let p1, p2 be Point of (TOP-REAL 2); ( p1 `2 < p2 `2 implies p1 `2 < ((1 / 2) * (p1 + p2)) `2 )
assume A1:
p1 `2 < p2 `2
; p1 `2 < ((1 / 2) * (p1 + p2)) `2
((1 / 2) * (p1 + p2)) `2 =
(1 / 2) * ((p1 + p2) `2)
by TOPREAL3:4
.=
(1 / 2) * ((p1 `2) + (p2 `2))
by TOPREAL3:2
.=
((p1 `2) + (p2 `2)) / 2
;
hence
p1 `2 < ((1 / 2) * (p1 + p2)) `2
by A1, XREAL_1:226; verum