let f be complex-valued Function; :: thesis:
let r be complex number ; :: thesis:
assume A1: r <> 0 ; :: thesis:

now

let c be set ; :: thesis:
thus ( c in (r (#) f) " {0 } implies c in f " {0 } ) :: thesis:

proof

assume c in (r (#) f) " {0 } ; :: thesis:
then ( c in dom (r (#) f) & (r (#) f) . c in {0 } ) by FUNCT_1:def 13;
then ( c in dom (r (#) f) & (r (#) f) . c = 0 ) by TARSKI:def 1;
then ( c in dom (r (#) f) & r * (f . c) = 0 ) by VALUED_1:def 5;
then ( c in dom f & f . c = 0 ) by A1, VALUED_1:def 5;
then ( c in dom f & f . c in {0 } ) by TARSKI:def 1;
hence c in f " {0 } by FUNCT_1:def 13; :: thesis:

end;

assume c in f " {0 } ; :: thesis:
then ( c in dom f & f . c in {0 } ) by FUNCT_1:def 13;
then ( c in dom f & f . c = 0 ) by TARSKI:def 1;
then ( c in dom (r (#) f) & r * (f . c) = 0 ) by VALUED_1:def 5;
then ( c in dom (r (#) f) & (r (#) f) . c = 0 ) by VALUED_1:def 5;
then ( c in dom (r (#) f) & (r (#) f) . c in {0 } ) by TARSKI:def 1;
hence c in (r (#) f) " {0 } by FUNCT_1:def 13; :: thesis:

end;

hence (r (#) f) " {0 } = f " {0 } by TARSKI:2; :: thesis: