Metamath Proof Explorer


Theorem bj-vn0ALT

Description: Alternate proof of vn0 which does not use eqabbw (and is shorter than vn0 when eqabbw is inlined). (Contributed by BJ, 12-Jul-2026) Using the same dummy variable for y and z slightly reduces the proof size. (Proof modification is discouraged.) (New usage is discouraged.)

Ref Expression
Assertion bj-vn0ALT V

Proof

Step Hyp Ref Expression
1 fal ¬
2 dfv2 V = y |
3 dfnul4 = z |
4 2 3 eqeq12i V = y | = z |
5 dfcleq y | = z | x x y | x z |
6 df-clab x y | x y
7 sbv x y
8 6 7 bitri x y |
9 df-clab x z | x z
10 sbv x z
11 9 10 bitri x z |
12 8 11 bibi12i x y | x z |
13 trubifal
14 12 13 sylbb x y | x z |
15 14 spsv x x y | x z |
16 5 15 sylbi y | = z |
17 4 16 sylbi V =
18 1 17 mto ¬ V =
19 18 neir V