Metamath Proof Explorer

Theorem xrnepnf

Description: An extended real other than plus infinity is real or negative infinite. (Contributed by Mario Carneiro, 20-Aug-2015)

Ref Expression
Assertion xrnepnf A * A +∞ A A = −∞

Proof

Step Hyp Ref Expression
1 pm5.61 A A = −∞ A = +∞ ¬ A = +∞ A A = −∞ ¬ A = +∞
2 elxr A * A A = +∞ A = −∞
3 df-3or A A = +∞ A = −∞ A A = +∞ A = −∞
4 or32 A A = +∞ A = −∞ A A = −∞ A = +∞
5 2 3 4 3bitri A * A A = −∞ A = +∞
6 df-ne A +∞ ¬ A = +∞
7 5 6 anbi12i A * A +∞ A A = −∞ A = +∞ ¬ A = +∞
8 renepnf A A +∞
9 mnfnepnf −∞ +∞
10 neeq1 A = −∞ A +∞ −∞ +∞
11 9 10 mpbiri A = −∞ A +∞
12 8 11 jaoi A A = −∞ A +∞
13 12 neneqd A A = −∞ ¬ A = +∞
14 13 pm4.71i A A = −∞ A A = −∞ ¬ A = +∞
15 1 7 14 3bitr4i A * A +∞ A A = −∞