Metamath Proof Explorer

Theorem fncofn

Description: Composition of a function with domain and a function as a function with domain. Generalization of fnco . (Contributed by AV, 17-Sep-2024)

Ref Expression
Assertion fncofn F Fn A Fun G F G Fn G -1 A

Proof

Step Hyp Ref Expression
1 fnfun F Fn A Fun F
2 funco Fun F Fun G Fun F G
3 1 2 sylan F Fn A Fun G Fun F G
4 3 funfnd F Fn A Fun G F G Fn dom F G
5 fndm F Fn A dom F = A
6 5 adantr F Fn A Fun G dom F = A
7 6 eqcomd F Fn A Fun G A = dom F
8 7 imaeq2d F Fn A Fun G G -1 A = G -1 dom F
9 dmco dom F G = G -1 dom F
10 8 9 eqtr4di F Fn A Fun G G -1 A = dom F G
11 10 fneq2d F Fn A Fun G F G Fn G -1 A F G Fn dom F G
12 4 11 mpbird F Fn A Fun G F G Fn G -1 A