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①方程x2?(m?1)x?m?0无解,即??0,解得3?22?m?3?22; ②方程x2?(m?1)x?m?0有解,两根均在??1,0?内, 令g(x)?x2?(m?1)x?m
???0,?g(?1)?0,??m?3?22或m?3?22,? 则有?g(0)?0, 即? 无解.
?1?m?3,???1?1?m?0,?2? 综合①、②,实数m的取值范围是3?22?m?3?22 21、(本题满分12分)
解:(1)①若1?a?0,则a??1.
(i)当a?1时,f(x)?6,定义域为R,符合要求. (ii)当a??1时,f(x)?6x?6,定义域不为R.
22 ②若1?a?0,g(x)=(1?a)x?3(1?a)x?6为二次函数,
22 ∵f(x)定义域为R,∴g(x)?0对任意x?R恒成立.
2???1?a?1,5?1?a?0,????a?1. ∴??22(a?1)(11a?5)?0,11???9(1?a)?24(1?a)?0,?? 综合①②得,实数a的取值范围是??(2)∵f(x)的值域为[0,??),
?5?,1? ?11? ∴函数 g(x)=(1?a)x?3(1?a)x?6取一切非负实数.
2???1?a?1,5?1?a?0,???1?a??. ∴??22(a?1)(11a?5)?0,11?????9(1?a)?24(1?a)?0,22 当a??1时,f(x)?6x?6的值域是[0,??),符合题意. 故所求实数a的取值范围是??1,???5? . ?11?22.解:(1)∵定义域{x| x ≠ kπ,k∈Z }关于原点对称,
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f (a)·f (x)+11+f (x)
1+1+
f (x)-f (a) f (x)-1f (a-x)·f (a)+11+f (a-x)
又f(? x) = f (a [? x) ? a]= = = =
f (a)-f (a-x)1-f (a-x)f (a)·f (x)+11+f (x)
1-1-
f (x)-f (a) f (x)-1
=
2f (x)
= ? f (x),对于定义域内的每个x值都成立 -2
∴f(x)为奇函数???????4分
(1) 先证明f(x)在[2a,3a]上单调递减,
为此,必须证明x∈(2a,3a)时,f(x) < 0, 设2a < x < 3a,则0 < x ? 2a < a, ∴ f(x ? 2a)=
f (2a)·f (x)+11
= ? > 0,∴ f(x)< 0????2分
f (2a)-f (x)f (x)
设2a < x1 < x2 < 3a,
则0 < x2 ? x1 < a,∴ f(x1)< 0 , f(x2)< 0 , f(x2 ? x1)> 0, ∴ f(x1)- f(x2)= f (x1)·f (x2)+1
> 0,∴ f(x1)> f(x2),
f (x2-x1)
∴ f(x)在[2a,3a]上单调递减 ??????? 6分
∴f(x)max=f(2a)= f(a + a)= f [a ?(? a)]=
f (a)·f (-a)+1
f (-a)-f (a)
2
1-f (a)= = 0, -2f (a)
f (2a)·f (-a)+1
f(x)min= f(3a)= f(2a + a)= f [2a ?(? a)]=
f (-a)-f (2a)
=
???????12分
1
= ? 1.
-f (a)
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