题目内容
(文)已知数列{an}满足a1=2,前n项和为Sn,an+1=
.
(1)若数列{bn}满足bn=a2n+a2n+1(n≥1),试求数列{bn}前3项的和T3;
(2)若数列{cn}满足cn=a2n,p=
,求证:{cn}是为等比数列;
(3)当p=
时,对任意n∈N*,不等式S2n+1≤log
(x2+3x)都成立,求x的取值范围.
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(1)若数列{bn}满足bn=a2n+a2n+1(n≥1),试求数列{bn}前3项的和T3;
(2)若数列{cn}满足cn=a2n,p=
| 1 |
| 2 |
(3)当p=
| 1 |
| 2 |
| 1 |
| 2 |
分析:(1)由已知bn=a2n+a2n+1(n≥1),结合 an+1=
可得数列{bn}是一个等差数列,利用求和公式即可求解
(2)当p=
时,由cn+1=a2n+2=
p2n+1+2n=
(-a2n-4n)+2n=-
cn可证
(3):由(2)可知,bn=a2n+a2n+1=-4n,所以{bn}成等差数列,p=
时a2n=cn=(-
)n-1,则S2n+1=a1+(a2+a3)+(a4+a5)+…+(a2n+a2n+1)S2n+1=a1+b1+b2+…+bn=-2n2-2n+2(n≥1),结合{S2n+1}单调性可求最大值,而S2n+1≤log
(x2+3x)都成立,即S2n+1最大值≤log
(x2+3x),解不等式可求x
|
(2)当p=
| 1 |
| 2 |
| 1 |
| 2 |
| 1 |
| 2 |
| 1 |
| 2 |
(3):由(2)可知,bn=a2n+a2n+1=-4n,所以{bn}成等差数列,p=
| 1 |
| 2 |
| 1 |
| 2 |
| 1 |
| 2 |
| 1 |
| 2 |
解答:解:(1)据题意得bn=a2n+a2n+1=a2n-a2n-2×2n=-4n,
所以{bn}成等差数列,故Tn=
•n=-2n(n+1)(4分)
∴T3=-24
证明:(2)因为cn+1=a2n+2=
p2n+1+2n=
(-a2n-4n)+2n=-
cn
所以
=-
故当p=
时,数列{cn}是首项为1,公比为-
等比数列;
∴Cn=(-
)n-1
解:(3)bn=a2n+a2n+1=-4n,所以{bn}成等差数列
∵当p=
时a2n=cn=(-
)n-1
因为S2n+1=a1+(a2+a3)+(a4+a5)+…+(a2n+a2n+1)
=a1+b1+b2+…+bn
=2+(-4-8-12-…-4n)=2-
•n
=-2n2-2n+2(n≥1)
又S2n+3-S2n+1=-4n-4<0
所以{S2n+1}单调递减
当n=1时,S3最大为-2
所以-2≤log
(x2+3x)
∴
⇒x∈[-4,-3)∪(0,1]
所以{bn}成等差数列,故Tn=
| -4-4n |
| 2 |
∴T3=-24
证明:(2)因为cn+1=a2n+2=
| 1 |
| 2 |
| 1 |
| 2 |
| 1 |
| 2 |
所以
| cn+1 |
| cn |
| 1 |
| 2 |
故当p=
| 1 |
| 2 |
| 1 |
| 2 |
∴Cn=(-
| 1 |
| 2 |
解:(3)bn=a2n+a2n+1=-4n,所以{bn}成等差数列
∵当p=
| 1 |
| 2 |
| 1 |
| 2 |
因为S2n+1=a1+(a2+a3)+(a4+a5)+…+(a2n+a2n+1)
=a1+b1+b2+…+bn
=2+(-4-8-12-…-4n)=2-
| 4+4n |
| 2 |
=-2n2-2n+2(n≥1)
又S2n+3-S2n+1=-4n-4<0
所以{S2n+1}单调递减
当n=1时,S3最大为-2
所以-2≤log
| 1 |
| 2 |
∴
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点评:本题考查的知识点是等比关系的确定,数列的求和,其中熟练掌握等差数列、等比数列的定义,能熟练的判断一个数列是否为等差(比)数列是解答本题的关键.
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