h1de2i

Description: Membership in 1-dimensional subspace. All members are collinear with the generating vector. (Contributed by NM, 17-Jul-2001) (New usage is discouraged.)

	Ref	Expression
Hypotheses	h1de2.1	$⊢ A \in ℋ$
	h1de2.2	$⊢ B \in ℋ$
Assertion	h1de2i	$⊢ A \in ⊥ (⊥ (\{B\})) \to (B \cdot_{ih} B) \cdot_{ℎ} A = (A \cdot_{ih} B) \cdot_{ℎ} B$

Proof

Step	Hyp	Ref	Expression
1		h1de2.1	$⊢ A \in ℋ$
2		h1de2.2	$⊢ B \in ℋ$
3	2 2	hicli	$⊢ B \cdot_{ih} B \in ℂ$
4	3 1	hvmulcli	$⊢ (B \cdot_{ih} B) \cdot_{ℎ} A \in ℋ$
5	1 2	hicli	$⊢ A \cdot_{ih} B \in ℂ$
6	5 2	hvmulcli	$⊢ (A \cdot_{ih} B) \cdot_{ℎ} B \in ℋ$
7		his2sub	$⊢ ((B \cdot_{ih} B) \cdot_{ℎ} A \in ℋ \land (A \cdot_{ih} B) \cdot_{ℎ} B \in ℋ \land A \in ℋ) \to (((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B)) \cdot_{ih} A = (((B \cdot_{ih} B) \cdot_{ℎ} A) \cdot_{ih} A) - (((A \cdot_{ih} B) \cdot_{ℎ} B) \cdot_{ih} A)$
8	4 6 1 7	mp3an	$⊢ (((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B)) \cdot_{ih} A = (((B \cdot_{ih} B) \cdot_{ℎ} A) \cdot_{ih} A) - (((A \cdot_{ih} B) \cdot_{ℎ} B) \cdot_{ih} A)$
9		ax-his3	$⊢ (B \cdot_{ih} B \in ℂ \land A \in ℋ \land A \in ℋ) \to ((B \cdot_{ih} B) \cdot_{ℎ} A) \cdot_{ih} A = (B \cdot_{ih} B) (A \cdot_{ih} A)$
10	3 1 1 9	mp3an	$⊢ ((B \cdot_{ih} B) \cdot_{ℎ} A) \cdot_{ih} A = (B \cdot_{ih} B) (A \cdot_{ih} A)$
11	1 1	hicli	$⊢ A \cdot_{ih} A \in ℂ$
12	3 11	mulcomi	$⊢ (B \cdot_{ih} B) (A \cdot_{ih} A) = (A \cdot_{ih} A) (B \cdot_{ih} B)$
13	10 12	eqtri	$⊢ ((B \cdot_{ih} B) \cdot_{ℎ} A) \cdot_{ih} A = (A \cdot_{ih} A) (B \cdot_{ih} B)$
14		ax-his3	$⊢ (A \cdot_{ih} B \in ℂ \land B \in ℋ \land A \in ℋ) \to ((A \cdot_{ih} B) \cdot_{ℎ} B) \cdot_{ih} A = (A \cdot_{ih} B) (B \cdot_{ih} A)$
15	5 2 1 14	mp3an	$⊢ ((A \cdot_{ih} B) \cdot_{ℎ} B) \cdot_{ih} A = (A \cdot_{ih} B) (B \cdot_{ih} A)$
16	13 15	oveq12i	$⊢ (((B \cdot_{ih} B) \cdot_{ℎ} A) \cdot_{ih} A) - (((A \cdot_{ih} B) \cdot_{ℎ} B) \cdot_{ih} A) = (A \cdot_{ih} A) (B \cdot_{ih} B) - (A \cdot_{ih} B) (B \cdot_{ih} A)$
17	8 16	eqtr2i	$⊢ (A \cdot_{ih} A) (B \cdot_{ih} B) - (A \cdot_{ih} B) (B \cdot_{ih} A) = (((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B)) \cdot_{ih} A$
18		his2sub	$⊢ ((B \cdot_{ih} B) \cdot_{ℎ} A \in ℋ \land (A \cdot_{ih} B) \cdot_{ℎ} B \in ℋ \land B \in ℋ) \to (((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B)) \cdot_{ih} B = (((B \cdot_{ih} B) \cdot_{ℎ} A) \cdot_{ih} B) - (((A \cdot_{ih} B) \cdot_{ℎ} B) \cdot_{ih} B)$
19	4 6 2 18	mp3an	$⊢ (((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B)) \cdot_{ih} B = (((B \cdot_{ih} B) \cdot_{ℎ} A) \cdot_{ih} B) - (((A \cdot_{ih} B) \cdot_{ℎ} B) \cdot_{ih} B)$
20	3 5	mulcomi	$⊢ (B \cdot_{ih} B) (A \cdot_{ih} B) = (A \cdot_{ih} B) (B \cdot_{ih} B)$
21		ax-his3	$⊢ (B \cdot_{ih} B \in ℂ \land A \in ℋ \land B \in ℋ) \to ((B \cdot_{ih} B) \cdot_{ℎ} A) \cdot_{ih} B = (B \cdot_{ih} B) (A \cdot_{ih} B)$
22	3 1 2 21	mp3an	$⊢ ((B \cdot_{ih} B) \cdot_{ℎ} A) \cdot_{ih} B = (B \cdot_{ih} B) (A \cdot_{ih} B)$
23		ax-his3	$⊢ (A \cdot_{ih} B \in ℂ \land B \in ℋ \land B \in ℋ) \to ((A \cdot_{ih} B) \cdot_{ℎ} B) \cdot_{ih} B = (A \cdot_{ih} B) (B \cdot_{ih} B)$
24	5 2 2 23	mp3an	$⊢ ((A \cdot_{ih} B) \cdot_{ℎ} B) \cdot_{ih} B = (A \cdot_{ih} B) (B \cdot_{ih} B)$
25	20 22 24	3eqtr4i	$⊢ ((B \cdot_{ih} B) \cdot_{ℎ} A) \cdot_{ih} B = ((A \cdot_{ih} B) \cdot_{ℎ} B) \cdot_{ih} B$
26	4 2	hicli	$⊢ ((B \cdot_{ih} B) \cdot_{ℎ} A) \cdot_{ih} B \in ℂ$
27	6 2	hicli	$⊢ ((A \cdot_{ih} B) \cdot_{ℎ} B) \cdot_{ih} B \in ℂ$
28	26 27	subeq0i	$⊢ (((B \cdot_{ih} B) \cdot_{ℎ} A) \cdot_{ih} B) - (((A \cdot_{ih} B) \cdot_{ℎ} B) \cdot_{ih} B) = 0 \leftrightarrow ((B \cdot_{ih} B) \cdot_{ℎ} A) \cdot_{ih} B = ((A \cdot_{ih} B) \cdot_{ℎ} B) \cdot_{ih} B$
29	25 28	mpbir	$⊢ (((B \cdot_{ih} B) \cdot_{ℎ} A) \cdot_{ih} B) - (((A \cdot_{ih} B) \cdot_{ℎ} B) \cdot_{ih} B) = 0$
30	19 29	eqtri	$⊢ (((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B)) \cdot_{ih} B = 0$
31	2	h1dei	$⊢ A \in ⊥ (⊥ (\{B\})) \leftrightarrow (A \in ℋ \land \forall x \in ℋ (B \cdot_{ih} x = 0 \to A \cdot_{ih} x = 0))$
32	1 31	mpbiran	$⊢ A \in ⊥ (⊥ (\{B\})) \leftrightarrow \forall x \in ℋ (B \cdot_{ih} x = 0 \to A \cdot_{ih} x = 0)$
33	4 6	hvsubcli	$⊢ ((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B) \in ℋ$
34		oveq2	$⊢ x = ((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B) \to B \cdot_{ih} x = B \cdot_{ih} (((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B))$
35	34	eqeq1d	$⊢ x = ((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B) \to (B \cdot_{ih} x = 0 \leftrightarrow B \cdot_{ih} (((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B)) = 0)$
36		oveq2	$⊢ x = ((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B) \to A \cdot_{ih} x = A \cdot_{ih} (((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B))$
37	36	eqeq1d	$⊢ x = ((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B) \to (A \cdot_{ih} x = 0 \leftrightarrow A \cdot_{ih} (((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B)) = 0)$
38	35 37	imbi12d	$⊢ x = ((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B) \to ((B \cdot_{ih} x = 0 \to A \cdot_{ih} x = 0) \leftrightarrow (B \cdot_{ih} (((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B)) = 0 \to A \cdot_{ih} (((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B)) = 0))$
39	38	rspcv	$⊢ ((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B) \in ℋ \to (\forall x \in ℋ (B \cdot_{ih} x = 0 \to A \cdot_{ih} x = 0) \to (B \cdot_{ih} (((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B)) = 0 \to A \cdot_{ih} (((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B)) = 0))$
40	33 39	ax-mp	$⊢ \forall x \in ℋ (B \cdot_{ih} x = 0 \to A \cdot_{ih} x = 0) \to (B \cdot_{ih} (((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B)) = 0 \to A \cdot_{ih} (((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B)) = 0)$
41	32 40	sylbi	$⊢ A \in ⊥ (⊥ (\{B\})) \to (B \cdot_{ih} (((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B)) = 0 \to A \cdot_{ih} (((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B)) = 0)$
42		orthcom	$⊢ (((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B) \in ℋ \land B \in ℋ) \to ((((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B)) \cdot_{ih} B = 0 \leftrightarrow B \cdot_{ih} (((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B)) = 0)$
43	33 2 42	mp2an	$⊢ (((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B)) \cdot_{ih} B = 0 \leftrightarrow B \cdot_{ih} (((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B)) = 0$
44		orthcom	$⊢ (((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B) \in ℋ \land A \in ℋ) \to ((((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B)) \cdot_{ih} A = 0 \leftrightarrow A \cdot_{ih} (((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B)) = 0)$
45	33 1 44	mp2an	$⊢ (((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B)) \cdot_{ih} A = 0 \leftrightarrow A \cdot_{ih} (((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B)) = 0$
46	41 43 45	3imtr4g	$⊢ A \in ⊥ (⊥ (\{B\})) \to ((((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B)) \cdot_{ih} B = 0 \to (((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B)) \cdot_{ih} A = 0)$
47	30 46	mpi	$⊢ A \in ⊥ (⊥ (\{B\})) \to (((B \cdot_{ih} B) \cdot_{ℎ} A) -_{ℎ} ((A \cdot_{ih} B) \cdot_{ℎ} B)) \cdot_{ih} A = 0$
48	17 47	syl5eq	$⊢ A \in ⊥ (⊥ (\{B\})) \to (A \cdot_{ih} A) (B \cdot_{ih} B) - (A \cdot_{ih} B) (B \cdot_{ih} A) = 0$
49	11 3	mulcli	$⊢ (A \cdot_{ih} A) (B \cdot_{ih} B) \in ℂ$
50	2 1	hicli	$⊢ B \cdot_{ih} A \in ℂ$
51	5 50	mulcli	$⊢ (A \cdot_{ih} B) (B \cdot_{ih} A) \in ℂ$
52	49 51	subeq0i	$⊢ (A \cdot_{ih} A) (B \cdot_{ih} B) - (A \cdot_{ih} B) (B \cdot_{ih} A) = 0 \leftrightarrow (A \cdot_{ih} A) (B \cdot_{ih} B) = (A \cdot_{ih} B) (B \cdot_{ih} A)$
53	48 52	sylib	$⊢ A \in ⊥ (⊥ (\{B\})) \to (A \cdot_{ih} A) (B \cdot_{ih} B) = (A \cdot_{ih} B) (B \cdot_{ih} A)$
54	53	eqcomd	$⊢ A \in ⊥ (⊥ (\{B\})) \to (A \cdot_{ih} B) (B \cdot_{ih} A) = (A \cdot_{ih} A) (B \cdot_{ih} B)$
55	1 2	bcseqi	$⊢ (A \cdot_{ih} B) (B \cdot_{ih} A) = (A \cdot_{ih} A) (B \cdot_{ih} B) \leftrightarrow (B \cdot_{ih} B) \cdot_{ℎ} A = (A \cdot_{ih} B) \cdot_{ℎ} B$
56	54 55	sylib	$⊢ A \in ⊥ (⊥ (\{B\})) \to (B \cdot_{ih} B) \cdot_{ℎ} A = (A \cdot_{ih} B) \cdot_{ℎ} B$

Metamath Proof Explorer

Theorem h1de2i

Proof