Metamath Proof Explorer

Theorem mulcompr

Description: Multiplication of positive reals is commutative. Proposition 9-3.7(ii) of Gleason p. 124. (Contributed by NM, 19-Nov-1995) (New usage is discouraged.)

		Ref	Expression
	Assertion	mulcompr	$⊢ A \cdot_{𝑷} B = B \cdot_{𝑷} A$

Proof

Step	Hyp	Ref	Expression
1		mpv	$⊢ (A \in 𝑷 \land B \in 𝑷) \to A \cdot_{𝑷} B = \{x \| \exists z \in A \exists y \in B x = z \cdot_{𝑸} y\}$
2		mpv	$⊢ (B \in 𝑷 \land A \in 𝑷) \to B \cdot_{𝑷} A = \{x \| \exists y \in B \exists z \in A x = y \cdot_{𝑸} z\}$
3		mulcomnq	$⊢ y \cdot_{𝑸} z = z \cdot_{𝑸} y$
4	3	eqeq2i	$⊢ x = y \cdot_{𝑸} z \leftrightarrow x = z \cdot_{𝑸} y$
5	4	2rexbii	$⊢ \exists y \in B \exists z \in A x = y \cdot_{𝑸} z \leftrightarrow \exists y \in B \exists z \in A x = z \cdot_{𝑸} y$
6		rexcom	$⊢ \exists y \in B \exists z \in A x = z \cdot_{𝑸} y \leftrightarrow \exists z \in A \exists y \in B x = z \cdot_{𝑸} y$
7	5 6	bitri	$⊢ \exists y \in B \exists z \in A x = y \cdot_{𝑸} z \leftrightarrow \exists z \in A \exists y \in B x = z \cdot_{𝑸} y$
8	7	abbii	$⊢ \{x \| \exists y \in B \exists z \in A x = y \cdot_{𝑸} z\} = \{x \| \exists z \in A \exists y \in B x = z \cdot_{𝑸} y\}$
9	2 8	eqtrdi	$⊢ (B \in 𝑷 \land A \in 𝑷) \to B \cdot_{𝑷} A = \{x \| \exists z \in A \exists y \in B x = z \cdot_{𝑸} y\}$
10	9	ancoms	$⊢ (A \in 𝑷 \land B \in 𝑷) \to B \cdot_{𝑷} A = \{x \| \exists z \in A \exists y \in B x = z \cdot_{𝑸} y\}$
11	1 10	eqtr4d	$⊢ (A \in 𝑷 \land B \in 𝑷) \to A \cdot_{𝑷} B = B \cdot_{𝑷} A$
12		dmmp	$⊢ dom \cdot_{𝑷} = 𝑷 \times 𝑷$
13	12	ndmovcom	$⊢ \neg (A \in 𝑷 \land B \in 𝑷) \to A \cdot_{𝑷} B = B \cdot_{𝑷} A$
14	11 13	pm2.61i	$⊢ A \cdot_{𝑷} B = B \cdot_{𝑷} A$