theorem divides_times_to_divides: \forall n,p,q:nat.prime n \to n \divides p*q \to
n \divides p \lor n \divides q.
intros.
-cut (n \divides p \lor n \ndivides p).
-elim Hcut.
-left.assumption.
-right.
-cut (\exists a,b. a*n - b*p = (S O) \lor b*p - a*n = (S O)).
-elim Hcut1.elim H3.elim H4.
-(* first case *)
-rewrite > (times_n_SO q).rewrite < H5.
-rewrite > distr_times_minus.
-rewrite > (sym_times q (a1*p)).
-rewrite > (assoc_times a1).
-elim H1.rewrite > H6.
-rewrite < (sym_times n).rewrite < assoc_times.
-rewrite > (sym_times q).rewrite > assoc_times.
-rewrite < (assoc_times a1).rewrite < (sym_times n).
-rewrite > (assoc_times n).
-rewrite < distr_times_minus.
-apply (witness ? ? (q*a-a1*n2)).reflexivity.
-(* second case *)
-rewrite > (times_n_SO q).rewrite < H5.
-rewrite > distr_times_minus.
-rewrite > (sym_times q (a1*p)).
-rewrite > (assoc_times a1).
-elim H1.rewrite > H6.
-rewrite < sym_times.rewrite > assoc_times.
-rewrite < (assoc_times q).
-rewrite < (sym_times n).
-rewrite < distr_times_minus.
-apply (witness ? ? (n2*a1-q*a)).reflexivity.
-(* end second case *)
-rewrite < (prime_to_gcd_SO n p).
-apply eq_minus_gcd.
-assumption.assumption.
-apply (decidable_divides n p).
-apply (trans_lt ? (S O)).unfold lt.apply le_n.
-unfold prime in H.elim H. assumption.
+cut (n \divides p \lor n \ndivides p)
+ [elim Hcut
+ [left.assumption
+ |right.
+ cut (\exists a,b. a*n - b*p = (S O) \lor b*p - a*n = (S O))
+ [elim Hcut1.elim H3.elim H4
+ [(* first case *)
+ rewrite > (times_n_SO q).rewrite < H5.
+ rewrite > distr_times_minus.
+ rewrite > (sym_times q (a1*p)).
+ rewrite > (assoc_times a1).
+ elim H1.rewrite > H6.
+ (* applyS (witness n (n*(q*a-a1*n2)) (q*a-a1*n2))
+ reflexivity. *);
+ applyS (witness n ? ? (refl_eq ? ?)).
+ (*
+ rewrite < (sym_times n).rewrite < assoc_times.
+ rewrite > (sym_times q).rewrite > assoc_times.
+ rewrite < (assoc_times a1).rewrite < (sym_times n).
+ rewrite > (assoc_times n).
+ rewrite < distr_times_minus.
+ apply (witness ? ? (q*a-a1*n2)).reflexivity
+ *)
+ |(* second case *)
+ rewrite > (times_n_SO q).rewrite < H5.
+ rewrite > distr_times_minus.
+ rewrite > (sym_times q (a1*p)).
+ rewrite > (assoc_times a1).
+ elim H1.rewrite > H6.
+ rewrite < sym_times.rewrite > assoc_times.
+ rewrite < (assoc_times q).
+ rewrite < (sym_times n).
+ rewrite < distr_times_minus.
+ apply (witness ? ? (n2*a1-q*a)).reflexivity
+ ](* end second case *)
+ |rewrite < (prime_to_gcd_SO n p)
+ [apply eq_minus_gcd|assumption|assumption
+ ]
+ ]
+ ]
+ |apply (decidable_divides n p).
+ apply (trans_lt ? (S O))
+ [unfold lt.apply le_n
+ |unfold prime in H.elim H. assumption
+ ]
+ ]
qed.
theorem eq_gcd_times_SO: \forall m,n,p:nat. O < n \to O < p \to
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