df-mp

Description: Define multiplication on positive reals. This is a "temporary" set used in the construction of complex numbers df-c , and is intended to be used only by the construction. From Proposition 9-3.7 of Gleason p. 124. (Contributed by NM, 18-Nov-1995) (New usage is discouraged.)

		Ref	Expression
	Assertion	df-mp	$⊢ \cdot_{𝑷} = (x \in 𝑷, y \in 𝑷 ⟼ \{w \| \exists v \in x \exists u \in y w = v \cdot_{𝑸} u\})$

Detailed syntax breakdown

Step	Hyp	Ref	Expression
0		cmp	$class \cdot_{𝑷}$
1		vx	$setvar x$
2		cnp	$class 𝑷$
3		vy	$setvar y$
4		vw	$setvar w$
5		vv	$setvar v$
6	1	cv	$setvar x$
7		vu	$setvar u$
8	3	cv	$setvar y$
9	4	cv	$setvar w$
10	5	cv	$setvar v$
11		cmq	$class \cdot_{𝑸}$
12	7	cv	$setvar u$
13	10 12 11	co	$class (v \cdot_{𝑸} u)$
14	9 13	wceq	$wff w = v \cdot_{𝑸} u$
15	14 7 8	wrex	$wff \exists u \in y w = v \cdot_{𝑸} u$
16	15 5 6	wrex	$wff \exists v \in x \exists u \in y w = v \cdot_{𝑸} u$
17	16 4	cab	$class \{w \| \exists v \in x \exists u \in y w = v \cdot_{𝑸} u\}$
18	1 3 2 2 17	cmpo	$class (x \in 𝑷, y \in 𝑷 ⟼ \{w \| \exists v \in x \exists u \in y w = v \cdot_{𝑸} u\})$
19	0 18	wceq	$wff \cdot_{𝑷} = (x \in 𝑷, y \in 𝑷 ⟼ \{w \| \exists v \in x \exists u \in y w = v \cdot_{𝑸} u\})$

Metamath Proof Explorer

Definition df-mp

Detailed syntax breakdown