Metamath Proof Explorer


Theorem rcompleq

Description: Two subclasses are equal if and only if their relative complements are equal. Relativized version of compleq . (Contributed by RP, 10-Jun-2021)

Ref Expression
Assertion rcompleq A C B C A = B C A = C B

Proof

Step Hyp Ref Expression
1 ancom A B B A B A A B
2 sscon34b B C A C B A C A C B
3 2 ancoms A C B C B A C A C B
4 sscon34b A C B C A B C B C A
5 3 4 anbi12d A C B C B A A B C A C B C B C A
6 1 5 bitrid A C B C A B B A C A C B C B C A
7 eqss A = B A B B A
8 eqss C A = C B C A C B C B C A
9 6 7 8 3bitr4g A C B C A = B C A = C B