Metamath Proof Explorer

Theorem distrpr

Description: Multiplication of positive reals is distributive. Proposition 9-3.7(iii) of Gleason p. 124. (Contributed by NM, 2-May-1996) (New usage is discouraged.)

		Ref	Expression
	Assertion	distrpr	$⊢ A \cdot_{𝑷} (B +_{𝑷} C) = (A \cdot_{𝑷} B) +_{𝑷} (A \cdot_{𝑷} C)$

Proof

Step	Hyp	Ref	Expression
1		distrlem1pr	$⊢ (A \in 𝑷 \land B \in 𝑷 \land C \in 𝑷) \to A \cdot_{𝑷} (B +_{𝑷} C) \subseteq (A \cdot_{𝑷} B) +_{𝑷} (A \cdot_{𝑷} C)$
2		distrlem5pr	$⊢ (A \in 𝑷 \land B \in 𝑷 \land C \in 𝑷) \to (A \cdot_{𝑷} B) +_{𝑷} (A \cdot_{𝑷} C) \subseteq A \cdot_{𝑷} (B +_{𝑷} C)$
3	1 2	eqssd	$⊢ (A \in 𝑷 \land B \in 𝑷 \land C \in 𝑷) \to A \cdot_{𝑷} (B +_{𝑷} C) = (A \cdot_{𝑷} B) +_{𝑷} (A \cdot_{𝑷} C)$
4		dmplp	$⊢ dom +_{𝑷} = 𝑷 \times 𝑷$
5		0npr	$⊢ \neg \emptyset \in 𝑷$
6		dmmp	$⊢ dom \cdot_{𝑷} = 𝑷 \times 𝑷$
7	4 5 6	ndmovdistr	$⊢ \neg (A \in 𝑷 \land B \in 𝑷 \land C \in 𝑷) \to A \cdot_{𝑷} (B +_{𝑷} C) = (A \cdot_{𝑷} B) +_{𝑷} (A \cdot_{𝑷} C)$
8	3 7	pm2.61i	$⊢ A \cdot_{𝑷} (B +_{𝑷} C) = (A \cdot_{𝑷} B) +_{𝑷} (A \cdot_{𝑷} C)$