theorem
for
a,
b,
c,
d being
Real for
n being non
zero Element of
NAT for
f being
PartFunc of
REAL,
(REAL n) st
a <= b &
c <= d &
f is_integrable_on ['a,b'] &
|.f.| is_integrable_on ['a,b'] &
f | ['a,b'] is
bounded &
['a,b'] c= dom f &
c in ['a,b'] &
d in ['a,b'] holds
(
|.f.| is_integrable_on ['c,d'] &
|.f.| | ['c,d'] is
bounded &
|.(integral (f,c,d)).| <= integral (
|.f.|,
c,
d) &
|.(integral (f,d,c)).| <= integral (
|.f.|,
c,
d) )
by Lm11, Lm12;