let x be Real; for p being Point of (TOP-REAL 3) holds x * p = |[(x * (p `1)),(x * (p `2)),(x * (p `3))]|
let p be Point of (TOP-REAL 3); x * p = |[(x * (p `1)),(x * (p `2)),(x * (p `3))]|
reconsider q = p as Element of REAL 3 by EUCLID:22;
(x * q) . 2 = x * (q . 2)
by RVSUM_1:44;
then A1:
(x * p) `2 = x * (p `2)
;
(x * q) . 3 = x * (q . 3)
by RVSUM_1:44;
then A2:
(x * p) `3 = x * (p `3)
;
(x * q) . 1 = x * (q . 1)
by RVSUM_1:44;
then
(x * p) `1 = x * (p `1)
;
hence
x * p = |[(x * (p `1)),(x * (p `2)),(x * (p `3))]|
by A1, A2, Th3; verum