题目
| 1 |
| f(x) |
答案
| 1 |
| f(x) |
∴f(x+2)=
| 1 |
| f(x+1) |
| 1 | ||
|
∵8<9<16,2>1
∴log28<log29<log216,即log29∈(3,4)
因此f(log29)=f(log29-2)=f(log2
| 9 |
| 4 |
∵f(log2
| 9 |
| 4 |
| 1 | ||
f(log2
|
| 1 | ||
f(log 2
|
而f(log2
| 9 |
| 8 |
| 9 |
| 8 |
| 9 |
| 8 |
∴f(log29)=f(log2
| 9 |
| 4 |
| 1 | ||
f(log 2
|
| 8 |
| 9 |
故答案为:
| 8 |
| 9 |
已知定义在R上的函数f(x)满足:f(x+1)=
∴f(x+2)=
∵8<9<16,2>1
∴log28<log29<log216,即log29∈(3,4)
因此f(log29)=f(log29-2)=f(log2
∵f(log2
而f(log2
∴f(log29)=f(log2
故答案为: