1、课堂练通考点1(2014海淀质检)等差数列an中,a23,a3a49,则a1a6的值为()A14B18C21 D27解析:选A依题意得由此解得d1,a12,a6a15d7,a1a614.2(2014天津河西口模拟)设等差数列an的前n项和为Sn,若a11a83,S11S83,则使an0的最小正整数n的值是()A8 B9C10 D11解析:选Ca11a83d3,d1,S11S8a11a10a93a127d3,a18,an8(n1)0,解得n9,因此使an0的最小正整数n的值是10.3已知数列an为等差数列,Sn为其前n项和,a7a54,a1121,Sk9,则k_.解析:a7a52d4,则d2.a
2、1a1110d21201,Skk2k29.又kN*,故k3.答案:34(2014荆门调研)已知一等差数列的前四项和为124,后四项和为156,各项和为210,则此等差数列的项数是_解析:设数列an为该等差数列,依题意得a1an70.Sn210,Sn,210,n6.答案:65(2013深圳二模)各项均为正数的数列an满足a4Sn2an1(nN*),其中Sn为an的前n项和(1)求a1,a2的值;(2)求数列an的通项公式解:(1)当n1时,a4S12a11,即(a11)20,解得a11.当n2时,a4S22a214a12a2132a2,解得a23或a21(舍去)(2)a4Sn2an1,a4Sn1
3、2an11.得:aa4an12an12an2(an1an),即(an1an)(an1an)2(an1an)数列an各项均为正数,an1an0,an1an2,数列an是首项为1,公差为2的等差数列an2n1.课下提升考能第组:全员必做题1(2013太原二模)设an为等差数列,公差d2,Sn为其前n项和,若S10S11,则a1()A18 B20C22 D24解析:选B由S10S11,得a1a2a10a1a2a10a11,即a110,所以a12(111)0,解得a120.2(2013石家庄质检)已知等差数列an满足a23,SnSn351(n3),Sn100,则n的值为()A8 B9C10 D11解析
4、:选C由SnSn351得,an2an1an51,所以an117,又a23,Sn100,解得n10.3(2014深圳调研)等差数列an中,已知a50,a4a70并且S110,若SnSk对nN*恒成立,则正整数k构成的集合为()A5 B6C5,6 D7解析:选C在等差数列an中,由S100,S110得,S100a1a100a5a60,S110a1a112a60,故可知等差数列an是递减数列且a60,所以S5S6Sn,其中nN*,所以k5或6.5(2014浙江省名校联考)已知每项均大于零的数列an中,首项a11且前n项和Sn满足SnSn12(nN*且n2),则a81()A638 B639C640 D
5、641解析:选C由已知SnSn12可得,2,是以1为首项,2为公差的等差数列,故2n1,Sn(2n1)2,a81S81S8016121592640.6已知递增的等差数列an满足a11,a3a4,则an_.解析:设等差数列的公差为d,a3a4,12d(1d)24,解得d24,即d2.由于该数列为递增数列,故d2.an1(n1)22n1.答案:2n17已知等差数列an中,an0,若n2且an1an1a0,S2n138,则n等于_解析:2anan1an1,又an1an1a0,2ana0,即an(2an)0.an0,an2.S2n12(2n1)38,解得n10.答案:108(2013河南三市调研)设数
6、列an的通项公式为an2n10(nN*),则|a1|a2|a15|_.解析:由an2n10(nN*)知an是以8为首项,2为公差的等差数列,又由an2n100得n5,当n5时,an0,当n5时,an0,|a1|a2|a15|(a1a2a3a4)(a5a6a15)20110130.答案:1309已知数列an的各项均为正数,前n项和为Sn,且满足2Snan4(nN*)(1)求证:数列an为等差数列;(2)求数列an的通项公式解:(1)证明:当n1时,有2a1a14,即a2a130,解得a13(a11舍去)当n2时,有2Sn1an5,又2Snan4,两式相减得2anaa1,即a2an1a,也即(an
7、1)2a,因此an1an1或an1an1.若an1an1,则anan11.而a13,所以a22,这与数列an的各项均为正数相矛盾,所以an1an1,即anan11,因此数列an为首项为3,公差为1的等差数列(2)由(1)知a13,d1,所以数列an的通项公式an3(n1)1n2,即ann2.10(2013济南模拟)设同时满足条件:bn1(nN*);bnM(nN*,M是与n无关的常数)的无穷数列bn叫“特界”数列(1)若数列an为等差数列,Sn是其前n项和:a34,S318,求Sn;(2)判断(1)中的数列Sn是否为“特界”数列,并说明理由解:(1)设等差数列an的公差为d,则a12d4,S3a
8、1a2a33a13d18,解得a18,d2,Snna1dn29n.(2)Sn是“特界”数列,理由如下:由Sn110,得Sn1,故数列Sn适合条件.而Snn29n2(nN*),则当n4或5时,Sn有最大值20,即Sn20,故数列Sn适合条件.综上,数列Sn是“特界”数列第组:重点选做题1数列an满足a11,an1ranr(nN*,rR且r0),则“r1”是“数列an为等差数列”的()A充分不必要条件 B必要不充分条件C充分必要条件 D既不充分也不必要条件解析:选A当r1时,易知数列an为等差数列;由题意易知a22r,a32r2r,当数列an是等差数列时,a2a1a3a2,即2r12r2r,解得r或r1,故“r1”是“数列an为等差数列”的充分不必要条件2设等差数列an,bn的前n项和分别为Sn,Tn,若对任意自然数n都有,则的值为_解析:an,bn为等差数列,.,.答案:
