题文
等差数列{an},{bn}的前n项和分别为Sn,Tn,若![等差数列{an},{bn}的前n项和分别为Sn,Tn,若=,则=[ ]A. B. C. D.](https://www.mshxw.com/file/tupian/20210918/7d9f09bb038fad8e6ddfcb88ca319651.png "等差数列{an},{bn}的前n项和分别为Sn,Tn,若=,则=[ ]A. B. C. D.")
=
![等差数列{an},{bn}的前n项和分别为Sn,Tn,若=,则=[ ]A. B. C. D.](https://www.mshxw.com/file/tupian/20210918/7a09b2cd8c8613484339b8f456d4a3db.png "等差数列{an},{bn}的前n项和分别为Sn,Tn,若=,则=[ ]A. B. C. D.")
,则
![等差数列{an},{bn}的前n项和分别为Sn,Tn,若=,则=[ ]A. B. C. D.](https://www.mshxw.com/file/tupian/20210918/077ae5306074047d566183cc5d0348e2.png "等差数列{an},{bn}的前n项和分别为Sn,Tn,若=,则=[ ]A. B. C. D.")
=[ ]A.
![等差数列{an},{bn}的前n项和分别为Sn,Tn,若=,则=[ ]A. B. C. D.](https://www.mshxw.com/file/tupian/20210918/93528476e16069d03311a1dd4148e041.png "等差数列{an},{bn}的前n项和分别为Sn,Tn,若=,则=[ ]A. B. C. D.")
B.
![等差数列{an},{bn}的前n项和分别为Sn,Tn,若=,则=[ ]A. B. C. D.](https://www.mshxw.com/file/tupian/20210918/27dddf6e9a69251629686bd1119c7b1e.png "等差数列{an},{bn}的前n项和分别为Sn,Tn,若=,则=[ ]A. B. C. D.")
C.
![等差数列{an},{bn}的前n项和分别为Sn,Tn,若=,则=[ ]A. B. C. D.](https://www.mshxw.com/file/tupian/20210918/0d8ed8b66f7fe5fed0fe429dac97beb5.png "等差数列{an},{bn}的前n项和分别为Sn,Tn,若=,则=[ ]A. B. C. D.")
D.
![等差数列{an},{bn}的前n项和分别为Sn,Tn,若=,则=[ ]A. B. C. D.](https://www.mshxw.com/file/tupian/20210918/0c898180bb222d04e7e7c539e3209f81.png "等差数列{an},{bn}的前n项和分别为Sn,Tn,若=,则=[ ]A. B. C. D.")
题型:未知 难度:其他题型
答案
B解析
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考点
据考高分专家说,试题“等差数列{an},{bn}的.....”主要考查你对 [等差数列的定义及性质 ]考点的理解。 等差数列的定义及性质等差数列的定义:
一般地,如果一个数列从第2项起,每一项与它的前一项的差等于同一个常数,那么这个数列就叫做等差数列,这个常数叫做公差,用符号语言表示为an+1-an=d。
等差数列的性质:
(1)若公差d>0,则为递增等差数列;若公差d<0,则为递减等差数列;若公差d=0,则为常数列;
(2)有穷等差数列中,与首末两端“等距离”的两项和相等,并且等于首末两项之和;
(3)m,n∈N*,则am=an+(m-n)d;
(4)若s,t,p,q∈N*,且s+t=p+q,则as+at=ap+aq,其中as,at,ap,aq是数列中的项,特别地,当s+t=2p时,有as+at=2ap;
(5)若数列{an},{bn}均是等差数列,则数列{man+kbn}仍为等差数列,其中m,k均为常数。
(6)![等差数列{an},{bn}的前n项和分别为Sn,Tn,若=,则=[ ]A. B. C. D.](https://www.mshxw.com/file/tupian/20210918/Fm6izLwc9bAiAxdfnEvsA__cNmvF.jpg "等差数列{an},{bn}的前n项和分别为Sn,Tn,若=,则=[ ]A. B. C. D.")
![等差数列{an},{bn}的前n项和分别为Sn,Tn,若=,则=[ ]A. B. C. D.](https://www.mshxw.com/file/tupian/20210918/FgXXa1ndu0kaZcmR1rO4xw1Hdtvo.jpg "等差数列{an},{bn}的前n项和分别为Sn,Tn,若=,则=[ ]A. B. C. D.")
(7)从第二项开始起,每一项是与它相邻两项的等差中项,也是与它等距离的前后两项的等差中项,即![等差数列{an},{bn}的前n项和分别为Sn,Tn,若=,则=[ ]A. B. C. D.](https://www.mshxw.com/file/tupian/20210918/Fky-ku52Q1_OfuqrLtI2nNMSajyd.jpg "等差数列{an},{bn}的前n项和分别为Sn,Tn,若=,则=[ ]A. B. C. D.")
![等差数列{an},{bn}的前n项和分别为Sn,Tn,若=,则=[ ]A. B. C. D.](https://www.mshxw.com/file/tupian/20210918/Fu-fb3p2b7fHXI72eXZk_gZ1z5NK.jpg "等差数列{an},{bn}的前n项和分别为Sn,Tn,若=,则=[ ]A. B. C. D.")
(8)![等差数列{an},{bn}的前n项和分别为Sn,Tn,若=,则=[ ]A. B. C. D.](https://www.mshxw.com/file/tupian/20210918/FkyARGhOjCgNbVM9MU_JnDmnghuS.jpg "等差数列{an},{bn}的前n项和分别为Sn,Tn,若=,则=[ ]A. B. C. D.")
仍为等差数列,公差为![等差数列{an},{bn}的前n项和分别为Sn,Tn,若=,则=[ ]A. B. C. D.](https://www.mshxw.com/file/tupian/20210918/FuwMFbeh12S9Gx9UjVxRjKCXTWTx.jpg "等差数列{an},{bn}的前n项和分别为Sn,Tn,若=,则=[ ]A. B. C. D.")
对等差数列定义的理解:
①如果一个数列不是从第2项起,而是从第3项或某一项起,每一项与它前一项的差是同一个常数,那么此数列不是等差数列,但可以说从第2项或某项开始是等差数列.
②求公差d时,因为d是这个数列的后一项与前一项的差,故有![等差数列{an},{bn}的前n项和分别为Sn,Tn,若=,则=[ ]A. B. C. D.](https://www.mshxw.com/file/tupian/20210918/Fr04N_PmFlhvGm49X2LhLBzpTIkO.jpg "等差数列{an},{bn}的前n项和分别为Sn,Tn,若=,则=[ ]A. B. C. D.")
还有![等差数列{an},{bn}的前n项和分别为Sn,Tn,若=,则=[ ]A. B. C. D.](https://www.mshxw.com/file/tupian/20210918/FtriQRZm5RZkUYsdkuj30okcPZnS.jpg "等差数列{an},{bn}的前n项和分别为Sn,Tn,若=,则=[ ]A. B. C. D.")
③公差d∈R,当d=0时,数列为常数列(也是等差数列);当d>0时,数列为递增数列;当d<0时,数列为递减数列;
④![等差数列{an},{bn}的前n项和分别为Sn,Tn,若=,则=[ ]A. B. C. D.](https://www.mshxw.com/file/tupian/20210918/FqPsXU4ljd0MU42mIFPQXeZElaNO.jpg "等差数列{an},{bn}的前n项和分别为Sn,Tn,若=,则=[ ]A. B. C. D.")
是证明或判断一个数列是否为等差数列的依据;
⑤证明一个数列是等差数列,只需证明an+1-an是一个与n无关的常数即可。
等差数列求解与证明的基本方法:
(1)学会运用函数与方程思想解题;
(2)抓住首项与公差是解决等差数列问题的关键;
(3)等差数列的通项公式、前n项和公式涉及五个量:a1,d,n,an,Sn,知道其中任意三个就可以列方程组求出另外两个(俗称“知三求二’).
