题文
设函数f(x)=![设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证](https://www.mshxw.com/file/tupian/20211020/6ac2f2ab0e5463aa0ca17020f17b0685.png "设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证")
a为常数且a∈(0,1).
(1)当a=
![设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证](https://www.mshxw.com/file/tupian/20211020/cf208baa50bb5da5ed3b5ff4610205fd.png "设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证")
时,求f
![设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证](https://www.mshxw.com/file/tupian/20211020/25f2e3b73972c19de2130a3f1cbb836a.png "设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证")
;
(2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证明函数f(x)有且仅有两个二阶周期点,并求二阶周期点x1,x2;
(3)对于(2)中的x1,x2,设A(x1,f[f(x1)]),B(x2,f[f(x2)]),C(a2,0),记△ABC的面积为S(a),求S(a)在区间[
![设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证](https://www.mshxw.com/file/tupian/20211020/a3231c6a31b976ec61d28fa0553bf932.png "设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证")
,
]上的最大值和最小值. 题型:未知 难度:其他题型
答案
(1)![设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证](https://www.mshxw.com/file/tupian/20211020/31941d4182ec5c62bf179c7019395c00.png "设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证")
(2)见解析,x1=
![设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证](https://www.mshxw.com/file/tupian/20211020/3f384a8d7f4f6a51e72f278d1f9c012e.png "设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证")
,x2=
![设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证](https://www.mshxw.com/file/tupian/20211020/98d7ec919998973faefd9269a6df2ff0.png "设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证")
(3)最小值为
![设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证](https://www.mshxw.com/file/tupian/20211020/a15a6c0da6e5bc3c2ed0d189d811212b.png "设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证")
,最大值为
![设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证](https://www.mshxw.com/file/tupian/20211020/4ab8d496d6d73d714145c4cd4c877952.png "设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证")
解析
(1)当a=时,f
![设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证](https://www.mshxw.com/file/tupian/20211020/8ae679c3fbb058439c24e4bab7ab7f40.png "设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证")
=
,f
=f
![设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证](https://www.mshxw.com/file/tupian/20211020/6f7dd276773c990b9467bac98cab3a6a.png "设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证")
=2
![设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证](https://www.mshxw.com/file/tupian/20211020/ce12c39189c9b206ee1f871acbd52091.png "设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证")
=
.
(2)证明:f[f(x)]=
![设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证](https://www.mshxw.com/file/tupian/20211020/84c8b8f5d47c336e3e98424e34815199.png "设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证")
当0≤x≤a2时,由
![设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证](https://www.mshxw.com/file/tupian/20211020/421284721bc25572322a5f7c199fb51f.png "设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证")
x=x解得x=0,由于f(0)=0,故x=0不是f(x)的二阶周期点;
当a2
![设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证](http://i2.yixuela.com/6d303e5c74f8496400f0ef942d65fc26.png "设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证")
(a-x)=x解得x=
∈(a2,a),因为f
![设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证](https://www.mshxw.com/file/tupian/20211020/09d237e61228bccc1bfcaaf144867139.png "设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证")
=
![设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证](https://www.mshxw.com/file/tupian/20211020/753f140486d038c28408541a93da802a.png "设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证")
·
=
≠
,故x=
是f(x)的二阶周期点;
当a
![设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证](https://www.mshxw.com/file/tupian/20211020/3bb4426b91e7247595cd3f2588efe81b.png "设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证")
(x-a)=x解得x=
![设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证](https://www.mshxw.com/file/tupian/20211020/ed2724394123e5ed148a5f4d435959b7.png "设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证")
∈(a,a2-a+1),
因为f
![设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证](https://www.mshxw.com/file/tupian/20211020/96521071c152dc99272cad9d20f8d65e.png "设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证")
=
![设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证](https://www.mshxw.com/file/tupian/20211020/b09bdc6000f8bf2e9f0dfccdc38eaf5a.png "设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证")
·
![设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证](https://www.mshxw.com/file/tupian/20211020/9c85fe33cfdb84ef3164e030d3cbb3b9.png "设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证")
=
,故x=
不是f(x)的二阶周期点;
当a2-a+1≤x≤1时,由
![设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证](https://www.mshxw.com/file/tupian/20211020/f4cb29ed5534376625eb0b70bc12eb10.png "设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证")
(1-x)=x解得x=
∈(a2-a+1,1),因为f
=
·
![设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证](https://www.mshxw.com/file/tupian/20211020/f55ae1ef8d1e4d27e15f61bfc9e523b9.png "设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证")
=
≠
,故x=
是f(x)的二阶周期点.
因此,函数f(x)有且仅有两个二阶周期点,x1=
,x2=
.
(3)由(2)得A(
,
),B(
,
),则S(a)=
![设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证](https://www.mshxw.com/file/tupian/20211020/008b66e7e01ae0e011f13aa106d58f81.png "设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证")
,
S′(a)=
·
![设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证](https://www.mshxw.com/file/tupian/20211020/264a0f0770bd1877d7983f8bbdaea6ae.png "设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证")
.
因为a∈[
,
],有a2+a<1,所以S′(a)=
·
=
·
![设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证](https://www.mshxw.com/file/tupian/20211020/f269615ac66524e960035f3aebdb3467.png "设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证")
>0.(或令g(a)=a3-2a2-2a+2,g′(a)=3a2-4a-2=3(a-
![设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证](https://www.mshxw.com/file/tupian/20211020/084f86305c0674cf7867070791ba449c.png "设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证")
)(a-
![设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证](https://www.mshxw.com/file/tupian/20211020/93770913b431a19e8ab946994229a83e.png "设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证")
),
因为a∈(0,1),所以g′(a)<0,则g(a)在区间[
,
]上最小值为g(
)=
![设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证](https://www.mshxw.com/file/tupian/20211020/815ebd709a740b8498efaadf90ad01cf.png "设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证")
>0,故对于任意a∈[
,
],g(a)=a3-2a2-2a+2>0,S′(a)=
·
>0)则S(a)在区间[
,
]上单调递增,故S(a)在区间[
,
]上的最小值为S(
)=
,最大值为S(
)=
.
考点
据考高分专家说,试题“设函数f(x)=a为常数且a∈(0,1).....”主要考查你对 [函数的单调性、最值 ]考点的理解。 函数的单调性、最值单调性的定义:
1、对于给定区间D上的函数f(x),若对于任意x1,x2∈D,当x1<x2时,都有f(x1)<f(x2),则称f(x)是区间上的增函数;当x1<x2时,都有f(x1)>f(x2),则称f(x)是区间D上的减函数。
2、如果函数y=f(x)在区间上是增函数或减函数,就说函数y=f(x)在区间D上具有(严格的)单调性,区间D称为函数f(x)的单调区间。如果函数y=f(x)在区间D上是增函数或减函数,区间D称为函数f(x)的单调增或减区间
3、最值的定义:
最大值:一般地,设函数y=f(x)的定义域为I,如果存在实数M,满足: ①对于任意的x∈I,都有f(x)≤M;②存在x0∈I,使得f(x0)=M;那么,称M是f(x)的最大值.
最小值:一般地,设函数y=f(x)的定义域为I,如果存在实数M,满足: ①对于任意的x∈I,都有f(x)≥M;②存在x0∈I,使得f(x0)=M;那么,称M是f(x)的最小值
判断函数f(x)在区间D上的单调性的方法:
(1)定义法:其步骤是:
①任取x1,x2∈D,且x1<x2;
②作差f(x1)-f(x2)或作商![设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证](https://www.mshxw.com/file/tupian/20211020/FlraY2WTBYxJWdfybu1zT0CM9toU.png "设函数f(x)=a为常数且a∈(0,1).(1)当a=时,求f; (2)若x0满足f[f(x0)]=x0,但f(x0)≠x0,则称x0为f(x)的二阶周期点.证")
,并变形;
③判定f(x1)-f(x2)的符号,或比较
与1的大小;
④根据定义作出结论。
(2)复合法:利用基本函数的单调性的复合。
(3)图象法:即观察函数在区间D上部分的图象从左往右看是上升的还是下降的。
