Metamath Proof Explorer


Theorem pconncn

Description: The property of being a path-connected topological space. (Contributed by Mario Carneiro, 11-Feb-2015)

Ref Expression
Hypothesis ispconn.1 X = J
Assertion pconncn J PConn A X B X f II Cn J f 0 = A f 1 = B

Proof

Step Hyp Ref Expression
1 ispconn.1 X = J
2 1 ispconn J PConn J Top x X y X f II Cn J f 0 = x f 1 = y
3 2 simprbi J PConn x X y X f II Cn J f 0 = x f 1 = y
4 eqeq2 x = A f 0 = x f 0 = A
5 4 anbi1d x = A f 0 = x f 1 = y f 0 = A f 1 = y
6 5 rexbidv x = A f II Cn J f 0 = x f 1 = y f II Cn J f 0 = A f 1 = y
7 eqeq2 y = B f 1 = y f 1 = B
8 7 anbi2d y = B f 0 = A f 1 = y f 0 = A f 1 = B
9 8 rexbidv y = B f II Cn J f 0 = A f 1 = y f II Cn J f 0 = A f 1 = B
10 6 9 rspc2v A X B X x X y X f II Cn J f 0 = x f 1 = y f II Cn J f 0 = A f 1 = B
11 3 10 syl5com J PConn A X B X f II Cn J f 0 = A f 1 = B
12 11 3impib J PConn A X B X f II Cn J f 0 = A f 1 = B