let x, y be Real; for r being positive Real ex w, v being Rational st
( |[w,v]| in Ball (|[x,y]|,r) & |[w,v]| <> |[x,y]| )
let r be positive Real; ex w, v being Rational st
( |[w,v]| in Ball (|[x,y]|,r) & |[w,v]| <> |[x,y]| )
x < x + (r / 2)
by XREAL_1:39;
then consider w being Rational such that
A1:
x < w
and
A2:
w < x + (r / 2)
by RAT_1:7;
A3:
w - x > 0
by A1, XREAL_1:50;
y < y + (r / 2)
by XREAL_1:39;
then consider v being Rational such that
A4:
y < v
and
A5:
v < y + (r / 2)
by RAT_1:7;
A6:
v - y > 0
by A4, XREAL_1:50;
|[w,v]| - |[x,v]| = |[(w - x),(v - v)]|
by EUCLID:62;
then
|.(|[w,v]| - |[x,v]|).| = |.(w - x).|
by TOPREAL6:23;
then
|.(|[w,v]| - |[x,v]|).| = w - x
by A3, ABSVALUE:def 1;
then A7:
|.(|[w,v]| - |[x,v]|).| < (x + (r / 2)) - x
by A2, XREAL_1:9;
take
w
; ex v being Rational st
( |[w,v]| in Ball (|[x,y]|,r) & |[w,v]| <> |[x,y]| )
take
v
; ( |[w,v]| in Ball (|[x,y]|,r) & |[w,v]| <> |[x,y]| )
A8:
|[x,v]| - |[x,y]| = |[(x - x),(v - y)]|
by EUCLID:62;
A9:
|.(|[w,v]| - |[x,y]|).| <= |.(|[w,v]| - |[x,v]|).| + |.(|[x,v]| - |[x,y]|).|
by TOPRNS_1:34;
|.(|[x,v]| - |[x,y]|).| = |.(v - y).|
by A8, TOPREAL6:23;
then
|.(|[x,v]| - |[x,y]|).| = v - y
by A6, ABSVALUE:def 1;
then
|.(|[x,v]| - |[x,y]|).| <= (y + (r / 2)) - y
by A5, XREAL_1:9;
then
|.(|[w,v]| - |[x,v]|).| + |.(|[x,v]| - |[x,y]|).| < ((x + (r / 2)) - x) + ((y + (r / 2)) - y)
by A7, XREAL_1:8;
then
|.(|[w,v]| - |[x,y]|).| < r
by A9, XXREAL_0:2;
hence
|[w,v]| in Ball (|[x,y]|,r)
by TOPREAL9:7; |[w,v]| <> |[x,y]|
thus
|[w,v]| <> |[x,y]|
by A4, SPPOL_2:1; verum