Metamath Proof Explorer

Theorem nfsup

Description: Hypothesis builder for supremum. (Contributed by Mario Carneiro, 20-Mar-2014)

Ref Expression
Hypotheses nfsup.1 _xA
nfsup.2 _xB
nfsup.3 _xR
Assertion nfsup _xsupABR

Proof

Step Hyp Ref Expression
1 nfsup.1 _xA
2 nfsup.2 _xB
3 nfsup.3 _xR
4 dfsup2 supABR=BR-1ARBR-1A
5 3 nfcnv _xR-1
6 5 1 nfima _xR-1A
7 2 6 nfdif _xBR-1A
8 3 7 nfima _xRBR-1A
9 6 8 nfun _xR-1ARBR-1A
10 2 9 nfdif _xBR-1ARBR-1A
11 10 nfuni _xBR-1ARBR-1A
12 4 11 nfcxfr _xsupABR