest_lower_bound identity (inverse ?3374) [3374] by Super 874 with 2156 at 2,1,2
3623 Id : 9776, {_}: multiply (greatest_lower_bound identity ?11955) (least_upper_bound (inverse ?11955) identity) =<= least_upper_bound (greatest_lower_bound identity (inverse ?11955)) (greatest_lower_bound identity ?11955) [11955] by Super 9764 with 2191 at 1,3
3624 Id : 47906, {_}: multiply (greatest_lower_bound identity ?45245) (least_upper_bound identity (inverse ?45245)) =<= least_upper_bound (greatest_lower_bound identity (inverse ?45245)) (greatest_lower_bound identity ?45245) [45245] by Demod 9776 with 12 at 2,2
3625 Id : 47957, {_}: multiply (greatest_lower_bound identity (inverse ?45371)) (least_upper_bound identity (inverse (inverse ?45371))) =>= least_upper_bound (greatest_lower_bound identity ?45371) (greatest_lower_bound identity (inverse ?45371)) [45371] by Super 47906 with 2156 at 2,1,3
3626 Id : 48268, {_}: multiply (greatest_lower_bound identity (inverse ?45371)) (least_upper_bound identity ?45371) =<= least_upper_bound (greatest_lower_bound identity ?45371) (greatest_lower_bound identity (inverse ?45371)) [45371] by Demod 47957 with 2156 at 2,2,2
3627 Id : 9956, {_}: least_upper_bound (greatest_lower_bound identity ?12145) (greatest_lower_bound identity (inverse ?12145)) =>= multiply (greatest_lower_bound identity ?12145) (least_upper_bound (inverse ?12145) identity) [12145] by Super 9944 with 2191 at 2,2
3628 Id : 10089, {_}: least_upper_bound (greatest_lower_bound identity ?12145) (greatest_lower_bound identity (inverse ?12145)) =>= multiply (greatest_lower_bound identity ?12145) (least_upper_bound identity (inverse ?12145)) [12145] by Demod 9956 with 12 at 2,3
3629 Id : 105582, {_}: multiply (greatest_lower_bound identity (inverse ?45371)) (least_upper_bound identity ?45371) =?= multiply (greatest_lower_bound identity ?45371) (least_upper_bound identity (inverse ?45371)) [45371] by Demod 48268 with 10089 at 3
3630 Id : 443814, {_}: greatest_lower_bound (inverse (greatest_lower_bound identity (inverse ?378412))) (least_upper_bound identity ?378412) =<= multiply (inverse (greatest_lower_bound identity (inverse ?378412))) (greatest_lower_bound identity (multiply (greatest_lower_bound identity ?378412) (least_upper_bound identity (inverse ?378412)))) [378412] by Super 443714 with 105582 at 2,2,3
3631 Id : 5843, {_}: greatest_lower_bound identity (greatest_lower_bound identity ?7639) =<= greatest_lower_bound (greatest_lower_bound (least_upper_bound identity ?7638) identity) ?7639 [7638, 7639] by Super 5840 with 139 at 1,2,2
3632 Id : 5900, {_}: greatest_lower_bound identity ?7639 =<= greatest_lower_bound (greatest_lower_bound (least_upper_bound identity ?7638) identity) ?7639 [7638, 7639] by Demod 5843 with 112 at 2
3633 Id : 5901, {_}: greatest_lower_bound identity ?7639 =<= greatest_lower_bound (greatest_lower_bound identity (least_upper_bound identity ?7638)) ?7639 [7638, 7639] by Demod 5900 with 10 at 1,3
3634 Id : 7645, {_}: greatest_lower_bound identity ?9767 =<= greatest_lower_bound identity (greatest_lower_bound (least_upper_bound identity ?9768) ?9767) [9768, 9767] by Demod 5901 with 14 at 3
3635 Id : 270, {_}: multiply (greatest_lower_bound identity ?723) ?724 =<= greatest_lower_bound ?724 (multiply ?723 ?724) [724, 723] by Super 265 with 4 at 1,3
3636 Id : 7676, {_}: greatest_lower_bound identity (multiply ?9863 (least_upper_bound identity ?9864)) =<= greatest_lower_bound identity (multiply (greatest_lower_bound identity ?9863) (least_upper_bound identity ?9864)) [9864, 9863] by Super 7645 with 270 at 2,3
3637 Id : 444411, {_}: greatest_lower_bound (inverse (greatest_lower_bound identity (inverse ?378412))) (least_upper_bound identity ?378412) =<= multiply (inverse (greatest_lower_bound identity (inverse ?378412))) (greatest_lower_bound identity (multiply ?378412 (least_upper_bound identity (inverse ?378412)))) [378412] by Demod 443814 with 7676 at 2,3
3638 Id : 2215, {_}: multiply ?3422 (least_upper_bound ?3423 (inverse ?3422)) =>= least_upper_bound (multiply ?3422 ?3423) identity [3423, 3422] by Super 26 with 2142 at 2,3
3639 Id : 2235, {_}: multiply ?3422 (least_upper_bound ?3423 (inverse ?3422)) =>= least_upper_bound identity (multiply ?3422 ?3423) [3423, 3422] by Demod 2215 with 12 at 3
3640 Id : 444412, {_}: greatest_lower_bound (inverse (greatest_lower_bound identity (inverse ?378412))) (least_upper_bound identity ?378412) =<= multiply (inverse (greatest_lower_bound identity (inverse ?378412))) (greatest_lower_bound identity (least_upper_bound identity (multiply ?378412 identity))) [378412] by Demod 444411 with 2235 at 2,2,3
3641 Id : 444413, {_}: greatest_lower_bound (inverse (greatest_lower_bound identity (inverse ?378412))) (least_upper_bound identity ?378412) =>= multiply (inverse (greatest_lower_bound identity (inverse ?378412))) identity [378412] by Demod 444412 with 24 at 2,3
3642 Id : 444414, {_}: greatest_lower_bound (inverse (greatest_lower_bound identity (inverse ?378412))) (least_upper_bound identity ?378412) =>= inverse (greatest_lower_bound identity (inverse ?378412)) [378412] by Demod 444413 with 2129 at 3
3643 Id : 761747, {_}: least_upper_bound (least_upper_bound identity ?693163) (inverse (greatest_lower_bound identity (inverse ?693163))) =>= least_upper_bound identity ?693163 [693163] by Super 128 with 444414 at 2,2
3644 Id : 762288, {_}: least_upper_bound (inverse (greatest_lower_bound identity (inverse ?693163))) (least_upper_bound identity ?693163) =>= least_upper_bound identity ?693163 [693163] by Demod 761747 with 12 at 2
3645 Id : 1150, {_}: least_upper_bound (least_upper_bound ?2078 ?2079) ?2078 =>= least_upper_bound ?2078 ?2079 [2079, 2078] by Super 12 with 100 at 3
3646 Id : 158742, {_}: least_upper_bound (least_upper_bound (least_upper_bound ?149635 ?149636) ?149637) ?149635 =>= least_upper_bound ?149635 (least_upper_bound ?149636 ?149637) [149637, 149636, 149635] by Super 1150 with 16 at 1,2
3647 Id : 375, {_}: least_upper_bound (least_upper_bound ?872 ?873) ?872 =>= least_upper_bound ?872 ?873 [873, 872] by Super 12 with 100 at 3
3648 Id : 1142, {_}: least_upper_bound (least_upper_bound ?2051 ?2052) (least_upper_bound ?2051 ?2053) =>= least_upper_bound (least_upper_bound ?2051 ?2052) ?2053 [2053, 2052, 2051] by Super 16 with 375 at 1,3
3649 Id : 158880, {_}: least_upper_bound (least_upper_bound (least_upper_bound ?150190 ?150191) ?150189) ?150190 =?= least_upper_bound ?150190 (least_upper_bound ?150191 (least_upper_bound ?150190 ?150189)) [150189, 150191, 150190] by Super 158742 with 1142 at 1,2
3650 Id : 1152, {_}: least_upper_bound (least_upper_bound (least_upper_bound ?2086 ?2084) ?2085) ?2086 =>= least_upper_bound ?2086 (least_upper_bound ?2084 ?2085) [2085, 2084, 2086] by Super 1150 with 16 at 1,2
3651 Id : 159604, {_}: least_upper_bound ?150190 (least_upper_bound ?150191 ?150189) =<= least_upper_bound ?150190 (least_upper_bound ?150191 (least_upper_bound ?150190 ?150189)) [150189, 150191, 150190] by Demod 158880 with 1152 at 2
3652 Id : 126, {_}: least_upper_bound ?351 ?349 =<= least_upper_bound (least_upper_bound ?351 ?349) (greatest_lower_bound ?349 ?350) [350, 349, 351] by Super 16 with 22 at 2,2
3653 Id : 135029, {_}: least_upper_bound ?113864 ?113865 =<= least_upper_bound (greatest_lower_bound ?113865 ?113866) (least_upper_bound ?113864 ?113865) [113866, 113865, 113864] by Demod 126 with 12 at 3
3654 Id : 135153, {_}: least_upper_bound ?114345 (least_upper_bound ?114346 ?114344) =<= least_upper_bound ?114346 (least_upper_bound ?114345 (least_upper_bound ?114346 ?114344)) [114344, 114346, 114345] by Super 135029 with 139 at 1,3
3655 Id : 503059, {_}: least_upper_bound ?150190 (least_upper_bound ?150191 ?150189) =?= least_upper_bound ?150191 (least_upper_bound ?150190 ?150189) [150189, 150191, 150190] by Demod 159604 with 135153 at 3
3656 Id : 762289, {_}: least_upper_bound identity (least_upper_bound (inverse (greatest_lower_bound identity (inverse ?693163))) ?693163) =>= least_upper_bound identity ?693163 [693163] by Demod 762288 with 503059 at 2
3657 Id : 2280, {_}: multiply (greatest_lower_bound identity ?3504) (inverse ?3504) =>= greatest_lower_bound identity (inverse ?3504) [3504] by Super 874 with 2156 at 2,1,2
3658 Id : 2286, {_}: multiply (greatest_lower_bound identity ?3514) (inverse (greatest_lower_bound identity ?3514)) =>= greatest_lower_bound identity (inverse (greatest_lower_bound identity ?3514)) [3514] by Super 2280 with 112 at 1,2
3659 Id : 2335, {_}: identity =<= greatest_lower_bound identity (inverse (greatest_lower_bound identity ?3514)) [3514] by Demod 2286 with 2142 at 2
3660 Id : 2422, {_}: least_upper_bound identity (inverse (greatest_lower_bound identity ?3608)) =>= inverse (greatest_lower_bound identity ?3608) [3608] by Super 524 with 2335 at 1,2
3661 Id : 2722, {_}: least_upper_bound identity (least_upper_bound (inverse (greatest_lower_bound identity ?3826)) ?3827) =>= least_upper_bound (inverse (greatest_lower_bound identity ?3826)) ?3827 [3827, 3826] by Super 16 with 2422 at 1,3
3662 Id : 762290, {_}: least_upper_bound (inverse (greatest_lower_bound identity (inverse ?693163))) ?693163 =>= least_upper_bound identity ?693163 [693163] by Demod 762289 with 2722 at 2
3663 Id : 18327, {_}: multiply (inverse ?20394) (least_upper_bound (inverse ?20393) identity) =<= least_upper_bound (inverse (multiply ?20393 ?20394)) (inverse ?20394) [20393, 20394] by Super 9723 with 18209 at 1,3
3664 Id : 2112, {_}: multiply (inverse (inverse ?3265)) (least_upper_bound identity ?3266) =<= least_upper_bound ?3265 (multiply (inverse (inverse ?3265)) ?3266) [3266, 3265] by Super 26 with 2091 at 1,3
3665 Id : 10376, {_}: multiply ?3265 (least_upper_bound identity ?3266) =<= least_upper_bound ?3265 (multiply (inverse (inverse ?3265)) ?3266) [3266, 3265] by Demod 2112 with 2156 at 1,2
3666 Id : 10377, {_}: multiply ?3265 (least_upper_bound identity ?3266) =<= least_upper_bound ?3265 (multiply ?3265 ?3266) [3266, 3265] by Demod 10376 with 2156 at 1,2,3
3667 Id : 10378, {_}: multiply ?3265 (least_upper_bound identity ?3266) =?= multiply ?3265 (least_upper_bound ?3266 identity) [3266, 3265] by Demod 10377 with 9743 at 3
3668 Id : 18347, {_}: multiply (inverse ?20394) (least_upper_bound identity (inverse ?20393)) =<= least_upper_bound (inverse (multiply ?20393 ?20394)) (inverse ?20394) [20393, 20394] by Demod 18327 with 10378 at 2
3669 Id : 2048, {_}: multiply (greatest_lower_bound identity (multiply ?3142 (inverse ?3143))) ?3143 =>= greatest_lower_bound ?3143 (multiply ?3142 identity) [3143, 3142] by Super 270 with 40 at 2,3
3670 Id : 194485, {_}: multiply (greatest_lower_bound identity (multiply ?3142 (inverse ?3143))) ?3143 =>= greatest_lower_bound ?3143 ?3142 [3143, 3142] by Demod 2048 with 2129 at 2,3
3671 Id : 194529, {_}: multiply (inverse ?186266) (least_upper_bound identity (inverse (greatest_lower_bound identity (multiply ?186265 (inverse ?186266))))) =>= least_upper_bound (inverse (greatest_lower_bound ?186266 ?186265)) (inverse ?186266) [186265, 186266] by Super 18347 with 194485 at 1,1,3
3672 Id : 194632, {_}: multiply (inverse ?186266) (inverse (greatest_lower_bound identity (multiply ?186265 (inverse ?186266)))) =>= least_upper_bound (inverse (greatest_lower_bound ?186266 ?186265)) (inverse ?186266) [186265, 186266] by Demod 194529 with 2422 at 2,2
3673 Id : 194633, {_}: inverse (multiply (greatest_lower_bound identity (multiply ?186265 (inverse ?186266))) ?186266) =>= least_upper_bound (inverse (greatest_lower_bound ?186266 ?186265)) (inverse ?186266) [186266, 186265] by Demod 194632 with 18209 at 2
3674 Id : 195668, {_}: inverse (greatest_lower_bound ?187604 ?187605) =<= least_upper_bound (inverse (greatest_lower_bound ?187604 ?187605)) (inverse ?187604) [187605, 187604] by Demod 194633 with 194485 at 1,2
3675 Id : 201008, {_}: inverse (greatest_lower_bound (inverse ?193412) ?193413) =<= least_upper_bound (inverse (greatest_lower_bound (inverse ?193412) ?193413)) ?193412 [193413, 193412] by Super 195668 with 2156 at 2,3
3676 Id : 201035, {_}: inverse (greatest_lower_bound (inverse ?193516) ?193517) =<= least_upper_bound (inverse (greatest_lower_bound ?193517 (inverse ?193516))) ?193516 [193517, 193516] by Super 201008 with 10 at 1,1,3
3677 Id : 762291, {_}: inverse (greatest_lower_bound (inverse ?693163) identity) =>= least_upper_bound identity ?693163 [693163] by Demod 762290 with 201035 at 2
3678 Id : 18116, {_}: multiply ?20080 (inverse (multiply (inverse ?20081) ?20080)) =>= ?20081 [20081, 20080] by Super 2194 with 2238 at 1,2
3679 Id : 20397, {_}: multiply ?22035 (inverse (multiply ?22036 ?22035)) =>= inverse ?22036 [22036, 22035] by Super 18116 with 2156 at 1,1,2,2
3680 Id : 267, {_}: multiply (greatest_lower_bound ?710 (inverse ?711)) ?711 =>= greatest_lower_bound (multiply ?710 ?711) identity [711, 710] by Super 265 with 6 at 2,3
3681 Id : 287, {_}: multiply (greatest_lower_bound ?710 (inverse ?711)) ?711 =>= greatest_lower_bound identity (multiply ?710 ?711) [711, 710] by Demod 267 with 10 at 3
3682 Id : 20404, {_}: multiply ?22056 (inverse (greatest_lower_bound identity (multiply ?22055 ?22056))) =>= inverse (greatest_lower_bound ?22055 (inverse ?22056)) [22055, 22056] by Super 20397 with 287 at 1,2,2
3683 Id : 271, {_}: multiply (greatest_lower_bound (inverse ?727) ?726) ?727 =>= greatest_lower_bound identity (multiply ?726 ?727) [726, 727] by Super 265 with 6 at 1,3
3684 Id : 20403, {_}: multiply ?22053 (inverse (greatest_lower_bound identity (multiply ?22052 ?22053))) =>= inverse (greatest_lower_bound (inverse ?22053) ?22052) [22052, 22053] by Super 20397 with 271 at 1,2,2
3685 Id : 354211, {_}: inverse (greatest_lower_bound (inverse ?22056) ?22055) =?= inverse (greatest_lower_bound ?22055 (inverse ?22056)) [22055, 22056] by Demod 20404 with 20403 at 2
3686 Id : 763705, {_}: inverse (greatest_lower_bound identity (inverse ?694794)) =>= least_upper_bound identity ?694794 [694794] by Demod 762291 with 354211 at 2
3687 Id : 763707, {_}: inverse (greatest_lower_bound identity ?694797) =<= least_upper_bound identity (inverse ?694797) [694797] by Super 763705 with 2156 at 2,1,2
3688 Id : 766509, {_}: multiply (least_upper_bound identity ?11957) (inverse (greatest_lower_bound identity ?11957)) =>= least_upper_bound ?11957 (inverse ?11957) [11957] by Demod 383800 with 763707 at 2,2
3689 Id : 383797, {_}: multiply (least_upper_bound identity (inverse ?12325)) (least_upper_bound identity ?12325) =>= least_upper_bound ?12325 (inverse ?12325) [12325] by Demod 10289 with 382808 at 3
3690 Id : 766508, {_}: multiply (inverse (greatest_lower_bound identity ?12325)) (least_upper_bound identity ?12325) =>= least_upper_bound ?12325 (inverse ?12325) [12325] by Demod 383797 with 763707 at 1,2
3691 Id : 768092, {_}: least_upper_bound a (inverse a) === least_upper_bound a (inverse a) [] by Demod 768091 with 766508 at 3
3692 Id : 768091, {_}: least_upper_bound a (inverse a) =<= multiply (inverse (greatest_lower_bound identity a)) (least_upper_bound identity a) [] by Demod 298 with 766509 at 2
3693 Id : 298, {_}: multiply (least_upper_bound identity a) (inverse (greatest_lower_bound identity a)) =>= multiply (inverse (greatest_lower_bound identity a)) (least_upper_bound identity a) [] by Demod 297 with 12 at 2,3
3694 Id : 297, {_}: multiply (least_upper_bound identity a) (inverse (greatest_lower_bound identity a)) =>= multiply (inverse (greatest_lower_bound identity a)) (least_upper_bound a identity) [] by Demod 296 with 10 at 1,1,3
3695 Id : 296, {_}: multiply (least_upper_bound identity a) (inverse (greatest_lower_bound identity a)) =>= multiply (inverse (greatest_lower_bound a identity)) (least_upper_bound a identity) [] by Demod 295 with 10 at 1,2,2
3696 Id : 295, {_}: multiply (least_upper_bound identity a) (inverse (greatest_lower_bound a identity)) =>= multiply (inverse (greatest_lower_bound a identity)) (least_upper_bound a identity) [] by Demod 2 with 12 at 1,2
3697 Id : 2, {_}: multiply (least_upper_bound a identity) (inverse (greatest_lower_bound a identity)) =>= multiply (inverse (greatest_lower_bound a identity)) (least_upper_bound a identity) [] by prove_p21x
3698 % SZS output end CNFRefutation for GRP184-3.p
3704 associativity_of_glb is 85
3705 associativity_of_lub is 84
3707 glb_absorbtion is 80
3708 greatest_lower_bound is 88
3709 idempotence_of_gld is 82
3710 idempotence_of_lub is 83
3713 least_upper_bound is 94
3716 lub_absorbtion is 81
3726 symmetry_of_glb is 87
3727 symmetry_of_lub is 86
3729 Id : 4, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
3730 Id : 6, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
3732 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
3733 [8, 7, 6] by associativity ?6 ?7 ?8
3735 greatest_lower_bound ?10 ?11 =?= greatest_lower_bound ?11 ?10
3736 [11, 10] by symmetry_of_glb ?10 ?11
3738 least_upper_bound ?13 ?14 =?= least_upper_bound ?14 ?13
3739 [14, 13] by symmetry_of_lub ?13 ?14
3741 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
3743 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
3744 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
3746 least_upper_bound ?20 (least_upper_bound ?21 ?22)
3748 least_upper_bound (least_upper_bound ?20 ?21) ?22
3749 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
3750 Id : 18, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
3752 greatest_lower_bound ?26 ?26 =>= ?26
3753 [26] by idempotence_of_gld ?26
3755 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
3756 [29, 28] by lub_absorbtion ?28 ?29
3758 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
3759 [32, 31] by glb_absorbtion ?31 ?32
3761 multiply ?34 (least_upper_bound ?35 ?36)
3763 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
3764 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
3766 multiply ?38 (greatest_lower_bound ?39 ?40)
3768 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
3769 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
3771 multiply (least_upper_bound ?42 ?43) ?44
3773 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
3774 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
3776 multiply (greatest_lower_bound ?46 ?47) ?48
3778 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
3779 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
3780 Id : 34, {_}: inverse identity =>= identity [] by p22a_1
3781 Id : 36, {_}: inverse (inverse ?51) =>= ?51 [51] by p22a_2 ?51
3783 inverse (multiply ?53 ?54) =<= multiply (inverse ?54) (inverse ?53)
3784 [54, 53] by p22a_3 ?53 ?54
3787 least_upper_bound (least_upper_bound (multiply a b) identity)
3788 (multiply (least_upper_bound a identity)
3789 (least_upper_bound b identity))
3791 multiply (least_upper_bound a identity)
3792 (least_upper_bound b identity)
3794 Last chance: 1246061240.31
3795 Last chance: all is indexed 1246062610.72
3796 Last chance: failed over 100 goal 1246062611.07
3797 FAILURE in 0 iterations
3798 % SZS status Timeout for GRP185-2.p
3804 associativity_of_glb is 85
3805 associativity_of_lub is 84
3807 glb_absorbtion is 80
3808 greatest_lower_bound is 93
3809 idempotence_of_gld is 82
3810 idempotence_of_lub is 83
3813 least_upper_bound is 94
3816 lub_absorbtion is 81
3823 symmetry_of_glb is 87
3824 symmetry_of_lub is 86
3826 Id : 4, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
3827 Id : 6, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
3829 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
3830 [8, 7, 6] by associativity ?6 ?7 ?8
3832 greatest_lower_bound ?10 ?11 =?= greatest_lower_bound ?11 ?10
3833 [11, 10] by symmetry_of_glb ?10 ?11
3835 least_upper_bound ?13 ?14 =?= least_upper_bound ?14 ?13
3836 [14, 13] by symmetry_of_lub ?13 ?14
3838 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
3840 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
3841 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
3843 least_upper_bound ?20 (least_upper_bound ?21 ?22)
3845 least_upper_bound (least_upper_bound ?20 ?21) ?22
3846 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
3847 Id : 18, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
3849 greatest_lower_bound ?26 ?26 =>= ?26
3850 [26] by idempotence_of_gld ?26
3852 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
3853 [29, 28] by lub_absorbtion ?28 ?29
3855 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
3856 [32, 31] by glb_absorbtion ?31 ?32
3858 multiply ?34 (least_upper_bound ?35 ?36)
3860 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
3861 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
3863 multiply ?38 (greatest_lower_bound ?39 ?40)
3865 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
3866 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
3868 multiply (least_upper_bound ?42 ?43) ?44
3870 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
3871 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
3873 multiply (greatest_lower_bound ?46 ?47) ?48
3875 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
3876 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
3879 greatest_lower_bound (least_upper_bound (multiply a b) identity)
3880 (multiply (least_upper_bound a identity)
3881 (least_upper_bound b identity))
3883 least_upper_bound (multiply a b) identity
3885 Last chance: 1246062912.35
3886 Last chance: all is indexed 1246064177.36
3887 Last chance: failed over 100 goal 1246064177.45
3888 FAILURE in 0 iterations
3889 % SZS status Timeout for GRP185-3.p
3895 associativity_of_glb is 85
3896 associativity_of_lub is 84
3898 glb_absorbtion is 80
3899 greatest_lower_bound is 92
3900 idempotence_of_gld is 82
3901 idempotence_of_lub is 83
3904 least_upper_bound is 94
3907 lub_absorbtion is 81
3914 symmetry_of_glb is 87
3915 symmetry_of_lub is 86
3917 Id : 4, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
3918 Id : 6, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
3920 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
3921 [8, 7, 6] by associativity ?6 ?7 ?8
3923 greatest_lower_bound ?10 ?11 =?= greatest_lower_bound ?11 ?10
3924 [11, 10] by symmetry_of_glb ?10 ?11
3926 least_upper_bound ?13 ?14 =?= least_upper_bound ?14 ?13
3927 [14, 13] by symmetry_of_lub ?13 ?14
3929 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
3931 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
3932 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
3934 least_upper_bound ?20 (least_upper_bound ?21 ?22)
3936 least_upper_bound (least_upper_bound ?20 ?21) ?22
3937 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
3938 Id : 18, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
3940 greatest_lower_bound ?26 ?26 =>= ?26
3941 [26] by idempotence_of_gld ?26
3943 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
3944 [29, 28] by lub_absorbtion ?28 ?29
3946 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
3947 [32, 31] by glb_absorbtion ?31 ?32
3949 multiply ?34 (least_upper_bound ?35 ?36)
3951 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
3952 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
3954 multiply ?38 (greatest_lower_bound ?39 ?40)
3956 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
3957 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
3959 multiply (least_upper_bound ?42 ?43) ?44
3961 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
3962 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
3964 multiply (greatest_lower_bound ?46 ?47) ?48
3966 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
3967 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
3970 least_upper_bound (multiply a b) identity
3972 multiply a (inverse (greatest_lower_bound a (inverse b)))
3974 Found proof, 54.277350s
3975 % SZS status Unsatisfiable for GRP186-1.p
3976 % SZS output start CNFRefutation for GRP186-1.p
3977 Id : 18, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
3978 Id : 194, {_}: multiply ?539 (greatest_lower_bound ?540 ?541) =<= greatest_lower_bound (multiply ?539 ?540) (multiply ?539 ?541) [541, 540, 539] by monotony_glb1 ?539 ?540 ?541
3979 Id : 26, {_}: multiply ?34 (least_upper_bound ?35 ?36) =<= least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36) [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
3980 Id : 125, {_}: least_upper_bound ?350 (greatest_lower_bound ?350 ?351) =>= ?350 [351, 350] by lub_absorbtion ?350 ?351
3981 Id : 16, {_}: least_upper_bound ?20 (least_upper_bound ?21 ?22) =?= least_upper_bound (least_upper_bound ?20 ?21) ?22 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
3982 Id : 143, {_}: greatest_lower_bound ?403 (least_upper_bound ?403 ?404) =>= ?403 [404, 403] by glb_absorbtion ?403 ?404
3983 Id : 30, {_}: multiply (least_upper_bound ?42 ?43) ?44 =<= least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44) [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
3984 Id : 20, {_}: greatest_lower_bound ?26 ?26 =>= ?26 [26] by idempotence_of_gld ?26
3985 Id : 14, {_}: greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18) =?= greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
3986 Id : 32, {_}: multiply (greatest_lower_bound ?46 ?47) ?48 =<= greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48) [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
3987 Id : 28, {_}: multiply ?38 (greatest_lower_bound ?39 ?40) =<= greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40) [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
3988 Id : 8, {_}: multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8) [8, 7, 6] by associativity ?6 ?7 ?8
3989 Id : 228, {_}: multiply (least_upper_bound ?618 ?619) ?620 =<= least_upper_bound (multiply ?618 ?620) (multiply ?619 ?620) [620, 619, 618] by monotony_lub2 ?618 ?619 ?620
3990 Id : 4, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
3991 Id : 37, {_}: multiply (multiply ?58 ?59) ?60 =?= multiply ?58 (multiply ?59 ?60) [60, 59, 58] by associativity ?58 ?59 ?60
3992 Id : 24, {_}: greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31 [32, 31] by glb_absorbtion ?31 ?32
3993 Id : 10, {_}: greatest_lower_bound ?10 ?11 =?= greatest_lower_bound ?11 ?10 [11, 10] by symmetry_of_glb ?10 ?11
3994 Id : 22, {_}: least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28 [29, 28] by lub_absorbtion ?28 ?29
3995 Id : 6, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
3996 Id : 163, {_}: multiply ?463 (least_upper_bound ?464 ?465) =<= least_upper_bound (multiply ?463 ?464) (multiply ?463 ?465) [465, 464, 463] by monotony_lub1 ?463 ?464 ?465
3997 Id : 12, {_}: least_upper_bound ?13 ?14 =?= least_upper_bound ?14 ?13 [14, 13] by symmetry_of_lub ?13 ?14
3998 Id : 1397, {_}: multiply (inverse ?2611) (least_upper_bound ?2611 ?2612) =>= least_upper_bound identity (multiply (inverse ?2611) ?2612) [2612, 2611] by Super 163 with 6 at 1,3
3999 Id : 120, {_}: least_upper_bound (greatest_lower_bound ?332 ?333) ?332 =>= ?332 [333, 332] by Super 12 with 22 at 3
4000 Id : 1403, {_}: multiply (inverse (greatest_lower_bound ?2630 ?2629)) ?2630 =<= least_upper_bound identity (multiply (inverse (greatest_lower_bound ?2630 ?2629)) ?2630) [2629, 2630] by Super 1397 with 120 at 2,2
4001 Id : 137, {_}: greatest_lower_bound (least_upper_bound ?382 ?383) ?382 =>= ?382 [383, 382] by Super 10 with 24 at 3
4002 Id : 39, {_}: multiply (multiply ?65 (inverse ?66)) ?66 =>= multiply ?65 identity [66, 65] by Super 37 with 6 at 2,3
4003 Id : 1222, {_}: multiply (multiply ?2303 (inverse ?2304)) ?2304 =>= multiply ?2303 identity [2304, 2303] by Super 37 with 6 at 2,3
4004 Id : 1225, {_}: multiply identity ?2310 =<= multiply (inverse (inverse ?2310)) identity [2310] by Super 1222 with 6 at 1,2
4005 Id : 1240, {_}: ?2310 =<= multiply (inverse (inverse ?2310)) identity [2310] by Demod 1225 with 4 at 2
4006 Id : 38, {_}: multiply (multiply ?62 identity) ?63 =>= multiply ?62 ?63 [63, 62] by Super 37 with 4 at 2,3
4007 Id : 1245, {_}: multiply ?2332 ?2333 =<= multiply (inverse (inverse ?2332)) ?2333 [2333, 2332] by Super 38 with 1240 at 1,2
4008 Id : 1261, {_}: ?2310 =<= multiply ?2310 identity [2310] by Demod 1240 with 1245 at 3
4009 Id : 1262, {_}: multiply (multiply ?65 (inverse ?66)) ?66 =>= ?65 [66, 65] by Demod 39 with 1261 at 3
4010 Id : 234, {_}: multiply (least_upper_bound (inverse ?642) ?641) ?642 =>= least_upper_bound identity (multiply ?641 ?642) [641, 642] by Super 228 with 6 at 1,3
4011 Id : 1630, {_}: multiply (least_upper_bound identity (multiply ?2984 (inverse ?2985))) ?2985 =>= least_upper_bound (inverse (inverse ?2985)) ?2984 [2985, 2984] by Super 1262 with 234 at 1,2
4012 Id : 1277, {_}: inverse (inverse ?2419) =<= multiply ?2419 identity [2419] by Super 1261 with 1245 at 3
4013 Id : 1283, {_}: inverse (inverse ?2419) =>= ?2419 [2419] by Demod 1277 with 1261 at 3
4014 Id : 59624, {_}: multiply (least_upper_bound identity (multiply ?78799 (inverse ?78800))) ?78800 =>= least_upper_bound ?78800 ?78799 [78800, 78799] by Demod 1630 with 1283 at 1,3
4015 Id : 59667, {_}: multiply (multiply (inverse (greatest_lower_bound (inverse ?78935) ?78934)) (inverse ?78935)) ?78935 =>= least_upper_bound ?78935 (inverse (greatest_lower_bound (inverse ?78935) ?78934)) [78934, 78935] by Super 59624 with 1403 at 1,2
4016 Id : 59764, {_}: multiply (inverse (greatest_lower_bound (inverse ?78935) ?78934)) (multiply (inverse ?78935) ?78935) =>= least_upper_bound ?78935 (inverse (greatest_lower_bound (inverse ?78935) ?78934)) [78934, 78935] by Demod 59667 with 8 at 2
4017 Id : 1311, {_}: multiply (multiply ?2436 ?2435) (inverse ?2435) =>= ?2436 [2435, 2436] by Super 1262 with 1283 at 2,1,2
4018 Id : 46, {_}: multiply identity ?93 =<= multiply (inverse ?92) (multiply ?92 ?93) [92, 93] by Super 37 with 6 at 1,2
4019 Id : 55, {_}: ?93 =<= multiply (inverse ?92) (multiply ?92 ?93) [92, 93] by Demod 46 with 4 at 2
4020 Id : 1907, {_}: inverse ?3391 =<= multiply (inverse (multiply ?3390 ?3391)) ?3390 [3390, 3391] by Super 55 with 1311 at 2,3
4021 Id : 2602, {_}: multiply (inverse ?4415) (inverse ?4416) =>= inverse (multiply ?4416 ?4415) [4416, 4415] by Super 1311 with 1907 at 1,2
4022 Id : 2683, {_}: multiply (inverse (multiply ?4589 ?4588)) ?4590 =<= multiply (inverse ?4588) (multiply (inverse ?4589) ?4590) [4590, 4588, 4589] by Super 8 with 2602 at 1,2
4023 Id : 59765, {_}: multiply (inverse (multiply ?78935 (greatest_lower_bound (inverse ?78935) ?78934))) ?78935 =>= least_upper_bound ?78935 (inverse (greatest_lower_bound (inverse ?78935) ?78934)) [78934, 78935] by Demod 59764 with 2683 at 2
4024 Id : 59766, {_}: inverse (greatest_lower_bound (inverse ?78935) ?78934) =<= least_upper_bound ?78935 (inverse (greatest_lower_bound (inverse ?78935) ?78934)) [78934, 78935] by Demod 59765 with 1907 at 2
4025 Id : 75243, {_}: greatest_lower_bound (inverse (greatest_lower_bound (inverse ?90061) ?90062)) ?90061 =>= ?90061 [90062, 90061] by Super 137 with 59766 at 1,2
4026 Id : 75245, {_}: greatest_lower_bound (inverse (greatest_lower_bound ?90066 ?90067)) (inverse ?90066) =>= inverse ?90066 [90067, 90066] by Super 75243 with 1283 at 1,1,1,2
4027 Id : 90405, {_}: multiply (inverse (greatest_lower_bound (inverse (greatest_lower_bound ?103908 ?103909)) (inverse ?103908))) (inverse (greatest_lower_bound ?103908 ?103909)) =>= least_upper_bound identity (multiply (inverse (inverse ?103908)) (inverse (greatest_lower_bound ?103908 ?103909))) [103909, 103908] by Super 1403 with 75245 at 1,1,2,3
4028 Id : 90576, {_}: inverse (multiply (greatest_lower_bound ?103908 ?103909) (greatest_lower_bound (inverse (greatest_lower_bound ?103908 ?103909)) (inverse ?103908))) =>= least_upper_bound identity (multiply (inverse (inverse ?103908)) (inverse (greatest_lower_bound ?103908 ?103909))) [103909, 103908] by Demod 90405 with 2602 at 2
4029 Id : 1272, {_}: multiply ?2401 (inverse ?2401) =>= identity [2401] by Super 6 with 1245 at 2
4030 Id : 1323, {_}: multiply ?2456 (greatest_lower_bound (inverse ?2456) ?2457) =>= greatest_lower_bound identity (multiply ?2456 ?2457) [2457, 2456] by Super 28 with 1272 at 1,3
4031 Id : 90577, {_}: inverse (greatest_lower_bound identity (multiply (greatest_lower_bound ?103908 ?103909) (inverse ?103908))) =<= least_upper_bound identity (multiply (inverse (inverse ?103908)) (inverse (greatest_lower_bound ?103908 ?103909))) [103909, 103908] by Demod 90576 with 1323 at 1,2
4032 Id : 1321, {_}: multiply (greatest_lower_bound ?2450 ?2451) (inverse ?2450) =>= greatest_lower_bound identity (multiply ?2451 (inverse ?2450)) [2451, 2450] by Super 32 with 1272 at 1,3
4033 Id : 90578, {_}: inverse (greatest_lower_bound identity (greatest_lower_bound identity (multiply ?103909 (inverse ?103908)))) =<= least_upper_bound identity (multiply (inverse (inverse ?103908)) (inverse (greatest_lower_bound ?103908 ?103909))) [103908, 103909] by Demod 90577 with 1321 at 2,1,2
4034 Id : 110, {_}: greatest_lower_bound ?310 (greatest_lower_bound ?310 ?311) =>= greatest_lower_bound ?310 ?311 [311, 310] by Super 14 with 20 at 1,3
4035 Id : 90579, {_}: inverse (greatest_lower_bound identity (multiply ?103909 (inverse ?103908))) =<= least_upper_bound identity (multiply (inverse (inverse ?103908)) (inverse (greatest_lower_bound ?103908 ?103909))) [103908, 103909] by Demod 90578 with 110 at 1,2
4036 Id : 90580, {_}: inverse (greatest_lower_bound identity (multiply ?103909 (inverse ?103908))) =<= least_upper_bound identity (inverse (multiply (greatest_lower_bound ?103908 ?103909) (inverse ?103908))) [103908, 103909] by Demod 90579 with 2602 at 2,3
4037 Id : 2693, {_}: multiply (inverse ?4622) (inverse ?4623) =>= inverse (multiply ?4623 ?4622) [4623, 4622] by Super 1311 with 1907 at 1,2
4038 Id : 2697, {_}: multiply ?4632 (inverse ?4633) =<= inverse (multiply ?4633 (inverse ?4632)) [4633, 4632] by Super 2693 with 1283 at 1,2
4039 Id : 90581, {_}: inverse (greatest_lower_bound identity (multiply ?103909 (inverse ?103908))) =<= least_upper_bound identity (multiply ?103908 (inverse (greatest_lower_bound ?103908 ?103909))) [103908, 103909] by Demod 90580 with 2697 at 2,3
4040 Id : 2159, {_}: multiply (least_upper_bound ?3809 ?3810) (inverse ?3809) =>= least_upper_bound identity (multiply ?3810 (inverse ?3809)) [3810, 3809] by Super 30 with 1272 at 1,3
4041 Id : 2167, {_}: multiply ?3833 (inverse (greatest_lower_bound ?3833 ?3832)) =<= least_upper_bound identity (multiply ?3833 (inverse (greatest_lower_bound ?3833 ?3832))) [3832, 3833] by Super 2159 with 120 at 1,2
4042 Id : 241130, {_}: inverse (greatest_lower_bound identity (multiply ?281248 (inverse ?281249))) =?= multiply ?281249 (inverse (greatest_lower_bound ?281249 ?281248)) [281249, 281248] by Demod 90581 with 2167 at 3
4043 Id : 241323, {_}: inverse (greatest_lower_bound identity (inverse (multiply ?281886 ?281885))) =<= multiply ?281886 (inverse (greatest_lower_bound ?281886 (inverse ?281885))) [281885, 281886] by Super 241130 with 2602 at 2,1,2
4044 Id : 1908, {_}: multiply (multiply ?3393 ?3394) (inverse ?3394) =>= ?3393 [3394, 3393] by Super 1262 with 1283 at 2,1,2
4045 Id : 1918, {_}: multiply (least_upper_bound identity (multiply ?3421 ?3422)) (inverse ?3422) =>= least_upper_bound (inverse ?3422) ?3421 [3422, 3421] by Super 1908 with 234 at 1,2
4046 Id : 169, {_}: multiply (inverse ?486) (least_upper_bound ?486 ?487) =>= least_upper_bound identity (multiply (inverse ?486) ?487) [487, 486] by Super 163 with 6 at 1,3
4047 Id : 1396, {_}: least_upper_bound ?2608 ?2609 =<= multiply (inverse (inverse ?2608)) (least_upper_bound identity (multiply (inverse ?2608) ?2609)) [2609, 2608] by Super 55 with 169 at 2,3
4048 Id : 1416, {_}: least_upper_bound ?2608 ?2609 =<= multiply ?2608 (least_upper_bound identity (multiply (inverse ?2608) ?2609)) [2609, 2608] by Demod 1396 with 1283 at 1,3
4049 Id : 512, {_}: least_upper_bound (greatest_lower_bound ?1197 ?1198) ?1197 =>= ?1197 [1198, 1197] by Super 12 with 22 at 3
4050 Id : 513, {_}: least_upper_bound (greatest_lower_bound ?1201 ?1200) ?1200 =>= ?1200 [1200, 1201] by Super 512 with 10 at 1,2
4051 Id : 1407, {_}: multiply (inverse (greatest_lower_bound ?2641 ?2642)) ?2642 =<= least_upper_bound identity (multiply (inverse (greatest_lower_bound ?2641 ?2642)) ?2642) [2642, 2641] by Super 1397 with 513 at 2,2
4052 Id : 144, {_}: greatest_lower_bound ?406 (least_upper_bound ?407 ?406) =>= ?406 [407, 406] by Super 143 with 12 at 2,2
4053 Id : 12520, {_}: multiply (inverse (greatest_lower_bound ?25685 ?25686)) ?25685 =<= least_upper_bound identity (multiply (inverse (greatest_lower_bound ?25685 ?25686)) ?25685) [25686, 25685] by Super 1397 with 120 at 2,2
4054 Id : 12560, {_}: multiply (inverse (greatest_lower_bound identity ?25830)) identity =>= least_upper_bound identity (inverse (greatest_lower_bound identity ?25830)) [25830] by Super 12520 with 1261 at 2,3
4055 Id : 12795, {_}: inverse (greatest_lower_bound identity ?25965) =<= least_upper_bound identity (inverse (greatest_lower_bound identity ?25965)) [25965] by Demod 12560 with 1261 at 2
4056 Id : 12796, {_}: inverse (greatest_lower_bound identity ?25967) =<= least_upper_bound identity (inverse (greatest_lower_bound ?25967 identity)) [25967] by Super 12795 with 10 at 1,2,3
4057 Id : 20061, {_}: least_upper_bound identity (least_upper_bound (inverse (greatest_lower_bound ?34946 identity)) ?34947) =>= least_upper_bound (inverse (greatest_lower_bound identity ?34946)) ?34947 [34947, 34946] by Super 16 with 12796 at 1,3
4058 Id : 20078, {_}: least_upper_bound identity (least_upper_bound ?35005 (inverse (greatest_lower_bound ?35004 identity))) =>= least_upper_bound (inverse (greatest_lower_bound identity ?35004)) ?35005 [35004, 35005] by Super 20061 with 12 at 2,2
4059 Id : 126, {_}: least_upper_bound ?353 (greatest_lower_bound ?354 ?353) =>= ?353 [354, 353] by Super 125 with 10 at 2,2
4060 Id : 547, {_}: least_upper_bound ?1258 ?1256 =<= least_upper_bound (least_upper_bound ?1258 ?1256) (greatest_lower_bound ?1257 ?1256) [1257, 1256, 1258] by Super 16 with 126 at 2,2
4061 Id : 570, {_}: least_upper_bound ?1258 ?1256 =<= least_upper_bound (greatest_lower_bound ?1257 ?1256) (least_upper_bound ?1258 ?1256) [1257, 1256, 1258] by Demod 547 with 12 at 3
4062 Id : 12745, {_}: inverse (greatest_lower_bound identity ?25830) =<= least_upper_bound identity (inverse (greatest_lower_bound identity ?25830)) [25830] by Demod 12560 with 1261 at 2
4063 Id : 12983, {_}: greatest_lower_bound identity (inverse (greatest_lower_bound identity ?26133)) =>= identity [26133] by Super 24 with 12745 at 2,2
4064 Id : 12984, {_}: greatest_lower_bound identity (inverse (greatest_lower_bound ?26135 identity)) =>= identity [26135] by Super 12983 with 10 at 1,2,2
4065 Id : 13334, {_}: least_upper_bound ?26447 (inverse (greatest_lower_bound ?26446 identity)) =<= least_upper_bound identity (least_upper_bound ?26447 (inverse (greatest_lower_bound ?26446 identity))) [26446, 26447] by Super 570 with 12984 at 1,3
4066 Id : 33938, {_}: least_upper_bound ?35005 (inverse (greatest_lower_bound ?35004 identity)) =?= least_upper_bound (inverse (greatest_lower_bound identity ?35004)) ?35005 [35004, 35005] by Demod 20078 with 13334 at 2
4067 Id : 59877, {_}: inverse (greatest_lower_bound (inverse ?79280) identity) =<= least_upper_bound (inverse (greatest_lower_bound identity (inverse ?79280))) ?79280 [79280] by Super 33938 with 59766 at 2
4068 Id : 13166, {_}: inverse (greatest_lower_bound identity ?26300) =<= least_upper_bound identity (inverse (greatest_lower_bound ?26300 identity)) [26300] by Super 12795 with 10 at 1,2,3
4069 Id : 588, {_}: greatest_lower_bound ?1337 ?1335 =<= greatest_lower_bound (greatest_lower_bound ?1337 (least_upper_bound ?1335 ?1336)) ?1335 [1336, 1335, 1337] by Super 14 with 137 at 2,2
4070 Id : 13179, {_}: inverse (greatest_lower_bound identity (greatest_lower_bound ?26330 (least_upper_bound identity ?26331))) =>= least_upper_bound identity (inverse (greatest_lower_bound ?26330 identity)) [26331, 26330] by Super 13166 with 588 at 1,2,3
4071 Id : 13288, {_}: inverse (greatest_lower_bound identity (greatest_lower_bound ?26330 (least_upper_bound identity ?26331))) =>= inverse (greatest_lower_bound identity ?26330) [26331, 26330] by Demod 13179 with 12796 at 3
4072 Id : 508, {_}: least_upper_bound ?1185 ?1183 =<= least_upper_bound (least_upper_bound ?1185 (greatest_lower_bound ?1183 ?1184)) ?1183 [1184, 1183, 1185] by Super 16 with 120 at 2,2
4073 Id : 139, {_}: greatest_lower_bound ?388 (greatest_lower_bound (least_upper_bound ?388 ?389) ?390) =>= greatest_lower_bound ?388 ?390 [390, 389, 388] by Super 14 with 24 at 1,3
4074 Id : 12760, {_}: greatest_lower_bound identity (greatest_lower_bound (inverse (greatest_lower_bound identity ?25876)) ?25877) =>= greatest_lower_bound identity ?25877 [25877, 25876] by Super 139 with 12745 at 1,2,2
4075 Id : 13743, {_}: least_upper_bound ?26971 identity =<= least_upper_bound (least_upper_bound ?26971 (greatest_lower_bound identity ?26970)) identity [26970, 26971] by Super 508 with 12760 at 2,1,3
4076 Id : 13824, {_}: least_upper_bound ?26971 identity =<= least_upper_bound identity (least_upper_bound ?26971 (greatest_lower_bound identity ?26970)) [26970, 26971] by Demod 13743 with 12 at 3
4077 Id : 14000, {_}: greatest_lower_bound ?27303 identity =<= greatest_lower_bound (greatest_lower_bound ?27303 (least_upper_bound ?27301 identity)) identity [27301, 27303] by Super 588 with 13824 at 2,1,3
4078 Id : 15451, {_}: greatest_lower_bound ?29213 identity =<= greatest_lower_bound identity (greatest_lower_bound ?29213 (least_upper_bound ?29214 identity)) [29214, 29213] by Demod 14000 with 10 at 3
4079 Id : 15452, {_}: greatest_lower_bound ?29216 identity =<= greatest_lower_bound identity (greatest_lower_bound ?29216 (least_upper_bound identity ?29217)) [29217, 29216] by Super 15451 with 12 at 2,2,3
4080 Id : 21667, {_}: inverse (greatest_lower_bound ?26330 identity) =?= inverse (greatest_lower_bound identity ?26330) [26330] by Demod 13288 with 15452 at 1,2
4081 Id : 60032, {_}: inverse (greatest_lower_bound identity (inverse ?79280)) =<= least_upper_bound (inverse (greatest_lower_bound identity (inverse ?79280))) ?79280 [79280] by Demod 59877 with 21667 at 2
4082 Id : 61973, {_}: greatest_lower_bound ?80555 (inverse (greatest_lower_bound identity (inverse ?80555))) =>= ?80555 [80555] by Super 144 with 60032 at 2,2
4083 Id : 61975, {_}: greatest_lower_bound (inverse ?80558) (inverse (greatest_lower_bound identity ?80558)) =>= inverse ?80558 [80558] by Super 61973 with 1283 at 2,1,2,2
4084 Id : 64087, {_}: multiply (inverse (greatest_lower_bound (inverse ?81915) (inverse (greatest_lower_bound identity ?81915)))) (inverse (greatest_lower_bound identity ?81915)) =>= least_upper_bound identity (multiply (inverse (inverse ?81915)) (inverse (greatest_lower_bound identity ?81915))) [81915] by Super 1407 with 61975 at 1,1,2,3
4085 Id : 64168, {_}: inverse (multiply (greatest_lower_bound identity ?81915) (greatest_lower_bound (inverse ?81915) (inverse (greatest_lower_bound identity ?81915)))) =>= least_upper_bound identity (multiply (inverse (inverse ?81915)) (inverse (greatest_lower_bound identity ?81915))) [81915] by Demod 64087 with 2602 at 2
4086 Id : 1322, {_}: multiply ?2453 (greatest_lower_bound ?2454 (inverse ?2453)) =>= greatest_lower_bound (multiply ?2453 ?2454) identity [2454, 2453] by Super 28 with 1272 at 2,3
4087 Id : 1343, {_}: multiply ?2453 (greatest_lower_bound ?2454 (inverse ?2453)) =>= greatest_lower_bound identity (multiply ?2453 ?2454) [2454, 2453] by Demod 1322 with 10 at 3
4088 Id : 64169, {_}: inverse (greatest_lower_bound identity (multiply (greatest_lower_bound identity ?81915) (inverse ?81915))) =<= least_upper_bound identity (multiply (inverse (inverse ?81915)) (inverse (greatest_lower_bound identity ?81915))) [81915] by Demod 64168 with 1343 at 1,2
4089 Id : 1320, {_}: multiply (greatest_lower_bound ?2448 ?2447) (inverse ?2447) =>= greatest_lower_bound (multiply ?2448 (inverse ?2447)) identity [2447, 2448] by Super 32 with 1272 at 2,3
4090 Id : 1344, {_}: multiply (greatest_lower_bound ?2448 ?2447) (inverse ?2447) =>= greatest_lower_bound identity (multiply ?2448 (inverse ?2447)) [2447, 2448] by Demod 1320 with 10 at 3
4091 Id : 64170, {_}: inverse (greatest_lower_bound identity (greatest_lower_bound identity (multiply identity (inverse ?81915)))) =<= least_upper_bound identity (multiply (inverse (inverse ?81915)) (inverse (greatest_lower_bound identity ?81915))) [81915] by Demod 64169 with 1344 at 2,1,2
4092 Id : 64171, {_}: inverse (greatest_lower_bound identity (multiply identity (inverse ?81915))) =<= least_upper_bound identity (multiply (inverse (inverse ?81915)) (inverse (greatest_lower_bound identity ?81915))) [81915] by Demod 64170 with 110 at 1,2
4093 Id : 64172, {_}: inverse (greatest_lower_bound identity (inverse ?81915)) =<= least_upper_bound identity (multiply (inverse (inverse ?81915)) (inverse (greatest_lower_bound identity ?81915))) [81915] by Demod 64171 with 4 at 2,1,2
4094 Id : 64173, {_}: inverse (greatest_lower_bound identity (inverse ?81915)) =<= least_upper_bound identity (inverse (multiply (greatest_lower_bound identity ?81915) (inverse ?81915))) [81915] by Demod 64172 with 2602 at 2,3
4095 Id : 64174, {_}: inverse (greatest_lower_bound identity (inverse ?81915)) =<= least_upper_bound identity (multiply ?81915 (inverse (greatest_lower_bound identity ?81915))) [81915] by Demod 64173 with 2697 at 2,3
4096 Id : 1328, {_}: multiply ?2469 (least_upper_bound ?2470 (inverse ?2469)) =>= least_upper_bound (multiply ?2469 ?2470) identity [2470, 2469] by Super 26 with 1272 at 2,3
4097 Id : 1339, {_}: multiply ?2469 (least_upper_bound ?2470 (inverse ?2469)) =>= least_upper_bound identity (multiply ?2469 ?2470) [2470, 2469] by Demod 1328 with 12 at 3
4098 Id : 60418, {_}: multiply ?79661 (inverse (greatest_lower_bound identity (inverse (inverse ?79661)))) =<= least_upper_bound identity (multiply ?79661 (inverse (greatest_lower_bound identity (inverse (inverse ?79661))))) [79661] by Super 1339 with 60032 at 2,2
4099 Id : 60787, {_}: multiply ?79661 (inverse (greatest_lower_bound identity ?79661)) =<= least_upper_bound identity (multiply ?79661 (inverse (greatest_lower_bound identity (inverse (inverse ?79661))))) [79661] by Demod 60418 with 1283 at 2,1,2,2
4100 Id : 60788, {_}: multiply ?79661 (inverse (greatest_lower_bound identity ?79661)) =<= least_upper_bound identity (multiply ?79661 (inverse (greatest_lower_bound identity ?79661))) [79661] by Demod 60787 with 1283 at 2,1,2,2,3
4101 Id : 79553, {_}: inverse (greatest_lower_bound identity (inverse ?81915)) =<= multiply ?81915 (inverse (greatest_lower_bound identity ?81915)) [81915] by Demod 64174 with 60788 at 3
4102 Id : 79566, {_}: multiply (inverse (greatest_lower_bound identity (inverse ?93969))) (greatest_lower_bound identity ?93969) =>= ?93969 [93969] by Super 1262 with 79553 at 1,2
4103 Id : 210019, {_}: least_upper_bound (greatest_lower_bound identity (inverse ?259211)) (greatest_lower_bound identity ?259211) =<= multiply (greatest_lower_bound identity (inverse ?259211)) (least_upper_bound identity ?259211) [259211] by Super 1416 with 79566 at 2,2,3
4104 Id : 210576, {_}: multiply (least_upper_bound identity (least_upper_bound (greatest_lower_bound identity (inverse ?259634)) (greatest_lower_bound identity ?259634))) (inverse (least_upper_bound identity ?259634)) =>= least_upper_bound (inverse (least_upper_bound identity ?259634)) (greatest_lower_bound identity (inverse ?259634)) [259634] by Super 1918 with 210019 at 2,1,2
4105 Id : 122, {_}: least_upper_bound ?338 (least_upper_bound (greatest_lower_bound ?338 ?339) ?340) =>= least_upper_bound ?338 ?340 [340, 339, 338] by Super 16 with 22 at 1,3
4106 Id : 210728, {_}: multiply (least_upper_bound identity (greatest_lower_bound identity ?259634)) (inverse (least_upper_bound identity ?259634)) =>= least_upper_bound (inverse (least_upper_bound identity ?259634)) (greatest_lower_bound identity (inverse ?259634)) [259634] by Demod 210576 with 122 at 1,2
4107 Id : 210729, {_}: multiply identity (inverse (least_upper_bound identity ?259634)) =<= least_upper_bound (inverse (least_upper_bound identity ?259634)) (greatest_lower_bound identity (inverse ?259634)) [259634] by Demod 210728 with 22 at 1,2
4108 Id : 210730, {_}: inverse (least_upper_bound identity ?259634) =<= least_upper_bound (inverse (least_upper_bound identity ?259634)) (greatest_lower_bound identity (inverse ?259634)) [259634] by Demod 210729 with 4 at 2
4109 Id : 210731, {_}: inverse (least_upper_bound identity ?259634) =<= least_upper_bound (greatest_lower_bound identity (inverse ?259634)) (inverse (least_upper_bound identity ?259634)) [259634] by Demod 210730 with 12 at 3
4110 Id : 425033, {_}: greatest_lower_bound (inverse (least_upper_bound identity ?443021)) (greatest_lower_bound identity (inverse ?443021)) =>= greatest_lower_bound identity (inverse ?443021) [443021] by Super 137 with 210731 at 1,2
4111 Id : 425426, {_}: greatest_lower_bound (greatest_lower_bound identity (inverse ?443021)) (inverse (least_upper_bound identity ?443021)) =>= greatest_lower_bound identity (inverse ?443021) [443021] by Demod 425033 with 10 at 2
4112 Id : 425427, {_}: greatest_lower_bound identity (greatest_lower_bound (inverse ?443021) (inverse (least_upper_bound identity ?443021))) =>= greatest_lower_bound identity (inverse ?443021) [443021] by Demod 425426 with 14 at 2
4113 Id : 441, {_}: greatest_lower_bound ?1042 (greatest_lower_bound ?1042 ?1043) =>= greatest_lower_bound ?1042 ?1043 [1043, 1042] by Super 14 with 20 at 1,3
4114 Id : 997, {_}: greatest_lower_bound ?1977 (greatest_lower_bound ?1978 ?1977) =>= greatest_lower_bound ?1977 ?1978 [1978, 1977] by Super 441 with 10 at 2,2
4115 Id : 1008, {_}: greatest_lower_bound ?2012 (greatest_lower_bound ?2010 (greatest_lower_bound ?2011 ?2012)) =>= greatest_lower_bound ?2012 (greatest_lower_bound ?2010 ?2011) [2011, 2010, 2012] by Super 997 with 14 at 2,2
4116 Id : 196, {_}: multiply (inverse ?547) (greatest_lower_bound ?546 ?547) =>= greatest_lower_bound (multiply (inverse ?547) ?546) identity [546, 547] by Super 194 with 6 at 2,3
4117 Id : 215, {_}: multiply (inverse ?547) (greatest_lower_bound ?546 ?547) =>= greatest_lower_bound identity (multiply (inverse ?547) ?546) [546, 547] by Demod 196 with 10 at 3
4118 Id : 145, {_}: greatest_lower_bound ?411 (least_upper_bound (least_upper_bound ?411 ?409) ?410) =>= ?411 [410, 409, 411] by Super 143 with 16 at 2,2
4119 Id : 13972, {_}: greatest_lower_bound identity (least_upper_bound (least_upper_bound ?27209 identity) ?27211) =>= identity [27211, 27209] by Super 145 with 13824 at 1,2,2
4120 Id : 14608, {_}: multiply (inverse (least_upper_bound (least_upper_bound ?27965 identity) ?27966)) identity =<= greatest_lower_bound identity (multiply (inverse (least_upper_bound (least_upper_bound ?27965 identity) ?27966)) identity) [27966, 27965] by Super 215 with 13972 at 2,2
4121 Id : 14746, {_}: inverse (least_upper_bound (least_upper_bound ?27965 identity) ?27966) =<= greatest_lower_bound identity (multiply (inverse (least_upper_bound (least_upper_bound ?27965 identity) ?27966)) identity) [27966, 27965] by Demod 14608 with 1261 at 2
4122 Id : 14747, {_}: inverse (least_upper_bound (least_upper_bound ?27965 identity) ?27966) =<= greatest_lower_bound identity (inverse (least_upper_bound (least_upper_bound ?27965 identity) ?27966)) [27966, 27965] by Demod 14746 with 1261 at 2,3
4123 Id : 14621, {_}: least_upper_bound identity (least_upper_bound (least_upper_bound ?28005 identity) ?28006) =>= least_upper_bound (least_upper_bound ?28005 identity) ?28006 [28006, 28005] by Super 513 with 13972 at 1,2
4124 Id : 371, {_}: least_upper_bound ?890 (least_upper_bound ?890 ?891) =>= least_upper_bound ?890 ?891 [891, 890] by Super 16 with 18 at 1,3
4125 Id : 372, {_}: least_upper_bound ?893 (least_upper_bound ?894 ?893) =>= least_upper_bound ?893 ?894 [894, 893] by Super 371 with 12 at 2,2
4126 Id : 846, {_}: least_upper_bound ?1742 (least_upper_bound (least_upper_bound ?1743 ?1742) ?1744) =>= least_upper_bound (least_upper_bound ?1742 ?1743) ?1744 [1744, 1743, 1742] by Super 16 with 372 at 1,3
4127 Id : 14731, {_}: least_upper_bound (least_upper_bound identity ?28005) ?28006 =?= least_upper_bound (least_upper_bound ?28005 identity) ?28006 [28006, 28005] by Demod 14621 with 846 at 2
4128 Id : 14732, {_}: least_upper_bound identity (least_upper_bound ?28005 ?28006) =<= least_upper_bound (least_upper_bound ?28005 identity) ?28006 [28006, 28005] by Demod 14731 with 16 at 2
4129 Id : 26166, {_}: inverse (least_upper_bound identity (least_upper_bound ?27965 ?27966)) =<= greatest_lower_bound identity (inverse (least_upper_bound (least_upper_bound ?27965 identity) ?27966)) [27966, 27965] by Demod 14747 with 14732 at 1,2
4130 Id : 26240, {_}: inverse (least_upper_bound identity (least_upper_bound ?42502 ?42503)) =<= greatest_lower_bound identity (inverse (least_upper_bound identity (least_upper_bound ?42502 ?42503))) [42503, 42502] by Demod 26166 with 14732 at 1,2,3
4131 Id : 26243, {_}: inverse (least_upper_bound identity (least_upper_bound ?42512 ?42512)) =>= greatest_lower_bound identity (inverse (least_upper_bound identity ?42512)) [42512] by Super 26240 with 18 at 2,1,2,3
4132 Id : 26484, {_}: inverse (least_upper_bound identity ?42512) =<= greatest_lower_bound identity (inverse (least_upper_bound identity ?42512)) [42512] by Demod 26243 with 18 at 2,1,2
4133 Id : 26733, {_}: greatest_lower_bound (inverse (least_upper_bound identity ?42901)) (greatest_lower_bound ?42902 (inverse (least_upper_bound identity ?42901))) =>= greatest_lower_bound (inverse (least_upper_bound identity ?42901)) (greatest_lower_bound ?42902 identity) [42902, 42901] by Super 1008 with 26484 at 2,2,2
4134 Id : 26831, {_}: greatest_lower_bound (greatest_lower_bound ?42902 (inverse (least_upper_bound identity ?42901))) (inverse (least_upper_bound identity ?42901)) =>= greatest_lower_bound (inverse (least_upper_bound identity ?42901)) (greatest_lower_bound ?42902 identity) [42901, 42902] by Demod 26733 with 10 at 2
4135 Id : 112, {_}: greatest_lower_bound ?317 ?316 =<= greatest_lower_bound (greatest_lower_bound ?317 ?316) ?316 [316, 317] by Super 14 with 20 at 2,2
4136 Id : 26832, {_}: greatest_lower_bound ?42902 (inverse (least_upper_bound identity ?42901)) =<= greatest_lower_bound (inverse (least_upper_bound identity ?42901)) (greatest_lower_bound ?42902 identity) [42901, 42902] by Demod 26831 with 112 at 2
4137 Id : 26833, {_}: greatest_lower_bound ?42902 (inverse (least_upper_bound identity ?42901)) =<= greatest_lower_bound (greatest_lower_bound ?42902 identity) (inverse (least_upper_bound identity ?42901)) [42901, 42902] by Demod 26832 with 10 at 3
4138 Id : 594, {_}: greatest_lower_bound (least_upper_bound ?1355 ?1356) ?1355 =>= ?1355 [1356, 1355] by Super 10 with 24 at 3
4139 Id : 595, {_}: greatest_lower_bound (least_upper_bound ?1359 ?1358) ?1358 =>= ?1358 [1358, 1359] by Super 594 with 12 at 1,2
4140 Id : 14013, {_}: least_upper_bound ?27351 identity =<= least_upper_bound identity (least_upper_bound ?27351 (greatest_lower_bound identity ?27352)) [27352, 27351] by Demod 13743 with 12 at 3
4141 Id : 15143, {_}: least_upper_bound ?28845 identity =<= least_upper_bound identity (least_upper_bound ?28845 (greatest_lower_bound ?28846 identity)) [28846, 28845] by Super 14013 with 10 at 2,2,3
4142 Id : 15162, {_}: least_upper_bound (greatest_lower_bound (greatest_lower_bound ?28908 identity) ?28907) identity =>= least_upper_bound identity (greatest_lower_bound ?28908 identity) [28907, 28908] by Super 15143 with 120 at 2,3
4143 Id : 15331, {_}: least_upper_bound identity (greatest_lower_bound (greatest_lower_bound ?28908 identity) ?28907) =>= least_upper_bound identity (greatest_lower_bound ?28908 identity) [28907, 28908] by Demod 15162 with 12 at 2
4144 Id : 15332, {_}: least_upper_bound identity (greatest_lower_bound (greatest_lower_bound ?28908 identity) ?28907) =>= identity [28907, 28908] by Demod 15331 with 126 at 3
4145 Id : 16566, {_}: greatest_lower_bound identity (greatest_lower_bound (greatest_lower_bound ?30606 identity) ?30607) =>= greatest_lower_bound (greatest_lower_bound ?30606 identity) ?30607 [30607, 30606] by Super 595 with 15332 at 1,2
4146 Id : 442, {_}: greatest_lower_bound ?1045 (greatest_lower_bound ?1046 ?1045) =>= greatest_lower_bound ?1045 ?1046 [1046, 1045] by Super 441 with 10 at 2,2
4147 Id : 988, {_}: greatest_lower_bound ?1947 (greatest_lower_bound (greatest_lower_bound ?1948 ?1947) ?1949) =>= greatest_lower_bound (greatest_lower_bound ?1947 ?1948) ?1949 [1949, 1948, 1947] by Super 14 with 442 at 1,3
4148 Id : 16667, {_}: greatest_lower_bound (greatest_lower_bound identity ?30606) ?30607 =?= greatest_lower_bound (greatest_lower_bound ?30606 identity) ?30607 [30607, 30606] by Demod 16566 with 988 at 2
4149 Id : 16668, {_}: greatest_lower_bound identity (greatest_lower_bound ?30606 ?30607) =<= greatest_lower_bound (greatest_lower_bound ?30606 identity) ?30607 [30607, 30606] by Demod 16667 with 14 at 2
4150 Id : 26834, {_}: greatest_lower_bound ?42902 (inverse (least_upper_bound identity ?42901)) =<= greatest_lower_bound identity (greatest_lower_bound ?42902 (inverse (least_upper_bound identity ?42901))) [42901, 42902] by Demod 26833 with 16668 at 3
4151 Id : 425428, {_}: greatest_lower_bound (inverse ?443021) (inverse (least_upper_bound identity ?443021)) =>= greatest_lower_bound identity (inverse ?443021) [443021] by Demod 425427 with 26834 at 2
4152 Id : 100, {_}: least_upper_bound ?291 ?290 =<= least_upper_bound (least_upper_bound ?291 ?290) ?290 [290, 291] by Super 16 with 18 at 2,2
4153 Id : 1412, {_}: multiply (inverse (least_upper_bound ?2659 ?2660)) (least_upper_bound ?2659 ?2660) =>= least_upper_bound identity (multiply (inverse (least_upper_bound ?2659 ?2660)) ?2660) [2660, 2659] by Super 1397 with 100 at 2,2
4154 Id : 1437, {_}: identity =<= least_upper_bound identity (multiply (inverse (least_upper_bound ?2659 ?2660)) ?2660) [2660, 2659] by Demod 1412 with 6 at 2
4155 Id : 59670, {_}: multiply identity ?78944 =<= least_upper_bound ?78944 (inverse (least_upper_bound ?78943 (inverse ?78944))) [78943, 78944] by Super 59624 with 1437 at 1,2
4156 Id : 59771, {_}: ?78944 =<= least_upper_bound ?78944 (inverse (least_upper_bound ?78943 (inverse ?78944))) [78943, 78944] by Demod 59670 with 4 at 2
4157 Id : 89100, {_}: greatest_lower_bound ?102689 (inverse (least_upper_bound ?102690 (inverse ?102689))) =>= inverse (least_upper_bound ?102690 (inverse ?102689)) [102690, 102689] by Super 595 with 59771 at 1,2
4158 Id : 89102, {_}: greatest_lower_bound (inverse ?102694) (inverse (least_upper_bound ?102695 ?102694)) =>= inverse (least_upper_bound ?102695 (inverse (inverse ?102694))) [102695, 102694] by Super 89100 with 1283 at 2,1,2,2
4159 Id : 89528, {_}: greatest_lower_bound (inverse ?102694) (inverse (least_upper_bound ?102695 ?102694)) =>= inverse (least_upper_bound ?102695 ?102694) [102695, 102694] by Demod 89102 with 1283 at 2,1,3
4160 Id : 425429, {_}: inverse (least_upper_bound identity ?443021) =>= greatest_lower_bound identity (inverse ?443021) [443021] by Demod 425428 with 89528 at 2
4161 Id : 426630, {_}: inverse (greatest_lower_bound identity (inverse ?443891)) =>= least_upper_bound identity ?443891 [443891] by Super 1283 with 425429 at 1,2
4162 Id : 428479, {_}: least_upper_bound identity (multiply a b) === least_upper_bound identity (multiply a b) [] by Demod 243250 with 426630 at 3
4163 Id : 243250, {_}: least_upper_bound identity (multiply a b) =<= inverse (greatest_lower_bound identity (inverse (multiply a b))) [] by Demod 289 with 241323 at 3
4164 Id : 289, {_}: least_upper_bound identity (multiply a b) =<= multiply a (inverse (greatest_lower_bound a (inverse b))) [] by Demod 2 with 12 at 2
4165 Id : 2, {_}: least_upper_bound (multiply a b) identity =<= multiply a (inverse (greatest_lower_bound a (inverse b))) [] by prove_p23
4166 % SZS output end CNFRefutation for GRP186-1.p
4172 associativity_of_glb is 85
4173 associativity_of_lub is 84
4175 glb_absorbtion is 80
4176 greatest_lower_bound is 92
4177 idempotence_of_gld is 82
4178 idempotence_of_lub is 83
4181 least_upper_bound is 94
4184 lub_absorbtion is 81
4194 symmetry_of_glb is 87
4195 symmetry_of_lub is 86
4197 Id : 4, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
4198 Id : 6, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
4200 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
4201 [8, 7, 6] by associativity ?6 ?7 ?8
4203 greatest_lower_bound ?10 ?11 =?= greatest_lower_bound ?11 ?10
4204 [11, 10] by symmetry_of_glb ?10 ?11
4206 least_upper_bound ?13 ?14 =?= least_upper_bound ?14 ?13
4207 [14, 13] by symmetry_of_lub ?13 ?14
4209 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
4211 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
4212 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
4214 least_upper_bound ?20 (least_upper_bound ?21 ?22)
4216 least_upper_bound (least_upper_bound ?20 ?21) ?22
4217 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
4218 Id : 18, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
4220 greatest_lower_bound ?26 ?26 =>= ?26
4221 [26] by idempotence_of_gld ?26
4223 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
4224 [29, 28] by lub_absorbtion ?28 ?29
4226 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
4227 [32, 31] by glb_absorbtion ?31 ?32
4229 multiply ?34 (least_upper_bound ?35 ?36)
4231 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
4232 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
4234 multiply ?38 (greatest_lower_bound ?39 ?40)
4236 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
4237 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
4239 multiply (least_upper_bound ?42 ?43) ?44
4241 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
4242 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
4244 multiply (greatest_lower_bound ?46 ?47) ?48
4246 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
4247 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
4248 Id : 34, {_}: inverse identity =>= identity [] by p23_1
4249 Id : 36, {_}: inverse (inverse ?51) =>= ?51 [51] by p23_2 ?51
4251 inverse (multiply ?53 ?54) =<= multiply (inverse ?54) (inverse ?53)
4252 [54, 53] by p23_3 ?53 ?54
4255 least_upper_bound (multiply a b) identity
4257 multiply a (inverse (greatest_lower_bound a (inverse b)))
4259 Found proof, 98.278709s
4260 % SZS status Unsatisfiable for GRP186-2.p
4261 % SZS output start CNFRefutation for GRP186-2.p
4262 Id : 131, {_}: least_upper_bound ?356 (greatest_lower_bound ?356 ?357) =>= ?356 [357, 356] by lub_absorbtion ?356 ?357
4263 Id : 18, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
4264 Id : 26, {_}: multiply ?34 (least_upper_bound ?35 ?36) =<= least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36) [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
4265 Id : 16, {_}: least_upper_bound ?20 (least_upper_bound ?21 ?22) =?= least_upper_bound (least_upper_bound ?20 ?21) ?22 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
4266 Id : 30, {_}: multiply (least_upper_bound ?42 ?43) ?44 =<= least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44) [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
4267 Id : 20, {_}: greatest_lower_bound ?26 ?26 =>= ?26 [26] by idempotence_of_gld ?26
4268 Id : 14, {_}: greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18) =?= greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
4269 Id : 32, {_}: multiply (greatest_lower_bound ?46 ?47) ?48 =<= greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48) [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
4270 Id : 28, {_}: multiply ?38 (greatest_lower_bound ?39 ?40) =<= greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40) [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
4271 Id : 38, {_}: inverse (multiply ?53 ?54) =<= multiply (inverse ?54) (inverse ?53) [54, 53] by p23_3 ?53 ?54
4272 Id : 8, {_}: multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8) [8, 7, 6] by associativity ?6 ?7 ?8
4273 Id : 234, {_}: multiply (least_upper_bound ?624 ?625) ?626 =<= least_upper_bound (multiply ?624 ?626) (multiply ?625 ?626) [626, 625, 624] by monotony_lub2 ?624 ?625 ?626
4274 Id : 36, {_}: inverse (inverse ?51) =>= ?51 [51] by p23_2 ?51
4275 Id : 4, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
4276 Id : 34, {_}: inverse identity =>= identity [] by p23_1
4277 Id : 316, {_}: inverse (multiply ?814 ?815) =<= multiply (inverse ?815) (inverse ?814) [815, 814] by p23_3 ?814 ?815
4278 Id : 43, {_}: multiply (multiply ?64 ?65) ?66 =?= multiply ?64 (multiply ?65 ?66) [66, 65, 64] by associativity ?64 ?65 ?66
4279 Id : 24, {_}: greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31 [32, 31] by glb_absorbtion ?31 ?32
4280 Id : 10, {_}: greatest_lower_bound ?10 ?11 =?= greatest_lower_bound ?11 ?10 [11, 10] by symmetry_of_glb ?10 ?11
4281 Id : 22, {_}: least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28 [29, 28] by lub_absorbtion ?28 ?29
4282 Id : 6, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
4283 Id : 169, {_}: multiply ?469 (least_upper_bound ?470 ?471) =<= least_upper_bound (multiply ?469 ?470) (multiply ?469 ?471) [471, 470, 469] by monotony_lub1 ?469 ?470 ?471
4284 Id : 12, {_}: least_upper_bound ?13 ?14 =?= least_upper_bound ?14 ?13 [14, 13] by symmetry_of_lub ?13 ?14
4285 Id : 1363, {_}: multiply (inverse ?2558) (least_upper_bound ?2558 ?2559) =>= least_upper_bound identity (multiply (inverse ?2558) ?2559) [2559, 2558] by Super 169 with 6 at 1,3
4286 Id : 650, {_}: least_upper_bound (greatest_lower_bound ?1395 ?1396) ?1395 =>= ?1395 [1396, 1395] by Super 12 with 22 at 3
4287 Id : 651, {_}: least_upper_bound (greatest_lower_bound ?1399 ?1398) ?1398 =>= ?1398 [1398, 1399] by Super 650 with 10 at 1,2
4288 Id : 1373, {_}: multiply (inverse (greatest_lower_bound ?2588 ?2589)) ?2589 =<= least_upper_bound identity (multiply (inverse (greatest_lower_bound ?2588 ?2589)) ?2589) [2589, 2588] by Super 1363 with 651 at 2,2
4289 Id : 45, {_}: multiply (multiply ?71 (inverse ?72)) ?72 =>= multiply ?71 identity [72, 71] by Super 43 with 6 at 2,3
4290 Id : 317, {_}: inverse (multiply identity ?817) =<= multiply (inverse ?817) identity [817] by Super 316 with 34 at 2,3
4291 Id : 341, {_}: inverse ?863 =<= multiply (inverse ?863) identity [863] by Demod 317 with 4 at 1,2
4292 Id : 343, {_}: inverse (inverse ?866) =<= multiply ?866 identity [866] by Super 341 with 36 at 1,3
4293 Id : 354, {_}: ?866 =<= multiply ?866 identity [866] by Demod 343 with 36 at 2
4294 Id : 1260, {_}: multiply (multiply ?71 (inverse ?72)) ?72 =>= ?71 [72, 71] by Demod 45 with 354 at 3
4295 Id : 240, {_}: multiply (least_upper_bound (inverse ?648) ?647) ?648 =>= least_upper_bound identity (multiply ?647 ?648) [647, 648] by Super 234 with 6 at 1,3
4296 Id : 1623, {_}: multiply (least_upper_bound identity (multiply ?2972 (inverse ?2973))) ?2973 =>= least_upper_bound (inverse (inverse ?2973)) ?2972 [2973, 2972] by Super 1260 with 240 at 1,2
4297 Id : 139882, {_}: multiply (least_upper_bound identity (multiply ?153893 (inverse ?153894))) ?153894 =>= least_upper_bound ?153894 ?153893 [153894, 153893] by Demod 1623 with 36 at 1,3
4298 Id : 126, {_}: least_upper_bound (greatest_lower_bound ?338 ?339) ?338 =>= ?338 [339, 338] by Super 12 with 22 at 3
4299 Id : 1369, {_}: multiply (inverse (greatest_lower_bound ?2577 ?2576)) ?2577 =<= least_upper_bound identity (multiply (inverse (greatest_lower_bound ?2577 ?2576)) ?2577) [2576, 2577] by Super 1363 with 126 at 2,2
4300 Id : 139933, {_}: multiply (multiply (inverse (greatest_lower_bound (inverse ?154061) ?154060)) (inverse ?154061)) ?154061 =>= least_upper_bound ?154061 (inverse (greatest_lower_bound (inverse ?154061) ?154060)) [154060, 154061] by Super 139882 with 1369 at 1,2
4301 Id : 140037, {_}: multiply (inverse (greatest_lower_bound (inverse ?154061) ?154060)) (multiply (inverse ?154061) ?154061) =>= least_upper_bound ?154061 (inverse (greatest_lower_bound (inverse ?154061) ?154060)) [154060, 154061] by Demod 139933 with 8 at 2
4302 Id : 311, {_}: multiply (inverse (multiply ?794 ?795)) ?796 =<= multiply (inverse ?795) (multiply (inverse ?794) ?796) [796, 795, 794] by Super 8 with 38 at 1,2
4303 Id : 140038, {_}: multiply (inverse (multiply ?154061 (greatest_lower_bound (inverse ?154061) ?154060))) ?154061 =>= least_upper_bound ?154061 (inverse (greatest_lower_bound (inverse ?154061) ?154060)) [154060, 154061] by Demod 140037 with 311 at 2
4304 Id : 1275, {_}: multiply (multiply ?2378 (inverse ?2379)) ?2379 =>= ?2378 [2379, 2378] by Demod 45 with 354 at 3
4305 Id : 1285, {_}: multiply (inverse (multiply ?2408 ?2407)) ?2408 =>= inverse ?2407 [2407, 2408] by Super 1275 with 38 at 1,2
4306 Id : 140039, {_}: inverse (greatest_lower_bound (inverse ?154061) ?154060) =<= least_upper_bound ?154061 (inverse (greatest_lower_bound (inverse ?154061) ?154060)) [154060, 154061] by Demod 140038 with 1285 at 2
4307 Id : 160759, {_}: greatest_lower_bound ?168171 (inverse (greatest_lower_bound (inverse ?168171) ?168172)) =>= ?168171 [168172, 168171] by Super 24 with 140039 at 2,2
4308 Id : 160761, {_}: greatest_lower_bound (inverse ?168176) (inverse (greatest_lower_bound ?168176 ?168177)) =>= inverse ?168176 [168177, 168176] by Super 160759 with 36 at 1,1,2,2
4309 Id : 178590, {_}: multiply (inverse (greatest_lower_bound (inverse ?184996) (inverse (greatest_lower_bound ?184996 ?184997)))) (inverse (greatest_lower_bound ?184996 ?184997)) =>= least_upper_bound identity (multiply (inverse (inverse ?184996)) (inverse (greatest_lower_bound ?184996 ?184997))) [184997, 184996] by Super 1373 with 160761 at 1,1,2,3
4310 Id : 178788, {_}: inverse (multiply (greatest_lower_bound ?184996 ?184997) (greatest_lower_bound (inverse ?184996) (inverse (greatest_lower_bound ?184996 ?184997)))) =>= least_upper_bound identity (multiply (inverse (inverse ?184996)) (inverse (greatest_lower_bound ?184996 ?184997))) [184997, 184996] by Demod 178590 with 38 at 2
4311 Id : 299, {_}: multiply ?763 (inverse ?763) =>= identity [763] by Super 6 with 36 at 1,2
4312 Id : 392, {_}: multiply ?921 (greatest_lower_bound ?922 (inverse ?921)) =>= greatest_lower_bound (multiply ?921 ?922) identity [922, 921] by Super 28 with 299 at 2,3
4313 Id : 417, {_}: multiply ?921 (greatest_lower_bound ?922 (inverse ?921)) =>= greatest_lower_bound identity (multiply ?921 ?922) [922, 921] by Demod 392 with 10 at 3
4314 Id : 178789, {_}: inverse (greatest_lower_bound identity (multiply (greatest_lower_bound ?184996 ?184997) (inverse ?184996))) =<= least_upper_bound identity (multiply (inverse (inverse ?184996)) (inverse (greatest_lower_bound ?184996 ?184997))) [184997, 184996] by Demod 178788 with 417 at 1,2
4315 Id : 391, {_}: multiply (greatest_lower_bound ?918 ?919) (inverse ?918) =>= greatest_lower_bound identity (multiply ?919 (inverse ?918)) [919, 918] by Super 32 with 299 at 1,3
4316 Id : 178790, {_}: inverse (greatest_lower_bound identity (greatest_lower_bound identity (multiply ?184997 (inverse ?184996)))) =<= least_upper_bound identity (multiply (inverse (inverse ?184996)) (inverse (greatest_lower_bound ?184996 ?184997))) [184996, 184997] by Demod 178789 with 391 at 2,1,2
4317 Id : 116, {_}: greatest_lower_bound ?316 (greatest_lower_bound ?316 ?317) =>= greatest_lower_bound ?316 ?317 [317, 316] by Super 14 with 20 at 1,3
4318 Id : 178791, {_}: inverse (greatest_lower_bound identity (multiply ?184997 (inverse ?184996))) =<= least_upper_bound identity (multiply (inverse (inverse ?184996)) (inverse (greatest_lower_bound ?184996 ?184997))) [184996, 184997] by Demod 178790 with 116 at 1,2
4319 Id : 178792, {_}: inverse (greatest_lower_bound identity (multiply ?184997 (inverse ?184996))) =<= least_upper_bound identity (inverse (multiply (greatest_lower_bound ?184996 ?184997) (inverse ?184996))) [184996, 184997] by Demod 178791 with 38 at 2,3
4320 Id : 320, {_}: inverse (multiply ?825 (inverse ?824)) =>= multiply ?824 (inverse ?825) [824, 825] by Super 316 with 36 at 1,3
4321 Id : 178793, {_}: inverse (greatest_lower_bound identity (multiply ?184997 (inverse ?184996))) =<= least_upper_bound identity (multiply ?184996 (inverse (greatest_lower_bound ?184996 ?184997))) [184996, 184997] by Demod 178792 with 320 at 2,3
4322 Id : 2114, {_}: multiply (least_upper_bound ?3753 ?3754) (inverse ?3753) =>= least_upper_bound identity (multiply ?3754 (inverse ?3753)) [3754, 3753] by Super 30 with 299 at 1,3
4323 Id : 2124, {_}: multiply ?3785 (inverse (greatest_lower_bound ?3785 ?3784)) =<= least_upper_bound identity (multiply ?3785 (inverse (greatest_lower_bound ?3785 ?3784))) [3784, 3785] by Super 2114 with 126 at 1,2
4324 Id : 517036, {_}: inverse (greatest_lower_bound identity (multiply ?520378 (inverse ?520379))) =?= multiply ?520379 (inverse (greatest_lower_bound ?520379 ?520378)) [520379, 520378] by Demod 178793 with 2124 at 3
4325 Id : 517346, {_}: inverse (greatest_lower_bound identity (inverse (multiply ?521360 ?521359))) =<= multiply ?521360 (inverse (greatest_lower_bound ?521360 (inverse ?521359))) [521359, 521360] by Super 517036 with 38 at 2,1,2
4326 Id : 143, {_}: greatest_lower_bound (least_upper_bound ?388 ?389) ?388 =>= ?388 [389, 388] by Super 10 with 24 at 3
4327 Id : 394, {_}: multiply (multiply ?928 ?927) (inverse ?927) =>= multiply ?928 identity [927, 928] by Super 8 with 299 at 2,3
4328 Id : 2350, {_}: multiply (multiply ?4107 ?4108) (inverse ?4108) =>= ?4107 [4108, 4107] by Demod 394 with 354 at 3
4329 Id : 2362, {_}: multiply (least_upper_bound identity (multiply ?4143 ?4144)) (inverse ?4144) =>= least_upper_bound (inverse ?4144) ?4143 [4144, 4143] by Super 2350 with 240 at 1,2
4330 Id : 52, {_}: multiply identity ?99 =<= multiply (inverse ?98) (multiply ?98 ?99) [98, 99] by Super 43 with 6 at 1,2
4331 Id : 61, {_}: ?99 =<= multiply (inverse ?98) (multiply ?98 ?99) [98, 99] by Demod 52 with 4 at 2
4332 Id : 175, {_}: multiply (inverse ?492) (least_upper_bound ?492 ?493) =>= least_upper_bound identity (multiply (inverse ?492) ?493) [493, 492] by Super 169 with 6 at 1,3
4333 Id : 1362, {_}: least_upper_bound ?2555 ?2556 =<= multiply (inverse (inverse ?2555)) (least_upper_bound identity (multiply (inverse ?2555) ?2556)) [2556, 2555] by Super 61 with 175 at 2,3
4334 Id : 1384, {_}: least_upper_bound ?2555 ?2556 =<= multiply ?2555 (least_upper_bound identity (multiply (inverse ?2555) ?2556)) [2556, 2555] by Demod 1362 with 36 at 1,3
4335 Id : 327, {_}: inverse ?817 =<= multiply (inverse ?817) identity [817] by Demod 317 with 4 at 1,2
4336 Id : 338, {_}: multiply (inverse ?854) (least_upper_bound identity ?855) =<= least_upper_bound (inverse ?854) (multiply (inverse ?854) ?855) [855, 854] by Super 26 with 327 at 1,3
4337 Id : 332, {_}: multiply (inverse ?838) (greatest_lower_bound ?839 identity) =<= greatest_lower_bound (multiply (inverse ?838) ?839) (inverse ?838) [839, 838] by Super 28 with 327 at 2,3
4338 Id : 350, {_}: multiply (inverse ?838) (greatest_lower_bound ?839 identity) =<= greatest_lower_bound (inverse ?838) (multiply (inverse ?838) ?839) [839, 838] by Demod 332 with 10 at 3
4339 Id : 333, {_}: multiply (inverse ?841) (greatest_lower_bound identity ?842) =<= greatest_lower_bound (inverse ?841) (multiply (inverse ?841) ?842) [842, 841] by Super 28 with 327 at 1,3
4340 Id : 3646, {_}: multiply (inverse ?838) (greatest_lower_bound ?839 identity) =?= multiply (inverse ?838) (greatest_lower_bound identity ?839) [839, 838] by Demod 350 with 333 at 3
4341 Id : 3670, {_}: multiply (inverse (greatest_lower_bound ?5927 identity)) (greatest_lower_bound identity ?5927) =>= identity [5927] by Super 6 with 3646 at 2
4342 Id : 5362, {_}: multiply (inverse (greatest_lower_bound ?8279 identity)) (least_upper_bound identity (greatest_lower_bound identity ?8279)) =>= least_upper_bound (inverse (greatest_lower_bound ?8279 identity)) identity [8279] by Super 338 with 3670 at 2,3
4343 Id : 5430, {_}: multiply (inverse (greatest_lower_bound ?8279 identity)) identity =>= least_upper_bound (inverse (greatest_lower_bound ?8279 identity)) identity [8279] by Demod 5362 with 22 at 2,2
4344 Id : 5431, {_}: inverse (greatest_lower_bound ?8279 identity) =<= least_upper_bound (inverse (greatest_lower_bound ?8279 identity)) identity [8279] by Demod 5430 with 354 at 2
4345 Id : 5432, {_}: inverse (greatest_lower_bound ?8279 identity) =<= least_upper_bound identity (inverse (greatest_lower_bound ?8279 identity)) [8279] by Demod 5431 with 12 at 3
4346 Id : 5579, {_}: least_upper_bound ?8466 (inverse (greatest_lower_bound ?8465 identity)) =<= least_upper_bound (least_upper_bound ?8466 identity) (inverse (greatest_lower_bound ?8465 identity)) [8465, 8466] by Super 16 with 5432 at 2,2
4347 Id : 5622, {_}: least_upper_bound ?8466 (inverse (greatest_lower_bound ?8465 identity)) =<= least_upper_bound (inverse (greatest_lower_bound ?8465 identity)) (least_upper_bound ?8466 identity) [8465, 8466] by Demod 5579 with 12 at 3
4348 Id : 400, {_}: multiply (least_upper_bound ?944 ?943) (inverse ?943) =>= least_upper_bound (multiply ?944 (inverse ?943)) identity [943, 944] by Super 30 with 299 at 2,3
4349 Id : 412, {_}: multiply (least_upper_bound ?944 ?943) (inverse ?943) =>= least_upper_bound identity (multiply ?944 (inverse ?943)) [943, 944] by Demod 400 with 12 at 3
4350 Id : 337, {_}: multiply (inverse ?851) (least_upper_bound ?852 identity) =<= least_upper_bound (multiply (inverse ?851) ?852) (inverse ?851) [852, 851] by Super 26 with 327 at 2,3
4351 Id : 347, {_}: multiply (inverse ?851) (least_upper_bound ?852 identity) =<= least_upper_bound (inverse ?851) (multiply (inverse ?851) ?852) [852, 851] by Demod 337 with 12 at 3
4352 Id : 3431, {_}: multiply (inverse ?851) (least_upper_bound ?852 identity) =?= multiply (inverse ?851) (least_upper_bound identity ?852) [852, 851] by Demod 347 with 338 at 3
4353 Id : 3454, {_}: multiply (inverse (least_upper_bound ?5686 identity)) (least_upper_bound identity ?5686) =>= identity [5686] by Super 6 with 3431 at 2
4354 Id : 4555, {_}: multiply (inverse (least_upper_bound ?7520 identity)) (least_upper_bound identity (least_upper_bound identity ?7520)) =>= least_upper_bound (inverse (least_upper_bound ?7520 identity)) identity [7520] by Super 338 with 3454 at 2,3
4355 Id : 104, {_}: least_upper_bound ?290 (least_upper_bound ?290 ?291) =>= least_upper_bound ?290 ?291 [291, 290] by Super 16 with 18 at 1,3
4356 Id : 4621, {_}: multiply (inverse (least_upper_bound ?7520 identity)) (least_upper_bound identity ?7520) =>= least_upper_bound (inverse (least_upper_bound ?7520 identity)) identity [7520] by Demod 4555 with 104 at 2,2
4357 Id : 4622, {_}: identity =<= least_upper_bound (inverse (least_upper_bound ?7520 identity)) identity [7520] by Demod 4621 with 3454 at 2
4358 Id : 4773, {_}: identity =<= least_upper_bound identity (inverse (least_upper_bound ?7713 identity)) [7713] by Demod 4622 with 12 at 3
4359 Id : 4780, {_}: identity =<= least_upper_bound identity (inverse (least_upper_bound ?7726 (least_upper_bound ?7727 identity))) [7727, 7726] by Super 4773 with 16 at 1,2,3
4360 Id : 6791, {_}: multiply identity (inverse (inverse (least_upper_bound ?9674 (least_upper_bound ?9675 identity)))) =<= least_upper_bound identity (multiply identity (inverse (inverse (least_upper_bound ?9674 (least_upper_bound ?9675 identity))))) [9675, 9674] by Super 412 with 4780 at 1,2
4361 Id : 6824, {_}: inverse (inverse (least_upper_bound ?9674 (least_upper_bound ?9675 identity))) =<= least_upper_bound identity (multiply identity (inverse (inverse (least_upper_bound ?9674 (least_upper_bound ?9675 identity))))) [9675, 9674] by Demod 6791 with 4 at 2
4362 Id : 6825, {_}: least_upper_bound ?9674 (least_upper_bound ?9675 identity) =<= least_upper_bound identity (multiply identity (inverse (inverse (least_upper_bound ?9674 (least_upper_bound ?9675 identity))))) [9675, 9674] by Demod 6824 with 36 at 2
4363 Id : 6826, {_}: least_upper_bound ?9674 (least_upper_bound ?9675 identity) =<= least_upper_bound identity (inverse (inverse (least_upper_bound ?9674 (least_upper_bound ?9675 identity)))) [9675, 9674] by Demod 6825 with 4 at 2,3
4364 Id : 6913, {_}: least_upper_bound ?9827 (least_upper_bound ?9828 identity) =<= least_upper_bound identity (least_upper_bound ?9827 (least_upper_bound ?9828 identity)) [9828, 9827] by Demod 6826 with 36 at 2,3
4365 Id : 6922, {_}: least_upper_bound ?9854 (least_upper_bound ?9855 identity) =<= least_upper_bound identity (least_upper_bound (least_upper_bound ?9855 identity) ?9854) [9855, 9854] by Super 6913 with 12 at 2,3
4366 Id : 502, {_}: least_upper_bound (least_upper_bound ?1064 ?1065) ?1064 =>= least_upper_bound ?1064 ?1065 [1065, 1064] by Super 12 with 104 at 3
4367 Id : 6917, {_}: least_upper_bound ?9839 (least_upper_bound (least_upper_bound identity ?9838) identity) =?= least_upper_bound identity (least_upper_bound ?9839 (least_upper_bound identity ?9838)) [9838, 9839] by Super 6913 with 502 at 2,2,3
4368 Id : 6992, {_}: least_upper_bound ?9839 (least_upper_bound identity (least_upper_bound identity ?9838)) =?= least_upper_bound identity (least_upper_bound ?9839 (least_upper_bound identity ?9838)) [9838, 9839] by Demod 6917 with 12 at 2,2
4369 Id : 6993, {_}: least_upper_bound ?9839 (least_upper_bound identity ?9838) =<= least_upper_bound identity (least_upper_bound ?9839 (least_upper_bound identity ?9838)) [9838, 9839] by Demod 6992 with 104 at 2,2
4370 Id : 6914, {_}: least_upper_bound ?9830 (least_upper_bound ?9831 identity) =<= least_upper_bound identity (least_upper_bound ?9830 (least_upper_bound identity ?9831)) [9831, 9830] by Super 6913 with 12 at 2,2,3
4371 Id : 7479, {_}: least_upper_bound ?9839 (least_upper_bound identity ?9838) =?= least_upper_bound ?9839 (least_upper_bound ?9838 identity) [9838, 9839] by Demod 6993 with 6914 at 3
4372 Id : 7163, {_}: least_upper_bound ?10110 (least_upper_bound ?10111 identity) =<= least_upper_bound identity (least_upper_bound ?10110 (least_upper_bound identity ?10111)) [10111, 10110] by Super 6913 with 12 at 2,2,3
4373 Id : 7180, {_}: least_upper_bound ?10164 (least_upper_bound ?10165 identity) =<= least_upper_bound identity (least_upper_bound (least_upper_bound ?10164 identity) ?10165) [10165, 10164] by Super 7163 with 16 at 2,3
4374 Id : 8147, {_}: least_upper_bound ?11328 (least_upper_bound ?11329 identity) =?= least_upper_bound ?11329 (least_upper_bound ?11328 identity) [11329, 11328] by Demod 7180 with 6922 at 3
4375 Id : 8150, {_}: least_upper_bound (greatest_lower_bound identity ?11336) (least_upper_bound ?11337 identity) =>= least_upper_bound ?11337 identity [11337, 11336] by Super 8147 with 126 at 2,3
4376 Id : 8900, {_}: least_upper_bound (greatest_lower_bound identity ?11839) (least_upper_bound identity ?11840) =>= least_upper_bound ?11840 identity [11840, 11839] by Super 7479 with 8150 at 3
4377 Id : 10250, {_}: least_upper_bound (greatest_lower_bound identity ?13083) (least_upper_bound (least_upper_bound identity ?13084) ?13085) =>= least_upper_bound (least_upper_bound ?13084 identity) ?13085 [13085, 13084, 13083] by Super 16 with 8900 at 1,3
4378 Id : 10334, {_}: least_upper_bound (greatest_lower_bound identity ?13083) (least_upper_bound identity (least_upper_bound ?13084 ?13085)) =>= least_upper_bound (least_upper_bound ?13084 identity) ?13085 [13085, 13084, 13083] by Demod 10250 with 16 at 2,2
4379 Id : 10335, {_}: least_upper_bound (least_upper_bound ?13084 ?13085) identity =?= least_upper_bound (least_upper_bound ?13084 identity) ?13085 [13085, 13084] by Demod 10334 with 8900 at 2
4380 Id : 10336, {_}: least_upper_bound identity (least_upper_bound ?13084 ?13085) =<= least_upper_bound (least_upper_bound ?13084 identity) ?13085 [13085, 13084] by Demod 10335 with 12 at 2
4381 Id : 10485, {_}: least_upper_bound ?9854 (least_upper_bound ?9855 identity) =<= least_upper_bound identity (least_upper_bound identity (least_upper_bound ?9855 ?9854)) [9855, 9854] by Demod 6922 with 10336 at 2,3
4382 Id : 10492, {_}: least_upper_bound ?9854 (least_upper_bound ?9855 identity) =?= least_upper_bound identity (least_upper_bound ?9855 ?9854) [9855, 9854] by Demod 10485 with 104 at 3
4383 Id : 18158, {_}: least_upper_bound ?21052 (inverse (greatest_lower_bound ?21053 identity)) =<= least_upper_bound identity (least_upper_bound ?21052 (inverse (greatest_lower_bound ?21053 identity))) [21053, 21052] by Demod 5622 with 10492 at 3
4384 Id : 577, {_}: greatest_lower_bound (greatest_lower_bound ?1234 ?1235) ?1234 =>= greatest_lower_bound ?1234 ?1235 [1235, 1234] by Super 10 with 116 at 3
4385 Id : 18162, {_}: least_upper_bound ?21064 (inverse (greatest_lower_bound (greatest_lower_bound identity ?21063) identity)) =?= least_upper_bound identity (least_upper_bound ?21064 (inverse (greatest_lower_bound identity ?21063))) [21063, 21064] by Super 18158 with 577 at 1,2,2,3
4386 Id : 5589, {_}: inverse (greatest_lower_bound ?8486 identity) =<= least_upper_bound identity (inverse (greatest_lower_bound ?8486 identity)) [8486] by Demod 5431 with 12 at 3
4387 Id : 5593, {_}: inverse (greatest_lower_bound (greatest_lower_bound identity ?8493) identity) =<= least_upper_bound identity (inverse (greatest_lower_bound identity ?8493)) [8493] by Super 5589 with 577 at 1,2,3
4388 Id : 5675, {_}: inverse (greatest_lower_bound identity (greatest_lower_bound identity ?8493)) =<= least_upper_bound identity (inverse (greatest_lower_bound identity ?8493)) [8493] by Demod 5593 with 10 at 1,2
4389 Id : 5676, {_}: inverse (greatest_lower_bound identity ?8493) =<= least_upper_bound identity (inverse (greatest_lower_bound identity ?8493)) [8493] by Demod 5675 with 116 at 1,2
4390 Id : 5590, {_}: inverse (greatest_lower_bound ?8488 identity) =<= least_upper_bound identity (inverse (greatest_lower_bound identity ?8488)) [8488] by Super 5589 with 10 at 1,2,3
4391 Id : 5940, {_}: inverse (greatest_lower_bound identity ?8493) =?= inverse (greatest_lower_bound ?8493 identity) [8493] by Demod 5676 with 5590 at 3
4392 Id : 18288, {_}: least_upper_bound ?21064 (inverse (greatest_lower_bound identity (greatest_lower_bound identity ?21063))) =?= least_upper_bound identity (least_upper_bound ?21064 (inverse (greatest_lower_bound identity ?21063))) [21063, 21064] by Demod 18162 with 5940 at 2,2
4393 Id : 18289, {_}: least_upper_bound ?21064 (inverse (greatest_lower_bound identity ?21063)) =<= least_upper_bound identity (least_upper_bound ?21064 (inverse (greatest_lower_bound identity ?21063))) [21063, 21064] by Demod 18288 with 116 at 1,2,2
4394 Id : 5804, {_}: least_upper_bound ?8608 (inverse (greatest_lower_bound ?8607 identity)) =<= least_upper_bound (least_upper_bound ?8608 identity) (inverse (greatest_lower_bound identity ?8607)) [8607, 8608] by Super 16 with 5590 at 2,2
4395 Id : 5849, {_}: least_upper_bound ?8608 (inverse (greatest_lower_bound ?8607 identity)) =<= least_upper_bound (inverse (greatest_lower_bound identity ?8607)) (least_upper_bound ?8608 identity) [8607, 8608] by Demod 5804 with 12 at 3
4396 Id : 19653, {_}: least_upper_bound ?8608 (inverse (greatest_lower_bound ?8607 identity)) =<= least_upper_bound identity (least_upper_bound ?8608 (inverse (greatest_lower_bound identity ?8607))) [8607, 8608] by Demod 5849 with 10492 at 3
4397 Id : 50221, {_}: least_upper_bound ?21064 (inverse (greatest_lower_bound identity ?21063)) =?= least_upper_bound ?21064 (inverse (greatest_lower_bound ?21063 identity)) [21063, 21064] by Demod 18289 with 19653 at 3
4398 Id : 140157, {_}: least_upper_bound ?154397 (inverse (greatest_lower_bound identity (inverse ?154397))) =>= inverse (greatest_lower_bound (inverse ?154397) identity) [154397] by Super 50221 with 140039 at 3
4399 Id : 140328, {_}: least_upper_bound ?154397 (inverse (greatest_lower_bound identity (inverse ?154397))) =>= inverse (greatest_lower_bound identity (inverse ?154397)) [154397] by Demod 140157 with 5940 at 3
4400 Id : 141908, {_}: greatest_lower_bound (inverse (greatest_lower_bound identity (inverse ?155586))) ?155586 =>= ?155586 [155586] by Super 143 with 140328 at 1,2
4401 Id : 141910, {_}: greatest_lower_bound (inverse (greatest_lower_bound identity ?155589)) (inverse ?155589) =>= inverse ?155589 [155589] by Super 141908 with 36 at 2,1,1,2
4402 Id : 144996, {_}: multiply (inverse (greatest_lower_bound (inverse (greatest_lower_bound identity ?157076)) (inverse ?157076))) (inverse (greatest_lower_bound identity ?157076)) =>= least_upper_bound identity (multiply (inverse (inverse ?157076)) (inverse (greatest_lower_bound identity ?157076))) [157076] by Super 1369 with 141910 at 1,1,2,3
4403 Id : 145323, {_}: inverse (multiply (greatest_lower_bound identity ?157076) (greatest_lower_bound (inverse (greatest_lower_bound identity ?157076)) (inverse ?157076))) =>= least_upper_bound identity (multiply (inverse (inverse ?157076)) (inverse (greatest_lower_bound identity ?157076))) [157076] by Demod 144996 with 38 at 2
4404 Id : 393, {_}: multiply ?924 (greatest_lower_bound (inverse ?924) ?925) =>= greatest_lower_bound identity (multiply ?924 ?925) [925, 924] by Super 28 with 299 at 1,3
4405 Id : 145324, {_}: inverse (greatest_lower_bound identity (multiply (greatest_lower_bound identity ?157076) (inverse ?157076))) =<= least_upper_bound identity (multiply (inverse (inverse ?157076)) (inverse (greatest_lower_bound identity ?157076))) [157076] by Demod 145323 with 393 at 1,2
4406 Id : 390, {_}: multiply (greatest_lower_bound ?916 ?915) (inverse ?915) =>= greatest_lower_bound (multiply ?916 (inverse ?915)) identity [915, 916] by Super 32 with 299 at 2,3
4407 Id : 418, {_}: multiply (greatest_lower_bound ?916 ?915) (inverse ?915) =>= greatest_lower_bound identity (multiply ?916 (inverse ?915)) [915, 916] by Demod 390 with 10 at 3
4408 Id : 145325, {_}: inverse (greatest_lower_bound identity (greatest_lower_bound identity (multiply identity (inverse ?157076)))) =<= least_upper_bound identity (multiply (inverse (inverse ?157076)) (inverse (greatest_lower_bound identity ?157076))) [157076] by Demod 145324 with 418 at 2,1,2
4409 Id : 145326, {_}: inverse (greatest_lower_bound identity (multiply identity (inverse ?157076))) =<= least_upper_bound identity (multiply (inverse (inverse ?157076)) (inverse (greatest_lower_bound identity ?157076))) [157076] by Demod 145325 with 116 at 1,2
4410 Id : 145327, {_}: inverse (greatest_lower_bound identity (inverse ?157076)) =<= least_upper_bound identity (multiply (inverse (inverse ?157076)) (inverse (greatest_lower_bound identity ?157076))) [157076] by Demod 145326 with 4 at 2,1,2
4411 Id : 145328, {_}: inverse (greatest_lower_bound identity (inverse ?157076)) =<= least_upper_bound identity (inverse (multiply (greatest_lower_bound identity ?157076) (inverse ?157076))) [157076] by Demod 145327 with 38 at 2,3
4412 Id : 145329, {_}: inverse (greatest_lower_bound identity (inverse ?157076)) =<= least_upper_bound identity (multiply ?157076 (inverse (greatest_lower_bound identity ?157076))) [157076] by Demod 145328 with 320 at 2,3
4413 Id : 399, {_}: multiply ?940 (least_upper_bound (inverse ?940) ?941) =>= least_upper_bound identity (multiply ?940 ?941) [941, 940] by Super 26 with 299 at 1,3
4414 Id : 140842, {_}: multiply ?154994 (inverse (greatest_lower_bound identity (inverse (inverse ?154994)))) =<= least_upper_bound identity (multiply ?154994 (inverse (greatest_lower_bound identity (inverse (inverse ?154994))))) [154994] by Super 399 with 140328 at 2,2
4415 Id : 141158, {_}: multiply ?154994 (inverse (greatest_lower_bound identity ?154994)) =<= least_upper_bound identity (multiply ?154994 (inverse (greatest_lower_bound identity (inverse (inverse ?154994))))) [154994] by Demod 140842 with 36 at 2,1,2,2
4416 Id : 141159, {_}: multiply ?154994 (inverse (greatest_lower_bound identity ?154994)) =<= least_upper_bound identity (multiply ?154994 (inverse (greatest_lower_bound identity ?154994))) [154994] by Demod 141158 with 36 at 2,1,2,2,3
4417 Id : 165997, {_}: inverse (greatest_lower_bound identity (inverse ?157076)) =<= multiply ?157076 (inverse (greatest_lower_bound identity ?157076)) [157076] by Demod 145329 with 141159 at 3
4418 Id : 166015, {_}: multiply (inverse (greatest_lower_bound identity (inverse ?173131))) (greatest_lower_bound identity ?173131) =>= ?173131 [173131] by Super 1260 with 165997 at 1,2
4419 Id : 396771, {_}: least_upper_bound (greatest_lower_bound identity (inverse ?441901)) (greatest_lower_bound identity ?441901) =<= multiply (greatest_lower_bound identity (inverse ?441901)) (least_upper_bound identity ?441901) [441901] by Super 1384 with 166015 at 2,2,3
4420 Id : 397621, {_}: multiply (least_upper_bound identity (least_upper_bound (greatest_lower_bound identity (inverse ?442410)) (greatest_lower_bound identity ?442410))) (inverse (least_upper_bound identity ?442410)) =>= least_upper_bound (inverse (least_upper_bound identity ?442410)) (greatest_lower_bound identity (inverse ?442410)) [442410] by Super 2362 with 396771 at 2,1,2
4421 Id : 128, {_}: least_upper_bound ?344 (least_upper_bound (greatest_lower_bound ?344 ?345) ?346) =>= least_upper_bound ?344 ?346 [346, 345, 344] by Super 16 with 22 at 1,3
4422 Id : 397861, {_}: multiply (least_upper_bound identity (greatest_lower_bound identity ?442410)) (inverse (least_upper_bound identity ?442410)) =>= least_upper_bound (inverse (least_upper_bound identity ?442410)) (greatest_lower_bound identity (inverse ?442410)) [442410] by Demod 397621 with 128 at 1,2
4423 Id : 397862, {_}: multiply identity (inverse (least_upper_bound identity ?442410)) =<= least_upper_bound (inverse (least_upper_bound identity ?442410)) (greatest_lower_bound identity (inverse ?442410)) [442410] by Demod 397861 with 22 at 1,2
4424 Id : 397863, {_}: inverse (least_upper_bound identity ?442410) =<= least_upper_bound (inverse (least_upper_bound identity ?442410)) (greatest_lower_bound identity (inverse ?442410)) [442410] by Demod 397862 with 4 at 2
4425 Id : 397864, {_}: inverse (least_upper_bound identity ?442410) =<= least_upper_bound (greatest_lower_bound identity (inverse ?442410)) (inverse (least_upper_bound identity ?442410)) [442410] by Demod 397863 with 12 at 3
4426 Id : 697689, {_}: greatest_lower_bound (inverse (least_upper_bound identity ?666285)) (greatest_lower_bound identity (inverse ?666285)) =>= greatest_lower_bound identity (inverse ?666285) [666285] by Super 143 with 397864 at 1,2
4427 Id : 698150, {_}: greatest_lower_bound (greatest_lower_bound identity (inverse ?666285)) (inverse (least_upper_bound identity ?666285)) =>= greatest_lower_bound identity (inverse ?666285) [666285] by Demod 697689 with 10 at 2
4428 Id : 698151, {_}: greatest_lower_bound identity (greatest_lower_bound (inverse ?666285) (inverse (least_upper_bound identity ?666285))) =>= greatest_lower_bound identity (inverse ?666285) [666285] by Demod 698150 with 14 at 2
4429 Id : 4574, {_}: multiply (inverse (least_upper_bound ?7568 identity)) (greatest_lower_bound identity (least_upper_bound identity ?7568)) =>= greatest_lower_bound (inverse (least_upper_bound ?7568 identity)) identity [7568] by Super 333 with 3454 at 2,3
4430 Id : 4596, {_}: multiply (inverse (least_upper_bound ?7568 identity)) identity =>= greatest_lower_bound (inverse (least_upper_bound ?7568 identity)) identity [7568] by Demod 4574 with 24 at 2,2
4431 Id : 4597, {_}: inverse (least_upper_bound ?7568 identity) =<= greatest_lower_bound (inverse (least_upper_bound ?7568 identity)) identity [7568] by Demod 4596 with 354 at 2
4432 Id : 4680, {_}: inverse (least_upper_bound ?7650 identity) =<= greatest_lower_bound identity (inverse (least_upper_bound ?7650 identity)) [7650] by Demod 4597 with 10 at 3
4433 Id : 4681, {_}: inverse (least_upper_bound ?7652 identity) =<= greatest_lower_bound identity (inverse (least_upper_bound identity ?7652)) [7652] by Super 4680 with 12 at 1,2,3
4434 Id : 4945, {_}: greatest_lower_bound ?7822 (inverse (least_upper_bound ?7821 identity)) =<= greatest_lower_bound (greatest_lower_bound ?7822 identity) (inverse (least_upper_bound identity ?7821)) [7821, 7822] by Super 14 with 4681 at 2,2
4435 Id : 732, {_}: greatest_lower_bound (least_upper_bound ?1553 ?1554) ?1553 =>= ?1553 [1554, 1553] by Super 10 with 24 at 3
4436 Id : 733, {_}: greatest_lower_bound (least_upper_bound ?1557 ?1556) ?1556 =>= ?1556 [1556, 1557] by Super 732 with 12 at 1,2
4437 Id : 8152, {_}: least_upper_bound (greatest_lower_bound ?11342 identity) (least_upper_bound ?11343 identity) =>= least_upper_bound ?11343 identity [11343, 11342] by Super 8147 with 651 at 2,3
4438 Id : 9033, {_}: least_upper_bound ?11999 identity =<= least_upper_bound (least_upper_bound (greatest_lower_bound ?11998 identity) ?11999) identity [11998, 11999] by Super 16 with 8152 at 2
4439 Id : 11655, {_}: least_upper_bound ?14440 identity =<= least_upper_bound identity (least_upper_bound (greatest_lower_bound ?14441 identity) ?14440) [14441, 14440] by Demod 9033 with 12 at 3
4440 Id : 11666, {_}: least_upper_bound (greatest_lower_bound (greatest_lower_bound ?14473 identity) ?14472) identity =>= least_upper_bound identity (greatest_lower_bound ?14473 identity) [14472, 14473] by Super 11655 with 22 at 2,3
4441 Id : 11846, {_}: least_upper_bound identity (greatest_lower_bound (greatest_lower_bound ?14473 identity) ?14472) =>= least_upper_bound identity (greatest_lower_bound ?14473 identity) [14472, 14473] by Demod 11666 with 12 at 2
4442 Id : 132, {_}: least_upper_bound ?359 (greatest_lower_bound ?360 ?359) =>= ?359 [360, 359] by Super 131 with 10 at 2,2
4443 Id : 11847, {_}: least_upper_bound identity (greatest_lower_bound (greatest_lower_bound ?14473 identity) ?14472) =>= identity [14472, 14473] by Demod 11846 with 132 at 3
4444 Id : 13334, {_}: greatest_lower_bound identity (greatest_lower_bound (greatest_lower_bound ?16294 identity) ?16295) =>= greatest_lower_bound (greatest_lower_bound ?16294 identity) ?16295 [16295, 16294] by Super 733 with 11847 at 1,2
4445 Id : 13335, {_}: greatest_lower_bound identity (greatest_lower_bound (greatest_lower_bound identity ?16297) ?16298) =>= greatest_lower_bound (greatest_lower_bound ?16297 identity) ?16298 [16298, 16297] by Super 13334 with 10 at 1,2,2
4446 Id : 13417, {_}: greatest_lower_bound identity (greatest_lower_bound identity (greatest_lower_bound ?16297 ?16298)) =>= greatest_lower_bound (greatest_lower_bound ?16297 identity) ?16298 [16298, 16297] by Demod 13335 with 14 at 2,2
4447 Id : 13418, {_}: greatest_lower_bound identity (greatest_lower_bound ?16297 ?16298) =<= greatest_lower_bound (greatest_lower_bound ?16297 identity) ?16298 [16298, 16297] by Demod 13417 with 116 at 2
4448 Id : 16433, {_}: greatest_lower_bound ?7822 (inverse (least_upper_bound ?7821 identity)) =<= greatest_lower_bound identity (greatest_lower_bound ?7822 (inverse (least_upper_bound identity ?7821))) [7821, 7822] by Demod 4945 with 13418 at 3
4449 Id : 698152, {_}: greatest_lower_bound (inverse ?666285) (inverse (least_upper_bound ?666285 identity)) =>= greatest_lower_bound identity (inverse ?666285) [666285] by Demod 698151 with 16433 at 2
4450 Id : 1371, {_}: multiply (inverse (least_upper_bound ?2583 ?2582)) (least_upper_bound ?2583 ?2582) =>= least_upper_bound identity (multiply (inverse (least_upper_bound ?2583 ?2582)) ?2583) [2582, 2583] by Super 1363 with 502 at 2,2
4451 Id : 1403, {_}: identity =<= least_upper_bound identity (multiply (inverse (least_upper_bound ?2583 ?2582)) ?2583) [2582, 2583] by Demod 1371 with 6 at 2
4452 Id : 139935, {_}: multiply identity ?154067 =<= least_upper_bound ?154067 (inverse (least_upper_bound (inverse ?154067) ?154066)) [154066, 154067] by Super 139882 with 1403 at 1,2
4453 Id : 140043, {_}: ?154067 =<= least_upper_bound ?154067 (inverse (least_upper_bound (inverse ?154067) ?154066)) [154066, 154067] by Demod 139935 with 4 at 2
4454 Id : 171519, {_}: greatest_lower_bound ?178895 (inverse (least_upper_bound (inverse ?178895) ?178896)) =>= inverse (least_upper_bound (inverse ?178895) ?178896) [178896, 178895] by Super 733 with 140043 at 1,2
4455 Id : 171521, {_}: greatest_lower_bound (inverse ?178900) (inverse (least_upper_bound ?178900 ?178901)) =>= inverse (least_upper_bound (inverse (inverse ?178900)) ?178901) [178901, 178900] by Super 171519 with 36 at 1,1,2,2
4456 Id : 172001, {_}: greatest_lower_bound (inverse ?178900) (inverse (least_upper_bound ?178900 ?178901)) =>= inverse (least_upper_bound ?178900 ?178901) [178901, 178900] by Demod 171521 with 36 at 1,1,3
4457 Id : 698153, {_}: inverse (least_upper_bound ?666285 identity) =>= greatest_lower_bound identity (inverse ?666285) [666285] by Demod 698152 with 172001 at 2
4458 Id : 699473, {_}: inverse (greatest_lower_bound identity (inverse ?667289)) =>= least_upper_bound ?667289 identity [667289] by Super 36 with 698153 at 1,2
4459 Id : 702706, {_}: least_upper_bound identity (multiply a b) === least_upper_bound identity (multiply a b) [] by Demod 702705 with 12 at 3
4460 Id : 702705, {_}: least_upper_bound identity (multiply a b) =<= least_upper_bound (multiply a b) identity [] by Demod 520020 with 699473 at 3
4461 Id : 520020, {_}: least_upper_bound identity (multiply a b) =<= inverse (greatest_lower_bound identity (inverse (multiply a b))) [] by Demod 329 with 517346 at 3
4462 Id : 329, {_}: least_upper_bound identity (multiply a b) =<= multiply a (inverse (greatest_lower_bound a (inverse b))) [] by Demod 2 with 12 at 2
4463 Id : 2, {_}: least_upper_bound (multiply a b) identity =<= multiply a (inverse (greatest_lower_bound a (inverse b))) [] by prove_p23
4464 % SZS output end CNFRefutation for GRP186-2.p
4470 associativity_of_glb is 85
4471 associativity_of_lub is 84
4473 glb_absorbtion is 80
4474 greatest_lower_bound is 89
4475 idempotence_of_gld is 82
4476 idempotence_of_lub is 83
4479 least_upper_bound is 87
4482 lub_absorbtion is 81
4490 symmetry_of_glb is 88
4491 symmetry_of_lub is 86
4493 Id : 4, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
4494 Id : 6, {_}: multiply (inverse ?4) ?4 =>= identity [4] by left_inverse ?4
4496 multiply (multiply ?6 ?7) ?8 =?= multiply ?6 (multiply ?7 ?8)
4497 [8, 7, 6] by associativity ?6 ?7 ?8
4499 greatest_lower_bound ?10 ?11 =?= greatest_lower_bound ?11 ?10
4500 [11, 10] by symmetry_of_glb ?10 ?11
4502 least_upper_bound ?13 ?14 =?= least_upper_bound ?14 ?13
4503 [14, 13] by symmetry_of_lub ?13 ?14
4505 greatest_lower_bound ?16 (greatest_lower_bound ?17 ?18)
4507 greatest_lower_bound (greatest_lower_bound ?16 ?17) ?18
4508 [18, 17, 16] by associativity_of_glb ?16 ?17 ?18
4510 least_upper_bound ?20 (least_upper_bound ?21 ?22)
4512 least_upper_bound (least_upper_bound ?20 ?21) ?22
4513 [22, 21, 20] by associativity_of_lub ?20 ?21 ?22
4514 Id : 18, {_}: least_upper_bound ?24 ?24 =>= ?24 [24] by idempotence_of_lub ?24
4516 greatest_lower_bound ?26 ?26 =>= ?26
4517 [26] by idempotence_of_gld ?26
4519 least_upper_bound ?28 (greatest_lower_bound ?28 ?29) =>= ?28
4520 [29, 28] by lub_absorbtion ?28 ?29
4522 greatest_lower_bound ?31 (least_upper_bound ?31 ?32) =>= ?31
4523 [32, 31] by glb_absorbtion ?31 ?32
4525 multiply ?34 (least_upper_bound ?35 ?36)
4527 least_upper_bound (multiply ?34 ?35) (multiply ?34 ?36)
4528 [36, 35, 34] by monotony_lub1 ?34 ?35 ?36
4530 multiply ?38 (greatest_lower_bound ?39 ?40)
4532 greatest_lower_bound (multiply ?38 ?39) (multiply ?38 ?40)
4533 [40, 39, 38] by monotony_glb1 ?38 ?39 ?40
4535 multiply (least_upper_bound ?42 ?43) ?44
4537 least_upper_bound (multiply ?42 ?44) (multiply ?43 ?44)
4538 [44, 43, 42] by monotony_lub2 ?42 ?43 ?44
4540 multiply (greatest_lower_bound ?46 ?47) ?48
4542 greatest_lower_bound (multiply ?46 ?48) (multiply ?47 ?48)
4543 [48, 47, 46] by monotony_glb2 ?46 ?47 ?48
4545 greatest_lower_bound (least_upper_bound a (inverse a))
4546 (least_upper_bound b (inverse b))
4551 Id : 2, {_}: multiply a b =>= multiply b a [] by prove_p33
4552 Last chance: 1246064633.01
4553 Last chance: all is indexed 1246065282.69
4554 Last chance: failed over 100 goal 1246065282.71
4555 FAILURE in 0 iterations
4556 % SZS status Timeout for GRP187-1.p
4565 left_division_multiply is 88
4570 multiply_left_division is 89
4571 multiply_right_division is 86
4572 prove_moufang2 is 94
4573 right_division is 87
4574 right_division_multiply is 85
4575 right_identity is 91
4578 Id : 4, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
4579 Id : 6, {_}: multiply ?4 identity =>= ?4 [4] by right_identity ?4
4581 multiply ?6 (left_division ?6 ?7) =>= ?7
4582 [7, 6] by multiply_left_division ?6 ?7
4584 left_division ?9 (multiply ?9 ?10) =>= ?10
4585 [10, 9] by left_division_multiply ?9 ?10
4587 multiply (right_division ?12 ?13) ?13 =>= ?12
4588 [13, 12] by multiply_right_division ?12 ?13
4590 right_division (multiply ?15 ?16) ?16 =>= ?15
4591 [16, 15] by right_division_multiply ?15 ?16
4593 multiply ?18 (right_inverse ?18) =>= identity
4594 [18] by right_inverse ?18
4596 multiply (left_inverse ?20) ?20 =>= identity
4597 [20] by left_inverse ?20
4599 multiply (multiply ?22 (multiply ?23 ?24)) ?22
4601 multiply (multiply ?22 ?23) (multiply ?24 ?22)
4602 [24, 23, 22] by moufang1 ?22 ?23 ?24
4605 multiply (multiply (multiply a b) c) b
4607 multiply a (multiply b (multiply c b))
4608 [] by prove_moufang2
4609 Last chance: 1246065587.09
4610 Last chance: all is indexed 1246067443.39
4612 Found proof, 2161.793582s
4613 % SZS status Unsatisfiable for GRP200-1.p
4614 % SZS output start CNFRefutation for GRP200-1.p
4615 Id : 8, {_}: multiply ?6 (left_division ?6 ?7) =>= ?7 [7, 6] by multiply_left_division ?6 ?7
4616 Id : 43, {_}: right_division (multiply ?78 ?79) ?79 =>= ?78 [79, 78] by right_division_multiply ?78 ?79
4617 Id : 4, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
4618 Id : 16, {_}: multiply ?18 (right_inverse ?18) =>= identity [18] by right_inverse ?18
4619 Id : 12, {_}: multiply (right_division ?12 ?13) ?13 =>= ?12 [13, 12] by multiply_right_division ?12 ?13
4620 Id : 6, {_}: multiply ?4 identity =>= ?4 [4] by right_identity ?4
4621 Id : 18, {_}: multiply (left_inverse ?20) ?20 =>= identity [20] by left_inverse ?20
4622 Id : 66, {_}: multiply (multiply ?133 (multiply ?134 ?135)) ?133 =?= multiply (multiply ?133 ?134) (multiply ?135 ?133) [135, 134, 133] by moufang1 ?133 ?134 ?135
4623 Id : 14, {_}: right_division (multiply ?15 ?16) ?16 =>= ?15 [16, 15] by right_division_multiply ?15 ?16
4624 Id : 10, {_}: left_division ?9 (multiply ?9 ?10) =>= ?10 [10, 9] by left_division_multiply ?9 ?10
4625 Id : 20, {_}: multiply (multiply ?22 (multiply ?23 ?24)) ?22 =?= multiply (multiply ?22 ?23) (multiply ?24 ?22) [24, 23, 22] by moufang1 ?22 ?23 ?24
4626 Id : 72, {_}: multiply (multiply ?154 (multiply ?155 (left_inverse ?154))) ?154 =>= multiply (multiply ?154 ?155) identity [155, 154] by Super 66 with 18 at 2,3
4627 Id : 105, {_}: multiply (multiply ?154 (multiply ?155 (left_inverse ?154))) ?154 =>= multiply ?154 ?155 [155, 154] by Demod 72 with 6 at 3
4628 Id : 251, {_}: right_division (multiply ?379 ?380) ?379 =<= multiply ?379 (multiply ?380 (left_inverse ?379)) [380, 379] by Super 14 with 105 at 1,2
4629 Id : 348, {_}: left_division ?485 (right_division (multiply ?485 ?486) ?485) =>= multiply ?486 (left_inverse ?485) [486, 485] by Super 10 with 251 at 2,2
4630 Id : 259, {_}: multiply (multiply ?406 (multiply ?407 (left_inverse ?406))) ?406 =>= multiply ?406 ?407 [407, 406] by Demod 72 with 6 at 3
4631 Id : 263, {_}: multiply (multiply ?417 ?416) ?417 =<= multiply ?417 (right_division ?416 (left_inverse ?417)) [416, 417] by Super 259 with 12 at 2,1,2
4632 Id : 354, {_}: right_division (multiply ?505 ?506) ?505 =<= multiply ?505 (multiply ?506 (left_inverse ?505)) [506, 505] by Super 14 with 105 at 1,2
4633 Id : 264, {_}: multiply (multiply ?419 identity) ?419 =?= multiply ?419 (left_inverse (left_inverse ?419)) [419] by Super 259 with 18 at 2,1,2
4634 Id : 282, {_}: multiply ?419 ?419 =<= multiply ?419 (left_inverse (left_inverse ?419)) [419] by Demod 264 with 6 at 1,2
4635 Id : 299, {_}: left_division ?448 (multiply ?448 ?448) =>= left_inverse (left_inverse ?448) [448] by Super 10 with 282 at 2,2
4636 Id : 308, {_}: ?448 =<= left_inverse (left_inverse ?448) [448] by Demod 299 with 10 at 2
4637 Id : 356, {_}: right_division (multiply (left_inverse ?510) ?511) (left_inverse ?510) =>= multiply (left_inverse ?510) (multiply ?511 ?510) [511, 510] by Super 354 with 308 at 2,2,3
4638 Id : 429, {_}: multiply (multiply ?579 (multiply (left_inverse ?579) ?580)) ?579 =?= multiply ?579 (multiply (left_inverse ?579) (multiply ?580 ?579)) [580, 579] by Super 263 with 356 at 2,3
4639 Id : 443, {_}: multiply (multiply ?579 (left_inverse ?579)) (multiply ?580 ?579) =?= multiply ?579 (multiply (left_inverse ?579) (multiply ?580 ?579)) [580, 579] by Demod 429 with 20 at 2
4640 Id : 56, {_}: left_division (left_inverse ?106) identity =>= ?106 [106] by Super 10 with 18 at 2,2
4641 Id : 50, {_}: left_division ?95 identity =>= right_inverse ?95 [95] by Super 10 with 16 at 2,2
4642 Id : 202, {_}: right_inverse (left_inverse ?106) =>= ?106 [106] by Demod 56 with 50 at 2
4643 Id : 323, {_}: right_inverse ?467 =>= left_inverse ?467 [467] by Super 202 with 308 at 1,2
4644 Id : 332, {_}: multiply ?18 (left_inverse ?18) =>= identity [18] by Demod 16 with 323 at 2,2
4645 Id : 444, {_}: multiply identity (multiply ?580 ?579) =<= multiply ?579 (multiply (left_inverse ?579) (multiply ?580 ?579)) [579, 580] by Demod 443 with 332 at 1,2
4646 Id : 445, {_}: multiply ?580 ?579 =<= multiply ?579 (multiply (left_inverse ?579) (multiply ?580 ?579)) [579, 580] by Demod 444 with 4 at 2
4647 Id : 1799, {_}: left_division ?1898 (right_division (multiply ?1897 ?1898) ?1898) =<= multiply (multiply (left_inverse ?1898) (multiply ?1897 ?1898)) (left_inverse ?1898) [1897, 1898] by Super 348 with 445 at 1,2,2
4648 Id : 1864, {_}: left_division ?1898 ?1897 =<= multiply (multiply (left_inverse ?1898) (multiply ?1897 ?1898)) (left_inverse ?1898) [1897, 1898] by Demod 1799 with 14 at 2,2
4649 Id : 393, {_}: multiply (multiply ?551 ?552) ?551 =<= multiply ?551 (right_division ?552 (left_inverse ?551)) [552, 551] by Super 259 with 12 at 2,1,2
4650 Id : 395, {_}: multiply (multiply (left_inverse ?556) ?557) (left_inverse ?556) =>= multiply (left_inverse ?556) (right_division ?557 ?556) [557, 556] by Super 393 with 308 at 2,2,3
4651 Id : 1865, {_}: left_division ?1898 ?1897 =<= multiply (left_inverse ?1898) (right_division (multiply ?1897 ?1898) ?1898) [1897, 1898] by Demod 1864 with 395 at 3
4652 Id : 1866, {_}: left_division ?1898 ?1897 =<= multiply (left_inverse ?1898) ?1897 [1897, 1898] by Demod 1865 with 14 at 2,3
4653 Id : 1942, {_}: multiply (multiply ?2034 (multiply ?2035 (left_inverse ?2033))) ?2034 =>= multiply (multiply ?2034 ?2035) (left_division ?2033 ?2034) [2033, 2035, 2034] by Super 20 with 1866 at 2,3
4654 Id : 1961, {_}: left_division ?2091 ?2092 =<= multiply (left_inverse ?2091) ?2092 [2092, 2091] by Demod 1865 with 14 at 2,3
4655 Id : 1963, {_}: left_division (left_inverse ?2096) ?2097 =>= multiply ?2096 ?2097 [2097, 2096] by Super 1961 with 308 at 1,3
4656 Id : 391, {_}: left_division ?545 (multiply (multiply ?545 ?546) ?545) =>= right_division ?546 (left_inverse ?545) [546, 545] by Super 10 with 263 at 2,2
4657 Id : 8162, {_}: multiply (multiply ?7520 (multiply ?7521 (left_inverse ?7522))) ?7520 =>= multiply (multiply ?7520 ?7521) (left_division ?7522 ?7520) [7522, 7521, 7520] by Super 20 with 1866 at 2,3
4658 Id : 8170, {_}: multiply (multiply ?7554 (left_inverse ?7555)) ?7554 =<= multiply (multiply ?7554 identity) (left_division ?7555 ?7554) [7555, 7554] by Super 8162 with 4 at 2,1,2
4659 Id : 8237, {_}: multiply (multiply ?7554 (left_inverse ?7555)) ?7554 =>= multiply ?7554 (left_division ?7555 ?7554) [7555, 7554] by Demod 8170 with 6 at 1,3
4660 Id : 46, {_}: right_division ?85 (left_division ?86 ?85) =>= ?86 [86, 85] by Super 43 with 8 at 1,2
4661 Id : 87, {_}: multiply (multiply ?211 identity) ?211 =<= multiply (multiply ?211 ?212) (multiply (right_inverse ?212) ?211) [212, 211] by Super 66 with 16 at 2,1,2
4662 Id : 120, {_}: multiply ?211 ?211 =<= multiply (multiply ?211 ?212) (multiply (right_inverse ?212) ?211) [212, 211] by Demod 87 with 6 at 1,2
4663 Id : 1158, {_}: multiply ?211 ?211 =<= multiply (multiply ?211 ?212) (multiply (left_inverse ?212) ?211) [212, 211] by Demod 120 with 323 at 1,2,3
4664 Id : 1253, {_}: left_division (multiply ?1294 ?1295) (multiply ?1294 ?1294) =>= multiply (left_inverse ?1295) ?1294 [1295, 1294] by Super 10 with 1158 at 2,2
4665 Id : 1260, {_}: left_division ?1311 (multiply ?1312 ?1312) =<= multiply (left_inverse (left_division ?1312 ?1311)) ?1312 [1312, 1311] by Super 1253 with 8 at 1,2
4666 Id : 1310, {_}: right_division (left_division ?1373 (multiply ?1374 ?1374)) ?1374 =>= left_inverse (left_division ?1374 ?1373) [1374, 1373] by Super 14 with 1260 at 1,2
4667 Id : 2751, {_}: right_division (multiply ?3003 (multiply ?3004 ?3004)) ?3004 =>= left_inverse (left_division ?3004 (left_inverse ?3003)) [3004, 3003] by Super 1310 with 1963 at 1,2
4668 Id : 2759, {_}: right_division (multiply (multiply ?3027 (multiply ?3026 ?3027)) ?3027) ?3027 =>= left_inverse (left_division ?3027 (left_inverse (multiply ?3027 ?3026))) [3026, 3027] by Super 2751 with 20 at 1,2
4669 Id : 2904, {_}: multiply ?3141 (multiply ?3142 ?3141) =<= left_inverse (left_division ?3141 (left_inverse (multiply ?3141 ?3142))) [3142, 3141] by Demod 2759 with 14 at 2
4670 Id : 2907, {_}: multiply ?3149 (multiply (left_division ?3149 ?3148) ?3149) =>= left_inverse (left_division ?3149 (left_inverse ?3148)) [3148, 3149] by Super 2904 with 8 at 1,2,1,3
4671 Id : 4946, {_}: left_division ?4933 (left_inverse (left_division ?4933 (left_inverse ?4934))) =>= multiply (left_division ?4933 ?4934) ?4933 [4934, 4933] by Super 10 with 2907 at 2,2
4672 Id : 5074, {_}: left_division ?5067 (left_inverse (left_division ?5067 ?5068)) =<= multiply (left_division ?5067 (left_inverse ?5068)) ?5067 [5068, 5067] by Super 4946 with 308 at 2,1,2,2
4673 Id : 2787, {_}: multiply ?3027 (multiply ?3026 ?3027) =<= left_inverse (left_division ?3027 (left_inverse (multiply ?3027 ?3026))) [3026, 3027] by Demod 2759 with 14 at 2
4674 Id : 2896, {_}: left_division ?3111 (left_inverse (multiply ?3111 ?3112)) =>= left_inverse (multiply ?3111 (multiply ?3112 ?3111)) [3112, 3111] by Super 308 with 2787 at 1,3
4675 Id : 5085, {_}: left_division ?5102 (left_inverse (left_division ?5102 (multiply ?5102 ?5101))) =<= multiply (left_inverse (multiply ?5102 (multiply ?5101 ?5102))) ?5102 [5101, 5102] by Super 5074 with 2896 at 1,3
4676 Id : 5138, {_}: left_division ?5102 (left_inverse ?5101) =<= multiply (left_inverse (multiply ?5102 (multiply ?5101 ?5102))) ?5102 [5101, 5102] by Demod 5085 with 10 at 1,2,2
4677 Id : 5139, {_}: left_division ?5102 (left_inverse ?5101) =<= left_division (multiply ?5102 (multiply ?5101 ?5102)) ?5102 [5101, 5102] by Demod 5138 with 1866 at 3
4678 Id : 6213, {_}: right_division ?5851 (left_division ?5851 (left_inverse ?5852)) =>= multiply ?5851 (multiply ?5852 ?5851) [5852, 5851] by Super 46 with 5139 at 2,2
4679 Id : 6217, {_}: right_division ?5864 (left_division ?5864 ?5863) =<= multiply ?5864 (multiply (left_inverse ?5863) ?5864) [5863, 5864] by Super 6213 with 308 at 2,2,2
4680 Id : 6264, {_}: right_division ?5864 (left_division ?5864 ?5863) =<= multiply ?5864 (left_division ?5863 ?5864) [5863, 5864] by Demod 6217 with 1866 at 2,3
4681 Id : 8238, {_}: multiply (multiply ?7554 (left_inverse ?7555)) ?7554 =>= right_division ?7554 (left_division ?7554 ?7555) [7555, 7554] by Demod 8237 with 6264 at 3
4682 Id : 8310, {_}: left_division ?7723 (right_division ?7723 (left_division ?7723 ?7724)) =>= right_division (left_inverse ?7724) (left_inverse ?7723) [7724, 7723] by Super 391 with 8238 at 2,2
4683 Id : 6327, {_}: left_division ?5945 (right_division ?5945 (left_division ?5945 ?5946)) =>= left_division ?5946 ?5945 [5946, 5945] by Super 10 with 6264 at 2,2
4684 Id : 8507, {_}: left_division ?7882 ?7883 =<= right_division (left_inverse ?7882) (left_inverse ?7883) [7883, 7882] by Demod 8310 with 6327 at 2
4685 Id : 8511, {_}: left_division ?7895 (left_inverse ?7894) =>= right_division (left_inverse ?7895) ?7894 [7894, 7895] by Super 8507 with 308 at 2,3
4686 Id : 8660, {_}: right_division (left_inverse (left_inverse ?7973)) ?7972 =>= multiply ?7973 (left_inverse ?7972) [7972, 7973] by Super 1963 with 8511 at 2
4687 Id : 8725, {_}: right_division ?7973 ?7972 =<= multiply ?7973 (left_inverse ?7972) [7972, 7973] by Demod 8660 with 308 at 1,2
4688 Id : 9105, {_}: multiply (multiply ?2034 (right_division ?2035 ?2033)) ?2034 =?= multiply (multiply ?2034 ?2035) (left_division ?2033 ?2034) [2033, 2035, 2034] by Demod 1942 with 8725 at 2,1,2
4689 Id : 2111, {_}: right_division (left_division ?2205 ?2206) ?2206 =>= left_inverse ?2205 [2206, 2205] by Super 14 with 1866 at 1,2
4690 Id : 38, {_}: left_division (right_division ?64 ?65) ?64 =>= ?65 [65, 64] by Super 10 with 12 at 2,2
4691 Id : 2114, {_}: right_division ?2213 ?2214 =<= left_inverse (right_division ?2214 ?2213) [2214, 2213] by Super 2111 with 38 at 1,2
4692 Id : 8385, {_}: left_division ?7724 ?7723 =<= right_division (left_inverse ?7724) (left_inverse ?7723) [7723, 7724] by Demod 8310 with 6327 at 2
4693 Id : 8499, {_}: right_division (left_inverse ?7861) (left_inverse ?7860) =>= left_inverse (left_division ?7860 ?7861) [7860, 7861] by Super 2114 with 8385 at 1,3
4694 Id : 8852, {_}: left_division ?8187 ?8188 =<= left_inverse (left_division ?8188 ?8187) [8188, 8187] by Demod 8499 with 8385 at 2
4695 Id : 8853, {_}: left_division (multiply ?8191 ?8190) ?8191 =>= left_inverse ?8190 [8190, 8191] by Super 8852 with 10 at 1,3
4696 Id : 9898, {_}: multiply (multiply ?9062 (right_division ?9064 (multiply ?9062 ?9063))) ?9062 =>= multiply (multiply ?9062 ?9064) (left_inverse ?9063) [9063, 9064, 9062] by Super 9105 with 8853 at 2,3
4697 Id : 9970, {_}: multiply (multiply ?9062 (right_division ?9064 (multiply ?9062 ?9063))) ?9062 =>= right_division (multiply ?9062 ?9064) ?9063 [9063, 9064, 9062] by Demod 9898 with 8725 at 3
4698 Id : 8518, {_}: left_division (left_inverse ?7917) ?7918 =>= right_division ?7917 (left_inverse ?7918) [7918, 7917] by Super 8507 with 308 at 1,3
4699 Id : 8952, {_}: multiply ?8332 ?8333 =<= right_division ?8332 (left_inverse ?8333) [8333, 8332] by Demod 8518 with 1963 at 2
4700 Id : 8956, {_}: multiply ?8345 (right_division ?8344 ?8343) =>= right_division ?8345 (right_division ?8343 ?8344) [8343, 8344, 8345] by Super 8952 with 2114 at 2,3
4701 Id : 95690, {_}: multiply (right_division ?9062 (right_division (multiply ?9062 ?9063) ?9064)) ?9062 =>= right_division (multiply ?9062 ?9064) ?9063 [9064, 9063, 9062] by Demod 9970 with 8956 at 1,2
4702 Id : 2150, {_}: left_division (right_division ?2249 ?2250) ?2251 =<= multiply (right_division ?2250 ?2249) ?2251 [2251, 2250, 2249] by Super 1963 with 2114 at 1,2
4703 Id : 95691, {_}: left_division (right_division (right_division (multiply ?9062 ?9063) ?9064) ?9062) ?9062 =>= right_division (multiply ?9062 ?9064) ?9063 [9064, 9063, 9062] by Demod 95690 with 2150 at 2
4704 Id : 9121, {_}: multiply (right_division ?7554 ?7555) ?7554 =>= right_division ?7554 (left_division ?7554 ?7555) [7555, 7554] by Demod 8238 with 8725 at 1,2
4705 Id : 9127, {_}: left_division (right_division ?7555 ?7554) ?7554 =>= right_division ?7554 (left_division ?7554 ?7555) [7554, 7555] by Demod 9121 with 2150 at 2
4706 Id : 95777, {_}: right_division ?99014 (left_division ?99014 (right_division (multiply ?99014 ?99015) ?99016)) =>= right_division (multiply ?99014 ?99016) ?99015 [99016, 99015, 99014] by Demod 95691 with 9127 at 2
4707 Id : 95822, {_}: right_division ?99197 (left_division ?99197 ?99196) =<= right_division (multiply ?99197 (left_division ?99196 (multiply ?99197 ?99198))) ?99198 [99198, 99196, 99197] by Super 95777 with 46 at 2,2,2
4708 Id : 8545, {_}: left_division ?7861 ?7860 =<= left_inverse (left_division ?7860 ?7861) [7860, 7861] by Demod 8499 with 8385 at 2
4709 Id : 8958, {_}: multiply ?8352 (left_division ?8351 ?8350) =>= right_division ?8352 (left_division ?8350 ?8351) [8350, 8351, 8352] by Super 8952 with 8545 at 2,3
4710 Id : 392711, {_}: right_division ?377317 (left_division ?377317 ?377318) =<= right_division (right_division ?377317 (left_division (multiply ?377317 ?377319) ?377318)) ?377319 [377319, 377318, 377317] by Demod 95822 with 8958 at 1,3
4711 Id : 85, {_}: multiply (multiply ?204 ?203) ?204 =<= multiply (multiply ?204 ?205) (multiply (left_division ?205 ?203) ?204) [205, 203, 204] by Super 66 with 8 at 2,1,2
4712 Id : 8498, {_}: left_division (right_division (left_inverse ?7857) (left_inverse ?7856)) ?7858 =>= multiply (left_division ?7856 ?7857) ?7858 [7858, 7856, 7857] by Super 2150 with 8385 at 1,3
4713 Id : 8546, {_}: left_division (left_division ?7857 ?7856) ?7858 =<= multiply (left_division ?7856 ?7857) ?7858 [7858, 7856, 7857] by Demod 8498 with 8385 at 1,2
4714 Id : 60291, {_}: multiply (multiply ?204 ?203) ?204 =<= multiply (multiply ?204 ?205) (left_division (left_division ?203 ?205) ?204) [205, 203, 204] by Demod 85 with 8546 at 2,3
4715 Id : 60292, {_}: multiply (multiply ?204 ?203) ?204 =<= right_division (multiply ?204 ?205) (left_division ?204 (left_division ?203 ?205)) [205, 203, 204] by Demod 60291 with 8958 at 3
4716 Id : 60311, {_}: left_division (multiply (multiply ?63053 ?63054) ?63053) (multiply ?63053 ?63055) =>= left_division ?63053 (left_division ?63054 ?63055) [63055, 63054, 63053] by Super 38 with 60292 at 1,2
4717 Id : 392811, {_}: right_division (multiply ?377704 ?377702) (left_division (multiply ?377704 ?377702) (multiply ?377704 ?377703)) =>= right_division (right_division (multiply ?377704 ?377702) (left_division ?377704 (left_division ?377702 ?377703))) ?377704 [377703, 377702, 377704] by Super 392711 with 60311 at 2,1,3
4718 Id : 8860, {_}: left_division ?8210 (left_inverse ?8209) =>= left_inverse (multiply ?8209 ?8210) [8209, 8210] by Super 8852 with 1963 at 1,3
4719 Id : 8887, {_}: right_division (left_inverse ?8210) ?8209 =>= left_inverse (multiply ?8209 ?8210) [8209, 8210] by Demod 8860 with 8511 at 2
4720 Id : 9474, {_}: multiply (multiply ?8644 (left_inverse (multiply ?8643 ?8642))) ?8644 =?= multiply (multiply ?8644 (left_inverse ?8642)) (left_division ?8643 ?8644) [8642, 8643, 8644] by Super 9105 with 8887 at 2,1,2
4721 Id : 9504, {_}: multiply (right_division ?8644 (multiply ?8643 ?8642)) ?8644 =<= multiply (multiply ?8644 (left_inverse ?8642)) (left_division ?8643 ?8644) [8642, 8643, 8644] by Demod 9474 with 8725 at 1,2
4722 Id : 9505, {_}: left_division (right_division (multiply ?8643 ?8642) ?8644) ?8644 =<= multiply (multiply ?8644 (left_inverse ?8642)) (left_division ?8643 ?8644) [8644, 8642, 8643] by Demod 9504 with 2150 at 2
4723 Id : 9506, {_}: right_division ?8644 (left_division ?8644 (multiply ?8643 ?8642)) =<= multiply (multiply ?8644 (left_inverse ?8642)) (left_division ?8643 ?8644) [8642, 8643, 8644] by Demod 9505 with 9127 at 2
4724 Id : 9507, {_}: right_division ?8644 (left_division ?8644 (multiply ?8643 ?8642)) =<= multiply (right_division ?8644 ?8642) (left_division ?8643 ?8644) [8642, 8643, 8644] by Demod 9506 with 8725 at 1,3
4725 Id : 9508, {_}: right_division ?8644 (left_division ?8644 (multiply ?8643 ?8642)) =<= left_division (right_division ?8642 ?8644) (left_division ?8643 ?8644) [8642, 8643, 8644] by Demod 9507 with 2150 at 3
4726 Id : 10427, {_}: left_division (right_division ?9734 ?9735) (left_division ?9732 ?9733) =>= right_division (right_division ?9735 ?9734) (left_division ?9733 ?9732) [9733, 9732, 9735, 9734] by Super 2150 with 8958 at 3
4727 Id : 16292, {_}: right_division ?8644 (left_division ?8644 (multiply ?8643 ?8642)) =?= right_division (right_division ?8644 ?8642) (left_division ?8644 ?8643) [8642, 8643, 8644] by Demod 9508 with 10427 at 3
4728 Id : 393302, {_}: right_division (right_division (multiply ?377704 ?377702) ?377703) (left_division (multiply ?377704 ?377702) ?377704) =?= right_division (right_division (multiply ?377704 ?377702) (left_division ?377704 (left_division ?377702 ?377703))) ?377704 [377703, 377702, 377704] by Demod 392811 with 16292 at 2
4729 Id : 393303, {_}: right_division (right_division (multiply ?377704 ?377702) ?377703) (left_inverse ?377702) =<= right_division (right_division (multiply ?377704 ?377702) (left_division ?377704 (left_division ?377702 ?377703))) ?377704 [377703, 377702, 377704] by Demod 393302 with 8853 at 2,2
4730 Id : 8584, {_}: multiply ?7917 ?7918 =<= right_division ?7917 (left_inverse ?7918) [7918, 7917] by Demod 8518 with 1963 at 2
4731 Id : 393304, {_}: multiply (right_division (multiply ?377704 ?377702) ?377703) ?377702 =<= right_division (right_division (multiply ?377704 ?377702) (left_division ?377704 (left_division ?377702 ?377703))) ?377704 [377703, 377702, 377704] by Demod 393303 with 8584 at 2
4732 Id : 393305, {_}: left_division (right_division ?377703 (multiply ?377704 ?377702)) ?377702 =<= right_division (right_division (multiply ?377704 ?377702) (left_division ?377704 (left_division ?377702 ?377703))) ?377704 [377702, 377704, 377703] by Demod 393304 with 2150 at 2
4733 Id : 8144, {_}: right_division (multiply (multiply ?7446 ?7447) (left_division ?7448 ?7446)) ?7446 =>= multiply ?7446 (multiply ?7447 (left_inverse ?7448)) [7448, 7447, 7446] by Super 14 with 1942 at 1,2
4734 Id : 82754, {_}: right_division (right_division (multiply ?7446 ?7447) (left_division ?7446 ?7448)) ?7446 =>= multiply ?7446 (multiply ?7447 (left_inverse ?7448)) [7448, 7447, 7446] by Demod 8144 with 8958 at 1,2
4735 Id : 82755, {_}: right_division (right_division (multiply ?7446 ?7447) (left_division ?7446 ?7448)) ?7446 =>= multiply ?7446 (right_division ?7447 ?7448) [7448, 7447, 7446] by Demod 82754 with 8725 at 2,3
4736 Id : 82756, {_}: right_division (right_division (multiply ?7446 ?7447) (left_division ?7446 ?7448)) ?7446 =>= right_division ?7446 (right_division ?7448 ?7447) [7448, 7447, 7446] by Demod 82755 with 8956 at 3
4737 Id : 393655, {_}: left_division (right_division ?378971 (multiply ?378972 ?378973)) ?378973 =>= right_division ?378972 (right_division (left_division ?378973 ?378971) ?378973) [378973, 378972, 378971] by Demod 393305 with 82756 at 3
4738 Id : 393708, {_}: left_division (left_inverse (multiply (multiply ?379185 ?379186) ?379184)) ?379186 =>= right_division ?379185 (right_division (left_division ?379186 (left_inverse ?379184)) ?379186) [379184, 379186, 379185] by Super 393655 with 8887 at 1,2
4739 Id : 394347, {_}: multiply (multiply (multiply ?379185 ?379186) ?379184) ?379186 =<= right_division ?379185 (right_division (left_division ?379186 (left_inverse ?379184)) ?379186) [379184, 379186, 379185] by Demod 393708 with 1963 at 2
4740 Id : 9439, {_}: left_division ?7895 (left_inverse ?7894) =>= left_inverse (multiply ?7894 ?7895) [7894, 7895] by Demod 8511 with 8887 at 3
4741 Id : 394348, {_}: multiply (multiply (multiply ?379185 ?379186) ?379184) ?379186 =<= right_division ?379185 (right_division (left_inverse (multiply ?379184 ?379186)) ?379186) [379184, 379186, 379185] by Demod 394347 with 9439 at 1,2,3
4742 Id : 394349, {_}: multiply (multiply (multiply ?379185 ?379186) ?379184) ?379186 =<= right_division ?379185 (left_inverse (multiply ?379186 (multiply ?379184 ?379186))) [379184, 379186, 379185] by Demod 394348 with 8887 at 2,3
4743 Id : 394350, {_}: multiply (multiply (multiply ?379185 ?379186) ?379184) ?379186 =?= multiply ?379185 (multiply ?379186 (multiply ?379184 ?379186)) [379184, 379186, 379185] by Demod 394349 with 8584 at 3
4744 Id : 992665, {_}: multiply a (multiply b (multiply c b)) === multiply a (multiply b (multiply c b)) [] by Super 2 with 394350 at 2
4745 Id : 2, {_}: multiply (multiply (multiply a b) c) b =>= multiply a (multiply b (multiply c b)) [] by prove_moufang2
4746 % SZS output end CNFRefutation for GRP200-1.p
4755 left_division_multiply is 88
4760 multiply_left_division is 89
4761 multiply_right_division is 86
4762 prove_moufang1 is 94
4763 right_division is 87
4764 right_division_multiply is 85
4765 right_identity is 91
4768 Id : 4, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
4769 Id : 6, {_}: multiply ?4 identity =>= ?4 [4] by right_identity ?4
4771 multiply ?6 (left_division ?6 ?7) =>= ?7
4772 [7, 6] by multiply_left_division ?6 ?7
4774 left_division ?9 (multiply ?9 ?10) =>= ?10
4775 [10, 9] by left_division_multiply ?9 ?10
4777 multiply (right_division ?12 ?13) ?13 =>= ?12
4778 [13, 12] by multiply_right_division ?12 ?13
4780 right_division (multiply ?15 ?16) ?16 =>= ?15
4781 [16, 15] by right_division_multiply ?15 ?16
4783 multiply ?18 (right_inverse ?18) =>= identity
4784 [18] by right_inverse ?18
4786 multiply (left_inverse ?20) ?20 =>= identity
4787 [20] by left_inverse ?20
4789 multiply (multiply (multiply ?22 ?23) ?22) ?24
4791 multiply ?22 (multiply ?23 (multiply ?22 ?24))
4792 [24, 23, 22] by moufang3 ?22 ?23 ?24
4795 multiply (multiply a (multiply b c)) a
4797 multiply (multiply a b) (multiply c a)
4798 [] by prove_moufang1
4799 Last chance: 1246067751.11
4800 Last chance: all is indexed 1246069777.56
4802 Found proof, 2330.385313s
4803 % SZS status Unsatisfiable for GRP202-1.p
4804 % SZS output start CNFRefutation for GRP202-1.p
4805 Id : 43, {_}: right_division (multiply ?78 ?79) ?79 =>= ?78 [79, 78] by right_division_multiply ?78 ?79
4806 Id : 4, {_}: multiply identity ?2 =>= ?2 [2] by left_identity ?2
4807 Id : 18, {_}: multiply (left_inverse ?20) ?20 =>= identity [20] by left_inverse ?20
4808 Id : 8, {_}: multiply ?6 (left_division ?6 ?7) =>= ?7 [7, 6] by multiply_left_division ?6 ?7
4809 Id : 6, {_}: multiply ?4 identity =>= ?4 [4] by right_identity ?4
4810 Id : 16, {_}: multiply ?18 (right_inverse ?18) =>= identity [18] by right_inverse ?18
4811 Id : 68, {_}: multiply (multiply (multiply ?140 ?141) ?140) ?142 =?= multiply ?140 (multiply ?141 (multiply ?140 ?142)) [142, 141, 140] by moufang3 ?140 ?141 ?142
4812 Id : 14, {_}: right_division (multiply ?15 ?16) ?16 =>= ?15 [16, 15] by right_division_multiply ?15 ?16
4813 Id : 20, {_}: multiply (multiply (multiply ?22 ?23) ?22) ?24 =?= multiply ?22 (multiply ?23 (multiply ?22 ?24)) [24, 23, 22] by moufang3 ?22 ?23 ?24
4814 Id : 12, {_}: multiply (right_division ?12 ?13) ?13 =>= ?12 [13, 12] by multiply_right_division ?12 ?13
4815 Id : 10, {_}: left_division ?9 (multiply ?9 ?10) =>= ?10 [10, 9] by left_division_multiply ?9 ?10
4816 Id : 38, {_}: left_division (right_division ?64 ?65) ?64 =>= ?65 [65, 64] by Super 10 with 12 at 2,2
4817 Id : 73, {_}: multiply (multiply (multiply ?158 ?159) ?158) (right_inverse ?158) =>= multiply ?158 (multiply ?159 identity) [159, 158] by Super 68 with 16 at 2,2,3
4818 Id : 106, {_}: multiply (multiply (multiply ?158 ?159) ?158) (right_inverse ?158) =>= multiply ?158 ?159 [159, 158] by Demod 73 with 6 at 2,3
4819 Id : 302, {_}: right_division (multiply ?452 ?453) (right_inverse ?452) =>= multiply (multiply ?452 ?453) ?452 [453, 452] by Super 14 with 106 at 1,2
4820 Id : 307, {_}: right_division ?464 (right_inverse ?465) =<= multiply (multiply ?465 (left_division ?465 ?464)) ?465 [465, 464] by Super 302 with 8 at 1,2
4821 Id : 362, {_}: right_division ?516 (right_inverse ?517) =>= multiply ?516 ?517 [517, 516] by Demod 307 with 8 at 1,3
4822 Id : 56, {_}: left_division (left_inverse ?106) identity =>= ?106 [106] by Super 10 with 18 at 2,2
4823 Id : 50, {_}: left_division ?95 identity =>= right_inverse ?95 [95] by Super 10 with 16 at 2,2
4824 Id : 200, {_}: right_inverse (left_inverse ?106) =>= ?106 [106] by Demod 56 with 50 at 2
4825 Id : 363, {_}: right_division ?520 ?519 =<= multiply ?520 (left_inverse ?519) [519, 520] by Super 362 with 200 at 2,2
4826 Id : 421, {_}: multiply (multiply (multiply ?562 ?564) ?562) (left_inverse ?563) =>= multiply ?562 (multiply ?564 (right_division ?562 ?563)) [563, 564, 562] by Super 20 with 363 at 2,2,3
4827 Id : 650, {_}: right_division (multiply (multiply ?862 ?863) ?862) ?864 =<= multiply ?862 (multiply ?863 (right_division ?862 ?864)) [864, 863, 862] by Demod 421 with 363 at 2
4828 Id : 657, {_}: right_division (multiply (multiply ?887 identity) ?887) ?888 =>= multiply ?887 (right_division ?887 ?888) [888, 887] by Super 650 with 4 at 2,3
4829 Id : 692, {_}: right_division (multiply ?940 ?940) ?941 =<= multiply ?940 (right_division ?940 ?941) [941, 940] by Demod 657 with 6 at 1,1,2
4830 Id : 46, {_}: right_division ?85 (left_division ?86 ?85) =>= ?86 [86, 85] by Super 43 with 8 at 1,2
4831 Id : 695, {_}: right_division (multiply ?949 ?949) (left_division ?948 ?949) =>= multiply ?949 ?948 [948, 949] by Super 692 with 46 at 2,3
4832 Id : 1572, {_}: left_division (multiply ?1757 ?1758) (multiply ?1757 ?1757) =>= left_division ?1758 ?1757 [1758, 1757] by Super 38 with 695 at 1,2
4833 Id : 1580, {_}: left_division ?1779 (multiply (right_division ?1779 ?1780) (right_division ?1779 ?1780)) =>= left_division ?1780 (right_division ?1779 ?1780) [1780, 1779] by Super 1572 with 12 at 1,2
4834 Id : 88, {_}: multiply (multiply identity ?215) ?216 =<= multiply ?215 (multiply (right_inverse ?215) (multiply ?215 ?216)) [216, 215] by Super 68 with 16 at 1,1,2
4835 Id : 121, {_}: multiply ?215 ?216 =<= multiply ?215 (multiply (right_inverse ?215) (multiply ?215 ?216)) [216, 215] by Demod 88 with 4 at 1,2
4836 Id : 44, {_}: right_division ?81 ?81 =>= identity [81] by Super 43 with 4 at 1,2
4837 Id : 328, {_}: right_division ?464 (right_inverse ?465) =>= multiply ?464 ?465 [465, 464] by Demod 307 with 8 at 1,3
4838 Id : 357, {_}: multiply (right_inverse ?503) ?503 =>= identity [503] by Super 44 with 328 at 2
4839 Id : 376, {_}: right_division identity ?536 =>= right_inverse ?536 [536] by Super 14 with 357 at 1,2
4840 Id : 55, {_}: right_division identity ?104 =>= left_inverse ?104 [104] by Super 14 with 18 at 1,2
4841 Id : 395, {_}: left_inverse ?536 =<= right_inverse ?536 [536] by Demod 376 with 55 at 2
4842 Id : 2631, {_}: multiply ?215 ?216 =<= multiply ?215 (multiply (left_inverse ?215) (multiply ?215 ?216)) [216, 215] by Demod 121 with 395 at 1,2,3
4843 Id : 2643, {_}: left_division ?2950 (multiply ?2950 ?2951) =<= multiply (left_inverse ?2950) (multiply ?2950 ?2951) [2951, 2950] by Super 10 with 2631 at 2,2
4844 Id : 2675, {_}: ?2951 =<= multiply (left_inverse ?2950) (multiply ?2950 ?2951) [2950, 2951] by Demod 2643 with 10 at 2
4845 Id : 2822, {_}: left_division (left_inverse ?3188) ?3189 =>= multiply ?3188 ?3189 [3189, 3188] by Super 10 with 2675 at 2,2
4846 Id : 407, {_}: left_inverse (left_inverse ?106) =>= ?106 [106] by Demod 200 with 395 at 2
4847 Id : 2823, {_}: left_division ?3191 ?3192 =<= multiply (left_inverse ?3191) ?3192 [3192, 3191] by Super 2822 with 407 at 1,2
4848 Id : 2737, {_}: left_division (left_inverse ?3048) ?3047 =>= multiply ?3048 ?3047 [3047, 3048] by Super 10 with 2675 at 2,2
4849 Id : 361, {_}: left_division (multiply ?513 ?514) ?513 =>= right_inverse ?514 [514, 513] by Super 38 with 328 at 1,2
4850 Id : 487, {_}: left_division (multiply ?513 ?514) ?513 =>= left_inverse ?514 [514, 513] by Demod 361 with 395 at 3
4851 Id : 2742, {_}: left_division ?3064 (left_inverse ?3065) =>= left_inverse (multiply ?3065 ?3064) [3065, 3064] by Super 487 with 2675 at 1,2
4852 Id : 2875, {_}: left_inverse (multiply ?3221 (left_inverse ?3222)) =>= multiply ?3222 (left_inverse ?3221) [3222, 3221] by Super 2737 with 2742 at 2
4853 Id : 2943, {_}: left_inverse (right_division ?3221 ?3222) =<= multiply ?3222 (left_inverse ?3221) [3222, 3221] by Demod 2875 with 363 at 1,2
4854 Id : 2944, {_}: left_inverse (right_division ?3221 ?3222) =>= right_division ?3222 ?3221 [3222, 3221] by Demod 2943 with 363 at 3
4855 Id : 3156, {_}: left_division (right_division ?3443 ?3444) ?3445 =<= multiply (right_division ?3444 ?3443) ?3445 [3445, 3444, 3443] by Super 2823 with 2944 at 1,3
4856 Id : 23022, {_}: left_division ?1779 (left_division (right_division ?1780 ?1779) (right_division ?1779 ?1780)) =>= left_division ?1780 (right_division ?1779 ?1780) [1780, 1779] by Demod 1580 with 3156 at 2,2
4857 Id : 3157, {_}: right_division ?3449 (right_division ?3447 ?3448) =<= multiply ?3449 (right_division ?3448 ?3447) [3448, 3447, 3449] by Super 363 with 2944 at 2,3
4858 Id : 3956, {_}: left_division (right_division ?4457 ?4458) (right_division ?4456 ?4455) =>= right_division (right_division ?4458 ?4457) (right_division ?4455 ?4456) [4455, 4456, 4458, 4457] by Super 3156 with 3157 at 3
4859 Id : 23023, {_}: left_division ?1779 (right_division (right_division ?1779 ?1780) (right_division ?1780 ?1779)) =>= left_division ?1780 (right_division ?1779 ?1780) [1780, 1779] by Demod 23022 with 3956 at 2,2
4860 Id : 492, {_}: left_division (multiply ?638 ?639) ?638 =>= left_inverse ?639 [639, 638] by Demod 361 with 395 at 3
4861 Id : 495, {_}: left_division ?645 ?646 =<= left_inverse (left_division ?646 ?645) [646, 645] by Super 492 with 8 at 1,2
4862 Id : 403, {_}: left_division ?95 identity =>= left_inverse ?95 [95] by Demod 50 with 395 at 3
4863 Id : 2980, {_}: multiply (multiply (multiply ?3354 (left_inverse ?3353)) ?3354) ?3355 =>= multiply ?3354 (left_division ?3353 (multiply ?3354 ?3355)) [3355, 3353, 3354] by Super 20 with 2823 at 2,3
4864 Id : 3069, {_}: multiply (multiply (right_division ?3354 ?3353) ?3354) ?3355 =?= multiply ?3354 (left_division ?3353 (multiply ?3354 ?3355)) [3355, 3353, 3354] by Demod 2980 with 363 at 1,1,2
4865 Id : 408, {_}: right_division ?464 (left_inverse ?465) =>= multiply ?464 ?465 [465, 464] by Demod 328 with 395 at 2,2
4866 Id : 514, {_}: right_division ?671 (left_division ?669 ?670) =<= multiply ?671 (left_division ?670 ?669) [670, 669, 671] by Super 408 with 495 at 2,2
4867 Id : 3070, {_}: multiply (multiply (right_division ?3354 ?3353) ?3354) ?3355 =>= right_division ?3354 (left_division (multiply ?3354 ?3355) ?3353) [3355, 3353, 3354] by Demod 3069 with 514 at 3
4868 Id : 4877, {_}: multiply (left_division (right_division ?3353 ?3354) ?3354) ?3355 =>= right_division ?3354 (left_division (multiply ?3354 ?3355) ?3353) [3355, 3354, 3353] by Demod 3070 with 3156 at 1,2
4869 Id : 2825, {_}: left_division (left_division ?3196 ?3197) ?3198 =<= multiply (left_division ?3197 ?3196) ?3198 [3198, 3197, 3196] by Super 2822 with 495 at 1,2
4870 Id : 4878, {_}: left_division (left_division ?3354 (right_division ?3353 ?3354)) ?3355 =>= right_division ?3354 (left_division (multiply ?3354 ?3355) ?3353) [3355, 3353, 3354] by Demod 4877 with 2825 at 2
4871 Id : 4885, {_}: right_division ?5383 (left_division (multiply ?5383 identity) ?5384) =>= left_inverse (left_division ?5383 (right_division ?5384 ?5383)) [5384, 5383] by Super 403 with 4878 at 2
4872 Id : 4962, {_}: right_division ?5383 (left_division ?5383 ?5384) =<= left_inverse (left_division ?5383 (right_division ?5384 ?5383)) [5384, 5383] by Demod 4885 with 6 at 1,2,2
4873 Id : 4963, {_}: right_division ?5383 (left_division ?5383 ?5384) =<= left_division (right_division ?5384 ?5383) ?5383 [5384, 5383] by Demod 4962 with 495 at 3
4874 Id : 5068, {_}: left_division ?5634 (right_division ?5635 ?5634) =<= left_inverse (right_division ?5634 (left_division ?5634 ?5635)) [5635, 5634] by Super 495 with 4963 at 1,3
4875 Id : 5126, {_}: left_division ?5634 (right_division ?5635 ?5634) =>= right_division (left_division ?5634 ?5635) ?5634 [5635, 5634] by Demod 5068 with 2944 at 3
4876 Id : 23066, {_}: left_division ?25029 (right_division (right_division ?25029 ?25030) (right_division ?25030 ?25029)) =>= right_division (left_division ?25030 ?25029) ?25030 [25030, 25029] by Demod 23023 with 5126 at 3
4877 Id : 2978, {_}: right_division (left_inverse ?3346) ?3347 =<= left_division ?3346 (left_inverse ?3347) [3347, 3346] by Super 363 with 2823 at 3
4878 Id : 3081, {_}: right_division (left_inverse ?3346) ?3347 =>= left_inverse (multiply ?3347 ?3346) [3347, 3346] by Demod 2978 with 2742 at 3
4879 Id : 23086, {_}: left_division ?25090 (right_division (right_division ?25090 (left_inverse ?25089)) (left_inverse (multiply ?25090 ?25089))) =>= right_division (left_division (left_inverse ?25089) ?25090) (left_inverse ?25089) [25089, 25090] by Super 23066 with 3081 at 2,2,2
4880 Id : 23342, {_}: left_division ?25090 (multiply (right_division ?25090 (left_inverse ?25089)) (multiply ?25090 ?25089)) =>= right_division (left_division (left_inverse ?25089) ?25090) (left_inverse ?25089) [25089, 25090] by Demod 23086 with 408 at 2,2
4881 Id : 23343, {_}: left_division ?25090 (left_division (right_division (left_inverse ?25089) ?25090) (multiply ?25090 ?25089)) =>= right_division (left_division (left_inverse ?25089) ?25090) (left_inverse ?25089) [25089, 25090] by Demod 23342 with 3156 at 2,2
4882 Id : 23344, {_}: left_division ?25090 (left_division (left_inverse (multiply ?25090 ?25089)) (multiply ?25090 ?25089)) =>= right_division (left_division (left_inverse ?25089) ?25090) (left_inverse ?25089) [25089, 25090] by Demod 23343 with 3081 at 1,2,2
4883 Id : 23345, {_}: left_division ?25090 (multiply (multiply ?25090 ?25089) (multiply ?25090 ?25089)) =>= right_division (left_division (left_inverse ?25089) ?25090) (left_inverse ?25089) [25089, 25090] by Demod 23344 with 2737 at 2,2
4884 Id : 23346, {_}: left_division ?25090 (multiply (multiply ?25090 ?25089) (multiply ?25090 ?25089)) =>= multiply (left_division (left_inverse ?25089) ?25090) ?25089 [25089, 25090] by Demod 23345 with 408 at 3
4885 Id : 23347, {_}: left_division ?25090 (multiply (multiply ?25090 ?25089) (multiply ?25090 ?25089)) =>= left_division (left_division ?25090 (left_inverse ?25089)) ?25089 [25089, 25090] by Demod 23346 with 2825 at 3
4886 Id : 23348, {_}: left_division ?25090 (multiply (multiply ?25090 ?25089) (multiply ?25090 ?25089)) =>= left_division (left_inverse (multiply ?25089 ?25090)) ?25089 [25089, 25090] by Demod 23347 with 2742 at 1,3
4887 Id : 23349, {_}: left_division ?25090 (multiply (multiply ?25090 ?25089) (multiply ?25090 ?25089)) =>= multiply (multiply ?25089 ?25090) ?25089 [25089, 25090] by Demod 23348 with 2737 at 3
4888 Id : 1876, {_}: left_division (right_division ?2132 ?2133) (multiply ?2132 ?2132) =>= left_division (left_inverse ?2133) ?2132 [2133, 2132] by Super 1572 with 363 at 1,2
4889 Id : 1882, {_}: left_division ?2150 (multiply (multiply ?2150 ?2151) (multiply ?2150 ?2151)) =>= left_division (left_inverse ?2151) (multiply ?2150 ?2151) [2151, 2150] by Super 1876 with 14 at 1,2
4890 Id : 24844, {_}: left_division ?2150 (multiply (multiply ?2150 ?2151) (multiply ?2150 ?2151)) =>= multiply ?2151 (multiply ?2150 ?2151) [2151, 2150] by Demod 1882 with 2737 at 3
4891 Id : 189960, {_}: multiply ?25089 (multiply ?25090 ?25089) =?= multiply (multiply ?25089 ?25090) ?25089 [25090, 25089] by Demod 23349 with 24844 at 2
4892 Id : 2985, {_}: right_division (left_division ?3370 ?3371) ?3371 =>= left_inverse ?3370 [3371, 3370] by Super 14 with 2823 at 1,2
4893 Id : 4879, {_}: right_division (right_division ?5359 (left_division (multiply ?5359 ?5361) ?5360)) ?5361 =>= left_inverse (left_division ?5359 (right_division ?5360 ?5359)) [5360, 5361, 5359] by Super 2985 with 4878 at 1,2
4894 Id : 4974, {_}: right_division (right_division ?5359 (left_division (multiply ?5359 ?5361) ?5360)) ?5361 =>= left_division (right_division ?5360 ?5359) ?5359 [5360, 5361, 5359] by Demod 4879 with 495 at 3
4895 Id : 41940, {_}: right_division (right_division ?5359 (left_division (multiply ?5359 ?5361) ?5360)) ?5361 =>= right_division ?5359 (left_division ?5359 ?5360) [5360, 5361, 5359] by Demod 4974 with 4963 at 3
4896 Id : 41979, {_}: right_division ?43925 (left_division ?43925 ?43926) =<= multiply (right_division ?43925 (left_division (multiply ?43925 (left_inverse ?43927)) ?43926)) ?43927 [43927, 43926, 43925] by Super 408 with 41940 at 2
4897 Id : 42108, {_}: right_division ?43925 (left_division ?43925 ?43926) =<= left_division (right_division (left_division (multiply ?43925 (left_inverse ?43927)) ?43926) ?43925) ?43927 [43927, 43926, 43925] by Demod 41979 with 3156 at 3
4898 Id : 42109, {_}: right_division ?43925 (left_division ?43925 ?43926) =<= left_division (right_division (left_division (right_division ?43925 ?43927) ?43926) ?43925) ?43927 [43927, 43926, 43925] by Demod 42108 with 363 at 1,1,1,3
4899 Id : 42000, {_}: right_division (right_division ?44019 (left_division (multiply ?44019 ?44020) ?44021)) ?44020 =>= right_division ?44019 (left_division ?44019 ?44021) [44021, 44020, 44019] by Demod 4974 with 4963 at 3
4900 Id : 42010, {_}: right_division (right_division (left_inverse ?44060) (left_division (left_division ?44060 ?44061) ?44062)) ?44061 =>= right_division (left_inverse ?44060) (left_division (left_inverse ?44060) ?44062) [44062, 44061, 44060] by Super 42000 with 2823 at 1,2,1,2
4901 Id : 42174, {_}: right_division (left_inverse (multiply (left_division (left_division ?44060 ?44061) ?44062) ?44060)) ?44061 =>= right_division (left_inverse ?44060) (left_division (left_inverse ?44060) ?44062) [44062, 44061, 44060] by Demod 42010 with 3081 at 1,2
4902 Id : 42175, {_}: left_inverse (multiply ?44061 (multiply (left_division (left_division ?44060 ?44061) ?44062) ?44060)) =>= right_division (left_inverse ?44060) (left_division (left_inverse ?44060) ?44062) [44062, 44060, 44061] by Demod 42174 with 3081 at 2
4903 Id : 42176, {_}: left_inverse (multiply ?44061 (left_division (left_division ?44062 (left_division ?44060 ?44061)) ?44060)) =>= right_division (left_inverse ?44060) (left_division (left_inverse ?44060) ?44062) [44060, 44062, 44061] by Demod 42175 with 2825 at 2,1,2
4904 Id : 42177, {_}: left_inverse (right_division ?44061 (left_division ?44060 (left_division ?44062 (left_division ?44060 ?44061)))) =>= right_division (left_inverse ?44060) (left_division (left_inverse ?44060) ?44062) [44062, 44060, 44061] by Demod 42176 with 514 at 1,2
4905 Id : 42178, {_}: right_division (left_division ?44060 (left_division ?44062 (left_division ?44060 ?44061))) ?44061 =>= right_division (left_inverse ?44060) (left_division (left_inverse ?44060) ?44062) [44061, 44062, 44060] by Demod 42177 with 2944 at 2
4906 Id : 42179, {_}: right_division (left_division ?44060 (left_division ?44062 (left_division ?44060 ?44061))) ?44061 =>= left_inverse (multiply (left_division (left_inverse ?44060) ?44062) ?44060) [44061, 44062, 44060] by Demod 42178 with 3081 at 3
4907 Id : 42180, {_}: right_division (left_division ?44060 (left_division ?44062 (left_division ?44060 ?44061))) ?44061 =>= left_inverse (left_division (left_division ?44062 (left_inverse ?44060)) ?44060) [44061, 44062, 44060] by Demod 42179 with 2825 at 1,3
4908 Id : 42181, {_}: right_division (left_division ?44060 (left_division ?44062 (left_division ?44060 ?44061))) ?44061 =>= left_division ?44060 (left_division ?44062 (left_inverse ?44060)) [44061, 44062, 44060] by Demod 42180 with 495 at 3
4909 Id : 42182, {_}: right_division (left_division ?44060 (left_division ?44062 (left_division ?44060 ?44061))) ?44061 =>= left_division ?44060 (left_inverse (multiply ?44060 ?44062)) [44061, 44062, 44060] by Demod 42181 with 2742 at 2,3
4910 Id : 42183, {_}: right_division (left_division ?44060 (left_division ?44062 (left_division ?44060 ?44061))) ?44061 =>= left_inverse (multiply (multiply ?44060 ?44062) ?44060) [44061, 44062, 44060] by Demod 42182 with 2742 at 3
4911 Id : 265196, {_}: right_division ?249956 (left_division ?249956 (left_division ?249955 (left_division (right_division ?249956 ?249957) ?249956))) =?= left_division (left_inverse (multiply (multiply (right_division ?249956 ?249957) ?249955) (right_division ?249956 ?249957))) ?249957 [249957, 249955, 249956] by Super 42109 with 42183 at 1,3
4912 Id : 265432, {_}: right_division ?249956 (left_division ?249956 (left_division ?249955 ?249957)) =<= left_division (left_inverse (multiply (multiply (right_division ?249956 ?249957) ?249955) (right_division ?249956 ?249957))) ?249957 [249957, 249955, 249956] by Demod 265196 with 38 at 2,2,2,2
4913 Id : 265433, {_}: right_division ?249956 (left_division ?249956 (left_division ?249955 ?249957)) =<= multiply (multiply (multiply (right_division ?249956 ?249957) ?249955) (right_division ?249956 ?249957)) ?249957 [249957, 249955, 249956] by Demod 265432 with 2737 at 3
4914 Id : 265434, {_}: right_division ?249956 (left_division ?249956 (left_division ?249955 ?249957)) =<= multiply (right_division ?249956 ?249957) (multiply ?249955 (multiply (right_division ?249956 ?249957) ?249957)) [249957, 249955, 249956] by Demod 265433 with 20 at 3
4915 Id : 265435, {_}: right_division ?249956 (left_division ?249956 (left_division ?249955 ?249957)) =<= left_division (right_division ?249957 ?249956) (multiply ?249955 (multiply (right_division ?249956 ?249957) ?249957)) [249957, 249955, 249956] by Demod 265434 with 3156 at 3
4916 Id : 265436, {_}: right_division ?249956 (left_division ?249956 (left_division ?249955 ?249957)) =<= left_division (right_division ?249957 ?249956) (multiply ?249955 (left_division (right_division ?249957 ?249956) ?249957)) [249957, 249955, 249956] by Demod 265435 with 3156 at 2,2,3
4917 Id : 265437, {_}: right_division ?249956 (left_division ?249956 (left_division ?249955 ?249957)) =<= left_division (right_division ?249957 ?249956) (right_division ?249955 (left_division ?249957 (right_division ?249957 ?249956))) [249957, 249955, 249956] by Demod 265436 with 514 at 2,3
4918 Id : 265438, {_}: right_division ?249956 (left_division ?249956 (left_division ?249955 ?249957)) =<= right_division (right_division ?249956 ?249957) (right_division (left_division ?249957 (right_division ?249957 ?249956)) ?249955) [249957, 249955, 249956] by Demod 265437 with 3956 at 3
4919 Id : 427, {_}: left_division ?583 (right_division ?583 ?584) =>= left_inverse ?584 [584, 583] by Super 10 with 363 at 2,2
4920 Id : 265439, {_}: right_division ?249956 (left_division ?249956 (left_division ?249955 ?249957)) =<= right_division (right_division ?249956 ?249957) (right_division (left_inverse ?249956) ?249955) [249957, 249955, 249956] by Demod 265438 with 427 at 1,2,3
4921 Id : 265440, {_}: right_division ?249956 (left_division ?249956 (left_division ?249955 ?249957)) =<= right_division (right_division ?249956 ?249957) (left_inverse (multiply ?249955 ?249956)) [249957, 249955, 249956] by Demod 265439 with 3081 at 2,3
4922 Id : 265441, {_}: right_division ?249956 (left_division ?249956 (left_division ?249955 ?249957)) =<= multiply (right_division ?249956 ?249957) (multiply ?249955 ?249956) [249957, 249955, 249956] by Demod 265440 with 408 at 3
4923 Id : 267669, {_}: right_division ?251794 (left_division ?251794 (left_division ?251795 ?251796)) =<= left_division (right_division ?251796 ?251794) (multiply ?251795 ?251794) [251796, 251795, 251794] by Demod 265441 with 3156 at 3
4924 Id : 267708, {_}: right_division ?251955 (left_division ?251955 (left_division ?251956 (left_inverse ?251954))) =<= left_division (left_inverse (multiply ?251955 ?251954)) (multiply ?251956 ?251955) [251954, 251956, 251955] by Super 267669 with 3081 at 1,3
4925 Id : 268416, {_}: right_division ?251955 (left_division ?251955 (left_inverse (multiply ?251954 ?251956))) =<= left_division (left_inverse (multiply ?251955 ?251954)) (multiply ?251956 ?251955) [251956, 251954, 251955] by Demod 267708 with 2742 at 2,2,2
4926 Id : 268417, {_}: right_division ?251955 (left_inverse (multiply (multiply ?251954 ?251956) ?251955)) =<= left_division (left_inverse (multiply ?251955 ?251954)) (multiply ?251956 ?251955) [251956, 251954, 251955] by Demod 268416 with 2742 at 2,2
4927 Id : 268418, {_}: multiply ?251955 (multiply (multiply ?251954 ?251956) ?251955) =<= left_division (left_inverse (multiply ?251955 ?251954)) (multiply ?251956 ?251955) [251956, 251954, 251955] by Demod 268417 with 408 at 2
4928 Id : 268419, {_}: multiply ?251955 (multiply (multiply ?251954 ?251956) ?251955) =?= multiply (multiply ?251955 ?251954) (multiply ?251956 ?251955) [251956, 251954, 251955] by Demod 268418 with 2737 at 3
4929 Id : 997758, {_}: multiply (multiply a b) (multiply c a) === multiply (multiply a b) (multiply c a) [] by Super 190709 with 268419 at 2
4930 Id : 190709, {_}: multiply a (multiply (multiply b c) a) =<= multiply (multiply a b) (multiply c a) [] by Demod 2 with 189960 at 2
4931 Id : 2, {_}: multiply (multiply a (multiply b c)) a =>= multiply (multiply a b) (multiply c a) [] by prove_moufang1
4932 % SZS output end CNFRefutation for GRP202-1.p
4940 prove_these_axioms_2 is 94
4946 (multiply (inverse (multiply (inverse (multiply ?2 ?3)) ?4))
4947 (inverse (multiply ?3 (multiply (inverse ?3) ?3)))))
4950 [4, 3, 2] by single_axiom ?2 ?3 ?4
4953 multiply (multiply (inverse b2) b2) a2 =>= a2
4954 [] by prove_these_axioms_2
4955 Last chance: 1246070086.51
4956 Last chance: all is indexed 1246072016.7
4957 Last chance: failed over 100 goal 1246072026.66
4958 FAILURE in 0 iterations
4959 % SZS status Timeout for GRP404-1.p
4968 prove_these_axioms_3 is 94
4974 (multiply (inverse (multiply (inverse (multiply ?2 ?3)) ?4))
4975 (inverse (multiply ?3 (multiply (inverse ?3) ?3)))))
4978 [4, 3, 2] by single_axiom ?2 ?3 ?4
4981 multiply (multiply a3 b3) c3 =>= multiply a3 (multiply b3 c3)
4982 [] by prove_these_axioms_3
4983 Found proof, 220.388793s
4984 % SZS status Unsatisfiable for GRP405-1.p
4985 % SZS output start CNFRefutation for GRP405-1.p
4986 Id : 4, {_}: multiply ?2 (inverse (multiply (inverse (multiply (inverse (multiply ?2 ?3)) ?4)) (inverse (multiply ?3 (multiply (inverse ?3) ?3))))) =>= ?4 [4, 3, 2] by single_axiom ?2 ?3 ?4
4987 Id : 5, {_}: multiply ?6 (inverse (multiply (inverse (multiply (inverse (multiply ?6 ?7)) ?8)) (inverse (multiply ?7 (multiply (inverse ?7) ?7))))) =>= ?8 [8, 7, 6] by single_axiom ?6 ?7 ?8
4988 Id : 7, {_}: multiply ?17 (inverse (multiply (inverse ?16) (inverse (multiply ?18 (multiply (inverse ?18) ?18))))) =?= inverse (multiply (inverse (multiply (inverse (multiply (inverse (multiply ?17 ?18)) ?15)) ?16)) (inverse (multiply ?15 (multiply (inverse ?15) ?15)))) [15, 18, 16, 17] by Super 5 with 4 at 1,1,1,2,2
4989 Id : 40, {_}: multiply (inverse (multiply ?213 ?214)) (multiply ?213 (inverse (multiply (inverse ?215) (inverse (multiply ?214 (multiply (inverse ?214) ?214)))))) =>= ?215 [215, 214, 213] by Super 4 with 7 at 2,2
4990 Id : 64, {_}: multiply (inverse (multiply ?350 ?351)) (multiply ?350 (multiply ?352 (inverse (multiply (inverse ?353) (inverse (multiply ?354 (multiply (inverse ?354) ?354))))))) =>= multiply (inverse (multiply (inverse (multiply ?352 ?354)) ?351)) ?353 [354, 353, 352, 351, 350] by Super 40 with 7 at 2,2,2
4991 Id : 124, {_}: multiply (inverse (multiply ?685 ?686)) (multiply ?685 ?687) =?= multiply (inverse (multiply (inverse (multiply ?688 ?689)) ?686)) (multiply (inverse (multiply ?688 ?689)) ?687) [689, 688, 687, 686, 685] by Super 64 with 4 at 2,2,2
4992 Id : 70, {_}: multiply (inverse (multiply ?400 ?401)) (multiply ?400 ?399) =?= multiply (inverse (multiply (inverse (multiply ?402 ?403)) ?401)) (multiply (inverse (multiply ?402 ?403)) ?399) [403, 402, 399, 401, 400] by Super 64 with 4 at 2,2,2
4993 Id : 155, {_}: multiply (inverse (multiply ?925 ?926)) (multiply ?925 ?927) =?= multiply (inverse (multiply ?924 ?926)) (multiply ?924 ?927) [924, 927, 926, 925] by Super 124 with 70 at 3
4994 Id : 113, {_}: multiply ?598 (inverse (multiply (inverse (multiply (inverse (multiply ?598 ?599)) ?597)) (inverse (multiply ?599 (multiply (inverse ?599) ?599))))) =?= inverse (multiply (inverse (multiply (inverse (multiply ?595 ?596)) (multiply ?595 ?597))) (inverse (multiply ?596 (multiply (inverse ?596) ?596)))) [596, 595, 597, 599, 598] by Super 7 with 70 at 1,1,1,3
4995 Id : 176, {_}: ?597 =<= inverse (multiply (inverse (multiply (inverse (multiply ?595 ?596)) (multiply ?595 ?597))) (inverse (multiply ?596 (multiply (inverse ?596) ?596)))) [596, 595, 597] by Demod 113 with 4 at 2
4996 Id : 9637, {_}: multiply (inverse (multiply ?67788 (inverse (multiply ?67789 (multiply (inverse ?67789) ?67789))))) (multiply ?67788 ?67790) =?= multiply ?67791 (multiply (inverse (multiply (inverse (multiply ?67792 ?67789)) (multiply ?67792 ?67791))) ?67790) [67792, 67791, 67790, 67789, 67788] by Super 155 with 176 at 1,3
4997 Id : 10194, {_}: multiply ?72717 (multiply (inverse (multiply (inverse (multiply ?72718 ?72719)) (multiply ?72718 ?72717))) ?72720) =?= multiply ?72721 (multiply (inverse (multiply (inverse (multiply ?72722 ?72719)) (multiply ?72722 ?72721))) ?72720) [72722, 72721, 72720, 72719, 72718, 72717] by Super 9637 with 176 at 1,2
4998 Id : 10232, {_}: multiply ?73113 (multiply (inverse (multiply (inverse (multiply ?73114 (inverse (multiply (inverse (multiply (inverse (multiply ?73117 ?73111)) ?73112)) (inverse (multiply ?73111 (multiply (inverse ?73111) ?73111))))))) (multiply ?73114 ?73113))) ?73115) =?= multiply ?73116 (multiply (inverse (multiply (inverse ?73112) (multiply ?73117 ?73116))) ?73115) [73116, 73115, 73112, 73111, 73117, 73114, 73113] by Super 10194 with 4 at 1,1,1,1,2,3
4999 Id : 227, {_}: multiply (inverse (multiply ?1261 ?1262)) (multiply ?1261 ?1263) =?= multiply (inverse (multiply ?1264 ?1262)) (multiply ?1264 ?1263) [1264, 1263, 1262, 1261] by Super 124 with 70 at 3
5000 Id : 234, {_}: multiply (inverse (multiply ?1309 (inverse (multiply (inverse (multiply (inverse (multiply ?1311 ?1307)) ?1308)) (inverse (multiply ?1307 (multiply (inverse ?1307) ?1307))))))) (multiply ?1309 ?1310) =>= multiply (inverse ?1308) (multiply ?1311 ?1310) [1310, 1308, 1307, 1311, 1309] by Super 227 with 4 at 1,1,3
5001 Id : 10841, {_}: multiply ?78382 (multiply (inverse (multiply (inverse ?78383) (multiply ?78384 ?78382))) ?78385) =?= multiply ?78386 (multiply (inverse (multiply (inverse ?78383) (multiply ?78384 ?78386))) ?78385) [78386, 78385, 78384, 78383, 78382] by Demod 10232 with 234 at 1,1,2,2
5002 Id : 10882, {_}: multiply ?78768 (multiply (inverse (multiply (inverse (multiply (inverse (multiply (inverse (multiply ?78766 ?78767)) (multiply ?78766 ?78765))) (inverse (multiply ?78767 (multiply (inverse ?78767) ?78767))))) (multiply ?78769 ?78768))) ?78770) =?= multiply ?78771 (multiply (inverse (multiply ?78765 (multiply ?78769 ?78771))) ?78770) [78771, 78770, 78769, 78765, 78767, 78766, 78768] by Super 10841 with 176 at 1,1,1,2,3
5003 Id : 11114, {_}: multiply ?78768 (multiply (inverse (multiply ?78765 (multiply ?78769 ?78768))) ?78770) =?= multiply ?78771 (multiply (inverse (multiply ?78765 (multiply ?78769 ?78771))) ?78770) [78771, 78770, 78769, 78765, 78768] by Demod 10882 with 176 at 1,1,1,2,2
5004 Id : 11923, {_}: multiply ?86959 (inverse (multiply (inverse (multiply ?86960 (multiply (inverse (multiply ?86961 (multiply ?86962 ?86960))) ?86963))) (inverse (multiply ?86964 (multiply (inverse ?86964) ?86964))))) =>= multiply (inverse (multiply ?86961 (multiply ?86962 (inverse (multiply ?86959 ?86964))))) ?86963 [86964, 86963, 86962, 86961, 86960, 86959] by Super 4 with 11114 at 1,1,1,2,2
5005 Id : 31525, {_}: multiply ?228038 (multiply ?228039 (inverse (multiply (inverse (multiply (inverse (multiply ?228040 (multiply ?228041 (inverse (multiply (inverse (multiply ?228039 ?228042)) ?228043))))) ?228044)) (inverse (multiply ?228042 (multiply (inverse ?228042) ?228042)))))) =>= multiply (inverse (multiply ?228040 (multiply ?228041 (inverse (multiply ?228038 ?228043))))) ?228044 [228044, 228043, 228042, 228041, 228040, 228039, 228038] by Super 11923 with 7 at 2,2
5006 Id : 31856, {_}: multiply ?231713 (multiply ?231714 (inverse (multiply (inverse (multiply (inverse (multiply ?231714 ?231716)) ?231717)) (inverse (multiply ?231716 (multiply (inverse ?231716) ?231716)))))) =?= multiply (inverse (multiply (inverse (multiply ?231715 ?231712)) (multiply ?231715 (inverse (multiply ?231713 ?231717))))) (inverse (multiply ?231712 (multiply (inverse ?231712) ?231712))) [231712, 231715, 231717, 231716, 231714, 231713] by Super 31525 with 176 at 1,1,2,2,2
5007 Id : 32694, {_}: multiply ?234105 ?234106 =<= multiply (inverse (multiply (inverse (multiply ?234107 ?234108)) (multiply ?234107 (inverse (multiply ?234105 ?234106))))) (inverse (multiply ?234108 (multiply (inverse ?234108) ?234108))) [234108, 234107, 234106, 234105] by Demod 31856 with 4 at 2,2
5008 Id : 32770, {_}: multiply ?234751 (inverse (multiply (inverse (multiply (inverse (multiply ?234751 ?234749)) ?234750)) (inverse (multiply ?234749 (multiply (inverse ?234749) ?234749))))) =?= multiply (inverse (multiply (inverse (multiply ?234752 ?234753)) (multiply ?234752 (inverse ?234750)))) (inverse (multiply ?234753 (multiply (inverse ?234753) ?234753))) [234753, 234752, 234750, 234749, 234751] by Super 32694 with 4 at 1,2,2,1,1,3
5009 Id : 33040, {_}: ?234750 =<= multiply (inverse (multiply (inverse (multiply ?234752 ?234753)) (multiply ?234752 (inverse ?234750)))) (inverse (multiply ?234753 (multiply (inverse ?234753) ?234753))) [234753, 234752, 234750] by Demod 32770 with 4 at 2
5010 Id : 15, {_}: multiply (inverse (multiply ?60 ?62)) (multiply ?60 (inverse (multiply (inverse ?61) (inverse (multiply ?62 (multiply (inverse ?62) ?62)))))) =>= ?61 [61, 62, 60] by Super 4 with 7 at 2,2
5011 Id : 11333, {_}: multiply ?82186 (inverse (multiply (inverse (multiply ?82185 (multiply (inverse (multiply ?82182 (multiply ?82183 ?82185))) ?82184))) (inverse (multiply ?82187 (multiply (inverse ?82187) ?82187))))) =>= multiply (inverse (multiply ?82182 (multiply ?82183 (inverse (multiply ?82186 ?82187))))) ?82184 [82187, 82184, 82183, 82182, 82185, 82186] by Super 4 with 11114 at 1,1,1,2,2
5012 Id : 33373, {_}: multiply ?237625 (inverse (multiply (inverse (multiply (inverse ?237622) ?237622)) (inverse (multiply ?237626 (multiply (inverse ?237626) ?237626))))) =?= multiply (inverse (multiply (inverse (multiply ?237623 ?237624)) (multiply ?237623 (inverse (multiply ?237625 ?237626))))) (inverse (multiply ?237624 (multiply (inverse ?237624) ?237624))) [237624, 237623, 237626, 237622, 237625] by Super 11333 with 33040 at 2,1,1,1,2,2
5013 Id : 33632, {_}: multiply ?237625 (inverse (multiply (inverse (multiply (inverse ?237622) ?237622)) (inverse (multiply ?237626 (multiply (inverse ?237626) ?237626))))) =>= multiply ?237625 ?237626 [237626, 237622, 237625] by Demod 33373 with 33040 at 3
5014 Id : 33860, {_}: multiply (inverse (multiply ?240296 ?240298)) (multiply ?240296 ?240298) =?= multiply (inverse ?240297) ?240297 [240297, 240298, 240296] by Super 15 with 33632 at 2,2
5015 Id : 40668, {_}: ?278603 =<= multiply (inverse (multiply (inverse ?278604) ?278604)) (inverse (multiply (inverse ?278603) (multiply (inverse (inverse ?278603)) (inverse ?278603)))) [278604, 278603] by Super 33040 with 33860 at 1,1,3
5016 Id : 35324, {_}: multiply (inverse (multiply ?248214 ?248215)) (multiply ?248214 ?248215) =?= multiply (inverse ?248216) ?248216 [248216, 248215, 248214] by Super 15 with 33632 at 2,2
5017 Id : 35547, {_}: multiply (inverse ?249874) ?249874 =?= multiply (inverse ?249877) ?249877 [249877, 249874] by Super 35324 with 33860 at 2
5018 Id : 40715, {_}: ?278907 =<= multiply (inverse (multiply (inverse ?278908) ?278908)) (inverse (multiply (inverse ?278907) (multiply (inverse ?278906) ?278906))) [278906, 278908, 278907] by Super 40668 with 35547 at 2,1,2,3
5019 Id : 300, {_}: ?1622 =<= inverse (multiply (inverse (multiply (inverse (multiply ?1623 ?1624)) (multiply ?1623 ?1622))) (inverse (multiply ?1624 (multiply (inverse ?1624) ?1624)))) [1624, 1623, 1622] by Demod 113 with 4 at 2
5020 Id : 305, {_}: ?1655 =<= inverse (multiply (inverse (multiply (inverse (multiply ?1656 (multiply ?1652 ?1653))) (multiply ?1656 ?1655))) (inverse (multiply (multiply ?1652 ?1653) (multiply (inverse (multiply ?1654 ?1653)) (multiply ?1654 ?1653))))) [1654, 1653, 1652, 1656, 1655] by Super 300 with 155 at 2,1,2,1,3
5021 Id : 11337, {_}: multiply (inverse (multiply ?82211 (multiply ?82212 ?82210))) ?82213 =<= inverse (multiply (inverse (multiply (inverse (multiply ?82210 ?82215)) (multiply ?82214 (multiply (inverse (multiply ?82211 (multiply ?82212 ?82214))) ?82213)))) (inverse (multiply ?82215 (multiply (inverse ?82215) ?82215)))) [82214, 82215, 82213, 82210, 82212, 82211] by Super 176 with 11114 at 2,1,1,1,3
5022 Id : 14547, {_}: multiply ?104639 (multiply (inverse (multiply ?104634 (multiply ?104635 ?104636))) ?104637) =<= multiply (inverse (multiply ?104640 (multiply ?104641 (inverse (multiply ?104639 ?104638))))) (multiply (inverse (multiply ?104634 (multiply ?104635 (inverse (multiply ?104640 (multiply ?104641 (inverse (multiply ?104636 ?104638)))))))) ?104637) [104638, 104641, 104640, 104637, 104636, 104635, 104634, 104639] by Super 11333 with 11337 at 2,2
5023 Id : 368, {_}: multiply (inverse (multiply ?1959 (multiply ?1960 (inverse (multiply (inverse ?1961) (inverse (multiply ?1962 (multiply (inverse ?1962) ?1962)))))))) (multiply ?1959 ?1963) =>= multiply (inverse ?1961) (multiply (inverse (multiply ?1960 ?1962)) ?1963) [1963, 1962, 1961, 1960, 1959] by Super 124 with 15 at 1,1,3
5024 Id : 384, {_}: multiply (inverse (multiply ?2092 (multiply ?2093 (inverse (multiply ?2089 (inverse (multiply ?2094 (multiply (inverse ?2094) ?2094)))))))) (multiply ?2092 ?2095) =?= multiply (inverse (multiply (inverse (multiply (inverse (multiply ?2090 ?2091)) (multiply ?2090 ?2089))) (inverse (multiply ?2091 (multiply (inverse ?2091) ?2091))))) (multiply (inverse (multiply ?2093 ?2094)) ?2095) [2091, 2090, 2095, 2094, 2089, 2093, 2092] by Super 368 with 176 at 1,1,2,2,1,1,2
5025 Id : 409, {_}: multiply (inverse (multiply ?2092 (multiply ?2093 (inverse (multiply ?2089 (inverse (multiply ?2094 (multiply (inverse ?2094) ?2094)))))))) (multiply ?2092 ?2095) =>= multiply ?2089 (multiply (inverse (multiply ?2093 ?2094)) ?2095) [2095, 2094, 2089, 2093, 2092] by Demod 384 with 176 at 1,3
5026 Id : 11831, {_}: multiply (inverse (multiply ?86031 (multiply ?86037 (inverse (multiply ?86038 (inverse (multiply ?86039 (multiply (inverse ?86039) ?86039)))))))) (multiply (inverse (multiply ?86033 (multiply ?86034 (inverse (multiply ?86031 ?86036))))) ?86035) =?= multiply ?86038 (multiply (inverse (multiply ?86037 ?86039)) (inverse (multiply (inverse (multiply ?86032 (multiply (inverse (multiply ?86033 (multiply ?86034 ?86032))) ?86035))) (inverse (multiply ?86036 (multiply (inverse ?86036) ?86036)))))) [86032, 86035, 86036, 86034, 86033, 86039, 86038, 86037, 86031] by Super 409 with 11333 at 2,2
5027 Id : 12202, {_}: multiply (inverse (multiply ?86031 (multiply ?86037 (inverse (multiply ?86038 (inverse (multiply ?86039 (multiply (inverse ?86039) ?86039)))))))) (multiply (inverse (multiply ?86033 (multiply ?86034 (inverse (multiply ?86031 ?86036))))) ?86035) =>= multiply ?86038 (multiply (inverse (multiply ?86033 (multiply ?86034 (inverse (multiply (inverse (multiply ?86037 ?86039)) ?86036))))) ?86035) [86035, 86036, 86034, 86033, 86039, 86038, 86037, 86031] by Demod 11831 with 11333 at 2,3
5028 Id : 18076, {_}: multiply ?132847 (multiply (inverse (multiply ?132848 (multiply ?132849 ?132850))) ?132851) =<= multiply ?132847 (multiply (inverse (multiply ?132848 (multiply ?132849 (inverse (multiply (inverse (multiply ?132853 ?132846)) (multiply ?132853 (inverse (multiply ?132850 (inverse (multiply ?132846 (multiply (inverse ?132846) ?132846))))))))))) ?132851) [132846, 132853, 132851, 132850, 132849, 132848, 132847] by Super 14547 with 12202 at 3
5029 Id : 21064, {_}: multiply ?157169 (inverse (multiply (inverse (multiply (inverse (multiply ?157169 ?157170)) (multiply (inverse (multiply ?157163 (multiply ?157164 ?157165))) ?157166))) (inverse (multiply ?157170 (multiply (inverse ?157170) ?157170))))) =?= multiply (inverse (multiply ?157163 (multiply ?157164 (inverse (multiply (inverse (multiply ?157167 ?157168)) (multiply ?157167 (inverse (multiply ?157165 (inverse (multiply ?157168 (multiply (inverse ?157168) ?157168))))))))))) ?157166 [157168, 157167, 157166, 157165, 157164, 157163, 157170, 157169] by Super 4 with 18076 at 1,1,1,2,2
5030 Id : 21742, {_}: multiply (inverse (multiply ?157163 (multiply ?157164 ?157165))) ?157166 =<= multiply (inverse (multiply ?157163 (multiply ?157164 (inverse (multiply (inverse (multiply ?157167 ?157168)) (multiply ?157167 (inverse (multiply ?157165 (inverse (multiply ?157168 (multiply (inverse ?157168) ?157168))))))))))) ?157166 [157168, 157167, 157166, 157165, 157164, 157163] by Demod 21064 with 4 at 2
5031 Id : 22341, {_}: inverse (multiply (inverse (multiply ?165075 ?165076)) (multiply ?165075 (inverse (multiply ?165074 (inverse (multiply ?165076 (multiply (inverse ?165076) ?165076))))))) =?= inverse (multiply (inverse (multiply (inverse (multiply ?165073 (multiply ?165077 ?165078))) (multiply ?165073 ?165074))) (inverse (multiply (multiply ?165077 ?165078) (multiply (inverse (multiply ?165079 ?165078)) (multiply ?165079 ?165078))))) [165079, 165078, 165077, 165073, 165074, 165076, 165075] by Super 305 with 21742 at 1,3
5032 Id : 22802, {_}: inverse (multiply (inverse (multiply ?165075 ?165076)) (multiply ?165075 (inverse (multiply ?165074 (inverse (multiply ?165076 (multiply (inverse ?165076) ?165076))))))) =>= ?165074 [165074, 165076, 165075] by Demod 22341 with 305 at 3
5033 Id : 38026, {_}: inverse (multiply (inverse (multiply ?263789 ?263790)) (multiply ?263789 ?263790)) =?= inverse (multiply (inverse ?263791) ?263791) [263791, 263790, 263789] by Super 22802 with 33632 at 2,1,2
5034 Id : 38262, {_}: inverse (multiply (inverse ?265529) ?265529) =?= inverse (multiply (inverse ?265532) ?265532) [265532, 265529] by Super 38026 with 35547 at 1,2
5035 Id : 38507, {_}: multiply (inverse ?265709) ?265709 =?= multiply (inverse (multiply (inverse ?265708) ?265708)) (multiply (inverse ?265707) ?265707) [265707, 265708, 265709] by Super 35547 with 38262 at 1,3
5036 Id : 40747, {_}: multiply (inverse ?279111) ?279111 =?= multiply (inverse (multiply (inverse ?279112) ?279112)) (inverse (multiply (inverse ?279110) ?279110)) [279110, 279112, 279111] by Super 40668 with 38507 at 1,2,3
5037 Id : 41831, {_}: multiply (inverse ?285057) (inverse (multiply (inverse (multiply (inverse ?285056) ?285056)) (inverse (multiply ?285057 (multiply (inverse ?285057) ?285057))))) =?= inverse (multiply (inverse ?285058) ?285058) [285058, 285056, 285057] by Super 4 with 40747 at 1,1,1,2,2
5038 Id : 33864, {_}: multiply ?240317 (inverse (multiply (inverse (multiply (inverse (multiply ?240317 ?240318)) ?240316)) (inverse (multiply ?240318 (multiply (inverse ?240318) ?240318))))) =?= inverse (multiply (inverse (multiply (inverse ?240315) ?240315)) (inverse (multiply ?240316 (multiply (inverse ?240316) ?240316)))) [240315, 240316, 240318, 240317] by Super 4 with 33632 at 1,1,1,2,2
5039 Id : 36969, {_}: ?257201 =<= inverse (multiply (inverse (multiply (inverse ?257202) ?257202)) (inverse (multiply ?257201 (multiply (inverse ?257201) ?257201)))) [257202, 257201] by Demod 33864 with 4 at 2
5040 Id : 37018, {_}: ?257524 =<= inverse (multiply (inverse (multiply (inverse ?257525) ?257525)) (inverse (multiply ?257524 (multiply (inverse ?257523) ?257523)))) [257523, 257525, 257524] by Super 36969 with 35547 at 2,1,2,1,3
5041 Id : 42424, {_}: multiply (inverse ?285057) ?285057 =?= inverse (multiply (inverse ?285058) ?285058) [285058, 285057] by Demod 41831 with 37018 at 2,2
5042 Id : 59456, {_}: ?377115 =<= multiply (inverse (inverse (multiply (inverse ?377116) ?377116))) (inverse (multiply (inverse ?377115) (multiply (inverse ?377117) ?377117))) [377117, 377116, 377115] by Super 40715 with 42424 at 1,1,3
5043 Id : 59618, {_}: multiply (inverse ?378144) ?378141 =<= multiply (inverse (inverse (multiply (inverse ?378143) ?378143))) (inverse (multiply (inverse (multiply ?378142 ?378141)) (multiply ?378142 ?378144))) [378142, 378143, 378141, 378144] by Super 59456 with 155 at 1,2,3
5044 Id : 293, {_}: multiply ?1577 ?1574 =<= inverse (multiply (inverse (multiply (inverse (multiply (inverse (multiply ?1577 ?1576)) ?1578)) (multiply (inverse (multiply ?1575 ?1576)) (multiply ?1575 ?1574)))) (inverse (multiply ?1578 (multiply (inverse ?1578) ?1578)))) [1575, 1578, 1576, 1574, 1577] by Super 7 with 176 at 2,2
5045 Id : 49313, {_}: ?325983 =<= multiply (multiply (inverse ?325984) ?325984) (inverse (multiply (inverse ?325983) (multiply (inverse ?325985) ?325985))) [325985, 325984, 325983] by Super 40715 with 42424 at 1,3
5046 Id : 70497, {_}: multiply (inverse ?433725) ?433726 =<= multiply (multiply (inverse ?433727) ?433727) (inverse (multiply (inverse (multiply ?433728 ?433726)) (multiply ?433728 ?433725))) [433728, 433727, 433726, 433725] by Super 49313 with 155 at 1,2,3
5047 Id : 104522, {_}: multiply (inverse ?611346) ?611347 =<= multiply (multiply (inverse ?611348) ?611348) (inverse (multiply (multiply (inverse ?611349) ?611349) (multiply (inverse ?611347) ?611346))) [611349, 611348, 611347, 611346] by Super 70497 with 42424 at 1,1,2,3
5048 Id : 104531, {_}: multiply (inverse ?611424) (multiply (inverse ?611422) ?611422) =?= multiply (multiply (inverse ?611425) ?611425) (inverse (multiply (multiply (inverse ?611426) ?611426) (multiply (inverse (multiply (inverse ?611423) ?611423)) ?611424))) [611423, 611426, 611425, 611422, 611424] by Super 104522 with 38262 at 1,2,1,2,3
5049 Id : 70690, {_}: multiply (inverse ?435205) ?435206 =<= multiply (multiply (inverse ?435207) ?435207) (inverse (multiply (multiply (inverse ?435204) ?435204) (multiply (inverse ?435206) ?435205))) [435204, 435207, 435206, 435205] by Super 70497 with 42424 at 1,1,2,3
5050 Id : 105085, {_}: multiply (inverse ?611424) (multiply (inverse ?611422) ?611422) =?= multiply (inverse ?611424) (multiply (inverse ?611423) ?611423) [611423, 611422, 611424] by Demod 104531 with 70690 at 3
5051 Id : 105821, {_}: multiply ?618521 (multiply (inverse ?618519) ?618519) =?= inverse (multiply (inverse (multiply (inverse (multiply (inverse (multiply ?618521 ?618522)) ?618523)) (multiply (inverse (multiply (inverse ?618518) ?618522)) (multiply (inverse ?618518) (multiply (inverse ?618520) ?618520))))) (inverse (multiply ?618523 (multiply (inverse ?618523) ?618523)))) [618520, 618518, 618523, 618522, 618519, 618521] by Super 293 with 105085 at 2,2,1,1,1,3
5052 Id : 108557, {_}: multiply ?634262 (multiply (inverse ?634263) ?634263) =?= multiply ?634262 (multiply (inverse ?634264) ?634264) [634264, 634263, 634262] by Demod 105821 with 293 at 3
5053 Id : 108677, {_}: multiply ?635011 (multiply (inverse ?635012) ?635012) =?= multiply ?635011 (inverse (multiply (inverse ?635010) ?635010)) [635010, 635012, 635011] by Super 108557 with 42424 at 2,3
5054 Id : 41162, {_}: ?281232 =<= multiply (inverse (multiply (inverse ?281233) ?281233)) (inverse (multiply (inverse ?281232) (multiply (inverse ?281234) ?281234))) [281234, 281233, 281232] by Super 40668 with 35547 at 2,1,2,3
5055 Id : 41252, {_}: multiply (inverse ?281896) ?281893 =<= multiply (inverse (multiply (inverse ?281895) ?281895)) (inverse (multiply (inverse (multiply ?281894 ?281893)) (multiply ?281894 ?281896))) [281894, 281895, 281893, 281896] by Super 41162 with 155 at 1,2,3
5056 Id : 104693, {_}: multiply (inverse (inverse (multiply (inverse (multiply ?612594 ?612592)) (multiply ?612594 ?612591)))) (multiply (inverse ?612593) ?612593) =?= multiply (multiply (inverse ?612595) ?612595) (inverse (multiply (multiply (inverse ?612596) ?612596) (multiply (inverse ?612591) ?612592))) [612596, 612595, 612593, 612591, 612592, 612594] by Super 104522 with 41252 at 2,1,2,3
5057 Id : 105218, {_}: multiply (inverse (inverse (multiply (inverse (multiply ?612594 ?612592)) (multiply ?612594 ?612591)))) (multiply (inverse ?612593) ?612593) =>= multiply (inverse ?612592) ?612591 [612593, 612591, 612592, 612594] by Demod 104693 with 70690 at 3
5058 Id : 118665, {_}: multiply (inverse ?687026) ?687027 =<= multiply (inverse (inverse (multiply (inverse (multiply ?687025 ?687026)) (multiply ?687025 ?687027)))) (inverse (multiply (inverse ?687029) ?687029)) [687029, 687025, 687027, 687026] by Super 108677 with 105218 at 2
5059 Id : 118666, {_}: multiply (inverse (inverse (multiply (inverse (multiply ?687031 ?687032)) (multiply ?687031 ?687033)))) (multiply (inverse ?687034) ?687034) =>= multiply (inverse ?687032) ?687033 [687034, 687033, 687032, 687031] by Demod 104693 with 70690 at 3
5060 Id : 202978, {_}: multiply (inverse (inverse (multiply (multiply (inverse ?1106072) ?1106072) (multiply (inverse ?1106073) ?1106074)))) (multiply (inverse ?1106075) ?1106075) =>= multiply (inverse ?1106073) ?1106074 [1106075, 1106074, 1106073, 1106072] by Super 118666 with 42424 at 1,1,1,1,2
5061 Id : 203337, {_}: multiply (inverse (inverse (multiply (multiply (inverse ?1108543) ?1108543) ?1108542))) (multiply (inverse ?1108545) ?1108545) =?= multiply (inverse ?1108544) (inverse (multiply (inverse (multiply (inverse (multiply (inverse ?1108544) ?1108541)) ?1108542)) (inverse (multiply ?1108541 (multiply (inverse ?1108541) ?1108541))))) [1108541, 1108544, 1108545, 1108542, 1108543] by Super 202978 with 4 at 2,1,1,1,2
5062 Id : 203960, {_}: multiply (inverse (inverse (multiply (multiply (inverse ?1108543) ?1108543) ?1108542))) (multiply (inverse ?1108545) ?1108545) =>= ?1108542 [1108545, 1108542, 1108543] by Demod 203337 with 4 at 3
5063 Id : 204499, {_}: ?1113563 =<= multiply (inverse (inverse (multiply (multiply (inverse ?1113562) ?1113562) ?1113563))) (inverse (multiply (inverse ?1113565) ?1113565)) [1113565, 1113562, 1113563] by Super 108677 with 203960 at 2
5064 Id : 42548, {_}: ?289376 =<= multiply (multiply (inverse ?289374) ?289374) (inverse (multiply (inverse ?289376) (multiply (inverse ?289377) ?289377))) [289377, 289374, 289376] by Super 40715 with 42424 at 1,3
5065 Id : 204490, {_}: inverse (multiply (multiply (inverse ?1113513) ?1113513) ?1113514) =?= multiply (multiply (inverse ?1113516) ?1113516) (inverse ?1113514) [1113516, 1113514, 1113513] by Super 42548 with 203960 at 1,2,3
5066 Id : 209225, {_}: ?1138104 =<= multiply (inverse (multiply (multiply (inverse ?1138103) ?1138103) (inverse ?1138104))) (inverse (multiply (inverse ?1138106) ?1138106)) [1138106, 1138103, 1138104] by Super 204499 with 204490 at 1,1,3
5067 Id : 232, {_}: multiply (inverse (multiply ?1297 ?1298)) (multiply ?1297 (multiply ?1293 ?1295)) =?= multiply (inverse (multiply (inverse (multiply ?1293 ?1294)) ?1298)) (multiply (inverse (multiply ?1296 ?1294)) (multiply ?1296 ?1295)) [1296, 1294, 1295, 1293, 1298, 1297] by Super 227 with 155 at 2,3
5068 Id : 210415, {_}: multiply (inverse (multiply (multiply (inverse ?1144394) ?1144394) (inverse ?1144395))) (multiply (inverse ?1144396) ?1144396) =>= ?1144395 [1144396, 1144395, 1144394] by Super 203960 with 204490 at 1,1,2
5069 Id : 210932, {_}: multiply (inverse (multiply (inverse (multiply (inverse ?1147471) ?1147471)) (inverse ?1147473))) (multiply (inverse ?1147474) ?1147474) =>= ?1147473 [1147474, 1147473, 1147471] by Super 210415 with 42424 at 1,1,1,2
5070 Id : 224465, {_}: multiply (inverse (multiply ?1210775 (inverse ?1210776))) (multiply ?1210775 (multiply (inverse ?1210777) ?1210777)) =>= ?1210776 [1210777, 1210776, 1210775] by Super 232 with 210932 at 3
5071 Id : 224626, {_}: multiply (inverse (multiply ?1211759 (inverse ?1211760))) (multiply ?1211759 (inverse (multiply (inverse ?1211758) ?1211758))) =>= ?1211760 [1211758, 1211760, 1211759] by Super 224465 with 42424 at 2,2,2
5072 Id : 227024, {_}: ?1221988 =<= inverse (multiply (inverse ?1221988) (multiply (inverse (inverse ?1221988)) (inverse ?1221988))) [1221988] by Super 15 with 224626 at 2
5073 Id : 228909, {_}: ?1228455 =<= multiply (multiply (inverse ?1228456) ?1228456) ?1228455 [1228456, 1228455] by Super 42548 with 227024 at 2,3
5074 Id : 230161, {_}: ?1138104 =<= multiply (inverse (inverse ?1138104)) (inverse (multiply (inverse ?1138106) ?1138106)) [1138106, 1138104] by Demod 209225 with 228909 at 1,1,3
5075 Id : 230162, {_}: multiply (inverse ?687026) ?687027 =<= multiply (inverse (multiply ?687025 ?687026)) (multiply ?687025 ?687027) [687025, 687027, 687026] by Demod 118665 with 230161 at 3
5076 Id : 230229, {_}: multiply (inverse ?378144) ?378141 =<= multiply (inverse (inverse (multiply (inverse ?378143) ?378143))) (inverse (multiply (inverse ?378141) ?378144)) [378143, 378141, 378144] by Demod 59618 with 230162 at 1,2,3
5077 Id : 70571, {_}: multiply (inverse (inverse (multiply (inverse ?434316) ?434316))) ?434317 =?= multiply (multiply (inverse ?434318) ?434318) (inverse (multiply (inverse (multiply (inverse (multiply (inverse ?434315) ?434315)) ?434317)) (multiply (inverse ?434314) ?434314))) [434314, 434315, 434318, 434317, 434316] by Super 70497 with 40747 at 2,1,2,3
5078 Id : 70940, {_}: multiply (inverse (inverse (multiply (inverse ?434316) ?434316))) ?434317 =?= multiply (inverse (multiply (inverse ?434315) ?434315)) ?434317 [434315, 434317, 434316] by Demod 70571 with 42548 at 3
5079 Id : 204504, {_}: multiply (inverse (inverse (multiply (multiply (inverse ?1113587) ?1113587) ?1113588))) (multiply (inverse ?1113589) ?1113589) =>= ?1113588 [1113589, 1113588, 1113587] by Demod 203337 with 4 at 3
5080 Id : 204894, {_}: multiply (inverse (inverse (multiply (inverse (multiply (inverse ?1115926) ?1115926)) ?1115928))) (multiply (inverse ?1115929) ?1115929) =>= ?1115928 [1115929, 1115928, 1115926] by Super 204504 with 42424 at 1,1,1,1,2
5081 Id : 222906, {_}: multiply (inverse (multiply ?1203249 (inverse ?1203248))) (multiply ?1203249 (multiply (inverse ?1203247) ?1203247)) =>= ?1203248 [1203247, 1203248, 1203249] by Super 232 with 210932 at 3
5082 Id : 230230, {_}: multiply (inverse (inverse ?1203248)) (multiply (inverse ?1203247) ?1203247) =>= ?1203248 [1203247, 1203248] by Demod 222906 with 230162 at 2
5083 Id : 230233, {_}: multiply (inverse (multiply (inverse ?1115926) ?1115926)) ?1115928 =>= ?1115928 [1115928, 1115926] by Demod 204894 with 230230 at 2
5084 Id : 230259, {_}: multiply (inverse (inverse (multiply (inverse ?434316) ?434316))) ?434317 =>= ?434317 [434317, 434316] by Demod 70940 with 230233 at 3
5085 Id : 230302, {_}: multiply (inverse ?378144) ?378141 =<= inverse (multiply (inverse ?378141) ?378144) [378141, 378144] by Demod 230229 with 230259 at 3
5086 Id : 230467, {_}: multiply ?17 (multiply (inverse (inverse (multiply ?18 (multiply (inverse ?18) ?18)))) ?16) =?= inverse (multiply (inverse (multiply (inverse (multiply (inverse (multiply ?17 ?18)) ?15)) ?16)) (inverse (multiply ?15 (multiply (inverse ?15) ?15)))) [15, 16, 18, 17] by Demod 7 with 230302 at 2,2
5087 Id : 230468, {_}: multiply ?17 (multiply (inverse (inverse (multiply ?18 (multiply (inverse ?18) ?18)))) ?16) =?= multiply (inverse (inverse (multiply ?15 (multiply (inverse ?15) ?15)))) (multiply (inverse (multiply (inverse (multiply ?17 ?18)) ?15)) ?16) [15, 16, 18, 17] by Demod 230467 with 230302 at 3
5088 Id : 230469, {_}: multiply ?17 (multiply (inverse (inverse (multiply ?18 (multiply (inverse ?18) ?18)))) ?16) =?= multiply (inverse (inverse (multiply ?15 (multiply (inverse ?15) ?15)))) (multiply (multiply (inverse ?15) (multiply ?17 ?18)) ?16) [15, 16, 18, 17] by Demod 230468 with 230302 at 1,2,3
5089 Id : 43162, {_}: ?293590 =<= inverse (multiply (inverse (inverse (multiply (inverse ?293589) ?293589))) (inverse (multiply ?293590 (multiply (inverse ?293591) ?293591)))) [293591, 293589, 293590] by Super 37018 with 42424 at 1,1,1,3
5090 Id : 230270, {_}: ?293590 =<= inverse (inverse (multiply ?293590 (multiply (inverse ?293591) ?293591))) [293591, 293590] by Demod 43162 with 230259 at 1,3
5091 Id : 230643, {_}: multiply ?17 (multiply ?18 ?16) =<= multiply (inverse (inverse (multiply ?15 (multiply (inverse ?15) ?15)))) (multiply (multiply (inverse ?15) (multiply ?17 ?18)) ?16) [15, 16, 18, 17] by Demod 230469 with 230270 at 1,2,2
5092 Id : 230644, {_}: multiply ?17 (multiply ?18 ?16) =<= multiply ?15 (multiply (multiply (inverse ?15) (multiply ?17 ?18)) ?16) [15, 16, 18, 17] by Demod 230643 with 230270 at 1,3
5093 Id : 298, {_}: multiply (inverse (multiply ?1613 (inverse (multiply ?1612 (multiply (inverse ?1612) ?1612))))) (multiply ?1613 ?1614) =?= multiply ?1610 (multiply (inverse (multiply (inverse (multiply ?1611 ?1612)) (multiply ?1611 ?1610))) ?1614) [1611, 1610, 1614, 1612, 1613] by Super 155 with 176 at 1,3
5094 Id : 230219, {_}: multiply (inverse (inverse (multiply ?1612 (multiply (inverse ?1612) ?1612)))) ?1614 =?= multiply ?1610 (multiply (inverse (multiply (inverse (multiply ?1611 ?1612)) (multiply ?1611 ?1610))) ?1614) [1611, 1610, 1614, 1612] by Demod 298 with 230162 at 2
5095 Id : 230220, {_}: multiply (inverse (inverse (multiply ?1612 (multiply (inverse ?1612) ?1612)))) ?1614 =?= multiply ?1610 (multiply (inverse (multiply (inverse ?1612) ?1610)) ?1614) [1610, 1614, 1612] by Demod 230219 with 230162 at 1,1,2,3
5096 Id : 230678, {_}: multiply ?1612 ?1614 =<= multiply ?1610 (multiply (inverse (multiply (inverse ?1612) ?1610)) ?1614) [1610, 1614, 1612] by Demod 230220 with 230270 at 1,2
5097 Id : 230679, {_}: multiply ?1612 ?1614 =<= multiply ?1610 (multiply (multiply (inverse ?1610) ?1612) ?1614) [1610, 1614, 1612] by Demod 230678 with 230302 at 1,2,3
5098 Id : 230680, {_}: multiply ?17 (multiply ?18 ?16) =?= multiply (multiply ?17 ?18) ?16 [16, 18, 17] by Demod 230644 with 230679 at 3
5099 Id : 231308, {_}: multiply a3 (multiply b3 c3) === multiply a3 (multiply b3 c3) [] by Demod 2 with 230680 at 2
5100 Id : 2, {_}: multiply (multiply a3 b3) c3 =>= multiply a3 (multiply b3 c3) [] by prove_these_axioms_3
5101 % SZS output end CNFRefutation for GRP405-1.p
5109 prove_these_axioms_2 is 94
5118 (multiply (inverse ?3)
5119 (multiply (inverse ?4)
5120 (inverse (multiply (inverse ?4) ?4)))))))
5124 [4, 3, 2] by single_axiom ?2 ?3 ?4
5127 multiply (multiply (inverse b2) b2) a2 =>= a2
5128 [] by prove_these_axioms_2
5129 Found proof, 13.442565s
5130 % SZS status Unsatisfiable for GRP422-1.p
5131 % SZS output start CNFRefutation for GRP422-1.p
5132 Id : 5, {_}: inverse (multiply (inverse (multiply ?6 (inverse (multiply (inverse ?7) (multiply (inverse ?8) (inverse (multiply (inverse ?8) ?8))))))) (multiply ?6 ?8)) =>= ?7 [8, 7, 6] by single_axiom ?6 ?7 ?8
5133 Id : 4, {_}: inverse (multiply (inverse (multiply ?2 (inverse (multiply (inverse ?3) (multiply (inverse ?4) (inverse (multiply (inverse ?4) ?4))))))) (multiply ?2 ?4)) =>= ?3 [4, 3, 2] by single_axiom ?2 ?3 ?4
5134 Id : 20, {_}: inverse (multiply (inverse (multiply ?72 ?73)) (multiply ?72 ?74)) =?= multiply (inverse ?74) (inverse (multiply (inverse ?73) (multiply (inverse (inverse (multiply (inverse ?74) ?74))) (inverse (multiply (inverse (inverse (multiply (inverse ?74) ?74))) (inverse (multiply (inverse ?74) ?74))))))) [74, 73, 72] by Super 5 with 4 at 2,1,1,1,2
5135 Id : 9, {_}: inverse (multiply (inverse (multiply ?29 ?28)) (multiply ?29 ?30)) =?= multiply (inverse ?30) (inverse (multiply (inverse ?28) (multiply (inverse (inverse (multiply (inverse ?30) ?30))) (inverse (multiply (inverse (inverse (multiply (inverse ?30) ?30))) (inverse (multiply (inverse ?30) ?30))))))) [30, 28, 29] by Super 5 with 4 at 2,1,1,1,2
5136 Id : 35, {_}: inverse (multiply (inverse (multiply ?156 ?157)) (multiply ?156 ?158)) =?= inverse (multiply (inverse (multiply ?155 ?157)) (multiply ?155 ?158)) [155, 158, 157, 156] by Super 20 with 9 at 3
5137 Id : 59, {_}: inverse (multiply (inverse (multiply ?228 (inverse (multiply (inverse (multiply (inverse (multiply ?227 ?225)) (multiply ?227 ?226))) (multiply (inverse ?229) (inverse (multiply (inverse ?229) ?229))))))) (multiply ?228 ?229)) =?= multiply (inverse (multiply ?224 ?225)) (multiply ?224 ?226) [224, 229, 226, 225, 227, 228] by Super 4 with 35 at 1,1,2,1,1,1,2
5138 Id : 156, {_}: multiply (inverse (multiply ?725 ?726)) (multiply ?725 ?727) =?= multiply (inverse (multiply ?728 ?726)) (multiply ?728 ?727) [728, 727, 726, 725] by Demod 59 with 4 at 2
5139 Id : 163, {_}: multiply (inverse (multiply ?773 (multiply ?770 ?772))) (multiply ?773 ?774) =?= multiply ?771 (multiply (inverse (multiply ?770 (inverse (multiply (inverse ?771) (multiply (inverse ?772) (inverse (multiply (inverse ?772) ?772))))))) ?774) [771, 774, 772, 770, 773] by Super 156 with 4 at 1,3
5140 Id : 55, {_}: inverse (multiply (inverse (multiply ?201 (inverse (multiply (inverse ?202) (multiply (inverse (multiply ?198 ?199)) (inverse (multiply (inverse (multiply ?200 ?199)) (multiply ?200 ?199)))))))) (multiply ?201 (multiply ?198 ?199))) =>= ?202 [200, 199, 198, 202, 201] by Super 4 with 35 at 2,2,1,2,1,1,1,2
5141 Id : 3142, {_}: inverse (multiply (inverse (multiply ?22079 (inverse (multiply (inverse (multiply ?22076 (multiply ?22077 ?22078))) (multiply ?22076 (inverse (multiply (inverse (multiply ?22081 (inverse (multiply (inverse (inverse ?22080)) (multiply (inverse ?22078) (inverse (multiply (inverse ?22078) ?22078))))))) (multiply ?22081 (inverse (multiply (inverse (inverse ?22080)) (multiply (inverse ?22078) (inverse (multiply (inverse ?22078) ?22078))))))))))))) (multiply ?22079 (multiply ?22077 (inverse (multiply (inverse (inverse ?22080)) (multiply (inverse ?22078) (inverse (multiply (inverse ?22078) ?22078)))))))) =>= ?22080 [22080, 22081, 22078, 22077, 22076, 22079] by Super 55 with 163 at 1,2,1,1,1,2
5142 Id : 290, {_}: inverse (multiply (inverse (multiply ?1309 (inverse (multiply (inverse (multiply ?1310 ?1311)) (multiply ?1310 (inverse (multiply (inverse ?1312) ?1312))))))) (multiply ?1309 ?1312)) =>= multiply (inverse ?1312) ?1311 [1312, 1311, 1310, 1309] by Super 4 with 35 at 2,1,1,1,2
5143 Id : 110, {_}: multiply (inverse (multiply ?227 ?225)) (multiply ?227 ?226) =?= multiply (inverse (multiply ?224 ?225)) (multiply ?224 ?226) [224, 226, 225, 227] by Demod 59 with 4 at 2
5144 Id : 300, {_}: inverse (multiply (inverse (multiply ?1382 (inverse (multiply (inverse (multiply ?1383 ?1384)) (multiply ?1383 (inverse (multiply (inverse (multiply ?1381 ?1380)) (multiply ?1381 ?1380)))))))) (multiply ?1382 (multiply ?1379 ?1380))) =>= multiply (inverse (multiply ?1379 ?1380)) ?1384 [1379, 1380, 1381, 1384, 1383, 1382] by Super 290 with 110 at 1,2,2,1,2,1,1,1,2
5145 Id : 3323, {_}: multiply (inverse (multiply ?22077 (inverse (multiply (inverse (inverse ?22080)) (multiply (inverse ?22078) (inverse (multiply (inverse ?22078) ?22078))))))) (multiply ?22077 ?22078) =>= ?22080 [22078, 22080, 22077] by Demod 3142 with 300 at 2
5146 Id : 3887, {_}: multiply (inverse (multiply ?27309 (multiply ?27310 ?27311))) (multiply ?27309 (multiply ?27310 ?27311)) =?= multiply (inverse ?27312) ?27312 [27312, 27311, 27310, 27309] by Super 163 with 3323 at 2,3
5147 Id : 3460, {_}: multiply (inverse (multiply ?24443 (multiply ?24440 ?24442))) (multiply ?24443 (multiply ?24440 ?24442)) =?= multiply (inverse ?24441) ?24441 [24441, 24442, 24440, 24443] by Super 163 with 3323 at 2,3
5148 Id : 3992, {_}: multiply (inverse ?28111) ?28111 =?= multiply (inverse ?28115) ?28115 [28115, 28111] by Super 3887 with 3460 at 2
5149 Id : 157, {_}: multiply (inverse (multiply ?734 ?735)) (multiply ?734 (multiply ?730 ?732)) =?= multiply (inverse (multiply (inverse (multiply ?730 ?731)) ?735)) (multiply (inverse (multiply ?733 ?731)) (multiply ?733 ?732)) [733, 731, 732, 730, 735, 734] by Super 156 with 110 at 2,3
5150 Id : 160, {_}: multiply (inverse (multiply ?754 (multiply ?750 ?752))) (multiply ?754 ?755) =?= multiply (inverse (multiply (inverse (multiply ?753 ?751)) (multiply ?753 ?752))) (multiply (inverse (multiply ?750 ?751)) ?755) [751, 753, 755, 752, 750, 754] by Super 156 with 110 at 1,1,3
5151 Id : 587, {_}: multiply (inverse (multiply ?3234 (multiply ?3232 ?3231))) (multiply ?3234 (multiply ?3232 ?3235)) =?= multiply (inverse (multiply ?3229 (multiply ?3230 ?3231))) (multiply ?3229 (multiply ?3230 ?3235)) [3230, 3229, 3235, 3231, 3232, 3234] by Super 157 with 160 at 3
5152 Id : 61, {_}: inverse (multiply (inverse (multiply ?240 (inverse (multiply (inverse (multiply ?239 ?238)) (multiply ?239 (inverse (multiply (inverse ?241) ?241))))))) (multiply ?240 ?241)) =>= multiply (inverse ?241) ?238 [241, 238, 239, 240] by Super 4 with 35 at 2,1,1,1,2
5153 Id : 4188, {_}: multiply (inverse (multiply ?29120 ?29121)) (multiply ?29120 ?29118) =?= multiply (inverse (multiply (inverse ?29118) ?29121)) (multiply (inverse ?29119) ?29119) [29119, 29118, 29121, 29120] by Super 110 with 3992 at 2,3
5154 Id : 10540, {_}: inverse (multiply (inverse (multiply ?66148 (inverse (multiply (inverse (multiply (inverse (multiply ?66144 ?66145)) (multiply ?66144 ?66146))) (multiply (inverse (multiply (inverse ?66146) ?66145)) (inverse (multiply (inverse ?66149) ?66149))))))) (multiply ?66148 ?66149)) =?= multiply (inverse ?66149) (multiply (inverse ?66147) ?66147) [66147, 66149, 66146, 66145, 66144, 66148] by Super 61 with 4188 at 1,1,1,2,1,1,1,2
5155 Id : 306, {_}: inverse (multiply (inverse (multiply ?1422 (inverse (multiply (inverse (multiply (inverse (multiply ?1421 ?1419)) (multiply ?1421 ?1420))) (multiply (inverse (multiply ?1418 ?1419)) (inverse (multiply (inverse ?1423) ?1423))))))) (multiply ?1422 ?1423)) =>= multiply (inverse ?1423) (multiply ?1418 ?1420) [1423, 1418, 1420, 1419, 1421, 1422] by Super 290 with 110 at 1,1,1,2,1,1,1,2
5156 Id : 10986, {_}: multiply (inverse ?66149) (multiply (inverse ?66146) ?66146) =?= multiply (inverse ?66149) (multiply (inverse ?66147) ?66147) [66147, 66146, 66149] by Demod 10540 with 306 at 2
5157 Id : 18, {_}: inverse (multiply (inverse (inverse (multiply (inverse (multiply ?64 ?65)) (multiply ?64 ?66)))) (multiply (inverse ?66) (inverse (multiply (inverse ?66) ?66)))) =>= ?65 [66, 65, 64] by Super 4 with 9 at 1,1,1,2
5158 Id : 20513, {_}: inverse (multiply (inverse (inverse (multiply (inverse (multiply ?122739 ?122740)) (multiply ?122739 ?122741)))) (multiply (inverse ?122741) (inverse (multiply (inverse ?122742) ?122742)))) =>= ?122740 [122742, 122741, 122740, 122739] by Super 18 with 3992 at 1,2,2,1,2
5159 Id : 23232, {_}: inverse (multiply (inverse (inverse (multiply (inverse (multiply ?138627 ?138628)) (multiply ?138627 (inverse (multiply (inverse ?138629) ?138629)))))) (multiply (inverse ?138630) ?138630)) =>= ?138628 [138630, 138629, 138628, 138627] by Super 20513 with 3992 at 2,1,2
5160 Id : 20104, {_}: multiply (inverse (multiply ?120500 (inverse (multiply (inverse (inverse ?120501)) (multiply (inverse ?120502) (inverse (multiply (inverse ?120503) ?120503))))))) (multiply ?120500 ?120502) =>= ?120501 [120503, 120502, 120501, 120500] by Super 3323 with 3992 at 1,2,2,1,2,1,1,2
5161 Id : 20225, {_}: multiply (inverse (multiply ?121420 (inverse (multiply (inverse (inverse ?121421)) (multiply (inverse ?121419) ?121419))))) (multiply ?121420 (inverse (multiply (inverse ?121422) ?121422))) =>= ?121421 [121422, 121419, 121421, 121420] by Super 20104 with 3992 at 2,1,2,1,1,2
5162 Id : 23426, {_}: inverse (multiply (inverse (inverse ?140049)) (multiply (inverse ?140053) ?140053)) =?= inverse (multiply (inverse (inverse ?140049)) (multiply (inverse ?140050) ?140050)) [140050, 140053, 140049] by Super 23232 with 20225 at 1,1,1,1,2
5163 Id : 4770, {_}: inverse (multiply (inverse (multiply ?32594 ?32595)) (multiply ?32594 ?32595)) =?= inverse (multiply (inverse ?32596) ?32596) [32596, 32595, 32594] by Super 35 with 3992 at 1,3
5164 Id : 4818, {_}: inverse (multiply (inverse (multiply (inverse ?32938) ?32938)) (multiply (inverse ?32937) ?32937)) =?= inverse (multiply (inverse ?32939) ?32939) [32939, 32937, 32938] by Super 4770 with 3992 at 2,1,2
5165 Id : 21029, {_}: inverse (multiply (inverse (multiply ?125759 (inverse (multiply (inverse ?125760) (multiply (inverse ?125761) (inverse (multiply (inverse ?125762) ?125762))))))) (multiply ?125759 ?125761)) =>= ?125760 [125762, 125761, 125760, 125759] by Super 4 with 3992 at 1,2,2,1,2,1,1,1,2
5166 Id : 21146, {_}: inverse (multiply (inverse (multiply ?126647 (inverse (multiply (inverse ?126648) (multiply (inverse ?126646) ?126646))))) (multiply ?126647 (inverse (multiply (inverse ?126649) ?126649)))) =>= ?126648 [126649, 126646, 126648, 126647] by Super 21029 with 3992 at 2,1,2,1,1,1,2
5167 Id : 26499, {_}: multiply (inverse ?155764) ?155764 =?= inverse (multiply (inverse ?155765) ?155765) [155765, 155764] by Super 4818 with 21146 at 2
5168 Id : 4144, {_}: inverse (multiply (inverse (inverse (multiply (inverse (multiply ?28920 ?28921)) (multiply ?28920 ?28918)))) (multiply (inverse ?28918) (inverse (multiply (inverse ?28919) ?28919)))) =>= ?28921 [28919, 28918, 28921, 28920] by Super 18 with 3992 at 1,2,2,1,2
5169 Id : 27501, {_}: inverse (multiply (inverse (inverse (multiply (inverse ?161353) ?161353))) (multiply (inverse (inverse (multiply (inverse ?161354) (multiply (inverse ?161355) ?161355)))) (inverse (multiply (inverse ?161356) ?161356)))) =>= ?161354 [161356, 161355, 161354, 161353] by Super 21146 with 26499 at 1,1,1,2
5170 Id : 5969, {_}: inverse (multiply (inverse (inverse (multiply (inverse ?38946) ?38946))) (multiply (inverse ?38947) (inverse (multiply (inverse ?38947) ?38947)))) =>= ?38947 [38947, 38946] by Super 18 with 3992 at 1,1,1,1,2
5171 Id : 5995, {_}: inverse (multiply (inverse (inverse (multiply (inverse ?39112) ?39112))) (multiply (inverse ?39113) (inverse (multiply (inverse ?39111) ?39111)))) =>= ?39113 [39111, 39113, 39112] by Super 5969 with 3992 at 1,2,2,1,2
5172 Id : 27636, {_}: inverse (multiply (inverse ?161354) (multiply (inverse ?161355) ?161355)) =>= ?161354 [161355, 161354] by Demod 27501 with 5995 at 2
5173 Id : 28099, {_}: inverse (multiply (inverse (multiply ?126647 ?126648)) (multiply ?126647 (inverse (multiply (inverse ?126649) ?126649)))) =>= ?126648 [126649, 126648, 126647] by Demod 21146 with 27636 at 2,1,1,1,2
5174 Id : 28101, {_}: inverse (multiply (inverse (multiply ?240 ?238)) (multiply ?240 ?241)) =>= multiply (inverse ?241) ?238 [241, 238, 240] by Demod 61 with 28099 at 2,1,1,1,2
5175 Id : 28103, {_}: inverse (multiply (inverse (multiply (inverse ?28918) ?28921)) (multiply (inverse ?28918) (inverse (multiply (inverse ?28919) ?28919)))) =>= ?28921 [28919, 28921, 28918] by Demod 4144 with 28101 at 1,1,1,2
5176 Id : 28104, {_}: multiply (inverse (inverse (multiply (inverse ?28919) ?28919))) ?28921 =>= ?28921 [28921, 28919] by Demod 28103 with 28101 at 2
5177 Id : 28383, {_}: a2 === a2 [] by Demod 27989 with 28104 at 2
5178 Id : 27989, {_}: multiply (inverse (inverse (multiply (inverse ?163408) ?163408))) a2 =>= a2 [163408] by Super 27714 with 26499 at 1,1,2
5179 Id : 27714, {_}: multiply (inverse (multiply (inverse ?162124) ?162124)) a2 =>= a2 [162124] by Super 24198 with 26499 at 1,2
5180 Id : 24198, {_}: multiply (multiply (inverse (multiply (inverse (inverse ?143636)) (multiply (inverse ?143638) ?143638))) (multiply (inverse (inverse ?143636)) (multiply (inverse ?143639) ?143639))) a2 =>= a2 [143639, 143638, 143636] by Super 11949 with 23426 at 1,1,2
5181 Id : 11949, {_}: multiply (multiply (inverse (multiply (inverse ?73741) (multiply (inverse ?73744) ?73744))) (multiply (inverse ?73741) (multiply (inverse ?73743) ?73743))) a2 =>= a2 [73743, 73744, 73741] by Super 5806 with 10986 at 2,1,2
5182 Id : 5806, {_}: multiply (multiply (inverse (multiply ?38037 (multiply (inverse ?38038) ?38038))) (multiply ?38037 (multiply (inverse ?38036) ?38036))) a2 =>= a2 [38036, 38038, 38037] by Super 4426 with 3992 at 2,2,1,2
5183 Id : 4426, {_}: multiply (multiply (inverse (multiply ?30432 (multiply ?30433 ?30431))) (multiply ?30432 (multiply ?30433 ?30431))) a2 =>= a2 [30431, 30433, 30432] by Super 4403 with 587 at 1,2
5184 Id : 4403, {_}: multiply (multiply (inverse ?30303) ?30303) a2 =>= a2 [30303] by Super 2 with 3992 at 1,2
5185 Id : 2, {_}: multiply (multiply (inverse b2) b2) a2 =>= a2 [] by prove_these_axioms_2
5186 % SZS output end CNFRefutation for GRP422-1.p
5195 prove_these_axioms_3 is 94
5204 (multiply (inverse ?3)
5205 (multiply (inverse ?4)
5206 (inverse (multiply (inverse ?4) ?4)))))))
5210 [4, 3, 2] by single_axiom ?2 ?3 ?4
5213 multiply (multiply a3 b3) c3 =>= multiply a3 (multiply b3 c3)
5214 [] by prove_these_axioms_3
5215 Found proof, 11.146148s
5216 % SZS status Unsatisfiable for GRP423-1.p
5217 % SZS output start CNFRefutation for GRP423-1.p
5218 Id : 5, {_}: inverse (multiply (inverse (multiply ?6 (inverse (multiply (inverse ?7) (multiply (inverse ?8) (inverse (multiply (inverse ?8) ?8))))))) (multiply ?6 ?8)) =>= ?7 [8, 7, 6] by single_axiom ?6 ?7 ?8
5219 Id : 4, {_}: inverse (multiply (inverse (multiply ?2 (inverse (multiply (inverse ?3) (multiply (inverse ?4) (inverse (multiply (inverse ?4) ?4))))))) (multiply ?2 ?4)) =>= ?3 [4, 3, 2] by single_axiom ?2 ?3 ?4
5220 Id : 20, {_}: inverse (multiply (inverse (multiply ?72 ?73)) (multiply ?72 ?74)) =?= multiply (inverse ?74) (inverse (multiply (inverse ?73) (multiply (inverse (inverse (multiply (inverse ?74) ?74))) (inverse (multiply (inverse (inverse (multiply (inverse ?74) ?74))) (inverse (multiply (inverse ?74) ?74))))))) [74, 73, 72] by Super 5 with 4 at 2,1,1,1,2
5221 Id : 9, {_}: inverse (multiply (inverse (multiply ?29 ?28)) (multiply ?29 ?30)) =?= multiply (inverse ?30) (inverse (multiply (inverse ?28) (multiply (inverse (inverse (multiply (inverse ?30) ?30))) (inverse (multiply (inverse (inverse (multiply (inverse ?30) ?30))) (inverse (multiply (inverse ?30) ?30))))))) [30, 28, 29] by Super 5 with 4 at 2,1,1,1,2
5222 Id : 35, {_}: inverse (multiply (inverse (multiply ?156 ?157)) (multiply ?156 ?158)) =?= inverse (multiply (inverse (multiply ?155 ?157)) (multiply ?155 ?158)) [155, 158, 157, 156] by Super 20 with 9 at 3
5223 Id : 59, {_}: inverse (multiply (inverse (multiply ?228 (inverse (multiply (inverse (multiply (inverse (multiply ?227 ?225)) (multiply ?227 ?226))) (multiply (inverse ?229) (inverse (multiply (inverse ?229) ?229))))))) (multiply ?228 ?229)) =?= multiply (inverse (multiply ?224 ?225)) (multiply ?224 ?226) [224, 229, 226, 225, 227, 228] by Super 4 with 35 at 1,1,2,1,1,1,2
5224 Id : 156, {_}: multiply (inverse (multiply ?725 ?726)) (multiply ?725 ?727) =?= multiply (inverse (multiply ?728 ?726)) (multiply ?728 ?727) [728, 727, 726, 725] by Demod 59 with 4 at 2
5225 Id : 163, {_}: multiply (inverse (multiply ?773 (multiply ?770 ?772))) (multiply ?773 ?774) =?= multiply ?771 (multiply (inverse (multiply ?770 (inverse (multiply (inverse ?771) (multiply (inverse ?772) (inverse (multiply (inverse ?772) ?772))))))) ?774) [771, 774, 772, 770, 773] by Super 156 with 4 at 1,3
5226 Id : 110, {_}: multiply (inverse (multiply ?227 ?225)) (multiply ?227 ?226) =?= multiply (inverse (multiply ?224 ?225)) (multiply ?224 ?226) [224, 226, 225, 227] by Demod 59 with 4 at 2
5227 Id : 55, {_}: inverse (multiply (inverse (multiply ?201 (inverse (multiply (inverse ?202) (multiply (inverse (multiply ?198 ?199)) (inverse (multiply (inverse (multiply ?200 ?199)) (multiply ?200 ?199)))))))) (multiply ?201 (multiply ?198 ?199))) =>= ?202 [200, 199, 198, 202, 201] by Super 4 with 35 at 2,2,1,2,1,1,1,2
5228 Id : 3142, {_}: inverse (multiply (inverse (multiply ?22079 (inverse (multiply (inverse (multiply ?22076 (multiply ?22077 ?22078))) (multiply ?22076 (inverse (multiply (inverse (multiply ?22081 (inverse (multiply (inverse (inverse ?22080)) (multiply (inverse ?22078) (inverse (multiply (inverse ?22078) ?22078))))))) (multiply ?22081 (inverse (multiply (inverse (inverse ?22080)) (multiply (inverse ?22078) (inverse (multiply (inverse ?22078) ?22078))))))))))))) (multiply ?22079 (multiply ?22077 (inverse (multiply (inverse (inverse ?22080)) (multiply (inverse ?22078) (inverse (multiply (inverse ?22078) ?22078)))))))) =>= ?22080 [22080, 22081, 22078, 22077, 22076, 22079] by Super 55 with 163 at 1,2,1,1,1,2
5229 Id : 290, {_}: inverse (multiply (inverse (multiply ?1309 (inverse (multiply (inverse (multiply ?1310 ?1311)) (multiply ?1310 (inverse (multiply (inverse ?1312) ?1312))))))) (multiply ?1309 ?1312)) =>= multiply (inverse ?1312) ?1311 [1312, 1311, 1310, 1309] by Super 4 with 35 at 2,1,1,1,2
5230 Id : 300, {_}: inverse (multiply (inverse (multiply ?1382 (inverse (multiply (inverse (multiply ?1383 ?1384)) (multiply ?1383 (inverse (multiply (inverse (multiply ?1381 ?1380)) (multiply ?1381 ?1380)))))))) (multiply ?1382 (multiply ?1379 ?1380))) =>= multiply (inverse (multiply ?1379 ?1380)) ?1384 [1379, 1380, 1381, 1384, 1383, 1382] by Super 290 with 110 at 1,2,2,1,2,1,1,1,2
5231 Id : 3323, {_}: multiply (inverse (multiply ?22077 (inverse (multiply (inverse (inverse ?22080)) (multiply (inverse ?22078) (inverse (multiply (inverse ?22078) ?22078))))))) (multiply ?22077 ?22078) =>= ?22080 [22078, 22080, 22077] by Demod 3142 with 300 at 2
5232 Id : 3887, {_}: multiply (inverse (multiply ?27309 (multiply ?27310 ?27311))) (multiply ?27309 (multiply ?27310 ?27311)) =?= multiply (inverse ?27312) ?27312 [27312, 27311, 27310, 27309] by Super 163 with 3323 at 2,3
5233 Id : 3460, {_}: multiply (inverse (multiply ?24443 (multiply ?24440 ?24442))) (multiply ?24443 (multiply ?24440 ?24442)) =?= multiply (inverse ?24441) ?24441 [24441, 24442, 24440, 24443] by Super 163 with 3323 at 2,3
5234 Id : 3992, {_}: multiply (inverse ?28111) ?28111 =?= multiply (inverse ?28115) ?28115 [28115, 28111] by Super 3887 with 3460 at 2
5235 Id : 4190, {_}: multiply (inverse (multiply ?29130 ?29128)) (multiply ?29130 ?29131) =?= multiply (inverse (multiply (inverse ?29129) ?29129)) (multiply (inverse ?29128) ?29131) [29129, 29131, 29128, 29130] by Super 110 with 3992 at 1,1,3
5236 Id : 18, {_}: inverse (multiply (inverse (inverse (multiply (inverse (multiply ?64 ?65)) (multiply ?64 ?66)))) (multiply (inverse ?66) (inverse (multiply (inverse ?66) ?66)))) =>= ?65 [66, 65, 64] by Super 4 with 9 at 1,1,1,2
5237 Id : 4144, {_}: inverse (multiply (inverse (inverse (multiply (inverse (multiply ?28920 ?28921)) (multiply ?28920 ?28918)))) (multiply (inverse ?28918) (inverse (multiply (inverse ?28919) ?28919)))) =>= ?28921 [28919, 28918, 28921, 28920] by Super 18 with 3992 at 1,2,2,1,2
5238 Id : 61, {_}: inverse (multiply (inverse (multiply ?240 (inverse (multiply (inverse (multiply ?239 ?238)) (multiply ?239 (inverse (multiply (inverse ?241) ?241))))))) (multiply ?240 ?241)) =>= multiply (inverse ?241) ?238 [241, 238, 239, 240] by Super 4 with 35 at 2,1,1,1,2
5239 Id : 14797, {_}: inverse (multiply (inverse (multiply ?88631 (inverse (multiply (inverse ?88632) (multiply (inverse ?88633) (inverse (multiply (inverse ?88634) ?88634))))))) (multiply ?88631 ?88633)) =>= ?88632 [88634, 88633, 88632, 88631] by Super 4 with 3992 at 1,2,2,1,2,1,1,1,2
5240 Id : 14914, {_}: inverse (multiply (inverse (multiply ?89519 (inverse (multiply (inverse ?89520) (multiply (inverse ?89518) ?89518))))) (multiply ?89519 (inverse (multiply (inverse ?89521) ?89521)))) =>= ?89520 [89521, 89518, 89520, 89519] by Super 14797 with 3992 at 2,1,2,1,1,1,2
5241 Id : 4605, {_}: inverse (multiply (inverse (multiply ?31655 ?31656)) (multiply ?31655 ?31656)) =?= inverse (multiply (inverse ?31657) ?31657) [31657, 31656, 31655] by Super 35 with 3992 at 1,3
5242 Id : 4653, {_}: inverse (multiply (inverse (multiply (inverse ?31999) ?31999)) (multiply (inverse ?31998) ?31998)) =?= inverse (multiply (inverse ?32000) ?32000) [32000, 31998, 31999] by Super 4605 with 3992 at 2,1,2
5243 Id : 18958, {_}: multiply (inverse ?111309) ?111309 =?= inverse (multiply (inverse ?111310) ?111310) [111310, 111309] by Super 4653 with 14914 at 2
5244 Id : 19832, {_}: inverse (multiply (inverse (inverse (multiply (inverse ?116164) ?116164))) (multiply (inverse (inverse (multiply (inverse ?116165) (multiply (inverse ?116166) ?116166)))) (inverse (multiply (inverse ?116167) ?116167)))) =>= ?116165 [116167, 116166, 116165, 116164] by Super 14914 with 18958 at 1,1,1,2
5245 Id : 5672, {_}: inverse (multiply (inverse (inverse (multiply (inverse ?37316) ?37316))) (multiply (inverse ?37317) (inverse (multiply (inverse ?37317) ?37317)))) =>= ?37317 [37317, 37316] by Super 18 with 3992 at 1,1,1,1,2
5246 Id : 5698, {_}: inverse (multiply (inverse (inverse (multiply (inverse ?37482) ?37482))) (multiply (inverse ?37483) (inverse (multiply (inverse ?37481) ?37481)))) =>= ?37483 [37481, 37483, 37482] by Super 5672 with 3992 at 1,2,2,1,2
5247 Id : 19967, {_}: inverse (multiply (inverse ?116165) (multiply (inverse ?116166) ?116166)) =>= ?116165 [116166, 116165] by Demod 19832 with 5698 at 2
5248 Id : 20043, {_}: inverse (multiply (inverse (multiply ?89519 ?89520)) (multiply ?89519 (inverse (multiply (inverse ?89521) ?89521)))) =>= ?89520 [89521, 89520, 89519] by Demod 14914 with 19967 at 2,1,1,1,2
5249 Id : 20045, {_}: inverse (multiply (inverse (multiply ?240 ?238)) (multiply ?240 ?241)) =>= multiply (inverse ?241) ?238 [241, 238, 240] by Demod 61 with 20043 at 2,1,1,1,2
5250 Id : 20047, {_}: inverse (multiply (inverse (multiply (inverse ?28918) ?28921)) (multiply (inverse ?28918) (inverse (multiply (inverse ?28919) ?28919)))) =>= ?28921 [28919, 28921, 28918] by Demod 4144 with 20045 at 1,1,1,2
5251 Id : 20048, {_}: multiply (inverse (inverse (multiply (inverse ?28919) ?28919))) ?28921 =>= ?28921 [28921, 28919] by Demod 20047 with 20045 at 2
5252 Id : 20166, {_}: multiply (inverse (multiply (inverse ?117322) ?117322)) ?117323 =>= ?117323 [117323, 117322] by Super 20048 with 19967 at 1,1,2
5253 Id : 20329, {_}: multiply (inverse (multiply ?29130 ?29128)) (multiply ?29130 ?29131) =>= multiply (inverse ?29128) ?29131 [29131, 29128, 29130] by Demod 4190 with 20166 at 3
5254 Id : 20341, {_}: multiply (inverse (multiply ?770 ?772)) ?774 =<= multiply ?771 (multiply (inverse (multiply ?770 (inverse (multiply (inverse ?771) (multiply (inverse ?772) (inverse (multiply (inverse ?772) ?772))))))) ?774) [771, 774, 772, 770] by Demod 163 with 20329 at 2
5255 Id : 20330, {_}: inverse (multiply (inverse ?238) ?241) =>= multiply (inverse ?241) ?238 [241, 238] by Demod 20045 with 20329 at 1,2
5256 Id : 20355, {_}: multiply (inverse (multiply ?770 ?772)) ?774 =<= multiply ?771 (multiply (inverse (multiply ?770 (multiply (inverse (multiply (inverse ?772) (inverse (multiply (inverse ?772) ?772)))) ?771))) ?774) [771, 774, 772, 770] by Demod 20341 with 20330 at 2,1,1,2,3
5257 Id : 20356, {_}: multiply (inverse (multiply ?770 ?772)) ?774 =<= multiply ?771 (multiply (inverse (multiply ?770 (multiply (multiply (inverse (inverse (multiply (inverse ?772) ?772))) ?772) ?771))) ?774) [771, 774, 772, 770] by Demod 20355 with 20330 at 1,2,1,1,2,3
5258 Id : 20357, {_}: multiply (inverse (multiply ?770 ?772)) ?774 =<= multiply ?771 (multiply (inverse (multiply ?770 (multiply (multiply (inverse (multiply (inverse ?772) ?772)) ?772) ?771))) ?774) [771, 774, 772, 770] by Demod 20356 with 20330 at 1,1,1,2,1,1,2,3
5259 Id : 20358, {_}: multiply (inverse (multiply ?770 ?772)) ?774 =<= multiply ?771 (multiply (inverse (multiply ?770 (multiply (multiply (multiply (inverse ?772) ?772) ?772) ?771))) ?774) [771, 774, 772, 770] by Demod 20357 with 20330 at 1,1,2,1,1,2,3
5260 Id : 20377, {_}: multiply (multiply (inverse ?117322) ?117322) ?117323 =>= ?117323 [117323, 117322] by Demod 20166 with 20330 at 1,2
5261 Id : 20385, {_}: multiply (inverse (multiply ?770 ?772)) ?774 =<= multiply ?771 (multiply (inverse (multiply ?770 (multiply ?772 ?771))) ?774) [771, 774, 772, 770] by Demod 20358 with 20377 at 1,2,1,1,2,3
5262 Id : 20405, {_}: multiply (inverse (multiply (multiply (inverse ?117787) ?117787) ?117788)) ?117789 =?= multiply ?117790 (multiply (inverse (multiply ?117788 ?117790)) ?117789) [117790, 117789, 117788, 117787] by Super 20385 with 20377 at 1,1,2,3
5263 Id : 20523, {_}: multiply (inverse ?118011) ?118012 =<= multiply ?118013 (multiply (inverse (multiply ?118011 ?118013)) ?118012) [118013, 118012, 118011] by Demod 20405 with 20377 at 1,1,2
5264 Id : 20527, {_}: multiply (inverse (inverse (multiply ?118030 ?118031))) ?118033 =<= multiply (multiply ?118030 ?118032) (multiply (inverse (multiply (inverse ?118031) ?118032)) ?118033) [118032, 118033, 118031, 118030] by Super 20523 with 20329 at 1,1,2,3
5265 Id : 20587, {_}: multiply (inverse (inverse (multiply ?118030 ?118031))) ?118033 =<= multiply (multiply ?118030 ?118032) (multiply (multiply (inverse ?118032) ?118031) ?118033) [118032, 118033, 118031, 118030] by Demod 20527 with 20330 at 1,2,3
5266 Id : 3464, {_}: multiply (inverse (multiply ?24465 (inverse (multiply (inverse (inverse ?24466)) (multiply (inverse ?24467) (inverse (multiply (inverse ?24467) ?24467))))))) (multiply ?24465 ?24467) =>= ?24466 [24467, 24466, 24465] by Demod 3142 with 300 at 2
5267 Id : 12890, {_}: multiply (inverse (inverse (multiply (inverse (multiply ?78617 (inverse ?78618))) (multiply ?78617 ?78619)))) (multiply (inverse ?78619) (inverse (multiply (inverse ?78619) ?78619))) =>= ?78618 [78619, 78618, 78617] by Super 3464 with 9 at 1,1,2
5268 Id : 13250, {_}: multiply (inverse (inverse (multiply (inverse ?80376) ?80376))) (multiply (inverse (inverse ?80377)) (inverse (multiply (inverse (inverse ?80377)) (inverse ?80377)))) =>= ?80377 [80377, 80376] by Super 12890 with 3992 at 1,1,1,2
5269 Id : 13299, {_}: multiply (inverse (inverse (multiply (inverse ?80682) ?80682))) (multiply (inverse (inverse ?80683)) (inverse (multiply (inverse ?80681) ?80681))) =>= ?80683 [80681, 80683, 80682] by Super 13250 with 3992 at 1,2,2,2
5270 Id : 209, {_}: inverse (multiply (inverse (inverse (multiply (inverse (multiply ?973 ?974)) (multiply ?973 ?975)))) (multiply (inverse ?975) (inverse (multiply (inverse ?975) ?975)))) =>= ?974 [975, 974, 973] by Super 4 with 9 at 1,1,1,2
5271 Id : 228, {_}: inverse (multiply (inverse (inverse (multiply (inverse (multiply (inverse (multiply ?1090 ?1088)) (multiply ?1090 ?1089))) (multiply (inverse (multiply ?1087 ?1088)) ?1091)))) (multiply (inverse ?1091) (inverse (multiply (inverse ?1091) ?1091)))) =>= multiply ?1087 ?1089 [1091, 1087, 1089, 1088, 1090] by Super 209 with 110 at 1,1,1,1,1,1,2
5272 Id : 20052, {_}: inverse (multiply (inverse (inverse (multiply (multiply (inverse ?1089) ?1088) (multiply (inverse (multiply ?1087 ?1088)) ?1091)))) (multiply (inverse ?1091) (inverse (multiply (inverse ?1091) ?1091)))) =>= multiply ?1087 ?1089 [1091, 1087, 1088, 1089] by Demod 228 with 20045 at 1,1,1,1,1,2
5273 Id : 87, {_}: inverse (multiply (inverse (multiply ?396 ?397)) (multiply ?396 ?398)) =?= inverse (multiply (inverse (multiply ?399 ?397)) (multiply ?399 ?398)) [399, 398, 397, 396] by Super 20 with 9 at 3
5274 Id : 92, {_}: inverse (multiply (inverse (multiply ?429 (multiply ?425 ?427))) (multiply ?429 ?430)) =?= inverse (multiply (inverse (multiply (inverse (multiply ?428 ?426)) (multiply ?428 ?427))) (multiply (inverse (multiply ?425 ?426)) ?430)) [426, 428, 430, 427, 425, 429] by Super 87 with 35 at 1,1,3
5275 Id : 20057, {_}: multiply (inverse ?430) (multiply ?425 ?427) =<= inverse (multiply (inverse (multiply (inverse (multiply ?428 ?426)) (multiply ?428 ?427))) (multiply (inverse (multiply ?425 ?426)) ?430)) [426, 428, 427, 425, 430] by Demod 92 with 20045 at 2
5276 Id : 20058, {_}: multiply (inverse ?430) (multiply ?425 ?427) =<= inverse (multiply (multiply (inverse ?427) ?426) (multiply (inverse (multiply ?425 ?426)) ?430)) [426, 427, 425, 430] by Demod 20057 with 20045 at 1,1,3
5277 Id : 20064, {_}: inverse (multiply (inverse (multiply (inverse ?1091) (multiply ?1087 ?1089))) (multiply (inverse ?1091) (inverse (multiply (inverse ?1091) ?1091)))) =>= multiply ?1087 ?1089 [1089, 1087, 1091] by Demod 20052 with 20058 at 1,1,1,2
5278 Id : 20065, {_}: multiply (inverse (inverse (multiply (inverse ?1091) ?1091))) (multiply ?1087 ?1089) =>= multiply ?1087 ?1089 [1089, 1087, 1091] by Demod 20064 with 20045 at 2
5279 Id : 20068, {_}: multiply (inverse (inverse ?80683)) (inverse (multiply (inverse ?80681) ?80681)) =>= ?80683 [80681, 80683] by Demod 13299 with 20065 at 2
5280 Id : 20372, {_}: multiply (inverse (inverse ?80683)) (multiply (inverse ?80681) ?80681) =>= ?80683 [80681, 80683] by Demod 20068 with 20330 at 2,2
5281 Id : 20427, {_}: multiply (inverse ?117788) ?117789 =<= multiply ?117790 (multiply (inverse (multiply ?117788 ?117790)) ?117789) [117790, 117789, 117788] by Demod 20405 with 20377 at 1,1,2
5282 Id : 20499, {_}: multiply (inverse ?117898) (multiply ?117898 (inverse (inverse ?117899))) =>= ?117899 [117899, 117898] by Super 20372 with 20427 at 2
5283 Id : 4166, {_}: inverse (multiply (inverse (multiply ?29022 (inverse (multiply (inverse ?29023) (multiply (inverse ?29020) (inverse (multiply (inverse ?29021) ?29021))))))) (multiply ?29022 ?29020)) =>= ?29023 [29021, 29020, 29023, 29022] by Super 4 with 3992 at 1,2,2,1,2,1,1,1,2
5284 Id : 20061, {_}: multiply (inverse ?29020) (inverse (multiply (inverse ?29023) (multiply (inverse ?29020) (inverse (multiply (inverse ?29021) ?29021))))) =>= ?29023 [29021, 29023, 29020] by Demod 4166 with 20045 at 2
5285 Id : 20368, {_}: multiply (inverse ?29020) (multiply (inverse (multiply (inverse ?29020) (inverse (multiply (inverse ?29021) ?29021)))) ?29023) =>= ?29023 [29023, 29021, 29020] by Demod 20061 with 20330 at 2,2
5286 Id : 20369, {_}: multiply (inverse ?29020) (multiply (multiply (inverse (inverse (multiply (inverse ?29021) ?29021))) ?29020) ?29023) =>= ?29023 [29023, 29021, 29020] by Demod 20368 with 20330 at 1,2,2
5287 Id : 20370, {_}: multiply (inverse ?29020) (multiply (multiply (inverse (multiply (inverse ?29021) ?29021)) ?29020) ?29023) =>= ?29023 [29023, 29021, 29020] by Demod 20369 with 20330 at 1,1,1,2,2
5288 Id : 20371, {_}: multiply (inverse ?29020) (multiply (multiply (multiply (inverse ?29021) ?29021) ?29020) ?29023) =>= ?29023 [29023, 29021, 29020] by Demod 20370 with 20330 at 1,1,2,2
5289 Id : 20379, {_}: multiply (inverse ?29020) (multiply ?29020 ?29023) =>= ?29023 [29023, 29020] by Demod 20371 with 20377 at 1,2,2
5290 Id : 20582, {_}: inverse (inverse ?117899) =>= ?117899 [117899] by Demod 20499 with 20379 at 2
5291 Id : 32543, {_}: multiply (multiply ?118030 ?118031) ?118033 =<= multiply (multiply ?118030 ?118032) (multiply (multiply (inverse ?118032) ?118031) ?118033) [118032, 118033, 118031, 118030] by Demod 20587 with 20582 at 1,2
5292 Id : 20530, {_}: multiply (inverse (multiply (inverse ?118044) ?118044)) ?118045 =?= multiply ?118046 (multiply (inverse ?118046) ?118045) [118046, 118045, 118044] by Super 20523 with 20377 at 1,1,2,3
5293 Id : 20593, {_}: multiply (multiply (inverse ?118044) ?118044) ?118045 =?= multiply ?118046 (multiply (inverse ?118046) ?118045) [118046, 118045, 118044] by Demod 20530 with 20330 at 1,2
5294 Id : 20594, {_}: ?118045 =<= multiply ?118046 (multiply (inverse ?118046) ?118045) [118046, 118045] by Demod 20593 with 20377 at 2
5295 Id : 20765, {_}: multiply (inverse ?118471) (multiply ?118472 ?118473) =<= multiply (inverse (multiply (inverse ?118472) ?118471)) ?118473 [118473, 118472, 118471] by Super 20329 with 20594 at 1,1,2
5296 Id : 20804, {_}: multiply (inverse ?118471) (multiply ?118472 ?118473) =<= multiply (multiply (inverse ?118471) ?118472) ?118473 [118473, 118472, 118471] by Demod 20765 with 20330 at 1,3
5297 Id : 32544, {_}: multiply (multiply ?118030 ?118031) ?118033 =<= multiply (multiply ?118030 ?118032) (multiply (inverse ?118032) (multiply ?118031 ?118033)) [118032, 118033, 118031, 118030] by Demod 32543 with 20804 at 2,3
5298 Id : 20531, {_}: multiply (inverse (inverse ?118048)) ?118050 =<= multiply (multiply ?118048 ?118049) (multiply (inverse ?118049) ?118050) [118049, 118050, 118048] by Super 20523 with 20379 at 1,1,2,3
5299 Id : 22088, {_}: multiply ?118048 ?118050 =<= multiply (multiply ?118048 ?118049) (multiply (inverse ?118049) ?118050) [118049, 118050, 118048] by Demod 20531 with 20582 at 1,2
5300 Id : 32545, {_}: multiply (multiply ?118030 ?118031) ?118033 =?= multiply ?118030 (multiply ?118031 ?118033) [118033, 118031, 118030] by Demod 32544 with 22088 at 3
5301 Id : 33073, {_}: multiply a3 (multiply b3 c3) === multiply a3 (multiply b3 c3) [] by Demod 2 with 32545 at 2
5302 Id : 2, {_}: multiply (multiply a3 b3) c3 =>= multiply a3 (multiply b3 c3) [] by prove_these_axioms_3
5303 % SZS output end CNFRefutation for GRP423-1.p
5312 prove_these_axioms_3 is 94
5319 (multiply (multiply ?4 (inverse ?4))
5320 (inverse (multiply ?5 (multiply ?2 ?3))))))
5323 [5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5
5326 multiply (multiply a3 b3) c3 =>= multiply a3 (multiply b3 c3)
5327 [] by prove_these_axioms_3
5328 Found proof, 19.895017s
5329 % SZS status Unsatisfiable for GRP444-1.p
5330 % SZS output start CNFRefutation for GRP444-1.p
5331 Id : 5, {_}: inverse (multiply ?7 (multiply ?8 (multiply (multiply ?9 (inverse ?9)) (inverse (multiply ?10 (multiply ?7 ?8)))))) =>= ?10 [10, 9, 8, 7] by single_axiom ?7 ?8 ?9 ?10
5332 Id : 4, {_}: inverse (multiply ?2 (multiply ?3 (multiply (multiply ?4 (inverse ?4)) (inverse (multiply ?5 (multiply ?2 ?3)))))) =>= ?5 [5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5
5333 Id : 6, {_}: inverse (multiply ?14 (multiply (multiply (multiply ?12 (inverse ?12)) (inverse (multiply ?13 (multiply ?16 ?14)))) (multiply (multiply ?15 (inverse ?15)) ?13))) =>= ?16 [15, 16, 13, 12, 14] by Super 5 with 4 at 2,2,2,1,2
5334 Id : 9, {_}: inverse (multiply (multiply (multiply ?32 (inverse ?32)) (inverse (multiply ?33 (multiply ?34 ?31)))) (multiply (multiply (multiply ?35 (inverse ?35)) ?33) (multiply (multiply ?36 (inverse ?36)) ?34))) =>= ?31 [36, 35, 31, 34, 33, 32] by Super 4 with 6 at 2,2,2,1,2
5335 Id : 11, {_}: inverse (multiply ?47 (multiply (multiply (multiply ?48 (inverse ?48)) (inverse (multiply ?49 (multiply ?50 ?47)))) (multiply (multiply ?51 (inverse ?51)) ?49))) =>= ?50 [51, 50, 49, 48, 47] by Super 5 with 4 at 2,2,2,1,2
5336 Id : 15, {_}: inverse (multiply (multiply (multiply ?82 (inverse ?82)) ?80) (multiply (multiply (multiply ?83 (inverse ?83)) ?81) (multiply (multiply ?85 (inverse ?85)) ?84))) =?= multiply (multiply ?79 (inverse ?79)) (inverse (multiply ?80 (multiply ?81 ?84))) [79, 84, 85, 81, 83, 80, 82] by Super 11 with 6 at 2,1,2,1,2
5337 Id : 70, {_}: multiply (multiply ?656 (inverse ?656)) (inverse (multiply (inverse (multiply ?653 (multiply ?655 ?657))) (multiply ?653 ?655))) =>= ?657 [657, 655, 653, 656] by Super 9 with 15 at 2
5338 Id : 7, {_}: inverse (multiply ?22 (multiply ?23 (multiply (multiply (multiply ?18 (multiply ?19 (multiply (multiply ?20 (inverse ?20)) (inverse (multiply ?21 (multiply ?18 ?19)))))) ?21) (inverse (multiply ?24 (multiply ?22 ?23)))))) =>= ?24 [24, 21, 20, 19, 18, 23, 22] by Super 5 with 4 at 2,1,2,2,1,2
5339 Id : 141, {_}: multiply (multiply ?1411 (inverse ?1411)) (inverse (multiply (inverse (multiply ?1412 (multiply ?1413 ?1414))) (multiply ?1412 ?1413))) =>= ?1414 [1414, 1413, 1412, 1411] by Super 9 with 15 at 2
5340 Id : 147, {_}: multiply (multiply ?1460 (inverse ?1460)) (inverse (multiply ?1458 (multiply ?1461 (multiply (multiply ?1456 (inverse ?1456)) (inverse (multiply ?1457 (multiply ?1458 ?1461))))))) =?= multiply (multiply ?1459 (inverse ?1459)) ?1457 [1459, 1457, 1456, 1461, 1458, 1460] by Super 141 with 6 at 1,1,2,2
5341 Id : 163, {_}: multiply (multiply ?1460 (inverse ?1460)) ?1457 =?= multiply (multiply ?1459 (inverse ?1459)) ?1457 [1459, 1457, 1460] by Demod 147 with 4 at 2,2
5342 Id : 237, {_}: inverse (multiply ?2095 (multiply ?2096 (multiply (multiply (multiply ?2097 (multiply ?2098 (multiply (multiply ?2099 (inverse ?2099)) (inverse (multiply ?2100 (multiply ?2097 ?2098)))))) ?2100) (inverse (multiply (multiply ?2094 (inverse ?2094)) (multiply ?2095 ?2096)))))) =?= multiply ?2093 (inverse ?2093) [2093, 2094, 2100, 2099, 2098, 2097, 2096, 2095] by Super 7 with 163 at 1,2,2,2,1,2
5343 Id : 290, {_}: multiply ?2094 (inverse ?2094) =?= multiply ?2093 (inverse ?2093) [2093, 2094] by Demod 237 with 7 at 2
5344 Id : 326, {_}: multiply (multiply ?2479 (inverse ?2479)) (inverse (multiply (inverse (multiply ?2477 (multiply (inverse ?2477) ?2480))) (multiply ?2478 (inverse ?2478)))) =>= ?2480 [2478, 2480, 2477, 2479] by Super 70 with 290 at 2,1,2,2
5345 Id : 328, {_}: multiply (multiply ?2489 (inverse ?2489)) (inverse (multiply (inverse (multiply ?2490 (multiply ?2488 (inverse ?2488)))) (multiply ?2490 ?2487))) =>= inverse ?2487 [2487, 2488, 2490, 2489] by Super 70 with 290 at 2,1,1,1,2,2
5346 Id : 604, {_}: inverse (multiply ?3845 (multiply ?3847 (inverse ?3847))) =?= inverse (multiply ?3845 (multiply ?3846 (inverse ?3846))) [3846, 3847, 3845] by Super 4 with 328 at 2,2,1,2
5347 Id : 792, {_}: inverse (multiply ?4988 (multiply (inverse ?4988) ?4987)) =?= inverse (multiply ?4986 (multiply (inverse ?4986) ?4987)) [4986, 4987, 4988] by Super 4 with 326 at 2,2,1,2
5348 Id : 870, {_}: inverse (multiply ?5461 (multiply ?5463 (inverse ?5463))) =?= inverse (multiply ?5462 (multiply (inverse ?5462) (inverse (inverse ?5461)))) [5462, 5463, 5461] by Super 604 with 792 at 3
5349 Id : 2786, {_}: inverse (multiply (inverse ?15453) (multiply ?15454 (multiply (multiply ?15455 (inverse ?15455)) (inverse (multiply ?15456 (multiply (inverse ?15456) ?15454)))))) =>= ?15453 [15456, 15455, 15454, 15453] by Super 6 with 326 at 1,2,1,2
5350 Id : 2859, {_}: inverse (multiply (inverse ?15956) (multiply (inverse (inverse (inverse (multiply ?15954 (multiply (inverse ?15954) ?15955))))) ?15955)) =>= ?15956 [15955, 15954, 15956] by Super 2786 with 326 at 2,2,1,2
5351 Id : 3662, {_}: inverse (multiply (inverse (inverse (inverse (multiply ?19641 (multiply (inverse ?19641) ?19642))))) (multiply ?19642 (multiply (multiply ?19643 (inverse ?19643)) ?19640))) =>= inverse ?19640 [19640, 19643, 19642, 19641] by Super 4 with 2859 at 2,2,2,1,2
5352 Id : 13794, {_}: inverse (inverse (multiply ?72764 (multiply (inverse (inverse (inverse (multiply ?72761 (multiply (inverse ?72761) ?72762))))) ?72762))) =>= ?72764 [72762, 72761, 72764] by Super 4 with 3662 at 2
5353 Id : 3676, {_}: multiply (multiply ?19736 (inverse ?19736)) (multiply (inverse (inverse (inverse (multiply ?19734 (multiply (inverse ?19734) ?19735))))) (multiply ?19737 (inverse ?19737))) =>= inverse ?19735 [19737, 19735, 19734, 19736] by Super 328 with 2859 at 2,2
5354 Id : 16741, {_}: inverse (inverse (inverse (multiply ?88187 (inverse ?88187)))) =?= multiply ?88186 (inverse ?88186) [88186, 88187] by Super 13794 with 3676 at 1,1,2
5355 Id : 17199, {_}: inverse (multiply ?90662 (multiply ?90661 (inverse ?90661))) =?= inverse (multiply ?90662 (inverse (inverse (inverse (multiply ?90660 (inverse ?90660)))))) [90660, 90661, 90662] by Super 870 with 16741 at 2,1,3
5356 Id : 3671, {_}: multiply (multiply ?19707 (inverse ?19707)) (multiply (inverse (inverse (inverse (multiply ?19705 (multiply (inverse ?19705) ?19706))))) (multiply ?19706 ?19708)) =>= ?19708 [19708, 19706, 19705, 19707] by Super 70 with 2859 at 2,2
5357 Id : 2874, {_}: inverse (multiply (inverse (multiply ?16071 (multiply (inverse ?16071) (inverse (inverse ?16069))))) (multiply ?16072 (multiply (multiply ?16073 (inverse ?16073)) (inverse (multiply ?16074 (multiply (inverse ?16074) ?16072)))))) =?= multiply ?16069 (multiply ?16070 (inverse ?16070)) [16070, 16074, 16073, 16072, 16069, 16071] by Super 2786 with 870 at 1,1,2
5358 Id : 790, {_}: inverse (multiply (inverse ?4975) (multiply ?4974 (multiply (multiply ?4976 (inverse ?4976)) (inverse (multiply ?4973 (multiply (inverse ?4973) ?4974)))))) =>= ?4975 [4973, 4976, 4974, 4975] by Super 6 with 326 at 1,2,1,2
5359 Id : 2903, {_}: multiply ?16071 (multiply (inverse ?16071) (inverse (inverse ?16069))) =?= multiply ?16069 (multiply ?16070 (inverse ?16070)) [16070, 16069, 16071] by Demod 2874 with 790 at 2
5360 Id : 17213, {_}: multiply ?90740 (inverse ?90740) =?= multiply (inverse (inverse (multiply ?90738 (inverse ?90738)))) (multiply ?90739 (inverse ?90739)) [90739, 90738, 90740] by Super 290 with 16741 at 2,3
5361 Id : 20625, {_}: multiply ?106744 (multiply (inverse ?106744) (inverse (inverse (inverse (inverse (multiply ?106742 (inverse ?106742))))))) =?= multiply ?106741 (inverse ?106741) [106741, 106742, 106744] by Super 2903 with 17213 at 3
5362 Id : 31961, {_}: multiply (multiply ?163343 (inverse ?163343)) (multiply (inverse (inverse (inverse (multiply ?163344 (multiply (inverse ?163344) ?163340))))) (multiply ?163342 (inverse ?163342))) =?= multiply (inverse ?163340) (inverse (inverse (inverse (inverse (multiply ?163341 (inverse ?163341)))))) [163341, 163342, 163340, 163344, 163343] by Super 3671 with 20625 at 2,2,2
5363 Id : 32420, {_}: inverse ?163340 =<= multiply (inverse ?163340) (inverse (inverse (inverse (inverse (multiply ?163341 (inverse ?163341)))))) [163341, 163340] by Demod 31961 with 3676 at 2
5364 Id : 32623, {_}: inverse (multiply (inverse ?166463) (multiply (inverse (inverse (inverse (multiply ?166461 (inverse ?166461))))) (inverse (inverse (inverse (inverse (multiply ?166462 (inverse ?166462)))))))) =>= ?166463 [166462, 166461, 166463] by Super 2859 with 32420 at 2,1,1,1,1,2,1,2
5365 Id : 32947, {_}: inverse (multiply (inverse ?166463) (inverse (inverse (inverse (multiply ?166461 (inverse ?166461)))))) =>= ?166463 [166461, 166463] by Demod 32623 with 32420 at 2,1,2
5366 Id : 34867, {_}: inverse (multiply (inverse ?172645) (multiply ?172647 (inverse ?172647))) =>= ?172645 [172647, 172645] by Super 17199 with 32947 at 3
5367 Id : 35297, {_}: multiply (multiply ?2479 (inverse ?2479)) (multiply ?2477 (multiply (inverse ?2477) ?2480)) =>= ?2480 [2480, 2477, 2479] by Demod 326 with 34867 at 2,2
5368 Id : 35489, {_}: inverse (multiply (inverse ?174505) (multiply ?174506 (inverse ?174506))) =>= ?174505 [174506, 174505] by Super 17199 with 32947 at 3
5369 Id : 616, {_}: multiply (multiply ?3943 (inverse ?3943)) (inverse (multiply (inverse (multiply ?3944 (multiply ?3945 (inverse ?3945)))) (multiply ?3944 ?3946))) =>= inverse ?3946 [3946, 3945, 3944, 3943] by Super 70 with 290 at 2,1,1,1,2,2
5370 Id : 619, {_}: multiply (multiply ?3962 (inverse ?3962)) (inverse (multiply (inverse (multiply ?3963 (multiply ?3964 (inverse ?3964)))) (multiply ?3961 (inverse ?3961)))) =>= inverse (inverse ?3963) [3961, 3964, 3963, 3962] by Super 616 with 290 at 2,1,2,2
5371 Id : 35296, {_}: multiply (multiply ?3962 (inverse ?3962)) (multiply ?3963 (multiply ?3964 (inverse ?3964))) =>= inverse (inverse ?3963) [3964, 3963, 3962] by Demod 619 with 34867 at 2,2
5372 Id : 35298, {_}: inverse (inverse (inverse (inverse (inverse (multiply ?19734 (multiply (inverse ?19734) ?19735)))))) =>= inverse ?19735 [19735, 19734] by Demod 3676 with 35296 at 2
5373 Id : 35615, {_}: inverse (multiply (inverse ?175100) (multiply ?175101 (inverse ?175101))) =?= inverse (inverse (inverse (inverse (multiply ?175099 (multiply (inverse ?175099) ?175100))))) [175099, 175101, 175100] by Super 35489 with 35298 at 1,1,2
5374 Id : 35759, {_}: ?175100 =<= inverse (inverse (inverse (inverse (multiply ?175099 (multiply (inverse ?175099) ?175100))))) [175099, 175100] by Demod 35615 with 34867 at 2
5375 Id : 14284, {_}: inverse (inverse (multiply ?75692 (multiply (inverse (inverse (inverse (multiply ?75693 (multiply (inverse ?75693) ?75694))))) ?75694))) =>= ?75692 [75694, 75693, 75692] by Super 4 with 3662 at 2
5376 Id : 14330, {_}: inverse (inverse (multiply ?75974 (multiply (inverse (inverse (inverse (multiply ?75975 (multiply ?75973 (inverse ?75973)))))) (inverse (inverse ?75975))))) =>= ?75974 [75973, 75975, 75974] by Super 14284 with 290 at 2,1,1,1,1,2,1,1,2
5377 Id : 36610, {_}: inverse (inverse (multiply ?177975 (multiply (inverse (inverse (inverse (multiply (inverse (inverse (inverse (multiply ?177974 (multiply (inverse ?177974) ?177973))))) (multiply ?177976 (inverse ?177976)))))) (inverse ?177973)))) =>= ?177975 [177976, 177973, 177974, 177975] by Super 14330 with 35759 at 1,2,2,1,1,2
5378 Id : 36795, {_}: inverse (inverse (multiply ?177975 (multiply (inverse (inverse (inverse (inverse (multiply ?177974 (multiply (inverse ?177974) ?177973)))))) (inverse ?177973)))) =>= ?177975 [177973, 177974, 177975] by Demod 36610 with 34867 at 1,1,1,2,1,1,2
5379 Id : 37525, {_}: inverse (inverse (multiply ?181200 (multiply ?181201 (inverse ?181201)))) =>= ?181200 [181201, 181200] by Demod 36795 with 35759 at 1,2,1,1,2
5380 Id : 37547, {_}: inverse (inverse (multiply ?181321 (multiply (inverse (inverse (multiply ?181319 (inverse ?181319)))) (multiply ?181320 (inverse ?181320))))) =>= ?181321 [181320, 181319, 181321] by Super 37525 with 16741 at 2,2,1,1,2
5381 Id : 36638, {_}: ?178102 =<= inverse (inverse (inverse (inverse (multiply ?178103 (multiply (inverse ?178103) ?178102))))) [178103, 178102] by Demod 35615 with 34867 at 2
5382 Id : 36754, {_}: multiply (inverse (inverse (multiply ?178614 (inverse ?178614)))) ?178615 =>= inverse (inverse (inverse (inverse ?178615))) [178615, 178614] by Super 36638 with 35297 at 1,1,1,1,3
5383 Id : 37663, {_}: inverse (inverse (multiply ?181321 (inverse (inverse (inverse (inverse (multiply ?181320 (inverse ?181320)))))))) =>= ?181321 [181320, 181321] by Demod 37547 with 36754 at 2,1,1,2
5384 Id : 32690, {_}: inverse ?166743 =<= multiply (inverse ?166743) (inverse (inverse (inverse (inverse (multiply ?166744 (inverse ?166744)))))) [166744, 166743] by Demod 31961 with 3676 at 2
5385 Id : 32829, {_}: inverse (multiply ?167379 (multiply ?167380 (multiply (multiply ?167381 (inverse ?167381)) (inverse (multiply ?167382 (multiply ?167379 ?167380)))))) =?= multiply ?167382 (inverse (inverse (inverse (inverse (multiply ?167383 (inverse ?167383)))))) [167383, 167382, 167381, 167380, 167379] by Super 32690 with 4 at 1,3
5386 Id : 33031, {_}: ?167382 =<= multiply ?167382 (inverse (inverse (inverse (inverse (multiply ?167383 (inverse ?167383)))))) [167383, 167382] by Demod 32829 with 4 at 2
5387 Id : 37664, {_}: inverse (inverse ?181321) =>= ?181321 [181321] by Demod 37663 with 33031 at 1,1,2
5388 Id : 37819, {_}: ?175100 =<= inverse (inverse (multiply ?175099 (multiply (inverse ?175099) ?175100))) [175099, 175100] by Demod 35759 with 37664 at 3
5389 Id : 37820, {_}: ?175100 =<= multiply ?175099 (multiply (inverse ?175099) ?175100) [175099, 175100] by Demod 37819 with 37664 at 3
5390 Id : 37837, {_}: multiply (multiply ?2479 (inverse ?2479)) ?2480 =>= ?2480 [2480, 2479] by Demod 35297 with 37820 at 2,2
5391 Id : 37843, {_}: inverse (multiply ?2 (multiply ?3 (inverse (multiply ?5 (multiply ?2 ?3))))) =>= ?5 [5, 3, 2] by Demod 4 with 37837 at 2,2,1,2
5392 Id : 37841, {_}: inverse (multiply ?14 (multiply (inverse (multiply ?13 (multiply ?16 ?14))) (multiply (multiply ?15 (inverse ?15)) ?13))) =>= ?16 [15, 16, 13, 14] by Demod 6 with 37837 at 1,2,1,2
5393 Id : 37842, {_}: inverse (multiply ?14 (multiply (inverse (multiply ?13 (multiply ?16 ?14))) ?13)) =>= ?16 [16, 13, 14] by Demod 37841 with 37837 at 2,2,1,2
5394 Id : 13762, {_}: inverse (multiply (inverse ?72514) (multiply ?72515 (multiply (multiply ?72516 (inverse ?72516)) (inverse (multiply ?72517 (multiply (inverse ?72517) ?72515)))))) =?= multiply (inverse (inverse (inverse (multiply ?72511 (multiply (inverse ?72511) ?72512))))) (multiply ?72512 (multiply (multiply ?72513 (inverse ?72513)) ?72514)) [72513, 72512, 72511, 72517, 72516, 72515, 72514] by Super 790 with 3662 at 1,1,2
5395 Id : 14092, {_}: ?72514 =<= multiply (inverse (inverse (inverse (multiply ?72511 (multiply (inverse ?72511) ?72512))))) (multiply ?72512 (multiply (multiply ?72513 (inverse ?72513)) ?72514)) [72513, 72512, 72511, 72514] by Demod 13762 with 790 at 2
5396 Id : 37791, {_}: ?72514 =<= multiply (inverse (multiply ?72511 (multiply (inverse ?72511) ?72512))) (multiply ?72512 (multiply (multiply ?72513 (inverse ?72513)) ?72514)) [72513, 72512, 72511, 72514] by Demod 14092 with 37664 at 1,3
5397 Id : 37888, {_}: ?72514 =<= multiply (inverse ?72512) (multiply ?72512 (multiply (multiply ?72513 (inverse ?72513)) ?72514)) [72513, 72512, 72514] by Demod 37791 with 37820 at 1,1,3
5398 Id : 37889, {_}: ?72514 =<= multiply (inverse ?72512) (multiply ?72512 ?72514) [72512, 72514] by Demod 37888 with 37837 at 2,2,3
5399 Id : 37945, {_}: multiply (multiply (inverse ?181731) ?181731) ?181732 =>= ?181732 [181732, 181731] by Super 37837 with 37664 at 2,1,2
5400 Id : 37993, {_}: inverse (multiply (multiply (inverse ?181852) ?181852) (multiply ?181853 (inverse (multiply ?181854 ?181853)))) =>= ?181854 [181854, 181853, 181852] by Super 37843 with 37945 at 2,1,2,2,1,2
5401 Id : 38039, {_}: inverse (multiply ?181853 (inverse (multiply ?181854 ?181853))) =>= ?181854 [181854, 181853] by Demod 37993 with 37945 at 1,2
5402 Id : 38275, {_}: inverse ?182456 =<= multiply ?182455 (inverse (multiply ?182456 ?182455)) [182455, 182456] by Super 37664 with 38039 at 1,2
5403 Id : 38457, {_}: inverse (multiply ?182870 ?182871) =<= multiply (inverse ?182871) (inverse ?182870) [182871, 182870] by Super 37889 with 38275 at 2,3
5404 Id : 38459, {_}: inverse (multiply (inverse ?182877) ?182878) =>= multiply (inverse ?182878) ?182877 [182878, 182877] by Super 38457 with 37664 at 2,3
5405 Id : 38608, {_}: multiply (inverse (multiply (inverse (multiply ?183123 (multiply ?183124 (inverse ?183122)))) ?183123)) ?183122 =>= ?183124 [183122, 183124, 183123] by Super 37842 with 38459 at 2
5406 Id : 38646, {_}: multiply (multiply (inverse ?183123) (multiply ?183123 (multiply ?183124 (inverse ?183122)))) ?183122 =>= ?183124 [183122, 183124, 183123] by Demod 38608 with 38459 at 1,2
5407 Id : 38647, {_}: multiply (multiply ?183124 (inverse ?183122)) ?183122 =>= ?183124 [183122, 183124] by Demod 38646 with 37889 at 1,2
5408 Id : 39562, {_}: inverse (multiply ?184856 (multiply ?184857 (inverse ?184858))) =>= multiply ?184858 (inverse (multiply ?184856 ?184857)) [184858, 184857, 184856] by Super 37843 with 38647 at 1,2,2,1,2
5409 Id : 39573, {_}: inverse (multiply ?184910 (inverse ?184909)) =<= multiply (multiply ?184909 ?184911) (inverse (multiply ?184910 ?184911)) [184911, 184909, 184910] by Super 39562 with 38275 at 2,1,2
5410 Id : 38360, {_}: inverse (multiply ?182630 (inverse ?182631)) =>= multiply ?182631 (inverse ?182630) [182631, 182630] by Super 37820 with 38275 at 2,3
5411 Id : 40719, {_}: multiply ?186598 (inverse ?186599) =<= multiply (multiply ?186598 ?186600) (inverse (multiply ?186599 ?186600)) [186600, 186599, 186598] by Demod 39573 with 38360 at 2
5412 Id : 37844, {_}: inverse (multiply (inverse (multiply ?33 (multiply ?34 ?31))) (multiply (multiply (multiply ?35 (inverse ?35)) ?33) (multiply (multiply ?36 (inverse ?36)) ?34))) =>= ?31 [36, 35, 31, 34, 33] by Demod 9 with 37837 at 1,1,2
5413 Id : 37845, {_}: inverse (multiply (inverse (multiply ?33 (multiply ?34 ?31))) (multiply ?33 (multiply (multiply ?36 (inverse ?36)) ?34))) =>= ?31 [36, 31, 34, 33] by Demod 37844 with 37837 at 1,2,1,2
5414 Id : 37846, {_}: inverse (multiply (inverse (multiply ?33 (multiply ?34 ?31))) (multiply ?33 ?34)) =>= ?31 [31, 34, 33] by Demod 37845 with 37837 at 2,2,1,2
5415 Id : 38597, {_}: multiply (inverse (multiply ?33 ?34)) (multiply ?33 (multiply ?34 ?31)) =>= ?31 [31, 34, 33] by Demod 37846 with 38459 at 2
5416 Id : 40727, {_}: multiply ?186633 (inverse (inverse (multiply ?186630 ?186631))) =<= multiply (multiply ?186633 (multiply ?186630 (multiply ?186631 ?186632))) (inverse ?186632) [186632, 186631, 186630, 186633] by Super 40719 with 38597 at 1,2,3
5417 Id : 40827, {_}: multiply ?186633 (multiply ?186630 ?186631) =<= multiply (multiply ?186633 (multiply ?186630 (multiply ?186631 ?186632))) (inverse ?186632) [186632, 186631, 186630, 186633] by Demod 40727 with 37664 at 2,2
5418 Id : 38369, {_}: inverse ?182667 =<= multiply ?182668 (inverse (multiply ?182667 ?182668)) [182668, 182667] by Super 37664 with 38039 at 1,2
5419 Id : 38383, {_}: inverse ?182710 =<= multiply (inverse (multiply ?182709 ?182710)) (inverse (inverse ?182709)) [182709, 182710] by Super 38369 with 38275 at 1,2,3
5420 Id : 38416, {_}: inverse ?182710 =<= multiply (inverse (multiply ?182709 ?182710)) ?182709 [182709, 182710] by Demod 38383 with 37664 at 2,3
5421 Id : 38850, {_}: inverse (multiply ?183591 (multiply ?183592 (inverse ?183590))) =>= multiply ?183590 (inverse (multiply ?183591 ?183592)) [183590, 183592, 183591] by Super 37843 with 38647 at 1,2,2,1,2
5422 Id : 39557, {_}: inverse (multiply ?184829 (inverse ?184830)) =<= multiply (multiply ?184830 (inverse (multiply ?184828 ?184829))) ?184828 [184828, 184830, 184829] by Super 38416 with 38850 at 1,3
5423 Id : 40495, {_}: multiply ?186270 (inverse ?186271) =<= multiply (multiply ?186270 (inverse (multiply ?186272 ?186271))) ?186272 [186272, 186271, 186270] by Demod 39557 with 38360 at 2
5424 Id : 38758, {_}: inverse ?183471 =<= multiply (inverse (multiply ?183472 ?183471)) ?183472 [183472, 183471] by Demod 38383 with 37664 at 2,3
5425 Id : 38773, {_}: inverse (multiply ?183521 (inverse (multiply ?183522 (multiply ?183523 ?183521)))) =>= multiply ?183522 ?183523 [183523, 183522, 183521] by Super 38758 with 37843 at 1,3
5426 Id : 38833, {_}: multiply (multiply ?183522 (multiply ?183523 ?183521)) (inverse ?183521) =>= multiply ?183522 ?183523 [183521, 183523, 183522] by Demod 38773 with 38360 at 2
5427 Id : 40530, {_}: multiply (multiply ?186419 (multiply ?186420 (multiply ?186422 ?186421))) (inverse ?186421) =>= multiply (multiply ?186419 ?186420) ?186422 [186421, 186422, 186420, 186419] by Super 40495 with 38833 at 1,3
5428 Id : 56629, {_}: multiply ?186633 (multiply ?186630 ?186631) =?= multiply (multiply ?186633 ?186630) ?186631 [186631, 186630, 186633] by Demod 40827 with 40530 at 3
5429 Id : 57301, {_}: multiply a3 (multiply b3 c3) === multiply a3 (multiply b3 c3) [] by Demod 2 with 56629 at 2
5430 Id : 2, {_}: multiply (multiply a3 b3) c3 =>= multiply a3 (multiply b3 c3) [] by prove_these_axioms_3
5431 % SZS output end CNFRefutation for GRP444-1.p
5440 prove_these_axioms_2 is 94
5445 (divide (divide ?2 ?2)
5446 (divide ?2 (divide ?3 (divide (divide (divide ?2 ?2) ?2) ?4))))
5450 [4, 3, 2] by single_axiom ?2 ?3 ?4
5452 multiply ?6 ?7 =<= divide ?6 (divide (divide ?8 ?8) ?7)
5453 [8, 7, 6] by multiply ?6 ?7 ?8
5455 inverse ?10 =<= divide (divide ?11 ?11) ?10
5456 [11, 10] by inverse ?10 ?11
5459 multiply (multiply (inverse b2) b2) a2 =>= a2
5460 [] by prove_these_axioms_2
5461 Found proof, 0.103879s
5462 % SZS status Unsatisfiable for GRP452-1.p
5463 % SZS output start CNFRefutation for GRP452-1.p
5464 Id : 39, {_}: inverse ?93 =<= divide (divide ?94 ?94) ?93 [94, 93] by inverse ?93 ?94
5465 Id : 4, {_}: divide (divide (divide ?2 ?2) (divide ?2 (divide ?3 (divide (divide (divide ?2 ?2) ?2) ?4)))) ?4 =>= ?3 [4, 3, 2] by single_axiom ?2 ?3 ?4
5466 Id : 8, {_}: inverse ?10 =<= divide (divide ?11 ?11) ?10 [11, 10] by inverse ?10 ?11
5467 Id : 6, {_}: multiply ?6 ?7 =<= divide ?6 (divide (divide ?8 ?8) ?7) [8, 7, 6] by multiply ?6 ?7 ?8
5468 Id : 33, {_}: multiply ?6 ?7 =<= divide ?6 (inverse ?7) [7, 6] by Demod 6 with 8 at 2,3
5469 Id : 45, {_}: multiply (divide ?108 ?108) ?109 =>= inverse (inverse ?109) [109, 108] by Super 33 with 8 at 3
5470 Id : 47, {_}: multiply (multiply (inverse ?114) ?114) ?115 =>= inverse (inverse ?115) [115, 114] by Super 45 with 33 at 1,2
5471 Id : 34, {_}: divide (inverse (divide ?2 (divide ?3 (divide (divide (divide ?2 ?2) ?2) ?4)))) ?4 =>= ?3 [4, 3, 2] by Demod 4 with 8 at 1,2
5472 Id : 35, {_}: divide (inverse (divide ?2 (divide ?3 (divide (inverse ?2) ?4)))) ?4 =>= ?3 [4, 3, 2] by Demod 34 with 8 at 1,2,2,1,1,2
5473 Id : 40, {_}: inverse ?97 =<= divide (inverse (divide ?96 ?96)) ?97 [96, 97] by Super 39 with 8 at 1,3
5474 Id : 52, {_}: divide (inverse (divide (divide ?127 ?127) (divide ?128 (inverse ?126)))) ?126 =>= ?128 [126, 128, 127] by Super 35 with 40 at 2,2,1,1,2
5475 Id : 62, {_}: divide (inverse (inverse (divide ?128 (inverse ?126)))) ?126 =>= ?128 [126, 128] by Demod 52 with 8 at 1,1,2
5476 Id : 63, {_}: divide (inverse (inverse (multiply ?128 ?126))) ?126 =>= ?128 [126, 128] by Demod 62 with 33 at 1,1,1,2
5477 Id : 265, {_}: divide (inverse (divide ?664 ?665)) ?666 =<= inverse (inverse (multiply ?665 (divide (inverse ?664) ?666))) [666, 665, 664] by Super 35 with 63 at 2,1,1,2
5478 Id : 269, {_}: divide (inverse (divide ?684 ?685)) (inverse ?683) =<= inverse (inverse (multiply ?685 (multiply (inverse ?684) ?683))) [683, 685, 684] by Super 265 with 33 at 2,1,1,3
5479 Id : 285, {_}: multiply (inverse (divide ?684 ?685)) ?683 =<= inverse (inverse (multiply ?685 (multiply (inverse ?684) ?683))) [683, 685, 684] by Demod 269 with 33 at 2
5480 Id : 36, {_}: multiply (divide ?82 ?82) ?83 =>= inverse (inverse ?83) [83, 82] by Super 33 with 8 at 3
5481 Id : 270, {_}: divide (inverse (divide (divide ?687 ?687) ?688)) ?689 =>= inverse (inverse (multiply ?688 (inverse ?689))) [689, 688, 687] by Super 265 with 40 at 2,1,1,3
5482 Id : 286, {_}: divide (inverse (inverse ?688)) ?689 =<= inverse (inverse (multiply ?688 (inverse ?689))) [689, 688] by Demod 270 with 8 at 1,1,2
5483 Id : 306, {_}: divide (divide (inverse (inverse ?778)) ?779) (inverse ?779) =>= ?778 [779, 778] by Super 63 with 286 at 1,2
5484 Id : 319, {_}: multiply (divide (inverse (inverse ?778)) ?779) ?779 =>= ?778 [779, 778] by Demod 306 with 33 at 2
5485 Id : 743, {_}: ?1513 =<= inverse (inverse (inverse (inverse ?1513))) [1513] by Super 36 with 319 at 2
5486 Id : 138, {_}: divide (inverse (divide ?349 ?348)) ?350 =<= inverse (inverse (multiply ?348 (divide (inverse ?349) ?350))) [350, 348, 349] by Super 35 with 63 at 2,1,1,2
5487 Id : 1751, {_}: multiply ?3407 (divide (inverse ?3408) ?3409) =<= inverse (inverse (divide (inverse (divide ?3408 ?3407)) ?3409)) [3409, 3408, 3407] by Super 743 with 138 at 1,1,3
5488 Id : 1830, {_}: multiply ?3532 (divide (inverse ?3532) ?3533) =>= inverse (inverse (inverse ?3533)) [3533, 3532] by Super 1751 with 40 at 1,1,3
5489 Id : 682, {_}: ?1380 =<= inverse (inverse (inverse (inverse ?1380))) [1380] by Super 36 with 319 at 2
5490 Id : 735, {_}: multiply ?1490 (inverse (inverse (inverse ?1489))) =>= divide ?1490 ?1489 [1489, 1490] by Super 33 with 682 at 2,3
5491 Id : 742, {_}: multiply (divide ?1510 ?1511) ?1511 =>= inverse (inverse ?1510) [1511, 1510] by Super 319 with 682 at 1,1,2
5492 Id : 868, {_}: inverse (inverse ?1672) =<= divide (divide ?1672 (inverse (inverse (inverse ?1673)))) ?1673 [1673, 1672] by Super 735 with 742 at 2
5493 Id : 1203, {_}: inverse (inverse ?2233) =<= divide (multiply ?2233 (inverse (inverse ?2234))) ?2234 [2234, 2233] by Demod 868 with 33 at 1,3
5494 Id : 55, {_}: multiply (inverse (inverse (divide ?138 ?138))) ?139 =>= inverse (inverse ?139) [139, 138] by Super 36 with 40 at 1,2
5495 Id : 1217, {_}: inverse (inverse (inverse (inverse (divide ?2285 ?2285)))) =?= divide (inverse (inverse (inverse (inverse ?2286)))) ?2286 [2286, 2285] by Super 1203 with 55 at 1,3
5496 Id : 1250, {_}: divide ?2285 ?2285 =?= divide (inverse (inverse (inverse (inverse ?2286)))) ?2286 [2286, 2285] by Demod 1217 with 682 at 2
5497 Id : 1251, {_}: divide ?2285 ?2285 =?= divide ?2286 ?2286 [2286, 2285] by Demod 1250 with 682 at 1,3
5498 Id : 1840, {_}: multiply ?3573 (divide ?3572 ?3572) =?= inverse (inverse (inverse (inverse ?3573))) [3572, 3573] by Super 1830 with 1251 at 2,2
5499 Id : 1879, {_}: multiply ?3573 (divide ?3572 ?3572) =>= ?3573 [3572, 3573] by Demod 1840 with 682 at 3
5500 Id : 1919, {_}: multiply (inverse (divide ?3678 ?3679)) (divide ?3677 ?3677) =>= inverse (inverse (multiply ?3679 (inverse ?3678))) [3677, 3679, 3678] by Super 285 with 1879 at 2,1,1,3
5501 Id : 1946, {_}: inverse (divide ?3678 ?3679) =<= inverse (inverse (multiply ?3679 (inverse ?3678))) [3679, 3678] by Demod 1919 with 1879 at 2
5502 Id : 1947, {_}: inverse (divide ?3678 ?3679) =<= divide (inverse (inverse ?3679)) ?3678 [3679, 3678] by Demod 1946 with 286 at 3
5503 Id : 1966, {_}: inverse (divide ?126 (multiply ?128 ?126)) =>= ?128 [128, 126] by Demod 63 with 1947 at 2
5504 Id : 748, {_}: multiply ?1528 (inverse ?1529) =<= inverse (inverse (divide (inverse (inverse ?1528)) ?1529)) [1529, 1528] by Super 743 with 286 at 1,1,3
5505 Id : 1970, {_}: multiply ?1528 (inverse ?1529) =<= inverse (inverse (inverse (divide ?1529 ?1528))) [1529, 1528] by Demod 748 with 1947 at 1,1,3
5506 Id : 50, {_}: inverse ?121 =<= divide (inverse (inverse (divide ?120 ?120))) ?121 [120, 121] by Super 8 with 40 at 1,3
5507 Id : 1967, {_}: inverse ?121 =<= inverse (divide ?121 (divide ?120 ?120)) [120, 121] by Demod 50 with 1947 at 3
5508 Id : 1903, {_}: divide ?3630 (divide ?3629 ?3629) =>= inverse (inverse ?3630) [3629, 3630] by Super 742 with 1879 at 2
5509 Id : 2257, {_}: inverse ?121 =<= inverse (inverse (inverse ?121)) [121] by Demod 1967 with 1903 at 1,3
5510 Id : 2261, {_}: multiply ?1528 (inverse ?1529) =<= inverse (divide ?1529 ?1528) [1529, 1528] by Demod 1970 with 2257 at 3
5511 Id : 2271, {_}: multiply (multiply ?128 ?126) (inverse ?126) =>= ?128 [126, 128] by Demod 1966 with 2261 at 2
5512 Id : 869, {_}: multiply (divide ?1675 ?1676) ?1676 =>= inverse (inverse ?1675) [1676, 1675] by Super 319 with 682 at 1,1,2
5513 Id : 873, {_}: multiply (multiply ?1689 ?1688) (inverse ?1688) =>= inverse (inverse ?1689) [1688, 1689] by Super 869 with 33 at 1,2
5514 Id : 2276, {_}: inverse (inverse ?128) =>= ?128 [128] by Demod 2271 with 873 at 2
5515 Id : 2434, {_}: a2 === a2 [] by Demod 85 with 2276 at 2
5516 Id : 85, {_}: inverse (inverse a2) =>= a2 [] by Demod 2 with 47 at 2
5517 Id : 2, {_}: multiply (multiply (inverse b2) b2) a2 =>= a2 [] by prove_these_axioms_2
5518 % SZS output end CNFRefutation for GRP452-1.p
5528 prove_these_axioms_3 is 94
5533 (divide (divide ?2 ?2)
5534 (divide ?2 (divide ?3 (divide (divide (divide ?2 ?2) ?2) ?4))))
5538 [4, 3, 2] by single_axiom ?2 ?3 ?4
5540 multiply ?6 ?7 =<= divide ?6 (divide (divide ?8 ?8) ?7)
5541 [8, 7, 6] by multiply ?6 ?7 ?8
5543 inverse ?10 =<= divide (divide ?11 ?11) ?10
5544 [11, 10] by inverse ?10 ?11
5547 multiply (multiply a3 b3) c3 =>= multiply a3 (multiply b3 c3)
5548 [] by prove_these_axioms_3
5549 Found proof, 0.111823s
5550 % SZS status Unsatisfiable for GRP453-1.p
5551 % SZS output start CNFRefutation for GRP453-1.p
5552 Id : 6, {_}: multiply ?6 ?7 =<= divide ?6 (divide (divide ?8 ?8) ?7) [8, 7, 6] by multiply ?6 ?7 ?8
5553 Id : 39, {_}: inverse ?93 =<= divide (divide ?94 ?94) ?93 [94, 93] by inverse ?93 ?94
5554 Id : 8, {_}: inverse ?10 =<= divide (divide ?11 ?11) ?10 [11, 10] by inverse ?10 ?11
5555 Id : 4, {_}: divide (divide (divide ?2 ?2) (divide ?2 (divide ?3 (divide (divide (divide ?2 ?2) ?2) ?4)))) ?4 =>= ?3 [4, 3, 2] by single_axiom ?2 ?3 ?4
5556 Id : 34, {_}: divide (inverse (divide ?2 (divide ?3 (divide (divide (divide ?2 ?2) ?2) ?4)))) ?4 =>= ?3 [4, 3, 2] by Demod 4 with 8 at 1,2
5557 Id : 35, {_}: divide (inverse (divide ?2 (divide ?3 (divide (inverse ?2) ?4)))) ?4 =>= ?3 [4, 3, 2] by Demod 34 with 8 at 1,2,2,1,1,2
5558 Id : 40, {_}: inverse ?97 =<= divide (inverse (divide ?96 ?96)) ?97 [96, 97] by Super 39 with 8 at 1,3
5559 Id : 52, {_}: divide (inverse (divide (divide ?127 ?127) (divide ?128 (inverse ?126)))) ?126 =>= ?128 [126, 128, 127] by Super 35 with 40 at 2,2,1,1,2
5560 Id : 62, {_}: divide (inverse (inverse (divide ?128 (inverse ?126)))) ?126 =>= ?128 [126, 128] by Demod 52 with 8 at 1,1,2
5561 Id : 33, {_}: multiply ?6 ?7 =<= divide ?6 (inverse ?7) [7, 6] by Demod 6 with 8 at 2,3
5562 Id : 63, {_}: divide (inverse (inverse (multiply ?128 ?126))) ?126 =>= ?128 [126, 128] by Demod 62 with 33 at 1,1,1,2
5563 Id : 264, {_}: divide (inverse (divide ?664 ?665)) ?666 =<= inverse (inverse (multiply ?665 (divide (inverse ?664) ?666))) [666, 665, 664] by Super 35 with 63 at 2,1,1,2
5564 Id : 268, {_}: divide (inverse (divide ?684 ?685)) (inverse ?683) =<= inverse (inverse (multiply ?685 (multiply (inverse ?684) ?683))) [683, 685, 684] by Super 264 with 33 at 2,1,1,3
5565 Id : 284, {_}: multiply (inverse (divide ?684 ?685)) ?683 =<= inverse (inverse (multiply ?685 (multiply (inverse ?684) ?683))) [683, 685, 684] by Demod 268 with 33 at 2
5566 Id : 269, {_}: divide (inverse (divide (divide ?687 ?687) ?688)) ?689 =>= inverse (inverse (multiply ?688 (inverse ?689))) [689, 688, 687] by Super 264 with 40 at 2,1,1,3
5567 Id : 285, {_}: divide (inverse (inverse ?688)) ?689 =<= inverse (inverse (multiply ?688 (inverse ?689))) [689, 688] by Demod 269 with 8 at 1,1,2
5568 Id : 307, {_}: divide (inverse (inverse ?786)) ?787 =<= inverse (inverse (multiply ?786 (inverse ?787))) [787, 786] by Demod 269 with 8 at 1,1,2
5569 Id : 36, {_}: multiply (divide ?82 ?82) ?83 =>= inverse (inverse ?83) [83, 82] by Super 33 with 8 at 3
5570 Id : 310, {_}: divide (inverse (inverse (divide ?798 ?798))) ?799 =>= inverse (inverse (inverse (inverse (inverse ?799)))) [799, 798] by Super 307 with 36 at 1,1,3
5571 Id : 50, {_}: inverse ?121 =<= divide (inverse (inverse (divide ?120 ?120))) ?121 [120, 121] by Super 8 with 40 at 1,3
5572 Id : 325, {_}: inverse ?799 =<= inverse (inverse (inverse (inverse (inverse ?799)))) [799] by Demod 310 with 50 at 2
5573 Id : 332, {_}: multiply ?837 (inverse (inverse (inverse (inverse ?836)))) =>= divide ?837 (inverse ?836) [836, 837] by Super 33 with 325 at 2,3
5574 Id : 354, {_}: multiply ?837 (inverse (inverse (inverse (inverse ?836)))) =>= multiply ?837 ?836 [836, 837] by Demod 332 with 33 at 3
5575 Id : 364, {_}: divide (inverse (inverse ?880)) (inverse (inverse (inverse ?881))) =>= inverse (inverse (multiply ?880 ?881)) [881, 880] by Super 285 with 354 at 1,1,3
5576 Id : 423, {_}: multiply (inverse (inverse ?880)) (inverse (inverse ?881)) =>= inverse (inverse (multiply ?880 ?881)) [881, 880] by Demod 364 with 33 at 2
5577 Id : 448, {_}: divide (inverse (inverse (inverse (inverse ?1012)))) (inverse ?1013) =>= inverse (inverse (inverse (inverse (multiply ?1012 ?1013)))) [1013, 1012] by Super 285 with 423 at 1,1,3
5578 Id : 470, {_}: multiply (inverse (inverse (inverse (inverse ?1012)))) ?1013 =>= inverse (inverse (inverse (inverse (multiply ?1012 ?1013)))) [1013, 1012] by Demod 448 with 33 at 2
5579 Id : 499, {_}: divide (inverse (inverse (inverse (inverse (inverse (inverse (multiply ?1108 ?1109))))))) ?1109 =>= inverse (inverse (inverse (inverse ?1108))) [1109, 1108] by Super 63 with 470 at 1,1,1,2
5580 Id : 519, {_}: divide (inverse (inverse (multiply ?1108 ?1109))) ?1109 =>= inverse (inverse (inverse (inverse ?1108))) [1109, 1108] by Demod 499 with 325 at 1,2
5581 Id : 571, {_}: ?1204 =<= inverse (inverse (inverse (inverse ?1204))) [1204] by Demod 519 with 63 at 2
5582 Id : 137, {_}: divide (inverse (divide ?349 ?348)) ?350 =<= inverse (inverse (multiply ?348 (divide (inverse ?349) ?350))) [350, 348, 349] by Super 35 with 63 at 2,1,1,2
5583 Id : 1535, {_}: multiply ?2972 (divide (inverse ?2973) ?2974) =<= inverse (inverse (divide (inverse (divide ?2973 ?2972)) ?2974)) [2974, 2973, 2972] by Super 571 with 137 at 1,1,3
5584 Id : 1610, {_}: multiply ?3089 (divide (inverse ?3089) ?3090) =>= inverse (inverse (inverse ?3090)) [3090, 3089] by Super 1535 with 40 at 1,1,3
5585 Id : 520, {_}: ?1108 =<= inverse (inverse (inverse (inverse ?1108))) [1108] by Demod 519 with 63 at 2
5586 Id : 565, {_}: multiply ?1187 (inverse (inverse (inverse ?1186))) =>= divide ?1187 ?1186 [1186, 1187] by Super 33 with 520 at 2,3
5587 Id : 590, {_}: divide (inverse (inverse ?1228)) (inverse (inverse ?1229)) =>= inverse (inverse (divide ?1228 ?1229)) [1229, 1228] by Super 285 with 565 at 1,1,3
5588 Id : 652, {_}: multiply (inverse (inverse ?1228)) (inverse ?1229) =>= inverse (inverse (divide ?1228 ?1229)) [1229, 1228] by Demod 590 with 33 at 2
5589 Id : 676, {_}: divide (inverse (inverse (inverse (inverse (divide ?1336 ?1337))))) (inverse ?1337) =>= inverse (inverse ?1336) [1337, 1336] by Super 63 with 652 at 1,1,1,2
5590 Id : 716, {_}: multiply (inverse (inverse (inverse (inverse (divide ?1336 ?1337))))) ?1337 =>= inverse (inverse ?1336) [1337, 1336] by Demod 676 with 33 at 2
5591 Id : 717, {_}: multiply (divide ?1336 ?1337) ?1337 =>= inverse (inverse ?1336) [1337, 1336] by Demod 716 with 520 at 1,2
5592 Id : 729, {_}: inverse (inverse ?1423) =<= divide (divide ?1423 (inverse (inverse (inverse ?1424)))) ?1424 [1424, 1423] by Super 565 with 717 at 2
5593 Id : 1120, {_}: inverse (inverse ?2062) =<= divide (multiply ?2062 (inverse (inverse ?2063))) ?2063 [2063, 2062] by Demod 729 with 33 at 1,3
5594 Id : 55, {_}: multiply (inverse (inverse (divide ?138 ?138))) ?139 =>= inverse (inverse ?139) [139, 138] by Super 36 with 40 at 1,2
5595 Id : 1134, {_}: inverse (inverse (inverse (inverse (divide ?2114 ?2114)))) =?= divide (inverse (inverse (inverse (inverse ?2115)))) ?2115 [2115, 2114] by Super 1120 with 55 at 1,3
5596 Id : 1167, {_}: divide ?2114 ?2114 =?= divide (inverse (inverse (inverse (inverse ?2115)))) ?2115 [2115, 2114] by Demod 1134 with 520 at 2
5597 Id : 1168, {_}: divide ?2114 ?2114 =?= divide ?2115 ?2115 [2115, 2114] by Demod 1167 with 520 at 1,3
5598 Id : 1620, {_}: multiply ?3130 (divide ?3129 ?3129) =>= inverse (inverse (inverse (inverse ?3130))) [3129, 3130] by Super 1610 with 1168 at 2,2
5599 Id : 1658, {_}: multiply ?3130 (divide ?3129 ?3129) =>= ?3130 [3129, 3130] by Demod 1620 with 520 at 3
5600 Id : 1679, {_}: multiply (inverse (divide ?3178 ?3179)) (divide ?3177 ?3177) =>= inverse (inverse (multiply ?3179 (inverse ?3178))) [3177, 3179, 3178] by Super 284 with 1658 at 2,1,1,3
5601 Id : 1729, {_}: inverse (divide ?3178 ?3179) =<= inverse (inverse (multiply ?3179 (inverse ?3178))) [3179, 3178] by Demod 1679 with 1658 at 2
5602 Id : 1730, {_}: inverse (divide ?3178 ?3179) =<= divide (inverse (inverse ?3179)) ?3178 [3179, 3178] by Demod 1729 with 285 at 3
5603 Id : 1760, {_}: multiply (inverse (inverse ?3336)) ?3337 =>= inverse (divide (inverse ?3337) ?3336) [3337, 3336] by Super 33 with 1730 at 3
5604 Id : 1861, {_}: multiply (inverse (divide (inverse ?3480) ?3482)) ?3481 =<= inverse (inverse (multiply ?3482 (inverse (divide (inverse ?3481) ?3480)))) [3481, 3482, 3480] by Super 284 with 1760 at 2,1,1,3
5605 Id : 1743, {_}: inverse (divide ?689 ?688) =<= inverse (inverse (multiply ?688 (inverse ?689))) [688, 689] by Demod 285 with 1730 at 2
5606 Id : 1928, {_}: multiply (inverse (divide (inverse ?3480) ?3482)) ?3481 =>= inverse (divide (divide (inverse ?3481) ?3480) ?3482) [3481, 3482, 3480] by Demod 1861 with 1743 at 3
5607 Id : 1740, {_}: inverse (divide ?126 (multiply ?128 ?126)) =>= ?128 [128, 126] by Demod 63 with 1730 at 2
5608 Id : 1855, {_}: inverse (divide ?3461 (inverse (divide (inverse ?3461) ?3460))) =>= inverse (inverse ?3460) [3460, 3461] by Super 1740 with 1760 at 2,1,2
5609 Id : 1942, {_}: inverse (multiply ?3461 (divide (inverse ?3461) ?3460)) =>= inverse (inverse ?3460) [3460, 3461] by Demod 1855 with 33 at 1,2
5610 Id : 1552, {_}: multiply ?3041 (divide (inverse ?3041) ?3042) =>= inverse (inverse (inverse ?3042)) [3042, 3041] by Super 1535 with 40 at 1,1,3
5611 Id : 1943, {_}: inverse (inverse (inverse (inverse ?3460))) =>= inverse (inverse ?3460) [3460] by Demod 1942 with 1552 at 1,2
5612 Id : 1944, {_}: ?3460 =<= inverse (inverse ?3460) [3460] by Demod 1943 with 520 at 2
5613 Id : 1988, {_}: multiply ?1187 (inverse ?1186) =>= divide ?1187 ?1186 [1186, 1187] by Demod 565 with 1944 at 2,2
5614 Id : 1992, {_}: inverse (divide ?689 ?688) =<= multiply ?688 (inverse ?689) [688, 689] by Demod 1743 with 1944 at 3
5615 Id : 1998, {_}: inverse (divide ?1186 ?1187) =>= divide ?1187 ?1186 [1187, 1186] by Demod 1988 with 1992 at 2
5616 Id : 2689, {_}: multiply (divide ?3482 (inverse ?3480)) ?3481 =<= inverse (divide (divide (inverse ?3481) ?3480) ?3482) [3481, 3480, 3482] by Demod 1928 with 1998 at 1,2
5617 Id : 2690, {_}: multiply (multiply ?3482 ?3480) ?3481 =<= inverse (divide (divide (inverse ?3481) ?3480) ?3482) [3481, 3480, 3482] by Demod 2689 with 33 at 1,2
5618 Id : 2691, {_}: multiply (multiply ?3482 ?3480) ?3481 =<= divide ?3482 (divide (inverse ?3481) ?3480) [3481, 3480, 3482] by Demod 2690 with 1998 at 3
5619 Id : 2002, {_}: divide (multiply ?128 ?126) ?126 =>= ?128 [126, 128] by Demod 1740 with 1998 at 2
5620 Id : 1619, {_}: multiply (inverse (multiply ?3126 ?3127)) ?3126 =>= inverse (inverse (inverse ?3127)) [3127, 3126] by Super 1610 with 63 at 2,2
5621 Id : 2085, {_}: multiply (inverse (multiply ?3126 ?3127)) ?3126 =>= inverse ?3127 [3127, 3126] by Demod 1619 with 1944 at 3
5622 Id : 2092, {_}: divide (inverse ?3663) ?3662 =>= inverse (multiply ?3662 ?3663) [3662, 3663] by Super 2002 with 2085 at 1,2
5623 Id : 2692, {_}: multiply (multiply ?3482 ?3480) ?3481 =<= divide ?3482 (inverse (multiply ?3480 ?3481)) [3481, 3480, 3482] by Demod 2691 with 2092 at 2,3
5624 Id : 2693, {_}: multiply (multiply ?3482 ?3480) ?3481 =?= multiply ?3482 (multiply ?3480 ?3481) [3481, 3480, 3482] by Demod 2692 with 33 at 3
5625 Id : 2797, {_}: multiply a3 (multiply b3 c3) === multiply a3 (multiply b3 c3) [] by Demod 2 with 2693 at 2
5626 Id : 2, {_}: multiply (multiply a3 b3) c3 =>= multiply a3 (multiply b3 c3) [] by prove_these_axioms_3
5627 % SZS output end CNFRefutation for GRP453-1.p
5637 prove_these_axioms_3 is 94
5641 divide (inverse (divide ?2 (divide ?3 (divide ?4 ?5))))
5642 (divide (divide ?5 ?4) ?2)
5645 [5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5
5647 multiply ?7 ?8 =<= divide ?7 (inverse ?8)
5648 [8, 7] by multiply ?7 ?8
5651 multiply (multiply a3 b3) c3 =>= multiply a3 (multiply b3 c3)
5652 [] by prove_these_axioms_3
5653 Found proof, 127.901553s
5654 % SZS status Unsatisfiable for GRP471-1.p
5655 % SZS output start CNFRefutation for GRP471-1.p
5656 Id : 7, {_}: divide (inverse (divide ?10 (divide ?11 (divide ?12 ?13)))) (divide (divide ?13 ?12) ?10) =>= ?11 [13, 12, 11, 10] by single_axiom ?10 ?11 ?12 ?13
5657 Id : 6, {_}: multiply ?7 ?8 =<= divide ?7 (inverse ?8) [8, 7] by multiply ?7 ?8
5658 Id : 4, {_}: divide (inverse (divide ?2 (divide ?3 (divide ?4 ?5)))) (divide (divide ?5 ?4) ?2) =>= ?3 [5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5
5659 Id : 466, {_}: divide (inverse (divide (inverse ?2074) (divide ?2075 (divide ?2076 ?2077)))) (multiply (divide ?2077 ?2076) ?2074) =>= ?2075 [2077, 2076, 2075, 2074] by Super 4 with 6 at 2,2
5660 Id : 2222, {_}: divide (inverse ?10322) (multiply (divide ?10323 ?10324) (divide (divide ?10324 ?10323) (divide ?10322 (divide ?10325 ?10326)))) =>= divide ?10326 ?10325 [10326, 10325, 10324, 10323, 10322] by Super 466 with 4 at 1,1,2
5661 Id : 498, {_}: divide (inverse ?2307) (multiply (divide ?2311 ?2310) (divide (divide ?2310 ?2311) (divide ?2307 (divide ?2308 ?2309)))) =>= divide ?2309 ?2308 [2309, 2308, 2310, 2311, 2307] by Super 466 with 4 at 1,1,2
5662 Id : 2240, {_}: divide (inverse ?10483) (multiply (divide ?10484 ?10485) (divide (divide ?10485 ?10484) (divide ?10483 (divide ?10482 ?10481)))) =?= divide (multiply (divide ?10479 ?10480) (divide (divide ?10480 ?10479) (divide ?10478 (divide ?10481 ?10482)))) (inverse ?10478) [10478, 10480, 10479, 10481, 10482, 10485, 10484, 10483] by Super 2222 with 498 at 2,2,2,2,2
5663 Id : 2367, {_}: divide ?10481 ?10482 =<= divide (multiply (divide ?10479 ?10480) (divide (divide ?10480 ?10479) (divide ?10478 (divide ?10481 ?10482)))) (inverse ?10478) [10478, 10480, 10479, 10482, 10481] by Demod 2240 with 498 at 2
5664 Id : 2430, {_}: divide ?11142 ?11143 =<= multiply (multiply (divide ?11144 ?11145) (divide (divide ?11145 ?11144) (divide ?11146 (divide ?11142 ?11143)))) ?11146 [11146, 11145, 11144, 11143, 11142] by Demod 2367 with 6 at 3
5665 Id : 2431, {_}: divide (inverse (divide ?11148 (divide ?11149 (divide ?11150 ?11151)))) (divide (divide ?11151 ?11150) ?11148) =?= multiply (multiply (divide ?11152 ?11153) (divide (divide ?11153 ?11152) (divide ?11154 ?11149))) ?11154 [11154, 11153, 11152, 11151, 11150, 11149, 11148] by Super 2430 with 4 at 2,2,2,1,3
5666 Id : 2616, {_}: ?11858 =<= multiply (multiply (divide ?11859 ?11860) (divide (divide ?11860 ?11859) (divide ?11861 ?11858))) ?11861 [11861, 11860, 11859, 11858] by Demod 2431 with 4 at 2
5667 Id : 2673, {_}: ?12297 =<= multiply (multiply (multiply ?12298 ?12296) (divide (divide (inverse ?12296) ?12298) (divide ?12299 ?12297))) ?12299 [12299, 12296, 12298, 12297] by Super 2616 with 6 at 1,1,3
5668 Id : 398, {_}: divide (inverse (divide ?1784 (divide ?1785 (divide (inverse ?1786) ?1787)))) (divide (multiply ?1787 ?1786) ?1784) =>= ?1785 [1787, 1786, 1785, 1784] by Super 4 with 6 at 1,2,2
5669 Id : 1221, {_}: divide (inverse (divide ?5281 (divide ?5282 (multiply (inverse ?5283) ?5284)))) (divide (multiply (inverse ?5284) ?5283) ?5281) =>= ?5282 [5284, 5283, 5282, 5281] by Super 398 with 6 at 2,2,1,1,2
5670 Id : 15, {_}: divide (inverse (divide ?58 (divide ?59 (multiply ?56 ?57)))) (divide (divide (inverse ?57) ?56) ?58) =>= ?59 [57, 56, 59, 58] by Super 4 with 6 at 2,2,1,1,2
5671 Id : 1238, {_}: divide (inverse ?5406) (divide (multiply (inverse ?5410) ?5409) (inverse (divide (multiply (inverse ?5409) ?5410) (divide ?5406 (multiply ?5407 ?5408))))) =>= divide (inverse ?5408) ?5407 [5408, 5407, 5409, 5410, 5406] by Super 1221 with 15 at 1,1,2
5672 Id : 1282, {_}: divide (inverse ?5406) (multiply (multiply (inverse ?5410) ?5409) (divide (multiply (inverse ?5409) ?5410) (divide ?5406 (multiply ?5407 ?5408)))) =>= divide (inverse ?5408) ?5407 [5408, 5407, 5409, 5410, 5406] by Demod 1238 with 6 at 2,2
5673 Id : 2872, {_}: ?12927 =<= multiply (multiply (divide (inverse ?12928) ?12929) (divide (multiply ?12929 ?12928) (divide ?12930 ?12927))) ?12930 [12930, 12929, 12928, 12927] by Super 2616 with 6 at 1,2,1,3
5674 Id : 3248, {_}: ?15081 =<= multiply (multiply (multiply (inverse ?15082) ?15083) (divide (multiply (inverse ?15083) ?15082) (divide ?15084 ?15081))) ?15084 [15084, 15083, 15082, 15081] by Super 2872 with 6 at 1,1,3
5675 Id : 10, {_}: divide (inverse (divide ?32 ?29)) (divide (divide ?33 (divide ?31 ?30)) ?32) =>= inverse (divide ?33 (divide ?29 (divide ?30 ?31))) [30, 31, 33, 29, 32] by Super 7 with 4 at 2,1,1,2
5676 Id : 22, {_}: inverse (divide ?98 (divide (divide ?101 (divide (divide ?99 ?100) ?98)) (divide ?100 ?99))) =>= ?101 [100, 99, 101, 98] by Super 4 with 10 at 2
5677 Id : 313, {_}: multiply ?1410 (divide ?1406 (divide (divide ?1407 (divide (divide ?1408 ?1409) ?1406)) (divide ?1409 ?1408))) =>= divide ?1410 ?1407 [1409, 1408, 1407, 1406, 1410] by Super 6 with 22 at 2,3
5678 Id : 13731, {_}: divide ?59402 ?59403 =<= multiply (divide (multiply (inverse ?59404) ?59405) ?59406) (divide ?59406 (divide (divide ?59403 ?59402) (multiply (inverse ?59405) ?59404))) [59406, 59405, 59404, 59403, 59402] by Super 3248 with 313 at 1,3
5679 Id : 13819, {_}: divide ?60191 ?60192 =<= multiply (multiply (multiply (inverse ?60193) ?60194) ?60190) (divide (inverse ?60190) (divide (divide ?60192 ?60191) (multiply (inverse ?60194) ?60193))) [60190, 60194, 60193, 60192, 60191] by Super 13731 with 6 at 1,3
5680 Id : 318, {_}: inverse (divide ?1446 (divide (divide ?1447 (divide (divide ?1448 ?1449) ?1446)) (divide ?1449 ?1448))) =>= ?1447 [1449, 1448, 1447, 1446] by Super 4 with 10 at 2
5681 Id : 1006, {_}: inverse (inverse (divide ?4256 (divide ?4257 (divide (inverse (divide (divide ?4258 ?4259) ?4257)) (divide ?4259 ?4258))))) =>= ?4256 [4259, 4258, 4257, 4256] by Super 318 with 10 at 1,2
5682 Id : 10788, {_}: inverse (inverse (inverse (divide ?46213 (divide ?46214 (divide ?46215 ?46216))))) =<= inverse (divide (divide (inverse (divide (divide ?46217 ?46218) (divide ?46213 (divide ?46216 ?46215)))) (divide ?46218 ?46217)) ?46214) [46218, 46217, 46216, 46215, 46214, 46213] by Super 1006 with 10 at 1,1,2
5683 Id : 31179, {_}: inverse (inverse (inverse (divide (divide ?147814 (divide (divide ?147815 ?147816) (divide ?147817 ?147818))) (divide ?147819 (divide ?147815 ?147816))))) =>= inverse (divide (divide ?147814 (divide ?147818 ?147817)) ?147819) [147819, 147818, 147817, 147816, 147815, 147814] by Super 10788 with 22 at 1,1,1,3
5684 Id : 23, {_}: divide (inverse (divide ?103 ?104)) (divide (divide ?105 (divide ?106 ?107)) ?103) =>= inverse (divide ?105 (divide ?104 (divide ?107 ?106))) [107, 106, 105, 104, 103] by Super 7 with 4 at 2,1,1,2
5685 Id : 32, {_}: divide (inverse (multiply ?171 ?170)) (divide (divide ?172 (divide ?173 ?174)) ?171) =>= inverse (divide ?172 (divide (inverse ?170) (divide ?174 ?173))) [174, 173, 172, 170, 171] by Super 23 with 6 at 1,1,2
5686 Id : 346, {_}: inverse (inverse (divide ?1643 (divide (inverse ?1642) (divide (inverse (multiply (divide ?1645 ?1644) ?1642)) (divide ?1644 ?1645))))) =>= ?1643 [1644, 1645, 1642, 1643] by Super 318 with 32 at 1,2
5687 Id : 31311, {_}: inverse (divide ?149137 (divide (divide (inverse (multiply (divide ?149135 ?149136) ?149134)) (divide ?149136 ?149135)) (divide ?149138 ?149139))) =>= inverse (divide (divide ?149137 (divide ?149139 ?149138)) (inverse ?149134)) [149139, 149138, 149134, 149136, 149135, 149137] by Super 31179 with 346 at 1,2
5688 Id : 57522, {_}: inverse (divide ?312686 (divide (divide (inverse (multiply (divide ?312687 ?312688) ?312689)) (divide ?312688 ?312687)) (divide ?312690 ?312691))) =>= inverse (multiply (divide ?312686 (divide ?312691 ?312690)) ?312689) [312691, 312690, 312689, 312688, 312687, 312686] by Demod 31311 with 6 at 1,3
5689 Id : 3434, {_}: divide ?16101 ?16102 =<= multiply (divide (divide ?16103 ?16104) ?16105) (divide ?16105 (divide (divide ?16102 ?16101) (divide ?16104 ?16103))) [16105, 16104, 16103, 16102, 16101] by Super 2430 with 313 at 1,3
5690 Id : 3646, {_}: divide (inverse ?16919) ?16920 =<= multiply (divide (divide ?16921 ?16922) ?16923) (divide ?16923 (divide (multiply ?16920 ?16919) (divide ?16922 ?16921))) [16923, 16922, 16921, 16920, 16919] by Super 3434 with 6 at 1,2,2,3
5691 Id : 3697, {_}: divide (inverse ?17353) ?17354 =<= multiply (divide (multiply ?17355 ?17352) ?17356) (divide ?17356 (divide (multiply ?17354 ?17353) (divide (inverse ?17352) ?17355))) [17356, 17352, 17355, 17354, 17353] by Super 3646 with 6 at 1,1,3
5692 Id : 154000, {_}: inverse (divide ?867821 (divide (divide (inverse (divide (inverse ?867822) ?867823)) (divide ?867824 (multiply ?867825 ?867826))) (divide ?867827 ?867828))) =>= inverse (multiply (divide ?867821 (divide ?867828 ?867827)) (divide ?867824 (divide (multiply ?867823 ?867822) (divide (inverse ?867826) ?867825)))) [867828, 867827, 867826, 867825, 867824, 867823, 867822, 867821] by Super 57522 with 3697 at 1,1,1,2,1,2
5693 Id : 412, {_}: divide (inverse ?1885) (divide (multiply ?1889 ?1888) (inverse (divide (divide (inverse ?1888) ?1889) (divide ?1885 (divide ?1886 ?1887))))) =>= divide ?1887 ?1886 [1887, 1886, 1888, 1889, 1885] by Super 398 with 4 at 1,1,2
5694 Id : 440, {_}: divide (inverse ?1885) (multiply (multiply ?1889 ?1888) (divide (divide (inverse ?1888) ?1889) (divide ?1885 (divide ?1886 ?1887)))) =>= divide ?1887 ?1886 [1887, 1886, 1888, 1889, 1885] by Demod 412 with 6 at 2,2
5695 Id : 154130, {_}: inverse (divide ?869515 (divide (divide (inverse (divide (inverse ?869516) ?869517)) (divide ?869514 ?869513)) (divide ?869518 ?869519))) =<= inverse (multiply (divide ?869515 (divide ?869519 ?869518)) (divide (inverse ?869510) (divide (multiply ?869517 ?869516) (divide (inverse (divide (divide (inverse ?869512) ?869511) (divide ?869510 (divide ?869513 ?869514)))) (multiply ?869511 ?869512))))) [869511, 869512, 869510, 869519, 869518, 869513, 869514, 869517, 869516, 869515] by Super 154000 with 440 at 2,1,2,1,2
5696 Id : 31180, {_}: inverse (inverse (inverse (divide (divide ?147825 (divide (divide (inverse (divide ?147821 (divide ?147822 (divide ?147823 ?147824)))) (divide (divide ?147824 ?147823) ?147821)) (divide ?147826 ?147827))) (divide ?147828 ?147822)))) =>= inverse (divide (divide ?147825 (divide ?147827 ?147826)) ?147828) [147828, 147827, 147826, 147824, 147823, 147822, 147821, 147825] by Super 31179 with 4 at 2,2,1,1,1,2
5697 Id : 31662, {_}: inverse (inverse (inverse (divide (divide ?150376 (divide ?150377 (divide ?150378 ?150379))) (divide ?150380 ?150377)))) =>= inverse (divide (divide ?150376 (divide ?150379 ?150378)) ?150380) [150380, 150379, 150378, 150377, 150376] by Demod 31180 with 4 at 1,2,1,1,1,1,2
5698 Id : 399, {_}: divide (inverse (divide (inverse ?1789) (divide ?1790 (divide (inverse ?1791) ?1792)))) (multiply (multiply ?1792 ?1791) ?1789) =>= ?1790 [1792, 1791, 1790, 1789] by Super 398 with 6 at 2,2
5699 Id : 31677, {_}: inverse (inverse (inverse (divide (divide ?150512 (divide (multiply (multiply ?150511 ?150510) ?150508) (divide ?150513 ?150514))) ?150509))) =<= inverse (divide (divide ?150512 (divide ?150514 ?150513)) (inverse (divide (inverse ?150508) (divide ?150509 (divide (inverse ?150510) ?150511))))) [150509, 150514, 150513, 150508, 150510, 150511, 150512] by Super 31662 with 399 at 2,1,1,1,2
5700 Id : 31809, {_}: inverse (inverse (inverse (divide (divide ?150512 (divide (multiply (multiply ?150511 ?150510) ?150508) (divide ?150513 ?150514))) ?150509))) =<= inverse (multiply (divide ?150512 (divide ?150514 ?150513)) (divide (inverse ?150508) (divide ?150509 (divide (inverse ?150510) ?150511)))) [150509, 150514, 150513, 150508, 150510, 150511, 150512] by Demod 31677 with 6 at 1,3
5701 Id : 154818, {_}: inverse (divide ?869515 (divide (divide (inverse (divide (inverse ?869516) ?869517)) (divide ?869514 ?869513)) (divide ?869518 ?869519))) =<= inverse (inverse (inverse (divide (divide ?869515 (divide (multiply (multiply (multiply ?869511 ?869512) (divide (divide (inverse ?869512) ?869511) (divide ?869510 (divide ?869513 ?869514)))) ?869510) (divide ?869518 ?869519))) (multiply ?869517 ?869516)))) [869510, 869512, 869511, 869519, 869518, 869513, 869514, 869517, 869516, 869515] by Demod 154130 with 31809 at 3
5702 Id : 155388, {_}: inverse (divide ?877204 (divide (divide (inverse (divide (inverse ?877205) ?877206)) (divide ?877207 ?877208)) (divide ?877209 ?877210))) =>= inverse (inverse (inverse (divide (divide ?877204 (divide (divide ?877208 ?877207) (divide ?877209 ?877210))) (multiply ?877206 ?877205)))) [877210, 877209, 877208, 877207, 877206, 877205, 877204] by Demod 154818 with 2673 at 1,2,1,1,1,1,3
5703 Id : 155389, {_}: inverse (divide ?877216 (divide (divide (inverse (divide (inverse ?877217) ?877218)) (divide ?877219 ?877220)) ?877213)) =<= inverse (inverse (inverse (divide (divide ?877216 (divide (divide ?877220 ?877219) (divide (inverse (divide ?877212 (divide ?877213 (divide ?877214 ?877215)))) (divide (divide ?877215 ?877214) ?877212)))) (multiply ?877218 ?877217)))) [877215, 877214, 877212, 877213, 877220, 877219, 877218, 877217, 877216] by Super 155388 with 4 at 2,2,1,2
5704 Id : 156615, {_}: inverse (divide ?885441 (divide (divide (inverse (divide (inverse ?885442) ?885443)) (divide ?885444 ?885445)) ?885446)) =>= inverse (inverse (inverse (divide (divide ?885441 (divide (divide ?885445 ?885444) ?885446)) (multiply ?885443 ?885442)))) [885446, 885445, 885444, 885443, 885442, 885441] by Demod 155389 with 4 at 2,2,1,1,1,1,3
5705 Id : 156655, {_}: inverse (divide ?885869 (divide (divide (inverse (divide ?885866 ?885870)) (divide ?885871 ?885872)) ?885873)) =<= inverse (inverse (inverse (divide (divide ?885869 (divide (divide ?885872 ?885871) ?885873)) (multiply ?885870 (divide ?885865 (divide (divide ?885866 (divide (divide ?885867 ?885868) ?885865)) (divide ?885868 ?885867))))))) [885868, 885867, 885865, 885873, 885872, 885871, 885870, 885866, 885869] by Super 156615 with 22 at 1,1,1,1,2,1,2
5706 Id : 157579, {_}: inverse (divide ?891923 (divide (divide (inverse (divide ?891924 ?891925)) (divide ?891926 ?891927)) ?891928)) =<= inverse (inverse (inverse (divide (divide ?891923 (divide (divide ?891927 ?891926) ?891928)) (divide ?891925 ?891924)))) [891928, 891927, 891926, 891925, 891924, 891923] by Demod 156655 with 313 at 2,1,1,1,3
5707 Id : 157660, {_}: inverse (divide (inverse (divide ?892784 ?892778)) (divide (divide (inverse (divide ?892781 ?892782)) (divide (divide ?892779 ?892780) ?892783)) ?892784)) =>= inverse (inverse (inverse (divide (inverse (divide ?892783 (divide ?892778 (divide ?892780 ?892779)))) (divide ?892782 ?892781)))) [892783, 892780, 892779, 892782, 892781, 892778, 892784] by Super 157579 with 10 at 1,1,1,1,3
5708 Id : 164761, {_}: inverse (inverse (divide (inverse (divide ?938345 ?938346)) (divide ?938347 (divide ?938348 (divide ?938349 ?938350))))) =<= inverse (inverse (inverse (divide (inverse (divide ?938348 (divide ?938347 (divide ?938350 ?938349)))) (divide ?938346 ?938345)))) [938350, 938349, 938348, 938347, 938346, 938345] by Demod 157660 with 10 at 1,2
5709 Id : 345, {_}: inverse (inverse (divide ?1638 (divide ?1637 (divide (inverse (divide (divide ?1640 ?1639) ?1637)) (divide ?1639 ?1640))))) =>= ?1638 [1639, 1640, 1637, 1638] by Super 318 with 10 at 1,2
5710 Id : 31310, {_}: inverse (divide ?149129 (divide (divide (inverse (divide (divide ?149127 ?149128) ?149132)) (divide ?149128 ?149127)) (divide ?149130 ?149131))) =>= inverse (divide (divide ?149129 (divide ?149131 ?149130)) ?149132) [149131, 149130, 149132, 149128, 149127, 149129] by Super 31179 with 345 at 1,2
5711 Id : 164877, {_}: inverse (inverse (divide (inverse (divide ?939554 ?939555)) (divide (divide (inverse (divide (divide ?939551 ?939552) ?939553)) (divide ?939552 ?939551)) (divide ?939556 (divide ?939557 ?939558))))) =>= inverse (inverse (inverse (divide (inverse (divide (divide ?939556 (divide ?939557 ?939558)) ?939553)) (divide ?939555 ?939554)))) [939558, 939557, 939556, 939553, 939552, 939551, 939555, 939554] by Super 164761 with 31310 at 1,1,1,1,3
5712 Id : 177719, {_}: inverse (inverse (divide (divide (inverse (divide ?1018267 ?1018268)) (divide (divide ?1018269 ?1018270) ?1018271)) ?1018272)) =<= inverse (inverse (inverse (divide (inverse (divide (divide ?1018271 (divide ?1018269 ?1018270)) ?1018272)) (divide ?1018268 ?1018267)))) [1018272, 1018271, 1018270, 1018269, 1018268, 1018267] by Demod 164877 with 31310 at 1,2
5713 Id : 177759, {_}: inverse (inverse (divide (divide (inverse (divide ?1018695 ?1018696)) (divide (divide (inverse (divide ?1018691 (divide ?1018692 (divide ?1018693 ?1018694)))) (divide (divide ?1018694 ?1018693) ?1018691)) ?1018697)) ?1018698)) =>= inverse (inverse (inverse (divide (inverse (divide (divide ?1018697 ?1018692) ?1018698)) (divide ?1018696 ?1018695)))) [1018698, 1018697, 1018694, 1018693, 1018692, 1018691, 1018696, 1018695] by Super 177719 with 4 at 2,1,1,1,1,1,1,3
5714 Id : 178625, {_}: inverse (inverse (divide (divide (inverse (divide ?1023630 ?1023631)) (divide ?1023632 ?1023633)) ?1023634)) =<= inverse (inverse (inverse (divide (inverse (divide (divide ?1023633 ?1023632) ?1023634)) (divide ?1023631 ?1023630)))) [1023634, 1023633, 1023632, 1023631, 1023630] by Demod 177759 with 4 at 1,2,1,1,1,2
5715 Id : 180647, {_}: inverse (inverse (divide (divide (inverse (divide ?1035759 ?1035760)) (divide (inverse ?1035761) ?1035762)) ?1035763)) =>= inverse (inverse (inverse (divide (inverse (divide (multiply ?1035762 ?1035761) ?1035763)) (divide ?1035760 ?1035759)))) [1035763, 1035762, 1035761, 1035760, 1035759] by Super 178625 with 6 at 1,1,1,1,1,1,3
5716 Id : 180814, {_}: inverse (inverse (divide (divide (inverse (divide ?1037589 ?1037590)) (multiply (inverse ?1037591) ?1037588)) ?1037592)) =<= inverse (inverse (inverse (divide (inverse (divide (multiply (inverse ?1037588) ?1037591) ?1037592)) (divide ?1037590 ?1037589)))) [1037592, 1037588, 1037591, 1037590, 1037589] by Super 180647 with 6 at 2,1,1,1,2
5717 Id : 187329, {_}: multiply ?1072739 (inverse (inverse (divide (inverse (divide (multiply (inverse ?1072737) ?1072736) ?1072738)) (divide ?1072735 ?1072734)))) =>= divide ?1072739 (inverse (inverse (divide (divide (inverse (divide ?1072734 ?1072735)) (multiply (inverse ?1072736) ?1072737)) ?1072738))) [1072734, 1072735, 1072738, 1072736, 1072737, 1072739] by Super 6 with 180814 at 2,3
5718 Id : 187880, {_}: multiply ?1072739 (inverse (inverse (divide (inverse (divide (multiply (inverse ?1072737) ?1072736) ?1072738)) (divide ?1072735 ?1072734)))) =>= multiply ?1072739 (inverse (divide (divide (inverse (divide ?1072734 ?1072735)) (multiply (inverse ?1072736) ?1072737)) ?1072738)) [1072734, 1072735, 1072738, 1072736, 1072737, 1072739] by Demod 187329 with 6 at 3
5719 Id : 276296, {_}: inverse (inverse (divide (inverse (divide ?1501612 (divide ?1501613 ?1501614))) (divide ?1501615 (divide ?1501612 (divide ?1501613 ?1501614))))) =>= inverse (inverse (inverse ?1501615)) [1501615, 1501614, 1501613, 1501612] by Super 164761 with 4 at 1,1,1,3
5720 Id : 276336, {_}: inverse (inverse (divide (inverse (divide (inverse (divide ?1501959 (divide ?1501956 (divide ?1501957 ?1501958)))) (divide (divide ?1501958 ?1501957) ?1501959))) (divide ?1501960 ?1501956))) =>= inverse (inverse (inverse ?1501960)) [1501960, 1501958, 1501957, 1501956, 1501959] by Super 276296 with 4 at 2,2,1,1,2
5721 Id : 277437, {_}: inverse (inverse (divide (inverse ?1506460) (divide ?1506461 ?1506460))) =>= inverse (inverse (inverse ?1506461)) [1506461, 1506460] by Demod 276336 with 4 at 1,1,1,1,2
5722 Id : 411, {_}: divide (inverse (divide ?1881 (divide ?1882 (multiply (inverse ?1883) ?1880)))) (divide (multiply (inverse ?1880) ?1883) ?1881) =>= ?1882 [1880, 1883, 1882, 1881] by Super 398 with 6 at 2,2,1,1,2
5723 Id : 277453, {_}: inverse (inverse (divide (inverse (divide (multiply (inverse ?1506555) ?1506554) ?1506552)) ?1506553)) =<= inverse (inverse (inverse (inverse (divide ?1506552 (divide ?1506553 (multiply (inverse ?1506554) ?1506555)))))) [1506553, 1506552, 1506554, 1506555] by Super 277437 with 411 at 2,1,1,2
5724 Id : 339, {_}: inverse (divide (inverse ?1603) (divide (divide ?1604 (multiply (divide ?1605 ?1606) ?1603)) (divide ?1606 ?1605))) =>= ?1604 [1606, 1605, 1604, 1603] by Super 318 with 6 at 2,1,2,1,2
5725 Id : 298734, {_}: inverse ?1602430 =<= inverse (inverse (inverse (divide ?1602430 (multiply (divide ?1602431 ?1602432) (divide ?1602432 ?1602431))))) [1602432, 1602431, 1602430] by Super 277437 with 339 at 1,2
5726 Id : 277476, {_}: inverse (inverse (divide (inverse (inverse ?1506721)) (multiply ?1506722 ?1506721))) =>= inverse (inverse (inverse ?1506722)) [1506722, 1506721] by Super 277437 with 6 at 2,1,1,2
5727 Id : 298855, {_}: inverse (inverse (inverse (divide ?1603311 ?1603310))) =<= inverse (inverse (inverse (inverse (divide ?1603310 ?1603311)))) [1603310, 1603311] by Super 298734 with 277476 at 1,3
5728 Id : 299275, {_}: inverse (inverse (divide (inverse (divide (multiply (inverse ?1506555) ?1506554) ?1506552)) ?1506553)) =>= inverse (inverse (inverse (divide (divide ?1506553 (multiply (inverse ?1506554) ?1506555)) ?1506552))) [1506553, 1506552, 1506554, 1506555] by Demod 277453 with 298855 at 3
5729 Id : 299281, {_}: multiply ?1072739 (inverse (inverse (inverse (divide (divide (divide ?1072735 ?1072734) (multiply (inverse ?1072736) ?1072737)) ?1072738)))) =>= multiply ?1072739 (inverse (divide (divide (inverse (divide ?1072734 ?1072735)) (multiply (inverse ?1072736) ?1072737)) ?1072738)) [1072738, 1072737, 1072736, 1072734, 1072735, 1072739] by Demod 187880 with 299275 at 2,2
5730 Id : 299680, {_}: inverse (inverse (inverse (divide ?1606480 ?1606481))) =<= inverse (inverse (inverse (inverse (divide ?1606481 ?1606480)))) [1606481, 1606480] by Super 298734 with 277476 at 1,3
5731 Id : 299719, {_}: inverse (inverse (inverse (divide (inverse ?1606741) ?1606742))) =>= inverse (inverse (inverse (inverse (multiply ?1606742 ?1606741)))) [1606742, 1606741] by Super 299680 with 6 at 1,1,1,1,3
5732 Id : 300712, {_}: inverse (inverse (inverse (divide ?1610501 (inverse ?1610500)))) =<= inverse (inverse (inverse (inverse (inverse (multiply ?1610501 ?1610500))))) [1610500, 1610501] by Super 298855 with 299719 at 1,3
5733 Id : 303239, {_}: inverse (inverse (inverse (multiply ?1620581 ?1620582))) =<= inverse (inverse (inverse (inverse (inverse (multiply ?1620581 ?1620582))))) [1620582, 1620581] by Demod 300712 with 6 at 1,1,1,2
5734 Id : 2523, {_}: ?11149 =<= multiply (multiply (divide ?11152 ?11153) (divide (divide ?11153 ?11152) (divide ?11154 ?11149))) ?11154 [11154, 11153, 11152, 11149] by Demod 2431 with 4 at 2
5735 Id : 303314, {_}: inverse (inverse (inverse (multiply (multiply (divide ?1621150 ?1621151) (divide (divide ?1621151 ?1621150) (divide ?1621152 ?1621149))) ?1621152))) =>= inverse (inverse (inverse (inverse (inverse ?1621149)))) [1621149, 1621152, 1621151, 1621150] by Super 303239 with 2523 at 1,1,1,1,1,3
5736 Id : 304462, {_}: inverse (inverse (inverse ?1624383)) =<= inverse (inverse (inverse (inverse (inverse ?1624383)))) [1624383] by Demod 303314 with 2523 at 1,1,1,2
5737 Id : 304463, {_}: inverse (inverse (inverse (divide ?1624385 (divide (divide ?1624386 (divide (divide ?1624387 ?1624388) ?1624385)) (divide ?1624388 ?1624387))))) =>= inverse (inverse (inverse (inverse ?1624386))) [1624388, 1624387, 1624386, 1624385] by Super 304462 with 22 at 1,1,1,1,3
5738 Id : 305044, {_}: inverse (inverse ?1624386) =<= inverse (inverse (inverse (inverse ?1624386))) [1624386] by Demod 304463 with 22 at 1,1,2
5739 Id : 309508, {_}: inverse (inverse (inverse (divide ?1603311 ?1603310))) =>= inverse (inverse (divide ?1603310 ?1603311)) [1603310, 1603311] by Demod 298855 with 305044 at 3
5740 Id : 309601, {_}: multiply ?1072739 (inverse (inverse (divide ?1072738 (divide (divide ?1072735 ?1072734) (multiply (inverse ?1072736) ?1072737))))) =<= multiply ?1072739 (inverse (divide (divide (inverse (divide ?1072734 ?1072735)) (multiply (inverse ?1072736) ?1072737)) ?1072738)) [1072737, 1072736, 1072734, 1072735, 1072738, 1072739] by Demod 299281 with 309508 at 2,2
5741 Id : 310013, {_}: inverse (inverse ?1628964) =<= inverse (inverse (inverse (inverse ?1628964))) [1628964] by Demod 304463 with 22 at 1,1,2
5742 Id : 310154, {_}: inverse (inverse (divide ?1629909 (divide ?1629910 (divide (inverse (divide (divide ?1629911 ?1629912) ?1629910)) (divide ?1629912 ?1629911))))) =>= inverse (inverse ?1629909) [1629912, 1629911, 1629910, 1629909] by Super 310013 with 345 at 1,1,3
5743 Id : 310837, {_}: ?1629909 =<= inverse (inverse ?1629909) [1629909] by Demod 310154 with 345 at 2
5744 Id : 311136, {_}: multiply ?1072739 (divide ?1072738 (divide (divide ?1072735 ?1072734) (multiply (inverse ?1072736) ?1072737))) =<= multiply ?1072739 (inverse (divide (divide (inverse (divide ?1072734 ?1072735)) (multiply (inverse ?1072736) ?1072737)) ?1072738)) [1072737, 1072736, 1072734, 1072735, 1072738, 1072739] by Demod 309601 with 310837 at 2,2
5745 Id : 299278, {_}: inverse (inverse (divide (divide (inverse (divide ?1037589 ?1037590)) (multiply (inverse ?1037591) ?1037588)) ?1037592)) =<= inverse (inverse (inverse (inverse (divide (divide (divide ?1037590 ?1037589) (multiply (inverse ?1037591) ?1037588)) ?1037592)))) [1037592, 1037588, 1037591, 1037590, 1037589] by Demod 180814 with 299275 at 1,3
5746 Id : 299285, {_}: inverse (inverse (divide (divide (inverse (divide ?1037589 ?1037590)) (multiply (inverse ?1037591) ?1037588)) ?1037592)) =>= inverse (inverse (inverse (divide ?1037592 (divide (divide ?1037590 ?1037589) (multiply (inverse ?1037591) ?1037588))))) [1037592, 1037588, 1037591, 1037590, 1037589] by Demod 299278 with 298855 at 3
5747 Id : 309533, {_}: inverse (inverse (divide (divide (inverse (divide ?1037589 ?1037590)) (multiply (inverse ?1037591) ?1037588)) ?1037592)) =>= inverse (inverse (divide (divide (divide ?1037590 ?1037589) (multiply (inverse ?1037591) ?1037588)) ?1037592)) [1037592, 1037588, 1037591, 1037590, 1037589] by Demod 299285 with 309508 at 3
5748 Id : 311173, {_}: divide (divide (inverse (divide ?1037589 ?1037590)) (multiply (inverse ?1037591) ?1037588)) ?1037592 =<= inverse (inverse (divide (divide (divide ?1037590 ?1037589) (multiply (inverse ?1037591) ?1037588)) ?1037592)) [1037592, 1037588, 1037591, 1037590, 1037589] by Demod 309533 with 310837 at 2
5749 Id : 311174, {_}: divide (divide (inverse (divide ?1037589 ?1037590)) (multiply (inverse ?1037591) ?1037588)) ?1037592 =>= divide (divide (divide ?1037590 ?1037589) (multiply (inverse ?1037591) ?1037588)) ?1037592 [1037592, 1037588, 1037591, 1037590, 1037589] by Demod 311173 with 310837 at 3
5750 Id : 311184, {_}: multiply ?1072739 (divide ?1072738 (divide (divide ?1072735 ?1072734) (multiply (inverse ?1072736) ?1072737))) =<= multiply ?1072739 (inverse (divide (divide (divide ?1072735 ?1072734) (multiply (inverse ?1072736) ?1072737)) ?1072738)) [1072737, 1072736, 1072734, 1072735, 1072738, 1072739] by Demod 311136 with 311174 at 1,2,3
5751 Id : 328, {_}: inverse (divide ?1523 (divide (divide ?1524 (divide (divide (inverse ?1522) ?1525) ?1523)) (multiply ?1525 ?1522))) =>= ?1524 [1525, 1522, 1524, 1523] by Super 318 with 6 at 2,2,1,2
5752 Id : 5095, {_}: multiply ?23662 (divide ?23663 (divide (divide ?23664 (divide (divide (inverse ?23665) ?23666) ?23663)) (multiply ?23666 ?23665))) =>= divide ?23662 ?23664 [23666, 23665, 23664, 23663, 23662] by Super 6 with 328 at 2,3
5753 Id : 5148, {_}: multiply ?24110 (inverse (divide ?24111 (divide ?24109 (divide (inverse (divide (multiply ?24113 ?24112) ?24109)) (divide (inverse ?24112) ?24113))))) =>= divide ?24110 ?24111 [24112, 24113, 24109, 24111, 24110] by Super 5095 with 10 at 2,2
5754 Id : 722, {_}: inverse (divide ?3136 (divide (divide ?3137 (divide (divide (inverse ?3138) ?3139) ?3136)) (multiply ?3139 ?3138))) =>= ?3137 [3139, 3138, 3137, 3136] by Super 318 with 6 at 2,2,1,2
5755 Id : 746, {_}: inverse (inverse (divide ?3302 (divide ?3301 (divide (inverse (divide (multiply ?3304 ?3303) ?3301)) (divide (inverse ?3303) ?3304))))) =>= ?3302 [3303, 3304, 3301, 3302] by Super 722 with 10 at 1,2
5756 Id : 311071, {_}: divide ?3302 (divide ?3301 (divide (inverse (divide (multiply ?3304 ?3303) ?3301)) (divide (inverse ?3303) ?3304))) =>= ?3302 [3303, 3304, 3301, 3302] by Demod 746 with 310837 at 2
5757 Id : 311292, {_}: multiply ?24110 (inverse ?24111) =>= divide ?24110 ?24111 [24111, 24110] by Demod 5148 with 311071 at 1,2,2
5758 Id : 311301, {_}: multiply ?1072739 (divide ?1072738 (divide (divide ?1072735 ?1072734) (multiply (inverse ?1072736) ?1072737))) =>= divide ?1072739 (divide (divide (divide ?1072735 ?1072734) (multiply (inverse ?1072736) ?1072737)) ?1072738) [1072737, 1072736, 1072734, 1072735, 1072738, 1072739] by Demod 311184 with 311292 at 3
5759 Id : 311313, {_}: divide ?60191 ?60192 =<= divide (multiply (multiply (inverse ?60193) ?60194) ?60190) (divide (divide (divide ?60192 ?60191) (multiply (inverse ?60194) ?60193)) (inverse ?60190)) [60190, 60194, 60193, 60192, 60191] by Demod 13819 with 311301 at 3
5760 Id : 311314, {_}: divide ?60191 ?60192 =<= divide (multiply (multiply (inverse ?60193) ?60194) ?60190) (multiply (divide (divide ?60192 ?60191) (multiply (inverse ?60194) ?60193)) ?60190) [60190, 60194, 60193, 60192, 60191] by Demod 311313 with 6 at 2,3
5761 Id : 54, {_}: divide (inverse (divide ?250 ?251)) (divide (divide ?252 (multiply ?253 ?254)) ?250) =>= inverse (divide ?252 (divide ?251 (divide (inverse ?254) ?253))) [254, 253, 252, 251, 250] by Super 23 with 6 at 2,1,2,2
5762 Id : 55, {_}: divide (inverse (divide (inverse ?256) ?257)) (multiply (divide ?258 (multiply ?259 ?260)) ?256) =>= inverse (divide ?258 (divide ?257 (divide (inverse ?260) ?259))) [260, 259, 258, 257, 256] by Super 54 with 6 at 2,2
5763 Id : 311016, {_}: inverse (divide ?1603311 ?1603310) =<= inverse (inverse (divide ?1603310 ?1603311)) [1603310, 1603311] by Demod 309508 with 310837 at 2
5764 Id : 311017, {_}: inverse (divide ?1603311 ?1603310) =>= divide ?1603310 ?1603311 [1603310, 1603311] by Demod 311016 with 310837 at 3
5765 Id : 311424, {_}: divide (divide ?257 (inverse ?256)) (multiply (divide ?258 (multiply ?259 ?260)) ?256) =>= inverse (divide ?258 (divide ?257 (divide (inverse ?260) ?259))) [260, 259, 258, 256, 257] by Demod 55 with 311017 at 1,2
5766 Id : 311425, {_}: divide (divide ?257 (inverse ?256)) (multiply (divide ?258 (multiply ?259 ?260)) ?256) =>= divide (divide ?257 (divide (inverse ?260) ?259)) ?258 [260, 259, 258, 256, 257] by Demod 311424 with 311017 at 3
5767 Id : 311594, {_}: divide (multiply ?257 ?256) (multiply (divide ?258 (multiply ?259 ?260)) ?256) =>= divide (divide ?257 (divide (inverse ?260) ?259)) ?258 [260, 259, 258, 256, 257] by Demod 311425 with 6 at 1,2
5768 Id : 311596, {_}: divide ?60191 ?60192 =<= divide (divide (multiply (inverse ?60193) ?60194) (divide (inverse ?60193) (inverse ?60194))) (divide ?60192 ?60191) [60194, 60193, 60192, 60191] by Demod 311314 with 311594 at 3
5769 Id : 179540, {_}: inverse (inverse (divide (divide (inverse (divide (inverse ?1029056) ?1029057)) (divide ?1029058 ?1029059)) ?1029060)) =>= inverse (inverse (inverse (divide (inverse (divide (divide ?1029059 ?1029058) ?1029060)) (multiply ?1029057 ?1029056)))) [1029060, 1029059, 1029058, 1029057, 1029056] by Super 178625 with 6 at 2,1,1,1,3
5770 Id : 186333, {_}: inverse (inverse (divide (divide (inverse (multiply (inverse ?1068110) ?1068111)) (divide ?1068112 ?1068113)) ?1068114)) =<= inverse (inverse (inverse (divide (inverse (divide (divide ?1068113 ?1068112) ?1068114)) (multiply (inverse ?1068111) ?1068110)))) [1068114, 1068113, 1068112, 1068111, 1068110] by Super 179540 with 6 at 1,1,1,1,1,2
5771 Id : 186556, {_}: inverse (inverse (divide (divide (inverse (multiply (inverse ?1070554) ?1070555)) (divide (inverse ?1070553) ?1070556)) ?1070557)) =>= inverse (inverse (inverse (divide (inverse (divide (multiply ?1070556 ?1070553) ?1070557)) (multiply (inverse ?1070555) ?1070554)))) [1070557, 1070556, 1070553, 1070555, 1070554] by Super 186333 with 6 at 1,1,1,1,1,1,3
5772 Id : 179745, {_}: inverse (inverse (divide (divide (inverse (multiply (inverse ?1031254) ?1031253)) (divide ?1031255 ?1031256)) ?1031257)) =<= inverse (inverse (inverse (divide (inverse (divide (divide ?1031256 ?1031255) ?1031257)) (multiply (inverse ?1031253) ?1031254)))) [1031257, 1031256, 1031255, 1031253, 1031254] by Super 179540 with 6 at 1,1,1,1,1,2
5773 Id : 277438, {_}: inverse (inverse (divide (inverse (divide (divide ?1506466 ?1506465) ?1506463)) ?1506464)) =<= inverse (inverse (inverse (inverse (divide ?1506463 (divide ?1506464 (divide ?1506465 ?1506466)))))) [1506464, 1506463, 1506465, 1506466] by Super 277437 with 4 at 2,1,1,2
5774 Id : 299272, {_}: inverse (inverse (divide (inverse (divide (divide ?1506466 ?1506465) ?1506463)) ?1506464)) =>= inverse (inverse (inverse (divide (divide ?1506464 (divide ?1506465 ?1506466)) ?1506463))) [1506464, 1506463, 1506465, 1506466] by Demod 277438 with 298855 at 3
5775 Id : 299290, {_}: inverse (inverse (divide (divide (inverse (multiply (inverse ?1031254) ?1031253)) (divide ?1031255 ?1031256)) ?1031257)) =<= inverse (inverse (inverse (inverse (divide (divide (multiply (inverse ?1031253) ?1031254) (divide ?1031255 ?1031256)) ?1031257)))) [1031257, 1031256, 1031255, 1031253, 1031254] by Demod 179745 with 299272 at 1,3
5776 Id : 299299, {_}: inverse (inverse (divide (divide (inverse (multiply (inverse ?1031254) ?1031253)) (divide ?1031255 ?1031256)) ?1031257)) =>= inverse (inverse (inverse (divide ?1031257 (divide (multiply (inverse ?1031253) ?1031254) (divide ?1031255 ?1031256))))) [1031257, 1031256, 1031255, 1031253, 1031254] by Demod 299290 with 298855 at 3
5777 Id : 299300, {_}: inverse (inverse (inverse (divide ?1070557 (divide (multiply (inverse ?1070555) ?1070554) (divide (inverse ?1070553) ?1070556))))) =?= inverse (inverse (inverse (divide (inverse (divide (multiply ?1070556 ?1070553) ?1070557)) (multiply (inverse ?1070555) ?1070554)))) [1070556, 1070553, 1070554, 1070555, 1070557] by Demod 186556 with 299299 at 2
5778 Id : 300336, {_}: inverse (inverse (inverse (divide ?1070557 (divide (multiply (inverse ?1070555) ?1070554) (divide (inverse ?1070553) ?1070556))))) =>= inverse (inverse (inverse (inverse (multiply (multiply (inverse ?1070555) ?1070554) (divide (multiply ?1070556 ?1070553) ?1070557))))) [1070556, 1070553, 1070554, 1070555, 1070557] by Demod 299300 with 299719 at 3
5779 Id : 309498, {_}: inverse (inverse (inverse (divide ?1070557 (divide (multiply (inverse ?1070555) ?1070554) (divide (inverse ?1070553) ?1070556))))) =>= inverse (inverse (multiply (multiply (inverse ?1070555) ?1070554) (divide (multiply ?1070556 ?1070553) ?1070557))) [1070556, 1070553, 1070554, 1070555, 1070557] by Demod 300336 with 305044 at 3
5780 Id : 309684, {_}: inverse (inverse (divide (divide (multiply (inverse ?1070555) ?1070554) (divide (inverse ?1070553) ?1070556)) ?1070557)) =>= inverse (inverse (multiply (multiply (inverse ?1070555) ?1070554) (divide (multiply ?1070556 ?1070553) ?1070557))) [1070557, 1070556, 1070553, 1070554, 1070555] by Demod 309498 with 309508 at 2
5781 Id : 311181, {_}: divide (divide (multiply (inverse ?1070555) ?1070554) (divide (inverse ?1070553) ?1070556)) ?1070557 =<= inverse (inverse (multiply (multiply (inverse ?1070555) ?1070554) (divide (multiply ?1070556 ?1070553) ?1070557))) [1070557, 1070556, 1070553, 1070554, 1070555] by Demod 309684 with 310837 at 2
5782 Id : 311182, {_}: divide (divide (multiply (inverse ?1070555) ?1070554) (divide (inverse ?1070553) ?1070556)) ?1070557 =>= multiply (multiply (inverse ?1070555) ?1070554) (divide (multiply ?1070556 ?1070553) ?1070557) [1070557, 1070556, 1070553, 1070554, 1070555] by Demod 311181 with 310837 at 3
5783 Id : 311600, {_}: divide ?60191 ?60192 =<= multiply (multiply (inverse ?60193) ?60194) (divide (multiply (inverse ?60194) ?60193) (divide ?60192 ?60191)) [60194, 60193, 60192, 60191] by Demod 311596 with 311182 at 3
5784 Id : 311603, {_}: divide (inverse ?5406) (divide (multiply ?5407 ?5408) ?5406) =>= divide (inverse ?5408) ?5407 [5408, 5407, 5406] by Demod 1282 with 311600 at 2,2
5785 Id : 276834, {_}: inverse (inverse (divide (inverse ?1501956) (divide ?1501960 ?1501956))) =>= inverse (inverse (inverse ?1501960)) [1501960, 1501956] by Demod 276336 with 4 at 1,1,1,1,2
5786 Id : 311035, {_}: divide (inverse ?1501956) (divide ?1501960 ?1501956) =>= inverse (inverse (inverse ?1501960)) [1501960, 1501956] by Demod 276834 with 310837 at 2
5787 Id : 311036, {_}: divide (inverse ?1501956) (divide ?1501960 ?1501956) =>= inverse ?1501960 [1501960, 1501956] by Demod 311035 with 310837 at 3
5788 Id : 311604, {_}: inverse (multiply ?5407 ?5408) =<= divide (inverse ?5408) ?5407 [5408, 5407] by Demod 311603 with 311036 at 2
5789 Id : 311708, {_}: ?12297 =<= multiply (multiply (multiply ?12298 ?12296) (divide (inverse (multiply ?12298 ?12296)) (divide ?12299 ?12297))) ?12299 [12299, 12296, 12298, 12297] by Demod 2673 with 311604 at 1,2,1,3
5790 Id : 311709, {_}: ?12297 =<= multiply (multiply (multiply ?12298 ?12296) (inverse (multiply (divide ?12299 ?12297) (multiply ?12298 ?12296)))) ?12299 [12299, 12296, 12298, 12297] by Demod 311708 with 311604 at 2,1,3
5791 Id : 311866, {_}: ?12297 =<= multiply (divide (multiply ?12298 ?12296) (multiply (divide ?12299 ?12297) (multiply ?12298 ?12296))) ?12299 [12299, 12296, 12298, 12297] by Demod 311709 with 311292 at 1,3
5792 Id : 311110, {_}: divide (inverse (inverse ?1506721)) (multiply ?1506722 ?1506721) =>= inverse (inverse (inverse ?1506722)) [1506722, 1506721] by Demod 277476 with 310837 at 2
5793 Id : 311111, {_}: divide ?1506721 (multiply ?1506722 ?1506721) =>= inverse (inverse (inverse ?1506722)) [1506722, 1506721] by Demod 311110 with 310837 at 1,2
5794 Id : 311112, {_}: divide ?1506721 (multiply ?1506722 ?1506721) =>= inverse ?1506722 [1506722, 1506721] by Demod 311111 with 310837 at 3
5795 Id : 311867, {_}: ?12297 =<= multiply (inverse (divide ?12299 ?12297)) ?12299 [12299, 12297] by Demod 311866 with 311112 at 1,3
5796 Id : 311868, {_}: ?12297 =<= multiply (divide ?12297 ?12299) ?12299 [12299, 12297] by Demod 311867 with 311017 at 1,3
5797 Id : 31329, {_}: inverse (inverse (inverse (divide (divide ?147825 (divide ?147822 (divide ?147826 ?147827))) (divide ?147828 ?147822)))) =>= inverse (divide (divide ?147825 (divide ?147827 ?147826)) ?147828) [147828, 147827, 147826, 147822, 147825] by Demod 31180 with 4 at 1,2,1,1,1,1,2
5798 Id : 31603, {_}: multiply ?149797 (inverse (inverse (divide (divide ?149792 (divide ?149793 (divide ?149794 ?149795))) (divide ?149796 ?149793)))) =>= divide ?149797 (inverse (divide (divide ?149792 (divide ?149795 ?149794)) ?149796)) [149796, 149795, 149794, 149793, 149792, 149797] by Super 6 with 31329 at 2,3
5799 Id : 33302, {_}: multiply ?159935 (inverse (inverse (divide (divide ?159936 (divide ?159937 (divide ?159938 ?159939))) (divide ?159940 ?159937)))) =>= multiply ?159935 (divide (divide ?159936 (divide ?159939 ?159938)) ?159940) [159940, 159939, 159938, 159937, 159936, 159935] by Demod 31603 with 6 at 3
5800 Id : 33303, {_}: multiply ?159946 (inverse (inverse (divide (divide ?159947 (divide (divide (divide ?159945 ?159944) ?159942) (divide ?159948 ?159949))) ?159943))) =>= multiply ?159946 (divide (divide ?159947 (divide ?159949 ?159948)) (inverse (divide ?159942 (divide ?159943 (divide ?159944 ?159945))))) [159943, 159949, 159948, 159942, 159944, 159945, 159947, 159946] by Super 33302 with 4 at 2,1,1,2,2
5801 Id : 33719, {_}: multiply ?159946 (inverse (inverse (divide (divide ?159947 (divide (divide (divide ?159945 ?159944) ?159942) (divide ?159948 ?159949))) ?159943))) =>= multiply ?159946 (multiply (divide ?159947 (divide ?159949 ?159948)) (divide ?159942 (divide ?159943 (divide ?159944 ?159945)))) [159943, 159949, 159948, 159942, 159944, 159945, 159947, 159946] by Demod 33303 with 6 at 2,3
5802 Id : 311080, {_}: multiply ?159946 (divide (divide ?159947 (divide (divide (divide ?159945 ?159944) ?159942) (divide ?159948 ?159949))) ?159943) =<= multiply ?159946 (multiply (divide ?159947 (divide ?159949 ?159948)) (divide ?159942 (divide ?159943 (divide ?159944 ?159945)))) [159943, 159949, 159948, 159942, 159944, 159945, 159947, 159946] by Demod 33719 with 310837 at 2,2
5803 Id : 158025, {_}: inverse (inverse (divide (inverse (divide ?892781 ?892782)) (divide ?892778 (divide ?892783 (divide ?892779 ?892780))))) =<= inverse (inverse (inverse (divide (inverse (divide ?892783 (divide ?892778 (divide ?892780 ?892779)))) (divide ?892782 ?892781)))) [892780, 892779, 892783, 892778, 892782, 892781] by Demod 157660 with 10 at 1,2
5804 Id : 300347, {_}: inverse (inverse (divide (inverse (divide ?892781 ?892782)) (divide ?892778 (divide ?892783 (divide ?892779 ?892780))))) =<= inverse (inverse (inverse (inverse (multiply (divide ?892782 ?892781) (divide ?892783 (divide ?892778 (divide ?892780 ?892779))))))) [892780, 892779, 892783, 892778, 892782, 892781] by Demod 158025 with 299719 at 3
5805 Id : 309517, {_}: inverse (inverse (divide (inverse (divide ?892781 ?892782)) (divide ?892778 (divide ?892783 (divide ?892779 ?892780))))) =>= inverse (inverse (multiply (divide ?892782 ?892781) (divide ?892783 (divide ?892778 (divide ?892780 ?892779))))) [892780, 892779, 892783, 892778, 892782, 892781] by Demod 300347 with 305044 at 3
5806 Id : 311023, {_}: divide (inverse (divide ?892781 ?892782)) (divide ?892778 (divide ?892783 (divide ?892779 ?892780))) =<= inverse (inverse (multiply (divide ?892782 ?892781) (divide ?892783 (divide ?892778 (divide ?892780 ?892779))))) [892780, 892779, 892783, 892778, 892782, 892781] by Demod 309517 with 310837 at 2
5807 Id : 311024, {_}: divide (inverse (divide ?892781 ?892782)) (divide ?892778 (divide ?892783 (divide ?892779 ?892780))) =>= multiply (divide ?892782 ?892781) (divide ?892783 (divide ?892778 (divide ?892780 ?892779))) [892780, 892779, 892783, 892778, 892782, 892781] by Demod 311023 with 310837 at 3
5808 Id : 311478, {_}: divide (divide ?892782 ?892781) (divide ?892778 (divide ?892783 (divide ?892779 ?892780))) =<= multiply (divide ?892782 ?892781) (divide ?892783 (divide ?892778 (divide ?892780 ?892779))) [892780, 892779, 892783, 892778, 892781, 892782] by Demod 311024 with 311017 at 1,2
5809 Id : 311484, {_}: multiply ?159946 (divide (divide ?159947 (divide (divide (divide ?159945 ?159944) ?159942) (divide ?159948 ?159949))) ?159943) =?= multiply ?159946 (divide (divide ?159947 (divide ?159949 ?159948)) (divide ?159943 (divide ?159942 (divide ?159945 ?159944)))) [159943, 159949, 159948, 159942, 159944, 159945, 159947, 159946] by Demod 311080 with 311478 at 2,3
5810 Id : 31729, {_}: inverse (inverse (inverse (divide (divide ?150997 ?150994) (divide ?150999 (inverse (divide ?150998 (divide ?150994 (divide ?150995 ?150996)))))))) =>= inverse (divide (divide ?150997 (divide ?150998 (divide ?150996 ?150995))) ?150999) [150996, 150995, 150998, 150999, 150994, 150997] by Super 31662 with 4 at 2,1,1,1,1,2
5811 Id : 36383, {_}: inverse (inverse (inverse (divide (divide ?176720 ?176721) (multiply ?176722 (divide ?176723 (divide ?176721 (divide ?176724 ?176725))))))) =>= inverse (divide (divide ?176720 (divide ?176723 (divide ?176725 ?176724))) ?176722) [176725, 176724, 176723, 176722, 176721, 176720] by Demod 31729 with 6 at 2,1,1,1,2
5812 Id : 36463, {_}: inverse (inverse (inverse (divide ?177473 (multiply ?177476 (divide ?177477 (divide (divide (divide ?177475 ?177474) ?177472) (divide ?177478 ?177479))))))) =>= inverse (divide (divide (inverse (divide ?177472 (divide ?177473 (divide ?177474 ?177475)))) (divide ?177477 (divide ?177479 ?177478))) ?177476) [177479, 177478, 177472, 177474, 177475, 177477, 177476, 177473] by Super 36383 with 4 at 1,1,1,1,2
5813 Id : 309587, {_}: inverse (inverse (divide (multiply ?177476 (divide ?177477 (divide (divide (divide ?177475 ?177474) ?177472) (divide ?177478 ?177479)))) ?177473)) =<= inverse (divide (divide (inverse (divide ?177472 (divide ?177473 (divide ?177474 ?177475)))) (divide ?177477 (divide ?177479 ?177478))) ?177476) [177473, 177479, 177478, 177472, 177474, 177475, 177477, 177476] by Demod 36463 with 309508 at 2
5814 Id : 311007, {_}: divide (multiply ?177476 (divide ?177477 (divide (divide (divide ?177475 ?177474) ?177472) (divide ?177478 ?177479)))) ?177473 =<= inverse (divide (divide (inverse (divide ?177472 (divide ?177473 (divide ?177474 ?177475)))) (divide ?177477 (divide ?177479 ?177478))) ?177476) [177473, 177479, 177478, 177472, 177474, 177475, 177477, 177476] by Demod 309587 with 310837 at 2
5815 Id : 178159, {_}: inverse (inverse (divide (divide (inverse (divide ?1018695 ?1018696)) (divide ?1018692 ?1018697)) ?1018698)) =<= inverse (inverse (inverse (divide (inverse (divide (divide ?1018697 ?1018692) ?1018698)) (divide ?1018696 ?1018695)))) [1018698, 1018697, 1018692, 1018696, 1018695] by Demod 177759 with 4 at 1,2,1,1,1,2
5816 Id : 178479, {_}: multiply ?1021991 (inverse (inverse (divide (inverse (divide (divide ?1021989 ?1021988) ?1021990)) (divide ?1021987 ?1021986)))) =>= divide ?1021991 (inverse (inverse (divide (divide (inverse (divide ?1021986 ?1021987)) (divide ?1021988 ?1021989)) ?1021990))) [1021986, 1021987, 1021990, 1021988, 1021989, 1021991] by Super 6 with 178159 at 2,3
5817 Id : 178887, {_}: multiply ?1021991 (inverse (inverse (divide (inverse (divide (divide ?1021989 ?1021988) ?1021990)) (divide ?1021987 ?1021986)))) =>= multiply ?1021991 (inverse (divide (divide (inverse (divide ?1021986 ?1021987)) (divide ?1021988 ?1021989)) ?1021990)) [1021986, 1021987, 1021990, 1021988, 1021989, 1021991] by Demod 178479 with 6 at 3
5818 Id : 299293, {_}: multiply ?1021991 (inverse (inverse (inverse (divide (divide (divide ?1021987 ?1021986) (divide ?1021988 ?1021989)) ?1021990)))) =>= multiply ?1021991 (inverse (divide (divide (inverse (divide ?1021986 ?1021987)) (divide ?1021988 ?1021989)) ?1021990)) [1021990, 1021989, 1021988, 1021986, 1021987, 1021991] by Demod 178887 with 299272 at 2,2
5819 Id : 309531, {_}: multiply ?1021991 (inverse (inverse (divide ?1021990 (divide (divide ?1021987 ?1021986) (divide ?1021988 ?1021989))))) =<= multiply ?1021991 (inverse (divide (divide (inverse (divide ?1021986 ?1021987)) (divide ?1021988 ?1021989)) ?1021990)) [1021989, 1021988, 1021986, 1021987, 1021990, 1021991] by Demod 299293 with 309508 at 2,2
5820 Id : 311175, {_}: multiply ?1021991 (divide ?1021990 (divide (divide ?1021987 ?1021986) (divide ?1021988 ?1021989))) =<= multiply ?1021991 (inverse (divide (divide (inverse (divide ?1021986 ?1021987)) (divide ?1021988 ?1021989)) ?1021990)) [1021989, 1021988, 1021986, 1021987, 1021990, 1021991] by Demod 309531 with 310837 at 2,2
5821 Id : 311300, {_}: multiply ?1021991 (divide ?1021990 (divide (divide ?1021987 ?1021986) (divide ?1021988 ?1021989))) =<= divide ?1021991 (divide (divide (inverse (divide ?1021986 ?1021987)) (divide ?1021988 ?1021989)) ?1021990) [1021989, 1021988, 1021986, 1021987, 1021990, 1021991] by Demod 311175 with 311292 at 3
5822 Id : 311471, {_}: multiply ?1021991 (divide ?1021990 (divide (divide ?1021987 ?1021986) (divide ?1021988 ?1021989))) =>= divide ?1021991 (divide (divide (divide ?1021987 ?1021986) (divide ?1021988 ?1021989)) ?1021990) [1021989, 1021988, 1021986, 1021987, 1021990, 1021991] by Demod 311300 with 311017 at 1,1,2,3
5823 Id : 312117, {_}: divide (divide ?177476 (divide (divide (divide (divide ?177475 ?177474) ?177472) (divide ?177478 ?177479)) ?177477)) ?177473 =<= inverse (divide (divide (inverse (divide ?177472 (divide ?177473 (divide ?177474 ?177475)))) (divide ?177477 (divide ?177479 ?177478))) ?177476) [177473, 177477, 177479, 177478, 177472, 177474, 177475, 177476] by Demod 311007 with 311471 at 1,2
5824 Id : 312118, {_}: divide (divide ?177476 (divide (divide (divide (divide ?177475 ?177474) ?177472) (divide ?177478 ?177479)) ?177477)) ?177473 =<= divide ?177476 (divide (inverse (divide ?177472 (divide ?177473 (divide ?177474 ?177475)))) (divide ?177477 (divide ?177479 ?177478))) [177473, 177477, 177479, 177478, 177472, 177474, 177475, 177476] by Demod 312117 with 311017 at 3
5825 Id : 312119, {_}: divide (divide ?177476 (divide (divide (divide (divide ?177475 ?177474) ?177472) (divide ?177478 ?177479)) ?177477)) ?177473 =<= divide ?177476 (inverse (multiply (divide ?177477 (divide ?177479 ?177478)) (divide ?177472 (divide ?177473 (divide ?177474 ?177475))))) [177473, 177477, 177479, 177478, 177472, 177474, 177475, 177476] by Demod 312118 with 311604 at 2,3
5826 Id : 312120, {_}: divide (divide ?177476 (divide (divide (divide (divide ?177475 ?177474) ?177472) (divide ?177478 ?177479)) ?177477)) ?177473 =<= multiply ?177476 (multiply (divide ?177477 (divide ?177479 ?177478)) (divide ?177472 (divide ?177473 (divide ?177474 ?177475)))) [177473, 177477, 177479, 177478, 177472, 177474, 177475, 177476] by Demod 312119 with 6 at 3
5827 Id : 312121, {_}: divide (divide ?177476 (divide (divide (divide (divide ?177475 ?177474) ?177472) (divide ?177478 ?177479)) ?177477)) ?177473 =<= multiply ?177476 (divide (divide ?177477 (divide ?177479 ?177478)) (divide ?177473 (divide ?177472 (divide ?177475 ?177474)))) [177473, 177477, 177479, 177478, 177472, 177474, 177475, 177476] by Demod 312120 with 311478 at 2,3
5828 Id : 312122, {_}: multiply ?159946 (divide (divide ?159947 (divide (divide (divide ?159945 ?159944) ?159942) (divide ?159948 ?159949))) ?159943) =>= divide (divide ?159946 (divide (divide (divide (divide ?159945 ?159944) ?159942) (divide ?159948 ?159949)) ?159947)) ?159943 [159943, 159949, 159948, 159942, 159944, 159945, 159947, 159946] by Demod 311484 with 312121 at 3
5829 Id : 26, {_}: divide (inverse (divide ?127 ?128)) (divide (divide ?129 (multiply ?130 ?126)) ?127) =>= inverse (divide ?129 (divide ?128 (divide (inverse ?126) ?130))) [126, 130, 129, 128, 127] by Super 23 with 6 at 2,1,2,2
5830 Id : 673, {_}: inverse (divide ?2882 (divide (divide ?2883 (divide (multiply ?2884 ?2885) ?2882)) (divide (inverse ?2885) ?2884))) =>= ?2883 [2885, 2884, 2883, 2882] by Super 4 with 26 at 2
5831 Id : 1528, {_}: inverse (divide ?6677 (divide (divide ?6678 (divide (multiply (inverse ?6679) ?6680) ?6677)) (multiply (inverse ?6680) ?6679))) =>= ?6678 [6680, 6679, 6678, 6677] by Super 673 with 6 at 2,2,1,2
5832 Id : 1549, {_}: inverse (inverse (divide ?6831 (divide (inverse ?6830) (divide (inverse (multiply (multiply (inverse ?6833) ?6832) ?6830)) (multiply (inverse ?6832) ?6833))))) =>= ?6831 [6832, 6833, 6830, 6831] by Super 1528 with 32 at 1,2
5833 Id : 311073, {_}: divide ?6831 (divide (inverse ?6830) (divide (inverse (multiply (multiply (inverse ?6833) ?6832) ?6830)) (multiply (inverse ?6832) ?6833))) =>= ?6831 [6832, 6833, 6830, 6831] by Demod 1549 with 310837 at 2
5834 Id : 311743, {_}: divide ?6831 (inverse (multiply (divide (inverse (multiply (multiply (inverse ?6833) ?6832) ?6830)) (multiply (inverse ?6832) ?6833)) ?6830)) =>= ?6831 [6830, 6832, 6833, 6831] by Demod 311073 with 311604 at 2,2
5835 Id : 311744, {_}: divide ?6831 (inverse (multiply (inverse (multiply (multiply (inverse ?6832) ?6833) (multiply (multiply (inverse ?6833) ?6832) ?6830))) ?6830)) =>= ?6831 [6830, 6833, 6832, 6831] by Demod 311743 with 311604 at 1,1,2,2
5836 Id : 311850, {_}: multiply ?6831 (multiply (inverse (multiply (multiply (inverse ?6832) ?6833) (multiply (multiply (inverse ?6833) ?6832) ?6830))) ?6830) =>= ?6831 [6830, 6833, 6832, 6831] by Demod 311744 with 6 at 2
5837 Id : 179801, {_}: inverse (inverse (multiply (divide (inverse (divide (inverse ?1031802) ?1031803)) (divide ?1031804 ?1031805)) ?1031801)) =<= inverse (inverse (inverse (divide (inverse (divide (divide ?1031805 ?1031804) (inverse ?1031801))) (multiply ?1031803 ?1031802)))) [1031801, 1031805, 1031804, 1031803, 1031802] by Super 179540 with 6 at 1,1,2
5838 Id : 182767, {_}: inverse (inverse (multiply (divide (inverse (divide (inverse ?1047817) ?1047818)) (divide ?1047819 ?1047820)) ?1047821)) =>= inverse (inverse (inverse (divide (inverse (multiply (divide ?1047820 ?1047819) ?1047821)) (multiply ?1047818 ?1047817)))) [1047821, 1047820, 1047819, 1047818, 1047817] by Demod 179801 with 6 at 1,1,1,1,1,3
5839 Id : 190010, {_}: inverse (inverse (multiply (divide (inverse (divide (inverse ?1087858) ?1087859)) (multiply ?1087860 ?1087861)) ?1087862)) =<= inverse (inverse (inverse (divide (inverse (multiply (divide (inverse ?1087861) ?1087860) ?1087862)) (multiply ?1087859 ?1087858)))) [1087862, 1087861, 1087860, 1087859, 1087858] by Super 182767 with 6 at 2,1,1,1,2
5840 Id : 190267, {_}: inverse (inverse (multiply (divide (inverse (divide (inverse ?1090617) ?1090618)) (multiply (inverse ?1090616) ?1090619)) ?1090620)) =>= inverse (inverse (inverse (divide (inverse (multiply (multiply (inverse ?1090619) ?1090616) ?1090620)) (multiply ?1090618 ?1090617)))) [1090620, 1090619, 1090616, 1090618, 1090617] by Super 190010 with 6 at 1,1,1,1,1,1,3
5841 Id : 182806, {_}: inverse (inverse (multiply (divide (inverse (divide (inverse ?1048196) ?1048197)) (multiply ?1048198 ?1048195)) ?1048199)) =<= inverse (inverse (inverse (divide (inverse (multiply (divide (inverse ?1048195) ?1048198) ?1048199)) (multiply ?1048197 ?1048196)))) [1048199, 1048195, 1048198, 1048197, 1048196] by Super 182767 with 6 at 2,1,1,1,2
5842 Id : 490, {_}: divide (inverse (divide (inverse ?2255) (divide ?2256 (multiply ?2257 ?2254)))) (multiply (divide (inverse ?2254) ?2257) ?2255) =>= ?2256 [2254, 2257, 2256, 2255] by Super 466 with 6 at 2,2,1,1,2
5843 Id : 277455, {_}: inverse (inverse (divide (inverse (multiply (divide (inverse ?1506566) ?1506565) ?1506563)) ?1506564)) =<= inverse (inverse (inverse (inverse (divide (inverse ?1506563) (divide ?1506564 (multiply ?1506565 ?1506566)))))) [1506564, 1506563, 1506565, 1506566] by Super 277437 with 490 at 2,1,1,2
5844 Id : 299269, {_}: inverse (inverse (divide (inverse (multiply (divide (inverse ?1506566) ?1506565) ?1506563)) ?1506564)) =>= inverse (inverse (inverse (divide (divide ?1506564 (multiply ?1506565 ?1506566)) (inverse ?1506563)))) [1506564, 1506563, 1506565, 1506566] by Demod 277455 with 298855 at 3
5845 Id : 299304, {_}: inverse (inverse (divide (inverse (multiply (divide (inverse ?1506566) ?1506565) ?1506563)) ?1506564)) =>= inverse (inverse (inverse (multiply (divide ?1506564 (multiply ?1506565 ?1506566)) ?1506563))) [1506564, 1506563, 1506565, 1506566] by Demod 299269 with 6 at 1,1,1,3
5846 Id : 299306, {_}: inverse (inverse (multiply (divide (inverse (divide (inverse ?1048196) ?1048197)) (multiply ?1048198 ?1048195)) ?1048199)) =>= inverse (inverse (inverse (inverse (multiply (divide (multiply ?1048197 ?1048196) (multiply ?1048198 ?1048195)) ?1048199)))) [1048199, 1048195, 1048198, 1048197, 1048196] by Demod 182806 with 299304 at 1,3
5847 Id : 299307, {_}: inverse (inverse (inverse (inverse (multiply (divide (multiply ?1090618 ?1090617) (multiply (inverse ?1090616) ?1090619)) ?1090620)))) =<= inverse (inverse (inverse (divide (inverse (multiply (multiply (inverse ?1090619) ?1090616) ?1090620)) (multiply ?1090618 ?1090617)))) [1090620, 1090619, 1090616, 1090617, 1090618] by Demod 190267 with 299306 at 2
5848 Id : 300335, {_}: inverse (inverse (inverse (inverse (multiply (divide (multiply ?1090618 ?1090617) (multiply (inverse ?1090616) ?1090619)) ?1090620)))) =<= inverse (inverse (inverse (inverse (multiply (multiply ?1090618 ?1090617) (multiply (multiply (inverse ?1090619) ?1090616) ?1090620))))) [1090620, 1090619, 1090616, 1090617, 1090618] by Demod 299307 with 299719 at 3
5849 Id : 309523, {_}: inverse (inverse (multiply (divide (multiply ?1090618 ?1090617) (multiply (inverse ?1090616) ?1090619)) ?1090620)) =<= inverse (inverse (inverse (inverse (multiply (multiply ?1090618 ?1090617) (multiply (multiply (inverse ?1090619) ?1090616) ?1090620))))) [1090620, 1090619, 1090616, 1090617, 1090618] by Demod 300335 with 305044 at 2
5850 Id : 309524, {_}: inverse (inverse (multiply (divide (multiply ?1090618 ?1090617) (multiply (inverse ?1090616) ?1090619)) ?1090620)) =<= inverse (inverse (multiply (multiply ?1090618 ?1090617) (multiply (multiply (inverse ?1090619) ?1090616) ?1090620))) [1090620, 1090619, 1090616, 1090617, 1090618] by Demod 309523 with 305044 at 3
5851 Id : 311029, {_}: multiply (divide (multiply ?1090618 ?1090617) (multiply (inverse ?1090616) ?1090619)) ?1090620 =<= inverse (inverse (multiply (multiply ?1090618 ?1090617) (multiply (multiply (inverse ?1090619) ?1090616) ?1090620))) [1090620, 1090619, 1090616, 1090617, 1090618] by Demod 309524 with 310837 at 2
5852 Id : 311030, {_}: multiply (divide (multiply ?1090618 ?1090617) (multiply (inverse ?1090616) ?1090619)) ?1090620 =<= multiply (multiply ?1090618 ?1090617) (multiply (multiply (inverse ?1090619) ?1090616) ?1090620) [1090620, 1090619, 1090616, 1090617, 1090618] by Demod 311029 with 310837 at 3
5853 Id : 311851, {_}: multiply ?6831 (multiply (inverse (multiply (divide (multiply (inverse ?6832) ?6833) (multiply (inverse ?6832) ?6833)) ?6830)) ?6830) =>= ?6831 [6830, 6833, 6832, 6831] by Demod 311850 with 311030 at 1,1,2,2
5854 Id : 692, {_}: inverse (inverse (divide ?3016 (divide (inverse ?3015) (divide (inverse (multiply (divide (inverse ?3018) ?3017) ?3015)) (multiply ?3017 ?3018))))) =>= ?3016 [3017, 3018, 3015, 3016] by Super 673 with 32 at 1,2
5855 Id : 277278, {_}: inverse (inverse (inverse (inverse ?1505137))) =<= inverse (divide (inverse (multiply (divide (inverse ?1505138) ?1505139) ?1505137)) (multiply ?1505139 ?1505138)) [1505139, 1505138, 1505137] by Super 692 with 276834 at 2
5856 Id : 309511, {_}: inverse (inverse ?1505137) =<= inverse (divide (inverse (multiply (divide (inverse ?1505138) ?1505139) ?1505137)) (multiply ?1505139 ?1505138)) [1505139, 1505138, 1505137] by Demod 277278 with 305044 at 2
5857 Id : 311129, {_}: ?1505137 =<= inverse (divide (inverse (multiply (divide (inverse ?1505138) ?1505139) ?1505137)) (multiply ?1505139 ?1505138)) [1505139, 1505138, 1505137] by Demod 309511 with 310837 at 2
5858 Id : 311117, {_}: divide (inverse (multiply (divide (inverse ?1506566) ?1506565) ?1506563)) ?1506564 =<= inverse (inverse (inverse (multiply (divide ?1506564 (multiply ?1506565 ?1506566)) ?1506563))) [1506564, 1506563, 1506565, 1506566] by Demod 299304 with 310837 at 2
5859 Id : 311118, {_}: divide (inverse (multiply (divide (inverse ?1506566) ?1506565) ?1506563)) ?1506564 =>= inverse (multiply (divide ?1506564 (multiply ?1506565 ?1506566)) ?1506563) [1506564, 1506563, 1506565, 1506566] by Demod 311117 with 310837 at 3
5860 Id : 311205, {_}: ?1505137 =<= inverse (inverse (multiply (divide (multiply ?1505139 ?1505138) (multiply ?1505139 ?1505138)) ?1505137)) [1505138, 1505139, 1505137] by Demod 311129 with 311118 at 1,3
5861 Id : 311206, {_}: ?1505137 =<= multiply (divide (multiply ?1505139 ?1505138) (multiply ?1505139 ?1505138)) ?1505137 [1505138, 1505139, 1505137] by Demod 311205 with 310837 at 3
5862 Id : 311852, {_}: multiply ?6831 (multiply (inverse ?6830) ?6830) =>= ?6831 [6830, 6831] by Demod 311851 with 311206 at 1,1,2,2
5863 Id : 312318, {_}: multiply ?1630838 (multiply ?1630837 (inverse ?1630837)) =>= ?1630838 [1630837, 1630838] by Super 311852 with 310837 at 1,2,2
5864 Id : 312456, {_}: multiply ?1630838 (divide ?1630837 ?1630837) =>= ?1630838 [1630837, 1630838] by Demod 312318 with 311292 at 2,2
5865 Id : 312737, {_}: divide (divide ?1631485 (divide (divide (divide (divide ?1631486 ?1631487) ?1631488) (divide (divide ?1631486 ?1631487) ?1631488)) ?1631489)) ?1631489 =>= ?1631485 [1631489, 1631488, 1631487, 1631486, 1631485] by Super 312121 with 312456 at 3
5866 Id : 164905, {_}: inverse (inverse (divide (inverse (divide ?939850 (divide ?939851 ?939852))) (divide ?939849 (divide ?939850 (divide ?939851 ?939852))))) =>= inverse (inverse (inverse ?939849)) [939849, 939852, 939851, 939850] by Super 164761 with 4 at 1,1,1,3
5867 Id : 276099, {_}: inverse (inverse (inverse ?1499672)) =<= inverse (divide (inverse (divide (divide ?1499671 ?1499670) ?1499672)) (divide ?1499670 ?1499671)) [1499670, 1499671, 1499672] by Super 345 with 164905 at 2
5868 Id : 311033, {_}: inverse ?1499672 =<= inverse (divide (inverse (divide (divide ?1499671 ?1499670) ?1499672)) (divide ?1499670 ?1499671)) [1499670, 1499671, 1499672] by Demod 276099 with 310837 at 2
5869 Id : 309603, {_}: inverse (inverse (divide (inverse (divide (divide ?1506466 ?1506465) ?1506463)) ?1506464)) =>= inverse (inverse (divide ?1506463 (divide ?1506464 (divide ?1506465 ?1506466)))) [1506464, 1506463, 1506465, 1506466] by Demod 299272 with 309508 at 3
5870 Id : 311134, {_}: divide (inverse (divide (divide ?1506466 ?1506465) ?1506463)) ?1506464 =<= inverse (inverse (divide ?1506463 (divide ?1506464 (divide ?1506465 ?1506466)))) [1506464, 1506463, 1506465, 1506466] by Demod 309603 with 310837 at 2
5871 Id : 311135, {_}: divide (inverse (divide (divide ?1506466 ?1506465) ?1506463)) ?1506464 =>= divide ?1506463 (divide ?1506464 (divide ?1506465 ?1506466)) [1506464, 1506463, 1506465, 1506466] by Demod 311134 with 310837 at 3
5872 Id : 311365, {_}: inverse ?1499672 =<= inverse (divide ?1499672 (divide (divide ?1499670 ?1499671) (divide ?1499670 ?1499671))) [1499671, 1499670, 1499672] by Demod 311033 with 311135 at 1,3
5873 Id : 311372, {_}: inverse ?1499672 =<= divide (divide (divide ?1499670 ?1499671) (divide ?1499670 ?1499671)) ?1499672 [1499671, 1499670, 1499672] by Demod 311365 with 311017 at 3
5874 Id : 313817, {_}: divide (divide ?1631485 (inverse ?1631489)) ?1631489 =>= ?1631485 [1631489, 1631485] by Demod 312737 with 311372 at 2,1,2
5875 Id : 313818, {_}: divide (multiply ?1631485 ?1631489) ?1631489 =>= ?1631485 [1631489, 1631485] by Demod 313817 with 6 at 1,2
5876 Id : 317392, {_}: multiply ?1642981 (divide ?1642980 ?1642987) =<= divide (divide ?1642981 (divide (divide (divide (divide ?1642982 ?1642983) ?1642984) (divide ?1642985 ?1642986)) (multiply ?1642980 (divide (divide (divide ?1642982 ?1642983) ?1642984) (divide ?1642985 ?1642986))))) ?1642987 [1642986, 1642985, 1642984, 1642983, 1642982, 1642987, 1642980, 1642981] by Super 312122 with 313818 at 1,2,2
5877 Id : 318522, {_}: multiply ?1642981 (divide ?1642980 ?1642987) =<= divide (divide ?1642981 (inverse ?1642980)) ?1642987 [1642987, 1642980, 1642981] by Demod 317392 with 311112 at 2,1,3
5878 Id : 318523, {_}: multiply ?1642981 (divide ?1642980 ?1642987) =>= divide (multiply ?1642981 ?1642980) ?1642987 [1642987, 1642980, 1642981] by Demod 318522 with 6 at 1,3
5879 Id : 311394, {_}: divide (divide ?1506463 (divide ?1506466 ?1506465)) ?1506464 =?= divide ?1506463 (divide ?1506464 (divide ?1506465 ?1506466)) [1506464, 1506465, 1506466, 1506463] by Demod 311135 with 311017 at 1,2
5880 Id : 277640, {_}: inverse ?1508034 =<= inverse (inverse (inverse (divide ?1508034 (multiply (divide ?1508035 ?1508036) (divide ?1508036 ?1508035))))) [1508036, 1508035, 1508034] by Super 277437 with 339 at 1,2
5881 Id : 309536, {_}: inverse ?1508034 =<= inverse (inverse (divide (multiply (divide ?1508035 ?1508036) (divide ?1508036 ?1508035)) ?1508034)) [1508036, 1508035, 1508034] by Demod 277640 with 309508 at 3
5882 Id : 310975, {_}: inverse ?1508034 =<= divide (multiply (divide ?1508035 ?1508036) (divide ?1508036 ?1508035)) ?1508034 [1508036, 1508035, 1508034] by Demod 309536 with 310837 at 3
5883 Id : 312719, {_}: inverse ?1631352 =<= divide (divide ?1631351 ?1631351) ?1631352 [1631351, 1631352] by Super 310975 with 312456 at 1,3
5884 Id : 314397, {_}: divide (divide ?1637990 (divide ?1637991 ?1637992)) (divide ?1637989 ?1637989) =>= divide ?1637990 (inverse (divide ?1637992 ?1637991)) [1637989, 1637992, 1637991, 1637990] by Super 311394 with 312719 at 2,3
5885 Id : 311378, {_}: divide ?3302 (divide ?3301 (divide (divide ?3301 (multiply ?3304 ?3303)) (divide (inverse ?3303) ?3304))) =>= ?3302 [3303, 3304, 3301, 3302] by Demod 311071 with 311017 at 1,2,2,2
5886 Id : 312063, {_}: divide ?3302 (divide ?3301 (divide (divide ?3301 (multiply ?3304 ?3303)) (inverse (multiply ?3304 ?3303)))) =>= ?3302 [3303, 3304, 3301, 3302] by Demod 311378 with 311604 at 2,2,2,2
5887 Id : 312064, {_}: divide ?3302 (divide ?3301 (multiply (divide ?3301 (multiply ?3304 ?3303)) (multiply ?3304 ?3303))) =>= ?3302 [3303, 3304, 3301, 3302] by Demod 312063 with 6 at 2,2,2
5888 Id : 312065, {_}: divide ?3302 (divide ?3301 ?3301) =>= ?3302 [3301, 3302] by Demod 312064 with 311868 at 2,2,2
5889 Id : 314879, {_}: divide ?1637990 (divide ?1637991 ?1637992) =<= divide ?1637990 (inverse (divide ?1637992 ?1637991)) [1637992, 1637991, 1637990] by Demod 314397 with 312065 at 2
5890 Id : 314880, {_}: divide ?1637990 (divide ?1637991 ?1637992) =<= multiply ?1637990 (divide ?1637992 ?1637991) [1637992, 1637991, 1637990] by Demod 314879 with 6 at 3
5891 Id : 320415, {_}: divide ?1642981 (divide ?1642987 ?1642980) =?= divide (multiply ?1642981 ?1642980) ?1642987 [1642980, 1642987, 1642981] by Demod 318523 with 314880 at 2
5892 Id : 343753, {_}: multiply ?1701701 ?1701702 =<= multiply (divide ?1701701 (divide ?1701703 ?1701702)) ?1701703 [1701703, 1701702, 1701701] by Super 311868 with 320415 at 1,3
5893 Id : 311818, {_}: divide (multiply ?257 ?256) (multiply (divide ?258 (multiply ?259 ?260)) ?256) =>= divide (divide ?257 (inverse (multiply ?259 ?260))) ?258 [260, 259, 258, 256, 257] by Demod 311594 with 311604 at 2,1,3
5894 Id : 311820, {_}: divide (multiply ?257 ?256) (multiply (divide ?258 (multiply ?259 ?260)) ?256) =>= divide (multiply ?257 (multiply ?259 ?260)) ?258 [260, 259, 258, 256, 257] by Demod 311818 with 6 at 1,3
5895 Id : 317517, {_}: divide (multiply ?1643886 ?1643887) (multiply ?1643885 ?1643887) =?= divide (multiply ?1643886 (multiply ?1643888 ?1643889)) (multiply ?1643885 (multiply ?1643888 ?1643889)) [1643889, 1643888, 1643885, 1643887, 1643886] by Super 311820 with 313818 at 1,2,2
5896 Id : 32072, {_}: inverse (inverse (inverse (divide (divide ?152561 (divide ?152562 (multiply ?152563 ?152564))) (divide ?152565 ?152562)))) =>= inverse (divide (divide ?152561 (divide (inverse ?152564) ?152563)) ?152565) [152565, 152564, 152563, 152562, 152561] by Super 31662 with 6 at 2,2,1,1,1,1,2
5897 Id : 691, {_}: inverse (inverse (divide ?3011 (divide ?3010 (divide (inverse (divide (divide (inverse ?3013) ?3012) ?3010)) (multiply ?3012 ?3013))))) =>= ?3011 [3012, 3013, 3010, 3011] by Super 673 with 10 at 1,2
5898 Id : 32186, {_}: inverse (divide ?153559 (divide (divide (inverse (divide (divide (inverse ?153557) ?153558) ?153562)) (multiply ?153558 ?153557)) (multiply ?153560 ?153561))) =>= inverse (divide (divide ?153559 (divide (inverse ?153561) ?153560)) ?153562) [153561, 153560, 153562, 153558, 153557, 153559] by Super 32072 with 691 at 1,2
5899 Id : 311187, {_}: inverse (divide ?153559 (divide (divide ?153562 (divide (multiply ?153558 ?153557) (divide ?153558 (inverse ?153557)))) (multiply ?153560 ?153561))) =>= inverse (divide (divide ?153559 (divide (inverse ?153561) ?153560)) ?153562) [153561, 153560, 153557, 153558, 153562, 153559] by Demod 32186 with 311135 at 1,2,1,2
5900 Id : 311196, {_}: inverse (divide ?153559 (divide (divide ?153562 (divide (multiply ?153558 ?153557) (multiply ?153558 ?153557))) (multiply ?153560 ?153561))) =>= inverse (divide (divide ?153559 (divide (inverse ?153561) ?153560)) ?153562) [153561, 153560, 153557, 153558, 153562, 153559] by Demod 311187 with 6 at 2,2,1,2,1,2
5901 Id : 311391, {_}: divide (divide (divide ?153562 (divide (multiply ?153558 ?153557) (multiply ?153558 ?153557))) (multiply ?153560 ?153561)) ?153559 =>= inverse (divide (divide ?153559 (divide (inverse ?153561) ?153560)) ?153562) [153559, 153561, 153560, 153557, 153558, 153562] by Demod 311196 with 311017 at 2
5902 Id : 311392, {_}: divide (divide (divide ?153562 (divide (multiply ?153558 ?153557) (multiply ?153558 ?153557))) (multiply ?153560 ?153561)) ?153559 =>= divide ?153562 (divide ?153559 (divide (inverse ?153561) ?153560)) [153559, 153561, 153560, 153557, 153558, 153562] by Demod 311391 with 311017 at 3
5903 Id : 312039, {_}: divide (divide (divide ?153562 (divide (multiply ?153558 ?153557) (multiply ?153558 ?153557))) (multiply ?153560 ?153561)) ?153559 =>= divide ?153562 (divide ?153559 (inverse (multiply ?153560 ?153561))) [153559, 153561, 153560, 153557, 153558, 153562] by Demod 311392 with 311604 at 2,2,3
5904 Id : 312040, {_}: divide (divide (divide ?153562 (divide (multiply ?153558 ?153557) (multiply ?153558 ?153557))) (multiply ?153560 ?153561)) ?153559 =>= divide ?153562 (multiply ?153559 (multiply ?153560 ?153561)) [153559, 153561, 153560, 153557, 153558, 153562] by Demod 312039 with 6 at 2,3
5905 Id : 312075, {_}: divide (divide ?153562 (multiply ?153560 ?153561)) ?153559 =?= divide ?153562 (multiply ?153559 (multiply ?153560 ?153561)) [153559, 153561, 153560, 153562] by Demod 312040 with 312065 at 1,1,2
5906 Id : 318365, {_}: divide (multiply ?1643886 ?1643887) (multiply ?1643885 ?1643887) =?= divide (divide (multiply ?1643886 (multiply ?1643888 ?1643889)) (multiply ?1643888 ?1643889)) ?1643885 [1643889, 1643888, 1643885, 1643887, 1643886] by Demod 317517 with 312075 at 3
5907 Id : 318366, {_}: divide (multiply ?1643886 ?1643887) (multiply ?1643885 ?1643887) =>= divide ?1643886 ?1643885 [1643885, 1643887, 1643886] by Demod 318365 with 313818 at 1,3
5908 Id : 343774, {_}: multiply ?1701846 (multiply ?1701845 ?1701844) =<= multiply (divide ?1701846 (divide ?1701843 ?1701845)) (multiply ?1701843 ?1701844) [1701843, 1701844, 1701845, 1701846] by Super 343753 with 318366 at 2,1,3
5909 Id : 178704, {_}: inverse (inverse (divide (divide (inverse (divide ?1024393 ?1024394)) (divide ?1024395 ?1024396)) (inverse ?1024392))) =>= inverse (inverse (inverse (divide (inverse (multiply (divide ?1024396 ?1024395) ?1024392)) (divide ?1024394 ?1024393)))) [1024392, 1024396, 1024395, 1024394, 1024393] by Super 178625 with 6 at 1,1,1,1,1,3
5910 Id : 179107, {_}: inverse (inverse (multiply (divide (inverse (divide ?1024393 ?1024394)) (divide ?1024395 ?1024396)) ?1024392)) =<= inverse (inverse (inverse (divide (inverse (multiply (divide ?1024396 ?1024395) ?1024392)) (divide ?1024394 ?1024393)))) [1024392, 1024396, 1024395, 1024394, 1024393] by Demod 178704 with 6 at 1,1,2
5911 Id : 300345, {_}: inverse (inverse (multiply (divide (inverse (divide ?1024393 ?1024394)) (divide ?1024395 ?1024396)) ?1024392)) =<= inverse (inverse (inverse (inverse (multiply (divide ?1024394 ?1024393) (multiply (divide ?1024396 ?1024395) ?1024392))))) [1024392, 1024396, 1024395, 1024394, 1024393] by Demod 179107 with 299719 at 3
5912 Id : 309518, {_}: inverse (inverse (multiply (divide (inverse (divide ?1024393 ?1024394)) (divide ?1024395 ?1024396)) ?1024392)) =>= inverse (inverse (multiply (divide ?1024394 ?1024393) (multiply (divide ?1024396 ?1024395) ?1024392))) [1024392, 1024396, 1024395, 1024394, 1024393] by Demod 300345 with 305044 at 3
5913 Id : 311123, {_}: multiply (divide (inverse (divide ?1024393 ?1024394)) (divide ?1024395 ?1024396)) ?1024392 =<= inverse (inverse (multiply (divide ?1024394 ?1024393) (multiply (divide ?1024396 ?1024395) ?1024392))) [1024392, 1024396, 1024395, 1024394, 1024393] by Demod 309518 with 310837 at 2
5914 Id : 311124, {_}: multiply (divide (inverse (divide ?1024393 ?1024394)) (divide ?1024395 ?1024396)) ?1024392 =>= multiply (divide ?1024394 ?1024393) (multiply (divide ?1024396 ?1024395) ?1024392) [1024392, 1024396, 1024395, 1024394, 1024393] by Demod 311123 with 310837 at 3
5915 Id : 311459, {_}: multiply (divide (divide ?1024394 ?1024393) (divide ?1024395 ?1024396)) ?1024392 =?= multiply (divide ?1024394 ?1024393) (multiply (divide ?1024396 ?1024395) ?1024392) [1024392, 1024396, 1024395, 1024393, 1024394] by Demod 311124 with 311017 at 1,1,2
5916 Id : 314145, {_}: multiply (divide (divide ?1636195 ?1636196) (inverse ?1636193)) ?1636197 =<= multiply (divide ?1636195 ?1636196) (multiply (divide ?1636193 (divide ?1636194 ?1636194)) ?1636197) [1636194, 1636197, 1636193, 1636196, 1636195] by Super 311459 with 312719 at 2,1,2
5917 Id : 315602, {_}: multiply (multiply (divide ?1636195 ?1636196) ?1636193) ?1636197 =<= multiply (divide ?1636195 ?1636196) (multiply (divide ?1636193 (divide ?1636194 ?1636194)) ?1636197) [1636194, 1636197, 1636193, 1636196, 1636195] by Demod 314145 with 6 at 1,2
5918 Id : 315603, {_}: multiply (multiply (divide ?1636195 ?1636196) ?1636193) ?1636197 =>= multiply (divide ?1636195 ?1636196) (multiply ?1636193 ?1636197) [1636197, 1636193, 1636196, 1636195] by Demod 315602 with 312065 at 1,2,3
5919 Id : 320945, {_}: multiply ?1653480 ?1653482 =<= multiply (divide ?1653480 (divide ?1653481 ?1653482)) ?1653481 [1653481, 1653482, 1653480] by Super 311868 with 320415 at 1,3
5920 Id : 343542, {_}: multiply (multiply ?1699948 ?1699949) ?1699951 =<= multiply (divide ?1699948 (divide ?1699950 ?1699949)) (multiply ?1699950 ?1699951) [1699950, 1699951, 1699949, 1699948] by Super 315603 with 320945 at 1,2
5921 Id : 394401, {_}: multiply ?1701846 (multiply ?1701845 ?1701844) =?= multiply (multiply ?1701846 ?1701845) ?1701844 [1701844, 1701845, 1701846] by Demod 343774 with 343542 at 3
5922 Id : 395259, {_}: multiply a3 (multiply b3 c3) === multiply a3 (multiply b3 c3) [] by Demod 2 with 394401 at 2
5923 Id : 2, {_}: multiply (multiply a3 b3) c3 =>= multiply a3 (multiply b3 c3) [] by prove_these_axioms_3
5924 % SZS output end CNFRefutation for GRP471-1.p
5934 prove_these_axioms_3 is 94
5938 divide (inverse (divide (divide (divide ?2 ?3) ?4) (divide ?5 ?4)))
5942 [5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5
5944 multiply ?7 ?8 =<= divide ?7 (inverse ?8)
5945 [8, 7] by multiply ?7 ?8
5948 multiply (multiply a3 b3) c3 =>= multiply a3 (multiply b3 c3)
5949 [] by prove_these_axioms_3
5950 Found proof, 10.874059s
5951 % SZS status Unsatisfiable for GRP477-1.p
5952 % SZS output start CNFRefutation for GRP477-1.p
5953 Id : 6, {_}: multiply ?7 ?8 =<= divide ?7 (inverse ?8) [8, 7] by multiply ?7 ?8
5954 Id : 7, {_}: divide (inverse (divide (divide (divide ?10 ?11) ?12) (divide ?13 ?12))) (divide ?11 ?10) =>= ?13 [13, 12, 11, 10] by single_axiom ?10 ?11 ?12 ?13
5955 Id : 4, {_}: divide (inverse (divide (divide (divide ?2 ?3) ?4) (divide ?5 ?4))) (divide ?3 ?2) =>= ?5 [5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5
5956 Id : 9, {_}: divide (inverse (divide (divide (divide ?26 ?27) (divide ?23 ?22)) ?25)) (divide ?27 ?26) =?= inverse (divide (divide (divide ?22 ?23) ?24) (divide ?25 ?24)) [24, 25, 22, 23, 27, 26] by Super 7 with 4 at 2,1,1,2
5957 Id : 8947, {_}: inverse (divide (divide (divide ?66899 ?66900) ?66901) (divide (divide ?66902 (divide ?66900 ?66899)) ?66901)) =>= ?66902 [66902, 66901, 66900, 66899] by Super 4 with 9 at 2
5958 Id : 9487, {_}: inverse (divide (divide (divide (inverse ?70062) ?70063) ?70064) (divide (divide ?70065 (multiply ?70063 ?70062)) ?70064)) =>= ?70065 [70065, 70064, 70063, 70062] by Super 8947 with 6 at 2,1,2,1,2
5959 Id : 13, {_}: divide (inverse (divide (divide (divide ?48 ?49) (inverse ?47)) (multiply ?46 ?47))) (divide ?49 ?48) =>= ?46 [46, 47, 49, 48] by Super 4 with 6 at 2,1,1,2
5960 Id : 23, {_}: divide (inverse (divide (multiply (divide ?88 ?89) ?90) (multiply ?91 ?90))) (divide ?89 ?88) =>= ?91 [91, 90, 89, 88] by Demod 13 with 6 at 1,1,1,2
5961 Id : 27, {_}: divide (inverse (divide (multiply ?115 ?116) (multiply ?117 ?116))) (divide (divide ?113 ?112) (inverse (divide (divide (divide ?112 ?113) ?114) (divide ?115 ?114)))) =>= ?117 [114, 112, 113, 117, 116, 115] by Super 23 with 4 at 1,1,1,1,2
5962 Id : 35, {_}: divide (inverse (divide (multiply ?115 ?116) (multiply ?117 ?116))) (multiply (divide ?113 ?112) (divide (divide (divide ?112 ?113) ?114) (divide ?115 ?114))) =>= ?117 [114, 112, 113, 117, 116, 115] by Demod 27 with 6 at 2,2
5963 Id : 9506, {_}: inverse (divide (divide (divide (inverse (divide (divide (divide ?70226 ?70225) ?70227) (divide ?70222 ?70227))) (divide ?70225 ?70226)) ?70228) (divide ?70224 ?70228)) =?= inverse (divide (multiply ?70222 ?70223) (multiply ?70224 ?70223)) [70223, 70224, 70228, 70222, 70227, 70225, 70226] by Super 9487 with 35 at 1,2,1,2
5964 Id : 9604, {_}: inverse (divide (divide ?70222 ?70228) (divide ?70224 ?70228)) =?= inverse (divide (multiply ?70222 ?70223) (multiply ?70224 ?70223)) [70223, 70224, 70228, 70222] by Demod 9506 with 4 at 1,1,1,2
5965 Id : 27713, {_}: divide (divide (inverse (divide (divide (divide ?169617 ?169618) (divide ?169619 ?169620)) ?169621)) (divide ?169618 ?169617)) (divide ?169619 ?169620) =>= ?169621 [169621, 169620, 169619, 169618, 169617] by Super 4 with 9 at 1,2
5966 Id : 27714, {_}: divide (divide (inverse (divide (divide (divide ?169627 ?169628) (divide (inverse (divide (divide (divide ?169623 ?169624) ?169625) (divide ?169626 ?169625))) (divide ?169624 ?169623))) ?169629)) (divide ?169628 ?169627)) ?169626 =>= ?169629 [169629, 169626, 169625, 169624, 169623, 169628, 169627] by Super 27713 with 4 at 2,2
5967 Id : 28344, {_}: divide (divide (inverse (divide (divide (divide ?173215 ?173216) ?173217) ?173218)) (divide ?173216 ?173215)) ?173217 =>= ?173218 [173218, 173217, 173216, 173215] by Demod 27714 with 4 at 2,1,1,1,1,2
5968 Id : 28449, {_}: divide (divide (inverse (multiply (divide (divide ?174106 ?174107) ?174108) ?174105)) (divide ?174107 ?174106)) ?174108 =>= inverse ?174105 [174105, 174108, 174107, 174106] by Super 28344 with 6 at 1,1,1,2
5969 Id : 28805, {_}: multiply (divide (inverse (multiply (divide (divide ?175142 ?175143) (inverse ?175145)) ?175144)) (divide ?175143 ?175142)) ?175145 =>= inverse ?175144 [175144, 175145, 175143, 175142] by Super 6 with 28449 at 3
5970 Id : 29852, {_}: multiply (divide (inverse (multiply (multiply (divide ?180549 ?180550) ?180551) ?180552)) (divide ?180550 ?180549)) ?180551 =>= inverse ?180552 [180552, 180551, 180550, 180549] by Demod 28805 with 6 at 1,1,1,1,2
5971 Id : 33202, {_}: multiply (divide (inverse (multiply (multiply (divide (inverse ?199058) ?199059) ?199060) ?199061)) (multiply ?199059 ?199058)) ?199060 =>= inverse ?199061 [199061, 199060, 199059, 199058] by Super 29852 with 6 at 2,1,2
5972 Id : 33304, {_}: multiply (divide (inverse (multiply (multiply (multiply (inverse ?199942) ?199941) ?199943) ?199944)) (multiply (inverse ?199941) ?199942)) ?199943 =>= inverse ?199944 [199944, 199943, 199941, 199942] by Super 33202 with 6 at 1,1,1,1,1,2
5973 Id : 43, {_}: divide (inverse (divide (divide (divide (inverse ?171) ?172) ?173) (divide ?174 ?173))) (multiply ?172 ?171) =>= ?174 [174, 173, 172, 171] by Super 4 with 6 at 2,2
5974 Id : 48, {_}: divide (inverse (divide (divide ?205 ?206) (divide ?207 ?206))) (multiply (divide ?203 ?202) (divide (divide (divide ?202 ?203) ?204) (divide ?205 ?204))) =>= ?207 [204, 202, 203, 207, 206, 205] by Super 43 with 4 at 1,1,1,1,2
5975 Id : 8271, {_}: inverse (divide (divide (divide ?62998 ?62997) ?62999) (divide (divide ?63000 (divide ?62997 ?62998)) ?62999)) =>= ?63000 [63000, 62999, 62997, 62998] by Super 4 with 9 at 2
5976 Id : 8914, {_}: divide ?66588 (multiply (divide ?66589 ?66590) (divide (divide (divide ?66590 ?66589) ?66591) (divide (divide ?66585 ?66586) ?66591))) =>= divide ?66588 (divide ?66586 ?66585) [66586, 66585, 66591, 66590, 66589, 66588] by Super 48 with 8271 at 1,2
5977 Id : 27904, {_}: divide (divide (inverse (divide (divide (divide ?171441 ?171442) (divide ?171443 ?171444)) (divide ?171440 ?171439))) (divide ?171442 ?171441)) (divide ?171443 ?171444) =?= multiply (divide ?171436 ?171437) (divide (divide (divide ?171437 ?171436) ?171438) (divide (divide ?171439 ?171440) ?171438)) [171438, 171437, 171436, 171439, 171440, 171444, 171443, 171442, 171441] by Super 27713 with 8914 at 1,1,1,2
5978 Id : 8270, {_}: divide (divide (inverse (divide (divide (divide ?62988 ?62989) (divide ?62990 ?62991)) ?62992)) (divide ?62989 ?62988)) (divide ?62990 ?62991) =>= ?62992 [62992, 62991, 62990, 62989, 62988] by Super 4 with 9 at 1,2
5979 Id : 28135, {_}: divide ?171440 ?171439 =<= multiply (divide ?171436 ?171437) (divide (divide (divide ?171437 ?171436) ?171438) (divide (divide ?171439 ?171440) ?171438)) [171438, 171437, 171436, 171439, 171440] by Demod 27904 with 8270 at 2
5980 Id : 18, {_}: divide (inverse (divide (multiply (divide ?48 ?49) ?47) (multiply ?46 ?47))) (divide ?49 ?48) =>= ?46 [46, 47, 49, 48] by Demod 13 with 6 at 1,1,1,2
5981 Id : 22, {_}: divide (inverse (divide (divide ?84 ?85) (divide ?86 ?85))) (divide (divide ?82 ?81) (inverse (divide (multiply (divide ?81 ?82) ?83) (multiply ?84 ?83)))) =>= ?86 [83, 81, 82, 86, 85, 84] by Super 4 with 18 at 1,1,1,1,2
5982 Id : 32, {_}: divide (inverse (divide (divide ?84 ?85) (divide ?86 ?85))) (multiply (divide ?82 ?81) (divide (multiply (divide ?81 ?82) ?83) (multiply ?84 ?83))) =>= ?86 [83, 81, 82, 86, 85, 84] by Demod 22 with 6 at 2,2
5983 Id : 8902, {_}: divide ?66500 (multiply (divide ?66501 ?66502) (divide (multiply (divide ?66502 ?66501) ?66503) (multiply (divide ?66497 ?66498) ?66503))) =>= divide ?66500 (divide ?66498 ?66497) [66498, 66497, 66503, 66502, 66501, 66500] by Super 32 with 8271 at 1,2
5984 Id : 27903, {_}: divide (divide (inverse (divide (divide (divide ?171431 ?171432) (divide ?171433 ?171434)) (divide ?171430 ?171429))) (divide ?171432 ?171431)) (divide ?171433 ?171434) =?= multiply (divide ?171426 ?171427) (divide (multiply (divide ?171427 ?171426) ?171428) (multiply (divide ?171429 ?171430) ?171428)) [171428, 171427, 171426, 171429, 171430, 171434, 171433, 171432, 171431] by Super 27713 with 8902 at 1,1,1,2
5985 Id : 28134, {_}: divide ?171430 ?171429 =<= multiply (divide ?171426 ?171427) (divide (multiply (divide ?171427 ?171426) ?171428) (multiply (divide ?171429 ?171430) ?171428)) [171428, 171427, 171426, 171429, 171430] by Demod 27903 with 8270 at 2
5986 Id : 34242, {_}: divide (divide (inverse (divide ?204167 ?204168)) (divide ?204171 ?204170)) ?204172 =<= inverse (divide (multiply (divide ?204172 (divide ?204170 ?204171)) ?204169) (multiply (divide ?204168 ?204167) ?204169)) [204169, 204172, 204170, 204171, 204168, 204167] by Super 28449 with 28134 at 1,1,1,2
5987 Id : 34778, {_}: divide (divide (divide (inverse (divide ?206532 ?206533)) (divide ?206534 ?206535)) ?206536) (divide (divide ?206535 ?206534) ?206536) =>= divide ?206533 ?206532 [206536, 206535, 206534, 206533, 206532] by Super 18 with 34242 at 1,2
5988 Id : 54527, {_}: divide ?300655 ?300656 =<= multiply (divide (divide ?300655 ?300656) (inverse (divide ?300653 ?300654))) (divide ?300654 ?300653) [300654, 300653, 300656, 300655] by Super 28135 with 34778 at 2,3
5989 Id : 55213, {_}: divide ?304381 ?304382 =<= multiply (multiply (divide ?304381 ?304382) (divide ?304383 ?304384)) (divide ?304384 ?304383) [304384, 304383, 304382, 304381] by Demod 54527 with 6 at 1,3
5990 Id : 55316, {_}: divide (inverse (divide (divide (divide ?305230 ?305231) ?305232) (divide ?305233 ?305232))) (divide ?305231 ?305230) =?= multiply (multiply ?305233 (divide ?305234 ?305235)) (divide ?305235 ?305234) [305235, 305234, 305233, 305232, 305231, 305230] by Super 55213 with 4 at 1,1,3
5991 Id : 55555, {_}: ?305233 =<= multiply (multiply ?305233 (divide ?305234 ?305235)) (divide ?305235 ?305234) [305235, 305234, 305233] by Demod 55316 with 4 at 2
5992 Id : 27948, {_}: divide (divide (inverse (divide (divide (divide ?169627 ?169628) ?169626) ?169629)) (divide ?169628 ?169627)) ?169626 =>= ?169629 [169629, 169626, 169628, 169627] by Demod 27714 with 4 at 2,1,1,1,1,2
5993 Id : 28234, {_}: multiply (divide (inverse (divide (divide (divide ?172298 ?172299) (inverse ?172301)) ?172300)) (divide ?172299 ?172298)) ?172301 =>= ?172300 [172300, 172301, 172299, 172298] by Super 6 with 27948 at 3
5994 Id : 28487, {_}: multiply (divide (inverse (divide (multiply (divide ?172298 ?172299) ?172301) ?172300)) (divide ?172299 ?172298)) ?172301 =>= ?172300 [172300, 172301, 172299, 172298] by Demod 28234 with 6 at 1,1,1,1,2
5995 Id : 9011, {_}: inverse (divide (divide (divide ?67439 ?67440) (inverse ?67438)) (multiply (divide ?67441 (divide ?67440 ?67439)) ?67438)) =>= ?67441 [67441, 67438, 67440, 67439] by Super 8947 with 6 at 2,1,2
5996 Id : 9220, {_}: inverse (divide (multiply (divide ?68482 ?68483) ?68484) (multiply (divide ?68485 (divide ?68483 ?68482)) ?68484)) =>= ?68485 [68485, 68484, 68483, 68482] by Demod 9011 with 6 at 1,1,2
5997 Id : 9262, {_}: inverse (divide (multiply (divide (inverse ?68840) ?68841) ?68842) (multiply (divide ?68843 (multiply ?68841 ?68840)) ?68842)) =>= ?68843 [68843, 68842, 68841, 68840] by Super 9220 with 6 at 2,1,2,1,2
5998 Id : 34818, {_}: inverse (divide (divide (divide ?206982 (divide ?206981 ?206980)) ?206984) (divide (divide ?206979 ?206978) ?206984)) =>= divide (divide (inverse (divide ?206978 ?206979)) (divide ?206980 ?206981)) ?206982 [206978, 206979, 206984, 206980, 206981, 206982] by Super 9604 with 34242 at 3
5999 Id : 54516, {_}: inverse (divide ?300558 ?300557) =<= divide (divide (inverse (divide ?300559 ?300560)) (divide ?300560 ?300559)) (inverse (divide ?300557 ?300558)) [300560, 300559, 300557, 300558] by Super 34818 with 34778 at 1,2
6000 Id : 54778, {_}: inverse (divide ?300558 ?300557) =<= multiply (divide (inverse (divide ?300559 ?300560)) (divide ?300560 ?300559)) (divide ?300557 ?300558) [300560, 300559, 300557, 300558] by Demod 54516 with 6 at 3
6001 Id : 58787, {_}: inverse (divide (inverse (divide ?321392 ?321393)) (multiply (divide ?321396 (multiply (divide ?321395 ?321394) (divide ?321394 ?321395))) (divide ?321393 ?321392))) =>= ?321396 [321394, 321395, 321396, 321393, 321392] by Super 9262 with 54778 at 1,1,2
6002 Id : 12, {_}: divide (inverse (divide (divide (divide (inverse ?42) ?41) ?43) (divide ?44 ?43))) (multiply ?41 ?42) =>= ?44 [44, 43, 41, 42] by Super 4 with 6 at 2,2
6003 Id : 54402, {_}: divide (inverse (divide ?299508 ?299507)) (multiply (divide ?299509 ?299510) (divide ?299507 ?299508)) =>= divide ?299510 ?299509 [299510, 299509, 299507, 299508] by Super 12 with 34778 at 1,1,2
6004 Id : 59136, {_}: inverse (divide (multiply (divide ?321395 ?321394) (divide ?321394 ?321395)) ?321396) =>= ?321396 [321396, 321394, 321395] by Demod 58787 with 54402 at 1,2
6005 Id : 59503, {_}: multiply (divide ?323772 (divide ?323771 ?323770)) (divide ?323771 ?323770) =>= ?323772 [323770, 323771, 323772] by Super 28487 with 59136 at 1,1,2
6006 Id : 60069, {_}: divide ?327147 (divide ?327148 ?327149) =<= multiply ?327147 (divide ?327149 ?327148) [327149, 327148, 327147] by Super 55555 with 59503 at 1,3
6007 Id : 60669, {_}: multiply (divide (inverse (divide (multiply (multiply (inverse ?329868) ?329869) ?329870) (divide ?329866 ?329867))) (multiply (inverse ?329869) ?329868)) ?329870 =>= inverse (divide ?329867 ?329866) [329867, 329866, 329870, 329869, 329868] by Super 33304 with 60069 at 1,1,1,2
6008 Id : 29399, {_}: multiply (divide (inverse (divide (multiply (divide ?178179 ?178180) ?178181) ?178182)) (divide ?178180 ?178179)) ?178181 =>= ?178182 [178182, 178181, 178180, 178179] by Demod 28234 with 6 at 1,1,1,1,2
6009 Id : 32341, {_}: multiply (divide (inverse (divide (multiply (divide (inverse ?194066) ?194067) ?194068) ?194069)) (multiply ?194067 ?194066)) ?194068 =>= ?194069 [194069, 194068, 194067, 194066] by Super 29399 with 6 at 2,1,2
6010 Id : 32441, {_}: multiply (divide (inverse (divide (multiply (multiply (inverse ?194936) ?194935) ?194937) ?194938)) (multiply (inverse ?194935) ?194936)) ?194937 =>= ?194938 [194938, 194937, 194935, 194936] by Super 32341 with 6 at 1,1,1,1,1,2
6011 Id : 61017, {_}: divide ?329866 ?329867 =<= inverse (divide ?329867 ?329866) [329867, 329866] by Demod 60669 with 32441 at 2
6012 Id : 61512, {_}: divide (divide ?70224 ?70228) (divide ?70222 ?70228) =?= inverse (divide (multiply ?70222 ?70223) (multiply ?70224 ?70223)) [70223, 70222, 70228, 70224] by Demod 9604 with 61017 at 2
6013 Id : 61513, {_}: divide (divide ?70224 ?70228) (divide ?70222 ?70228) =?= divide (multiply ?70224 ?70223) (multiply ?70222 ?70223) [70223, 70222, 70228, 70224] by Demod 61512 with 61017 at 3
6014 Id : 60072, {_}: multiply (divide ?327160 (divide ?327161 ?327162)) (divide ?327161 ?327162) =>= ?327160 [327162, 327161, 327160] by Super 28487 with 59136 at 1,1,2
6015 Id : 60073, {_}: multiply (divide ?327168 (divide (inverse (divide (divide (divide ?327164 ?327165) ?327166) (divide ?327167 ?327166))) (divide ?327165 ?327164))) ?327167 =>= ?327168 [327167, 327166, 327165, 327164, 327168] by Super 60072 with 4 at 2,2
6016 Id : 64649, {_}: multiply (divide ?338211 ?338212) ?338212 =>= ?338211 [338212, 338211] by Demod 60073 with 4 at 2,1,2
6017 Id : 61711, {_}: divide ?332019 ?332020 =<= inverse (divide ?332020 ?332019) [332020, 332019] by Demod 60669 with 32441 at 2
6018 Id : 61786, {_}: divide (inverse ?332481) ?332482 =>= inverse (multiply ?332482 ?332481) [332482, 332481] by Super 61711 with 6 at 1,3
6019 Id : 64688, {_}: multiply (inverse (multiply ?338450 ?338449)) ?338450 =>= inverse ?338449 [338449, 338450] by Super 64649 with 61786 at 1,2
6020 Id : 70472, {_}: divide (divide ?351323 ?351324) (divide (inverse (multiply ?351321 ?351322)) ?351324) =>= divide (multiply ?351323 ?351321) (inverse ?351322) [351322, 351321, 351324, 351323] by Super 61513 with 64688 at 2,3
6021 Id : 70841, {_}: divide (divide ?351323 ?351324) (inverse (multiply ?351324 (multiply ?351321 ?351322))) =>= divide (multiply ?351323 ?351321) (inverse ?351322) [351322, 351321, 351324, 351323] by Demod 70472 with 61786 at 2,2
6022 Id : 70842, {_}: multiply (divide ?351323 ?351324) (multiply ?351324 (multiply ?351321 ?351322)) =>= divide (multiply ?351323 ?351321) (inverse ?351322) [351322, 351321, 351324, 351323] by Demod 70841 with 6 at 2
6023 Id : 70843, {_}: multiply (divide ?351323 ?351324) (multiply ?351324 (multiply ?351321 ?351322)) =>= multiply (multiply ?351323 ?351321) ?351322 [351322, 351321, 351324, 351323] by Demod 70842 with 6 at 3
6024 Id : 67, {_}: divide (inverse (divide (divide (multiply ?287 ?288) ?289) (divide ?290 ?289))) (divide (inverse ?288) ?287) =>= ?290 [290, 289, 288, 287] by Super 4 with 6 at 1,1,1,1,2
6025 Id : 14, {_}: divide (inverse (divide (divide (multiply ?51 ?52) ?53) (divide ?54 ?53))) (divide (inverse ?52) ?51) =>= ?54 [54, 53, 52, 51] by Super 4 with 6 at 1,1,1,1,2
6026 Id : 70, {_}: divide (inverse (divide (divide (multiply (divide (inverse ?307) ?306) (divide (divide (multiply ?306 ?307) ?308) (divide ?309 ?308))) ?310) (divide ?311 ?310))) ?309 =>= ?311 [311, 310, 309, 308, 306, 307] by Super 67 with 14 at 2,2
6027 Id : 60413, {_}: divide (inverse (divide (divide (divide (divide (inverse ?307) ?306) (divide (divide ?309 ?308) (divide (multiply ?306 ?307) ?308))) ?310) (divide ?311 ?310))) ?309 =>= ?311 [311, 310, 308, 309, 306, 307] by Demod 70 with 60069 at 1,1,1,1,2
6028 Id : 61462, {_}: divide (divide (divide ?311 ?310) (divide (divide (divide (inverse ?307) ?306) (divide (divide ?309 ?308) (divide (multiply ?306 ?307) ?308))) ?310)) ?309 =>= ?311 [308, 309, 306, 307, 310, 311] by Demod 60413 with 61017 at 1,2
6029 Id : 62183, {_}: divide (divide (divide ?311 ?310) (divide (divide (inverse (multiply ?306 ?307)) (divide (divide ?309 ?308) (divide (multiply ?306 ?307) ?308))) ?310)) ?309 =>= ?311 [308, 309, 307, 306, 310, 311] by Demod 61462 with 61786 at 1,1,2,1,2
6030 Id : 62184, {_}: divide (divide (divide ?311 ?310) (divide (inverse (multiply (divide (divide ?309 ?308) (divide (multiply ?306 ?307) ?308)) (multiply ?306 ?307))) ?310)) ?309 =>= ?311 [307, 306, 308, 309, 310, 311] by Demod 62183 with 61786 at 1,2,1,2
6031 Id : 62185, {_}: divide (divide (divide ?311 ?310) (inverse (multiply ?310 (multiply (divide (divide ?309 ?308) (divide (multiply ?306 ?307) ?308)) (multiply ?306 ?307))))) ?309 =>= ?311 [307, 306, 308, 309, 310, 311] by Demod 62184 with 61786 at 2,1,2
6032 Id : 62194, {_}: divide (multiply (divide ?311 ?310) (multiply ?310 (multiply (divide (divide ?309 ?308) (divide (multiply ?306 ?307) ?308)) (multiply ?306 ?307)))) ?309 =>= ?311 [307, 306, 308, 309, 310, 311] by Demod 62185 with 6 at 1,2
6033 Id : 61520, {_}: divide (divide (divide ?54 ?53) (divide (multiply ?51 ?52) ?53)) (divide (inverse ?52) ?51) =>= ?54 [52, 51, 53, 54] by Demod 14 with 61017 at 1,2
6034 Id : 62166, {_}: divide (divide (divide ?54 ?53) (divide (multiply ?51 ?52) ?53)) (inverse (multiply ?51 ?52)) =>= ?54 [52, 51, 53, 54] by Demod 61520 with 61786 at 2,2
6035 Id : 62205, {_}: multiply (divide (divide ?54 ?53) (divide (multiply ?51 ?52) ?53)) (multiply ?51 ?52) =>= ?54 [52, 51, 53, 54] by Demod 62166 with 6 at 2
6036 Id : 62206, {_}: divide (multiply (divide ?311 ?310) (multiply ?310 ?309)) ?309 =>= ?311 [309, 310, 311] by Demod 62194 with 62205 at 2,2,1,2
6037 Id : 64698, {_}: multiply ?338511 ?338513 =<= multiply (divide ?338511 ?338512) (multiply ?338512 ?338513) [338512, 338513, 338511] by Super 64649 with 62206 at 1,2
6038 Id : 88169, {_}: multiply ?351323 (multiply ?351321 ?351322) =?= multiply (multiply ?351323 ?351321) ?351322 [351322, 351321, 351323] by Demod 70843 with 64698 at 2
6039 Id : 88454, {_}: multiply a3 (multiply b3 c3) === multiply a3 (multiply b3 c3) [] by Demod 2 with 88169 at 2
6040 Id : 2, {_}: multiply (multiply a3 b3) c3 =>= multiply a3 (multiply b3 c3) [] by prove_these_axioms_3
6041 % SZS output end CNFRefutation for GRP477-1.p
6049 prove_these_axioms_2 is 94
6057 (multiply (inverse (multiply ?2 ?3)) (multiply ?3 ?2)))
6058 (multiply (inverse (multiply ?4 ?5))
6061 (multiply (multiply ?6 (inverse ?7)) (inverse ?5)))))))
6065 [7, 6, 5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5 ?6 ?7
6068 multiply (multiply (inverse b2) b2) a2 =>= a2
6069 [] by prove_these_axioms_2
6070 Last chance: 1246072731.81
6071 Last chance: all is indexed 1246074535.38
6072 Last chance: failed over 100 goal 1246074535.38
6073 FAILURE in 0 iterations
6074 % SZS status Timeout for GRP506-1.p
6082 prove_these_axioms_4 is 95
6090 (multiply (inverse (multiply ?2 ?3)) (multiply ?3 ?2)))
6091 (multiply (inverse (multiply ?4 ?5))
6094 (multiply (multiply ?6 (inverse ?7)) (inverse ?5)))))))
6098 [7, 6, 5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5 ?6 ?7
6100 Id : 2, {_}: multiply a b =>= multiply b a [] by prove_these_axioms_4
6101 Last chance: 1246074836.94
6102 Last chance: all is indexed 1246076623.31
6103 Last chance: failed over 100 goal 1246076623.31
6104 FAILURE in 0 iterations
6105 % SZS status Timeout for GRP508-1.p
6112 prove_normal_axioms_1 is 96
6116 join (meet (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4)
6118 (join (meet ?2 (join (join (meet ?5 ?3) (meet ?3 ?6)) ?3))
6122 (meet (meet (join ?5 (join ?3 ?6)) (join ?7 ?3)) ?3))
6125 (meet (meet (join ?5 (join ?3 ?6)) (join ?7 ?3)) ?3))))
6126 (join ?2 (join (join (meet ?5 ?3) (meet ?3 ?6)) ?3))))
6127 (join (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4))
6130 [8, 7, 6, 5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5 ?6 ?7 ?8
6132 Id : 2, {_}: meet a a =>= a [] by prove_normal_axioms_1
6133 Found proof, 13.503938s
6134 % SZS status Unsatisfiable for LAT080-1.p
6135 % SZS output start CNFRefutation for LAT080-1.p
6136 Id : 4, {_}: join (meet (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4) (meet (join (meet ?2 (join (join (meet ?5 ?3) (meet ?3 ?6)) ?3)) (meet (join (meet ?3 (meet (meet (join ?5 (join ?3 ?6)) (join ?7 ?3)) ?3)) (meet ?8 (join ?3 (meet (meet (join ?5 (join ?3 ?6)) (join ?7 ?3)) ?3)))) (join ?2 (join (join (meet ?5 ?3) (meet ?3 ?6)) ?3)))) (join (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4)) =>= ?3 [8, 7, 6, 5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5 ?6 ?7 ?8
6137 Id : 5, {_}: join (meet (join (meet ?10 ?11) (meet ?11 (join ?10 ?11))) ?12) (meet (join (meet ?10 (join (join (meet ?13 ?11) (meet ?11 ?14)) ?11)) (meet (join (meet ?11 (meet (meet (join ?13 (join ?11 ?14)) (join ?15 ?11)) ?11)) (meet ?16 (join ?11 (meet (meet (join ?13 (join ?11 ?14)) (join ?15 ?11)) ?11)))) (join ?10 (join (join (meet ?13 ?11) (meet ?11 ?14)) ?11)))) (join (join (meet ?10 ?11) (meet ?11 (join ?10 ?11))) ?12)) =>= ?11 [16, 15, 14, 13, 12, 11, 10] by single_axiom ?10 ?11 ?12 ?13 ?14 ?15 ?16
6138 Id : 39, {_}: join (meet (join (meet ?287 (join (meet ?288 ?289) (meet ?289 (join ?288 ?289)))) (meet (join (meet ?288 ?289) (meet ?289 (join ?288 ?289))) (join ?287 (join (meet ?288 ?289) (meet ?289 (join ?288 ?289)))))) ?290) (meet (join (meet ?287 (join (join (meet ?291 (join (meet ?288 ?289) (meet ?289 (join ?288 ?289)))) (meet (join (meet ?288 ?289) (meet ?289 (join ?288 ?289))) ?292)) (join (meet ?288 ?289) (meet ?289 (join ?288 ?289))))) (meet ?289 (join ?287 (join (join (meet ?291 (join (meet ?288 ?289) (meet ?289 (join ?288 ?289)))) (meet (join (meet ?288 ?289) (meet ?289 (join ?288 ?289))) ?292)) (join (meet ?288 ?289) (meet ?289 (join ?288 ?289))))))) (join (join (meet ?287 (join (meet ?288 ?289) (meet ?289 (join ?288 ?289)))) (meet (join (meet ?288 ?289) (meet ?289 (join ?288 ?289))) (join ?287 (join (meet ?288 ?289) (meet ?289 (join ?288 ?289)))))) ?290)) =>= join (meet ?288 ?289) (meet ?289 (join ?288 ?289)) [292, 291, 290, 289, 288, 287] by Super 5 with 4 at 1,2,1,2,2
6139 Id : 42, {_}: join (meet (join (meet ?323 (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))))) (meet (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))) (join ?323 (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))))))) ?324) (meet (join (meet ?323 (join (join (meet ?325 (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))))) (meet (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))) ?326)) (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join ?323 (join (join (meet ?325 (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))))) (meet (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))) ?326)) (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))))))) (join (join (meet ?323 (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))))) (meet (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))) (join ?323 ?318))) ?324)) =>= join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))) [326, 325, 324, 322, 321, 320, 319, 318, 317, 323] by Super 39 with 4 at 2,2,2,1,2,2,2
6140 Id : 126, {_}: join (meet (join (meet ?323 ?318) (meet (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 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(join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))))) (meet (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))) (join ?323 ?318))) ?324)) =>= join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))) [326, 325, 324, 322, 321, 320, 319, 317, 318, 323] by Demod 42 with 4 at 2,1,1,1,2
6141 Id : 127, {_}: join (meet (join (meet ?323 ?318) (meet ?318 (join ?323 (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) 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?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))) ?326)) (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))))))) (join (join (meet ?323 (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))))) (meet (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))) (join ?323 ?318))) ?324)) =>= join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))) [326, 325, 324, 322, 321, 320, 319, 317, 318, 323] by Demod 126 with 4 at 1,2,1,1,2
6142 Id : 128, {_}: join (meet (join (meet ?323 ?318) (meet ?318 (join ?323 ?318))) ?324) (meet (join (meet ?323 (join (join (meet ?325 (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet 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?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))))) (meet (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))) (join ?323 ?318))) ?324)) =>= join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))) [326, 322, 321, 320, 319, 317, 325, 324, 318, 323] by Demod 127 with 4 at 2,2,2,1,1,2
6143 Id : 129, {_}: join (meet (join (meet ?323 ?318) (meet ?318 (join ?323 ?318))) ?324) (meet (join (meet ?323 (join (join (meet ?325 ?318) (meet (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join 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?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))))) (meet (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))) (join ?323 ?318))) ?324)) =>= join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))) [326, 322, 321, 320, 319, 317, 325, 324, 318, 323] by Demod 128 with 4 at 2,1,1,2,1,1,2,2
6144 Id : 130, {_}: join (meet (join (meet ?323 ?318) (meet ?318 (join ?323 ?318))) ?324) (meet (join (meet ?323 (join (join (meet ?325 ?318) (meet ?318 ?326)) (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) 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(meet (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))) (join ?323 ?318))) ?324)) =>= join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))) [322, 321, 320, 319, 317, 326, 325, 324, 318, 323] by Demod 129 with 4 at 1,2,1,2,1,1,2,2
6145 Id : 131, {_}: join (meet (join (meet ?323 ?318) (meet ?318 (join ?323 ?318))) ?324) (meet (join (meet ?323 (join (join (meet ?325 ?318) (meet ?318 ?326)) ?318)) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join ?323 (join (join (meet ?325 (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join 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?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))) ?326)) (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 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(meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))))) (meet (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))) (join ?323 ?318))) ?324)) =>= join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))) [322, 321, 320, 319, 317, 326, 325, 324, 318, 323] by Demod 130 with 4 at 2,2,1,1,2,2
6146 Id : 132, {_}: join (meet (join (meet ?323 ?318) (meet ?318 (join ?323 ?318))) ?324) (meet (join (meet ?323 (join (join (meet ?325 ?318) (meet ?318 ?326)) ?318)) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join ?323 (join (join (meet ?325 ?318) (meet (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))) ?326)) (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))))))) (join (join (meet ?323 (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))))) (meet (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))) (join ?323 ?318))) ?324)) =>= join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))) [322, 321, 320, 319, 317, 326, 325, 324, 318, 323] by Demod 131 with 4 at 2,1,1,2,2,2,1,2,2
6147 Id : 133, {_}: join (meet (join (meet ?323 ?318) (meet ?318 (join ?323 ?318))) ?324) (meet (join (meet ?323 (join (join (meet ?325 ?318) (meet ?318 ?326)) ?318)) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join ?323 (join (join (meet ?325 ?318) (meet ?318 ?326)) (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))))))) (join (join (meet ?323 (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))))) (meet (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))) (join ?323 ?318))) ?324)) =>= join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))) [322, 321, 320, 319, 317, 326, 325, 324, 318, 323] by Demod 132 with 4 at 1,2,1,2,2,2,1,2,2
6148 Id : 134, {_}: join (meet (join (meet ?323 ?318) (meet ?318 (join ?323 ?318))) ?324) (meet (join (meet ?323 (join (join (meet ?325 ?318) (meet ?318 ?326)) ?318)) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join ?323 (join (join (meet ?325 ?318) (meet ?318 ?326)) ?318)))) (join (join (meet ?323 (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))))) (meet (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))) (join ?323 ?318))) ?324)) =>= join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))) [322, 321, 320, 319, 317, 326, 325, 324, 318, 323] by Demod 133 with 4 at 2,2,2,2,1,2,2
6149 Id : 135, {_}: join (meet (join (meet ?323 ?318) (meet ?318 (join ?323 ?318))) ?324) (meet (join (meet ?323 (join (join (meet ?325 ?318) (meet ?318 ?326)) ?318)) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join ?323 (join (join (meet ?325 ?318) (meet ?318 ?326)) ?318)))) (join (join (meet ?323 ?318) (meet (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))) (join ?323 ?318))) ?324)) =>= join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))) [322, 321, 320, 319, 317, 326, 325, 324, 318, 323] by Demod 134 with 4 at 2,1,1,2,2,2
6150 Id : 136, {_}: join (meet (join (meet ?323 ?318) (meet ?318 (join ?323 ?318))) ?324) (meet (join (meet ?323 (join (join (meet ?325 ?318) (meet ?318 ?326)) ?318)) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join ?323 (join (join (meet ?325 ?318) (meet ?318 ?326)) ?318)))) (join (join (meet ?323 ?318) (meet ?318 (join ?323 ?318))) ?324)) =?= join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))) [322, 321, 320, 319, 317, 326, 325, 324, 318, 323] by Demod 135 with 4 at 1,2,1,2,2,2
6151 Id : 714, {_}: join (meet (join (meet ?1381 ?1382) (meet ?1382 (join ?1381 ?1382))) ?1383) (meet (join (meet ?1381 (join (join (meet ?1384 ?1382) (meet ?1382 ?1385)) ?1382)) (meet (join (meet ?1386 (join (join (meet ?1387 ?1382) (meet ?1382 ?1388)) ?1382)) (meet (join (meet ?1382 (meet (meet (join ?1387 (join ?1382 ?1388)) (join ?1389 ?1382)) ?1382)) (meet ?1390 (join ?1382 (meet (meet (join ?1387 (join ?1382 ?1388)) (join ?1389 ?1382)) ?1382)))) (join ?1386 (join (join (meet ?1387 ?1382) (meet ?1382 ?1388)) ?1382)))) (join ?1381 (join (join (meet ?1384 ?1382) (meet ?1382 ?1385)) ?1382)))) (join (join (meet ?1381 ?1382) (meet ?1382 (join ?1381 ?1382))) ?1383)) =>= ?1382 [1390, 1389, 1388, 1387, 1386, 1385, 1384, 1383, 1382, 1381] by Demod 136 with 4 at 3
6152 Id : 1147, {_}: join (meet (join (meet (join (meet ?2510 ?2511) (meet ?2511 (join ?2510 ?2511))) ?2511) (meet ?2511 (join (join (meet ?2510 ?2511) (meet ?2511 (join ?2510 ?2511))) ?2511))) ?2512) (meet ?2511 (join (join (meet (join (meet ?2510 ?2511) (meet ?2511 (join ?2510 ?2511))) ?2511) (meet ?2511 (join (join (meet ?2510 ?2511) (meet ?2511 (join ?2510 ?2511))) ?2511))) ?2512)) =>= ?2511 [2512, 2511, 2510] by Super 714 with 4 at 1,2,2
6153 Id : 748, {_}: join (meet (join (meet (join (meet ?1916 ?1912) (meet ?1912 (join ?1916 ?1912))) ?1912) (meet ?1912 (join (join (meet ?1916 ?1912) (meet ?1912 (join ?1916 ?1912))) ?1912))) ?1913) (meet ?1912 (join (join (meet (join (meet ?1916 ?1912) (meet ?1912 (join ?1916 ?1912))) ?1912) (meet ?1912 (join (join (meet ?1916 ?1912) (meet ?1912 (join ?1916 ?1912))) ?1912))) ?1913)) =>= ?1912 [1913, 1912, 1916] by Super 714 with 4 at 1,2,2
6154 Id : 1164, {_}: join (meet (join (meet (join (meet (join (meet ?2642 ?2643) (meet ?2643 (join ?2642 ?2643))) ?2643) (meet ?2643 (join (join (meet ?2642 ?2643) (meet ?2643 (join ?2642 ?2643))) ?2643))) ?2643) (meet ?2643 (join (join (meet (join (meet ?2642 ?2643) (meet ?2643 (join ?2642 ?2643))) ?2643) (meet ?2643 (join (join (meet ?2642 ?2643) (meet ?2643 (join ?2642 ?2643))) ?2643))) ?2643))) ?2644) (meet ?2643 (join ?2643 ?2644)) =>= ?2643 [2644, 2643, 2642] by Super 1147 with 748 at 1,2,2,2
6155 Id : 1544, {_}: join (meet ?2643 ?2644) (meet ?2643 (join ?2643 ?2644)) =>= ?2643 [2644, 2643] by Demod 1164 with 748 at 1,1,2
6156 Id : 13, {_}: join (meet (join (meet ?112 (join (meet ?106 ?107) (meet ?107 (join ?106 ?107)))) (meet (join (meet ?106 ?107) (meet ?107 (join ?106 ?107))) (join ?112 (join (meet ?106 ?107) (meet ?107 (join ?106 ?107)))))) ?113) (meet (join (meet ?112 (join (join (meet ?114 (join (meet ?106 ?107) (meet ?107 (join ?106 ?107)))) (meet (join (meet ?106 ?107) (meet ?107 (join ?106 ?107))) ?115)) (join (meet ?106 ?107) (meet ?107 (join ?106 ?107))))) (meet ?107 (join ?112 (join (join (meet ?114 (join (meet ?106 ?107) (meet ?107 (join ?106 ?107)))) (meet (join (meet ?106 ?107) (meet ?107 (join ?106 ?107))) ?115)) (join (meet ?106 ?107) (meet ?107 (join ?106 ?107))))))) (join (join (meet ?112 (join (meet ?106 ?107) (meet ?107 (join ?106 ?107)))) (meet (join (meet ?106 ?107) (meet ?107 (join ?106 ?107))) (join ?112 (join (meet ?106 ?107) (meet ?107 (join ?106 ?107)))))) ?113)) =>= join (meet ?106 ?107) (meet ?107 (join ?106 ?107)) [115, 114, 113, 107, 106, 112] by Super 5 with 4 at 1,2,1,2,2
6157 Id : 1092, {_}: join (meet (join (meet ?2040 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) (join ?2040 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))))) ?2041) (meet (join (meet ?2040 (join (join (meet ?2042 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) ?2043)) (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))))) (meet ?2039 (join ?2040 (join (join (meet ?2042 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) ?2043)) (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))))))) (join (join (meet ?2040 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) (join ?2040 ?2039))) ?2041)) =>= join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)) [2043, 2042, 2041, 2039, 2038, 2040] by Super 13 with 748 at 2,2,2,1,2,2,2
6158 Id : 1218, {_}: join (meet (join (meet ?2040 ?2039) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) (join ?2040 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))))) ?2041) (meet (join (meet ?2040 (join (join (meet ?2042 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) ?2043)) (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))))) (meet ?2039 (join ?2040 (join (join (meet ?2042 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) ?2043)) (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))))))) (join (join (meet ?2040 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) (join ?2040 ?2039))) ?2041)) =>= join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)) [2043, 2042, 2041, 2038, 2039, 2040] by Demod 1092 with 748 at 2,1,1,1,2
6159 Id : 1219, {_}: join (meet (join (meet ?2040 ?2039) (meet ?2039 (join ?2040 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))))) ?2041) (meet (join (meet ?2040 (join (join (meet ?2042 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) ?2043)) (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))))) (meet ?2039 (join ?2040 (join (join (meet ?2042 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) ?2043)) (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))))))) (join (join (meet ?2040 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) (join ?2040 ?2039))) ?2041)) =>= join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)) [2043, 2042, 2041, 2038, 2039, 2040] by Demod 1218 with 748 at 1,2,1,1,2
6160 Id : 1220, {_}: join (meet (join (meet ?2040 ?2039) (meet ?2039 (join ?2040 ?2039))) ?2041) (meet (join (meet ?2040 (join (join (meet ?2042 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) ?2043)) (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))))) (meet ?2039 (join ?2040 (join (join (meet ?2042 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) ?2043)) (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))))))) (join (join (meet ?2040 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) (join ?2040 ?2039))) ?2041)) =>= join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)) [2043, 2038, 2042, 2041, 2039, 2040] by Demod 1219 with 748 at 2,2,2,1,1,2
6161 Id : 1221, {_}: join (meet (join (meet ?2040 ?2039) (meet ?2039 (join ?2040 ?2039))) ?2041) (meet (join (meet ?2040 (join (join (meet ?2042 ?2039) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) ?2043)) (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))))) (meet ?2039 (join ?2040 (join (join (meet ?2042 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) ?2043)) (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))))))) (join (join (meet ?2040 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) (join ?2040 ?2039))) ?2041)) =>= join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)) [2043, 2038, 2042, 2041, 2039, 2040] by Demod 1220 with 748 at 2,1,1,2,1,1,2,2
6162 Id : 1222, {_}: join (meet (join (meet ?2040 ?2039) (meet ?2039 (join ?2040 ?2039))) ?2041) (meet (join (meet ?2040 (join (join (meet ?2042 ?2039) (meet ?2039 ?2043)) (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))))) (meet ?2039 (join ?2040 (join (join (meet ?2042 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) ?2043)) (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))))))) (join (join (meet ?2040 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) (join ?2040 ?2039))) ?2041)) =>= join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)) [2038, 2043, 2042, 2041, 2039, 2040] by Demod 1221 with 748 at 1,2,1,2,1,1,2,2
6163 Id : 1223, {_}: join (meet (join (meet ?2040 ?2039) (meet ?2039 (join ?2040 ?2039))) ?2041) (meet (join (meet ?2040 (join (join (meet ?2042 ?2039) (meet ?2039 ?2043)) ?2039)) (meet ?2039 (join ?2040 (join (join (meet ?2042 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) ?2043)) (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))))))) (join (join (meet ?2040 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) (join ?2040 ?2039))) ?2041)) =>= join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)) [2038, 2043, 2042, 2041, 2039, 2040] by Demod 1222 with 748 at 2,2,1,1,2,2
6164 Id : 1224, {_}: join (meet (join (meet ?2040 ?2039) (meet ?2039 (join ?2040 ?2039))) ?2041) (meet (join (meet ?2040 (join (join (meet ?2042 ?2039) (meet ?2039 ?2043)) ?2039)) (meet ?2039 (join ?2040 (join (join (meet ?2042 ?2039) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) ?2043)) (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))))))) (join (join (meet ?2040 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) (join ?2040 ?2039))) ?2041)) =>= join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)) [2038, 2043, 2042, 2041, 2039, 2040] by Demod 1223 with 748 at 2,1,1,2,2,2,1,2,2
6165 Id : 1225, {_}: join (meet (join (meet ?2040 ?2039) (meet ?2039 (join ?2040 ?2039))) ?2041) (meet (join (meet ?2040 (join (join (meet ?2042 ?2039) (meet ?2039 ?2043)) ?2039)) (meet ?2039 (join ?2040 (join (join (meet ?2042 ?2039) (meet ?2039 ?2043)) (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))))))) (join (join (meet ?2040 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) (join ?2040 ?2039))) ?2041)) =>= join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)) [2038, 2043, 2042, 2041, 2039, 2040] by Demod 1224 with 748 at 1,2,1,2,2,2,1,2,2
6166 Id : 1226, {_}: join (meet (join (meet ?2040 ?2039) (meet ?2039 (join ?2040 ?2039))) ?2041) (meet (join (meet ?2040 (join (join (meet ?2042 ?2039) (meet ?2039 ?2043)) ?2039)) (meet ?2039 (join ?2040 (join (join (meet ?2042 ?2039) (meet ?2039 ?2043)) ?2039)))) (join (join (meet ?2040 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) (join ?2040 ?2039))) ?2041)) =>= join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)) [2038, 2043, 2042, 2041, 2039, 2040] by Demod 1225 with 748 at 2,2,2,2,1,2,2
6167 Id : 1227, {_}: join (meet (join (meet ?2040 ?2039) (meet ?2039 (join ?2040 ?2039))) ?2041) (meet (join (meet ?2040 (join (join (meet ?2042 ?2039) (meet ?2039 ?2043)) ?2039)) (meet ?2039 (join ?2040 (join (join (meet ?2042 ?2039) (meet ?2039 ?2043)) ?2039)))) (join (join (meet ?2040 ?2039) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) (join ?2040 ?2039))) ?2041)) =>= join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)) [2038, 2043, 2042, 2041, 2039, 2040] by Demod 1226 with 748 at 2,1,1,2,2,2
6168 Id : 1228, {_}: join (meet (join (meet ?2040 ?2039) (meet ?2039 (join ?2040 ?2039))) ?2041) (meet (join (meet ?2040 (join (join (meet ?2042 ?2039) (meet ?2039 ?2043)) ?2039)) (meet ?2039 (join ?2040 (join (join (meet ?2042 ?2039) (meet ?2039 ?2043)) ?2039)))) (join (join (meet ?2040 ?2039) (meet ?2039 (join ?2040 ?2039))) ?2041)) =?= join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)) [2038, 2043, 2042, 2041, 2039, 2040] by Demod 1227 with 748 at 1,2,1,2,2,2
6169 Id : 2531, {_}: join (meet (join (meet ?4434 ?4435) (meet ?4435 (join ?4434 ?4435))) ?4436) (meet (join (meet ?4434 (join (join (meet ?4437 ?4435) (meet ?4435 ?4438)) ?4435)) (meet ?4435 (join ?4434 (join (join (meet ?4437 ?4435) (meet ?4435 ?4438)) ?4435)))) (join (join (meet ?4434 ?4435) (meet ?4435 (join ?4434 ?4435))) ?4436)) =>= ?4435 [4438, 4437, 4436, 4435, 4434] by Demod 1228 with 748 at 3
6170 Id : 2540, {_}: join (meet (join (meet (join (meet ?4509 ?4510) (meet ?4510 (join ?4509 ?4510))) (join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510))))) (meet (join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)))) (join (join (meet ?4509 ?4510) (meet ?4510 (join ?4509 ?4510))) (join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510))))))) ?4515) (meet (join (meet (join (meet ?4509 ?4510) (meet ?4510 (join ?4509 ?4510))) (join (join (meet ?4516 (join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510))))) (meet (join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)))) ?4517)) (join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)))))) (meet (join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)))) (join (join (meet ?4509 ?4510) (meet ?4510 (join ?4509 ?4510))) (join (join (meet ?4516 (join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510))))) (meet (join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)))) ?4517)) (join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)))))))) (join ?4510 ?4515)) =>= join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510))) [4517, 4516, 4515, 4514, 4513, 4512, 4511, 4510, 4509] by Super 2531 with 4 at 1,2,2,2
6171 Id : 2926, {_}: join (meet ?4510 ?4515) (meet (join (meet (join (meet ?4509 ?4510) (meet ?4510 (join ?4509 ?4510))) (join (join (meet ?4516 (join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510))))) (meet (join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)))) ?4517)) (join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)))))) (meet (join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)))) (join (join (meet ?4509 ?4510) (meet ?4510 (join ?4509 ?4510))) (join (join (meet ?4516 (join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510))))) (meet (join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)))) ?4517)) (join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)))))))) (join ?4510 ?4515)) =>= join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510))) [4517, 4514, 4513, 4512, 4511, 4516, 4509, 4515, 4510] by Demod 2540 with 4 at 1,1,2
6172 Id : 2927, {_}: join (meet ?4510 ?4515) (meet ?4510 (join ?4510 ?4515)) =?= join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510))) [4514, 4513, 4512, 4511, 4509, 4515, 4510] by Demod 2926 with 4 at 1,2,2
6173 Id : 2928, {_}: ?4510 =<= join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510))) [4514, 4513, 4512, 4511, 4509, 4510] by Demod 2927 with 1544 at 2
6174 Id : 4152, {_}: ?6409 =<= join (meet ?6409 (meet (meet (join ?6410 (join ?6409 ?6411)) (join ?6412 ?6409)) ?6409)) (meet ?6413 (join ?6409 (meet (meet (join ?6410 (join ?6409 ?6411)) (join ?6412 ?6409)) ?6409))) [6413, 6412, 6411, 6410, 6409] by Super 1544 with 2928 at 2
6175 Id : 1229, {_}: join (meet (join (meet ?2040 ?2039) (meet ?2039 (join ?2040 ?2039))) ?2041) (meet (join (meet ?2040 (join (join (meet ?2042 ?2039) (meet ?2039 ?2043)) ?2039)) (meet ?2039 (join ?2040 (join (join (meet ?2042 ?2039) (meet ?2039 ?2043)) ?2039)))) (join (join (meet ?2040 ?2039) (meet ?2039 (join ?2040 ?2039))) ?2041)) =>= ?2039 [2043, 2042, 2041, 2039, 2040] by Demod 1228 with 748 at 3
6176 Id : 2544, {_}: join (meet (join (meet (join (meet ?4547 ?4548) (meet ?4548 (join ?4547 ?4548))) (join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548))))) (meet (join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)))) (join (join (meet ?4547 ?4548) (meet ?4548 (join ?4547 ?4548))) (join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548))))))) ?4551) (meet (join (meet (join (meet ?4547 ?4548) (meet ?4548 (join ?4547 ?4548))) (join (join (meet ?4552 (join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548))))) (meet (join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)))) ?4553)) (join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)))))) (meet (join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)))) (join (join (meet ?4547 ?4548) (meet ?4548 (join ?4547 ?4548))) (join (join (meet ?4552 (join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548))))) (meet (join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)))) ?4553)) (join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)))))))) (join ?4548 ?4551)) =>= join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548))) [4553, 4552, 4551, 4550, 4549, 4548, 4547] by Super 2531 with 1229 at 1,2,2,2
6177 Id : 2938, {_}: join (meet ?4548 ?4551) (meet (join (meet (join (meet ?4547 ?4548) (meet ?4548 (join ?4547 ?4548))) (join (join (meet ?4552 (join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548))))) (meet (join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)))) ?4553)) (join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)))))) (meet (join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)))) (join (join (meet ?4547 ?4548) (meet ?4548 (join ?4547 ?4548))) (join (join (meet ?4552 (join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548))))) (meet (join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)))) ?4553)) (join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)))))))) (join ?4548 ?4551)) =>= join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548))) [4553, 4550, 4549, 4552, 4547, 4551, 4548] by Demod 2544 with 1229 at 1,1,2
6178 Id : 2939, {_}: join (meet ?4548 ?4551) (meet ?4548 (join ?4548 ?4551)) =?= join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548))) [4550, 4549, 4547, 4551, 4548] by Demod 2938 with 1229 at 1,2,2
6179 Id : 2940, {_}: ?4548 =<= join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548))) [4550, 4549, 4547, 4548] by Demod 2939 with 1544 at 2
6180 Id : 2998, {_}: join (meet (join (meet ?2040 ?2039) (meet ?2039 (join ?2040 ?2039))) ?2041) (meet ?2039 (join (join (meet ?2040 ?2039) (meet ?2039 (join ?2040 ?2039))) ?2041)) =>= ?2039 [2041, 2039, 2040] by Demod 1229 with 2940 at 1,2,2
6181 Id : 4435, {_}: join (meet ?7069 ?7068) (meet ?7068 (join ?7069 ?7068)) =>= ?7068 [7068, 7069] by Super 2998 with 4152 at 2
6182 Id : 4973, {_}: ?7997 =<= meet (meet (join ?7998 (join ?7997 ?7999)) (join ?8000 ?7997)) ?7997 [8000, 7999, 7998, 7997] by Super 4152 with 4435 at 3
6183 Id : 7418, {_}: meet ?10627 ?10628 =<= meet (meet (join ?10629 ?10627) (join ?10630 (meet ?10627 ?10628))) (meet ?10627 ?10628) [10630, 10629, 10628, 10627] by Super 4973 with 1544 at 2,1,1,3
6184 Id : 3035, {_}: ?5143 =<= join (meet ?5144 (join (join (meet ?5145 ?5143) (meet ?5143 ?5146)) ?5143)) (meet ?5143 (join ?5144 (join (join (meet ?5145 ?5143) (meet ?5143 ?5146)) ?5143))) [5146, 5145, 5144, 5143] by Demod 2939 with 1544 at 2
6185 Id : 3039, {_}: ?5175 =<= join (meet ?5174 (join (join (meet ?5175 ?5175) (meet ?5175 (join ?5175 ?5175))) ?5175)) (meet ?5175 (join ?5174 (join ?5175 ?5175))) [5174, 5175] by Super 3035 with 1544 at 1,2,2,2,3
6186 Id : 3217, {_}: ?5175 =<= join (meet ?5174 (join ?5175 ?5175)) (meet ?5175 (join ?5174 (join ?5175 ?5175))) [5174, 5175] by Demod 3039 with 1544 at 1,2,1,3
6187 Id : 4899, {_}: ?7757 =<= meet (meet (join ?7758 (join ?7757 ?7759)) (join ?7760 ?7757)) ?7757 [7760, 7759, 7758, 7757] by Super 4152 with 4435 at 3
6188 Id : 4939, {_}: ?6409 =<= join (meet ?6409 ?6409) (meet ?6413 (join ?6409 (meet (meet (join ?6410 (join ?6409 ?6411)) (join ?6412 ?6409)) ?6409))) [6412, 6411, 6410, 6413, 6409] by Demod 4152 with 4899 at 2,1,3
6189 Id : 4940, {_}: ?6409 =<= join (meet ?6409 ?6409) (meet ?6413 (join ?6409 ?6409)) [6413, 6409] by Demod 4939 with 4899 at 2,2,2,3
6190 Id : 4941, {_}: ?7815 =<= join (meet ?7815 ?7815) (join ?7815 ?7815) [7815] by Super 4940 with 4899 at 2,3
6191 Id : 5068, {_}: ?8129 =<= join (meet (meet ?8129 ?8129) (join ?8129 ?8129)) (meet ?8129 ?8129) [8129] by Super 3217 with 4941 at 2,2,3
6192 Id : 5072, {_}: ?8141 =<= meet (meet ?8141 (join ?8142 ?8141)) ?8141 [8142, 8141] by Super 4899 with 4941 at 1,1,3
6193 Id : 5084, {_}: join ?8151 (meet ?8151 (join (meet ?8151 (join ?8152 ?8151)) ?8151)) =>= ?8151 [8152, 8151] by Super 4435 with 5072 at 1,2
6194 Id : 5705, {_}: ?8954 =<= meet (meet (join ?8955 ?8954) (join ?8956 ?8954)) ?8954 [8956, 8955, 8954] by Super 4899 with 5084 at 2,1,1,3
6195 Id : 5955, {_}: join ?9293 ?9293 =<= meet (meet (join ?9294 (join ?9293 ?9293)) ?9293) (join ?9293 ?9293) [9294, 9293] by Super 5705 with 4941 at 2,1,3
6196 Id : 5957, {_}: join ?9299 ?9299 =<= meet (meet ?9299 ?9299) (join ?9299 ?9299) [9299] by Super 5955 with 4941 at 1,1,3
6197 Id : 6022, {_}: ?8129 =<= join (join ?8129 ?8129) (meet ?8129 ?8129) [8129] by Demod 5068 with 5957 at 1,3
6198 Id : 7628, {_}: meet ?11050 ?11050 =<= meet (meet (join ?11051 ?11050) ?11050) (meet ?11050 ?11050) [11051, 11050] by Super 7418 with 6022 at 2,1,3
6199 Id : 6024, {_}: join (join ?9306 ?9306) (meet (join ?9306 ?9306) (join (meet ?9306 ?9306) (join ?9306 ?9306))) =>= join ?9306 ?9306 [9306] by Super 4435 with 5957 at 1,2
6200 Id : 6144, {_}: join (join ?9306 ?9306) (meet (join ?9306 ?9306) ?9306) =>= join ?9306 ?9306 [9306] by Demod 6024 with 4941 at 2,2,2
6201 Id : 6187, {_}: join (meet (join ?9444 ?9444) ?9444) (meet (meet (join ?9444 ?9444) ?9444) (join (meet (meet (join ?9444 ?9444) ?9444) (join ?9444 ?9444)) (meet (join ?9444 ?9444) ?9444))) =>= meet (join ?9444 ?9444) ?9444 [9444] by Super 5084 with 6144 at 2,1,2,2,2
6202 Id : 5117, {_}: ?8275 =<= meet (meet ?8275 (join ?8276 ?8275)) ?8275 [8276, 8275] by Super 4899 with 4941 at 1,1,3
6203 Id : 5128, {_}: join ?8312 ?8312 =<= meet (meet (join ?8312 ?8312) ?8312) (join ?8312 ?8312) [8312] by Super 5117 with 4941 at 2,1,3
6204 Id : 6199, {_}: join (meet (join ?9444 ?9444) ?9444) (meet (meet (join ?9444 ?9444) ?9444) (join (join ?9444 ?9444) (meet (join ?9444 ?9444) ?9444))) =>= meet (join ?9444 ?9444) ?9444 [9444] by Demod 6187 with 5128 at 1,2,2,2
6205 Id : 6200, {_}: join (meet (join ?9444 ?9444) ?9444) (meet (meet (join ?9444 ?9444) ?9444) (join ?9444 ?9444)) =>= meet (join ?9444 ?9444) ?9444 [9444] by Demod 6199 with 6144 at 2,2,2
6206 Id : 6201, {_}: join (meet (join ?9444 ?9444) ?9444) (join ?9444 ?9444) =>= meet (join ?9444 ?9444) ?9444 [9444] by Demod 6200 with 5128 at 2,2
6207 Id : 6718, {_}: ?10018 =<= meet (meet (meet (join ?10018 ?10018) ?10018) (join ?10019 ?10018)) ?10018 [10019, 10018] by Super 4899 with 6201 at 1,1,3
6208 Id : 6736, {_}: ?10071 =<= meet (join ?10071 ?10071) ?10071 [10071] by Super 6718 with 5128 at 1,3
6209 Id : 7650, {_}: meet ?11113 ?11113 =<= meet ?11113 (meet ?11113 ?11113) [11113] by Super 7628 with 6736 at 1,3
6210 Id : 7731, {_}: join (meet ?11160 ?11160) (meet ?11160 (join ?11160 (meet ?11160 ?11160))) =>= ?11160 [11160] by Super 1544 with 7650 at 1,2
6211 Id : 6841, {_}: join ?10124 (meet (join ?10124 ?10124) (join (join ?10124 ?10124) ?10124)) =>= join ?10124 ?10124 [10124] by Super 1544 with 6736 at 1,2
6212 Id : 6817, {_}: join (join ?9306 ?9306) ?9306 =>= join ?9306 ?9306 [9306] by Demod 6144 with 6736 at 2,2
6213 Id : 6906, {_}: join ?10124 (meet (join ?10124 ?10124) (join ?10124 ?10124)) =>= join ?10124 ?10124 [10124] by Demod 6841 with 6817 at 2,2,2
6214 Id : 1656, {_}: join (meet ?3234 ?3235) (meet ?3234 (join ?3234 ?3235)) =>= ?3234 [3235, 3234] by Demod 1164 with 748 at 1,1,2
6215 Id : 1661, {_}: join (meet (meet ?3267 ?3268) (meet ?3267 (join ?3267 ?3268))) (meet (meet ?3267 ?3268) ?3267) =>= meet ?3267 ?3268 [3268, 3267] by Super 1656 with 1544 at 2,2,2
6216 Id : 8992, {_}: meet ?12671 (join ?12672 ?12672) =<= meet (meet (join ?12673 ?12671) ?12672) (meet ?12671 (join ?12672 ?12672)) [12673, 12672, 12671] by Super 7418 with 4940 at 2,1,3
6217 Id : 6822, {_}: join ?9444 (join ?9444 ?9444) =<= meet (join ?9444 ?9444) ?9444 [9444] by Demod 6201 with 6736 at 1,2
6218 Id : 6823, {_}: join ?9444 (join ?9444 ?9444) =>= ?9444 [9444] by Demod 6822 with 6736 at 3
6219 Id : 9646, {_}: meet (join ?13551 ?13551) (join ?13552 ?13552) =<= meet (meet ?13551 ?13552) (meet (join ?13551 ?13551) (join ?13552 ?13552)) [13552, 13551] by Super 8992 with 6823 at 1,1,3
6220 Id : 9670, {_}: meet (join ?13624 ?13624) (join (meet ?13624 ?13624) (meet ?13624 ?13624)) =<= meet (meet ?13624 ?13624) (meet (join ?13624 ?13624) (join (meet ?13624 ?13624) (meet ?13624 ?13624))) [13624] by Super 9646 with 7650 at 1,3
6221 Id : 6333, {_}: meet ?9575 ?9575 =<= meet (meet (join ?9576 (meet ?9575 ?9575)) ?9575) (meet ?9575 ?9575) [9576, 9575] by Super 5705 with 5068 at 2,1,3
6222 Id : 6336, {_}: meet ?9583 ?9583 =<= meet (meet ?9583 ?9583) (meet ?9583 ?9583) [9583] by Super 6333 with 6022 at 1,1,3
6223 Id : 6405, {_}: meet ?9659 ?9659 =<= join (join (meet ?9659 ?9659) (meet ?9659 ?9659)) (meet ?9659 ?9659) [9659] by Super 6022 with 6336 at 2,3
6224 Id : 7013, {_}: meet ?9659 ?9659 =<= join (meet ?9659 ?9659) (meet ?9659 ?9659) [9659] by Demod 6405 with 6817 at 3
6225 Id : 9768, {_}: meet (join ?13624 ?13624) (meet ?13624 ?13624) =<= meet (meet ?13624 ?13624) (meet (join ?13624 ?13624) (join (meet ?13624 ?13624) (meet ?13624 ?13624))) [13624] by Demod 9670 with 7013 at 2,2
6226 Id : 9769, {_}: meet (join ?13624 ?13624) (meet ?13624 ?13624) =<= meet (meet ?13624 ?13624) (meet (join ?13624 ?13624) (meet ?13624 ?13624)) [13624] by Demod 9768 with 7013 at 2,2,3
6227 Id : 10286, {_}: join (meet (meet (meet ?14243 ?14243) (meet (join ?14243 ?14243) (meet ?14243 ?14243))) (meet (meet ?14243 ?14243) (join (meet ?14243 ?14243) (meet (join ?14243 ?14243) (meet ?14243 ?14243))))) (meet (meet (join ?14243 ?14243) (meet ?14243 ?14243)) (meet ?14243 ?14243)) =>= meet (meet ?14243 ?14243) (meet (join ?14243 ?14243) (meet ?14243 ?14243)) [14243] by Super 1661 with 9769 at 1,2,2
6228 Id : 10416, {_}: join (meet (meet (join ?14243 ?14243) (meet ?14243 ?14243)) (meet (meet ?14243 ?14243) (join (meet ?14243 ?14243) (meet (join ?14243 ?14243) (meet ?14243 ?14243))))) (meet (meet (join ?14243 ?14243) (meet ?14243 ?14243)) (meet ?14243 ?14243)) =>= meet (meet ?14243 ?14243) (meet (join ?14243 ?14243) (meet ?14243 ?14243)) [14243] by Demod 10286 with 9769 at 1,1,2
6229 Id : 7044, {_}: meet ?10282 ?10282 =<= join (meet (meet ?10282 ?10282) (meet ?10282 ?10282)) (meet ?10283 (meet ?10282 ?10282)) [10283, 10282] by Super 4940 with 7013 at 2,2,3
6230 Id : 7086, {_}: meet ?10282 ?10282 =<= join (meet ?10282 ?10282) (meet ?10283 (meet ?10282 ?10282)) [10283, 10282] by Demod 7044 with 6336 at 1,3
6231 Id : 10417, {_}: join (meet (meet (join ?14243 ?14243) (meet ?14243 ?14243)) (meet (meet ?14243 ?14243) (meet ?14243 ?14243))) (meet (meet (join ?14243 ?14243) (meet ?14243 ?14243)) (meet ?14243 ?14243)) =>= meet (meet ?14243 ?14243) (meet (join ?14243 ?14243) (meet ?14243 ?14243)) [14243] by Demod 10416 with 7086 at 2,2,1,2
6232 Id : 10418, {_}: join (meet (meet (join ?14243 ?14243) (meet ?14243 ?14243)) (meet ?14243 ?14243)) (meet (meet (join ?14243 ?14243) (meet ?14243 ?14243)) (meet ?14243 ?14243)) =>= meet (meet ?14243 ?14243) (meet (join ?14243 ?14243) (meet ?14243 ?14243)) [14243] by Demod 10417 with 6336 at 2,1,2
6233 Id : 7467, {_}: meet ?10854 ?10854 =<= meet (meet (join ?10855 ?10854) (meet ?10854 ?10854)) (meet ?10854 ?10854) [10855, 10854] by Super 7418 with 7013 at 2,1,3
6234 Id : 10419, {_}: join (meet ?14243 ?14243) (meet (meet (join ?14243 ?14243) (meet ?14243 ?14243)) (meet ?14243 ?14243)) =>= meet (meet ?14243 ?14243) (meet (join ?14243 ?14243) (meet ?14243 ?14243)) [14243] by Demod 10418 with 7467 at 1,2
6235 Id : 10420, {_}: meet ?14243 ?14243 =<= meet (meet ?14243 ?14243) (meet (join ?14243 ?14243) (meet ?14243 ?14243)) [14243] by Demod 10419 with 7086 at 2
6236 Id : 10421, {_}: meet ?14243 ?14243 =<= meet (join ?14243 ?14243) (meet ?14243 ?14243) [14243] by Demod 10420 with 9769 at 3
6237 Id : 10483, {_}: join (meet (meet (join ?14359 ?14359) (meet ?14359 ?14359)) (meet (join ?14359 ?14359) (join (join ?14359 ?14359) (meet ?14359 ?14359)))) (meet (meet ?14359 ?14359) (join ?14359 ?14359)) =>= meet (join ?14359 ?14359) (meet ?14359 ?14359) [14359] by Super 1661 with 10421 at 1,2,2
6238 Id : 10517, {_}: join (meet (meet ?14359 ?14359) (meet (join ?14359 ?14359) (join (join ?14359 ?14359) (meet ?14359 ?14359)))) (meet (meet ?14359 ?14359) (join ?14359 ?14359)) =>= meet (join ?14359 ?14359) (meet ?14359 ?14359) [14359] by Demod 10483 with 10421 at 1,1,2
6239 Id : 10518, {_}: join (meet (meet ?14359 ?14359) (meet (join ?14359 ?14359) ?14359)) (meet (meet ?14359 ?14359) (join ?14359 ?14359)) =>= meet (join ?14359 ?14359) (meet ?14359 ?14359) [14359] by Demod 10517 with 6022 at 2,2,1,2
6240 Id : 10519, {_}: join (meet (meet ?14359 ?14359) ?14359) (meet (meet ?14359 ?14359) (join ?14359 ?14359)) =>= meet (join ?14359 ?14359) (meet ?14359 ?14359) [14359] by Demod 10518 with 6736 at 2,1,2
6241 Id : 10520, {_}: join (meet (meet ?14359 ?14359) ?14359) (join ?14359 ?14359) =>= meet (join ?14359 ?14359) (meet ?14359 ?14359) [14359] by Demod 10519 with 5957 at 2,2
6242 Id : 10521, {_}: join (meet (meet ?14359 ?14359) ?14359) (join ?14359 ?14359) =>= meet ?14359 ?14359 [14359] by Demod 10520 with 10421 at 3
6243 Id : 10992, {_}: join (meet (meet (meet ?14539 ?14539) ?14539) (join ?14539 ?14539)) (meet (join ?14539 ?14539) (meet ?14539 ?14539)) =>= join ?14539 ?14539 [14539] by Super 4435 with 10521 at 2,2,2
6244 Id : 8999, {_}: meet (meet ?12702 ?12702) (join ?12702 ?12702) =<= meet (meet (join ?12703 (meet ?12702 ?12702)) ?12702) (join ?12702 ?12702) [12703, 12702] by Super 8992 with 5957 at 2,3
6245 Id : 10037, {_}: join ?14089 ?14089 =<= meet (meet (join ?14090 (meet ?14089 ?14089)) ?14089) (join ?14089 ?14089) [14090, 14089] by Demod 8999 with 5957 at 2
6246 Id : 10046, {_}: join ?14111 ?14111 =<= meet (meet (meet ?14111 ?14111) ?14111) (join ?14111 ?14111) [14111] by Super 10037 with 7013 at 1,1,3
6247 Id : 11120, {_}: join (join ?14539 ?14539) (meet (join ?14539 ?14539) (meet ?14539 ?14539)) =>= join ?14539 ?14539 [14539] by Demod 10992 with 10046 at 1,2
6248 Id : 11121, {_}: join (join ?14539 ?14539) (meet ?14539 ?14539) =>= join ?14539 ?14539 [14539] by Demod 11120 with 10421 at 2,2
6249 Id : 11122, {_}: ?14539 =<= join ?14539 ?14539 [14539] by Demod 11121 with 6022 at 2
6250 Id : 11192, {_}: join ?10124 (meet ?10124 (join ?10124 ?10124)) =>= join ?10124 ?10124 [10124] by Demod 6906 with 11122 at 1,2,2
6251 Id : 11193, {_}: join ?10124 (meet ?10124 ?10124) =>= join ?10124 ?10124 [10124] by Demod 11192 with 11122 at 2,2,2
6252 Id : 11194, {_}: join ?10124 (meet ?10124 ?10124) =>= ?10124 [10124] by Demod 11193 with 11122 at 3
6253 Id : 11206, {_}: join (meet ?11160 ?11160) (meet ?11160 ?11160) =>= ?11160 [11160] by Demod 7731 with 11194 at 2,2,2
6254 Id : 11207, {_}: meet ?11160 ?11160 =>= ?11160 [11160] by Demod 11206 with 11122 at 2
6255 Id : 11456, {_}: a === a [] by Demod 2 with 11207 at 2
6256 Id : 2, {_}: meet a a =>= a [] by prove_normal_axioms_1
6257 % SZS output end CNFRefutation for LAT080-1.p
6265 prove_normal_axioms_8 is 94
6269 join (meet (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4)
6271 (join (meet ?2 (join (join (meet ?5 ?3) (meet ?3 ?6)) ?3))
6275 (meet (meet (join ?5 (join ?3 ?6)) (join ?7 ?3)) ?3))
6278 (meet (meet (join ?5 (join ?3 ?6)) (join ?7 ?3)) ?3))))
6279 (join ?2 (join (join (meet ?5 ?3) (meet ?3 ?6)) ?3))))
6280 (join (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4))
6283 [8, 7, 6, 5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5 ?6 ?7 ?8
6285 Id : 2, {_}: join a (meet a b) =>= a [] by prove_normal_axioms_8
6286 Found proof, 13.641729s
6287 % SZS status Unsatisfiable for LAT087-1.p
6288 % SZS output start CNFRefutation for LAT087-1.p
6289 Id : 4, {_}: join (meet (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4) (meet (join (meet ?2 (join (join (meet ?5 ?3) (meet ?3 ?6)) ?3)) (meet (join (meet ?3 (meet (meet (join ?5 (join ?3 ?6)) (join ?7 ?3)) ?3)) (meet ?8 (join ?3 (meet (meet (join ?5 (join ?3 ?6)) (join ?7 ?3)) ?3)))) (join ?2 (join (join (meet ?5 ?3) (meet ?3 ?6)) ?3)))) (join (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4)) =>= ?3 [8, 7, 6, 5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5 ?6 ?7 ?8
6290 Id : 5, {_}: join (meet (join (meet ?10 ?11) (meet ?11 (join ?10 ?11))) ?12) (meet (join (meet ?10 (join (join (meet ?13 ?11) (meet ?11 ?14)) ?11)) (meet (join (meet ?11 (meet (meet (join ?13 (join ?11 ?14)) (join ?15 ?11)) ?11)) (meet ?16 (join ?11 (meet (meet (join ?13 (join ?11 ?14)) (join ?15 ?11)) ?11)))) (join ?10 (join (join (meet ?13 ?11) (meet ?11 ?14)) ?11)))) (join (join (meet ?10 ?11) (meet ?11 (join ?10 ?11))) ?12)) =>= ?11 [16, 15, 14, 13, 12, 11, 10] by single_axiom ?10 ?11 ?12 ?13 ?14 ?15 ?16
6291 Id : 39, {_}: join (meet (join (meet ?287 (join (meet ?288 ?289) (meet ?289 (join ?288 ?289)))) (meet (join (meet ?288 ?289) (meet ?289 (join ?288 ?289))) (join ?287 (join (meet ?288 ?289) (meet ?289 (join ?288 ?289)))))) ?290) (meet (join (meet ?287 (join (join (meet ?291 (join (meet ?288 ?289) (meet ?289 (join ?288 ?289)))) (meet (join (meet ?288 ?289) (meet ?289 (join ?288 ?289))) ?292)) (join (meet ?288 ?289) (meet ?289 (join ?288 ?289))))) (meet ?289 (join ?287 (join (join (meet ?291 (join (meet ?288 ?289) (meet ?289 (join ?288 ?289)))) (meet (join (meet ?288 ?289) (meet ?289 (join ?288 ?289))) ?292)) (join (meet ?288 ?289) (meet ?289 (join ?288 ?289))))))) (join (join (meet ?287 (join (meet ?288 ?289) (meet ?289 (join ?288 ?289)))) (meet (join (meet ?288 ?289) (meet ?289 (join ?288 ?289))) (join ?287 (join (meet ?288 ?289) (meet ?289 (join ?288 ?289)))))) ?290)) =>= join (meet ?288 ?289) (meet ?289 (join ?288 ?289)) [292, 291, 290, 289, 288, 287] by Super 5 with 4 at 1,2,1,2,2
6292 Id : 42, {_}: join (meet (join (meet ?323 (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))))) (meet (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))) (join ?323 (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))))))) ?324) (meet (join (meet ?323 (join (join (meet ?325 (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))))) (meet (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))) ?326)) (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join ?323 (join (join (meet ?325 (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))))) (meet (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))) ?326)) (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))))))) (join (join (meet ?323 (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))))) (meet (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))) (join ?323 ?318))) ?324)) =>= join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))) [326, 325, 324, 322, 321, 320, 319, 318, 317, 323] by Super 39 with 4 at 2,2,2,1,2,2,2
6293 Id : 126, {_}: join (meet (join (meet ?323 ?318) (meet (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))) (join ?323 (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) 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(join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))) [326, 325, 324, 322, 321, 320, 319, 317, 318, 323] by Demod 126 with 4 at 1,2,1,1,2
6295 Id : 128, {_}: join (meet (join (meet ?323 ?318) (meet ?318 (join ?323 ?318))) ?324) (meet (join (meet ?323 (join (join (meet ?325 (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet 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(meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))) (join ?323 ?318))) ?324)) =>= join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join 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6296 Id : 129, {_}: join (meet (join (meet ?323 ?318) (meet ?318 (join ?323 ?318))) ?324) (meet (join (meet ?323 (join (join (meet ?325 ?318) (meet (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join 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?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))) (join ?323 ?318))) ?324)) =>= join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))) [326, 322, 321, 320, 319, 317, 325, 324, 318, 323] by Demod 128 with 4 at 2,1,1,2,1,1,2,2
6297 Id : 130, {_}: join (meet (join (meet ?323 ?318) (meet ?318 (join ?323 ?318))) ?324) (meet (join (meet ?323 (join (join (meet ?325 ?318) (meet ?318 ?326)) (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) 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(meet (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))) (join ?323 ?318))) ?324)) =>= join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))) [322, 321, 320, 319, 317, 326, 325, 324, 318, 323] by Demod 129 with 4 at 1,2,1,2,1,1,2,2
6298 Id : 131, {_}: join (meet (join (meet ?323 ?318) (meet ?318 (join ?323 ?318))) ?324) (meet (join (meet ?323 (join (join (meet ?325 ?318) (meet ?318 ?326)) ?318)) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join ?323 (join (join (meet ?325 (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join 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?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))) ?326)) (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 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?320)) ?318))))))) (join ?323 ?318))) ?324)) =>= join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet 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6299 Id : 132, {_}: join (meet (join (meet ?323 ?318) (meet ?318 (join ?323 ?318))) ?324) (meet (join (meet ?323 (join (join (meet ?325 ?318) (meet ?318 ?326)) ?318)) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join ?323 (join (join (meet ?325 ?318) (meet (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))) ?326)) (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))))))) (join (join (meet ?323 (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))))) (meet (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))) (join ?323 ?318))) ?324)) =>= join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))) [322, 321, 320, 319, 317, 326, 325, 324, 318, 323] by Demod 131 with 4 at 2,1,1,2,2,2,1,2,2
6300 Id : 133, {_}: join (meet (join (meet ?323 ?318) (meet ?318 (join ?323 ?318))) ?324) (meet (join (meet ?323 (join (join (meet ?325 ?318) (meet ?318 ?326)) ?318)) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join ?323 (join (join (meet ?325 ?318) (meet ?318 ?326)) (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))))))) (join (join (meet ?323 (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))))) (meet (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))) (join ?323 ?318))) ?324)) =>= join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))) [322, 321, 320, 319, 317, 326, 325, 324, 318, 323] by Demod 132 with 4 at 1,2,1,2,2,2,1,2,2
6301 Id : 134, {_}: join (meet (join (meet ?323 ?318) (meet ?318 (join ?323 ?318))) ?324) (meet (join (meet ?323 (join (join (meet ?325 ?318) (meet ?318 ?326)) ?318)) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join ?323 (join (join (meet ?325 ?318) (meet ?318 ?326)) ?318)))) (join (join (meet ?323 (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))))) (meet (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))) (join ?323 ?318))) ?324)) =>= join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))) [322, 321, 320, 319, 317, 326, 325, 324, 318, 323] by Demod 133 with 4 at 2,2,2,2,1,2,2
6302 Id : 135, {_}: join (meet (join (meet ?323 ?318) (meet ?318 (join ?323 ?318))) ?324) (meet (join (meet ?323 (join (join (meet ?325 ?318) (meet ?318 ?326)) ?318)) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join ?323 (join (join (meet ?325 ?318) (meet ?318 ?326)) ?318)))) (join (join (meet ?323 ?318) (meet (join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))))) (join ?323 ?318))) ?324)) =>= join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))) [322, 321, 320, 319, 317, 326, 325, 324, 318, 323] by Demod 134 with 4 at 2,1,1,2,2,2
6303 Id : 136, {_}: join (meet (join (meet ?323 ?318) (meet ?318 (join ?323 ?318))) ?324) (meet (join (meet ?323 (join (join (meet ?325 ?318) (meet ?318 ?326)) ?318)) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join ?323 (join (join (meet ?325 ?318) (meet ?318 ?326)) ?318)))) (join (join (meet ?323 ?318) (meet ?318 (join ?323 ?318))) ?324)) =?= join (meet (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318))))) (meet (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))) (join (join (meet ?317 ?318) (meet ?318 (join ?317 ?318))) (join (meet ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)) (meet (join (meet ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)) (meet ?322 (join ?318 (meet (meet (join ?319 (join ?318 ?320)) (join ?321 ?318)) ?318)))) (join ?317 (join (join (meet ?319 ?318) (meet ?318 ?320)) ?318)))))) [322, 321, 320, 319, 317, 326, 325, 324, 318, 323] by Demod 135 with 4 at 1,2,1,2,2,2
6304 Id : 714, {_}: join (meet (join (meet ?1381 ?1382) (meet ?1382 (join ?1381 ?1382))) ?1383) (meet (join (meet ?1381 (join (join (meet ?1384 ?1382) (meet ?1382 ?1385)) ?1382)) (meet (join (meet ?1386 (join (join (meet ?1387 ?1382) (meet ?1382 ?1388)) ?1382)) (meet (join (meet ?1382 (meet (meet (join ?1387 (join ?1382 ?1388)) (join ?1389 ?1382)) ?1382)) (meet ?1390 (join ?1382 (meet (meet (join ?1387 (join ?1382 ?1388)) (join ?1389 ?1382)) ?1382)))) (join ?1386 (join (join (meet ?1387 ?1382) (meet ?1382 ?1388)) ?1382)))) (join ?1381 (join (join (meet ?1384 ?1382) (meet ?1382 ?1385)) ?1382)))) (join (join (meet ?1381 ?1382) (meet ?1382 (join ?1381 ?1382))) ?1383)) =>= ?1382 [1390, 1389, 1388, 1387, 1386, 1385, 1384, 1383, 1382, 1381] by Demod 136 with 4 at 3
6305 Id : 1147, {_}: join (meet (join (meet (join (meet ?2510 ?2511) (meet ?2511 (join ?2510 ?2511))) ?2511) (meet ?2511 (join (join (meet ?2510 ?2511) (meet ?2511 (join ?2510 ?2511))) ?2511))) ?2512) (meet ?2511 (join (join (meet (join (meet ?2510 ?2511) (meet ?2511 (join ?2510 ?2511))) ?2511) (meet ?2511 (join (join (meet ?2510 ?2511) (meet ?2511 (join ?2510 ?2511))) ?2511))) ?2512)) =>= ?2511 [2512, 2511, 2510] by Super 714 with 4 at 1,2,2
6306 Id : 748, {_}: join (meet (join (meet (join (meet ?1916 ?1912) (meet ?1912 (join ?1916 ?1912))) ?1912) (meet ?1912 (join (join (meet ?1916 ?1912) (meet ?1912 (join ?1916 ?1912))) ?1912))) ?1913) (meet ?1912 (join (join (meet (join (meet ?1916 ?1912) (meet ?1912 (join ?1916 ?1912))) ?1912) (meet ?1912 (join (join (meet ?1916 ?1912) (meet ?1912 (join ?1916 ?1912))) ?1912))) ?1913)) =>= ?1912 [1913, 1912, 1916] by Super 714 with 4 at 1,2,2
6307 Id : 1164, {_}: join (meet (join (meet (join (meet (join (meet ?2642 ?2643) (meet ?2643 (join ?2642 ?2643))) ?2643) (meet ?2643 (join (join (meet ?2642 ?2643) (meet ?2643 (join ?2642 ?2643))) ?2643))) ?2643) (meet ?2643 (join (join (meet (join (meet ?2642 ?2643) (meet ?2643 (join ?2642 ?2643))) ?2643) (meet ?2643 (join (join (meet ?2642 ?2643) (meet ?2643 (join ?2642 ?2643))) ?2643))) ?2643))) ?2644) (meet ?2643 (join ?2643 ?2644)) =>= ?2643 [2644, 2643, 2642] by Super 1147 with 748 at 1,2,2,2
6308 Id : 1544, {_}: join (meet ?2643 ?2644) (meet ?2643 (join ?2643 ?2644)) =>= ?2643 [2644, 2643] by Demod 1164 with 748 at 1,1,2
6309 Id : 13, {_}: join (meet (join (meet ?112 (join (meet ?106 ?107) (meet ?107 (join ?106 ?107)))) (meet (join (meet ?106 ?107) (meet ?107 (join ?106 ?107))) (join ?112 (join (meet ?106 ?107) (meet ?107 (join ?106 ?107)))))) ?113) (meet (join (meet ?112 (join (join (meet ?114 (join (meet ?106 ?107) (meet ?107 (join ?106 ?107)))) (meet (join (meet ?106 ?107) (meet ?107 (join ?106 ?107))) ?115)) (join (meet ?106 ?107) (meet ?107 (join ?106 ?107))))) (meet ?107 (join ?112 (join (join (meet ?114 (join (meet ?106 ?107) (meet ?107 (join ?106 ?107)))) (meet (join (meet ?106 ?107) (meet ?107 (join ?106 ?107))) ?115)) (join (meet ?106 ?107) (meet ?107 (join ?106 ?107))))))) (join (join (meet ?112 (join (meet ?106 ?107) (meet ?107 (join ?106 ?107)))) (meet (join (meet ?106 ?107) (meet ?107 (join ?106 ?107))) (join ?112 (join (meet ?106 ?107) (meet ?107 (join ?106 ?107)))))) ?113)) =>= join (meet ?106 ?107) (meet ?107 (join ?106 ?107)) [115, 114, 113, 107, 106, 112] by Super 5 with 4 at 1,2,1,2,2
6310 Id : 1092, {_}: join (meet (join (meet ?2040 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) (join ?2040 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))))) ?2041) (meet (join (meet ?2040 (join (join (meet ?2042 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) ?2043)) (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))))) (meet ?2039 (join ?2040 (join (join (meet ?2042 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) ?2043)) (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))))))) (join (join (meet ?2040 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) (join ?2040 ?2039))) ?2041)) =>= join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)) [2043, 2042, 2041, 2039, 2038, 2040] by Super 13 with 748 at 2,2,2,1,2,2,2
6311 Id : 1218, {_}: join (meet (join (meet ?2040 ?2039) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) (join ?2040 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))))) ?2041) (meet (join (meet ?2040 (join (join (meet ?2042 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) ?2043)) (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))))) (meet ?2039 (join ?2040 (join (join (meet ?2042 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) ?2043)) (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))))))) (join (join (meet ?2040 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) (join ?2040 ?2039))) ?2041)) =>= join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)) [2043, 2042, 2041, 2038, 2039, 2040] by Demod 1092 with 748 at 2,1,1,1,2
6312 Id : 1219, {_}: join (meet (join (meet ?2040 ?2039) (meet ?2039 (join ?2040 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))))) ?2041) (meet (join (meet ?2040 (join (join (meet ?2042 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) ?2043)) (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))))) (meet ?2039 (join ?2040 (join (join (meet ?2042 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) ?2043)) (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))))))) (join (join (meet ?2040 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) (join ?2040 ?2039))) ?2041)) =>= join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)) [2043, 2042, 2041, 2038, 2039, 2040] by Demod 1218 with 748 at 1,2,1,1,2
6313 Id : 1220, {_}: join (meet (join (meet ?2040 ?2039) (meet ?2039 (join ?2040 ?2039))) ?2041) (meet (join (meet ?2040 (join (join (meet ?2042 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) ?2043)) (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))))) (meet ?2039 (join ?2040 (join (join (meet ?2042 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) ?2043)) (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))))))) (join (join (meet ?2040 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) (join ?2040 ?2039))) ?2041)) =>= join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)) [2043, 2038, 2042, 2041, 2039, 2040] by Demod 1219 with 748 at 2,2,2,1,1,2
6314 Id : 1221, {_}: join (meet (join (meet ?2040 ?2039) (meet ?2039 (join ?2040 ?2039))) ?2041) (meet (join (meet ?2040 (join (join (meet ?2042 ?2039) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) ?2043)) (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))))) (meet ?2039 (join ?2040 (join (join (meet ?2042 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) ?2043)) (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))))))) (join (join (meet ?2040 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) (join ?2040 ?2039))) ?2041)) =>= join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)) [2043, 2038, 2042, 2041, 2039, 2040] by Demod 1220 with 748 at 2,1,1,2,1,1,2,2
6315 Id : 1222, {_}: join (meet (join (meet ?2040 ?2039) (meet ?2039 (join ?2040 ?2039))) ?2041) (meet (join (meet ?2040 (join (join (meet ?2042 ?2039) (meet ?2039 ?2043)) (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))))) (meet ?2039 (join ?2040 (join (join (meet ?2042 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) ?2043)) (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))))))) (join (join (meet ?2040 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) (join ?2040 ?2039))) ?2041)) =>= join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)) [2038, 2043, 2042, 2041, 2039, 2040] by Demod 1221 with 748 at 1,2,1,2,1,1,2,2
6316 Id : 1223, {_}: join (meet (join (meet ?2040 ?2039) (meet ?2039 (join ?2040 ?2039))) ?2041) (meet (join (meet ?2040 (join (join (meet ?2042 ?2039) (meet ?2039 ?2043)) ?2039)) (meet ?2039 (join ?2040 (join (join (meet ?2042 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) ?2043)) (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))))))) (join (join (meet ?2040 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) (join ?2040 ?2039))) ?2041)) =>= join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)) [2038, 2043, 2042, 2041, 2039, 2040] by Demod 1222 with 748 at 2,2,1,1,2,2
6317 Id : 1224, {_}: join (meet (join (meet ?2040 ?2039) (meet ?2039 (join ?2040 ?2039))) ?2041) (meet (join (meet ?2040 (join (join (meet ?2042 ?2039) (meet ?2039 ?2043)) ?2039)) (meet ?2039 (join ?2040 (join (join (meet ?2042 ?2039) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) ?2043)) (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))))))) (join (join (meet ?2040 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) (join ?2040 ?2039))) ?2041)) =>= join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)) [2038, 2043, 2042, 2041, 2039, 2040] by Demod 1223 with 748 at 2,1,1,2,2,2,1,2,2
6318 Id : 1225, {_}: join (meet (join (meet ?2040 ?2039) (meet ?2039 (join ?2040 ?2039))) ?2041) (meet (join (meet ?2040 (join (join (meet ?2042 ?2039) (meet ?2039 ?2043)) ?2039)) (meet ?2039 (join ?2040 (join (join (meet ?2042 ?2039) (meet ?2039 ?2043)) (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))))))) (join (join (meet ?2040 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) (join ?2040 ?2039))) ?2041)) =>= join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)) [2038, 2043, 2042, 2041, 2039, 2040] by Demod 1224 with 748 at 1,2,1,2,2,2,1,2,2
6319 Id : 1226, {_}: join (meet (join (meet ?2040 ?2039) (meet ?2039 (join ?2040 ?2039))) ?2041) (meet (join (meet ?2040 (join (join (meet ?2042 ?2039) (meet ?2039 ?2043)) ?2039)) (meet ?2039 (join ?2040 (join (join (meet ?2042 ?2039) (meet ?2039 ?2043)) ?2039)))) (join (join (meet ?2040 (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)))) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) (join ?2040 ?2039))) ?2041)) =>= join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)) [2038, 2043, 2042, 2041, 2039, 2040] by Demod 1225 with 748 at 2,2,2,2,1,2,2
6320 Id : 1227, {_}: join (meet (join (meet ?2040 ?2039) (meet ?2039 (join ?2040 ?2039))) ?2041) (meet (join (meet ?2040 (join (join (meet ?2042 ?2039) (meet ?2039 ?2043)) ?2039)) (meet ?2039 (join ?2040 (join (join (meet ?2042 ?2039) (meet ?2039 ?2043)) ?2039)))) (join (join (meet ?2040 ?2039) (meet (join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039))) (join ?2040 ?2039))) ?2041)) =>= join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)) [2038, 2043, 2042, 2041, 2039, 2040] by Demod 1226 with 748 at 2,1,1,2,2,2
6321 Id : 1228, {_}: join (meet (join (meet ?2040 ?2039) (meet ?2039 (join ?2040 ?2039))) ?2041) (meet (join (meet ?2040 (join (join (meet ?2042 ?2039) (meet ?2039 ?2043)) ?2039)) (meet ?2039 (join ?2040 (join (join (meet ?2042 ?2039) (meet ?2039 ?2043)) ?2039)))) (join (join (meet ?2040 ?2039) (meet ?2039 (join ?2040 ?2039))) ?2041)) =?= join (meet (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039) (meet ?2039 (join (join (meet (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039) (meet ?2039 (join (join (meet ?2038 ?2039) (meet ?2039 (join ?2038 ?2039))) ?2039))) ?2039)) [2038, 2043, 2042, 2041, 2039, 2040] by Demod 1227 with 748 at 1,2,1,2,2,2
6322 Id : 2531, {_}: join (meet (join (meet ?4434 ?4435) (meet ?4435 (join ?4434 ?4435))) ?4436) (meet (join (meet ?4434 (join (join (meet ?4437 ?4435) (meet ?4435 ?4438)) ?4435)) (meet ?4435 (join ?4434 (join (join (meet ?4437 ?4435) (meet ?4435 ?4438)) ?4435)))) (join (join (meet ?4434 ?4435) (meet ?4435 (join ?4434 ?4435))) ?4436)) =>= ?4435 [4438, 4437, 4436, 4435, 4434] by Demod 1228 with 748 at 3
6323 Id : 1229, {_}: join (meet (join (meet ?2040 ?2039) (meet ?2039 (join ?2040 ?2039))) ?2041) (meet (join (meet ?2040 (join (join (meet ?2042 ?2039) (meet ?2039 ?2043)) ?2039)) (meet ?2039 (join ?2040 (join (join (meet ?2042 ?2039) (meet ?2039 ?2043)) ?2039)))) (join (join (meet ?2040 ?2039) (meet ?2039 (join ?2040 ?2039))) ?2041)) =>= ?2039 [2043, 2042, 2041, 2039, 2040] by Demod 1228 with 748 at 3
6324 Id : 2544, {_}: join (meet (join (meet (join (meet ?4547 ?4548) (meet ?4548 (join ?4547 ?4548))) (join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548))))) (meet (join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)))) (join (join (meet ?4547 ?4548) (meet ?4548 (join ?4547 ?4548))) (join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548))))))) ?4551) (meet (join (meet (join (meet ?4547 ?4548) (meet ?4548 (join ?4547 ?4548))) (join (join (meet ?4552 (join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548))))) (meet (join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)))) ?4553)) (join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)))))) (meet (join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)))) (join (join (meet ?4547 ?4548) (meet ?4548 (join ?4547 ?4548))) (join (join (meet ?4552 (join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548))))) (meet (join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)))) ?4553)) (join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)))))))) (join ?4548 ?4551)) =>= join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548))) [4553, 4552, 4551, 4550, 4549, 4548, 4547] by Super 2531 with 1229 at 1,2,2,2
6325 Id : 2938, {_}: join (meet ?4548 ?4551) (meet (join (meet (join (meet ?4547 ?4548) (meet ?4548 (join ?4547 ?4548))) (join (join (meet ?4552 (join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548))))) (meet (join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)))) ?4553)) (join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)))))) (meet (join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)))) (join (join (meet ?4547 ?4548) (meet ?4548 (join ?4547 ?4548))) (join (join (meet ?4552 (join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548))))) (meet (join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)))) ?4553)) (join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)))))))) (join ?4548 ?4551)) =>= join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548))) [4553, 4550, 4549, 4552, 4547, 4551, 4548] by Demod 2544 with 1229 at 1,1,2
6326 Id : 2939, {_}: join (meet ?4548 ?4551) (meet ?4548 (join ?4548 ?4551)) =?= join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548))) [4550, 4549, 4547, 4551, 4548] by Demod 2938 with 1229 at 1,2,2
6327 Id : 2940, {_}: ?4548 =<= join (meet ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548)) (meet ?4548 (join ?4547 (join (join (meet ?4549 ?4548) (meet ?4548 ?4550)) ?4548))) [4550, 4549, 4547, 4548] by Demod 2939 with 1544 at 2
6328 Id : 2998, {_}: join (meet (join (meet ?2040 ?2039) (meet ?2039 (join ?2040 ?2039))) ?2041) (meet ?2039 (join (join (meet ?2040 ?2039) (meet ?2039 (join ?2040 ?2039))) ?2041)) =>= ?2039 [2041, 2039, 2040] by Demod 1229 with 2940 at 1,2,2
6329 Id : 2540, {_}: join (meet (join (meet (join (meet ?4509 ?4510) (meet ?4510 (join ?4509 ?4510))) (join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510))))) (meet (join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)))) (join (join (meet ?4509 ?4510) (meet ?4510 (join ?4509 ?4510))) (join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510))))))) ?4515) (meet (join (meet (join (meet ?4509 ?4510) (meet ?4510 (join ?4509 ?4510))) (join (join (meet ?4516 (join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510))))) (meet (join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)))) ?4517)) (join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)))))) (meet (join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)))) (join (join (meet ?4509 ?4510) (meet ?4510 (join ?4509 ?4510))) (join (join (meet ?4516 (join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510))))) (meet (join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)))) ?4517)) (join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)))))))) (join ?4510 ?4515)) =>= join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510))) [4517, 4516, 4515, 4514, 4513, 4512, 4511, 4510, 4509] by Super 2531 with 4 at 1,2,2,2
6330 Id : 2926, {_}: join (meet ?4510 ?4515) (meet (join (meet (join (meet ?4509 ?4510) (meet ?4510 (join ?4509 ?4510))) (join (join (meet ?4516 (join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510))))) (meet (join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)))) ?4517)) (join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)))))) (meet (join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)))) (join (join (meet ?4509 ?4510) (meet ?4510 (join ?4509 ?4510))) (join (join (meet ?4516 (join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510))))) (meet (join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)))) ?4517)) (join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)))))))) (join ?4510 ?4515)) =>= join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510))) [4517, 4514, 4513, 4512, 4511, 4516, 4509, 4515, 4510] by Demod 2540 with 4 at 1,1,2
6331 Id : 2927, {_}: join (meet ?4510 ?4515) (meet ?4510 (join ?4510 ?4515)) =?= join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510))) [4514, 4513, 4512, 4511, 4509, 4515, 4510] by Demod 2926 with 4 at 1,2,2
6332 Id : 2928, {_}: ?4510 =<= join (meet ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510)) (meet (join (meet ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)) (meet ?4514 (join ?4510 (meet (meet (join ?4511 (join ?4510 ?4512)) (join ?4513 ?4510)) ?4510)))) (join ?4509 (join (join (meet ?4511 ?4510) (meet ?4510 ?4512)) ?4510))) [4514, 4513, 4512, 4511, 4509, 4510] by Demod 2927 with 1544 at 2
6333 Id : 4152, {_}: ?6409 =<= join (meet ?6409 (meet (meet (join ?6410 (join ?6409 ?6411)) (join ?6412 ?6409)) ?6409)) (meet ?6413 (join ?6409 (meet (meet (join ?6410 (join ?6409 ?6411)) (join ?6412 ?6409)) ?6409))) [6413, 6412, 6411, 6410, 6409] by Super 1544 with 2928 at 2
6334 Id : 4435, {_}: join (meet ?7069 ?7068) (meet ?7068 (join ?7069 ?7068)) =>= ?7068 [7068, 7069] by Super 2998 with 4152 at 2
6335 Id : 1656, {_}: join (meet ?3234 ?3235) (meet ?3234 (join ?3234 ?3235)) =>= ?3234 [3235, 3234] by Demod 1164 with 748 at 1,1,2
6336 Id : 1661, {_}: join (meet (meet ?3267 ?3268) (meet ?3267 (join ?3267 ?3268))) (meet (meet ?3267 ?3268) ?3267) =>= meet ?3267 ?3268 [3268, 3267] by Super 1656 with 1544 at 2,2,2
6337 Id : 4973, {_}: ?7997 =<= meet (meet (join ?7998 (join ?7997 ?7999)) (join ?8000 ?7997)) ?7997 [8000, 7999, 7998, 7997] by Super 4152 with 4435 at 3
6338 Id : 7418, {_}: meet ?10627 ?10628 =<= meet (meet (join ?10629 ?10627) (join ?10630 (meet ?10627 ?10628))) (meet ?10627 ?10628) [10630, 10629, 10628, 10627] by Super 4973 with 1544 at 2,1,1,3
6339 Id : 4899, {_}: ?7757 =<= meet (meet (join ?7758 (join ?7757 ?7759)) (join ?7760 ?7757)) ?7757 [7760, 7759, 7758, 7757] by Super 4152 with 4435 at 3
6340 Id : 4939, {_}: ?6409 =<= join (meet ?6409 ?6409) (meet ?6413 (join ?6409 (meet (meet (join ?6410 (join ?6409 ?6411)) (join ?6412 ?6409)) ?6409))) [6412, 6411, 6410, 6413, 6409] by Demod 4152 with 4899 at 2,1,3
6341 Id : 4940, {_}: ?6409 =<= join (meet ?6409 ?6409) (meet ?6413 (join ?6409 ?6409)) [6413, 6409] by Demod 4939 with 4899 at 2,2,2,3
6342 Id : 8992, {_}: meet ?12671 (join ?12672 ?12672) =<= meet (meet (join ?12673 ?12671) ?12672) (meet ?12671 (join ?12672 ?12672)) [12673, 12672, 12671] by Super 7418 with 4940 at 2,1,3
6343 Id : 4941, {_}: ?7815 =<= join (meet ?7815 ?7815) (join ?7815 ?7815) [7815] by Super 4940 with 4899 at 2,3
6344 Id : 5072, {_}: ?8141 =<= meet (meet ?8141 (join ?8142 ?8141)) ?8141 [8142, 8141] by Super 4899 with 4941 at 1,1,3
6345 Id : 5084, {_}: join ?8151 (meet ?8151 (join (meet ?8151 (join ?8152 ?8151)) ?8151)) =>= ?8151 [8152, 8151] by Super 4435 with 5072 at 1,2
6346 Id : 5705, {_}: ?8954 =<= meet (meet (join ?8955 ?8954) (join ?8956 ?8954)) ?8954 [8956, 8955, 8954] by Super 4899 with 5084 at 2,1,1,3
6347 Id : 5955, {_}: join ?9293 ?9293 =<= meet (meet (join ?9294 (join ?9293 ?9293)) ?9293) (join ?9293 ?9293) [9294, 9293] by Super 5705 with 4941 at 2,1,3
6348 Id : 5957, {_}: join ?9299 ?9299 =<= meet (meet ?9299 ?9299) (join ?9299 ?9299) [9299] by Super 5955 with 4941 at 1,1,3
6349 Id : 6024, {_}: join (join ?9306 ?9306) (meet (join ?9306 ?9306) (join (meet ?9306 ?9306) (join ?9306 ?9306))) =>= join ?9306 ?9306 [9306] by Super 4435 with 5957 at 1,2
6350 Id : 6144, {_}: join (join ?9306 ?9306) (meet (join ?9306 ?9306) ?9306) =>= join ?9306 ?9306 [9306] by Demod 6024 with 4941 at 2,2,2
6351 Id : 6187, {_}: join (meet (join ?9444 ?9444) ?9444) (meet (meet (join ?9444 ?9444) ?9444) (join (meet (meet (join ?9444 ?9444) ?9444) (join ?9444 ?9444)) (meet (join ?9444 ?9444) ?9444))) =>= meet (join ?9444 ?9444) ?9444 [9444] by Super 5084 with 6144 at 2,1,2,2,2
6352 Id : 5117, {_}: ?8275 =<= meet (meet ?8275 (join ?8276 ?8275)) ?8275 [8276, 8275] by Super 4899 with 4941 at 1,1,3
6353 Id : 5128, {_}: join ?8312 ?8312 =<= meet (meet (join ?8312 ?8312) ?8312) (join ?8312 ?8312) [8312] by Super 5117 with 4941 at 2,1,3
6354 Id : 6199, {_}: join (meet (join ?9444 ?9444) ?9444) (meet (meet (join ?9444 ?9444) ?9444) (join (join ?9444 ?9444) (meet (join ?9444 ?9444) ?9444))) =>= meet (join ?9444 ?9444) ?9444 [9444] by Demod 6187 with 5128 at 1,2,2,2
6355 Id : 6200, {_}: join (meet (join ?9444 ?9444) ?9444) (meet (meet (join ?9444 ?9444) ?9444) (join ?9444 ?9444)) =>= meet (join ?9444 ?9444) ?9444 [9444] by Demod 6199 with 6144 at 2,2,2
6356 Id : 6201, {_}: join (meet (join ?9444 ?9444) ?9444) (join ?9444 ?9444) =>= meet (join ?9444 ?9444) ?9444 [9444] by Demod 6200 with 5128 at 2,2
6357 Id : 6718, {_}: ?10018 =<= meet (meet (meet (join ?10018 ?10018) ?10018) (join ?10019 ?10018)) ?10018 [10019, 10018] by Super 4899 with 6201 at 1,1,3
6358 Id : 6736, {_}: ?10071 =<= meet (join ?10071 ?10071) ?10071 [10071] by Super 6718 with 5128 at 1,3
6359 Id : 6822, {_}: join ?9444 (join ?9444 ?9444) =<= meet (join ?9444 ?9444) ?9444 [9444] by Demod 6201 with 6736 at 1,2
6360 Id : 6823, {_}: join ?9444 (join ?9444 ?9444) =>= ?9444 [9444] by Demod 6822 with 6736 at 3
6361 Id : 9646, {_}: meet (join ?13551 ?13551) (join ?13552 ?13552) =<= meet (meet ?13551 ?13552) (meet (join ?13551 ?13551) (join ?13552 ?13552)) [13552, 13551] by Super 8992 with 6823 at 1,1,3
6362 Id : 3035, {_}: ?5143 =<= join (meet ?5144 (join (join (meet ?5145 ?5143) (meet ?5143 ?5146)) ?5143)) (meet ?5143 (join ?5144 (join (join (meet ?5145 ?5143) (meet ?5143 ?5146)) ?5143))) [5146, 5145, 5144, 5143] by Demod 2939 with 1544 at 2
6363 Id : 3039, {_}: ?5175 =<= join (meet ?5174 (join (join (meet ?5175 ?5175) (meet ?5175 (join ?5175 ?5175))) ?5175)) (meet ?5175 (join ?5174 (join ?5175 ?5175))) [5174, 5175] by Super 3035 with 1544 at 1,2,2,2,3
6364 Id : 3217, {_}: ?5175 =<= join (meet ?5174 (join ?5175 ?5175)) (meet ?5175 (join ?5174 (join ?5175 ?5175))) [5174, 5175] by Demod 3039 with 1544 at 1,2,1,3
6365 Id : 5068, {_}: ?8129 =<= join (meet (meet ?8129 ?8129) (join ?8129 ?8129)) (meet ?8129 ?8129) [8129] by Super 3217 with 4941 at 2,2,3
6366 Id : 6022, {_}: ?8129 =<= join (join ?8129 ?8129) (meet ?8129 ?8129) [8129] by Demod 5068 with 5957 at 1,3
6367 Id : 7628, {_}: meet ?11050 ?11050 =<= meet (meet (join ?11051 ?11050) ?11050) (meet ?11050 ?11050) [11051, 11050] by Super 7418 with 6022 at 2,1,3
6368 Id : 7650, {_}: meet ?11113 ?11113 =<= meet ?11113 (meet ?11113 ?11113) [11113] by Super 7628 with 6736 at 1,3
6369 Id : 9670, {_}: meet (join ?13624 ?13624) (join (meet ?13624 ?13624) (meet ?13624 ?13624)) =<= meet (meet ?13624 ?13624) (meet (join ?13624 ?13624) (join (meet ?13624 ?13624) (meet ?13624 ?13624))) [13624] by Super 9646 with 7650 at 1,3
6370 Id : 6333, {_}: meet ?9575 ?9575 =<= meet (meet (join ?9576 (meet ?9575 ?9575)) ?9575) (meet ?9575 ?9575) [9576, 9575] by Super 5705 with 5068 at 2,1,3
6371 Id : 6336, {_}: meet ?9583 ?9583 =<= meet (meet ?9583 ?9583) (meet ?9583 ?9583) [9583] by Super 6333 with 6022 at 1,1,3
6372 Id : 6405, {_}: meet ?9659 ?9659 =<= join (join (meet ?9659 ?9659) (meet ?9659 ?9659)) (meet ?9659 ?9659) [9659] by Super 6022 with 6336 at 2,3
6373 Id : 6817, {_}: join (join ?9306 ?9306) ?9306 =>= join ?9306 ?9306 [9306] by Demod 6144 with 6736 at 2,2
6374 Id : 7013, {_}: meet ?9659 ?9659 =<= join (meet ?9659 ?9659) (meet ?9659 ?9659) [9659] by Demod 6405 with 6817 at 3
6375 Id : 9768, {_}: meet (join ?13624 ?13624) (meet ?13624 ?13624) =<= meet (meet ?13624 ?13624) (meet (join ?13624 ?13624) (join (meet ?13624 ?13624) (meet ?13624 ?13624))) [13624] by Demod 9670 with 7013 at 2,2
6376 Id : 9769, {_}: meet (join ?13624 ?13624) (meet ?13624 ?13624) =<= meet (meet ?13624 ?13624) (meet (join ?13624 ?13624) (meet ?13624 ?13624)) [13624] by Demod 9768 with 7013 at 2,2,3
6377 Id : 10286, {_}: join (meet (meet (meet ?14243 ?14243) (meet (join ?14243 ?14243) (meet ?14243 ?14243))) (meet (meet ?14243 ?14243) (join (meet ?14243 ?14243) (meet (join ?14243 ?14243) (meet ?14243 ?14243))))) (meet (meet (join ?14243 ?14243) (meet ?14243 ?14243)) (meet ?14243 ?14243)) =>= meet (meet ?14243 ?14243) (meet (join ?14243 ?14243) (meet ?14243 ?14243)) [14243] by Super 1661 with 9769 at 1,2,2
6378 Id : 10416, {_}: join (meet (meet (join ?14243 ?14243) (meet ?14243 ?14243)) (meet (meet ?14243 ?14243) (join (meet ?14243 ?14243) (meet (join ?14243 ?14243) (meet ?14243 ?14243))))) (meet (meet (join ?14243 ?14243) (meet ?14243 ?14243)) (meet ?14243 ?14243)) =>= meet (meet ?14243 ?14243) (meet (join ?14243 ?14243) (meet ?14243 ?14243)) [14243] by Demod 10286 with 9769 at 1,1,2
6379 Id : 7044, {_}: meet ?10282 ?10282 =<= join (meet (meet ?10282 ?10282) (meet ?10282 ?10282)) (meet ?10283 (meet ?10282 ?10282)) [10283, 10282] by Super 4940 with 7013 at 2,2,3
6380 Id : 7086, {_}: meet ?10282 ?10282 =<= join (meet ?10282 ?10282) (meet ?10283 (meet ?10282 ?10282)) [10283, 10282] by Demod 7044 with 6336 at 1,3
6381 Id : 10417, {_}: join (meet (meet (join ?14243 ?14243) (meet ?14243 ?14243)) (meet (meet ?14243 ?14243) (meet ?14243 ?14243))) (meet (meet (join ?14243 ?14243) (meet ?14243 ?14243)) (meet ?14243 ?14243)) =>= meet (meet ?14243 ?14243) (meet (join ?14243 ?14243) (meet ?14243 ?14243)) [14243] by Demod 10416 with 7086 at 2,2,1,2
6382 Id : 10418, {_}: join (meet (meet (join ?14243 ?14243) (meet ?14243 ?14243)) (meet ?14243 ?14243)) (meet (meet (join ?14243 ?14243) (meet ?14243 ?14243)) (meet ?14243 ?14243)) =>= meet (meet ?14243 ?14243) (meet (join ?14243 ?14243) (meet ?14243 ?14243)) [14243] by Demod 10417 with 6336 at 2,1,2
6383 Id : 7467, {_}: meet ?10854 ?10854 =<= meet (meet (join ?10855 ?10854) (meet ?10854 ?10854)) (meet ?10854 ?10854) [10855, 10854] by Super 7418 with 7013 at 2,1,3
6384 Id : 10419, {_}: join (meet ?14243 ?14243) (meet (meet (join ?14243 ?14243) (meet ?14243 ?14243)) (meet ?14243 ?14243)) =>= meet (meet ?14243 ?14243) (meet (join ?14243 ?14243) (meet ?14243 ?14243)) [14243] by Demod 10418 with 7467 at 1,2
6385 Id : 10420, {_}: meet ?14243 ?14243 =<= meet (meet ?14243 ?14243) (meet (join ?14243 ?14243) (meet ?14243 ?14243)) [14243] by Demod 10419 with 7086 at 2
6386 Id : 10421, {_}: meet ?14243 ?14243 =<= meet (join ?14243 ?14243) (meet ?14243 ?14243) [14243] by Demod 10420 with 9769 at 3
6387 Id : 10483, {_}: join (meet (meet (join ?14359 ?14359) (meet ?14359 ?14359)) (meet (join ?14359 ?14359) (join (join ?14359 ?14359) (meet ?14359 ?14359)))) (meet (meet ?14359 ?14359) (join ?14359 ?14359)) =>= meet (join ?14359 ?14359) (meet ?14359 ?14359) [14359] by Super 1661 with 10421 at 1,2,2
6388 Id : 10517, {_}: join (meet (meet ?14359 ?14359) (meet (join ?14359 ?14359) (join (join ?14359 ?14359) (meet ?14359 ?14359)))) (meet (meet ?14359 ?14359) (join ?14359 ?14359)) =>= meet (join ?14359 ?14359) (meet ?14359 ?14359) [14359] by Demod 10483 with 10421 at 1,1,2
6389 Id : 10518, {_}: join (meet (meet ?14359 ?14359) (meet (join ?14359 ?14359) ?14359)) (meet (meet ?14359 ?14359) (join ?14359 ?14359)) =>= meet (join ?14359 ?14359) (meet ?14359 ?14359) [14359] by Demod 10517 with 6022 at 2,2,1,2
6390 Id : 10519, {_}: join (meet (meet ?14359 ?14359) ?14359) (meet (meet ?14359 ?14359) (join ?14359 ?14359)) =>= meet (join ?14359 ?14359) (meet ?14359 ?14359) [14359] by Demod 10518 with 6736 at 2,1,2
6391 Id : 10520, {_}: join (meet (meet ?14359 ?14359) ?14359) (join ?14359 ?14359) =>= meet (join ?14359 ?14359) (meet ?14359 ?14359) [14359] by Demod 10519 with 5957 at 2,2
6392 Id : 10521, {_}: join (meet (meet ?14359 ?14359) ?14359) (join ?14359 ?14359) =>= meet ?14359 ?14359 [14359] by Demod 10520 with 10421 at 3
6393 Id : 10992, {_}: join (meet (meet (meet ?14539 ?14539) ?14539) (join ?14539 ?14539)) (meet (join ?14539 ?14539) (meet ?14539 ?14539)) =>= join ?14539 ?14539 [14539] by Super 4435 with 10521 at 2,2,2
6394 Id : 8999, {_}: meet (meet ?12702 ?12702) (join ?12702 ?12702) =<= meet (meet (join ?12703 (meet ?12702 ?12702)) ?12702) (join ?12702 ?12702) [12703, 12702] by Super 8992 with 5957 at 2,3
6395 Id : 10037, {_}: join ?14089 ?14089 =<= meet (meet (join ?14090 (meet ?14089 ?14089)) ?14089) (join ?14089 ?14089) [14090, 14089] by Demod 8999 with 5957 at 2
6396 Id : 10046, {_}: join ?14111 ?14111 =<= meet (meet (meet ?14111 ?14111) ?14111) (join ?14111 ?14111) [14111] by Super 10037 with 7013 at 1,1,3
6397 Id : 11120, {_}: join (join ?14539 ?14539) (meet (join ?14539 ?14539) (meet ?14539 ?14539)) =>= join ?14539 ?14539 [14539] by Demod 10992 with 10046 at 1,2
6398 Id : 11121, {_}: join (join ?14539 ?14539) (meet ?14539 ?14539) =>= join ?14539 ?14539 [14539] by Demod 11120 with 10421 at 2,2
6399 Id : 11122, {_}: ?14539 =<= join ?14539 ?14539 [14539] by Demod 11121 with 6022 at 2
6400 Id : 11280, {_}: ?14616 =<= join (meet (join (join (meet ?14617 ?14616) (meet ?14616 ?14618)) ?14616) (join (join (meet ?14617 ?14616) (meet ?14616 ?14618)) ?14616)) (meet ?14616 (join (join (meet ?14617 ?14616) (meet ?14616 ?14618)) ?14616)) [14618, 14617, 14616] by Super 2940 with 11122 at 2,2,3
6401 Id : 7731, {_}: join (meet ?11160 ?11160) (meet ?11160 (join ?11160 (meet ?11160 ?11160))) =>= ?11160 [11160] by Super 1544 with 7650 at 1,2
6402 Id : 6841, {_}: join ?10124 (meet (join ?10124 ?10124) (join (join ?10124 ?10124) ?10124)) =>= join ?10124 ?10124 [10124] by Super 1544 with 6736 at 1,2
6403 Id : 6906, {_}: join ?10124 (meet (join ?10124 ?10124) (join ?10124 ?10124)) =>= join ?10124 ?10124 [10124] by Demod 6841 with 6817 at 2,2,2
6404 Id : 11192, {_}: join ?10124 (meet ?10124 (join ?10124 ?10124)) =>= join ?10124 ?10124 [10124] by Demod 6906 with 11122 at 1,2,2
6405 Id : 11193, {_}: join ?10124 (meet ?10124 ?10124) =>= join ?10124 ?10124 [10124] by Demod 11192 with 11122 at 2,2,2
6406 Id : 11194, {_}: join ?10124 (meet ?10124 ?10124) =>= ?10124 [10124] by Demod 11193 with 11122 at 3
6407 Id : 11206, {_}: join (meet ?11160 ?11160) (meet ?11160 ?11160) =>= ?11160 [11160] by Demod 7731 with 11194 at 2,2,2
6408 Id : 11207, {_}: meet ?11160 ?11160 =>= ?11160 [11160] by Demod 11206 with 11122 at 2
6409 Id : 11417, {_}: ?14616 =<= join (join (join (meet ?14617 ?14616) (meet ?14616 ?14618)) ?14616) (meet ?14616 (join (join (meet ?14617 ?14616) (meet ?14616 ?14618)) ?14616)) [14618, 14617, 14616] by Demod 11280 with 11207 at 1,3
6410 Id : 11210, {_}: ?10282 =<= join (meet ?10282 ?10282) (meet ?10283 (meet ?10282 ?10282)) [10283, 10282] by Demod 7086 with 11207 at 2
6411 Id : 11211, {_}: ?10282 =<= join ?10282 (meet ?10283 (meet ?10282 ?10282)) [10283, 10282] by Demod 11210 with 11207 at 1,3
6412 Id : 11212, {_}: ?10282 =<= join ?10282 (meet ?10283 ?10282) [10283, 10282] by Demod 11211 with 11207 at 2,2,3
6413 Id : 12052, {_}: ?15606 =<= join (join (meet ?15607 ?15606) (meet ?15606 ?15608)) ?15606 [15608, 15607, 15606] by Demod 11417 with 11212 at 3
6414 Id : 12070, {_}: ?15688 =<= join (join ?15688 (meet ?15688 ?15689)) ?15688 [15689, 15688] by Super 12052 with 11207 at 1,1,3
6415 Id : 12545, {_}: join (meet (join ?16137 (meet ?16137 ?16138)) ?16137) (meet (join ?16137 (meet ?16137 ?16138)) ?16137) =>= join ?16137 (meet ?16137 ?16138) [16138, 16137] by Super 1544 with 12070 at 2,2,2
6416 Id : 12628, {_}: meet (join ?16137 (meet ?16137 ?16138)) ?16137 =>= join ?16137 (meet ?16137 ?16138) [16138, 16137] by Demod 12545 with 11122 at 2
6417 Id : 11515, {_}: ?14875 =<= meet (meet (join ?14876 (join ?14875 ?14877)) ?14875) ?14875 [14877, 14876, 14875] by Super 4899 with 11122 at 2,1,3
6418 Id : 11529, {_}: ?14934 =<= meet (meet (join ?14934 ?14935) ?14934) ?14934 [14935, 14934] by Super 11515 with 11122 at 1,1,3
6419 Id : 12090, {_}: ?15773 =<= join (meet ?15774 ?15773) ?15773 [15774, 15773] by Super 12052 with 11212 at 1,3
6420 Id : 12194, {_}: join (meet (meet ?15862 ?15861) ?15861) (meet (meet ?15862 ?15861) ?15861) =>= meet ?15862 ?15861 [15861, 15862] by Super 1544 with 12090 at 2,2,2
6421 Id : 12248, {_}: meet (meet ?15862 ?15861) ?15861 =>= meet ?15862 ?15861 [15861, 15862] by Demod 12194 with 11122 at 2
6422 Id : 12318, {_}: ?14934 =<= meet (join ?14934 ?14935) ?14934 [14935, 14934] by Demod 11529 with 12248 at 3
6423 Id : 12629, {_}: ?16137 =<= join ?16137 (meet ?16137 ?16138) [16138, 16137] by Demod 12628 with 12318 at 2
6424 Id : 12769, {_}: a === a [] by Demod 2 with 12629 at 2
6425 Id : 2, {_}: join a (meet a b) =>= a [] by prove_normal_axioms_8
6426 % SZS output end CNFRefutation for LAT087-1.p
6434 prove_wal_axioms_2 is 95
6438 join (meet (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4)
6440 (join (meet ?2 (join (join (meet ?3 ?5) (meet ?6 ?3)) ?3))
6442 (join (meet ?3 (meet (meet (join ?3 ?5) (join ?6 ?3)) ?3))
6444 (join ?3 (meet (meet (join ?3 ?5) (join ?6 ?3)) ?3))))
6445 (join ?2 (join (join (meet ?3 ?5) (meet ?6 ?3)) ?3))))
6446 (join (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4))
6449 [7, 6, 5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5 ?6 ?7
6451 Id : 2, {_}: meet b a =>= meet a b [] by prove_wal_axioms_2
6452 Found proof, 13.145365s
6453 % SZS status Unsatisfiable for LAT093-1.p
6454 % SZS output start CNFRefutation for LAT093-1.p
6455 Id : 4, {_}: join (meet (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4) (meet (join (meet ?2 (join (join (meet ?3 ?5) (meet ?6 ?3)) ?3)) (meet (join (meet ?3 (meet (meet (join ?3 ?5) (join ?6 ?3)) ?3)) (meet ?7 (join ?3 (meet (meet (join ?3 ?5) (join ?6 ?3)) ?3)))) (join ?2 (join (join (meet ?3 ?5) (meet ?6 ?3)) ?3)))) (join (join (meet ?2 ?3) (meet ?3 (join ?2 ?3))) ?4)) =>= ?3 [7, 6, 5, 4, 3, 2] by single_axiom ?2 ?3 ?4 ?5 ?6 ?7
6456 Id : 5, {_}: join (meet (join (meet ?9 ?10) (meet ?10 (join ?9 ?10))) ?11) (meet (join (meet ?9 (join (join (meet ?10 ?12) (meet ?13 ?10)) ?10)) (meet (join (meet ?10 (meet (meet (join ?10 ?12) (join ?13 ?10)) ?10)) (meet ?14 (join ?10 (meet (meet (join ?10 ?12) (join ?13 ?10)) ?10)))) (join ?9 (join (join (meet ?10 ?12) (meet ?13 ?10)) ?10)))) (join (join (meet ?9 ?10) (meet ?10 (join ?9 ?10))) ?11)) =>= ?10 [14, 13, 12, 11, 10, 9] by single_axiom ?9 ?10 ?11 ?12 ?13 ?14
6457 Id : 33, {_}: join (meet (join (meet ?215 (join (meet ?216 ?217) (meet ?217 (join ?216 ?217)))) (meet (join (meet ?216 ?217) (meet ?217 (join ?216 ?217))) (join ?215 (join (meet ?216 ?217) (meet ?217 (join ?216 ?217)))))) ?218) (meet (join (meet ?215 (join (join (meet (join (meet ?216 ?217) (meet ?217 (join ?216 ?217))) ?219) (meet ?220 (join (meet ?216 ?217) (meet ?217 (join ?216 ?217))))) (join (meet ?216 ?217) (meet ?217 (join ?216 ?217))))) (meet ?217 (join ?215 (join (join (meet (join (meet ?216 ?217) (meet ?217 (join ?216 ?217))) ?219) (meet ?220 (join (meet ?216 ?217) (meet ?217 (join ?216 ?217))))) (join (meet ?216 ?217) (meet ?217 (join ?216 ?217))))))) (join (join (meet ?215 (join (meet ?216 ?217) (meet ?217 (join ?216 ?217)))) (meet (join (meet ?216 ?217) (meet ?217 (join ?216 ?217))) (join ?215 (join (meet ?216 ?217) (meet ?217 (join ?216 ?217)))))) ?218)) =>= join (meet ?216 ?217) (meet ?217 (join ?216 ?217)) [220, 219, 218, 217, 216, 215] by Super 5 with 4 at 1,2,1,2,2
6458 Id : 36, {_}: join (meet (join (meet ?249 (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))))))) (meet (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))))) (join ?249 (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))))))))) ?250) (meet (join (meet ?249 (join (join (meet (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))))) ?251) (meet ?252 (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))))))) (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join 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(join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))))))) (meet (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))))) (join ?249 ?245))) ?250)) =>= join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))))) [252, 251, 250, 248, 247, 246, 245, 244, 249] by Super 33 with 4 at 2,2,2,1,2,2,2
6459 Id : 118, {_}: join (meet (join (meet ?249 ?245) (meet (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))))) (join ?249 (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 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(join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))))))) (meet (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))))) (join ?249 ?245))) ?250)) =>= join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))))) [252, 251, 250, 248, 247, 246, 244, 245, 249] by Demod 36 with 4 at 2,1,1,1,2
6460 Id : 119, {_}: join (meet (join (meet ?249 ?245) (meet ?245 (join ?249 (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join 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?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))))) ?251) (meet ?252 (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join 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(meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))))))) (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))))))))) (join (join (meet ?249 (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))))))) (meet (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))))) (join ?249 ?245))) ?250)) =>= join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))))) [252, 251, 250, 248, 247, 246, 244, 245, 249] by Demod 118 with 4 at 1,2,1,1,2
6461 Id : 120, {_}: join (meet (join (meet ?249 ?245) (meet ?245 (join ?249 ?245))) ?250) (meet (join (meet ?249 (join (join (meet (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))))) ?251) (meet ?252 (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))))))) (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet 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(join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))))))) (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 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(join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))))))) (meet (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))))) (join ?249 ?245))) ?250)) =>= join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))))) [252, 251, 248, 247, 246, 244, 250, 245, 249] by Demod 119 with 4 at 2,2,2,1,1,2
6462 Id : 121, {_}: join (meet (join (meet ?249 ?245) (meet ?245 (join ?249 ?245))) ?250) (meet (join (meet ?249 (join (join (meet ?245 ?251) (meet ?252 (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))))))) (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join ?249 (join (join (meet (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 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?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))))))))) (join (join (meet ?249 (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))))))) (meet (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))))) (join ?249 ?245))) ?250)) =>= join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))))) [248, 247, 246, 244, 252, 251, 250, 245, 249] by Demod 120 with 4 at 1,1,1,2,1,1,2,2
6463 Id : 122, {_}: join (meet (join (meet ?249 ?245) (meet ?245 (join ?249 ?245))) ?250) (meet (join (meet ?249 (join (join (meet ?245 ?251) (meet ?252 ?245)) (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join ?249 (join (join (meet (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))))) ?251) (meet ?252 (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet 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?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))))))) (meet (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))))) (join ?249 ?245))) ?250)) =>= join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))))) [248, 247, 246, 244, 252, 251, 250, 245, 249] by Demod 121 with 4 at 2,2,1,2,1,1,2,2
6464 Id : 123, {_}: join (meet (join (meet ?249 ?245) (meet ?245 (join ?249 ?245))) ?250) (meet (join (meet ?249 (join (join (meet ?245 ?251) (meet ?252 ?245)) ?245)) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join ?249 (join (join (meet (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))))) ?251) (meet ?252 (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))))))) (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))))))))) (join (join (meet ?249 (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))))))) (meet (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))))) (join ?249 ?245))) ?250)) =>= join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))))) [248, 247, 246, 244, 252, 251, 250, 245, 249] by Demod 122 with 4 at 2,2,1,1,2,2
6465 Id : 124, {_}: join (meet (join (meet ?249 ?245) (meet ?245 (join ?249 ?245))) ?250) (meet (join (meet ?249 (join (join (meet ?245 ?251) (meet ?252 ?245)) ?245)) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join ?249 (join (join (meet ?245 ?251) (meet ?252 (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))))))) (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))))))))) (join (join (meet ?249 (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))))))) (meet (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))))) (join ?249 ?245))) ?250)) =>= join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))))) [248, 247, 246, 244, 252, 251, 250, 245, 249] by Demod 123 with 4 at 1,1,1,2,2,2,1,2,2
6466 Id : 125, {_}: join (meet (join (meet ?249 ?245) (meet ?245 (join ?249 ?245))) ?250) (meet (join (meet ?249 (join (join (meet ?245 ?251) (meet ?252 ?245)) ?245)) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join ?249 (join (join (meet ?245 ?251) (meet ?252 ?245)) (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))))))))) (join (join (meet ?249 (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))))))) (meet (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))))) (join ?249 ?245))) ?250)) =>= join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))))) [248, 247, 246, 244, 252, 251, 250, 245, 249] by Demod 124 with 4 at 2,2,1,2,2,2,1,2,2
6467 Id : 126, {_}: join (meet (join (meet ?249 ?245) (meet ?245 (join ?249 ?245))) ?250) (meet (join (meet ?249 (join (join (meet ?245 ?251) (meet ?252 ?245)) ?245)) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join ?249 (join (join (meet ?245 ?251) (meet ?252 ?245)) ?245)))) (join (join (meet ?249 (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))))))) (meet (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))))) (join ?249 ?245))) ?250)) =>= join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))))) [248, 247, 246, 244, 252, 251, 250, 245, 249] by Demod 125 with 4 at 2,2,2,2,1,2,2
6468 Id : 127, {_}: join (meet (join (meet ?249 ?245) (meet ?245 (join ?249 ?245))) ?250) (meet (join (meet ?249 (join (join (meet ?245 ?251) (meet ?252 ?245)) ?245)) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join ?249 (join (join (meet ?245 ?251) (meet ?252 ?245)) ?245)))) (join (join (meet ?249 ?245) (meet (join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))))) (join ?249 ?245))) ?250)) =>= join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))))) [248, 247, 246, 244, 252, 251, 250, 245, 249] by Demod 126 with 4 at 2,1,1,2,2,2
6469 Id : 128, {_}: join (meet (join (meet ?249 ?245) (meet ?245 (join ?249 ?245))) ?250) (meet (join (meet ?249 (join (join (meet ?245 ?251) (meet ?252 ?245)) ?245)) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join ?249 (join (join (meet ?245 ?251) (meet ?252 ?245)) ?245)))) (join (join (meet ?249 ?245) (meet ?245 (join ?249 ?245))) ?250)) =?= join (meet (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245))))) (meet (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))) (join (join (meet ?244 ?245) (meet ?245 (join ?244 ?245))) (join (meet ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)) (meet (join (meet ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)) (meet ?248 (join ?245 (meet (meet (join ?245 ?246) (join ?247 ?245)) ?245)))) (join ?244 (join (join (meet ?245 ?246) (meet ?247 ?245)) ?245)))))) [248, 247, 246, 244, 252, 251, 250, 245, 249] by Demod 127 with 4 at 1,2,1,2,2,2
6470 Id : 704, {_}: join (meet (join (meet ?1213 ?1214) (meet ?1214 (join ?1213 ?1214))) ?1215) (meet (join (meet ?1213 (join (join (meet ?1214 ?1216) (meet ?1217 ?1214)) ?1214)) (meet (join (meet ?1218 (join (join (meet ?1214 ?1219) (meet ?1220 ?1214)) ?1214)) (meet (join (meet ?1214 (meet (meet (join ?1214 ?1219) (join ?1220 ?1214)) ?1214)) (meet ?1221 (join ?1214 (meet (meet (join ?1214 ?1219) (join ?1220 ?1214)) ?1214)))) (join ?1218 (join (join (meet ?1214 ?1219) (meet ?1220 ?1214)) ?1214)))) (join ?1213 (join (join (meet ?1214 ?1216) (meet ?1217 ?1214)) ?1214)))) (join (join (meet ?1213 ?1214) (meet ?1214 (join ?1213 ?1214))) ?1215)) =>= ?1214 [1221, 1220, 1219, 1218, 1217, 1216, 1215, 1214, 1213] by Demod 128 with 4 at 3
6471 Id : 1103, {_}: join (meet (join (meet (join (meet ?2031 ?2032) (meet ?2032 (join ?2031 ?2032))) ?2032) (meet ?2032 (join (join (meet ?2031 ?2032) (meet ?2032 (join ?2031 ?2032))) ?2032))) ?2033) (meet ?2032 (join (join (meet (join (meet ?2031 ?2032) (meet ?2032 (join ?2031 ?2032))) ?2032) (meet ?2032 (join (join (meet ?2031 ?2032) (meet ?2032 (join ?2031 ?2032))) ?2032))) ?2033)) =>= ?2032 [2033, 2032, 2031] by Super 704 with 4 at 1,2,2
6472 Id : 726, {_}: join (meet (join (meet (join (meet ?1536 ?1532) (meet ?1532 (join ?1536 ?1532))) ?1532) (meet ?1532 (join (join (meet ?1536 ?1532) (meet ?1532 (join ?1536 ?1532))) ?1532))) ?1533) (meet ?1532 (join (join (meet (join (meet ?1536 ?1532) (meet ?1532 (join ?1536 ?1532))) ?1532) (meet ?1532 (join (join (meet ?1536 ?1532) (meet ?1532 (join ?1536 ?1532))) ?1532))) ?1533)) =>= ?1532 [1533, 1532, 1536] by Super 704 with 4 at 1,2,2
6473 Id : 1120, {_}: join (meet (join (meet (join (meet (join (meet ?2155 ?2156) (meet ?2156 (join ?2155 ?2156))) ?2156) (meet ?2156 (join (join (meet ?2155 ?2156) (meet ?2156 (join ?2155 ?2156))) ?2156))) ?2156) (meet ?2156 (join (join (meet (join (meet ?2155 ?2156) (meet ?2156 (join ?2155 ?2156))) ?2156) (meet ?2156 (join (join (meet ?2155 ?2156) (meet ?2156 (join ?2155 ?2156))) ?2156))) ?2156))) ?2157) (meet ?2156 (join ?2156 ?2157)) =>= ?2156 [2157, 2156, 2155] by Super 1103 with 726 at 1,2,2,2
6474 Id : 1492, {_}: join (meet ?2156 ?2157) (meet ?2156 (join ?2156 ?2157)) =>= ?2156 [2157, 2156] by Demod 1120 with 726 at 1,1,2
6475 Id : 12, {_}: join (meet (join (meet ?86 (join (meet ?81 ?82) (meet ?82 (join ?81 ?82)))) (meet (join (meet ?81 ?82) (meet ?82 (join ?81 ?82))) (join ?86 (join (meet ?81 ?82) (meet ?82 (join ?81 ?82)))))) ?87) (meet (join (meet ?86 (join (join (meet (join (meet ?81 ?82) (meet ?82 (join ?81 ?82))) ?88) (meet ?89 (join (meet ?81 ?82) (meet ?82 (join ?81 ?82))))) (join (meet ?81 ?82) (meet ?82 (join ?81 ?82))))) (meet ?82 (join ?86 (join (join (meet (join (meet ?81 ?82) (meet ?82 (join ?81 ?82))) ?88) (meet ?89 (join (meet ?81 ?82) (meet ?82 (join ?81 ?82))))) (join (meet ?81 ?82) (meet ?82 (join ?81 ?82))))))) (join (join (meet ?86 (join (meet ?81 ?82) (meet ?82 (join ?81 ?82)))) (meet (join (meet ?81 ?82) (meet ?82 (join ?81 ?82))) (join ?86 (join (meet ?81 ?82) (meet ?82 (join ?81 ?82)))))) ?87)) =>= join (meet ?81 ?82) (meet ?82 (join ?81 ?82)) [89, 88, 87, 82, 81, 86] by Super 5 with 4 at 1,2,1,2,2
6476 Id : 1056, {_}: join (meet (join (meet ?1648 (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647)))) (meet (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))) (join ?1648 (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647)))))) ?1649) (meet (join (meet ?1648 (join (join (meet (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))) ?1650) (meet ?1651 (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))))) (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))))) (meet ?1647 (join ?1648 (join (join (meet (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))) ?1650) (meet ?1651 (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))))) (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))))))) (join (join (meet ?1648 (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647)))) (meet (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))) (join ?1648 ?1647))) ?1649)) =>= join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647)) [1651, 1650, 1649, 1647, 1646, 1648] by Super 12 with 726 at 2,2,2,1,2,2,2
6477 Id : 1168, {_}: join (meet (join (meet ?1648 ?1647) (meet (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))) (join ?1648 (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647)))))) ?1649) (meet (join (meet ?1648 (join (join (meet (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))) ?1650) (meet ?1651 (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))))) (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))))) (meet ?1647 (join ?1648 (join (join (meet (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))) ?1650) (meet ?1651 (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))))) (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))))))) (join (join (meet ?1648 (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647)))) (meet (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))) (join ?1648 ?1647))) ?1649)) =>= join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647)) [1651, 1650, 1649, 1646, 1647, 1648] by Demod 1056 with 726 at 2,1,1,1,2
6478 Id : 1169, {_}: join (meet (join (meet ?1648 ?1647) (meet ?1647 (join ?1648 (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647)))))) ?1649) (meet (join (meet ?1648 (join (join (meet (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))) ?1650) (meet ?1651 (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))))) (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))))) (meet ?1647 (join ?1648 (join (join (meet (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))) ?1650) (meet ?1651 (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))))) (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))))))) (join (join (meet ?1648 (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647)))) (meet (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))) (join ?1648 ?1647))) ?1649)) =>= join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647)) [1651, 1650, 1649, 1646, 1647, 1648] by Demod 1168 with 726 at 1,2,1,1,2
6479 Id : 1170, {_}: join (meet (join (meet ?1648 ?1647) (meet ?1647 (join ?1648 ?1647))) ?1649) (meet (join (meet ?1648 (join (join (meet (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))) ?1650) (meet ?1651 (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))))) (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))))) (meet ?1647 (join ?1648 (join (join (meet (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))) ?1650) (meet ?1651 (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))))) (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))))))) (join (join (meet ?1648 (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647)))) (meet (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))) (join ?1648 ?1647))) ?1649)) =>= join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647)) [1651, 1650, 1646, 1649, 1647, 1648] by Demod 1169 with 726 at 2,2,2,1,1,2
6480 Id : 1171, {_}: join (meet (join (meet ?1648 ?1647) (meet ?1647 (join ?1648 ?1647))) ?1649) (meet (join (meet ?1648 (join (join (meet ?1647 ?1650) (meet ?1651 (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))))) (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))))) (meet ?1647 (join ?1648 (join (join (meet (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))) ?1650) (meet ?1651 (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))))) (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))))))) (join (join (meet ?1648 (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647)))) (meet (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))) (join ?1648 ?1647))) ?1649)) =>= join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647)) [1646, 1651, 1650, 1649, 1647, 1648] by Demod 1170 with 726 at 1,1,1,2,1,1,2,2
6481 Id : 1172, {_}: join (meet (join (meet ?1648 ?1647) (meet ?1647 (join ?1648 ?1647))) ?1649) (meet (join (meet ?1648 (join (join (meet ?1647 ?1650) (meet ?1651 ?1647)) (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))))) (meet ?1647 (join ?1648 (join (join (meet (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))) ?1650) (meet ?1651 (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))))) (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))))))) (join (join (meet ?1648 (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647)))) (meet (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))) (join ?1648 ?1647))) ?1649)) =>= join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647)) [1646, 1651, 1650, 1649, 1647, 1648] by Demod 1171 with 726 at 2,2,1,2,1,1,2,2
6482 Id : 1173, {_}: join (meet (join (meet ?1648 ?1647) (meet ?1647 (join ?1648 ?1647))) ?1649) (meet (join (meet ?1648 (join (join (meet ?1647 ?1650) (meet ?1651 ?1647)) ?1647)) (meet ?1647 (join ?1648 (join (join (meet (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))) ?1650) (meet ?1651 (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))))) (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))))))) (join (join (meet ?1648 (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647)))) (meet (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))) (join ?1648 ?1647))) ?1649)) =>= join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647)) [1646, 1651, 1650, 1649, 1647, 1648] by Demod 1172 with 726 at 2,2,1,1,2,2
6483 Id : 1174, {_}: join (meet (join (meet ?1648 ?1647) (meet ?1647 (join ?1648 ?1647))) ?1649) (meet (join (meet ?1648 (join (join (meet ?1647 ?1650) (meet ?1651 ?1647)) ?1647)) (meet ?1647 (join ?1648 (join (join (meet ?1647 ?1650) (meet ?1651 (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))))) (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))))))) (join (join (meet ?1648 (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647)))) (meet (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))) (join ?1648 ?1647))) ?1649)) =>= join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647)) [1646, 1651, 1650, 1649, 1647, 1648] by Demod 1173 with 726 at 1,1,1,2,2,2,1,2,2
6484 Id : 1175, {_}: join (meet (join (meet ?1648 ?1647) (meet ?1647 (join ?1648 ?1647))) ?1649) (meet (join (meet ?1648 (join (join (meet ?1647 ?1650) (meet ?1651 ?1647)) ?1647)) (meet ?1647 (join ?1648 (join (join (meet ?1647 ?1650) (meet ?1651 ?1647)) (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))))))) (join (join (meet ?1648 (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647)))) (meet (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))) (join ?1648 ?1647))) ?1649)) =>= join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647)) [1646, 1651, 1650, 1649, 1647, 1648] by Demod 1174 with 726 at 2,2,1,2,2,2,1,2,2
6485 Id : 1176, {_}: join (meet (join (meet ?1648 ?1647) (meet ?1647 (join ?1648 ?1647))) ?1649) (meet (join (meet ?1648 (join (join (meet ?1647 ?1650) (meet ?1651 ?1647)) ?1647)) (meet ?1647 (join ?1648 (join (join (meet ?1647 ?1650) (meet ?1651 ?1647)) ?1647)))) (join (join (meet ?1648 (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647)))) (meet (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))) (join ?1648 ?1647))) ?1649)) =>= join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647)) [1646, 1651, 1650, 1649, 1647, 1648] by Demod 1175 with 726 at 2,2,2,2,1,2,2
6486 Id : 1177, {_}: join (meet (join (meet ?1648 ?1647) (meet ?1647 (join ?1648 ?1647))) ?1649) (meet (join (meet ?1648 (join (join (meet ?1647 ?1650) (meet ?1651 ?1647)) ?1647)) (meet ?1647 (join ?1648 (join (join (meet ?1647 ?1650) (meet ?1651 ?1647)) ?1647)))) (join (join (meet ?1648 ?1647) (meet (join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647))) (join ?1648 ?1647))) ?1649)) =>= join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647)) [1646, 1651, 1650, 1649, 1647, 1648] by Demod 1176 with 726 at 2,1,1,2,2,2
6487 Id : 1178, {_}: join (meet (join (meet ?1648 ?1647) (meet ?1647 (join ?1648 ?1647))) ?1649) (meet (join (meet ?1648 (join (join (meet ?1647 ?1650) (meet ?1651 ?1647)) ?1647)) (meet ?1647 (join ?1648 (join (join (meet ?1647 ?1650) (meet ?1651 ?1647)) ?1647)))) (join (join (meet ?1648 ?1647) (meet ?1647 (join ?1648 ?1647))) ?1649)) =?= join (meet (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647) (meet ?1647 (join (join (meet (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647) (meet ?1647 (join (join (meet ?1646 ?1647) (meet ?1647 (join ?1646 ?1647))) ?1647))) ?1647)) [1646, 1651, 1650, 1649, 1647, 1648] by Demod 1177 with 726 at 1,2,1,2,2,2
6488 Id : 1179, {_}: join (meet (join (meet ?1648 ?1647) (meet ?1647 (join ?1648 ?1647))) ?1649) (meet (join (meet ?1648 (join (join (meet ?1647 ?1650) (meet ?1651 ?1647)) ?1647)) (meet ?1647 (join ?1648 (join (join (meet ?1647 ?1650) (meet ?1651 ?1647)) ?1647)))) (join (join (meet ?1648 ?1647) (meet ?1647 (join ?1648 ?1647))) ?1649)) =>= ?1647 [1651, 1650, 1649, 1647, 1648] by Demod 1178 with 726 at 3
6489 Id : 2457, {_}: join (meet (join (meet ?3744 ?3745) (meet ?3745 (join ?3744 ?3745))) ?3746) (meet (join (meet ?3744 (join (join (meet ?3745 ?3747) (meet ?3748 ?3745)) ?3745)) (meet ?3745 (join ?3744 (join (join (meet ?3745 ?3747) (meet ?3748 ?3745)) ?3745)))) (join (join (meet ?3744 ?3745) (meet ?3745 (join ?3744 ?3745))) ?3746)) =>= ?3745 [3748, 3747, 3746, 3745, 3744] by Demod 1178 with 726 at 3
6490 Id : 2470, {_}: join (meet (join (meet (join (meet ?3853 ?3854) (meet ?3854 (join ?3853 ?3854))) (join (meet ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)) (meet ?3854 (join ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854))))) (meet (join (meet ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)) (meet ?3854 (join ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)))) (join (join (meet ?3853 ?3854) (meet ?3854 (join ?3853 ?3854))) (join (meet ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)) (meet ?3854 (join ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854))))))) ?3857) (meet (join (meet (join (meet ?3853 ?3854) (meet ?3854 (join ?3853 ?3854))) (join (join (meet (join (meet ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)) (meet ?3854 (join ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)))) ?3858) (meet ?3859 (join (meet ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)) (meet ?3854 (join ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)))))) (join (meet ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)) (meet ?3854 (join ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)))))) (meet (join (meet ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)) (meet ?3854 (join ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)))) (join (join (meet ?3853 ?3854) (meet ?3854 (join ?3853 ?3854))) (join (join (meet (join (meet ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)) (meet ?3854 (join ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)))) ?3858) (meet ?3859 (join (meet ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)) (meet ?3854 (join ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)))))) (join (meet ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)) (meet ?3854 (join ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)))))))) (join ?3854 ?3857)) =>= join (meet ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)) (meet ?3854 (join ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854))) [3859, 3858, 3857, 3856, 3855, 3854, 3853] by Super 2457 with 1179 at 1,2,2,2
6491 Id : 2846, {_}: join (meet ?3854 ?3857) (meet (join (meet (join (meet ?3853 ?3854) (meet ?3854 (join ?3853 ?3854))) (join (join (meet (join (meet ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)) (meet ?3854 (join ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)))) ?3858) (meet ?3859 (join (meet ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)) (meet ?3854 (join ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)))))) (join (meet ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)) (meet ?3854 (join ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)))))) (meet (join (meet ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)) (meet ?3854 (join ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)))) (join (join (meet ?3853 ?3854) (meet ?3854 (join ?3853 ?3854))) (join (join (meet (join (meet ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)) (meet ?3854 (join ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)))) ?3858) (meet ?3859 (join (meet ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)) (meet ?3854 (join ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)))))) (join (meet ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)) (meet ?3854 (join ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)))))))) (join ?3854 ?3857)) =>= join (meet ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)) (meet ?3854 (join ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854))) [3859, 3858, 3856, 3855, 3853, 3857, 3854] by Demod 2470 with 1179 at 1,1,2
6492 Id : 2847, {_}: join (meet ?3854 ?3857) (meet ?3854 (join ?3854 ?3857)) =?= join (meet ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)) (meet ?3854 (join ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854))) [3856, 3855, 3853, 3857, 3854] by Demod 2846 with 1179 at 1,2,2
6493 Id : 2848, {_}: ?3854 =<= join (meet ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854)) (meet ?3854 (join ?3853 (join (join (meet ?3854 ?3855) (meet ?3856 ?3854)) ?3854))) [3856, 3855, 3853, 3854] by Demod 2847 with 1492 at 2
6494 Id : 2894, {_}: join (meet (join (meet ?1648 ?1647) (meet ?1647 (join ?1648 ?1647))) ?1649) (meet ?1647 (join (join (meet ?1648 ?1647) (meet ?1647 (join ?1648 ?1647))) ?1649)) =>= ?1647 [1649, 1647, 1648] by Demod 1179 with 2848 at 1,2,2
6495 Id : 2466, {_}: join (meet (join (meet (join (meet ?3817 ?3818) (meet ?3818 (join ?3817 ?3818))) (join (meet ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)) (meet (join (meet ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)) (meet ?3821 (join ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)))) (join ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818))))) (meet (join (meet ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)) (meet (join (meet ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)) (meet ?3821 (join ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)))) (join ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)))) (join (join (meet ?3817 ?3818) (meet ?3818 (join ?3817 ?3818))) (join (meet ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)) (meet (join (meet ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)) (meet ?3821 (join ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)))) (join ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818))))))) ?3822) (meet (join (meet (join (meet ?3817 ?3818) (meet ?3818 (join ?3817 ?3818))) (join (join (meet (join (meet ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)) (meet (join (meet ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)) (meet ?3821 (join ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)))) (join ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)))) ?3823) (meet ?3824 (join (meet ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)) (meet (join (meet ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)) (meet ?3821 (join ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)))) (join ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)))))) (join (meet ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)) (meet (join (meet ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)) (meet ?3821 (join ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)))) (join ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)))))) (meet (join (meet ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)) (meet (join (meet ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)) (meet ?3821 (join ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)))) (join ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)))) (join (join (meet ?3817 ?3818) (meet ?3818 (join ?3817 ?3818))) (join (join (meet (join (meet ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)) (meet (join (meet ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)) (meet ?3821 (join ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)))) (join ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)))) ?3823) (meet ?3824 (join (meet ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)) (meet (join (meet ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)) (meet ?3821 (join ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)))) (join ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)))))) (join (meet ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)) (meet (join (meet ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)) (meet ?3821 (join ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)))) (join ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)))))))) (join ?3818 ?3822)) =>= join (meet ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)) (meet (join (meet ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)) (meet ?3821 (join ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)))) (join ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818))) [3824, 3823, 3822, 3821, 3820, 3819, 3818, 3817] by Super 2457 with 4 at 1,2,2,2
6496 Id : 2834, {_}: join (meet ?3818 ?3822) (meet (join (meet (join (meet ?3817 ?3818) (meet ?3818 (join ?3817 ?3818))) (join (join (meet (join (meet ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)) (meet (join (meet ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)) (meet ?3821 (join ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)))) (join ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)))) ?3823) (meet ?3824 (join (meet ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)) (meet (join (meet ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)) (meet ?3821 (join ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)))) (join ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)))))) (join (meet ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)) (meet (join (meet ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)) (meet ?3821 (join ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)))) (join ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)))))) (meet (join (meet ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)) (meet (join (meet ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)) (meet ?3821 (join ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)))) (join ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)))) (join (join (meet ?3817 ?3818) (meet ?3818 (join ?3817 ?3818))) (join (join (meet (join (meet ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)) (meet (join (meet ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)) (meet ?3821 (join ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)))) (join ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)))) ?3823) (meet ?3824 (join (meet ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)) (meet (join (meet ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)) (meet ?3821 (join ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)))) (join ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)))))) (join (meet ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)) (meet (join (meet ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)) (meet ?3821 (join ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)))) (join ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)))))))) (join ?3818 ?3822)) =>= join (meet ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)) (meet (join (meet ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)) (meet ?3821 (join ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)))) (join ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818))) [3824, 3823, 3821, 3820, 3819, 3817, 3822, 3818] by Demod 2466 with 4 at 1,1,2
6497 Id : 2835, {_}: join (meet ?3818 ?3822) (meet ?3818 (join ?3818 ?3822)) =?= join (meet ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)) (meet (join (meet ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)) (meet ?3821 (join ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)))) (join ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818))) [3821, 3820, 3819, 3817, 3822, 3818] by Demod 2834 with 4 at 1,2,2
6498 Id : 2836, {_}: ?3818 =<= join (meet ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818)) (meet (join (meet ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)) (meet ?3821 (join ?3818 (meet (meet (join ?3818 ?3819) (join ?3820 ?3818)) ?3818)))) (join ?3817 (join (join (meet ?3818 ?3819) (meet ?3820 ?3818)) ?3818))) [3821, 3820, 3819, 3817, 3818] by Demod 2835 with 1492 at 2
6499 Id : 3353, {_}: ?4683 =<= join (meet ?4683 (meet (meet (join ?4683 ?4684) (join ?4685 ?4683)) ?4683)) (meet ?4686 (join ?4683 (meet (meet (join ?4683 ?4684) (join ?4685 ?4683)) ?4683))) [4686, 4685, 4684, 4683] by Super 2894 with 2836 at 2
6500 Id : 3629, {_}: join (meet ?5382 ?5381) (meet ?5381 (join ?5382 ?5381)) =>= ?5381 [5381, 5382] by Super 2894 with 3353 at 2
6501 Id : 4066, {_}: ?5811 =<= meet (meet (join ?5811 ?5812) (join ?5813 ?5811)) ?5811 [5813, 5812, 5811] by Super 3353 with 3629 at 3
6502 Id : 4517, {_}: meet ?6536 ?6537 =<= meet (meet ?6537 (join ?6538 (meet ?6536 ?6537))) (meet ?6536 ?6537) [6538, 6537, 6536] by Super 4066 with 3629 at 1,1,3
6503 Id : 4020, {_}: ?5649 =<= meet (meet (join ?5649 ?5650) (join ?5651 ?5649)) ?5649 [5651, 5650, 5649] by Super 3353 with 3629 at 3
6504 Id : 4518, {_}: meet (meet (join ?6542 ?6540) (join ?6541 ?6542)) ?6542 =<= meet (meet ?6542 (join ?6543 (meet (meet (join ?6542 ?6540) (join ?6541 ?6542)) ?6542))) ?6542 [6543, 6541, 6540, 6542] by Super 4517 with 4020 at 2,3
6505 Id : 4585, {_}: ?6542 =<= meet (meet ?6542 (join ?6543 (meet (meet (join ?6542 ?6540) (join ?6541 ?6542)) ?6542))) ?6542 [6541, 6540, 6543, 6542] by Demod 4518 with 4020 at 2
6506 Id : 4586, {_}: ?6542 =<= meet (meet ?6542 (join ?6543 ?6542)) ?6542 [6543, 6542] by Demod 4585 with 4020 at 2,2,1,3
6507 Id : 1596, {_}: join (meet ?2660 ?2661) (meet ?2660 (join ?2660 ?2661)) =>= ?2660 [2661, 2660] by Demod 1120 with 726 at 1,1,2
6508 Id : 1601, {_}: join (meet (meet ?2691 ?2692) (meet ?2691 (join ?2691 ?2692))) (meet (meet ?2691 ?2692) ?2691) =>= meet ?2691 ?2692 [2692, 2691] by Super 1596 with 1492 at 2,2,2
6509 Id : 4161, {_}: meet ?6000 ?6001 =<= meet (meet ?6000 (join ?6002 (meet ?6000 ?6001))) (meet ?6000 ?6001) [6002, 6001, 6000] by Super 4066 with 1492 at 1,1,3
6510 Id : 4166, {_}: meet ?6025 (join ?6025 ?6024) =<= meet (meet ?6025 ?6025) (meet ?6025 (join ?6025 ?6024)) [6024, 6025] by Super 4161 with 1492 at 2,1,3
6511 Id : 4239, {_}: join (meet ?6108 (join ?6108 ?6108)) (meet (meet ?6108 ?6108) ?6108) =>= meet ?6108 ?6108 [6108] by Super 1601 with 4166 at 1,2
6512 Id : 1974, {_}: join (meet (meet (meet ?2899 ?2900) (meet ?2899 (join ?2899 ?2900))) (meet (meet ?2899 ?2900) ?2899)) (meet (meet (meet ?2899 ?2900) (meet ?2899 (join ?2899 ?2900))) (meet ?2899 ?2900)) =>= meet (meet ?2899 ?2900) (meet ?2899 (join ?2899 ?2900)) [2900, 2899] by Super 1492 with 1601 at 2,2,2
6513 Id : 4530, {_}: meet ?6595 (join ?6595 ?6594) =<= meet (meet (join ?6595 ?6594) ?6595) (meet ?6595 (join ?6595 ?6594)) [6594, 6595] by Super 4517 with 1492 at 2,1,3
6514 Id : 4634, {_}: join ?6728 (meet ?6728 (join (meet ?6728 (join ?6729 ?6728)) ?6728)) =>= ?6728 [6729, 6728] by Super 3629 with 4586 at 1,2
6515 Id : 5854, {_}: meet ?8039 (join ?8039 (meet ?8039 (join (meet ?8039 (join ?8040 ?8039)) ?8039))) =<= meet (meet (join ?8039 (meet ?8039 (join (meet ?8039 (join ?8040 ?8039)) ?8039))) ?8039) (meet ?8039 ?8039) [8040, 8039] by Super 4530 with 4634 at 2,2,3
6516 Id : 5885, {_}: meet ?8039 ?8039 =<= meet (meet (join ?8039 (meet ?8039 (join (meet ?8039 (join ?8040 ?8039)) ?8039))) ?8039) (meet ?8039 ?8039) [8040, 8039] by Demod 5854 with 4634 at 2,2
6517 Id : 5886, {_}: meet ?8039 ?8039 =<= meet (meet ?8039 ?8039) (meet ?8039 ?8039) [8039] by Demod 5885 with 4634 at 1,1,3
6518 Id : 5940, {_}: join (meet (meet (meet (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet (meet ?8123 ?8123) (join (meet ?8123 ?8123) (meet ?8123 ?8123)))) (meet (meet (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet ?8123 ?8123))) (meet (meet (meet (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet (meet ?8123 ?8123) (join (meet ?8123 ?8123) (meet ?8123 ?8123)))) (meet ?8123 ?8123)) =>= meet (meet (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet (meet ?8123 ?8123) (join (meet ?8123 ?8123) (meet ?8123 ?8123))) [8123] by Super 1974 with 5886 at 2,2,2
6519 Id : 6002, {_}: join (meet (meet (meet ?8123 ?8123) (join (meet ?8123 ?8123) (meet ?8123 ?8123))) (meet (meet (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet ?8123 ?8123))) (meet (meet (meet (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet (meet ?8123 ?8123) (join (meet ?8123 ?8123) (meet ?8123 ?8123)))) (meet ?8123 ?8123)) =>= meet (meet (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet (meet ?8123 ?8123) (join (meet ?8123 ?8123) (meet ?8123 ?8123))) [8123] by Demod 5940 with 4166 at 1,1,2
6520 Id : 6003, {_}: join (meet (meet (meet ?8123 ?8123) (join (meet ?8123 ?8123) (meet ?8123 ?8123))) (meet (meet ?8123 ?8123) (meet ?8123 ?8123))) (meet (meet (meet (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet (meet ?8123 ?8123) (join (meet ?8123 ?8123) (meet ?8123 ?8123)))) (meet ?8123 ?8123)) =>= meet (meet (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet (meet ?8123 ?8123) (join (meet ?8123 ?8123) (meet ?8123 ?8123))) [8123] by Demod 6002 with 5886 at 1,2,1,2
6521 Id : 6004, {_}: join (meet (meet (meet ?8123 ?8123) (join (meet ?8123 ?8123) (meet ?8123 ?8123))) (meet ?8123 ?8123)) (meet (meet (meet (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet (meet ?8123 ?8123) (join (meet ?8123 ?8123) (meet ?8123 ?8123)))) (meet ?8123 ?8123)) =>= meet (meet (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet (meet ?8123 ?8123) (join (meet ?8123 ?8123) (meet ?8123 ?8123))) [8123] by Demod 6003 with 5886 at 2,1,2
6522 Id : 6005, {_}: join (meet ?8123 ?8123) (meet (meet (meet (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet (meet ?8123 ?8123) (join (meet ?8123 ?8123) (meet ?8123 ?8123)))) (meet ?8123 ?8123)) =>= meet (meet (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet (meet ?8123 ?8123) (join (meet ?8123 ?8123) (meet ?8123 ?8123))) [8123] by Demod 6004 with 4586 at 1,2
6523 Id : 6006, {_}: join (meet ?8123 ?8123) (meet (meet (meet ?8123 ?8123) (join (meet ?8123 ?8123) (meet ?8123 ?8123))) (meet ?8123 ?8123)) =<= meet (meet (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet (meet ?8123 ?8123) (join (meet ?8123 ?8123) (meet ?8123 ?8123))) [8123] by Demod 6005 with 4166 at 1,2,2
6524 Id : 6007, {_}: join (meet ?8123 ?8123) (meet ?8123 ?8123) =<= meet (meet (meet ?8123 ?8123) (meet ?8123 ?8123)) (meet (meet ?8123 ?8123) (join (meet ?8123 ?8123) (meet ?8123 ?8123))) [8123] by Demod 6006 with 4586 at 2,2
6525 Id : 6008, {_}: join (meet ?8123 ?8123) (meet ?8123 ?8123) =<= meet (meet ?8123 ?8123) (join (meet ?8123 ?8123) (meet ?8123 ?8123)) [8123] by Demod 6007 with 4166 at 3
6526 Id : 7068, {_}: join (join (meet ?9355 ?9355) (meet ?9355 ?9355)) (meet (meet (meet ?9355 ?9355) (meet ?9355 ?9355)) (meet ?9355 ?9355)) =>= meet (meet ?9355 ?9355) (meet ?9355 ?9355) [9355] by Super 4239 with 6008 at 1,2
6527 Id : 7098, {_}: join (join (meet ?9355 ?9355) (meet ?9355 ?9355)) (meet (meet ?9355 ?9355) (meet ?9355 ?9355)) =>= meet (meet ?9355 ?9355) (meet ?9355 ?9355) [9355] by Demod 7068 with 5886 at 1,2,2
6528 Id : 7099, {_}: join (join (meet ?9355 ?9355) (meet ?9355 ?9355)) (meet ?9355 ?9355) =>= meet (meet ?9355 ?9355) (meet ?9355 ?9355) [9355] by Demod 7098 with 5886 at 2,2
6529 Id : 7100, {_}: join (join (meet ?9355 ?9355) (meet ?9355 ?9355)) (meet ?9355 ?9355) =>= meet ?9355 ?9355 [9355] by Demod 7099 with 5886 at 3
6530 Id : 7401, {_}: meet ?9521 ?9521 =<= meet (meet (join (meet ?9521 ?9521) ?9522) (meet ?9521 ?9521)) (meet ?9521 ?9521) [9522, 9521] by Super 4020 with 7100 at 2,1,3
6531 Id : 13724, {_}: join (meet ?15407 ?15407) (meet (meet (join (meet ?15407 ?15407) ?15408) (meet ?15407 ?15407)) (join (meet (join (meet ?15407 ?15407) ?15408) (meet ?15407 ?15407)) (meet ?15407 ?15407))) =>= meet (join (meet ?15407 ?15407) ?15408) (meet ?15407 ?15407) [15408, 15407] by Super 1492 with 7401 at 1,2
6532 Id : 4041, {_}: ?4683 =<= join (meet ?4683 ?4683) (meet ?4686 (join ?4683 (meet (meet (join ?4683 ?4684) (join ?4685 ?4683)) ?4683))) [4685, 4684, 4686, 4683] by Demod 3353 with 4020 at 2,1,3
6533 Id : 4042, {_}: ?4683 =<= join (meet ?4683 ?4683) (meet ?4686 (join ?4683 ?4683)) [4686, 4683] by Demod 4041 with 4020 at 2,2,2,3
6534 Id : 4536, {_}: meet ?6617 (join ?6616 ?6616) =<= meet (meet (join ?6616 ?6616) ?6616) (meet ?6617 (join ?6616 ?6616)) [6616, 6617] by Super 4517 with 4042 at 2,1,3
6535 Id : 7400, {_}: join (meet (join (meet ?9519 ?9519) (meet ?9519 ?9519)) (meet ?9519 ?9519)) (meet (meet ?9519 ?9519) (meet ?9519 ?9519)) =>= meet ?9519 ?9519 [9519] by Super 3629 with 7100 at 2,2,2
6536 Id : 7034, {_}: meet ?9263 ?9263 =<= meet (join (meet ?9263 ?9263) (meet ?9263 ?9263)) (meet ?9263 ?9263) [9263] by Super 4586 with 6008 at 1,3
6537 Id : 7430, {_}: join (meet ?9519 ?9519) (meet (meet ?9519 ?9519) (meet ?9519 ?9519)) =>= meet ?9519 ?9519 [9519] by Demod 7400 with 7034 at 1,2
6538 Id : 7431, {_}: join (meet ?9519 ?9519) (meet ?9519 ?9519) =>= meet ?9519 ?9519 [9519] by Demod 7430 with 5886 at 2,2
6539 Id : 7539, {_}: meet ?9566 (join (meet ?9565 ?9565) (meet ?9565 ?9565)) =<= meet (meet (join (meet ?9565 ?9565) (meet ?9565 ?9565)) (meet ?9565 ?9565)) (meet ?9566 (meet ?9565 ?9565)) [9565, 9566] by Super 4536 with 7431 at 2,2,3
6540 Id : 7732, {_}: meet ?9566 (meet ?9565 ?9565) =<= meet (meet (join (meet ?9565 ?9565) (meet ?9565 ?9565)) (meet ?9565 ?9565)) (meet ?9566 (meet ?9565 ?9565)) [9565, 9566] by Demod 7539 with 7431 at 2,2
6541 Id : 7733, {_}: meet ?9566 (meet ?9565 ?9565) =<= meet (meet (meet ?9565 ?9565) (meet ?9565 ?9565)) (meet ?9566 (meet ?9565 ?9565)) [9565, 9566] by Demod 7732 with 7431 at 1,1,3
6542 Id : 7734, {_}: meet ?9566 (meet ?9565 ?9565) =<= meet (meet ?9565 ?9565) (meet ?9566 (meet ?9565 ?9565)) [9565, 9566] by Demod 7733 with 5886 at 1,3
6543 Id : 7988, {_}: join (meet ?9921 (meet ?9922 ?9922)) (meet (meet ?9922 ?9922) (join (meet ?9922 ?9922) (meet ?9921 (meet ?9922 ?9922)))) =>= meet ?9922 ?9922 [9922, 9921] by Super 1492 with 7734 at 1,2
6544 Id : 7550, {_}: meet ?9591 ?9591 =<= join (meet (meet ?9591 ?9591) (meet ?9591 ?9591)) (meet ?9592 (meet ?9591 ?9591)) [9592, 9591] by Super 4042 with 7431 at 2,2,3
6545 Id : 7707, {_}: meet ?9591 ?9591 =<= join (meet ?9591 ?9591) (meet ?9592 (meet ?9591 ?9591)) [9592, 9591] by Demod 7550 with 5886 at 1,3
6546 Id : 8067, {_}: join (meet ?9921 (meet ?9922 ?9922)) (meet (meet ?9922 ?9922) (meet ?9922 ?9922)) =>= meet ?9922 ?9922 [9922, 9921] by Demod 7988 with 7707 at 2,2,2
6547 Id : 8068, {_}: join (meet ?9921 (meet ?9922 ?9922)) (meet ?9922 ?9922) =>= meet ?9922 ?9922 [9922, 9921] by Demod 8067 with 5886 at 2,2
6548 Id : 13909, {_}: join (meet ?15407 ?15407) (meet (meet (join (meet ?15407 ?15407) ?15408) (meet ?15407 ?15407)) (meet ?15407 ?15407)) =>= meet (join (meet ?15407 ?15407) ?15408) (meet ?15407 ?15407) [15408, 15407] by Demod 13724 with 8068 at 2,2,2
6549 Id : 13910, {_}: meet ?15407 ?15407 =<= meet (join (meet ?15407 ?15407) ?15408) (meet ?15407 ?15407) [15408, 15407] by Demod 13909 with 7707 at 2
6550 Id : 5848, {_}: join (meet ?8021 (meet ?8021 (join (meet ?8021 (join ?8022 ?8021)) ?8021))) (meet ?8021 ?8021) =>= ?8021 [8022, 8021] by Super 1492 with 4634 at 2,2,2
6551 Id : 4640, {_}: ?6750 =<= meet (meet ?6750 (join ?6751 ?6750)) ?6750 [6751, 6750] by Demod 4585 with 4020 at 2,2,1,3
6552 Id : 4645, {_}: meet ?6768 (join ?6767 ?6768) =<= meet (meet (meet ?6768 (join ?6767 ?6768)) ?6768) (meet ?6768 (join ?6767 ?6768)) [6767, 6768] by Super 4640 with 3629 at 2,1,3
6553 Id : 4708, {_}: meet ?6768 (join ?6767 ?6768) =<= meet ?6768 (meet ?6768 (join ?6767 ?6768)) [6767, 6768] by Demod 4645 with 4586 at 1,3
6554 Id : 5910, {_}: join (meet ?8021 (join (meet ?8021 (join ?8022 ?8021)) ?8021)) (meet ?8021 ?8021) =>= ?8021 [8022, 8021] by Demod 5848 with 4708 at 1,2
6555 Id : 9401, {_}: meet (meet ?11248 ?11249) ?11248 =<= meet (meet (meet ?11248 ?11249) (meet ?11248 ?11249)) (meet (meet ?11248 ?11249) ?11248) [11249, 11248] by Super 4161 with 1601 at 2,1,3
6556 Id : 9402, {_}: meet (meet (meet (join ?11253 ?11251) (join ?11252 ?11253)) ?11253) (meet (join ?11253 ?11251) (join ?11252 ?11253)) =<= meet (meet (meet (meet (join ?11253 ?11251) (join ?11252 ?11253)) ?11253) (meet (meet (join ?11253 ?11251) (join ?11252 ?11253)) ?11253)) (meet ?11253 (meet (join ?11253 ?11251) (join ?11252 ?11253))) [11252, 11251, 11253] by Super 9401 with 4020 at 1,2,3
6557 Id : 9552, {_}: meet ?11253 (meet (join ?11253 ?11251) (join ?11252 ?11253)) =<= meet (meet (meet (meet (join ?11253 ?11251) (join ?11252 ?11253)) ?11253) (meet (meet (join ?11253 ?11251) (join ?11252 ?11253)) ?11253)) (meet ?11253 (meet (join ?11253 ?11251) (join ?11252 ?11253))) [11252, 11251, 11253] by Demod 9402 with 4020 at 1,2
6558 Id : 9553, {_}: meet ?11253 (meet (join ?11253 ?11251) (join ?11252 ?11253)) =<= meet (meet ?11253 (meet (meet (join ?11253 ?11251) (join ?11252 ?11253)) ?11253)) (meet ?11253 (meet (join ?11253 ?11251) (join ?11252 ?11253))) [11252, 11251, 11253] by Demod 9552 with 4020 at 1,1,3
6559 Id : 18238, {_}: meet ?19914 (meet (join ?19914 ?19915) (join ?19916 ?19914)) =<= meet (meet ?19914 ?19914) (meet ?19914 (meet (join ?19914 ?19915) (join ?19916 ?19914))) [19916, 19915, 19914] by Demod 9553 with 4020 at 2,1,3
6560 Id : 11581, {_}: meet ?13378 (join ?13379 ?13379) =<= meet (meet (meet ?13378 (join ?13379 ?13379)) ?13379) (meet ?13378 (join ?13379 ?13379)) [13379, 13378] by Super 4640 with 4042 at 2,1,3
6561 Id : 11600, {_}: meet (join ?13442 ?13441) (join ?13442 ?13442) =<= meet ?13442 (meet (join ?13442 ?13441) (join ?13442 ?13442)) [13441, 13442] by Super 11581 with 4020 at 1,3
6562 Id : 18285, {_}: meet ?20107 (meet (join ?20107 ?20106) (join ?20107 ?20107)) =<= meet (meet ?20107 ?20107) (meet (join ?20107 ?20106) (join ?20107 ?20107)) [20106, 20107] by Super 18238 with 11600 at 2,3
6563 Id : 18491, {_}: meet (join ?20107 ?20106) (join ?20107 ?20107) =<= meet (meet ?20107 ?20107) (meet (join ?20107 ?20106) (join ?20107 ?20107)) [20106, 20107] by Demod 18285 with 11600 at 2
6564 Id : 18514, {_}: join (meet (join ?20180 ?20181) (join ?20180 ?20180)) (meet (meet (join ?20180 ?20181) (join ?20180 ?20180)) (join (meet ?20180 ?20180) (meet (join ?20180 ?20181) (join ?20180 ?20180)))) =>= meet (join ?20180 ?20181) (join ?20180 ?20180) [20181, 20180] by Super 3629 with 18491 at 1,2
6565 Id : 18667, {_}: join (meet (join ?20180 ?20181) (join ?20180 ?20180)) (meet (meet (join ?20180 ?20181) (join ?20180 ?20180)) ?20180) =>= meet (join ?20180 ?20181) (join ?20180 ?20180) [20181, 20180] by Demod 18514 with 4042 at 2,2,2
6566 Id : 18856, {_}: join (meet (join ?20559 ?20560) (join ?20559 ?20559)) ?20559 =>= meet (join ?20559 ?20560) (join ?20559 ?20559) [20560, 20559] by Demod 18667 with 4020 at 2,2
6567 Id : 4044, {_}: join ?5696 (meet ?5696 (join (meet (join ?5696 ?5697) (join ?5698 ?5696)) ?5696)) =>= ?5696 [5698, 5697, 5696] by Super 3629 with 4020 at 1,2
6568 Id : 18864, {_}: join (meet ?20588 (join ?20588 ?20588)) ?20588 =<= meet (join ?20588 (meet ?20588 (join (meet (join ?20588 ?20586) (join ?20587 ?20588)) ?20588))) (join ?20588 ?20588) [20587, 20586, 20588] by Super 18856 with 4044 at 1,1,2
6569 Id : 19017, {_}: join (meet ?20588 (join ?20588 ?20588)) ?20588 =>= meet ?20588 (join ?20588 ?20588) [20588] by Demod 18864 with 4044 at 1,3
6570 Id : 19112, {_}: join (meet ?20758 (meet ?20758 (join ?20758 ?20758))) (meet ?20758 ?20758) =>= ?20758 [20758] by Super 5910 with 19017 at 2,1,2
6571 Id : 19134, {_}: join (meet ?20758 (join ?20758 ?20758)) (meet ?20758 ?20758) =>= ?20758 [20758] by Demod 19112 with 4708 at 1,2
6572 Id : 12695, {_}: ?14373 =<= join (meet ?14375 (join (join (meet ?14373 (join (meet ?14373 (join ?14374 ?14373)) ?14373)) (meet ?14373 ?14373)) ?14373)) (meet ?14373 (join ?14375 (join ?14373 ?14373))) [14374, 14375, 14373] by Super 2848 with 5910 at 1,2,2,2,3
6573 Id : 12774, {_}: ?14373 =<= join (meet ?14375 (join ?14373 ?14373)) (meet ?14373 (join ?14375 (join ?14373 ?14373))) [14375, 14373] by Demod 12695 with 5910 at 1,2,1,3
6574 Id : 23235, {_}: join ?23859 ?23859 =>= ?23859 [23859] by Super 4042 with 12774 at 3
6575 Id : 23429, {_}: join (meet ?20758 ?20758) (meet ?20758 ?20758) =>= ?20758 [20758] by Demod 19134 with 23235 at 2,1,2
6576 Id : 23430, {_}: meet ?20758 ?20758 =>= ?20758 [20758] by Demod 23429 with 23235 at 2
6577 Id : 23444, {_}: ?15407 =<= meet (join (meet ?15407 ?15407) ?15408) (meet ?15407 ?15407) [15408, 15407] by Demod 13910 with 23430 at 2
6578 Id : 23445, {_}: ?15407 =<= meet (join ?15407 ?15408) (meet ?15407 ?15407) [15408, 15407] by Demod 23444 with 23430 at 1,1,3
6579 Id : 23446, {_}: ?15407 =<= meet (join ?15407 ?15408) ?15407 [15408, 15407] by Demod 23445 with 23430 at 2,3
6580 Id : 23618, {_}: ?24079 =<= join (meet (join (join (meet ?24079 ?24080) (meet ?24081 ?24079)) ?24079) (join (join (meet ?24079 ?24080) (meet ?24081 ?24079)) ?24079)) (meet ?24079 (join (join (meet ?24079 ?24080) (meet ?24081 ?24079)) ?24079)) [24081, 24080, 24079] by Super 2848 with 23235 at 2,2,3
6581 Id : 23720, {_}: ?24079 =<= join (join (join (meet ?24079 ?24080) (meet ?24081 ?24079)) ?24079) (meet ?24079 (join (join (meet ?24079 ?24080) (meet ?24081 ?24079)) ?24079)) [24081, 24080, 24079] by Demod 23618 with 23430 at 1,3
6582 Id : 23476, {_}: ?9591 =<= join (meet ?9591 ?9591) (meet ?9592 (meet ?9591 ?9591)) [9592, 9591] by Demod 7707 with 23430 at 2
6583 Id : 23477, {_}: ?9591 =<= join ?9591 (meet ?9592 (meet ?9591 ?9591)) [9592, 9591] by Demod 23476 with 23430 at 1,3
6584 Id : 23478, {_}: ?9591 =<= join ?9591 (meet ?9592 ?9591) [9592, 9591] by Demod 23477 with 23430 at 2,2,3
6585 Id : 23792, {_}: ?24251 =<= join (join (meet ?24251 ?24252) (meet ?24253 ?24251)) ?24251 [24253, 24252, 24251] by Demod 23720 with 23478 at 3
6586 Id : 23793, {_}: ?24256 =<= join (join (meet ?24256 ?24255) ?24256) ?24256 [24255, 24256] by Super 23792 with 23430 at 2,1,3
6587 Id : 23892, {_}: join (meet ?24386 ?24387) ?24386 =<= meet ?24386 (join (meet ?24386 ?24387) ?24386) [24387, 24386] by Super 23446 with 23793 at 1,3
6588 Id : 24037, {_}: ?24612 =<= meet (join (meet ?24612 ?24613) ?24612) ?24612 [24613, 24612] by Super 4586 with 23892 at 1,3
6589 Id : 23902, {_}: join (meet (join (meet ?24420 ?24421) ?24420) ?24420) (meet (join (meet ?24420 ?24421) ?24420) ?24420) =>= join (meet ?24420 ?24421) ?24420 [24421, 24420] by Super 1492 with 23793 at 2,2,2
6590 Id : 23961, {_}: meet (join (meet ?24420 ?24421) ?24420) ?24420 =>= join (meet ?24420 ?24421) ?24420 [24421, 24420] by Demod 23902 with 23235 at 2
6591 Id : 24344, {_}: ?24612 =<= join (meet ?24612 ?24613) ?24612 [24613, 24612] by Demod 24037 with 23961 at 3
6592 Id : 24361, {_}: join (meet (meet ?24861 ?24862) ?24861) (meet (meet ?24861 ?24862) ?24861) =>= meet ?24861 ?24862 [24862, 24861] by Super 1492 with 24344 at 2,2,2
6593 Id : 24421, {_}: meet (meet ?24861 ?24862) ?24861 =>= meet ?24861 ?24862 [24862, 24861] by Demod 24361 with 23235 at 2
6594 Id : 4078, {_}: meet ?5865 ?5866 =<= meet (meet ?5866 (join ?5867 (meet ?5865 ?5866))) (meet ?5865 ?5866) [5867, 5866, 5865] by Super 4066 with 3629 at 1,1,3
6595 Id : 24583, {_}: ?25104 =<= join ?25104 (meet ?25104 ?25105) [25105, 25104] by Super 23478 with 24421 at 2,3
6596 Id : 24726, {_}: meet ?25313 ?25314 =<= meet (meet ?25314 ?25313) (meet ?25313 ?25314) [25314, 25313] by Super 4078 with 24583 at 2,1,3
6597 Id : 24889, {_}: meet (meet ?25590 ?25591) (meet ?25591 ?25590) =?= meet (meet ?25591 ?25590) (meet ?25590 ?25591) [25591, 25590] by Super 24421 with 24726 at 1,2
6598 Id : 24922, {_}: meet ?25591 ?25590 =<= meet (meet ?25591 ?25590) (meet ?25590 ?25591) [25590, 25591] by Demod 24889 with 24726 at 2
6599 Id : 24923, {_}: meet ?25591 ?25590 =?= meet ?25590 ?25591 [25590, 25591] by Demod 24922 with 24726 at 3
6600 Id : 25184, {_}: meet a b === meet a b [] by Demod 2 with 24923 at 2
6601 Id : 2, {_}: meet b a =>= meet a b [] by prove_wal_axioms_2
6602 % SZS output end CNFRefutation for LAT093-1.p
6609 associativity_of_join is 85
6610 associativity_of_meet is 86
6613 commutativity_of_join is 87
6614 commutativity_of_meet is 88
6616 idempotence_of_join is 91
6617 idempotence_of_meet is 92
6622 Id : 4, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
6623 Id : 6, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
6624 Id : 8, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
6625 Id : 10, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
6627 meet ?12 ?13 =?= meet ?13 ?12
6628 [13, 12] by commutativity_of_meet ?12 ?13
6630 join ?15 ?16 =?= join ?16 ?15
6631 [16, 15] by commutativity_of_join ?15 ?16
6633 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
6634 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
6636 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
6637 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
6639 meet ?26 (join ?27 (meet ?26 ?28))
6643 (meet ?26 (join (meet ?26 ?27) (meet ?28 (join ?26 ?27)))))
6644 [28, 27, 26] by equation_H7 ?26 ?27 ?28
6647 meet a (join b (meet a c))
6649 meet a (join (meet a (join b (meet a c))) (meet c (join a b)))
6651 Last chance: 1246076965.33
6652 Last chance: all is indexed 1246077716.
6653 Last chance: failed over 100 goal 1246077716.
6654 FAILURE in 0 iterations
6655 % SZS status Timeout for LAT138-1.p
6662 associativity_of_join is 85
6663 associativity_of_meet is 86
6666 commutativity_of_join is 87
6667 commutativity_of_meet is 88
6669 idempotence_of_join is 91
6670 idempotence_of_meet is 92
6675 Id : 4, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
6676 Id : 6, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
6677 Id : 8, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
6678 Id : 10, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
6680 meet ?12 ?13 =?= meet ?13 ?12
6681 [13, 12] by commutativity_of_meet ?12 ?13
6683 join ?15 ?16 =?= join ?16 ?15
6684 [16, 15] by commutativity_of_join ?15 ?16
6686 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
6687 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
6689 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
6690 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
6692 join (meet ?26 ?27) (meet ?26 ?28)
6695 (join (meet ?27 (join ?26 (meet ?27 ?28)))
6696 (meet ?28 (join ?26 ?27)))
6697 [28, 27, 26] by equation_H21 ?26 ?27 ?28
6700 meet a (join b (meet a c))
6702 meet a (join b (meet c (join (meet a (join b c)) (meet b c))))
6704 Last chance: 1246078016.26
6705 Last chance: all is indexed 1246078786.2
6706 Last chance: failed over 100 goal 1246078786.2
6707 FAILURE in 0 iterations
6708 % SZS status Timeout for LAT140-1.p
6715 associativity_of_join is 84
6716 associativity_of_meet is 85
6719 commutativity_of_join is 86
6720 commutativity_of_meet is 87
6723 idempotence_of_join is 90
6724 idempotence_of_meet is 91
6729 Id : 4, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
6730 Id : 6, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
6731 Id : 8, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
6732 Id : 10, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
6734 meet ?12 ?13 =?= meet ?13 ?12
6735 [13, 12] by commutativity_of_meet ?12 ?13
6737 join ?15 ?16 =?= join ?16 ?15
6738 [16, 15] by commutativity_of_join ?15 ?16
6740 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
6741 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
6743 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
6744 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
6746 meet ?26 (join ?27 (meet ?28 ?29))
6748 meet ?26 (join ?27 (meet ?28 (join ?27 (meet ?29 (join ?27 ?28)))))
6749 [29, 28, 27, 26] by equation_H34 ?26 ?27 ?28 ?29
6752 meet a (join b (meet a (meet c d)))
6754 meet a (join b (meet c (meet d (join a (meet b d)))))
6756 Last chance: 1246079087.04
6757 Last chance: all is indexed 1246079747.64
6758 Last chance: failed over 100 goal 1246079747.65
6759 FAILURE in 0 iterations
6760 % SZS status Timeout for LAT146-1.p
6767 associativity_of_join is 85
6768 associativity_of_meet is 86
6771 commutativity_of_join is 87
6772 commutativity_of_meet is 88
6774 idempotence_of_join is 91
6775 idempotence_of_meet is 92
6780 Id : 4, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
6781 Id : 6, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
6782 Id : 8, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
6783 Id : 10, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
6785 meet ?12 ?13 =?= meet ?13 ?12
6786 [13, 12] by commutativity_of_meet ?12 ?13
6788 join ?15 ?16 =?= join ?16 ?15
6789 [16, 15] by commutativity_of_join ?15 ?16
6791 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
6792 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
6794 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
6795 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
6797 meet ?26 (join ?27 (meet ?28 ?29))
6799 meet ?26 (join ?27 (meet ?28 (join ?27 (meet ?29 (join ?27 ?28)))))
6800 [29, 28, 27, 26] by equation_H34 ?26 ?27 ?28 ?29
6803 meet a (join b (meet a c))
6805 meet a (join b (meet a (join (meet a b) (meet c (join a b)))))
6807 Last chance: 1246080050.64
6808 Last chance: all is indexed 1246080823.29
6809 Last chance: failed over 100 goal 1246080823.29
6810 FAILURE in 0 iterations
6811 % SZS status Timeout for LAT148-1.p
6818 associativity_of_join is 85
6819 associativity_of_meet is 86
6822 commutativity_of_join is 87
6823 commutativity_of_meet is 88
6825 idempotence_of_join is 91
6826 idempotence_of_meet is 92
6831 Id : 4, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
6832 Id : 6, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
6833 Id : 8, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
6834 Id : 10, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
6836 meet ?12 ?13 =?= meet ?13 ?12
6837 [13, 12] by commutativity_of_meet ?12 ?13
6839 join ?15 ?16 =?= join ?16 ?15
6840 [16, 15] by commutativity_of_join ?15 ?16
6842 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
6843 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
6845 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
6846 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
6848 meet ?26 (join ?27 (meet ?28 (join ?26 ?29)))
6850 meet ?26 (join ?27 (meet ?28 (join ?29 (meet ?28 (join ?26 ?27)))))
6851 [29, 28, 27, 26] by equation_H40 ?26 ?27 ?28 ?29
6854 meet a (join b (meet a c))
6856 meet a (join (meet a (join b (meet a c))) (meet c (join a b)))
6858 Last chance: 1246081123.41
6859 Last chance: all is indexed 1246081806.12
6860 Last chance: failed over 100 goal 1246081806.12
6861 FAILURE in 0 iterations
6862 % SZS status Timeout for LAT152-1.p
6869 associativity_of_join is 85
6870 associativity_of_meet is 86
6873 commutativity_of_join is 87
6874 commutativity_of_meet is 88
6876 idempotence_of_join is 91
6877 idempotence_of_meet is 92
6882 Id : 4, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
6883 Id : 6, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
6884 Id : 8, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
6885 Id : 10, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
6887 meet ?12 ?13 =?= meet ?13 ?12
6888 [13, 12] by commutativity_of_meet ?12 ?13
6890 join ?15 ?16 =?= join ?16 ?15
6891 [16, 15] by commutativity_of_join ?15 ?16
6893 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
6894 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
6896 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
6897 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
6899 meet ?26 (join ?27 (meet ?28 (join ?26 ?29)))
6901 meet ?26 (join ?27 (join (meet ?26 ?28) (meet ?28 (join ?27 ?29))))
6902 [29, 28, 27, 26] by equation_H49 ?26 ?27 ?28 ?29
6905 meet a (join b (meet a c))
6907 meet a (join (meet a (join b (meet a c))) (meet c (join a b)))
6909 Last chance: 1246082106.73
6910 Last chance: all is indexed 1246082875.19
6911 Last chance: failed over 100 goal 1246082875.19
6912 FAILURE in 0 iterations
6913 % SZS status Timeout for LAT156-1.p
6920 associativity_of_join is 85
6921 associativity_of_meet is 86
6924 commutativity_of_join is 87
6925 commutativity_of_meet is 88
6927 idempotence_of_join is 91
6928 idempotence_of_meet is 92
6933 Id : 4, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
6934 Id : 6, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
6935 Id : 8, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
6936 Id : 10, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
6938 meet ?12 ?13 =?= meet ?13 ?12
6939 [13, 12] by commutativity_of_meet ?12 ?13
6941 join ?15 ?16 =?= join ?16 ?15
6942 [16, 15] by commutativity_of_join ?15 ?16
6944 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
6945 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
6947 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
6948 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
6950 meet ?26 (join ?27 (meet ?28 (join ?26 ?29)))
6952 meet ?26 (join ?27 (meet ?28 (join ?26 (meet ?28 (join ?27 ?29)))))
6953 [29, 28, 27, 26] by equation_H50 ?26 ?27 ?28 ?29
6956 meet a (join b (meet a c))
6958 meet a (join b (meet a (join (meet a b) (meet c (join a b)))))
6960 Last chance: 1246083177.41
6961 Last chance: all is indexed 1246083936.64
6962 Last chance: failed over 100 goal 1246083936.64
6963 FAILURE in 0 iterations
6964 % SZS status Timeout for LAT159-1.p
6971 associativity_of_join is 85
6972 associativity_of_meet is 86
6975 commutativity_of_join is 87
6976 commutativity_of_meet is 88
6978 idempotence_of_join is 91
6979 idempotence_of_meet is 92
6984 Id : 4, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
6985 Id : 6, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
6986 Id : 8, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
6987 Id : 10, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
6989 meet ?12 ?13 =?= meet ?13 ?12
6990 [13, 12] by commutativity_of_meet ?12 ?13
6992 join ?15 ?16 =?= join ?16 ?15
6993 [16, 15] by commutativity_of_join ?15 ?16
6995 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
6996 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
6998 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
6999 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
7001 meet ?26 (join ?27 (meet ?28 (join ?27 ?29)))
7003 meet ?26 (join ?27 (meet ?28 (join ?29 (meet ?26 ?27))))
7004 [29, 28, 27, 26] by equation_H76 ?26 ?27 ?28 ?29
7007 meet a (join b (meet a c))
7009 meet a (join (meet a (join b (meet a c))) (meet c (join a b)))
7011 Last chance: 1246084236.73
7012 Last chance: all is indexed 1246084965.23
7013 Last chance: failed over 100 goal 1246084965.24
7014 FAILURE in 0 iterations
7015 % SZS status Timeout for LAT164-1.p
7022 associativity_of_join is 84
7023 associativity_of_meet is 85
7026 commutativity_of_join is 86
7027 commutativity_of_meet is 87
7030 idempotence_of_join is 90
7031 idempotence_of_meet is 91
7036 Id : 4, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
7037 Id : 6, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
7038 Id : 8, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
7039 Id : 10, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
7041 meet ?12 ?13 =?= meet ?13 ?12
7042 [13, 12] by commutativity_of_meet ?12 ?13
7044 join ?15 ?16 =?= join ?16 ?15
7045 [16, 15] by commutativity_of_join ?15 ?16
7047 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
7048 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
7050 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
7051 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
7053 meet ?26 (join ?27 (meet ?28 (join ?27 ?29)))
7055 meet ?26 (join ?27 (meet ?28 (join ?29 (meet ?26 ?27))))
7056 [29, 28, 27, 26] by equation_H76 ?26 ?27 ?28 ?29
7059 meet a (join b (meet c (join b d)))
7061 meet a (join b (meet c (join d (meet a (meet b c)))))
7063 Last chance: 1246085265.76
7064 Last chance: all is indexed 1246086029.27
7065 Last chance: failed over 100 goal 1246086029.27
7066 FAILURE in 0 iterations
7067 % SZS status Timeout for LAT165-1.p
7074 associativity_of_join is 84
7075 associativity_of_meet is 85
7078 commutativity_of_join is 86
7079 commutativity_of_meet is 87
7082 idempotence_of_join is 90
7083 idempotence_of_meet is 91
7088 Id : 4, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
7089 Id : 6, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
7090 Id : 8, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
7091 Id : 10, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
7093 meet ?12 ?13 =?= meet ?13 ?12
7094 [13, 12] by commutativity_of_meet ?12 ?13
7096 join ?15 ?16 =?= join ?16 ?15
7097 [16, 15] by commutativity_of_join ?15 ?16
7099 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
7100 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
7102 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
7103 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
7105 meet ?26 (join ?27 (meet ?28 (join ?27 ?29)))
7107 meet ?26 (join ?27 (meet ?28 (join ?29 (meet ?26 (meet ?27 ?28)))))
7108 [29, 28, 27, 26] by equation_H77 ?26 ?27 ?28 ?29
7111 meet a (join b (meet c (join b d)))
7113 meet a (join b (meet c (join d (meet b (join a d)))))
7115 Last chance: 1246086331.52
7116 Last chance: all is indexed 1246087040.97
7117 Last chance: failed over 100 goal 1246087040.97
7118 FAILURE in 0 iterations
7119 % SZS status Timeout for LAT166-1.p
7126 associativity_of_join is 85
7127 associativity_of_meet is 86
7130 commutativity_of_join is 87
7131 commutativity_of_meet is 88
7132 equation_H21_dual is 84
7133 idempotence_of_join is 91
7134 idempotence_of_meet is 92
7139 Id : 4, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
7140 Id : 6, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
7141 Id : 8, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
7142 Id : 10, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
7144 meet ?12 ?13 =?= meet ?13 ?12
7145 [13, 12] by commutativity_of_meet ?12 ?13
7147 join ?15 ?16 =?= join ?16 ?15
7148 [16, 15] by commutativity_of_join ?15 ?16
7150 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
7151 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
7153 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
7154 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
7156 meet (join ?26 ?27) (join ?26 ?28)
7159 (meet (join ?27 (meet ?26 (join ?27 ?28)))
7160 (join ?28 (meet ?26 ?27)))
7161 [28, 27, 26] by equation_H21_dual ?26 ?27 ?28
7166 meet a (join b (meet (join a b) (join c (meet a b))))
7168 Last chance: 1246087341.15
7169 Last chance: all is indexed 1246088084.75
7170 Last chance: failed over 100 goal 1246088084.75
7171 FAILURE in 0 iterations
7172 % SZS status Timeout for LAT169-1.p
7179 associativity_of_join is 85
7180 associativity_of_meet is 86
7183 commutativity_of_join is 87
7184 commutativity_of_meet is 88
7185 equation_H49_dual is 84
7186 idempotence_of_join is 91
7187 idempotence_of_meet is 92
7192 Id : 4, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
7193 Id : 6, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
7194 Id : 8, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
7195 Id : 10, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
7197 meet ?12 ?13 =?= meet ?13 ?12
7198 [13, 12] by commutativity_of_meet ?12 ?13
7200 join ?15 ?16 =?= join ?16 ?15
7201 [16, 15] by commutativity_of_join ?15 ?16
7203 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
7204 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
7206 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
7207 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
7209 join ?26 (meet ?27 (join ?28 (meet ?26 ?29)))
7211 join ?26 (meet ?27 (meet (join ?26 ?28) (join ?28 (meet ?27 ?29))))
7212 [29, 28, 27, 26] by equation_H49_dual ?26 ?27 ?28 ?29
7217 meet a (join b (meet (join a b) (join c (meet a b))))
7219 Last chance: 1246088386.61
7220 Last chance: all is indexed 1246089088.1
7221 Last chance: failed over 100 goal 1246089088.1
7222 FAILURE in 0 iterations
7223 % SZS status Timeout for LAT170-1.p
7230 associativity_of_join is 84
7231 associativity_of_meet is 85
7234 commutativity_of_join is 86
7235 commutativity_of_meet is 87
7237 equation_H76_dual is 83
7238 idempotence_of_join is 90
7239 idempotence_of_meet is 91
7244 Id : 4, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
7245 Id : 6, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
7246 Id : 8, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
7247 Id : 10, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
7249 meet ?12 ?13 =?= meet ?13 ?12
7250 [13, 12] by commutativity_of_meet ?12 ?13
7252 join ?15 ?16 =?= join ?16 ?15
7253 [16, 15] by commutativity_of_join ?15 ?16
7255 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
7256 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
7258 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
7259 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
7261 join ?26 (meet ?27 (join ?28 (meet ?27 ?29)))
7263 join ?26 (meet ?27 (join ?28 (meet ?29 (join ?26 ?27))))
7264 [29, 28, 27, 26] by equation_H76_dual ?26 ?27 ?28 ?29
7267 meet a (join b (meet c (join a d)))
7269 meet a (join b (meet c (join d (meet c (join a b)))))
7271 Last chance: 1246089390.3
7272 Last chance: all is indexed 1246090126.61
7273 Last chance: failed over 100 goal 1246090126.62
7274 FAILURE in 0 iterations
7275 % SZS status Timeout for LAT173-1.p
7282 associativity_of_join is 84
7283 associativity_of_meet is 85
7286 commutativity_of_join is 86
7287 commutativity_of_meet is 87
7289 equation_H79_dual is 83
7290 idempotence_of_join is 90
7291 idempotence_of_meet is 91
7296 Id : 4, {_}: meet ?2 ?2 =>= ?2 [2] by idempotence_of_meet ?2
7297 Id : 6, {_}: join ?4 ?4 =>= ?4 [4] by idempotence_of_join ?4
7298 Id : 8, {_}: meet ?6 (join ?6 ?7) =>= ?6 [7, 6] by absorption1 ?6 ?7
7299 Id : 10, {_}: join ?9 (meet ?9 ?10) =>= ?9 [10, 9] by absorption2 ?9 ?10
7301 meet ?12 ?13 =?= meet ?13 ?12
7302 [13, 12] by commutativity_of_meet ?12 ?13
7304 join ?15 ?16 =?= join ?16 ?15
7305 [16, 15] by commutativity_of_join ?15 ?16
7307 meet (meet ?18 ?19) ?20 =?= meet ?18 (meet ?19 ?20)
7308 [20, 19, 18] by associativity_of_meet ?18 ?19 ?20
7310 join (join ?22 ?23) ?24 =?= join ?22 (join ?23 ?24)
7311 [24, 23, 22] by associativity_of_join ?22 ?23 ?24
7313 join ?26 (meet ?27 (join ?28 (meet ?26 ?29)))
7315 join ?26 (meet (join ?26 (meet ?27 (join ?26 ?28))) (join ?28 ?29))
7316 [29, 28, 27, 26] by equation_H79_dual ?26 ?27 ?28 ?29
7319 meet a (join b (meet a (meet c d)))
7321 meet a (join b (meet c (join (meet a d) (meet b d))))
7323 Last chance: 1246090428.09
7324 Last chance: all is indexed 1246091152.16
7325 Last chance: failed over 100 goal 1246091152.16
7326 FAILURE in 0 iterations
7327 % SZS status Timeout for LAT175-1.p
7332 a_times_b_is_c is 80
7334 additive_identity is 93
7335 additive_inverse is 89
7336 associativity_for_addition is 86
7337 associativity_for_multiplication is 84
7340 commutativity_for_addition is 85
7343 left_additive_identity is 91
7344 left_additive_inverse is 88
7346 prove_commutativity is 94
7347 right_additive_identity is 90
7348 right_additive_inverse is 87
7351 Id : 4, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
7353 add ?4 additive_identity =>= ?4
7354 [4] by right_additive_identity ?4
7356 add (additive_inverse ?6) ?6 =>= additive_identity
7357 [6] by left_additive_inverse ?6
7359 add ?8 (additive_inverse ?8) =>= additive_identity
7360 [8] by right_additive_inverse ?8
7362 add ?10 (add ?11 ?12) =?= add (add ?10 ?11) ?12
7363 [12, 11, 10] by associativity_for_addition ?10 ?11 ?12
7365 add ?14 ?15 =?= add ?15 ?14
7366 [15, 14] by commutativity_for_addition ?14 ?15
7368 multiply ?17 (multiply ?18 ?19) =?= multiply (multiply ?17 ?18) ?19
7369 [19, 18, 17] by associativity_for_multiplication ?17 ?18 ?19
7371 multiply ?21 (add ?22 ?23)
7373 add (multiply ?21 ?22) (multiply ?21 ?23)
7374 [23, 22, 21] by distribute1 ?21 ?22 ?23
7376 multiply (add ?25 ?26) ?27
7378 add (multiply ?25 ?27) (multiply ?26 ?27)
7379 [27, 26, 25] by distribute2 ?25 ?26 ?27
7380 Id : 22, {_}: multiply ?29 (multiply ?29 ?29) =>= ?29 [29] by x_cubed_is_x ?29
7381 Id : 24, {_}: multiply a b =>= c [] by a_times_b_is_c
7383 Id : 2, {_}: multiply b a =>= c [] by prove_commutativity
7384 Last chance: 1246091452.34
7385 Last chance: all is indexed 1246092379.97
7386 Last chance: failed over 100 goal 1246092379.97
7387 FAILURE in 0 iterations
7388 % SZS status Timeout for RNG009-7.p
7393 additive_identity is 91
7394 additive_inverse is 85
7395 additive_inverse_additive_inverse is 82
7396 associativity_for_addition is 78
7398 commutativity_for_addition is 79
7402 left_additive_identity is 90
7403 left_additive_inverse is 84
7404 left_alternative is 76
7405 left_multiplicative_zero is 87
7407 prove_linearised_form1 is 92
7408 right_additive_identity is 89
7409 right_additive_inverse is 83
7410 right_alternative is 77
7411 right_multiplicative_zero is 86
7417 Id : 4, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
7419 add ?4 additive_identity =>= ?4
7420 [4] by right_additive_identity ?4
7422 multiply additive_identity ?6 =>= additive_identity
7423 [6] by left_multiplicative_zero ?6
7425 multiply ?8 additive_identity =>= additive_identity
7426 [8] by right_multiplicative_zero ?8
7428 add (additive_inverse ?10) ?10 =>= additive_identity
7429 [10] by left_additive_inverse ?10
7431 add ?12 (additive_inverse ?12) =>= additive_identity
7432 [12] by right_additive_inverse ?12
7434 additive_inverse (additive_inverse ?14) =>= ?14
7435 [14] by additive_inverse_additive_inverse ?14
7437 multiply ?16 (add ?17 ?18)
7439 add (multiply ?16 ?17) (multiply ?16 ?18)
7440 [18, 17, 16] by distribute1 ?16 ?17 ?18
7442 multiply (add ?20 ?21) ?22
7444 add (multiply ?20 ?22) (multiply ?21 ?22)
7445 [22, 21, 20] by distribute2 ?20 ?21 ?22
7447 add ?24 ?25 =?= add ?25 ?24
7448 [25, 24] by commutativity_for_addition ?24 ?25
7450 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
7451 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
7453 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
7454 [32, 31] by right_alternative ?31 ?32
7456 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
7457 [35, 34] by left_alternative ?34 ?35
7459 associator ?37 ?38 ?39
7461 add (multiply (multiply ?37 ?38) ?39)
7462 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
7463 [39, 38, 37] by associator ?37 ?38 ?39
7467 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
7468 [42, 41] by commutator ?41 ?42
7471 associator x y (add u v)
7473 add (associator x y u) (associator x y v)
7474 [] by prove_linearised_form1
7475 Last chance: 1246092681.04
7476 Last chance: all is indexed 1246093632.21
7477 Last chance: failed over 100 goal 1246093632.21
7478 FAILURE in 0 iterations
7479 % SZS status Timeout for RNG019-6.p
7484 additive_identity is 91
7485 additive_inverse is 85
7486 additive_inverse_additive_inverse is 82
7487 associativity_for_addition is 78
7489 commutativity_for_addition is 79
7493 distributivity_of_difference1 is 71
7494 distributivity_of_difference2 is 70
7495 distributivity_of_difference3 is 69
7496 distributivity_of_difference4 is 68
7497 inverse_product1 is 73
7498 inverse_product2 is 72
7499 left_additive_identity is 90
7500 left_additive_inverse is 84
7501 left_alternative is 76
7502 left_multiplicative_zero is 87
7504 product_of_inverses is 74
7505 prove_linearised_form1 is 92
7506 right_additive_identity is 89
7507 right_additive_inverse is 83
7508 right_alternative is 77
7509 right_multiplicative_zero is 86
7515 Id : 4, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
7517 add ?4 additive_identity =>= ?4
7518 [4] by right_additive_identity ?4
7520 multiply additive_identity ?6 =>= additive_identity
7521 [6] by left_multiplicative_zero ?6
7523 multiply ?8 additive_identity =>= additive_identity
7524 [8] by right_multiplicative_zero ?8
7526 add (additive_inverse ?10) ?10 =>= additive_identity
7527 [10] by left_additive_inverse ?10
7529 add ?12 (additive_inverse ?12) =>= additive_identity
7530 [12] by right_additive_inverse ?12
7532 additive_inverse (additive_inverse ?14) =>= ?14
7533 [14] by additive_inverse_additive_inverse ?14
7535 multiply ?16 (add ?17 ?18)
7537 add (multiply ?16 ?17) (multiply ?16 ?18)
7538 [18, 17, 16] by distribute1 ?16 ?17 ?18
7540 multiply (add ?20 ?21) ?22
7542 add (multiply ?20 ?22) (multiply ?21 ?22)
7543 [22, 21, 20] by distribute2 ?20 ?21 ?22
7545 add ?24 ?25 =?= add ?25 ?24
7546 [25, 24] by commutativity_for_addition ?24 ?25
7548 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
7549 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
7551 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
7552 [32, 31] by right_alternative ?31 ?32
7554 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
7555 [35, 34] by left_alternative ?34 ?35
7557 associator ?37 ?38 ?39
7559 add (multiply (multiply ?37 ?38) ?39)
7560 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
7561 [39, 38, 37] by associator ?37 ?38 ?39
7565 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
7566 [42, 41] by commutator ?41 ?42
7568 multiply (additive_inverse ?44) (additive_inverse ?45)
7571 [45, 44] by product_of_inverses ?44 ?45
7573 multiply (additive_inverse ?47) ?48
7575 additive_inverse (multiply ?47 ?48)
7576 [48, 47] by inverse_product1 ?47 ?48
7578 multiply ?50 (additive_inverse ?51)
7580 additive_inverse (multiply ?50 ?51)
7581 [51, 50] by inverse_product2 ?50 ?51
7583 multiply ?53 (add ?54 (additive_inverse ?55))
7585 add (multiply ?53 ?54) (additive_inverse (multiply ?53 ?55))
7586 [55, 54, 53] by distributivity_of_difference1 ?53 ?54 ?55
7588 multiply (add ?57 (additive_inverse ?58)) ?59
7590 add (multiply ?57 ?59) (additive_inverse (multiply ?58 ?59))
7591 [59, 58, 57] by distributivity_of_difference2 ?57 ?58 ?59
7593 multiply (additive_inverse ?61) (add ?62 ?63)
7595 add (additive_inverse (multiply ?61 ?62))
7596 (additive_inverse (multiply ?61 ?63))
7597 [63, 62, 61] by distributivity_of_difference3 ?61 ?62 ?63
7599 multiply (add ?65 ?66) (additive_inverse ?67)
7601 add (additive_inverse (multiply ?65 ?67))
7602 (additive_inverse (multiply ?66 ?67))
7603 [67, 66, 65] by distributivity_of_difference4 ?65 ?66 ?67
7606 associator x y (add u v)
7608 add (associator x y u) (associator x y v)
7609 [] by prove_linearised_form1
7610 Last chance: 1246093932.41
7611 Last chance: all is indexed 1246095402.48
7612 Last chance: failed over 100 goal 1246095402.49
7613 FAILURE in 0 iterations
7614 % SZS status Timeout for RNG019-7.p
7619 additive_identity is 91
7620 additive_inverse is 85
7621 additive_inverse_additive_inverse is 82
7622 associativity_for_addition is 78
7624 commutativity_for_addition is 79
7628 left_additive_identity is 90
7629 left_additive_inverse is 84
7630 left_alternative is 76
7631 left_multiplicative_zero is 87
7633 prove_linearised_form2 is 92
7634 right_additive_identity is 89
7635 right_additive_inverse is 83
7636 right_alternative is 77
7637 right_multiplicative_zero is 86
7643 Id : 4, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
7645 add ?4 additive_identity =>= ?4
7646 [4] by right_additive_identity ?4
7648 multiply additive_identity ?6 =>= additive_identity
7649 [6] by left_multiplicative_zero ?6
7651 multiply ?8 additive_identity =>= additive_identity
7652 [8] by right_multiplicative_zero ?8
7654 add (additive_inverse ?10) ?10 =>= additive_identity
7655 [10] by left_additive_inverse ?10
7657 add ?12 (additive_inverse ?12) =>= additive_identity
7658 [12] by right_additive_inverse ?12
7660 additive_inverse (additive_inverse ?14) =>= ?14
7661 [14] by additive_inverse_additive_inverse ?14
7663 multiply ?16 (add ?17 ?18)
7665 add (multiply ?16 ?17) (multiply ?16 ?18)
7666 [18, 17, 16] by distribute1 ?16 ?17 ?18
7668 multiply (add ?20 ?21) ?22
7670 add (multiply ?20 ?22) (multiply ?21 ?22)
7671 [22, 21, 20] by distribute2 ?20 ?21 ?22
7673 add ?24 ?25 =?= add ?25 ?24
7674 [25, 24] by commutativity_for_addition ?24 ?25
7676 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
7677 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
7679 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
7680 [32, 31] by right_alternative ?31 ?32
7682 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
7683 [35, 34] by left_alternative ?34 ?35
7685 associator ?37 ?38 ?39
7687 add (multiply (multiply ?37 ?38) ?39)
7688 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
7689 [39, 38, 37] by associator ?37 ?38 ?39
7693 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
7694 [42, 41] by commutator ?41 ?42
7697 associator x (add u v) y
7699 add (associator x u y) (associator x v y)
7700 [] by prove_linearised_form2
7701 Last chance: 1246095704.23
7702 Last chance: all is indexed 1246096665.27
7703 Last chance: failed over 100 goal 1246096665.27
7704 FAILURE in 0 iterations
7705 % SZS status Timeout for RNG020-6.p
7711 additive_identity is 90
7712 additive_inverse is 91
7713 additive_inverse_additive_inverse is 82
7714 associativity_for_addition is 78
7718 commutativity_for_addition is 79
7723 left_additive_identity is 88
7724 left_additive_inverse is 84
7725 left_alternative is 76
7726 left_multiplicative_zero is 86
7728 prove_teichmuller_identity is 89
7729 right_additive_identity is 87
7730 right_additive_inverse is 83
7731 right_alternative is 77
7732 right_multiplicative_zero is 85
7734 Id : 4, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
7736 add ?4 additive_identity =>= ?4
7737 [4] by right_additive_identity ?4
7739 multiply additive_identity ?6 =>= additive_identity
7740 [6] by left_multiplicative_zero ?6
7742 multiply ?8 additive_identity =>= additive_identity
7743 [8] by right_multiplicative_zero ?8
7745 add (additive_inverse ?10) ?10 =>= additive_identity
7746 [10] by left_additive_inverse ?10
7748 add ?12 (additive_inverse ?12) =>= additive_identity
7749 [12] by right_additive_inverse ?12
7751 additive_inverse (additive_inverse ?14) =>= ?14
7752 [14] by additive_inverse_additive_inverse ?14
7754 multiply ?16 (add ?17 ?18)
7756 add (multiply ?16 ?17) (multiply ?16 ?18)
7757 [18, 17, 16] by distribute1 ?16 ?17 ?18
7759 multiply (add ?20 ?21) ?22
7761 add (multiply ?20 ?22) (multiply ?21 ?22)
7762 [22, 21, 20] by distribute2 ?20 ?21 ?22
7764 add ?24 ?25 =?= add ?25 ?24
7765 [25, 24] by commutativity_for_addition ?24 ?25
7767 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
7768 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
7770 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
7771 [32, 31] by right_alternative ?31 ?32
7773 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
7774 [35, 34] by left_alternative ?34 ?35
7776 associator ?37 ?38 ?39
7778 add (multiply (multiply ?37 ?38) ?39)
7779 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
7780 [39, 38, 37] by associator ?37 ?38 ?39
7784 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
7785 [42, 41] by commutator ?41 ?42
7789 (add (associator (multiply a b) c d)
7790 (associator a b (multiply c d)))
7793 (add (associator a (multiply b c) d)
7794 (multiply a (associator b c d)))
7795 (multiply (associator a b c) d)))
7798 [] by prove_teichmuller_identity
7799 Last chance: 1246096966.68
7800 Last chance: all is indexed 1246097932.32
7801 Last chance: failed over 100 goal 1246097932.59
7802 FAILURE in 0 iterations
7803 % SZS status Timeout for RNG026-6.p
7808 additive_identity is 93
7809 additive_inverse is 87
7810 additive_inverse_additive_inverse is 84
7811 associativity_for_addition is 80
7813 commutativity_for_addition is 81
7820 distributivity_of_difference1 is 72
7821 distributivity_of_difference2 is 71
7822 distributivity_of_difference3 is 70
7823 distributivity_of_difference4 is 69
7824 inverse_product1 is 74
7825 inverse_product2 is 73
7826 left_additive_identity is 91
7827 left_additive_inverse is 86
7828 left_alternative is 78
7829 left_multiplicative_zero is 89
7831 product_of_inverses is 75
7832 prove_right_moufang is 94
7833 right_additive_identity is 90
7834 right_additive_inverse is 85
7835 right_alternative is 79
7836 right_multiplicative_zero is 88
7838 Id : 4, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
7840 add ?4 additive_identity =>= ?4
7841 [4] by right_additive_identity ?4
7843 multiply additive_identity ?6 =>= additive_identity
7844 [6] by left_multiplicative_zero ?6
7846 multiply ?8 additive_identity =>= additive_identity
7847 [8] by right_multiplicative_zero ?8
7849 add (additive_inverse ?10) ?10 =>= additive_identity
7850 [10] by left_additive_inverse ?10
7852 add ?12 (additive_inverse ?12) =>= additive_identity
7853 [12] by right_additive_inverse ?12
7855 additive_inverse (additive_inverse ?14) =>= ?14
7856 [14] by additive_inverse_additive_inverse ?14
7858 multiply ?16 (add ?17 ?18)
7860 add (multiply ?16 ?17) (multiply ?16 ?18)
7861 [18, 17, 16] by distribute1 ?16 ?17 ?18
7863 multiply (add ?20 ?21) ?22
7865 add (multiply ?20 ?22) (multiply ?21 ?22)
7866 [22, 21, 20] by distribute2 ?20 ?21 ?22
7868 add ?24 ?25 =?= add ?25 ?24
7869 [25, 24] by commutativity_for_addition ?24 ?25
7871 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
7872 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
7874 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
7875 [32, 31] by right_alternative ?31 ?32
7877 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
7878 [35, 34] by left_alternative ?34 ?35
7880 associator ?37 ?38 ?39
7882 add (multiply (multiply ?37 ?38) ?39)
7883 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
7884 [39, 38, 37] by associator ?37 ?38 ?39
7888 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
7889 [42, 41] by commutator ?41 ?42
7891 multiply (additive_inverse ?44) (additive_inverse ?45)
7894 [45, 44] by product_of_inverses ?44 ?45
7896 multiply (additive_inverse ?47) ?48
7898 additive_inverse (multiply ?47 ?48)
7899 [48, 47] by inverse_product1 ?47 ?48
7901 multiply ?50 (additive_inverse ?51)
7903 additive_inverse (multiply ?50 ?51)
7904 [51, 50] by inverse_product2 ?50 ?51
7906 multiply ?53 (add ?54 (additive_inverse ?55))
7908 add (multiply ?53 ?54) (additive_inverse (multiply ?53 ?55))
7909 [55, 54, 53] by distributivity_of_difference1 ?53 ?54 ?55
7911 multiply (add ?57 (additive_inverse ?58)) ?59
7913 add (multiply ?57 ?59) (additive_inverse (multiply ?58 ?59))
7914 [59, 58, 57] by distributivity_of_difference2 ?57 ?58 ?59
7916 multiply (additive_inverse ?61) (add ?62 ?63)
7918 add (additive_inverse (multiply ?61 ?62))
7919 (additive_inverse (multiply ?61 ?63))
7920 [63, 62, 61] by distributivity_of_difference3 ?61 ?62 ?63
7922 multiply (add ?65 ?66) (additive_inverse ?67)
7924 add (additive_inverse (multiply ?65 ?67))
7925 (additive_inverse (multiply ?66 ?67))
7926 [67, 66, 65] by distributivity_of_difference4 ?65 ?66 ?67
7929 multiply cz (multiply cx (multiply cy cx))
7931 multiply (multiply (multiply cz cx) cy) cx
7932 [] by prove_right_moufang
7933 Last chance: 1246098233.93
7934 Last chance: all is indexed 1246099724.05
7935 Last chance: failed over 100 goal 1246099724.05
7936 FAILURE in 0 iterations
7937 % SZS status Timeout for RNG027-7.p
7942 additive_identity is 92
7943 additive_inverse is 86
7944 additive_inverse_additive_inverse is 83
7945 associativity_for_addition is 79
7947 commutativity_for_addition is 80
7951 distributivity_of_difference1 is 72
7952 distributivity_of_difference2 is 71
7953 distributivity_of_difference3 is 70
7954 distributivity_of_difference4 is 69
7955 inverse_product1 is 74
7956 inverse_product2 is 73
7957 left_additive_identity is 90
7958 left_additive_inverse is 85
7959 left_alternative is 77
7960 left_multiplicative_zero is 88
7962 product_of_inverses is 75
7963 prove_left_moufang is 93
7964 right_additive_identity is 89
7965 right_additive_inverse is 84
7966 right_alternative is 78
7967 right_multiplicative_zero is 87
7972 Id : 4, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
7974 add ?4 additive_identity =>= ?4
7975 [4] by right_additive_identity ?4
7977 multiply additive_identity ?6 =>= additive_identity
7978 [6] by left_multiplicative_zero ?6
7980 multiply ?8 additive_identity =>= additive_identity
7981 [8] by right_multiplicative_zero ?8
7983 add (additive_inverse ?10) ?10 =>= additive_identity
7984 [10] by left_additive_inverse ?10
7986 add ?12 (additive_inverse ?12) =>= additive_identity
7987 [12] by right_additive_inverse ?12
7989 additive_inverse (additive_inverse ?14) =>= ?14
7990 [14] by additive_inverse_additive_inverse ?14
7992 multiply ?16 (add ?17 ?18)
7994 add (multiply ?16 ?17) (multiply ?16 ?18)
7995 [18, 17, 16] by distribute1 ?16 ?17 ?18
7997 multiply (add ?20 ?21) ?22
7999 add (multiply ?20 ?22) (multiply ?21 ?22)
8000 [22, 21, 20] by distribute2 ?20 ?21 ?22
8002 add ?24 ?25 =?= add ?25 ?24
8003 [25, 24] by commutativity_for_addition ?24 ?25
8005 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
8006 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
8008 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
8009 [32, 31] by right_alternative ?31 ?32
8011 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
8012 [35, 34] by left_alternative ?34 ?35
8014 associator ?37 ?38 ?39
8016 add (multiply (multiply ?37 ?38) ?39)
8017 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
8018 [39, 38, 37] by associator ?37 ?38 ?39
8022 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
8023 [42, 41] by commutator ?41 ?42
8025 multiply (additive_inverse ?44) (additive_inverse ?45)
8028 [45, 44] by product_of_inverses ?44 ?45
8030 multiply (additive_inverse ?47) ?48
8032 additive_inverse (multiply ?47 ?48)
8033 [48, 47] by inverse_product1 ?47 ?48
8035 multiply ?50 (additive_inverse ?51)
8037 additive_inverse (multiply ?50 ?51)
8038 [51, 50] by inverse_product2 ?50 ?51
8040 multiply ?53 (add ?54 (additive_inverse ?55))
8042 add (multiply ?53 ?54) (additive_inverse (multiply ?53 ?55))
8043 [55, 54, 53] by distributivity_of_difference1 ?53 ?54 ?55
8045 multiply (add ?57 (additive_inverse ?58)) ?59
8047 add (multiply ?57 ?59) (additive_inverse (multiply ?58 ?59))
8048 [59, 58, 57] by distributivity_of_difference2 ?57 ?58 ?59
8050 multiply (additive_inverse ?61) (add ?62 ?63)
8052 add (additive_inverse (multiply ?61 ?62))
8053 (additive_inverse (multiply ?61 ?63))
8054 [63, 62, 61] by distributivity_of_difference3 ?61 ?62 ?63
8056 multiply (add ?65 ?66) (additive_inverse ?67)
8058 add (additive_inverse (multiply ?65 ?67))
8059 (additive_inverse (multiply ?66 ?67))
8060 [67, 66, 65] by distributivity_of_difference4 ?65 ?66 ?67
8063 associator x (multiply y x) z =<= multiply x (associator x y z)
8064 [] by prove_left_moufang
8065 Last chance: 1246100026.03
8066 Last chance: all is indexed 1246101492.29
8067 Last chance: failed over 100 goal 1246101492.29
8068 FAILURE in 0 iterations
8069 % SZS status Timeout for RNG028-9.p
8074 additive_identity is 93
8075 additive_inverse is 87
8076 additive_inverse_additive_inverse is 84
8077 associativity_for_addition is 80
8079 commutativity_for_addition is 81
8083 distributivity_of_difference1 is 72
8084 distributivity_of_difference2 is 71
8085 distributivity_of_difference3 is 70
8086 distributivity_of_difference4 is 69
8087 inverse_product1 is 74
8088 inverse_product2 is 73
8089 left_additive_identity is 91
8090 left_additive_inverse is 86
8091 left_alternative is 78
8092 left_multiplicative_zero is 89
8094 product_of_inverses is 75
8095 prove_middle_moufang is 94
8096 right_additive_identity is 90
8097 right_additive_inverse is 85
8098 right_alternative is 79
8099 right_multiplicative_zero is 88
8104 Id : 4, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
8106 add ?4 additive_identity =>= ?4
8107 [4] by right_additive_identity ?4
8109 multiply additive_identity ?6 =>= additive_identity
8110 [6] by left_multiplicative_zero ?6
8112 multiply ?8 additive_identity =>= additive_identity
8113 [8] by right_multiplicative_zero ?8
8115 add (additive_inverse ?10) ?10 =>= additive_identity
8116 [10] by left_additive_inverse ?10
8118 add ?12 (additive_inverse ?12) =>= additive_identity
8119 [12] by right_additive_inverse ?12
8121 additive_inverse (additive_inverse ?14) =>= ?14
8122 [14] by additive_inverse_additive_inverse ?14
8124 multiply ?16 (add ?17 ?18)
8126 add (multiply ?16 ?17) (multiply ?16 ?18)
8127 [18, 17, 16] by distribute1 ?16 ?17 ?18
8129 multiply (add ?20 ?21) ?22
8131 add (multiply ?20 ?22) (multiply ?21 ?22)
8132 [22, 21, 20] by distribute2 ?20 ?21 ?22
8134 add ?24 ?25 =?= add ?25 ?24
8135 [25, 24] by commutativity_for_addition ?24 ?25
8137 add ?27 (add ?28 ?29) =?= add (add ?27 ?28) ?29
8138 [29, 28, 27] by associativity_for_addition ?27 ?28 ?29
8140 multiply (multiply ?31 ?32) ?32 =?= multiply ?31 (multiply ?32 ?32)
8141 [32, 31] by right_alternative ?31 ?32
8143 multiply (multiply ?34 ?34) ?35 =?= multiply ?34 (multiply ?34 ?35)
8144 [35, 34] by left_alternative ?34 ?35
8146 associator ?37 ?38 ?39
8148 add (multiply (multiply ?37 ?38) ?39)
8149 (additive_inverse (multiply ?37 (multiply ?38 ?39)))
8150 [39, 38, 37] by associator ?37 ?38 ?39
8154 add (multiply ?42 ?41) (additive_inverse (multiply ?41 ?42))
8155 [42, 41] by commutator ?41 ?42
8157 multiply (additive_inverse ?44) (additive_inverse ?45)
8160 [45, 44] by product_of_inverses ?44 ?45
8162 multiply (additive_inverse ?47) ?48
8164 additive_inverse (multiply ?47 ?48)
8165 [48, 47] by inverse_product1 ?47 ?48
8167 multiply ?50 (additive_inverse ?51)
8169 additive_inverse (multiply ?50 ?51)
8170 [51, 50] by inverse_product2 ?50 ?51
8172 multiply ?53 (add ?54 (additive_inverse ?55))
8174 add (multiply ?53 ?54) (additive_inverse (multiply ?53 ?55))
8175 [55, 54, 53] by distributivity_of_difference1 ?53 ?54 ?55
8177 multiply (add ?57 (additive_inverse ?58)) ?59
8179 add (multiply ?57 ?59) (additive_inverse (multiply ?58 ?59))
8180 [59, 58, 57] by distributivity_of_difference2 ?57 ?58 ?59
8182 multiply (additive_inverse ?61) (add ?62 ?63)
8184 add (additive_inverse (multiply ?61 ?62))
8185 (additive_inverse (multiply ?61 ?63))
8186 [63, 62, 61] by distributivity_of_difference3 ?61 ?62 ?63
8188 multiply (add ?65 ?66) (additive_inverse ?67)
8190 add (additive_inverse (multiply ?65 ?67))
8191 (additive_inverse (multiply ?66 ?67))
8192 [67, 66, 65] by distributivity_of_difference4 ?65 ?66 ?67
8195 multiply (multiply x y) (multiply z x)
8197 multiply (multiply x (multiply y z)) x
8198 [] by prove_middle_moufang
8199 Last chance: 1246101794.55
8200 Last chance: all is indexed 1246103287.97
8201 Last chance: failed over 100 goal 1246103287.97
8202 FAILURE in 0 iterations
8203 % SZS status Timeout for RNG029-7.p
8208 a_times_b_is_c is 80
8210 additive_identity is 93
8211 additive_inverse is 89
8212 associativity_for_addition is 86
8213 associativity_for_multiplication is 84
8216 commutativity_for_addition is 85
8219 left_additive_identity is 91
8220 left_additive_inverse is 88
8222 prove_commutativity is 94
8223 right_additive_identity is 90
8224 right_additive_inverse is 87
8225 x_fourthed_is_x is 81
8227 Id : 4, {_}: add additive_identity ?2 =>= ?2 [2] by left_additive_identity ?2
8229 add ?4 additive_identity =>= ?4
8230 [4] by right_additive_identity ?4
8232 add (additive_inverse ?6) ?6 =>= additive_identity
8233 [6] by left_additive_inverse ?6
8235 add ?8 (additive_inverse ?8) =>= additive_identity
8236 [8] by right_additive_inverse ?8
8238 add ?10 (add ?11 ?12) =?= add (add ?10 ?11) ?12
8239 [12, 11, 10] by associativity_for_addition ?10 ?11 ?12
8241 add ?14 ?15 =?= add ?15 ?14
8242 [15, 14] by commutativity_for_addition ?14 ?15
8244 multiply ?17 (multiply ?18 ?19) =?= multiply (multiply ?17 ?18) ?19
8245 [19, 18, 17] by associativity_for_multiplication ?17 ?18 ?19
8247 multiply ?21 (add ?22 ?23)
8249 add (multiply ?21 ?22) (multiply ?21 ?23)
8250 [23, 22, 21] by distribute1 ?21 ?22 ?23
8252 multiply (add ?25 ?26) ?27
8254 add (multiply ?25 ?27) (multiply ?26 ?27)
8255 [27, 26, 25] by distribute2 ?25 ?26 ?27
8257 multiply ?29 (multiply ?29 (multiply ?29 ?29)) =>= ?29
8258 [29] by x_fourthed_is_x ?29
8259 Id : 24, {_}: multiply a b =>= c [] by a_times_b_is_c
8261 Id : 2, {_}: multiply b a =>= c [] by prove_commutativity
8262 Last chance: 1246103588.12
8263 Last chance: all is indexed 1246104654.48
8264 Last chance: failed over 100 goal 1246104654.5
8265 FAILURE in 0 iterations
8266 % SZS status Timeout for RNG035-7.p
8273 associativity_of_add is 92
8276 commutativity_of_add is 93
8279 prove_huntingtons_axiom is 94
8282 Id : 4, {_}: add ?2 ?3 =?= add ?3 ?2 [3, 2] by commutativity_of_add ?2 ?3
8284 add (add ?5 ?6) ?7 =?= add ?5 (add ?6 ?7)
8285 [7, 6, 5] by associativity_of_add ?5 ?6 ?7
8287 negate (add (negate (add ?9 ?10)) (negate (add ?9 (negate ?10))))
8290 [10, 9] by robbins_axiom ?9 ?10
8291 Id : 10, {_}: add c d =>= d [] by absorbtion
8294 add (negate (add a (negate b))) (negate (add (negate a) (negate b)))
8297 [] by prove_huntingtons_axiom
8298 Last chance: 1246104961.92
8299 Last chance: all is indexed 1246105219.5
8300 Last chance: failed over 100 goal 1246105219.5
8301 FAILURE in 0 iterations
8302 % SZS status Timeout for ROB006-1.p
8308 associativity_of_add is 95
8310 commutativity_of_add is 96
8313 prove_idempotence is 97
8316 Id : 4, {_}: add ?3 ?4 =?= add ?4 ?3 [4, 3] by commutativity_of_add ?3 ?4
8318 add (add ?6 ?7) ?8 =?= add ?6 (add ?7 ?8)
8319 [8, 7, 6] by associativity_of_add ?6 ?7 ?8
8321 negate (add (negate (add ?10 ?11)) (negate (add ?10 (negate ?11))))
8324 [11, 10] by robbins_axiom ?10 ?11
8325 Id : 10, {_}: add c d =>= d [] by absorbtion
8327 Id : 2, {_}: add ?1 ?1 =>= ?1 [1] by prove_idempotence ?1
8328 Last chance: 1246105523.
8329 Last chance: all is indexed 1246105812.88
8330 Last chance: failed over 100 goal 1246105960.3
8331 FAILURE in 0 iterations
8332 % SZS status Timeout for ROB006-2.p