let C be non empty set ; :: thesis:
let r be Real; :: thesis:
let V be non empty right_complementable Abelian add-associative right_zeroed vector-distributive scalar-distributive scalar-associative scalar-unital RLSStruct ; :: thesis:
let f1, f2 be PartFunc of C,V; :: thesis:
A1: dom (r (#) (f1 - f2)) = dom (f1 - f2) by Def4
.= (dom f1) /\ (dom f2) by Def2
.= (dom f1) /\ (dom (r (#) f2)) by Def4
.= (dom (r (#) f1)) /\ (dom (r (#) f2)) by Def4
.= dom ((r (#) f1) - (r (#) f2)) by Def2 ;

now :: thesis:

let c be Element of C; :: thesis:
assume A2: c in dom (r (#) (f1 - f2)) ; :: thesis:
then A3: c in dom (f1 - f2) by Def4;
A4: c in (dom (r (#) f1)) /\ (dom (r (#) f2)) by A1, A2, Def2;
then A5: c in dom (r (#) f1) by XBOOLE_0:def 4;
A6: c in dom (r (#) f2) by A4, XBOOLE_0:def 4;
thus (r (#) (f1 - f2)) /. c = r * ((f1 - f2) /. c) by A2, Def4
.= r * ((f1 /. c) - (f2 /. c)) by A3, Def2
.= (r * (f1 /. c)) - (r * (f2 /. c)) by RLVECT_1:34
.= ((r (#) f1) /. c) - (r * (f2 /. c)) by A5, Def4
.= ((r (#) f1) /. c) - ((r (#) f2) /. c) by A6, Def4
.= ((r (#) f1) - (r (#) f2)) /. c by A1, A2, Def2 ; :: thesis:

end;

hence r (#) (f1 - f2) = (r (#) f1) - (r (#) f2) by A1, PARTFUN2:1; :: thesis: