Metamath Proof Explorer

Theorem cnvimainrn

Description: The preimage of the intersection of the range of a class and a class A is the preimage of the class A . (Contributed by AV, 17-Sep-2024)

		Ref	Expression
	Assertion	cnvimainrn	$⊢ Fun F \to F^{-1} [ran F \cap A] = F^{-1} [A]$

Proof

Step	Hyp	Ref	Expression
1		inpreima	$⊢ Fun F \to F^{-1} [ran F \cap A] = F^{-1} [ran F] \cap F^{-1} [A]$
2		cnvimass	$⊢ F^{-1} [A] \subseteq dom F$
3		cnvimarndm	$⊢ F^{-1} [ran F] = dom F$
4	2 3	sseqtrri	$⊢ F^{-1} [A] \subseteq F^{-1} [ran F]$
5		df-ss	$⊢ F^{-1} [A] \subseteq F^{-1} [ran F] \leftrightarrow F^{-1} [A] \cap F^{-1} [ran F] = F^{-1} [A]$
6	4 5	mpbi	$⊢ F^{-1} [A] \cap F^{-1} [ran F] = F^{-1} [A]$
7	6	ineqcomi	$⊢ F^{-1} [ran F] \cap F^{-1} [A] = F^{-1} [A]$
8	1 7	eqtrdi	$⊢ Fun F \to F^{-1} [ran F \cap A] = F^{-1} [A]$