题目
| ax-1 |
| x+1 |
(1)当a=1时,求满足f(x)>2的x的集合
(2)求a的取值范围,使f(x)在区间(0,+∞)上是单调递增函数.
答案
| x-1 |
| x+1 |
| x+3 |
| x+1 |
(2)设0<x1<x2,则f(x1)-f(x2)=
| ax1-1 |
| x1+1 |
| ax2-1 |
| x2+1 |
| (a+1)(x1-x2) |
| (x1+1)(x2+1) |
|
∴使f(x)在区间(0,+∞)上是单调递增函数,a>1.
设函数f(x)=ax-1x+1(a∈R).
(1)当a=1时,求满足f(x)>2的x的集合
(2)求a的取值范围,使f(x)在区间(0,+∞)上是单调递增函数.
(2)设0<x1<x2,则f(x1)-f(x2)=
∴使f(x)在区间(0,+∞)上是单调递增函数,a>1.