2014-11-26 22:23:42 +00:00
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import logic
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theorem tst {a b c : Prop} : a → b → c → a ∧ b :=
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begin
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2015-03-28 00:26:06 +00:00
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intros [Ha, Hb, Hc],
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2014-11-26 22:23:42 +00:00
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revert Ha,
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intro Ha2,
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apply (and.intro Ha2 Hb),
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end
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theorem foo1 {A : Type} (a b c : A) (P : A → Prop) : P a → a = b → P b :=
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begin
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2015-03-28 00:26:06 +00:00
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intros [Hp, Heq],
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2014-11-26 22:23:42 +00:00
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revert Hp,
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2015-05-01 22:07:28 +00:00
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eapply (eq.rec_on Heq),
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2014-11-26 22:23:42 +00:00
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intro Hpa,
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apply Hpa
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end
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theorem foo2 {A : Type} (a b c : A) (P : A → Prop) : P a → a = b → P b :=
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begin
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2015-03-28 00:26:06 +00:00
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intros [Hp, Heq],
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2014-11-26 22:23:42 +00:00
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apply (eq.rec_on Heq Hp)
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end
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2015-05-09 03:54:16 +00:00
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reveal foo1 foo2
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2015-05-09 01:41:33 +00:00
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2014-11-26 22:23:42 +00:00
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print definition foo1
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print definition foo2
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