Metamath Proof Explorer

Definition df-add

Description: Define addition over complex numbers. (Contributed by NM, 28-May-1995) (New usage is discouraged.)

Ref Expression
Assertion df-add +=xyz|xywvufx=wvy=ufz=w+𝑹uv+𝑹f

Detailed syntax breakdown

Step Hyp Ref Expression
0 caddc class+
1 vx setvarx
2 vy setvary
3 vz setvarz
4 1 cv setvarx
5 cc class
6 4 5 wcel wffx
7 2 cv setvary
8 7 5 wcel wffy
9 6 8 wa wffxy
10 vw setvarw
11 vv setvarv
12 vu setvaru
13 vf setvarf
14 10 cv setvarw
15 11 cv setvarv
16 14 15 cop classwv
17 4 16 wceq wffx=wv
18 12 cv setvaru
19 13 cv setvarf
20 18 19 cop classuf
21 7 20 wceq wffy=uf
22 17 21 wa wffx=wvy=uf
23 3 cv setvarz
24 cplr class+𝑹
25 14 18 24 co classw+𝑹u
26 15 19 24 co classv+𝑹f
27 25 26 cop classw+𝑹uv+𝑹f
28 23 27 wceq wffz=w+𝑹uv+𝑹f
29 22 28 wa wffx=wvy=ufz=w+𝑹uv+𝑹f
30 29 13 wex wfffx=wvy=ufz=w+𝑹uv+𝑹f
31 30 12 wex wffufx=wvy=ufz=w+𝑹uv+𝑹f
32 31 11 wex wffvufx=wvy=ufz=w+𝑹uv+𝑹f
33 32 10 wex wffwvufx=wvy=ufz=w+𝑹uv+𝑹f
34 9 33 wa wffxywvufx=wvy=ufz=w+𝑹uv+𝑹f
35 34 1 2 3 coprab classxyz|xywvufx=wvy=ufz=w+𝑹uv+𝑹f
36 0 35 wceq wff+=xyz|xywvufx=wvy=ufz=w+𝑹uv+𝑹f