题目内容
已知正项数列{an}的前n项和sn=| an2+an |
| 2 |
| 1 |
| 2an |
(Ⅰ)求数列{an}的通项公式;
(Ⅱ)定理:若函数f(x)在区间D上是凹函数,且f'(x)存在,则当x1>x2(x1,x2∈D)时,总有
| f(x1)-f(x2) |
| x1-x2 |
(Ⅲ)求证:
| 3 |
| 2 |
分析:(Ⅰ)先利用an与Sn关系式变形得到an-an-1=1.所以数列{an}是以1为首项,1为公差的等差数列.即可求出an=n
(Ⅱ)先求出bn,可令x1=1+
,x2=1+
,再根据凹函数的定义得x1n<x2n+1,即bn<bn+1.
(Ⅲ)利用放缩法可证明,即先证明
•(
)r ≤(
)r,bn=(1+
)n=1+
(
)r≤1+
+(
)2+…+(
)n=2-(
)n<2,再利用(2)中的结论bn<bn+1.可证得bn=(1+
)n≥
.
(Ⅱ)先求出bn,可令x1=1+
| 1 |
| 2n |
| 1 |
| 2(n+1) |
(Ⅲ)利用放缩法可证明,即先证明
| C | n r |
| 1 |
| 2n |
| 1 |
| 2 |
| 1 |
| 2n |
| n |
 |
| r=1 |
| C | n r |
| 1 |
| 2n |
| 1 |
| 2 |
| 1 |
| 2 |
| 1 |
| 2 |
| 1 |
| 2 |
| 1 |
| 2n |
| 3 |
| 2 |
解答:解:(Ⅰ)n=1时,a1=s1=
⇒a1=0或a1=1.
由于{an}是正项数列,所以a1=1.
当n≥2时,an=sn-sn-1=
-
,
整理,得an+an-1=(an+an-1)(an-an-1).
由于{an}是正项数列,∴an-an-1=1.
∴数列{an}是以1为首项,1为公差的等差数列.
从而an=n,当n=1时也满足.
∴an=n(n∈N*).(4分)
(Ⅱ)由(Ⅰ)知bn=(1+
)n.
对于(0,+∞)上的凹函数y=xn+1,有y'=(n+1)xn.
根据定理,得
<(n+1)x1n.(6分)
整理,得x1n[(n+1)x2-nx1]<x2n+1.
令x1=1+
,x2=1+
,得(n+1)x2-nx1=1.(8分)
∴x1n<x2n+1,即(1+
)n<[1+
]n+1.
∴bn<bn+1.(10分)
(Ⅲ)∵
•(
)r=
•
•
•
(
)r≤(
)r,
∴bn=(1+
)n=1+
(
)r≤1+
+(
)2+…+(
)n=2-(
)n<2.
又由(Ⅱ),得bn>bn-1>…>b2>b1=
.
(或bn=(1+
)n=1+
+
(
)r≥
.)
∴
≤bn<2.(14分)
| a12+a1 |
| 2 |
由于{an}是正项数列,所以a1=1.
当n≥2时,an=sn-sn-1=
| an2+an |
| 2 |
| an-12+an-1 |
| 2 |
整理,得an+an-1=(an+an-1)(an-an-1).
由于{an}是正项数列,∴an-an-1=1.
∴数列{an}是以1为首项,1为公差的等差数列.
从而an=n,当n=1时也满足.
∴an=n(n∈N*).(4分)
(Ⅱ)由(Ⅰ)知bn=(1+
| 1 |
| 2n |
对于(0,+∞)上的凹函数y=xn+1,有y'=(n+1)xn.
根据定理,得
| x1n+1-x2n+1 |
| x1-x2 |
整理,得x1n[(n+1)x2-nx1]<x2n+1.
令x1=1+
| 1 |
| 2n |
| 1 |
| 2(n+1) |
∴x1n<x2n+1,即(1+
| 1 |
| 2n |
| 1 |
| 2(n+1) |
∴bn<bn+1.(10分)
(Ⅲ)∵
| C | r n |
| 1 |
| 2n |
| n |
| n |
| n-1 |
| n |
| n-r+1 |
| n |
| 1 |
| r |
| 1 |
| 2 |
| 1 |
| 2 |
∴bn=(1+
| 1 |
| 2n |
| n |
|
| r=1 |
| C | r n |
| 1 |
| 2n |
| 1 |
| 2 |
| 1 |
| 2 |
| 1 |
| 2 |
| 1 |
| 2 |
又由(Ⅱ),得bn>bn-1>…>b2>b1=
| 3 |
| 2 |
(或bn=(1+
| 1 |
| 2n |
| 1 |
| 2 |
| n |
|
| r=2 |
| C | r n |
| 1 |
| 2n |
| 3 |
| 2 |
∴
| 3 |
| 2 |
点评:此题考查等差数列的定义,及用放缩法证明不等式.
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