let a, b, c, d be real number ; 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'] holds
( ['c,d'] c= dom (abs f) & abs f is_integrable_on ['c,d'] & (abs f) | ['c,d'] is bounded & abs (integral f,c,d) <= integral (abs f),c,d )
let f be PartFunc of REAL ,REAL ; ( 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'] implies ( ['c,d'] c= dom (abs f) & abs f is_integrable_on ['c,d'] & (abs f) | ['c,d'] is bounded & abs (integral f,c,d) <= integral (abs f),c,d ) )
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'] & d in ['a,b'] )
; ( ['c,d'] c= dom (abs f) & abs f is_integrable_on ['c,d'] & (abs f) | ['c,d'] is bounded & abs (integral f,c,d) <= integral (abs f),c,d )
( min c,d = c & max c,d = d )
by A2, XXREAL_0:def 9, XXREAL_0:def 10;
hence
( ['c,d'] c= dom (abs f) & abs f is_integrable_on ['c,d'] & (abs f) | ['c,d'] is bounded & abs (integral f,c,d) <= integral (abs f),c,d )
by A1, A3, Th21; verum