Metamath Proof Explorer

Theorem squeeze0

Description: If a nonnegative number is less than any positive number, it is zero. (Contributed by NM, 11-Feb-2006)

Ref Expression
Assertion squeeze0 A 0 A x 0 < x A < x A = 0

Proof

Step Hyp Ref Expression
1 0re 0
2 leloe 0 A 0 A 0 < A 0 = A
3 1 2 mpan A 0 A 0 < A 0 = A
4 breq2 x = A 0 < x 0 < A
5 breq2 x = A A < x A < A
6 4 5 imbi12d x = A 0 < x A < x 0 < A A < A
7 6 rspcv A x 0 < x A < x 0 < A A < A
8 ltnr A ¬ A < A
9 8 pm2.21d A A < A A = 0
10 9 com12 A < A A A = 0
11 10 imim2i 0 < A A < A 0 < A A A = 0
12 11 com13 A 0 < A 0 < A A < A A = 0
13 7 12 syl5d A 0 < A x 0 < x A < x A = 0
14 ax-1 A = 0 x 0 < x A < x A = 0
15 14 eqcoms 0 = A x 0 < x A < x A = 0
16 15 a1i A 0 = A x 0 < x A < x A = 0
17 13 16 jaod A 0 < A 0 = A x 0 < x A < x A = 0
18 3 17 sylbid A 0 A x 0 < x A < x A = 0
19 18 3imp A 0 A x 0 < x A < x A = 0