let A be closed-interval Subset of REAL ; :: thesis: for Z being open Subset of REAL
for f being PartFunc of REAL ,REAL st A c= Z & ( for x being Real st x in Z holds
f . x = ((cos . x) - ((sin . x) ^2 )) / ((sin . x) ^2 ) ) & Z c= dom ((- cosec ) - (id Z)) & Z = dom f & f | A is continuous holds
integral f,A = (((- cosec ) - (id Z)) . (sup A)) - (((- cosec ) - (id Z)) . (inf A))
let Z be open Subset of REAL ; :: thesis: for f being PartFunc of REAL ,REAL st A c= Z & ( for x being Real st x in Z holds
f . x = ((cos . x) - ((sin . x) ^2 )) / ((sin . x) ^2 ) ) & Z c= dom ((- cosec ) - (id Z)) & Z = dom f & f | A is continuous holds
integral f,A = (((- cosec ) - (id Z)) . (sup A)) - (((- cosec ) - (id Z)) . (inf A))
let f be PartFunc of REAL ,REAL ; :: thesis: ( A c= Z & ( for x being Real st x in Z holds
f . x = ((cos . x) - ((sin . x) ^2 )) / ((sin . x) ^2 ) ) & Z c= dom ((- cosec ) - (id Z)) & Z = dom f & f | A is continuous implies integral f,A = (((- cosec ) - (id Z)) . (sup A)) - (((- cosec ) - (id Z)) . (inf A)) )
assume A1: ( A c= Z & ( for x being Real st x in Z holds
f . x = ((cos . x) - ((sin . x) ^2 )) / ((sin . x) ^2 ) ) & Z c= dom ((- cosec ) - (id Z)) & Z = dom f & f | A is continuous ) ; :: thesis: integral f,A = (((- cosec ) - (id Z)) . (sup A)) - (((- cosec ) - (id Z)) . (inf A))
then A2: ( f is_integrable_on A & f | A is bounded ) by INTEGRA5:10, INTEGRA5:11;
A3: (- cosec ) - (id Z) is_differentiable_on Z by A1, FDIFF_9:23;
A4: for x being Real st x in dom (((- cosec ) - (id Z)) `| Z) holds
(((- cosec ) - (id Z)) `| Z) . x = f . x dom (((- cosec ) - (id Z)) `| Z) = dom f by A1, A3, FDIFF_1:def 8;
then ((- cosec ) - (id Z)) `| Z = f by A4, PARTFUN1:34;
hence integral f,A = (((- cosec ) - (id Z)) . (sup A)) - (((- cosec ) - (id Z)) . (inf A)) by A1, A2, FDIFF_9:23, INTEGRA5:13; :: thesis: verum