Metamath Proof Explorer


Theorem bnj927

Description: First-order logic and set theory. (Contributed by Jonathan Ben-Naim, 3-Jun-2011) (New usage is discouraged.)

Ref Expression
Hypotheses bnj927.1 G = f n C
bnj927.2 C V
Assertion bnj927 p = suc n f Fn n G Fn p

Proof

Step Hyp Ref Expression
1 bnj927.1 G = f n C
2 bnj927.2 C V
3 simpr p = suc n f Fn n f Fn n
4 vex n V
5 4 2 fnsn n C Fn n
6 5 a1i p = suc n f Fn n n C Fn n
7 bnj521 n n =
8 7 a1i p = suc n f Fn n n n =
9 3 6 8 fnund p = suc n f Fn n f n C Fn n n
10 1 fneq1i G Fn n n f n C Fn n n
11 9 10 sylibr p = suc n f Fn n G Fn n n
12 df-suc suc n = n n
13 12 eqeq2i p = suc n p = n n
14 13 biimpi p = suc n p = n n
15 14 adantr p = suc n f Fn n p = n n
16 15 fneq2d p = suc n f Fn n G Fn p G Fn n n
17 11 16 mpbird p = suc n f Fn n G Fn p