发布时间 : 星期五 文章2020年高考各省市模拟试题分类汇编: 数列(解析版)更新完毕开始阅读739048456e85ec3a87c24028915f804d2b1687bb
23n则Sn?b1?b2?b3???bn?(2?1)?2?2?2?3?L?2?n
???????2?2?2?L?2?(1?2?3?L?n)??23n?2?1?2n1?2???n(n?1)?22n?111?n2?n?2. 2239.(2020·陕西省西安中学高三二模(文))已知?an?是公差为3的等差数列,数列?bn?满足
1b1=1,b2=,anbn?1?bn?1?nbn.
3(Ⅰ)求?an?的通项公式; (Ⅱ)求?bn?的前n项和. 【答案】(Ⅰ)3n-1;(Ⅱ)见解析.
【解析】(Ⅰ)由已知,a1b2?b2?b1,b1?1,b2?数列,通项公式为an?3n?1.
(Ⅱ)由(Ⅰ)和anbn?1?bn?1?nbn得bn?1?1,得a1?2,所以数列?an?是首项为2,公差为3的等差3bn1,因此?bn?是首项为1,公比为的等比数列.记?bn?的前3311?()n3?3?1. n项和为Sn,则Sn?n?1122?31?340.(2020·江西省名师联盟高三调研(文))设数列?an?满足:a1?1,3a2?a1?1,且
2an?1?an?1??n?2? anan?1an?1(1)求数列?an?的通项公式;
1,4bn?an?1an,设?bn?的前n项和Tn.证明:Tn?1. 22【答案】(1)an?;(2)证明见解析.
n?1(2)设数列b1?【解析】
(1)Q数列?an?满足:a1?1,3a2?a1?1,且
2an?1?an?1??n?2?, anan?1an?1?211??, anan?1an?1又a1?1,3a2?a1?1,
?113111?1,?,???, a1a22a2a12?1?1???是首项为1,公差为的等差数列,
2?an??111?1??n?1???n?1?, an22?an?2. n?11,4bn?an?1an, 2(2)证明:Q数列b1??bn?111??,
n?n?1?nn?11?1?1??11??1?Tn?b1?b2???bn??1????????????1??1. ?n?1?2??23??nn?1?故Tn?1.。