ip2eqi

Description: Two vectors are equal iff their inner products with all other vectors are equal. (Contributed by NM, 24-Jan-2008) (New usage is discouraged.)

	Ref	Expression
Hypotheses	ip2eqi.1	$⊢ X = BaseSet (U)$
	ip2eqi.7	$⊢ P = \cdot_{𝑖OLD} (U)$
	ip2eqi.u	$⊢ U \in {CPreHil}_{OLD}$
Assertion	ip2eqi	$⊢ (A \in X \land B \in X) \to (\forall x \in X x P A = x P B \leftrightarrow A = B)$

Proof

Step	Hyp	Ref	Expression
1		ip2eqi.1	$⊢ X = BaseSet (U)$
2		ip2eqi.7	$⊢ P = \cdot_{𝑖OLD} (U)$
3		ip2eqi.u	$⊢ U \in {CPreHil}_{OLD}$
4	3	phnvi	$⊢ U \in NrmCVec$
5		eqid	$⊢ -_{v} (U) = -_{v} (U)$
6	1 5	nvmcl	$⊢ (U \in NrmCVec \land A \in X \land B \in X) \to A -_{v} (U) B \in X$
7	4 6	mp3an1	$⊢ (A \in X \land B \in X) \to A -_{v} (U) B \in X$
8		oveq1	$⊢ x = A -_{v} (U) B \to x P A = (A -_{v} (U) B) P A$
9		oveq1	$⊢ x = A -_{v} (U) B \to x P B = (A -_{v} (U) B) P B$
10	8 9	eqeq12d	$⊢ x = A -_{v} (U) B \to (x P A = x P B \leftrightarrow (A -_{v} (U) B) P A = (A -_{v} (U) B) P B)$
11	10	rspcv	$⊢ A -_{v} (U) B \in X \to (\forall x \in X x P A = x P B \to (A -_{v} (U) B) P A = (A -_{v} (U) B) P B)$
12	7 11	syl	$⊢ (A \in X \land B \in X) \to (\forall x \in X x P A = x P B \to (A -_{v} (U) B) P A = (A -_{v} (U) B) P B)$
13		simpl	$⊢ (A \in X \land B \in X) \to A \in X$
14		simpr	$⊢ (A \in X \land B \in X) \to B \in X$
15	1 5 2	dipsubdi	$⊢ (U \in {CPreHil}_{OLD} \land (A -_{v} (U) B \in X \land A \in X \land B \in X)) \to (A -_{v} (U) B) P (A -_{v} (U) B) = ((A -_{v} (U) B) P A) - ((A -_{v} (U) B) P B)$
16	3 15	mpan	$⊢ (A -_{v} (U) B \in X \land A \in X \land B \in X) \to (A -_{v} (U) B) P (A -_{v} (U) B) = ((A -_{v} (U) B) P A) - ((A -_{v} (U) B) P B)$
17	7 13 14 16	syl3anc	$⊢ (A \in X \land B \in X) \to (A -_{v} (U) B) P (A -_{v} (U) B) = ((A -_{v} (U) B) P A) - ((A -_{v} (U) B) P B)$
18	17	eqeq1d	$⊢ (A \in X \land B \in X) \to ((A -_{v} (U) B) P (A -_{v} (U) B) = 0 \leftrightarrow ((A -_{v} (U) B) P A) - ((A -_{v} (U) B) P B) = 0)$
19		eqid	$⊢ 0_{vec} (U) = 0_{vec} (U)$
20	1 19 2	ipz	$⊢ (U \in NrmCVec \land A -_{v} (U) B \in X) \to ((A -_{v} (U) B) P (A -_{v} (U) B) = 0 \leftrightarrow A -_{v} (U) B = 0_{vec} (U))$
21	4 20	mpan	$⊢ A -_{v} (U) B \in X \to ((A -_{v} (U) B) P (A -_{v} (U) B) = 0 \leftrightarrow A -_{v} (U) B = 0_{vec} (U))$
22	7 21	syl	$⊢ (A \in X \land B \in X) \to ((A -_{v} (U) B) P (A -_{v} (U) B) = 0 \leftrightarrow A -_{v} (U) B = 0_{vec} (U))$
23	18 22	bitr3d	$⊢ (A \in X \land B \in X) \to (((A -_{v} (U) B) P A) - ((A -_{v} (U) B) P B) = 0 \leftrightarrow A -_{v} (U) B = 0_{vec} (U))$
24	1 2	dipcl	$⊢ (U \in NrmCVec \land A -_{v} (U) B \in X \land A \in X) \to (A -_{v} (U) B) P A \in ℂ$
25	4 24	mp3an1	$⊢ (A -_{v} (U) B \in X \land A \in X) \to (A -_{v} (U) B) P A \in ℂ$
26	7 13 25	syl2anc	$⊢ (A \in X \land B \in X) \to (A -_{v} (U) B) P A \in ℂ$
27	1 2	dipcl	$⊢ (U \in NrmCVec \land A -_{v} (U) B \in X \land B \in X) \to (A -_{v} (U) B) P B \in ℂ$
28	4 27	mp3an1	$⊢ (A -_{v} (U) B \in X \land B \in X) \to (A -_{v} (U) B) P B \in ℂ$
29	7 28	sylancom	$⊢ (A \in X \land B \in X) \to (A -_{v} (U) B) P B \in ℂ$
30	26 29	subeq0ad	$⊢ (A \in X \land B \in X) \to (((A -_{v} (U) B) P A) - ((A -_{v} (U) B) P B) = 0 \leftrightarrow (A -_{v} (U) B) P A = (A -_{v} (U) B) P B)$
31	1 5 19	nvmeq0	$⊢ (U \in NrmCVec \land A \in X \land B \in X) \to (A -_{v} (U) B = 0_{vec} (U) \leftrightarrow A = B)$
32	4 31	mp3an1	$⊢ (A \in X \land B \in X) \to (A -_{v} (U) B = 0_{vec} (U) \leftrightarrow A = B)$
33	23 30 32	3bitr3d	$⊢ (A \in X \land B \in X) \to ((A -_{v} (U) B) P A = (A -_{v} (U) B) P B \leftrightarrow A = B)$
34	12 33	sylibd	$⊢ (A \in X \land B \in X) \to (\forall x \in X x P A = x P B \to A = B)$
35		oveq2	$⊢ A = B \to x P A = x P B$
36	35	ralrimivw	$⊢ A = B \to \forall x \in X x P A = x P B$
37	34 36	impbid1	$⊢ (A \in X \land B \in X) \to (\forall x \in X x P A = x P B \leftrightarrow A = B)$

Metamath Proof Explorer

Theorem ip2eqi

Proof