let m, x, y be Real; ( y > x & x >= 0 & m >= 0 implies x / y <= (x + m) / (y + m) )
assume that
A1:
y > x
and
A2:
x >= 0
and
A3:
m >= 0
; x / y <= (x + m) / (y + m)
y - x > 0
by A1, XREAL_1:50;
then
m * (y - x) >= 0
by A3;
then
((y * (x + m)) - (x * (m + y))) / (y * (y + m)) >= 0
by A1, A2, A3;
then
((x + m) / (y + m)) - (x / y) >= 0
by A1, A2, A3, XCMPLX_1:130;
then
(((x + m) / (y + m)) - (x / y)) + (x / y) >= 0 + (x / y)
by XREAL_1:6;
hence
x / y <= (x + m) / (y + m)
; verum