M(x)?max(f(x),g(x)),?m(x)?min(f(x),g(x))
在[a,b]上也是可积的.
4.设f(x)在[a,b]上可积,且f(x)?r?0,求证:
(1)
1在[a,b]可积; f(x) (2) lnf(x)在[a,b]可积.
5.设f(x)在[a,b]可积,求证:任给??0,存在逐段为常数的函数?(x),使
?ba|f(x)??(x)|dx?? . 6.设f(x)在[a,b]上有界,定义
?f[a,b]?supf(x)?inff(x),
x?[a,b]x?[a,b] 求证
?f[a,b]?sup|f(x')?f(x'')|.
x',x''?[a,b] 7.设f(x)在x0附近有定义且有界,定义
?f(x0)?lim?x0?,x0??.
n???nn? 求证:f(x)在x0连续的充分必要条件为?f(x0)?0. 8.若函数f(x)在[A,B]可积,证明:
??11?lim?|f(x?h)?f(x)|dx?0,
h?0ab 其中A?a?b?B (这一性质称为积分的连续性).
9.f(x)?0,?f''(x)?0,对任意省仨x?[a,b]成立,求证:
f(x)?2bf(x)dx. ?ab?a 10.设f(x)在[a,b]有连续的导函数,求证:
b1bmax|f(x)|?|f(x)dx|??|f'(x)|dx.
aa?x?bb?a?a 11.设f(x)在[a,b]可积,求证;存在连续函数序列?n(x),??n?1,2,?,使
lim??n(x)dx??f(x)dx.
n??aabb 12.设f(x)在[a,b]黎曼可积,求证: (1) 存在区间序列{[a,b]}使
[an?1,bn?1]?(an,bn)?(a,b),
且?f([an,bn])?1; n (2) 存在c??[a,b],使得f(x)在c点连续;
nnn?1? (3) f(x)在[a,b]上有无穷多个连续点.