let n be Nat; for p, q being Point of (TOP-REAL n) holds |.(p + q).| ^2 = ((|.p.| ^2) + (2 * |(q,p)|)) + (|.q.| ^2)
let p, q be Point of (TOP-REAL n); |.(p + q).| ^2 = ((|.p.| ^2) + (2 * |(q,p)|)) + (|.q.| ^2)
|.(p + q).| ^2 =
|((p + q),(p + q))|
by Th58
.=
(|(p,p)| + (2 * |(q,p)|)) + |(q,q)|
by Th52
.=
((|.p.| ^2) + (2 * |(q,p)|)) + |(q,q)|
by Th58
.=
((|.p.| ^2) + (2 * |(q,p)|)) + (|.q.| ^2)
by Th58
;
hence
|.(p + q).| ^2 = ((|.p.| ^2) + (2 * |(q,p)|)) + (|.q.| ^2)
; verum