题目
(1)求函数f(x)的单调区间;
(2)若f(x)≤0恒成立,试确定实数k的取值范围;
(3)证明:
| 1n2 |
| 3 |
| 1n3 |
| 4 |
| 1n4 |
| 5 |
| 1nn |
| n+1 |
| n(n-1) |
| 4 |
答案
∴x>1,f′(x)=
| 1 |
| x-1 |
∵x>1,∴当k≤1时,f′(x)=
| 1 |
| x-1 |
当k>0时,f(x)在(1,1+
| 1 |
| k |
| 1 |
| k |
(2)∵f(x)≤0恒成立,
∴∀x>1,ln(x-1)-k(x1)+1≤0,
∴∀x>1,ln(x-1)≤k(x-1)-1,
∴k>0.
由(1)知,f(x)max=f(1+
| 1 |
| k |
| 1 |
| k |
解得k≥1.
故实数k的取值范围是[1,+∞).
(3)令k=1,则由(2)知:ln(x-1)≤x-2对x∈(1,+∞)恒成立,
即lnx≤x-1对x∈(0,+∞)恒成立.
取x=n2,则2lnn≤n2-1,
即
| lnn |
| n+1 |
| n-1 |
| 2 |
∴
| 1n2 |
| 3 |
| 1n3 |
| 4 |
| 1n4 |
| 5 |
| 1nn |
| n+1 |
| n(n-1) |
| 4 |