let N be e_net; ( (( the escape of N \ (id the carrier of N)) ~) * ((id ( the carrier of N \ (rng the escape of N))) ~) = ( the escape of N \ (id the carrier of N)) ~ & (( the entrance of N \ (id the carrier of N)) ~) * ((id ( the carrier of N \ (rng the entrance of N))) ~) = ( the entrance of N \ (id the carrier of N)) ~ )
A1: (( the entrance of N \ (id the carrier of N)) ~) * ((id ( the carrier of N \ (rng the entrance of N))) ~) =
((id ( the carrier of N \ (rng the entrance of N))) * ( the entrance of N \ (id the carrier of N))) ~
by RELAT_1:35
.=
( the entrance of N \ (id the carrier of N)) ~
by Th23
;
(( the escape of N \ (id the carrier of N)) ~) * ((id ( the carrier of N \ (rng the escape of N))) ~) =
((id ( the carrier of N \ (rng the escape of N))) * ( the escape of N \ (id the carrier of N))) ~
by RELAT_1:35
.=
( the escape of N \ (id the carrier of N)) ~
by Th23
;
hence
( (( the escape of N \ (id the carrier of N)) ~) * ((id ( the carrier of N \ (rng the escape of N))) ~) = ( the escape of N \ (id the carrier of N)) ~ & (( the entrance of N \ (id the carrier of N)) ~) * ((id ( the carrier of N \ (rng the entrance of N))) ~) = ( the entrance of N \ (id the carrier of N)) ~ )
by A1; verum