let p be Point of (TOP-REAL 2); ( p `2 >= 0 implies for x being real number
for y being real non negative number
for r being real positive number holds
( (+ x,y,r) . p = 0 iff p = |[x,y]| ) )
assume A1:
p `2 >= 0
; for x being real number
for y being real non negative number
for r being real positive number holds
( (+ x,y,r) . p = 0 iff p = |[x,y]| )
let x be real number ; for y being real non negative number
for r being real positive number holds
( (+ x,y,r) . p = 0 iff p = |[x,y]| )
let y be real non negative number ; for r being real positive number holds
( (+ x,y,r) . p = 0 iff p = |[x,y]| )
let r be real positive number ; ( (+ x,y,r) . p = 0 iff p = |[x,y]| )
A2:
p = |[(p `1 ),(p `2 )]|
by EUCLID:57;
hereby ( p = |[x,y]| implies (+ x,y,r) . p = 0 )
assume A3:
(+ x,y,r) . p = 0
;
p = |[x,y]|then
p in Ball |[x,y]|,
r
by A1, A2, Def6;
then
0 = |.(|[x,y]| - p).| / r
by A1, A2, A3, Def6;
then
0 * r = |.(|[x,y]| - p).|
;
hence
p = |[x,y]|
by TOPRNS_1:29;
verum
end;
assume A4:
p = |[x,y]|
; (+ x,y,r) . p = 0
then
p in Ball |[x,y]|,r
by Th17;
hence (+ x,y,r) . p =
|.(|[x,y]| - p).| / r
by A4, Def6
.=
0 / r
by A4, TOPRNS_1:29
.=
0
;
verum