Metamath Proof Explorer

Theorem logltb

Description: The natural logarithm function on positive reals is strictly monotonic. (Contributed by Steve Rodriguez, 25-Nov-2007)

		Ref	Expression
	Assertion	logltb	$⊢ (A \in ℝ^{+} \land B \in ℝ^{+}) \to (A < B \leftrightarrow \log A < \log B)$

Proof

Step	Hyp	Ref	Expression
1		relogiso	$⊢ ({log ↾}_{ℝ^{+}}) {Isom}_{<, <} (ℝ^{+}, ℝ)$
2		df-isom	$⊢ ({log ↾}_{ℝ^{+}}) {Isom}_{<, <} (ℝ^{+}, ℝ) \leftrightarrow (({log ↾}_{ℝ^{+}}) : ℝ^{+} \underset{1-1 onto}{⟶} ℝ \land \forall x \in ℝ^{+} \forall y \in ℝ^{+} (x < y \leftrightarrow ({log ↾}_{ℝ^{+}}) (x) < ({log ↾}_{ℝ^{+}}) (y)))$
3	1 2	mpbi	$⊢ (({log ↾}_{ℝ^{+}}) : ℝ^{+} \underset{1-1 onto}{⟶} ℝ \land \forall x \in ℝ^{+} \forall y \in ℝ^{+} (x < y \leftrightarrow ({log ↾}_{ℝ^{+}}) (x) < ({log ↾}_{ℝ^{+}}) (y)))$
4	3	simpri	$⊢ \forall x \in ℝ^{+} \forall y \in ℝ^{+} (x < y \leftrightarrow ({log ↾}_{ℝ^{+}}) (x) < ({log ↾}_{ℝ^{+}}) (y))$
5		breq1	$⊢ x = A \to (x < y \leftrightarrow A < y)$
6		fveq2	$⊢ x = A \to ({log ↾}_{ℝ^{+}}) (x) = ({log ↾}_{ℝ^{+}}) (A)$
7	6	breq1d	$⊢ x = A \to (({log ↾}_{ℝ^{+}}) (x) < ({log ↾}_{ℝ^{+}}) (y) \leftrightarrow ({log ↾}_{ℝ^{+}}) (A) < ({log ↾}_{ℝ^{+}}) (y))$
8	5 7	bibi12d	$⊢ x = A \to ((x < y \leftrightarrow ({log ↾}_{ℝ^{+}}) (x) < ({log ↾}_{ℝ^{+}}) (y)) \leftrightarrow (A < y \leftrightarrow ({log ↾}_{ℝ^{+}}) (A) < ({log ↾}_{ℝ^{+}}) (y)))$
9		breq2	$⊢ y = B \to (A < y \leftrightarrow A < B)$
10		fveq2	$⊢ y = B \to ({log ↾}_{ℝ^{+}}) (y) = ({log ↾}_{ℝ^{+}}) (B)$
11	10	breq2d	$⊢ y = B \to (({log ↾}_{ℝ^{+}}) (A) < ({log ↾}_{ℝ^{+}}) (y) \leftrightarrow ({log ↾}_{ℝ^{+}}) (A) < ({log ↾}_{ℝ^{+}}) (B))$
12	9 11	bibi12d	$⊢ y = B \to ((A < y \leftrightarrow ({log ↾}_{ℝ^{+}}) (A) < ({log ↾}_{ℝ^{+}}) (y)) \leftrightarrow (A < B \leftrightarrow ({log ↾}_{ℝ^{+}}) (A) < ({log ↾}_{ℝ^{+}}) (B)))$
13	8 12	rspc2v	$⊢ (A \in ℝ^{+} \land B \in ℝ^{+}) \to (\forall x \in ℝ^{+} \forall y \in ℝ^{+} (x < y \leftrightarrow ({log ↾}_{ℝ^{+}}) (x) < ({log ↾}_{ℝ^{+}}) (y)) \to (A < B \leftrightarrow ({log ↾}_{ℝ^{+}}) (A) < ({log ↾}_{ℝ^{+}}) (B)))$
14	4 13	mpi	$⊢ (A \in ℝ^{+} \land B \in ℝ^{+}) \to (A < B \leftrightarrow ({log ↾}_{ℝ^{+}}) (A) < ({log ↾}_{ℝ^{+}}) (B))$
15		fvres	$⊢ A \in ℝ^{+} \to ({log ↾}_{ℝ^{+}}) (A) = \log A$
16		fvres	$⊢ B \in ℝ^{+} \to ({log ↾}_{ℝ^{+}}) (B) = \log B$
17	15 16	breqan12d	$⊢ (A \in ℝ^{+} \land B \in ℝ^{+}) \to (({log ↾}_{ℝ^{+}}) (A) < ({log ↾}_{ℝ^{+}}) (B) \leftrightarrow \log A < \log B)$
18	14 17	bitrd	$⊢ (A \in ℝ^{+} \land B \in ℝ^{+}) \to (A < B \leftrightarrow \log A < \log B)$