Metamath Proof Explorer

Definition df-plr

Description: Define addition on signed reals. This is a "temporary" set used in the construction of complex numbers df-c , and is intended to be used only by the construction. From Proposition 9-4.3 of Gleason p. 126. (Contributed by NM, 25-Aug-1995) (New usage is discouraged.)

Ref Expression
Assertion df-plr + 𝑹 = x y z | x 𝑹 y 𝑹 w v u f x = w v ~ 𝑹 y = u f ~ 𝑹 z = w + 𝑷 u v + 𝑷 f ~ 𝑹

Detailed syntax breakdown

Step Hyp Ref Expression
0 cplr class + 𝑹
1 vx setvar x
2 vy setvar y
3 vz setvar z
4 1 cv setvar x
5 cnr class 𝑹
6 4 5 wcel wff x 𝑹
7 2 cv setvar y
8 7 5 wcel wff y 𝑹
9 6 8 wa wff x 𝑹 y 𝑹
10 vw setvar w
11 vv setvar v
12 vu setvar u
13 vf setvar f
14 10 cv setvar w
15 11 cv setvar v
16 14 15 cop class w v
17 cer class ~ 𝑹
18 16 17 cec class w v ~ 𝑹
19 4 18 wceq wff x = w v ~ 𝑹
20 12 cv setvar u
21 13 cv setvar f
22 20 21 cop class u f
23 22 17 cec class u f ~ 𝑹
24 7 23 wceq wff y = u f ~ 𝑹
25 19 24 wa wff x = w v ~ 𝑹 y = u f ~ 𝑹
26 3 cv setvar z
27 cpp class + 𝑷
28 14 20 27 co class w + 𝑷 u
29 15 21 27 co class v + 𝑷 f
30 28 29 cop class w + 𝑷 u v + 𝑷 f
31 30 17 cec class w + 𝑷 u v + 𝑷 f ~ 𝑹
32 26 31 wceq wff z = w + 𝑷 u v + 𝑷 f ~ 𝑹
33 25 32 wa wff x = w v ~ 𝑹 y = u f ~ 𝑹 z = w + 𝑷 u v + 𝑷 f ~ 𝑹
34 33 13 wex wff f x = w v ~ 𝑹 y = u f ~ 𝑹 z = w + 𝑷 u v + 𝑷 f ~ 𝑹
35 34 12 wex wff u f x = w v ~ 𝑹 y = u f ~ 𝑹 z = w + 𝑷 u v + 𝑷 f ~ 𝑹
36 35 11 wex wff v u f x = w v ~ 𝑹 y = u f ~ 𝑹 z = w + 𝑷 u v + 𝑷 f ~ 𝑹
37 36 10 wex wff w v u f x = w v ~ 𝑹 y = u f ~ 𝑹 z = w + 𝑷 u v + 𝑷 f ~ 𝑹
38 9 37 wa wff x 𝑹 y 𝑹 w v u f x = w v ~ 𝑹 y = u f ~ 𝑹 z = w + 𝑷 u v + 𝑷 f ~ 𝑹
39 38 1 2 3 coprab class x y z | x 𝑹 y 𝑹 w v u f x = w v ~ 𝑹 y = u f ~ 𝑹 z = w + 𝑷 u v + 𝑷 f ~ 𝑹
40 0 39 wceq wff + 𝑹 = x y z | x 𝑹 y 𝑹 w v u f x = w v ~ 𝑹 y = u f ~ 𝑹 z = w + 𝑷 u v + 𝑷 f ~ 𝑹