cnv0OLD

Description: Obsolete version of cnv0 as of 31-Jan-2026. (Contributed by NM, 6-Apr-1998) Remove dependency on ax-sep , ax-nul , ax-pr . (Revised by KP, 25-Oct-2021) (Proof modification is discouraged.) (New usage is discouraged.)

		Ref	Expression
	Assertion	cnv0OLD	\|- `' (/) = (/)

Proof

Step	Hyp	Ref	Expression
1		br0	\|- -. y (/) z
2	1	intnan	\|- -. ( x = <. z , y >. /\ y (/) z )
3	2	nex	\|- -. E. y ( x = <. z , y >. /\ y (/) z )
4	3	nex	\|- -. E. z E. y ( x = <. z , y >. /\ y (/) z )
5		df-cnv	\|- `' (/) = { <. z , y >. \| y (/) z }
6		df-opab	\|- { <. z , y >. \| y (/) z } = { x \| E. z E. y ( x = <. z , y >. /\ y (/) z ) }
7	5 6	eqtri	\|- `' (/) = { x \| E. z E. y ( x = <. z , y >. /\ y (/) z ) }
8	7	eqabri	\|- ( x e. `' (/) <-> E. z E. y ( x = <. z , y >. /\ y (/) z ) )
9	4 8	mtbir	\|- -. x e. `' (/)
10	9	nel0	\|- `' (/) = (/)

Metamath Proof Explorer

Theorem cnv0OLD

Proof