Metamath Proof Explorer

Theorem indi

Description: Distributive law for intersection over union. Exercise 10 of TakeutiZaring p. 17. (Contributed by NM, 30-Sep-2002) (Proof shortened by Andrew Salmon, 26-Jun-2011)

		Ref	Expression
	Assertion	indi	\|- ( A i^i ( B u. C ) ) = ( ( A i^i B ) u. ( A i^i C ) )

Proof

Step	Hyp	Ref	Expression
1		andi	\|- ( ( x e. A /\ ( x e. B \/ x e. C ) ) <-> ( ( x e. A /\ x e. B ) \/ ( x e. A /\ x e. C ) ) )
2		elin	\|- ( x e. ( A i^i B ) <-> ( x e. A /\ x e. B ) )
3		elin	\|- ( x e. ( A i^i C ) <-> ( x e. A /\ x e. C ) )
4	2 3	orbi12i	\|- ( ( x e. ( A i^i B ) \/ x e. ( A i^i C ) ) <-> ( ( x e. A /\ x e. B ) \/ ( x e. A /\ x e. C ) ) )
5	1 4	bitr4i	\|- ( ( x e. A /\ ( x e. B \/ x e. C ) ) <-> ( x e. ( A i^i B ) \/ x e. ( A i^i C ) ) )
6		elun	\|- ( x e. ( B u. C ) <-> ( x e. B \/ x e. C ) )
7	6	anbi2i	\|- ( ( x e. A /\ x e. ( B u. C ) ) <-> ( x e. A /\ ( x e. B \/ x e. C ) ) )
8		elun	\|- ( x e. ( ( A i^i B ) u. ( A i^i C ) ) <-> ( x e. ( A i^i B ) \/ x e. ( A i^i C ) ) )
9	5 7 8	3bitr4i	\|- ( ( x e. A /\ x e. ( B u. C ) ) <-> x e. ( ( A i^i B ) u. ( A i^i C ) ) )
10	9	ineqri	\|- ( A i^i ( B u. C ) ) = ( ( A i^i B ) u. ( A i^i C ) )