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课堂达标(二十九) 数列求和A基础巩固练1(2018广东惠州一中等六校联考)已知等差数列an的前n项和为Sn,若S39,S525,则S7等于()A41B48C49D56解析设SnAn2Bn,由题知,解得A1,B0,S749.答案C2在数列an中,若an1(1)nan2n1,则数列an的前12项和等于()A76 B78C80 D82解析由已知an1(1)nan2n1,得an2(1)n1an12n1,得an2an(1)n(2n1)(2n1),取n1,5,9及n2,6,10,结果相加可得S12a1a2a3a4a11a1278.故选B.答案B3已知数列an的通项公式是ann2sin,则a1a2a3a2 018等于()A. B.C. D.解析ann2sina1a2a3a2 018122232422 01722 0182(2212)(4232)(2 01822 0172)12342 018.答案B4已知函数f(x)且anf(n)f(n1),则a1a2a3a100等于()A0 B100C100 D10 200解析由题意,得a1a2a3a1001222223232424252992100210021012(12)(32)(43)(99100)(101100)(1299100)(23100101)5010150103100.故选B.答案B5对于数列an,定义数列an1an为数列an的“差数列”,若a12,数列an的“差数列”的通项为2n,则数列an的前n项和Sn等于()A2 B2nC2n12 D2n12解析an1an2n,an(anan1)(an1an2)(a2a1)a12n12n2222222n222n,Sn2n12.故选C.答案C6(2018北京师大附中统测)已知数列an:,那么数列bn的前n项和为()A4 B4C1 D.解析由题意知an,bn4,所以b1b2bn44444.答案A7(2018广西高三适应性测试)已知数列的前n项和Snn2,则数列的前n项和Tn_.解析2n1.,Tn.答案8设数列an的通项公式为an22n1,令bnnan,则数列bn的前n项和Sn为_. 解析由bnnann22n1知Sn12223325n22n1,从而22Sn123225327n22n1,得(122)Sn2232522n1n22n1,即Sn(3n1)22n12答案 (3n1)22n129(2018内蒙古百校联盟3月数学模拟试卷)已知各项均为正数的数列an的前n项和为Sn,且Sn满足n(n1)S(n2n1)Sn10(nN*),则S1S2S2 017_.解析n(n1)S(n2n1)Sn10(nN*),(Sn1)0,Sn0.n(n1)Sn10,Sn.S1S2S2 017.故答案为:.答案10(2017天津)已知an为等差数列,前n项和为Sn(nN*),bn是首项为2的等比数列,且公比大于0,b2b312,b3a42a1,S1111b4.(1)求an和bn的通项公式;(2)求数列a2nb2n1的前n项和(nN*)解(1)设等差数列an的公差为d,等比数列bn的公比为q.由已知b2b312,得b1(qq2)12,而b12,所以q2q60.又因为q0,解得q2.所以,bn2n.由b3a42a1,可得3da18.由S1111b4,可得a15d16,联立,解得a11,d3,由此可得an3n2.所以,数列an的通项公式为an3n2,数列bn的通项公式为bn2n.(2)设数列a2nb2n1的前n项和为Tn,由a2n6n2,b2n124n1,有a2nb2n1(3n1)4n,故Tn24542843(3n1)4n,4Tn242543844(3n4)4n(3n1)4n1,上述两式相减,得3Tn2434234334n(3n1)4n14(3n1)4n1得Tn4n1.所以,数列a2nb2n1的前n项和为4n1.B能力提升练1已知等比数列的各项都为正数,且当n3时,a4a2n4102n,则数列lg a1,2lg a2,22lg a3,23lg a4,2n1lg an,的前n项和Sn等于()An2n B(n1)2n11C(n1)2n1 D2n1解析等比数列an的各项都为正数,且当n3时,a4a2n4102n,a102n,即an10n,2n1lg an2n1lg 10nn2n1,Sn122322n2n1,2Sn12222323n2n,得Sn12222n1n2n2n1n2n(1n)2n1,Sn(n1)2n1.答案C2(2018湖南怀化四模)在正项等比数列an和正项等差数列bn中,已知a1,a2 017的等比中项与b1,b2 017的等差中项相等,且1,当a1 009取得最小值时,等差数列bn的公差d的取值集合为()A. B.C. D.解析在正项等比数列an和正项等差数列bn中,已知a1,a2 017的等比中项与b1,b2 017的等差中项相等,可得,即为a1 009b1 009,当a1 009取得最小值时,即为当b1 009取得最小值时由(b1b2 017)5529,当且仅当b2 0172b1时,取得等号再由1,可得b1b2 0179,即有b1b2 017取得最小值9,此时b2 0172b1,可得最小值b1 009,即有b11 008d,b12 016d2b1,解得d.故选:C.答案C3在数列an中,已知a11,an1(1)nancos(n1),记Sn为数列an的前n项和,则S2 015_.解an1(1)nancos(n1)(1)n1,当n2k时,a2k1a2k1,kN*,S2 015a1(a2a3)(a2 014a2 015)1(1)1 0071 006.答案1 0064(2018广西名校猜题卷)已知数列an是各项均不为0的等差数列,Sn为其前n项和,且满足aS2n1(nN*)若不等式对任意的nN*恒成立,则实数的最大值为_解析在aS2n1中,令n1,n2,得,即,解得a11,d2,ana1(n1)d12(n1)2n1,an12n1.当n为偶数时,要使不等式恒成立,即需不等式2n17恒成立,2n8,等号在n2时取得,此时需满足25;当n为奇数时,要使不等式恒成立,即需不等式2n15恒成立,2n随n的增大而增大,n1时,2n取得最小值6.则61521.综合、可得的取值范围是21.实数的最大值为21.故答案为:21.答案215(2018山东省青岛市数学一模试卷)已知数列an的前 n 项和为Sn,a11,且an12Sn1,nN*.(1)求数列an的通项公式;(2)令clog3a2n,bn,记数列bn的前n项和为Tn,若对任意nN*,Tn恒成立,求实数的取值范围解(1)an12Sn1,nN*,n2时,an2Sn11,可得an1an2an,即an13an.n1时,a22a1133a1,满足上式数列an是等比数列,an3n1.(2)clog3a2nlog332n12n1.bn,数列bn的前n项和Tn对任意nN*,Tn 恒成立,.实数的取值是.C尖子生专练已知正项数列an的前n项和为Sn,nN*,2Snaan.令bn,设bn的前n项和为Tn,则在T1,T2,T3,T100中有理数的个数为_解析2Snaan,2Sn1aan1,得2an1aan1aan,aaan1an0,(an1an)(an1an1)0.又an为正项数列,an1an10,即an1an1.在2Snaan中,令n1,可得a11.数列an是以1为首项,1为公差的等差数列ann,bn,Tn1,T1,T2,T3,T100中有理数的个数为9.答案9
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