题目内容
设函数f(x)=
为奇函数,g(x)=f(x)+loga(x-1)(ax+1)( a>1,且m≠1).
(1)求m值;
(2)求g(x)的定义域;
(3)若g(x)在[-
,-
]上恒正,求a的取值范围.
| 1og |
|
(1)求m值;
(2)求g(x)的定义域;
(3)若g(x)在[-
| 5 |
| 2 |
| 3 |
| 2 |
(1)f(x)是奇函数,f(x)=-f(-x)=-loga
=loga
∴
=
,x2-1=(mx)2-1
∴(m2-1)x2=0,又m≠1
∴m=-1;
(2)由(1)f(x)=loga
,g(x)=loga
+loga[(x-1)(ax+1)]
x必须满足
∴x<-1或x>1(a>1,-
>-1)
∴g(x)的定义域为{x:x<-1或x>1}
(3)∵a>1,g(x)在[-
,-
]上恒正,
即(x+1)(ax+1)>1
∴ax+1<
∴ax<-
∴a>-
∵x∈[-
,-
]∴-
≤-
=2∴a>2
∴a的取值范围是(2,+∞).
| 1+mx |
| -x-1 |
| -x-1 |
| 1+mx |
∴
| 1-mx |
| x-1 |
| -x-1 |
| 1+mx |
∴(m2-1)x2=0,又m≠1
∴m=-1;
(2)由(1)f(x)=loga
| x+1 |
| x-1 |
| x+1 |
| x-1 |
x必须满足
|
∴x<-1或x>1(a>1,-
| 1 |
| a |
∴g(x)的定义域为{x:x<-1或x>1}
(3)∵a>1,g(x)在[-
| 5 |
| 2 |
| 3 |
| 2 |
即(x+1)(ax+1)>1
∴ax+1<
| 1 |
| x+1 |
| x |
| x+1 |
| 1 |
| x+1 |
∵x∈[-
| 5 |
| 2 |
| 3 |
| 2 |
| 1 |
| x+1 |
| 1 | ||
(-
|
∴a的取值范围是(2,+∞).
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