Metamath Proof Explorer


Theorem algmulr

Description: The multiplicative operation of a constructed algebra. (Contributed by Stefan O'Rear, 27-Nov-2014) (Revised by Mario Carneiro, 29-Aug-2015)

Ref Expression
Hypothesis algpart.a A = Base ndx B + ndx + ˙ ndx × ˙ Scalar ndx S ndx · ˙
Assertion algmulr × ˙ V × ˙ = A

Proof

Step Hyp Ref Expression
1 algpart.a A = Base ndx B + ndx + ˙ ndx × ˙ Scalar ndx S ndx · ˙
2 1 algstr A Struct 1 6
3 mulrid 𝑟 = Slot ndx
4 snsstp3 ndx × ˙ Base ndx B + ndx + ˙ ndx × ˙
5 ssun1 Base ndx B + ndx + ˙ ndx × ˙ Base ndx B + ndx + ˙ ndx × ˙ Scalar ndx S ndx · ˙
6 5 1 sseqtrri Base ndx B + ndx + ˙ ndx × ˙ A
7 4 6 sstri ndx × ˙ A
8 2 3 7 strfv × ˙ V × ˙ = A