let r be Real; for p being Point of (TOP-REAL 2) holds
( (r * p) `1 = r * (p `1) & (r * p) `2 = r * (p `2) )
let p be Point of (TOP-REAL 2); ( (r * p) `1 = r * (p `1) & (r * p) `2 = r * (p `2) )
r * p = |[(r * (p `1)),(r * (p `2))]|
by EUCLID:61;
hence
( (r * p) `1 = r * (p `1) & (r * p) `2 = r * (p `2) )
by EUCLID:56; verum