let a, b, c, d, e be real number ; :: thesis: for f being PartFunc of REAL ,REAL st a <= b & c <= d & f is_integrable_on ['a,b'] & f | ['a,b'] is bounded & ['a,b'] c= dom f & c in ['a,b'] & d in ['a,b'] & ( for x being real number st x in ['c,d'] holds
abs (f . x) <= e ) holds
abs (integral f,d,c) <= e * (d - c)
let f be PartFunc of REAL ,REAL ; :: thesis: ( a <= b & c <= d & f is_integrable_on ['a,b'] & f | ['a,b'] is bounded & ['a,b'] c= dom f & c in ['a,b'] & d in ['a,b'] & ( for x being real number st x in ['c,d'] holds
abs (f . x) <= e ) implies abs (integral f,d,c) <= e * (d - c) )
assume that
A1: a <= b and
A2: c <= d and
A3: ( f is_integrable_on ['a,b'] & f | ['a,b'] is bounded & ['a,b'] c= dom f & c in ['a,b'] ) and
A4: d in ['a,b'] and
A5: for x being real number st x in ['c,d'] holds
abs (f . x) <= e ; :: thesis: abs (integral f,d,c) <= e * (d - c)
A6: ( abs (integral f,c,d) <= e * (d - c) & integral f,c,d = integral f,['c,d'] ) by A1, A2, A3, A4, A5, Lm9, INTEGRA5:def 5;