1、习题课(一)求数列的通项公式一、选择题1已知数列an中,a12,an1an2n(nN),则a100的值是()A9 900 B9 902 C9 904 D11 000答案B解析a100(a100a99)(a99a98)(a2a1)a12(999821)2229 902.2已知数列an中,a11,an1(nN),则这个数列的第n项为()A2n1 B2n1 C. D.答案C解析an1,2.为等差数列,公差为2,首项1.1(n1)22n1,an.3在数列an中,a12,an1anln(nN),则an等于()A2ln n B2(n1)ln n C2nln n D1nln n答案A解析由an1anln,得
2、an1anlnln,(a2a1)(a3a2)(anan1)lnlnlnlnln n(n2),即ana1ln n,anln n2.当n1时,a12也满足上式4已知数列an的首项为a11,且满足an1an(nN),则此数列的通项公式an等于()A2n Bn(n1) C. D.答案C解析an1an,2n1an12nan2,即2n1an12nan2.又21a12,数列2nan是以2为首项,2为公差的等差数列,2nan2(n1)22n,an.5已知数列an满足aa4,且a11,an0,则an等于()A. B. C. D8n答案A解析aa4,a是等差数列,且首项a1,公差d4,a1(n1)44n3.又an
3、0,an.6一个正整数数表如下(表中下一行中的数的个数是上一行中数的个数的2倍):第1行1第2行23第3行4567则第8行中的第5个数是()A68 B132 C133 D260答案B解析前7行中共有122226271127个数,则第8行中的第5个数是1275132.7若数列an的前n项和为Sn,a12,且对于任意大于1的整数n,点(,)在直线xy0上,则数列an的通项公式为()Aan4n2,nN Ban4n2,nNCan4n,nN Dan4n2,nN答案A解析由题意得,nN,n2,是首项为,公差为的等差数列n,Sn2n2,anSnSn12n22(n1)24n2,nN,n2,a12也适合上式an
4、4n2,nN.8数列an中,a13,an12an0,数列bn的通项满足关系式anbn(1)n(nN),则bn等于()A. B. C. D.答案C解析易知an是首项为3,公比为2的等比数列,an32n1,bn.二、填空题9在数列an中,a11,an1an,则数列an的通项公式an_.答案n解析ana11n(n2)当n1时,a11也满足上式10已知数列an满足an13an2,且a11,则an_.答案23n11解析设an1A3(anA),化简得an13an2A.又an13an2,2A2,即A1.an113(an1),即3.数列an1是等比数列,首项为a112,公比为3.则an123n1,即an23n
5、11.11若数列an的前n项和Snan(nN),则an的通项公式是an_.答案(2)n1解析当n1时,a11;当n2时,anSnSn1anan1,故2,故an(2)n1(nN)三、解答题12已知数列an是递增的等比数列,且a1a49,a2a38.(1)求数列an的通项公式;(2)设Sn为数列an的前n项和,bn,求数列bn的前n项和Tn.解(1)由题设可知,a1a4a2a38,又a1a49,可解得或(舍去)由a4a1q3,得公比q2,故ana1qn12n1.(2)Sn2n1,又bn,所以Tnb1b2bn1.13已知Sn4an,求an与Sn.解Sn4an,Sn14an1,SnSn1anan1an
6、.anan1n1.2,2nan2n1an12,2nan是等差数列,d2,首项为2a1.a1S14a12a1,a11,2nan22(n1)2n.annn1,Sn4an4n4.14若数列an中,a13且an1a(n是正整数),则它的通项公式an为_答案an 解析由题意知an0且an1,将an1a两边取对数得lg an12lg an且lg an0,即2,所以数列lg an是以lg a1lg3为首项,2为公比的等比数列,lgan(lga1)2n1 ,即an.15已知数列an满足a11,a24,an24an13an(nN)(1)求a3,a4的值;(2)证明:数列an1an是等比数列;(3)求数列an的通项公式(1)解a34a23a113,a44a33a240.(2)证明an24an13an,an2an13(an1an)又a11,a24,3,则an1an是以a2a13为首项,3为公比的等比数列(3)解由(2)得an1an3n,则当n2时,anan13n1,故an(anan1)(an1an2)(a2a1)a13n13n231.又a11适合上式,故an,nN.
