I'm trying to prove the following lemma:
lemma myLemma6: "(∀x. A(x) ∧ B(x))= ((∀x. A(x)) ∧ (∀x. B(x)))"
I'm trying to start by eliminating the forall quantifiers, so here's what I tried:
lemma myLemma6: "(∀x. A(x) ∧ B(x))= ((∀x. A(x)) ∧ (∀x. B(x)))"
apply(rule iffI)
apply ( erule_tac x="x" in allE)
apply (rule allE)
(*goal now: get rid of conj on both sides and the quantifiers on right*)
apply (erule conjE) (*isn't conjE supposed to be used with elim/erule?*)
apply (rule allI)
apply (assumption)
apply ( rule conjI) (*at this point, the following starts to make no sense... *)
apply (rule conjE) (*should be erule?*)
apply ( rule conjI)
apply ( rule conjI)
...
At the end I just started to act depending on the outcome of the previous apply, but it seems wrong to me, probably because there's some mistake in the beginning... Could someone please explain to me my error and how to finish this proof correctly?
Thanks in advance