# Proving (p->q)->(~q->~p) using Coq Proof Assistant

I am fairly new to Coq and am trying out sample lemmas from Ruth and Ryan. The proof using natural deduction is pretty trivial, and this is what I want to prove using Coq.

``````assume p -> q.
assume ~q.
assume p.
q.
False.
therefore ~p.
therefore ~q -> ~p.
therefore (p -> q) => ~q => ~p.
``````

I am stuck at the line 3 `assume p`.

Can someone please tell me if there is an one-to-one mapping from natural deduction to Coq keywords?

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You can start your proof like this:

``````Section CONTRA.
Variables P Q : Prop.

Hypothesis PimpQ : P -> Q.
Hypothesis notQ  : ~Q.
Hypothesis Ptrue : P.

Theorem contra : False.
Proof.
``````

Here is the environment at that point:

``````1 subgoal

P : Prop
Q : Prop
PimpQ : P -> Q
notQ : ~ Q
Ptrue : P
============================
False
``````

You should be able to continue the proof. It will be a bit more verbose than your proof (on line 4 you just wrote q, here you will have to prove it by combining `PimpQ` and `Ptrue`. It should be fairly `trivial` though... :)

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Thanks for your post. I figured it out about an hour after I posted the question. The solution is posted below. Ha ha! –  user1791452 Feb 2 '13 at 5:47
Yeah, I didn't want to give you the whole solution since it's easy and that's how you learn. :) –  Ptival Feb 2 '13 at 17:43

Not that difficult, actually.

Just played around, introduced a double negation, and things fell flat automatically. This is how the proof looks like.

``````Theorem T1 : (~q->~p)->(p->q).
Proof.
intros.
apply NNPP.
intro.
apply H in H1.
Qed.
``````

Ta daaaa!

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`NNPP` is useless !
``````Theorem easy : forall p q:Prop, (p->q)->(~q->~p).