Metamath Proof Explorer

Theorem his2sub2

Description: Distributive law for inner product of vector subtraction. (Contributed by NM, 13-Feb-2006) (New usage is discouraged.)

		Ref	Expression
	Assertion	his2sub2	\|- ( ( A e. ~H /\ B e. ~H /\ C e. ~H ) -> ( A .ih ( B -h C ) ) = ( ( A .ih B ) - ( A .ih C ) ) )

Proof

Step	Hyp	Ref	Expression
1		his2sub	\|- ( ( B e. ~H /\ C e. ~H /\ A e. ~H ) -> ( ( B -h C ) .ih A ) = ( ( B .ih A ) - ( C .ih A ) ) )
2	1	fveq2d	\|- ( ( B e. ~H /\ C e. ~H /\ A e. ~H ) -> ( * ` ( ( B -h C ) .ih A ) ) = ( * ` ( ( B .ih A ) - ( C .ih A ) ) ) )
3		hicl	\|- ( ( B e. ~H /\ A e. ~H ) -> ( B .ih A ) e. CC )
4		hicl	\|- ( ( C e. ~H /\ A e. ~H ) -> ( C .ih A ) e. CC )
5		cjsub	\|- ( ( ( B .ih A ) e. CC /\ ( C .ih A ) e. CC ) -> ( * ` ( ( B .ih A ) - ( C .ih A ) ) ) = ( ( * ` ( B .ih A ) ) - ( * ` ( C .ih A ) ) ) )
6	3 4 5	syl2an	\|- ( ( ( B e. ~H /\ A e. ~H ) /\ ( C e. ~H /\ A e. ~H ) ) -> ( * ` ( ( B .ih A ) - ( C .ih A ) ) ) = ( ( * ` ( B .ih A ) ) - ( * ` ( C .ih A ) ) ) )
7	6	3impdir	\|- ( ( B e. ~H /\ C e. ~H /\ A e. ~H ) -> ( * ` ( ( B .ih A ) - ( C .ih A ) ) ) = ( ( * ` ( B .ih A ) ) - ( * ` ( C .ih A ) ) ) )
8	2 7	eqtrd	\|- ( ( B e. ~H /\ C e. ~H /\ A e. ~H ) -> ( * ` ( ( B -h C ) .ih A ) ) = ( ( * ` ( B .ih A ) ) - ( * ` ( C .ih A ) ) ) )
9	8	3comr	\|- ( ( A e. ~H /\ B e. ~H /\ C e. ~H ) -> ( * ` ( ( B -h C ) .ih A ) ) = ( ( * ` ( B .ih A ) ) - ( * ` ( C .ih A ) ) ) )
10		hvsubcl	\|- ( ( B e. ~H /\ C e. ~H ) -> ( B -h C ) e. ~H )
11		ax-his1	\|- ( ( A e. ~H /\ ( B -h C ) e. ~H ) -> ( A .ih ( B -h C ) ) = ( * ` ( ( B -h C ) .ih A ) ) )
12	10 11	sylan2	\|- ( ( A e. ~H /\ ( B e. ~H /\ C e. ~H ) ) -> ( A .ih ( B -h C ) ) = ( * ` ( ( B -h C ) .ih A ) ) )
13	12	3impb	\|- ( ( A e. ~H /\ B e. ~H /\ C e. ~H ) -> ( A .ih ( B -h C ) ) = ( * ` ( ( B -h C ) .ih A ) ) )
14		ax-his1	\|- ( ( A e. ~H /\ B e. ~H ) -> ( A .ih B ) = ( * ` ( B .ih A ) ) )
15	14	3adant3	\|- ( ( A e. ~H /\ B e. ~H /\ C e. ~H ) -> ( A .ih B ) = ( * ` ( B .ih A ) ) )
16		ax-his1	\|- ( ( A e. ~H /\ C e. ~H ) -> ( A .ih C ) = ( * ` ( C .ih A ) ) )
17	16	3adant2	\|- ( ( A e. ~H /\ B e. ~H /\ C e. ~H ) -> ( A .ih C ) = ( * ` ( C .ih A ) ) )
18	15 17	oveq12d	\|- ( ( A e. ~H /\ B e. ~H /\ C e. ~H ) -> ( ( A .ih B ) - ( A .ih C ) ) = ( ( * ` ( B .ih A ) ) - ( * ` ( C .ih A ) ) ) )
19	9 13 18	3eqtr4d	\|- ( ( A e. ~H /\ B e. ~H /\ C e. ~H ) -> ( A .ih ( B -h C ) ) = ( ( A .ih B ) - ( A .ih C ) ) )