Metamath Proof Explorer


Theorem vafval

Description: Value of the function for the vector addition (group) operation on a normed complex vector space. (Contributed by NM, 23-Apr-2007) (New usage is discouraged.)

Ref Expression
Hypothesis vafval.2 G = + v U
Assertion vafval G = 1 st 1 st U

Proof

Step Hyp Ref Expression
1 vafval.2 G = + v U
2 df-va + v = 1 st 1 st
3 2 fveq1i + v U = 1 st 1 st U
4 fo1st 1 st : V onto V
5 fof 1 st : V onto V 1 st : V V
6 4 5 ax-mp 1 st : V V
7 fvco3 1 st : V V U V 1 st 1 st U = 1 st 1 st U
8 6 7 mpan U V 1 st 1 st U = 1 st 1 st U
9 3 8 eqtrid U V + v U = 1 st 1 st U
10 fvprc ¬ U V + v U =
11 fvprc ¬ U V 1 st U =
12 11 fveq2d ¬ U V 1 st 1 st U = 1 st
13 1st0 1 st =
14 12 13 eqtr2di ¬ U V = 1 st 1 st U
15 10 14 eqtrd ¬ U V + v U = 1 st 1 st U
16 9 15 pm2.61i + v U = 1 st 1 st U
17 1 16 eqtri G = 1 st 1 st U