let Z be open Subset of REAL; ( Z c= dom (arctan * arctan) & Z c= ].(- 1),1.[ & ( for x being Real st x in Z holds
( arctan . x > - 1 & arctan . x < 1 ) ) implies ( arctan * arctan is_differentiable_on Z & ( for x being Real st x in Z holds
((arctan * arctan) `| Z) . x = 1 / ((1 + (x ^2)) * (1 + ((arctan . x) ^2))) ) ) )
assume that
A1:
Z c= dom (arctan * arctan)
and
A2:
Z c= ].(- 1),1.[
and
A3:
for x being Real st x in Z holds
( arctan . x > - 1 & arctan . x < 1 )
; ( arctan * arctan is_differentiable_on Z & ( for x being Real st x in Z holds
((arctan * arctan) `| Z) . x = 1 / ((1 + (x ^2)) * (1 + ((arctan . x) ^2))) ) )
A4:
for x being Real st x in Z holds
arctan * arctan is_differentiable_in x
then A7:
arctan * arctan is_differentiable_on Z
by A1, FDIFF_1:9;
for x being Real st x in Z holds
((arctan * arctan) `| Z) . x = 1 / ((1 + (x ^2)) * (1 + ((arctan . x) ^2)))
proof
let x be
Real;
( x in Z implies ((arctan * arctan) `| Z) . x = 1 / ((1 + (x ^2)) * (1 + ((arctan . x) ^2))) )
assume A8:
x in Z
;
((arctan * arctan) `| Z) . x = 1 / ((1 + (x ^2)) * (1 + ((arctan . x) ^2)))
then A9:
(
arctan . x > - 1 &
arctan . x < 1 )
by A3;
A10:
arctan is_differentiable_on Z
by A2, SIN_COS9:81;
then A11:
arctan is_differentiable_in x
by A8, FDIFF_1:9;
((arctan * arctan) `| Z) . x =
diff (
(arctan * arctan),
x)
by A7, A8, FDIFF_1:def 7
.=
(diff (arctan,x)) / (1 + ((arctan . x) ^2))
by A11, A9, SIN_COS9:85
.=
((arctan `| Z) . x) / (1 + ((arctan . x) ^2))
by A8, A10, FDIFF_1:def 7
.=
(1 / (1 + (x ^2))) / (1 + ((arctan . x) ^2))
by A2, A8, SIN_COS9:81
.=
1
/ ((1 + (x ^2)) * (1 + ((arctan . x) ^2)))
by XCMPLX_1:78
;
hence
((arctan * arctan) `| Z) . x = 1
/ ((1 + (x ^2)) * (1 + ((arctan . x) ^2)))
;
verum
end;
hence
( arctan * arctan is_differentiable_on Z & ( for x being Real st x in Z holds
((arctan * arctan) `| Z) . x = 1 / ((1 + (x ^2)) * (1 + ((arctan . x) ^2))) ) )
by A1, A4, FDIFF_1:9; verum