qdenval

Description: Value of the canonical denominator function. (Contributed by Stefan O'Rear, 13-Sep-2014)

		Ref	Expression
	Assertion	qdenval	$⊢ A \in ℚ \to denom (A) = 2^{nd} ((ι x \in (ℤ \times ℕ) \| (1^{st} (x) \gcd 2^{nd} (x) = 1 \land A = \frac{1^{st} (x)}{2^{nd} (x)})))$

Step	Hyp	Ref	Expression
1		eqeq1	$⊢ a = A \to (a = \frac{1^{st} (x)}{2^{nd} (x)} \leftrightarrow A = \frac{1^{st} (x)}{2^{nd} (x)})$
2	1	anbi2d	$⊢ a = A \to ((1^{st} (x) \gcd 2^{nd} (x) = 1 \land a = \frac{1^{st} (x)}{2^{nd} (x)}) \leftrightarrow (1^{st} (x) \gcd 2^{nd} (x) = 1 \land A = \frac{1^{st} (x)}{2^{nd} (x)}))$
3	2	riotabidv	$⊢ a = A \to (ι x \in (ℤ \times ℕ) \| (1^{st} (x) \gcd 2^{nd} (x) = 1 \land a = \frac{1^{st} (x)}{2^{nd} (x)})) = (ι x \in (ℤ \times ℕ) \| (1^{st} (x) \gcd 2^{nd} (x) = 1 \land A = \frac{1^{st} (x)}{2^{nd} (x)}))$
4	3	fveq2d	$⊢ a = A \to 2^{nd} ((ι x \in (ℤ \times ℕ) \| (1^{st} (x) \gcd 2^{nd} (x) = 1 \land a = \frac{1^{st} (x)}{2^{nd} (x)}))) = 2^{nd} ((ι x \in (ℤ \times ℕ) \| (1^{st} (x) \gcd 2^{nd} (x) = 1 \land A = \frac{1^{st} (x)}{2^{nd} (x)})))$
5		df-denom	$⊢ denom = (a \in ℚ ⟼ 2^{nd} ((ι x \in (ℤ \times ℕ) \| (1^{st} (x) \gcd 2^{nd} (x) = 1 \land a = \frac{1^{st} (x)}{2^{nd} (x)}))))$
6		fvex	$⊢ 2^{nd} ((ι x \in (ℤ \times ℕ) \| (1^{st} (x) \gcd 2^{nd} (x) = 1 \land A = \frac{1^{st} (x)}{2^{nd} (x)}))) \in V$
7	4 5 6	fvmpt	$⊢ A \in ℚ \to denom (A) = 2^{nd} ((ι x \in (ℤ \times ℕ) \| (1^{st} (x) \gcd 2^{nd} (x) = 1 \land A = \frac{1^{st} (x)}{2^{nd} (x)})))$

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