rp-1>r

Theorem.

Arguments:

a (obj), b (obj), c (obj), phi (pr),

Hypotheses:

(aeqc)
(phito(aeqb))

Assertions:

(phito(beqc))

Proof:

Hyp Ref Line Expr
Hypo1(aeqc)
2(phito(aeqb))
1ax-sym3(ceqa)
2, 3rp-1<r4(phito(beqc))