I would like to prove the following theorem Goal (forall x, P x \/ Q x) -> (forall x, P x) \/ (forall x, Q x). with context 1 subgoal P : nat -> Prop Q : nat -> Prop R : nat -> nat ...
I'm trying to prove the following in Coq: Goal (forall x:X, P(x) /\ Q(x)) -> ((forall x:X, P (x)) /\ (forall x:X, Q (x))). Can someone please help? I'm not sure whether to split, make an assumption ...
I'm trying out Coq, but I'm not completely sure what I'm doing. Is: Theorem new_theorem : forall x, P:Prop /\ Q:Prop Equivalent to: Ax ( P(x) and Q(x) ) (where A is supposed to be the universal ...