题目内容
(2008•扬州二模)数列{an}的首项a1=1,前n项和为Sn,满足关系3tSn-(2t+3)Sn-1=3t(t>0,n=2,3,4…)
(1)求证:数列{an}为等比数列;
(2)设数列{an}的公比为f(t),作数列{bn},使b1=1,bn=f(
),(n=2,3,4…),求bn
(3)求Tn=(b1b2-b2b3)+(b3b4-b4b5)+…+(b2n-1b2n-b2nb2n+1)的值.
(1)求证:数列{an}为等比数列;
(2)设数列{an}的公比为f(t),作数列{bn},使b1=1,bn=f(
| 1 | bn-1 |
(3)求Tn=(b1b2-b2b3)+(b3b4-b4b5)+…+(b2n-1b2n-b2nb2n+1)的值.
分析:(1)由已知3tSn-(2t+3)Sn-1=3t,可得3tsn-1-(2t+3)sn-2=3t,两式相减可得数列an与an-1的递推关系,从而可证.
(2)把f(t)的解析式代入bn,进而可知bn=
+bn-1,判断出{bn}是一个首项为1,公差为
的等差数列.进而根据等差数列的通项公式求得答案.
(3){bn}是等差数列,用分组法求得数列的b1b2-b2b3+b3b4-…+b2n-1b2n-b2nb2n+1和.
(2)把f(t)的解析式代入bn,进而可知bn=
| 2 |
| 3 |
| 2 |
| 3 |
(3){bn}是等差数列,用分组法求得数列的b1b2-b2b3+b3b4-…+b2n-1b2n-b2nb2n+1和.
解答:(1)证:∵3tSn-(2t+3)Sn-1=3t,3tSn+1-(2t+3)Sn=3t(n≥2),两式相减得3tan+1-(2t+3)an=0
又t>0
∴
=
(n≥2),
又当n=2时,3tS2-(2t+3)S1=3t,
即3t(a1+a2)-(2t+3)a1=3t,得a2=
,
即
=
,
∴
=
(n≥1),
∴{an}为等比数列
(2)解:由已知得,f(t)=
∴bn=f(
)=
=
+bn-1(n≥2,n∈N*).
∴{bn}是一个首项为1,公差为
的等差数列.
于是bn=
n+
(3)解:Tn=b1b2-b2b3+b3b4-…+b2n-1b2n-b2nb2n+1?
=b2(b1-b3)+b4(b3-b5)+…+b2n(b2n-1-b2n+1)=-2(b2+b4+…+b2n)
=-2d(b2+b4+…+b2n)
=-2×
[
+
×
]
=-
-
又t>0
∴
| an+1 |
| an |
| 2t+3 |
| 3t |
又当n=2时,3tS2-(2t+3)S1=3t,
即3t(a1+a2)-(2t+3)a1=3t,得a2=
| 2t+3 |
| 3t |
即
| a2 |
| a1 |
| 2t+3 |
| 3t |
∴
| an+1 |
| an |
| 2t+3 |
| 3t |
∴{an}为等比数列
(2)解:由已知得,f(t)=
| 2t+3 |
| 3t |
∴bn=f(
| 1 |
| bn-1 |
3+
| ||
|
| 2 |
| 3 |
∴{bn}是一个首项为1,公差为
| 2 |
| 3 |
于是bn=
| 2 |
| 3 |
| 1 |
| 3 |
(3)解:Tn=b1b2-b2b3+b3b4-…+b2n-1b2n-b2nb2n+1?
=b2(b1-b3)+b4(b3-b5)+…+b2n(b2n-1-b2n+1)=-2(b2+b4+…+b2n)
=-2d(b2+b4+…+b2n)
=-2×
| 2 |
| 3 |
| 5n |
| 3 |
| n(n-1) |
| 2 |
| 4 |
| 3 |
=-
| 8n2 |
| 9 |
| 4n |
| 3 |
点评:本题主要考查了利用递推关系实现数列和与项的相互转化,进而求通项公式,等差数列的通项公式的运用,数列的求和,在解题中体现了分类讨论的思想.
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