elspansn2

Description: Membership in the span of a singleton. All members are collinear with the generating vector. (Contributed by NM, 5-Jun-2004) (New usage is discouraged.)

		Ref	Expression
	Assertion	elspansn2	$⊢ (A \in ℋ \land B \in ℋ \land B \neq 0_{ℎ}) \to (A \in span (\{B\}) \leftrightarrow A = (\frac{A \cdot_{ih} B}{B \cdot_{ih} B}) \cdot_{ℎ} B)$

Proof

Step	Hyp	Ref	Expression
1		spansn	$⊢ B \in ℋ \to span (\{B\}) = ⊥ (⊥ (\{B\}))$
2	1	eleq2d	$⊢ B \in ℋ \to (A \in span (\{B\}) \leftrightarrow A \in ⊥ (⊥ (\{B\})))$
3	2	3ad2ant2	$⊢ (A \in ℋ \land B \in ℋ \land B \neq 0_{ℎ}) \to (A \in span (\{B\}) \leftrightarrow A \in ⊥ (⊥ (\{B\})))$
4		eleq1	$⊢ A = if (A \in ℋ, A, 0_{ℎ}) \to (A \in ⊥ (⊥ (\{B\})) \leftrightarrow if (A \in ℋ, A, 0_{ℎ}) \in ⊥ (⊥ (\{B\})))$
5		id	$⊢ A = if (A \in ℋ, A, 0_{ℎ}) \to A = if (A \in ℋ, A, 0_{ℎ})$
6		oveq1	$⊢ A = if (A \in ℋ, A, 0_{ℎ}) \to A \cdot_{ih} B = if (A \in ℋ, A, 0_{ℎ}) \cdot_{ih} B$
7	6	oveq1d	$⊢ A = if (A \in ℋ, A, 0_{ℎ}) \to \frac{A \cdot_{ih} B}{B \cdot_{ih} B} = \frac{if (A \in ℋ, A, 0_{ℎ}) \cdot_{ih} B}{B \cdot_{ih} B}$
8	7	oveq1d	$⊢ A = if (A \in ℋ, A, 0_{ℎ}) \to (\frac{A \cdot_{ih} B}{B \cdot_{ih} B}) \cdot_{ℎ} B = (\frac{if (A \in ℋ, A, 0_{ℎ}) \cdot_{ih} B}{B \cdot_{ih} B}) \cdot_{ℎ} B$
9	5 8	eqeq12d	$⊢ A = if (A \in ℋ, A, 0_{ℎ}) \to (A = (\frac{A \cdot_{ih} B}{B \cdot_{ih} B}) \cdot_{ℎ} B \leftrightarrow if (A \in ℋ, A, 0_{ℎ}) = (\frac{if (A \in ℋ, A, 0_{ℎ}) \cdot_{ih} B}{B \cdot_{ih} B}) \cdot_{ℎ} B)$
10	4 9	bibi12d	$⊢ A = if (A \in ℋ, A, 0_{ℎ}) \to ((A \in ⊥ (⊥ (\{B\})) \leftrightarrow A = (\frac{A \cdot_{ih} B}{B \cdot_{ih} B}) \cdot_{ℎ} B) \leftrightarrow (if (A \in ℋ, A, 0_{ℎ}) \in ⊥ (⊥ (\{B\})) \leftrightarrow if (A \in ℋ, A, 0_{ℎ}) = (\frac{if (A \in ℋ, A, 0_{ℎ}) \cdot_{ih} B}{B \cdot_{ih} B}) \cdot_{ℎ} B))$
11	10	imbi2d	$⊢ A = if (A \in ℋ, A, 0_{ℎ}) \to ((B \neq 0_{ℎ} \to (A \in ⊥ (⊥ (\{B\})) \leftrightarrow A = (\frac{A \cdot_{ih} B}{B \cdot_{ih} B}) \cdot_{ℎ} B)) \leftrightarrow (B \neq 0_{ℎ} \to (if (A \in ℋ, A, 0_{ℎ}) \in ⊥ (⊥ (\{B\})) \leftrightarrow if (A \in ℋ, A, 0_{ℎ}) = (\frac{if (A \in ℋ, A, 0_{ℎ}) \cdot_{ih} B}{B \cdot_{ih} B}) \cdot_{ℎ} B)))$
12		neeq1	$⊢ B = if (B \in ℋ, B, 0_{ℎ}) \to (B \neq 0_{ℎ} \leftrightarrow if (B \in ℋ, B, 0_{ℎ}) \neq 0_{ℎ})$
13		sneq	$⊢ B = if (B \in ℋ, B, 0_{ℎ}) \to \{B\} = \{if (B \in ℋ, B, 0_{ℎ})\}$
14	13	fveq2d	$⊢ B = if (B \in ℋ, B, 0_{ℎ}) \to ⊥ (\{B\}) = ⊥ (\{if (B \in ℋ, B, 0_{ℎ})\})$
15	14	fveq2d	$⊢ B = if (B \in ℋ, B, 0_{ℎ}) \to ⊥ (⊥ (\{B\})) = ⊥ (⊥ (\{if (B \in ℋ, B, 0_{ℎ})\}))$
16	15	eleq2d	$⊢ B = if (B \in ℋ, B, 0_{ℎ}) \to (if (A \in ℋ, A, 0_{ℎ}) \in ⊥ (⊥ (\{B\})) \leftrightarrow if (A \in ℋ, A, 0_{ℎ}) \in ⊥ (⊥ (\{if (B \in ℋ, B, 0_{ℎ})\})))$
17		oveq2	$⊢ B = if (B \in ℋ, B, 0_{ℎ}) \to if (A \in ℋ, A, 0_{ℎ}) \cdot_{ih} B = if (A \in ℋ, A, 0_{ℎ}) \cdot_{ih} if (B \in ℋ, B, 0_{ℎ})$
18		oveq1	$⊢ B = if (B \in ℋ, B, 0_{ℎ}) \to B \cdot_{ih} B = if (B \in ℋ, B, 0_{ℎ}) \cdot_{ih} B$
19		oveq2	$⊢ B = if (B \in ℋ, B, 0_{ℎ}) \to if (B \in ℋ, B, 0_{ℎ}) \cdot_{ih} B = if (B \in ℋ, B, 0_{ℎ}) \cdot_{ih} if (B \in ℋ, B, 0_{ℎ})$
20	18 19	eqtrd	$⊢ B = if (B \in ℋ, B, 0_{ℎ}) \to B \cdot_{ih} B = if (B \in ℋ, B, 0_{ℎ}) \cdot_{ih} if (B \in ℋ, B, 0_{ℎ})$
21	17 20	oveq12d	$⊢ B = if (B \in ℋ, B, 0_{ℎ}) \to \frac{if (A \in ℋ, A, 0_{ℎ}) \cdot_{ih} B}{B \cdot_{ih} B} = \frac{if (A \in ℋ, A, 0_{ℎ}) \cdot_{ih} if (B \in ℋ, B, 0_{ℎ})}{if (B \in ℋ, B, 0_{ℎ}) \cdot_{ih} if (B \in ℋ, B, 0_{ℎ})}$
22		id	$⊢ B = if (B \in ℋ, B, 0_{ℎ}) \to B = if (B \in ℋ, B, 0_{ℎ})$
23	21 22	oveq12d	$⊢ B = if (B \in ℋ, B, 0_{ℎ}) \to (\frac{if (A \in ℋ, A, 0_{ℎ}) \cdot_{ih} B}{B \cdot_{ih} B}) \cdot_{ℎ} B = (\frac{if (A \in ℋ, A, 0_{ℎ}) \cdot_{ih} if (B \in ℋ, B, 0_{ℎ})}{if (B \in ℋ, B, 0_{ℎ}) \cdot_{ih} if (B \in ℋ, B, 0_{ℎ})}) \cdot_{ℎ} if (B \in ℋ, B, 0_{ℎ})$
24	23	eqeq2d	$⊢ B = if (B \in ℋ, B, 0_{ℎ}) \to (if (A \in ℋ, A, 0_{ℎ}) = (\frac{if (A \in ℋ, A, 0_{ℎ}) \cdot_{ih} B}{B \cdot_{ih} B}) \cdot_{ℎ} B \leftrightarrow if (A \in ℋ, A, 0_{ℎ}) = (\frac{if (A \in ℋ, A, 0_{ℎ}) \cdot_{ih} if (B \in ℋ, B, 0_{ℎ})}{if (B \in ℋ, B, 0_{ℎ}) \cdot_{ih} if (B \in ℋ, B, 0_{ℎ})}) \cdot_{ℎ} if (B \in ℋ, B, 0_{ℎ}))$
25	16 24	bibi12d	$⊢ B = if (B \in ℋ, B, 0_{ℎ}) \to ((if (A \in ℋ, A, 0_{ℎ}) \in ⊥ (⊥ (\{B\})) \leftrightarrow if (A \in ℋ, A, 0_{ℎ}) = (\frac{if (A \in ℋ, A, 0_{ℎ}) \cdot_{ih} B}{B \cdot_{ih} B}) \cdot_{ℎ} B) \leftrightarrow (if (A \in ℋ, A, 0_{ℎ}) \in ⊥ (⊥ (\{if (B \in ℋ, B, 0_{ℎ})\})) \leftrightarrow if (A \in ℋ, A, 0_{ℎ}) = (\frac{if (A \in ℋ, A, 0_{ℎ}) \cdot_{ih} if (B \in ℋ, B, 0_{ℎ})}{if (B \in ℋ, B, 0_{ℎ}) \cdot_{ih} if (B \in ℋ, B, 0_{ℎ})}) \cdot_{ℎ} if (B \in ℋ, B, 0_{ℎ})))$
26	12 25	imbi12d	$⊢ B = if (B \in ℋ, B, 0_{ℎ}) \to ((B \neq 0_{ℎ} \to (if (A \in ℋ, A, 0_{ℎ}) \in ⊥ (⊥ (\{B\})) \leftrightarrow if (A \in ℋ, A, 0_{ℎ}) = (\frac{if (A \in ℋ, A, 0_{ℎ}) \cdot_{ih} B}{B \cdot_{ih} B}) \cdot_{ℎ} B)) \leftrightarrow (if (B \in ℋ, B, 0_{ℎ}) \neq 0_{ℎ} \to (if (A \in ℋ, A, 0_{ℎ}) \in ⊥ (⊥ (\{if (B \in ℋ, B, 0_{ℎ})\})) \leftrightarrow if (A \in ℋ, A, 0_{ℎ}) = (\frac{if (A \in ℋ, A, 0_{ℎ}) \cdot_{ih} if (B \in ℋ, B, 0_{ℎ})}{if (B \in ℋ, B, 0_{ℎ}) \cdot_{ih} if (B \in ℋ, B, 0_{ℎ})}) \cdot_{ℎ} if (B \in ℋ, B, 0_{ℎ}))))$
27		ifhvhv0	$⊢ if (A \in ℋ, A, 0_{ℎ}) \in ℋ$
28		ifhvhv0	$⊢ if (B \in ℋ, B, 0_{ℎ}) \in ℋ$
29	27 28	h1de2bi	$⊢ if (B \in ℋ, B, 0_{ℎ}) \neq 0_{ℎ} \to (if (A \in ℋ, A, 0_{ℎ}) \in ⊥ (⊥ (\{if (B \in ℋ, B, 0_{ℎ})\})) \leftrightarrow if (A \in ℋ, A, 0_{ℎ}) = (\frac{if (A \in ℋ, A, 0_{ℎ}) \cdot_{ih} if (B \in ℋ, B, 0_{ℎ})}{if (B \in ℋ, B, 0_{ℎ}) \cdot_{ih} if (B \in ℋ, B, 0_{ℎ})}) \cdot_{ℎ} if (B \in ℋ, B, 0_{ℎ}))$
30	11 26 29	dedth2h	$⊢ (A \in ℋ \land B \in ℋ) \to (B \neq 0_{ℎ} \to (A \in ⊥ (⊥ (\{B\})) \leftrightarrow A = (\frac{A \cdot_{ih} B}{B \cdot_{ih} B}) \cdot_{ℎ} B))$
31	30	3impia	$⊢ (A \in ℋ \land B \in ℋ \land B \neq 0_{ℎ}) \to (A \in ⊥ (⊥ (\{B\})) \leftrightarrow A = (\frac{A \cdot_{ih} B}{B \cdot_{ih} B}) \cdot_{ℎ} B)$
32	3 31	bitrd	$⊢ (A \in ℋ \land B \in ℋ \land B \neq 0_{ℎ}) \to (A \in span (\{B\}) \leftrightarrow A = (\frac{A \cdot_{ih} B}{B \cdot_{ih} B}) \cdot_{ℎ} B)$

Metamath Proof Explorer

Theorem elspansn2

Proof