I think by this point I've read most if not all of the 81 questions tagged coq. Being very new to coq, I was unable to find an answer to this very simple question (which I'm fairly certain has not been asked on SO because of how basic it is).

I am working on a homework assignment, for which I need to use coq to prove:

- Given: P/Q. ~Q
- Prove: P

This is a simple enough proof for me to do on paper, but I can't seem to get coq to do this for me.

My strategy is to assume each of `P`

and `Q`

, to show `P`

and therefore conclude that `P`

must hold:

- P / Q [Premise]
~Q [Premise]

- P [Assumption]
P [Copy Previous Line]

Q [Assumption]

- ~Q [Copy Previous Line]
- [Contradiction]
- P [Contradiction Elimination]

- P [Elimination of
`\/`

]

Given that this is how I would prove it on paper, I was able to come up with the following coq code to prove it in coq. Sadly my effort to assume `P`

, `Q`

, or `~P`

don't come through:

```
Section Q5.
Variables P Q : Prop.
Hypothesis premise1 : P \/ Q.
Hypothesis premise2 : ~Q.
Goal P.
```

Here are my attempts for the next line, along with the errors they produce:

```
+-----------------+---------------------------------------------------------------------+
| Code | Error |
+-----------------+---------------------------------------------------------------------+
| assumption. | Error: No such assumption. |
| exact P. | The term "P" has type "Prop" while it is expected to have type "P". |
| apply premise1. | Error: Impossible to unify "P \/ Q" with "P". |
| apply P. | Error: Impossible to unify "Prop" with "P". |
+-----------------+---------------------------------------------------------------------+
```

I'd appreciate any help with this since I've exhausted everything that I can think of at this point.