let a, b be Real; ( - 1 <= a & a <= 1 & - 1 <= b & b <= 1 implies b * (sqrt (1 + (a ^2))) <= sqrt (1 + (b ^2)) )
assume that
A1:
- 1 <= a
and
A2:
a <= 1
and
A3:
- 1 <= b
and
A4:
b <= 1
; b * (sqrt (1 + (a ^2))) <= sqrt (1 + (b ^2))
A5:
- 1 <= - b
by A4, XREAL_1:24;
- (- 1) >= - b
by A3, XREAL_1:24;
then
(- (- b)) * (sqrt (1 + (a ^2))) <= sqrt (1 + ((- b) ^2))
by A1, A2, A5, Th55;
hence
b * (sqrt (1 + (a ^2))) <= sqrt (1 + (b ^2))
; verum