Metamath Proof Explorer


Theorem elmgplsm

Description: Membership in a product of two subsets of a multiplication group. (Contributed by Thierry Arnoux, 20-Jan-2024)

Ref Expression
Hypotheses elmgplsm.b B = Base R
elmgplsm.t · ˙ = R
elmgplsm.g G = mulGrp R
elmgplsm.m × ˙ = LSSum G
elmgplsm.e φ E B
elmgplsm.f φ F B
Assertion elmgplsm φ Z E × ˙ F x E y F Z = x · ˙ y

Proof

Step Hyp Ref Expression
1 elmgplsm.b B = Base R
2 elmgplsm.t · ˙ = R
3 elmgplsm.g G = mulGrp R
4 elmgplsm.m × ˙ = LSSum G
5 elmgplsm.e φ E B
6 elmgplsm.f φ F B
7 3 fvexi G V
8 3 1 mgpbas B = Base G
9 3 2 mgpplusg · ˙ = + G
10 8 9 4 lsmelvalx G V E B F B Z E × ˙ F x E y F Z = x · ˙ y
11 7 5 6 10 mp3an2i φ Z E × ˙ F x E y F Z = x · ˙ y