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7 (* ||T|| The HELM team. *)
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16 cic:/Coq/Init/Logic/eq.ind
17 cic:/Coq/Init/Logic/sym_eq.con
18 cic:/Coq/Init/Logic/trans_eq.con
19 cic:/Coq/Init/Logic/eq_ind.con
20 cic:/Coq/Init/Logic/eq_ind_r.con
21 cic:/Coq/Init/Logic/eq_rec.con
22 cic:/Coq/Init/Logic/eq_rec_r.con
23 cic:/Coq/Init/Logic/eq_rect.con
24 cic:/Coq/Init/Logic/eq_rect_r.con
25 cic:/Coq/Init/Logic/f_equal.con
26 cic:/matita/procedural/Coq/preamble/f_equal1.con.
29 cic:/Coq/Init/Logic/True.ind.
31 cic:/Coq/Init/Logic/False.ind.
33 cic:/Coq/Init/Logic/absurd.con.
35 interpretation "Coq's leibnitz's equality" 'eq x y = (cic:/Coq/Init/Logic/eq.ind#xpointer(1/1) _ x y).
37 theorem f_equal1 : \forall A,B:Type.\forall f:A\to B.\forall x,y:A.
38 x = y \to (f y) = (f x).
41 apply cic:/Coq/Init/Logic/f_equal.con.