let X be set ; for f1, f2 being PartFunc of REAL ,REAL st f1 | X is continuous & f2 | (f1 .: X) is continuous holds
(f2 * f1) | X is continuous
let f1, f2 be PartFunc of REAL ,REAL ; ( f1 | X is continuous & f2 | (f1 .: X) is continuous implies (f2 * f1) | X is continuous )
(f2 * f1) | X = (f2 | (f1 .: X)) * (f1 | X)
by FUNCT_1:169;
hence
( f1 | X is continuous & f2 | (f1 .: X) is continuous implies (f2 * f1) | X is continuous )
; verum