equncomVD

Description: If a class equals the union of two other classes, then it equals the union of those two classes commuted. The following User's Proof is a Virtual Deduction proof completed automatically by the tools program completeusersproof.cmd, which invokes Mel L. O'Cat's mmj2 and Norm Megill's Metamath Proof Assistant. equncom is equncomVD without virtual deductions and was automatically derived from equncomVD .

		Ref	Expression
	Assertion	equncomVD	$⊢ A = B \cup C \leftrightarrow A = C \cup B$

Proof

Step	Hyp	Ref	Expression
1		idn1	$⊢ (A = B \cup C \to A = B \cup C)$
2		uncom	$⊢ B \cup C = C \cup B$
3		eqeq1	$⊢ A = B \cup C \to (A = C \cup B \leftrightarrow B \cup C = C \cup B)$
4	3	biimprd	$⊢ A = B \cup C \to (B \cup C = C \cup B \to A = C \cup B)$
5	1 2 4	e10	$⊢ (A = B \cup C \to A = C \cup B)$
6	5	in1	$⊢ A = B \cup C \to A = C \cup B$
7		idn1	$⊢ (A = C \cup B \to A = C \cup B)$
8		eqeq2	$⊢ B \cup C = C \cup B \to (A = B \cup C \leftrightarrow A = C \cup B)$
9	8	biimprcd	$⊢ A = C \cup B \to (B \cup C = C \cup B \to A = B \cup C)$
10	7 2 9	e10	$⊢ (A = C \cup B \to A = B \cup C)$
11	10	in1	$⊢ A = C \cup B \to A = B \cup C$
12	6 11	impbii	$⊢ A = B \cup C \leftrightarrow A = C \cup B$

1::	\|- (. A = ( B u. C ) ->. A = ( B u. C ) ).
2::	\|- ( B u. C ) = ( C u. B )
3:1,2:	\|- (. A = ( B u. C ) ->. A = ( C u. B ) ).
4:3:	\|- ( A = ( B u. C ) -> A = ( C u. B ) )
5::	\|- (. A = ( C u. B ) ->. A = ( C u. B ) ).
6:5,2:	\|- (. A = ( C u. B ) ->. A = ( B u. C ) ).
7:6:	\|- ( A = ( C u. B ) -> A = ( B u. C ) )
8:4,7:	\|- ( A = ( B u. C ) <-> A = ( C u. B ) )

Metamath Proof Explorer

Theorem equncomVD

Proof