Metamath Proof Explorer

Theorem ltmuldivs2wd

Description: Surreal less-than relationship between division and multiplication. Weak version. (Contributed by Scott Fenton, 14-Mar-2025)

Ref Expression
Hypotheses ltdivmulswd.1 φ A No
ltdivmulswd.2 φ B No
ltdivmulswd.3 φ C No
ltdivmulswd.4 φ 0 s < s C
ltdivmulswd.5 φ x No C s x = 1 s
Assertion ltmuldivs2wd φ C s A < s B A < s B / su C

Proof

Step Hyp Ref Expression
1 ltdivmulswd.1 φ A No
2 ltdivmulswd.2 φ B No
3 ltdivmulswd.3 φ C No
4 ltdivmulswd.4 φ 0 s < s C
5 ltdivmulswd.5 φ x No C s x = 1 s
6 1 3 mulscomd φ A s C = C s A
7 6 breq1d φ A s C < s B C s A < s B
8 1 2 3 4 5 ltmuldivswd φ A s C < s B A < s B / su C
9 7 8 bitr3d φ C s A < s B A < s B / su C