【答案】(1)奇函數(shù)�,增函數(shù)���;(2)
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【解析】
(1)運(yùn)用奇偶性的定義和單調(diào)性的定義,即可判斷���;
(2)運(yùn)用(1)的結(jié)論�����,f(x2﹣2x+2)+f(﹣5)<0即為f(x2﹣2x+2)<﹣f(﹣5)=f(5)���,得x2﹣2x+2<5,解出即可.
(1)∵f(﹣x)
f(x)�,∴f(x)是奇函數(shù).
∵f(x)
1
,在R上任取x1��,x2�,且x1<x2,
f(x1)﹣f(x2)
�,
∵x1<x2,∴
��,
�,
即有f(x1)<f(x2)�����,則f(x)在R上是增函數(shù).
(2)由(1)得f(x)是奇函數(shù)�����,
且f(x)在R上是增函數(shù).
則f(x2﹣2x+2)+f(﹣5)<0即為f(x2﹣2x+2)<﹣f(﹣5)=f(5)�,
得x2﹣2x+2<5����,即有x2﹣2x﹣3<0,
解得﹣1<x<3�,則不等式解集為(﹣1,3).
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