let a, b be Real; for A being closed-interval Subset of REAL
for f, f1 being PartFunc of REAL ,REAL
for Z being open Subset of REAL st A c= Z & ( for x being Real st x in Z holds
( f . x = a / (sqrt (1 - (((a * x) + b) ^2 ))) & f1 . x = (a * x) + b & f1 . x > - 1 & f1 . x < 1 ) ) & Z c= dom (arccos * f1) & Z = dom f & f | A is continuous holds
integral f,A = ((- (arccos * f1)) . (sup A)) - ((- (arccos * f1)) . (inf A))
let A be closed-interval Subset of REAL ; for f, f1 being PartFunc of REAL ,REAL
for Z being open Subset of REAL st A c= Z & ( for x being Real st x in Z holds
( f . x = a / (sqrt (1 - (((a * x) + b) ^2 ))) & f1 . x = (a * x) + b & f1 . x > - 1 & f1 . x < 1 ) ) & Z c= dom (arccos * f1) & Z = dom f & f | A is continuous holds
integral f,A = ((- (arccos * f1)) . (sup A)) - ((- (arccos * f1)) . (inf A))
let f, f1 be PartFunc of REAL ,REAL ; for Z being open Subset of REAL st A c= Z & ( for x being Real st x in Z holds
( f . x = a / (sqrt (1 - (((a * x) + b) ^2 ))) & f1 . x = (a * x) + b & f1 . x > - 1 & f1 . x < 1 ) ) & Z c= dom (arccos * f1) & Z = dom f & f | A is continuous holds
integral f,A = ((- (arccos * f1)) . (sup A)) - ((- (arccos * f1)) . (inf A))
let Z be open Subset of REAL ; ( A c= Z & ( for x being Real st x in Z holds
( f . x = a / (sqrt (1 - (((a * x) + b) ^2 ))) & f1 . x = (a * x) + b & f1 . x > - 1 & f1 . x < 1 ) ) & Z c= dom (arccos * f1) & Z = dom f & f | A is continuous implies integral f,A = ((- (arccos * f1)) . (sup A)) - ((- (arccos * f1)) . (inf A)) )
assume A1:
( A c= Z & ( for x being Real st x in Z holds
( f . x = a / (sqrt (1 - (((a * x) + b) ^2 ))) & f1 . x = (a * x) + b & f1 . x > - 1 & f1 . x < 1 ) ) & Z c= dom (arccos * f1) & Z = dom f & f | A is continuous )
; integral f,A = ((- (arccos * f1)) . (sup A)) - ((- (arccos * f1)) . (inf A))
then A2:
( f is_integrable_on A & f | A is bounded )
by INTEGRA5:10, INTEGRA5:11;
A3:
for x being Real st x in Z holds
f1 . x = (a * x) + b
by A1;
AA:
for x being Real st x in Z holds
( f1 . x = (a * x) + b & f1 . x > - 1 & f1 . x < 1 )
by A1;
A4:
Z c= dom (- (arccos * f1))
by A1, VALUED_1:8;
A5:
arccos * f1 is_differentiable_on Z
by A1, AA, FDIFF_7:15;
A6:
(- 1) (#) (arccos * f1) is_differentiable_on Z
by A4, A5, FDIFF_1:28, X;
for y being set st y in Z holds
y in dom f1
by A1, FUNCT_1:21;
then A7:
Z c= dom f1
by TARSKI:def 3;
then A8:
( f1 is_differentiable_on Z & ( for x being Real st x in Z holds
(f1 `| Z) . x = a ) )
by A3, FDIFF_1:31;
A9:
for x being Real st x in Z holds
((- (arccos * f1)) `| Z) . x = a / (sqrt (1 - (((a * x) + b) ^2 )))
proof
let x be
Real;
( x in Z implies ((- (arccos * f1)) `| Z) . x = a / (sqrt (1 - (((a * x) + b) ^2 ))) )
assume A10:
x in Z
;
((- (arccos * f1)) `| Z) . x = a / (sqrt (1 - (((a * x) + b) ^2 )))
then A11:
f1 is_differentiable_in x
by A8, FDIFF_1:16;
A12:
(
f1 . x > - 1 &
f1 . x < 1 )
by A1, A10;
A13:
arccos * f1 is_differentiable_in x
by A5, A10, FDIFF_1:16;
((- (arccos * f1)) `| Z) . x =
diff (- (arccos * f1)),
x
by A6, A10, FDIFF_1:def 8
.=
(- 1) * (diff (arccos * f1),x)
by A13, FDIFF_1:23, X
.=
(- 1) * (- ((diff f1,x) / (sqrt (1 - ((f1 . x) ^2 )))))
by A11, A12, FDIFF_7:7
.=
(- 1) * (- (((f1 `| Z) . x) / (sqrt (1 - ((f1 . x) ^2 )))))
by A8, A10, FDIFF_1:def 8
.=
(- 1) * (- (a / (sqrt (1 - ((f1 . x) ^2 )))))
by A3, A7, A10, FDIFF_1:31
.=
a / (sqrt (1 - (((a * x) + b) ^2 )))
by A1, A10
;
hence
((- (arccos * f1)) `| Z) . x = a / (sqrt (1 - (((a * x) + b) ^2 )))
;
verum
end;
A14:
for x being Real st x in dom ((- (arccos * f1)) `| Z) holds
((- (arccos * f1)) `| Z) . x = f . x
dom ((- (arccos * f1)) `| Z) = dom f
by A1, A6, FDIFF_1:def 8;
then
(- (arccos * f1)) `| Z = f
by A14, PARTFUN1:34;
hence
integral f,A = ((- (arccos * f1)) . (sup A)) - ((- (arccos * f1)) . (inf A))
by A1, A2, A6, INTEGRA5:13; verum