1、A基础达标已知an(1)n,数列an的前n项和为Sn,则S9与S10的值分别是()A1,1B1,1C1,0 D1,0解析:选D. S91111111111,S10S9a10110.数列12n1的前n项和为()A12n B22nCn2n1 Dn22n解析:选C.Sn(11)(12)(122)(123)(12n1)n(12222n1)nn2n1,故选C.3数列an的通项公式是an,若前n项和为10,则项数为()A11 B99C120 D121解析:选C.因为an,所以Sna1a2an(1) ()()1,令110,得n120.4若数列an的通项公式是an(1)n(2n1),则a1a2a3a100()
2、A200 B100C200 D100解析:选D.由题意知,a1a2a3a1001357(1)100(21001)(13)(57)(197199)250100.5设数列1,(12),(12222n1),的前n项和为Sn,则Sn()A2n B2nnC2n1n D2n1n2解析:选D.因为an12222n12n1,所以Sn(222232n)nn2n1n2.6数列a12,ak2k,a1020共有十项,且其和为240,则a1aka10的值为_解析:a1aka10240(22k20)240240110130.答案:130已知数列an的通项公式an,其前n项和Sn,则项数n等于_解析:an1,所以Snnn1
3、5,所以n6.答案:6设数列an的通项公式为an2n7(nN*),则|a1|a2|a15|_解析:因为an2n7,所以a15,a23,a31,a41,a53,a1523.所以|a1|a2|a15|(531)(13523)9153.答案:1539已知等差数列an满足:a37,a5a726,an的前n项和为Sn.(1)求an及Sn;(2)令bn(nN*),求数列bn的前n项和Tn.解:(1)设等差数列an的首项为a1,公差为d.因为a37,a5a726,所以解得所以an32(n1)2n1,Sn3n2n22n.所以,an2n1, Snn22n.(2)由(1)知an2n1,所以bn,所以Tn,则数列b
4、n的前n项和Tn.(2015高考天津卷)已知an是各项均为正数的等比数列,bn是等差数列,且a1b11,b2b32a3,a53b27.(1)求an和bn的通项公式;(2)设cnanbn,nN*,求数列cn的前n项和解:(1)设数列an的公比为q,数列bn的公差为d,由题意知q0.由已知,有消去d,整理得q42q280,解得q24.又因为q0,所以q2,所以d2.所以数列an的通项公式为an2n1,nN*;数列bn的通项公式为bn2n1,nN*.(2)由(1)有cn(2n1)2n1,设cn的前n项和为Sn,则Sn120321522(2n3)2n2(2n1)2n1,2Sn121322523(2n3
5、)2n1(2n1)2n,上述两式相减,得Sn122232n(2n1)2n2n13(2n1)2n(2n3)2n3,所以,Sn(2n3)2n3,nN*.B能力提升数列an,bn满足anbn1,ann23n2,则bn的前10项和为()A. B.C. D.解析:选B. 依题意bn,所以bn的前10项和为S10,故选B.(2015高考江苏卷)设数列an满足a11,且an1ann1(nN*),则数列前10项的和为_解析:由题意有a2a12,a3a23,anan1n(n2)以上各式相加,得ana123n.又因为 a11,所以an(n2)因为当n1时也满足此式,所以an(nN*)所以2()所以S102()2(
6、1).答案:3已知Sn为数列an的前n项和,且a2S231,Sn1Sn3an2n.(1)求证:数列an2n为等比数列;(2)求数列an的前n项和Sn.解:(1)证明:由Sn1Sn3an2n,得an13an2n,所以an12n13an2n2n13an32n3(an2n),又a23a12,则S2a1a24a12,得a2S27a1431,得a15,所以a12130,则an2n0,所以3,故数列an2n为等比数列(2)由(1)可知an2n3n1(a12)3n,故an2n3n,所以Sn2n1.(选做题)(2015高考湖北卷)设等差数列an的公差为d,前n项和为Sn,等比数列bn的公比为q.已知b1a1,b22,qd,S10100.(1)求数列an,bn的通项公式;(2)当d1时,记cn,求数列cn的前n项和Tn.解:(1)由题意有 即解得 或 故或(2)由d1,知an2n1,bn2n1,故cn,于是Tn1,Tn.可得Tn23,故Tn6.
