Metamath Proof Explorer

Theorem csbcom2fi

Description: Commutative law for double class substitution in a class, with nonfree variable condition and in inference form. (Contributed by Giovanni Mascellani, 4-Jun-2019)

		Ref	Expression
	Hypotheses	csbcom2fi.1	$⊢ A \in V$
		csbcom2fi.2	$⊢ \underline{Ⅎ} y A$
		csbcom2fi.3	$⊢ ⦋ A / x ⦌ B = C$
		csbcom2fi.4	$⊢ ⦋ A / x ⦌ D = E$
	Assertion	csbcom2fi	$⊢ ⦋ A / x ⦌ ⦋ B / y ⦌ D = ⦋ C / y ⦌ E$

Proof

Step	Hyp	Ref	Expression
1		csbcom2fi.1	$⊢ A \in V$
2		csbcom2fi.2	$⊢ \underline{Ⅎ} y A$
3		csbcom2fi.3	$⊢ ⦋ A / x ⦌ B = C$
4		csbcom2fi.4	$⊢ ⦋ A / x ⦌ D = E$
5		df-csb	$⊢ ⦋ A / x ⦌ ⦋ B / y ⦌ D = \{z \| \underset{˙}{[} A / x \underset{˙}{]} z \in ⦋ B / y ⦌ D\}$
6	5	abeq2i	$⊢ z \in ⦋ A / x ⦌ ⦋ B / y ⦌ D \leftrightarrow \underset{˙}{[} A / x \underset{˙}{]} z \in ⦋ B / y ⦌ D$
7		df-csb	$⊢ ⦋ B / y ⦌ D = \{z \| \underset{˙}{[} B / y \underset{˙}{]} z \in D\}$
8	7	abeq2i	$⊢ z \in ⦋ B / y ⦌ D \leftrightarrow \underset{˙}{[} B / y \underset{˙}{]} z \in D$
9	8	sbcbii	$⊢ \underset{˙}{[} A / x \underset{˙}{]} z \in ⦋ B / y ⦌ D \leftrightarrow \underset{˙}{[} A / x \underset{˙}{]} \underset{˙}{[} B / y \underset{˙}{]} z \in D$
10	6 9	bitri	$⊢ z \in ⦋ A / x ⦌ ⦋ B / y ⦌ D \leftrightarrow \underset{˙}{[} A / x \underset{˙}{]} \underset{˙}{[} B / y \underset{˙}{]} z \in D$
11		df-csb	$⊢ ⦋ A / x ⦌ D = \{z \| \underset{˙}{[} A / x \underset{˙}{]} z \in D\}$
12	11	abeq2i	$⊢ z \in ⦋ A / x ⦌ D \leftrightarrow \underset{˙}{[} A / x \underset{˙}{]} z \in D$
13	4	eleq2i	$⊢ z \in ⦋ A / x ⦌ D \leftrightarrow z \in E$
14	12 13	bitr3i	$⊢ \underset{˙}{[} A / x \underset{˙}{]} z \in D \leftrightarrow z \in E$
15	1 2 3 14	sbccom2fi	$⊢ \underset{˙}{[} A / x \underset{˙}{]} \underset{˙}{[} B / y \underset{˙}{]} z \in D \leftrightarrow \underset{˙}{[} C / y \underset{˙}{]} z \in E$
16		sbcel2	$⊢ \underset{˙}{[} C / y \underset{˙}{]} z \in E \leftrightarrow z \in ⦋ C / y ⦌ E$
17	10 15 16	3bitri	$⊢ z \in ⦋ A / x ⦌ ⦋ B / y ⦌ D \leftrightarrow z \in ⦋ C / y ⦌ E$
18	17	eqriv	$⊢ ⦋ A / x ⦌ ⦋ B / y ⦌ D = ⦋ C / y ⦌ E$