Metamath Proof Explorer


Theorem axc15

Description: Derivation of set.mm's original ax-c15 from ax-c11n and the shorter ax-12 that has replaced it.

Theorem ax12 shows the reverse derivation of ax-12 from ax-c15 .

Normally, axc15 should be used rather than ax-c15 , except by theorems specifically studying the latter's properties. Usage of this theorem is discouraged because it depends on ax-13 . (Contributed by NM, 2-Feb-2007) (Proof shortened by Wolf Lammen, 26-Mar-2023) (New usage is discouraged.)

Ref Expression
Assertion axc15 ¬ x x = y x = y φ x x = y φ

Proof

Step Hyp Ref Expression
1 ax6ev z z = y
2 dveeq2 ¬ x x = y z = y x z = y
3 ax12v x = z φ x x = z φ
4 equeuclr z = y x = y x = z
5 4 sps x z = y x = y x = z
6 4 imim1d z = y x = z φ x = y φ
7 6 al2imi x z = y x x = z φ x x = y φ
8 7 imim2d x z = y φ x x = z φ φ x x = y φ
9 5 8 imim12d x z = y x = z φ x x = z φ x = y φ x x = y φ
10 2 3 9 syl6mpi ¬ x x = y z = y x = y φ x x = y φ
11 10 exlimdv ¬ x x = y z z = y x = y φ x x = y φ
12 1 11 mpi ¬ x x = y x = y φ x x = y φ