1、(本栏目内容,在学生用书中以活页形式分册装订!)一、选择题1数列1,3,5,7,(2n1),的前n项和Sn的值等于()An21B2n2n1Cn21 Dn2n1解析:该数列的通项公式为an(2n1),则Sn135(2n1)n21.故选A.答案:A2数列1,12,124,12222n1,的前n项和Sn1 020,那么n的最小值是()A7 B8C9 D10解析:12222n12n1,Sn(2222n)nn2n12n.若Sn1 020,则2n12n1 020.n10.答案:D314916(1)n1n2等于()A. BC(1)n1 D以上答案均不对解析:当n为偶数时,14916(1)n1n237(2n1
2、);当n为奇数时,14916(1)n1n2372(n1)1n2n2,综上可得,14916(1)n1n2(1)n1.答案:C4若数列an的前n项和为Sn,且满足Snan3,则数列an的前n项和Sn等于()A3n13 B3n3C3n13 D3n3解析:Snan3,Sn1an13,两式相减得:Sn1Sn(an1an)即an1(an1an),3.又S1a13,即a1a13,a16.ana1qn163n123n.Snan323n33n13,故应选A.答案:A5已知函数f(x)x2bx的图象在点A(1,f(1)处的切线的斜率为3,数列的前n项和为Sn,则S2 010的值为()A. B.C. D.解析:f(
3、x)2xbf(1)2b3,b1,f(x)x2x,S2 01011.答案:D6已知数列an的前n项和Snn26n,则|an|的前n项和Tn()A6nn2 Bn26n18C. D.解析:由Snn26n得an是等差数列,且首项为5,公差为2.an5(n1)22n7,n3时,an0,n3时an0,Tn答案:C二、填空题7已知f(n)若anf(n)f(n1),则a1a2a2 008_.解析:当n为奇数时,anf(n)f(n1)nn11.当n为偶数时,annn11.a1a2a2 0080.答案:08在等差数列an中,a3a214,则其前23项的和为_解析:S2346.答案:469对于数列an,定义数列an
4、1an为数列an的“差数列”,若a12,an的“差数列”的通项为2n,则数列an的前n项和Sn_.解析:an1an2n,an(anan1)(an1an2)(a2a1)a12n12n2222222n222n.Sn2n12.答案:2n12三、解答题10等差数列an中,a13,前n项和为Sn,等比数列bn各项均为正数,b11,且b2S212,bn的公比q.(1)求an与bn;(2)求.解析:(1)由已知可得,解得q3,a26或q4(舍去),a213(舍去),an3(n1)33n,bn3n1.(2)Sn,.11在数列an中,已知a11,且an12an3n4(nN*)(1)求证:数列an1an3是等比数
5、列;(2)求数列an的通项公式及前n项和Sn.【解析方法代码108001066】解析:(1)证明:令bnan1an3,则bn1an2an132an13(n1)42an3n432(an1an3)2bn,即bn12bn.由已知得a23,于是b1a2a1310.所以数列an1an3是以1为首项,2为公比的等比数列(2)由(1)可知bnan1an32n1,即2an3n4an32n1,an2n13n1(nN*)于是,Sn(12222n1)3(123n)n3n2n1.12(2011北京宣武高三期中)已知数列an的前n项和为Sn3n,数列bn满足b11,bn1bn(2n1)(nN*)(1)求数列an的通项公
6、式an;(2)求数列bn的通项公式bn;(3)若cn,求数列cn的前n项和Tn.【解析方法代码108001067】解析:(1)Sn3n,Sn13n1(n2),anSnSn13n3n123n1(n2)当n1时,23112S1a13,an(2)bn1bn(2n1),b2b11,b3b23,b4b35,bnbn12n3.以上各式相加得bnb1135(2n3)(n1)2.b11,bnn22n.(3)由题意得cn当n2时,Tn32031213222332(n2)3n1,3Tn92032213322342(n2)3n,相减得2Tn623223323n12(n2)3n.Tn(n2)3n(332333n1(n2)3n.TnTn(nN*)
