lean2/tests/lean/run/rewrite10.lean

import data.nat
open nat

section
  variables (a b c d e : nat)

  theorem T (H1 : a = b) (H2 : b = c + 1) (H3 : c = d) (H4 : e = 1 + d) : a = e :=
  by rewrite [H1, H2, H3, add.comm, -H4]
end

example (x y : ℕ) : (x + y) * (x + y) = x * x + y * x + x * y + y * y :=
by rewrite [*mul.left_distrib, *mul.right_distrib, -add.assoc]

definition even (a : nat) := ∃b, a = 2*b

theorem even_plus_even {a b : nat} (H1 : even a) (H2 : even b) : even (a + b) :=
exists.elim H1 (fun (w1 : nat) (Hw1 : a = 2*w1),
exists.elim H2 (fun (w2 : nat) (Hw2 : b = 2*w2),
  exists.intro (w1 + w2)
    begin
      rewrite [Hw1, Hw2, mul.left_distrib]
    end))

theorem T2 (a b c : nat) (H1 : a = b) (H2 : b = c + 1) : a ≠ 0 :=
calc
  a     = succ c : by rewrite [H1, H2, add_one]
    ... ≠ 0      : succ_ne_zero c
-												test(tests/lean/run): add more rewrite tactic tests

											
										
										
											2015-02-05 22:09:07 +00:00
+								import data.nat
 								open nat
 								section
 								  variables (a b c d e : nat)
 								  theorem T (H1 : a = b) (H2 : b = c + 1) (H3 : c = d) (H4 : e = 1 + d) : a = e :=
-												feat(frontends/lean): uniform notation for lists in tactics

closes #504

											
										
										
											2015-03-28 00:26:06 +00:00
+								  by rewrite [H1, H2, H3, add.comm, -H4]
-												test(tests/lean/run): add more rewrite tactic tests

											
										
										
											2015-02-05 22:09:07 +00:00
+								end
 								example (x y : ℕ) : (x + y) * (x + y) = x * x + y * x + x * y + y * y :=
-												feat(frontends/lean): uniform notation for lists in tactics

closes #504

											
										
										
											2015-03-28 00:26:06 +00:00
+								by rewrite [*mul.left_distrib, *mul.right_distrib, -add.assoc]
-												test(tests/lean/run): add more rewrite tactic tests

											
										
										
											2015-02-05 22:09:07 +00:00
 								definition even (a : nat) := ∃b, a = 2*b
 								theorem even_plus_even {a b : nat} (H1 : even a) (H2 : even b) : even (a + b) :=
 								exists.elim H1 (fun (w1 : nat) (Hw1 : a = 2*w1),
 								exists.elim H2 (fun (w2 : nat) (Hw2 : b = 2*w2),
 								  exists.intro (w1 + w2)
 								    begin
-												feat(frontends/lean): uniform notation for lists in tactics

closes #504

											
										
										
											2015-03-28 00:26:06 +00:00
+								      rewrite [Hw1, Hw2, mul.left_distrib]
-												test(tests/lean/run): add more rewrite tactic tests

											
										
										
											2015-02-05 22:09:07 +00:00
+								    end))
 								theorem T2 (a b c : nat) (H1 : a = b) (H2 : b = c + 1) : a ≠ 0 :=
 								calc
-												feat(frontends/lean): uniform notation for lists in tactics

closes #504

											
										
										
											2015-03-28 00:26:06 +00:00
+								  a     = succ c : by rewrite [H1, H2, add_one]
-												test(tests/lean/run): add more rewrite tactic tests

											
										
										
											2015-02-05 22:09:07 +00:00
+								    ... ≠ 0      : succ_ne_zero c