Metamath Proof Explorer

Definition df-hvsub

Description: Define vector subtraction. See hvsubvali for its value and hvsubcli for its closure. (Contributed by NM, 6-Jun-2008) (New usage is discouraged.)

		Ref	Expression
	Assertion	df-hvsub	\|- -h = ( x e. ~H , y e. ~H \|-> ( x +h ( -u 1 .h y ) ) )

Detailed syntax breakdown

Step	Hyp	Ref	Expression
0		cmv	\|- -h
1		vx	\|- x
2		chba	\|- ~H
3		vy	\|- y
4	1	cv	\|- x
5		cva	\|- +h
6		c1	\|- 1
7	6	cneg	\|- -u 1
8		csm	\|- .h
9	3	cv	\|- y
10	7 9 8	co	\|- ( -u 1 .h y )
11	4 10 5	co	\|- ( x +h ( -u 1 .h y ) )
12	1 3 2 2 11	cmpo	\|- ( x e. ~H , y e. ~H \|-> ( x +h ( -u 1 .h y ) ) )
13	0 12	wceq	\|- -h = ( x e. ~H , y e. ~H \|-> ( x +h ( -u 1 .h y ) ) )