Metamath Proof Explorer

Theorem funcoeqres

Description: Express a constraint on a composition as a constraint on the composand. (Contributed by Stefan O'Rear, 7-Mar-2015)

Ref Expression
Assertion funcoeqres Fun G F G = H F ran G = H G -1

Proof

Step Hyp Ref Expression
1 funcocnv2 Fun G G G -1 = I ran G
2 1 coeq2d Fun G F G G -1 = F I ran G
3 coass F G G -1 = F G G -1
4 3 eqcomi F G G -1 = F G G -1
5 coires1 F I ran G = F ran G
6 2 4 5 3eqtr3g Fun G F G G -1 = F ran G
7 coeq1 F G = H F G G -1 = H G -1
8 6 7 sylan9req Fun G F G = H F ran G = H G -1