FDL - Step of Proof: eq_int_eq_false_elim

Step of Proof: eq_int_eq_false_elim_sqequal

12,41

Inference at * 1 1 1
Iof proof for Lemma eq int eq false elim sqequal:

1. i :

2. j :

3. (i =

j) ~ ff
4. (i =

j) = ff

by InteriorProof ((RW bool_to_propC (-1))

CollapseTHEN ((Auto_aux (first_nat 1:n) ((first_nat

CollapseTHEN ((Aut1:n),(first_nat 3:n)) (first_tok :t) inil_term)))

Definitions a b T , , t T, P & Q, P Q, P Q, x:A. B(x)

Lemmas assert of eq int, not functionality wrt iff, assert of bnot, eqff to assert, iff transitivity, not wf, bnot wf, assert wf, bool wf

Definitions	a b T , , t T, P & Q, P Q, P Q, x:A. B(x)
Lemmas	assert of eq int, not functionality wrt iff, assert of bnot, eqff to assert, iff transitivity, not wf, bnot wf, assert wf, bool wf