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Metamath Proof Explorer

Theorem bnj1029

Description: Property of _trCl . (Contributed by Jonathan Ben-Naim, 3-Jun-2011) (New usage is discouraged.)

		Ref	Expression
	Assertion	bnj1029	\|- ( ( R _FrSe A /\ X e. A ) -> _TrFo ( _trCl ( X , A , R ) , A , R ) )

Proof

Step	Hyp	Ref	Expression
1		biid	\|- ( ( f ` (/) ) = _pred ( X , A , R ) <-> ( f ` (/) ) = _pred ( X , A , R ) )
2		biid	\|- ( A. i e. _om ( suc i e. n -> ( f ` suc i ) = U_ y e. ( f ` i ) _pred ( y , A , R ) ) <-> A. i e. _om ( suc i e. n -> ( f ` suc i ) = U_ y e. ( f ` i ) _pred ( y , A , R ) ) )
3		biid	\|- ( ( n e. ( _om \ { (/) } ) /\ f Fn n /\ ( f ` (/) ) = _pred ( X , A , R ) /\ A. i e. _om ( suc i e. n -> ( f ` suc i ) = U_ y e. ( f ` i ) _pred ( y , A , R ) ) ) <-> ( n e. ( _om \ { (/) } ) /\ f Fn n /\ ( f ` (/) ) = _pred ( X , A , R ) /\ A. i e. _om ( suc i e. n -> ( f ` suc i ) = U_ y e. ( f ` i ) _pred ( y , A , R ) ) ) )
4		biid	\|- ( ( R _FrSe A /\ X e. A /\ y e. _trCl ( X , A , R ) /\ z e. _pred ( y , A , R ) ) <-> ( R _FrSe A /\ X e. A /\ y e. _trCl ( X , A , R ) /\ z e. _pred ( y , A , R ) ) )
5		biid	\|- ( ( m e. _om /\ n = suc m /\ p = suc n ) <-> ( m e. _om /\ n = suc m /\ p = suc n ) )
6		biid	\|- ( ( i e. n /\ y e. ( f ` i ) ) <-> ( i e. n /\ y e. ( f ` i ) ) )
7		biid	\|- ( [. p / n ]. ( f ` (/) ) = _pred ( X , A , R ) <-> [. p / n ]. ( f ` (/) ) = _pred ( X , A , R ) )
8		biid	\|- ( [. p / n ]. A. i e. _om ( suc i e. n -> ( f ` suc i ) = U_ y e. ( f ` i ) _pred ( y , A , R ) ) <-> [. p / n ]. A. i e. _om ( suc i e. n -> ( f ` suc i ) = U_ y e. ( f ` i ) _pred ( y , A , R ) ) )
9		biid	\|- ( [. p / n ]. ( n e. ( _om \ { (/) } ) /\ f Fn n /\ ( f ` (/) ) = _pred ( X , A , R ) /\ A. i e. _om ( suc i e. n -> ( f ` suc i ) = U_ y e. ( f ` i ) _pred ( y , A , R ) ) ) <-> [. p / n ]. ( n e. ( _om \ { (/) } ) /\ f Fn n /\ ( f ` (/) ) = _pred ( X , A , R ) /\ A. i e. _om ( suc i e. n -> ( f ` suc i ) = U_ y e. ( f ` i ) _pred ( y , A , R ) ) ) )
10		biid	\|- ( [. ( f u. { <. n , U_ y e. ( f ` m ) _pred ( y , A , R ) >. } ) / f ]. [. p / n ]. ( f ` (/) ) = _pred ( X , A , R ) <-> [. ( f u. { <. n , U_ y e. ( f ` m ) _pred ( y , A , R ) >. } ) / f ]. [. p / n ]. ( f ` (/) ) = _pred ( X , A , R ) )
11		biid	\|- ( [. ( f u. { <. n , U_ y e. ( f ` m ) _pred ( y , A , R ) >. } ) / f ]. [. p / n ]. A. i e. _om ( suc i e. n -> ( f ` suc i ) = U_ y e. ( f ` i ) _pred ( y , A , R ) ) <-> [. ( f u. { <. n , U_ y e. ( f ` m ) _pred ( y , A , R ) >. } ) / f ]. [. p / n ]. A. i e. _om ( suc i e. n -> ( f ` suc i ) = U_ y e. ( f ` i ) _pred ( y , A , R ) ) )
12		biid	\|- ( [. ( f u. { <. n , U_ y e. ( f ` m ) _pred ( y , A , R ) >. } ) / f ]. [. p / n ]. ( n e. ( _om \ { (/) } ) /\ f Fn n /\ ( f ` (/) ) = _pred ( X , A , R ) /\ A. i e. _om ( suc i e. n -> ( f ` suc i ) = U_ y e. ( f ` i ) _pred ( y , A , R ) ) ) <-> [. ( f u. { <. n , U_ y e. ( f ` m ) _pred ( y , A , R ) >. } ) / f ]. [. p / n ]. ( n e. ( _om \ { (/) } ) /\ f Fn n /\ ( f ` (/) ) = _pred ( X , A , R ) /\ A. i e. _om ( suc i e. n -> ( f ` suc i ) = U_ y e. ( f ` i ) _pred ( y , A , R ) ) ) )
13		eqid	\|- ( _om \ { (/) } ) = ( _om \ { (/) } )
14		eqid	\|- { f \| E. n e. ( _om \ { (/) } ) ( f Fn n /\ ( f ` (/) ) = _pred ( X , A , R ) /\ A. i e. _om ( suc i e. n -> ( f ` suc i ) = U_ y e. ( f ` i ) _pred ( y , A , R ) ) ) } = { f \| E. n e. ( _om \ { (/) } ) ( f Fn n /\ ( f ` (/) ) = _pred ( X , A , R ) /\ A. i e. _om ( suc i e. n -> ( f ` suc i ) = U_ y e. ( f ` i ) _pred ( y , A , R ) ) ) }
15		eqid	\|- U_ y e. ( f ` m ) _pred ( y , A , R ) = U_ y e. ( f ` m ) _pred ( y , A , R )
16		eqid	\|- ( f u. { <. n , U_ y e. ( f ` m ) _pred ( y , A , R ) >. } ) = ( f u. { <. n , U_ y e. ( f ` m ) _pred ( y , A , R ) >. } )
17	1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16	bnj907	\|- ( ( R _FrSe A /\ X e. A ) -> _TrFo ( _trCl ( X , A , R ) , A , R ) )