Metamath Proof Explorer


Theorem sbceqalOLD

Description: Obsolete version of sbceqal as of 26-Oct-2024. (Contributed by Andrew Salmon, 28-Jun-2011) (Proof modification is discouraged.) (New usage is discouraged.)

Ref Expression
Assertion sbceqalOLD A V x x = A x = B A = B

Proof

Step Hyp Ref Expression
1 spsbc A V x x = A x = B [˙A / x]˙ x = A x = B
2 sbcimg A V [˙A / x]˙ x = A x = B [˙A / x]˙ x = A [˙A / x]˙ x = B
3 eqid A = A
4 eqsbc3 A V [˙A / x]˙ x = A A = A
5 3 4 mpbiri A V [˙A / x]˙ x = A
6 pm5.5 [˙A / x]˙ x = A [˙A / x]˙ x = A [˙A / x]˙ x = B [˙A / x]˙ x = B
7 5 6 syl A V [˙A / x]˙ x = A [˙A / x]˙ x = B [˙A / x]˙ x = B
8 eqsbc3 A V [˙A / x]˙ x = B A = B
9 2 7 8 3bitrd A V [˙A / x]˙ x = A x = B A = B
10 1 9 sylibd A V x x = A x = B A = B