题文
设数列{an}满足a1+2a2=3,且对任意的n∈N*,点列{P(n,an)}恒满足![设数列{an}满足a1+2a2=3,且对任意的n∈N*,点列{P}恒满足,则数列{an}的前n项和Sn为 [ ]](https://www.mshxw.com/file/tupian/20210919/661c0203d48c5308478bc6b2f9ab3a95.gif "设数列{an}满足a1+2a2=3,且对任意的n∈N*,点列{P}恒满足,则数列{an}的前n项和Sn为 [ ]")
,则数列{an}的前n项和Sn为 [ ]
A.n(n-![设数列{an}满足a1+2a2=3,且对任意的n∈N*,点列{P}恒满足,则数列{an}的前n项和Sn为 [ ]](https://www.mshxw.com/file/tupian/20210919/7040caf1169ac467f0dea0b74c267eb3.gif "设数列{an}满足a1+2a2=3,且对任意的n∈N*,点列{P}恒满足,则数列{an}的前n项和Sn为 [ ]")
)
B.n(n-![设数列{an}满足a1+2a2=3,且对任意的n∈N*,点列{P}恒满足,则数列{an}的前n项和Sn为 [ ]](https://www.mshxw.com/file/tupian/20210919/53c8a096dae2e72096eaf690699ee21b.gif "设数列{an}满足a1+2a2=3,且对任意的n∈N*,点列{P}恒满足,则数列{an}的前n项和Sn为 [ ]")
)
C.n(n-![设数列{an}满足a1+2a2=3,且对任意的n∈N*,点列{P}恒满足,则数列{an}的前n项和Sn为 [ ]](https://www.mshxw.com/file/tupian/20210919/4234c3687bc30cfe6b5373e3643e9e36.gif "设数列{an}满足a1+2a2=3,且对任意的n∈N*,点列{P}恒满足,则数列{an}的前n项和Sn为 [ ]")
)
D.n(n-![设数列{an}满足a1+2a2=3,且对任意的n∈N*,点列{P}恒满足,则数列{an}的前n项和Sn为 [ ]](https://www.mshxw.com/file/tupian/20210919/b7f83848d533ab45e4f6a29a449cc22b.gif "设数列{an}满足a1+2a2=3,且对任意的n∈N*,点列{P}恒满足,则数列{an}的前n项和Sn为 [ ]")
)
答案
A解析
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考点
据考高分专家说,试题“设数列{an}满足a1+2a.....”主要考查你对 [数列求和的其他方法(倒序相加,错位相减,裂项相加等) ]考点的理解。 数列求和的其他方法(倒序相加,错位相减,裂项相加等)数列求和的常用方法:
1.裂项相加法:数列中的项形如![设数列{an}满足a1+2a2=3,且对任意的n∈N*,点列{P}恒满足,则数列{an}的前n项和Sn为 [ ]](https://www.mshxw.com/file/tupian/20210919/20120829164120764634.png "设数列{an}满足a1+2a2=3,且对任意的n∈N*,点列{P}恒满足,则数列{an}的前n项和Sn为 [ ]")
的形式,可以把![设数列{an}满足a1+2a2=3,且对任意的n∈N*,点列{P}恒满足,则数列{an}的前n项和Sn为 [ ]](https://www.mshxw.com/file/tupian/20210919/20120829164120782634.png "设数列{an}满足a1+2a2=3,且对任意的n∈N*,点列{P}恒满足,则数列{an}的前n项和Sn为 [ ]")
表示为![设数列{an}满足a1+2a2=3,且对任意的n∈N*,点列{P}恒满足,则数列{an}的前n项和Sn为 [ ]](https://www.mshxw.com/file/tupian/20210919/20120829164120801677.png "设数列{an}满足a1+2a2=3,且对任意的n∈N*,点列{P}恒满足,则数列{an}的前n项和Sn为 [ ]")
,累加时抵消中间的许多项,从而求得数列的和;
2、错位相减法:源于等比数列前n项和公式的推导,对于形如![设数列{an}满足a1+2a2=3,且对任意的n∈N*,点列{P}恒满足,则数列{an}的前n项和Sn为 [ ]](https://www.mshxw.com/file/tupian/20210919/20120829164120819477.png "设数列{an}满足a1+2a2=3,且对任意的n∈N*,点列{P}恒满足,则数列{an}的前n项和Sn为 [ ]")
的数列,其中![设数列{an}满足a1+2a2=3,且对任意的n∈N*,点列{P}恒满足,则数列{an}的前n项和Sn为 [ ]](https://www.mshxw.com/file/tupian/20210919/20111028135815001.gif "设数列{an}满足a1+2a2=3,且对任意的n∈N*,点列{P}恒满足,则数列{an}的前n项和Sn为 [ ]")
为等差数列,![设数列{an}满足a1+2a2=3,且对任意的n∈N*,点列{P}恒满足,则数列{an}的前n项和Sn为 [ ]](https://www.mshxw.com/file/tupian/20210919/20111028135830001.gif "设数列{an}满足a1+2a2=3,且对任意的n∈N*,点列{P}恒满足,则数列{an}的前n项和Sn为 [ ]")
为等比数列,均可用此法;
3、倒序相加法:此方法源于等差数列前n项和公式的推导,目的在于利用与首末两项等距离的两项相加有公因式可提取,以便化简后求和。
4、分组转化法:把数列的每一项分成两项,或把数列的项“集”在一块重新组合,或把整个数列分成两个部分,使其转化为等差或等比数列,这一求和方法称为分组转化法。
5、公式法求和:所给数列的通项是关于n的多项式,此时求和可采用公式求和,常用的公式有:
![设数列{an}满足a1+2a2=3,且对任意的n∈N*,点列{P}恒满足,则数列{an}的前n项和Sn为 [ ]](https://www.mshxw.com/file/tupian/20210919/2013121616085541011922.jpg "设数列{an}满足a1+2a2=3,且对任意的n∈N*,点列{P}恒满足,则数列{an}的前n项和Sn为 [ ]")
数列求和的方法多种多样,要视具体情形选用合适方法。
数列求和特别提醒:
(1)对通项公式含有![设数列{an}满足a1+2a2=3,且对任意的n∈N*,点列{P}恒满足,则数列{an}的前n项和Sn为 [ ]](https://www.mshxw.com/file/tupian/20210919/201312161608555971037.jpg "设数列{an}满足a1+2a2=3,且对任意的n∈N*,点列{P}恒满足,则数列{an}的前n项和Sn为 [ ]")
的一类数列,在求![设数列{an}满足a1+2a2=3,且对任意的n∈N*,点列{P}恒满足,则数列{an}的前n项和Sn为 [ ]](https://www.mshxw.com/file/tupian/20210919/20131216160855785573.jpg "设数列{an}满足a1+2a2=3,且对任意的n∈N*,点列{P}恒满足,则数列{an}的前n项和Sn为 [ ]")
时,要注意讨论n的奇偶性;
(2)在用等比数列前n项和公式时,一定要分q=1和q≠1两种情况来讨论。
