Metamath Proof Explorer

Theorem ax13b

Description: An equivalence between two ways of expressing ax-13 . See the comment for ax-13 . (Contributed by NM, 2-May-2017) (Proof shortened by Wolf Lammen, 26-Feb-2018) (Revised by BJ, 15-Sep-2020)

		Ref	Expression
	Assertion	ax13b	$⊢ (\neg x = y \to (y = z \to φ)) \leftrightarrow (\neg x = y \to (\neg x = z \to (y = z \to φ)))$

Proof

Step	Hyp	Ref	Expression
1		ax-1	$⊢ (y = z \to φ) \to (\neg x = z \to (y = z \to φ))$
2		equeuclr	$⊢ y = z \to (x = z \to x = y)$
3	2	con3rr3	$⊢ \neg x = y \to (y = z \to \neg x = z)$
4	3	imim1d	$⊢ \neg x = y \to ((\neg x = z \to (y = z \to φ)) \to (y = z \to (y = z \to φ)))$
5		pm2.43	$⊢ (y = z \to (y = z \to φ)) \to (y = z \to φ)$
6	4 5	syl6	$⊢ \neg x = y \to ((\neg x = z \to (y = z \to φ)) \to (y = z \to φ))$
7	1 6	impbid2	$⊢ \neg x = y \to ((y = z \to φ) \leftrightarrow (\neg x = z \to (y = z \to φ)))$
8	7	pm5.74i	$⊢ (\neg x = y \to (y = z \to φ)) \leftrightarrow (\neg x = y \to (\neg x = z \to (y = z \to φ)))$