1、习题课数列求和一、选择题1数列2,4,6,的前n项和Sn为()An21 Bn22Cn(n1) Dn(n1)答案C2已知数列an的前n项和为Sn,若an,Sn10,则n等于()A90 B119 C120 D121答案C解析an,Sn(1)()()110,n1121,故n120.3数列,的前n项和为()A. B. C. D.答案B解析由数列通项公式,得前n项和Sn().4已知数列an的通项an2n1,nN*,由bn所确定的数列bn的前n项的和是()An(n2) B.n(n4)C.n(n5) D.n(n7)答案C解析a1a2an(2n4)n22n.bnn2,bn的前n项和Sn.5如果一个数列an满足
2、anan1H (H为常数,nN*),则称数列an为等和数列,H为公和,Sn是其前n项的和,已知等和数列an中,a11,H3,则S2 019等于()A3 016 B3 015C3 026 D3 013答案C解析S2 019a1(a2a3a2 019)a11 009H11 009(3)3 026.6在数列an中,a12,an1anln,nN*,则an等于()A2ln n B2(n1)ln nC2nln n D1nln n答案A解析an1anln,an1anlnlnln(n1)ln n.又a12,当n2时,ana1(a2a1)(a3a2)(a4a3)(anan1)2ln 2ln 1ln 3ln 2l
3、n 4ln 3ln nln(n1)2ln nln 12ln n,又a12符合上式,故an2ln n,nN*.二、填空题7若Sn1234(1)n1n,nN*,则S50_.答案25解析S5012344950(1)2525.8在数列an中,已知Sn159131721(1)n1(4n3),nN*,则S15S22S31的值是_考点数列前n项和的求法题点并项求和法答案76解析S1547a15285729,S2241144,S31415a316012161,S15S22S3129446176.9已知数列an是递增的等比数列,a1a49,a2a38,则数列an的前n项和为_答案2n1解析设等比数列的公比为q,
4、则有解得或又an为递增数列,数列an的前n项和为2n1.10数列an的通项公式anncos ,nN*,其前n项和为Sn,则S2 016_.考点数列前n项和的求法题点并项求和法答案1 008解析a1cos 0,a22cos 2,a30,a44,.数列an的所有奇数项为0,前2 016项的所有偶数项(共1 008项)依次为2,4,6,8,故S2 0160(24)(68)(2 0142 016)1 008.11在等比数列an中,若a1,a44,则|a1|a2|a3|an|_.考点数列前n项和的求法题点数列求和方法综合答案解析an为等比数列,且a1,a44,q38,q2,an(2)n1,|an|2n2
5、,|a1|a2|a3|an|.三、解答题12已知函数f(x)2x3x1,点(n,an)在f(x)的图象上,数列an的前n项和为Sn,求Sn.解由题意得an2n3n1,Sna1a2an(2222n)3(123n)n3n2n12.13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,即数列bn的前n项和Tn.1
6、4在数列an中,若anln,nN*,则Sn_.考点数列前n项和的求法题点裂项相消法求和答案ln(n1)解析方法一anln ln(n1)ln nSn(ln 2ln 1)(ln 3ln 2)ln(n1)ln nln(n1)ln 1ln(n1)方法二Snln ln ln lnln(n1)15设数列an满足a12,an1an322n1,nN*.(1)求数列an的通项公式;(2)令bnnan,求数列bn的前n项和Sn.解(1)由已知,得当n1时,an1(an1an)(anan1)(a2a1)a13(22n122n32)222n1,an22n1,而a12,符合上式,所以数列an的通项公式为an22n1.(2)由bnnann22n1知Sn12223325n22n1,从而22Sn123225327n22n1.得(122)Sn2232522n1n22n1,即Sn(3n1)22n12
