normgt0

Description: The norm of nonzero vector is positive. (Contributed by NM, 10-Apr-2006) (New usage is discouraged.)

		Ref	Expression
	Assertion	normgt0	$⊢ A \in ℋ \to (A \neq 0_{ℎ} \leftrightarrow 0 < {norm}_{ℎ} (A))$

Proof

Step	Hyp	Ref	Expression
1		hiidrcl	$⊢ A \in ℋ \to A \cdot_{ih} A \in ℝ$
2	1	adantr	$⊢ (A \in ℋ \land A \neq 0_{ℎ}) \to A \cdot_{ih} A \in ℝ$
3		ax-his4	$⊢ (A \in ℋ \land A \neq 0_{ℎ}) \to 0 < A \cdot_{ih} A$
4		sqrtgt0	$⊢ (A \cdot_{ih} A \in ℝ \land 0 < A \cdot_{ih} A) \to 0 < \sqrt{A \cdot_{ih} A}$
5	2 3 4	syl2anc	$⊢ (A \in ℋ \land A \neq 0_{ℎ}) \to 0 < \sqrt{A \cdot_{ih} A}$
6	5	ex	$⊢ A \in ℋ \to (A \neq 0_{ℎ} \to 0 < \sqrt{A \cdot_{ih} A})$
7		oveq1	$⊢ A = 0_{ℎ} \to A \cdot_{ih} A = 0_{ℎ} \cdot_{ih} A$
8		hi01	$⊢ A \in ℋ \to 0_{ℎ} \cdot_{ih} A = 0$
9	7 8	sylan9eqr	$⊢ (A \in ℋ \land A = 0_{ℎ}) \to A \cdot_{ih} A = 0$
10	9	fveq2d	$⊢ (A \in ℋ \land A = 0_{ℎ}) \to \sqrt{A \cdot_{ih} A} = \sqrt{0}$
11		sqrt0	$⊢ \sqrt{0} = 0$
12	10 11	eqtrdi	$⊢ (A \in ℋ \land A = 0_{ℎ}) \to \sqrt{A \cdot_{ih} A} = 0$
13	12	ex	$⊢ A \in ℋ \to (A = 0_{ℎ} \to \sqrt{A \cdot_{ih} A} = 0)$
14		hiidge0	$⊢ A \in ℋ \to 0 \leq A \cdot_{ih} A$
15	1 14	resqrtcld	$⊢ A \in ℋ \to \sqrt{A \cdot_{ih} A} \in ℝ$
16		0re	$⊢ 0 \in ℝ$
17		lttri3	$⊢ (\sqrt{A \cdot_{ih} A} \in ℝ \land 0 \in ℝ) \to (\sqrt{A \cdot_{ih} A} = 0 \leftrightarrow (\neg \sqrt{A \cdot_{ih} A} < 0 \land \neg 0 < \sqrt{A \cdot_{ih} A}))$
18	15 16 17	sylancl	$⊢ A \in ℋ \to (\sqrt{A \cdot_{ih} A} = 0 \leftrightarrow (\neg \sqrt{A \cdot_{ih} A} < 0 \land \neg 0 < \sqrt{A \cdot_{ih} A}))$
19		simpr	$⊢ (\neg \sqrt{A \cdot_{ih} A} < 0 \land \neg 0 < \sqrt{A \cdot_{ih} A}) \to \neg 0 < \sqrt{A \cdot_{ih} A}$
20	18 19	syl6bi	$⊢ A \in ℋ \to (\sqrt{A \cdot_{ih} A} = 0 \to \neg 0 < \sqrt{A \cdot_{ih} A})$
21	13 20	syld	$⊢ A \in ℋ \to (A = 0_{ℎ} \to \neg 0 < \sqrt{A \cdot_{ih} A})$
22	21	necon2ad	$⊢ A \in ℋ \to (0 < \sqrt{A \cdot_{ih} A} \to A \neq 0_{ℎ})$
23	6 22	impbid	$⊢ A \in ℋ \to (A \neq 0_{ℎ} \leftrightarrow 0 < \sqrt{A \cdot_{ih} A})$
24		normval	$⊢ A \in ℋ \to {norm}_{ℎ} (A) = \sqrt{A \cdot_{ih} A}$
25	24	breq2d	$⊢ A \in ℋ \to (0 < {norm}_{ℎ} (A) \leftrightarrow 0 < \sqrt{A \cdot_{ih} A})$
26	23 25	bitr4d	$⊢ A \in ℋ \to (A \neq 0_{ℎ} \leftrightarrow 0 < {norm}_{ℎ} (A))$

Metamath Proof Explorer

Theorem normgt0

Proof