Metamath Proof Explorer

Theorem mulcomsr

Description: Multiplication of signed reals is commutative. (Contributed by NM, 31-Aug-1995) (Revised by Mario Carneiro, 28-Apr-2015) (New usage is discouraged.)

		Ref	Expression
	Assertion	mulcomsr	$⊢ A \cdot_{𝑹} B = B \cdot_{𝑹} A$

Proof

Step	Hyp	Ref	Expression
1		df-nr	$⊢ 𝑹 = (𝑷 \times 𝑷) / ~_{𝑹}$
2		mulsrpr	$⊢ ((x \in 𝑷 \land y \in 𝑷) \land (z \in 𝑷 \land w \in 𝑷)) \to [⟨x, y⟩] ~_{𝑹} \cdot_{𝑹} [⟨z, w⟩] ~_{𝑹} = [⟨(x \cdot_{𝑷} z) +_{𝑷} (y \cdot_{𝑷} w), (x \cdot_{𝑷} w) +_{𝑷} (y \cdot_{𝑷} z)⟩] ~_{𝑹}$
3		mulsrpr	$⊢ ((z \in 𝑷 \land w \in 𝑷) \land (x \in 𝑷 \land y \in 𝑷)) \to [⟨z, w⟩] ~_{𝑹} \cdot_{𝑹} [⟨x, y⟩] ~_{𝑹} = [⟨(z \cdot_{𝑷} x) +_{𝑷} (w \cdot_{𝑷} y), (z \cdot_{𝑷} y) +_{𝑷} (w \cdot_{𝑷} x)⟩] ~_{𝑹}$
4		mulcompr	$⊢ x \cdot_{𝑷} z = z \cdot_{𝑷} x$
5		mulcompr	$⊢ y \cdot_{𝑷} w = w \cdot_{𝑷} y$
6	4 5	oveq12i	$⊢ (x \cdot_{𝑷} z) +_{𝑷} (y \cdot_{𝑷} w) = (z \cdot_{𝑷} x) +_{𝑷} (w \cdot_{𝑷} y)$
7		mulcompr	$⊢ x \cdot_{𝑷} w = w \cdot_{𝑷} x$
8		mulcompr	$⊢ y \cdot_{𝑷} z = z \cdot_{𝑷} y$
9	7 8	oveq12i	$⊢ (x \cdot_{𝑷} w) +_{𝑷} (y \cdot_{𝑷} z) = (w \cdot_{𝑷} x) +_{𝑷} (z \cdot_{𝑷} y)$
10		addcompr	$⊢ (w \cdot_{𝑷} x) +_{𝑷} (z \cdot_{𝑷} y) = (z \cdot_{𝑷} y) +_{𝑷} (w \cdot_{𝑷} x)$
11	9 10	eqtri	$⊢ (x \cdot_{𝑷} w) +_{𝑷} (y \cdot_{𝑷} z) = (z \cdot_{𝑷} y) +_{𝑷} (w \cdot_{𝑷} x)$
12	1 2 3 6 11	ecovcom	$⊢ (A \in 𝑹 \land B \in 𝑹) \to A \cdot_{𝑹} B = B \cdot_{𝑹} A$
13		dmmulsr	$⊢ dom \cdot_{𝑹} = 𝑹 \times 𝑹$
14	13	ndmovcom	$⊢ \neg (A \in 𝑹 \land B \in 𝑹) \to A \cdot_{𝑹} B = B \cdot_{𝑹} A$
15	12 14	pm2.61i	$⊢ A \cdot_{𝑹} B = B \cdot_{𝑹} A$