1、高考资源网() 您身边的高考专家第二章2.5第1课时【基础练习】1等比数列an的前n项和为Sn,若S33S20,则公比q()A2B1C2或1D3【答案】A【解析】S33S20,0,即(1q)(q24q4)0,解得q2或q1(舍去)故选A2设等比数列an的前n项和为Sn,满足an0,q1且a3a520,a2a664,则S6等于()A63B48C42D36【答案】A【解析】a3a520,a2a664,消去a2,得2q25q20,解得q2或q(舍去),此时a22,则a11,则S626163.故选A3设等比数列an的前n项和为Sn,且满足a68a3,则()A4 B5C8D9【答案】D【解析】等比数列a
2、n的前n项和为Sn,且满足a68a3,q38,解得q2.1q39.故选D4设等比数列an的公比为q(0q1),前n项和为Sn,若a14a3a4且a6与a4的等差中项为a5,则S6_.【答案】【解析】a14a3a4,a6与a4的等差中项为a5,由0q1,解得a18,q.S6.5已知数列an是等差数列且a36,a60.(1)求数列an的通项公式;(2)若等比数列bn满足b1a2,b2a1a2a3,求数列bn的前n项和Sn.【解析】(1)设等差数列an的公差为d,a36,a60,a12d6,a15d0,解得a110,d2.an102(n1)2n12.(2)设等比数列bn的公比为q,a110,a28,
3、a36,b1a28,b2a1a2a3108624.q3.Sn4(13n)6已知等差数列an的前n项和为Sn且a21,S1133.(1)求数列an的通项公式;(2)设bnan,求证:bn是等比数列,并求其前n项和Tn.【解析】(1)设等差数列an的公差为d.解得a1,d,an.(2)bn,bn是首项b1,公比为的等比数列故前n项和Tn1.7已知等比数列an的公比q1且2(anan2)5an1,nN*.(1)求q的值;(2)若aa10,求数列的前n项和Sn.【解析】(1)2(anan2)5an1,nN*,2an(1q2)5anq,化为2(1q2)5q.又q1,解得q2.(2)aa10,(a124)
4、2a129,解得a12.an2n.n.数列的前n项和Sn2.【能力提升】8等比数列an的前n项和为Sna3n1b,则()A3B1C1D3【答案】A【解析】等比数列an的前n项和为Sna3n1b,a1S1ab,a2S2S13abab2a,a3S3S29ab3ab6a.等比数列an中,aa1a3,(2a)2(ab)6a,解得3.故选A9(2019年江西景德镇模拟)在等比数列an中,公比q2,前99项的和S9956,则a3a6a9a99()A24B28C32D36【答案】C【解析】方法一:S9956,a3a6a9a99a3(1q3q6q96)a1q2a1q25632.方法二:设b1a1a4a7a97
5、,b2a2a5a8a98,b3a3a6a9a99,则b1qb2,b2qb3且b1b2b356.b1(1qq2)56.b18,b3b1q232,即a3a6a9a9932.10在各项均为正数的等比数列an中,已知a2a416,a632,记bnanan1,则数列bn的前5项和S5为_【答案】93【解析】设数列an的公比为q,由aa2a416得a34,即a1q24.又a6a1q532,解得a11,q2.ana1qn12n1,bnanan12n12n32n1.数列bn是首项为3,公比为2的等比数列,S593.11设数列an的前n项和为Sn,nN.已知a11,a2,a3且当n2时,4Sn25Sn8Sn1Sn1.(1)求a4的值;(2)证明:为等比数列【解析】(1)当n2时,4S45S28S3S1,即4581,解得a4.(2)证明:由4Sn25Sn8Sn1Sn1(n2),得4Sn24Sn1SnSn14Sn14Sn(n2),即4an2an4an1(n2)4a3a14164a2,4an2an4an1对nN都成立.数列是以a2a11为首项,为公比的等比数列高考资源网版权所有,侵权必究!
