let X be non empty TopSpace; for f1, f2 being Function of X,R^1 st f1 is continuous & f2 is continuous & ( for q being Point of X holds f2 . q <> 0 ) holds
ex g being Function of X,R^1 st
( ( for p being Point of X
for r1, r2 being Real st f1 . p = r1 & f2 . p = r2 holds
g . p = 1 + ((r1 / r2) ^2) ) & g is continuous )
let f1, f2 be Function of X,R^1; ( f1 is continuous & f2 is continuous & ( for q being Point of X holds f2 . q <> 0 ) implies ex g being Function of X,R^1 st
( ( for p being Point of X
for r1, r2 being Real st f1 . p = r1 & f2 . p = r2 holds
g . p = 1 + ((r1 / r2) ^2) ) & g is continuous ) )
assume
( f1 is continuous & f2 is continuous & ( for q being Point of X holds f2 . q <> 0 ) )
; ex g being Function of X,R^1 st
( ( for p being Point of X
for r1, r2 being Real st f1 . p = r1 & f2 . p = r2 holds
g . p = 1 + ((r1 / r2) ^2) ) & g is continuous )
then consider g2 being Function of X,R^1 such that
A1:
for p being Point of X
for r1, r2 being Real st f1 . p = r1 & f2 . p = r2 holds
g2 . p = (r1 / r2) ^2
and
A2:
g2 is continuous
by Th6;
consider g3 being Function of X,R^1 such that
A3:
for p being Point of X
for r1 being Real st g2 . p = r1 holds
g3 . p = r1 + 1
and
A4:
g3 is continuous
by A2, JGRAPH_2:24;
for p being Point of X
for r1, r2 being Real st f1 . p = r1 & f2 . p = r2 holds
g3 . p = 1 + ((r1 / r2) ^2)
proof
let p be
Point of
X;
for r1, r2 being Real st f1 . p = r1 & f2 . p = r2 holds
g3 . p = 1 + ((r1 / r2) ^2)let r1,
r2 be
Real;
( f1 . p = r1 & f2 . p = r2 implies g3 . p = 1 + ((r1 / r2) ^2) )
assume
(
f1 . p = r1 &
f2 . p = r2 )
;
g3 . p = 1 + ((r1 / r2) ^2)
then
g2 . p = (r1 / r2) ^2
by A1;
hence
g3 . p = 1
+ ((r1 / r2) ^2)
by A3;
verum
end;
hence
ex g being Function of X,R^1 st
( ( for p being Point of X
for r1, r2 being Real st f1 . p = r1 & f2 . p = r2 holds
g . p = 1 + ((r1 / r2) ^2) ) & g is continuous )
by A4; verum