天津市高考數(shù)學(xué)二輪復(fù)習(xí)專題能力訓(xùn)練12數(shù)列的通項與求和理.doc

專題能力訓(xùn)練12數(shù)列的通項與求和一、能力突破訓(xùn)練1.已知等差數(shù)列an的前n項和為Sn,若a1=2,a4+a10=28,則S9=()A.45B.90C.120D.752.已知數(shù)列an是等差數(shù)列,滿足a1+2a2=S5,下列結(jié)論錯誤的是()A.S9=0B.S5最小C.S3=S6D.a5=03.已知數(shù)列an的前n項和Sn=n2-2n-1,則a3+a17=()A.15B.17C.34D.3984.已知函數(shù)f(x)滿足f(x+1)=32+f(x)(xR),且f(1)=52,則數(shù)列f(n)(nN*)前20項的和為()A.305B.315C.325D.3355.已知數(shù)列an,構(gòu)造一個新數(shù)列a1,a2-a1,a3-a2,an-an-1,此數(shù)列是首項為1,公比為13的等比數(shù)列,則數(shù)列an的通項公式為()A.an=32-3213n,nN*B.an=32+3213n,nN*C.an=1,n=1,32+3213n,n2,且nN*D.an=1,nN*6.已知數(shù)列an滿足a1=1,an-an+1=nanan+1(nN*),則an=.7.(2018全國,理14)記Sn為數(shù)列an的前n項和.若Sn=2an+1,則S6=.8.已知Sn是等差數(shù)列an的前n項和,若a1=-2 017,S2 0142 014-S2 0082 008=6,則S2 017=.9.已知在數(shù)列an中,a1=1,an+1=an+2n+1,且nN*.(1)求數(shù)列an的通項公式;(2)令bn=2n+1anan+1,數(shù)列bn的前n項和為Tn.如果對于任意的nN*,都有Tnm,求實數(shù)m的取值范圍.10.已知數(shù)列an的前n項和為Sn,且a1=0,對任意nN*,都有nan+1=Sn+n(n+1).(1)求數(shù)列an的通項公式;(2)若數(shù)列bn滿足an+log2n=log2bn,求數(shù)列bn的前n項和Tn.11.設(shè)數(shù)列an的前n項和為Sn .已知2Sn=3n+3.(1)求an的通項公式;(2)若數(shù)列bn滿足anbn=log3an,求bn的前n項和Tn.二、思維提升訓(xùn)練12.給出數(shù)列11,12,21,13,22,31,1k,2k-1,k1,在這個數(shù)列中,第50個值等于1的項的序號是()A.4 900B.4 901C.5 000D.5 00113.設(shè)Sn是數(shù)列an的前n項和,且a1=-1,an+1=SnSn+1,則Sn=.14.已知等差數(shù)列an的公差為2,其前n項和Sn=pn2+2n(nN*).(1)求p的值及an;(2)若bn=2(2n-1)an,記數(shù)列bn的前n項和為Tn,求使Tn910成立的最小正整數(shù)n的值.15.已知數(shù)列an滿足an+2=qan(q為實數(shù),且q1),nN*,a1=1,a2=2,且a2+a3,a3+a4,a4+a5成等差數(shù)列.(1)求q的值和an的通項公式;(2)設(shè)bn=log2a2na2n-1,nN*,求數(shù)列bn的前n項和.16.設(shè)數(shù)列A:a1,a2,aN(N2).如果對小于n(2nN)的每個正整數(shù)k都有aka1,則G(A);(3)證明:若數(shù)列A滿足an-an-11(n=2,3,N),則G(A)的元素個數(shù)不小于aN-a1.專題能力訓(xùn)練12數(shù)列的通項與求和一、能力突破訓(xùn)練1.B解析 因為an是等差數(shù)列,設(shè)公差為d,所以a4+a10=a1+3d+a1+9d=2a1+12d=4+12d=28,解得d=2.所以S9=9a1+982d=18+362=90.故選B.2.B解析 由題設(shè)可得3a1+2d=5a1+10d2a1+8d=0,即a5=0,所以D中結(jié)論正確.由等差數(shù)列的性質(zhì)可得a1+a9=2a5=0,則S9=9(a1+a9)2=9a5=0,所以A中結(jié)論正確.S3-S6=3a1+3d-6a1-15d=-3(a1+4d)=-3a5=0,所以C中結(jié)論正確.B中結(jié)論是錯誤的.故選B.3.C解析 Sn=n2-2n-1,a1=S1=12-2-1=-2.當(dāng)n2時,an=Sn-Sn-1=n2-2n-1-(n-1)2-2(n-1)-1=n2-(n-1)2+2(n-1)-2n-1+1=n2-n2+2n-1+2n-2-2n=2n-3.an=-2,n=1,2n-3,n2.a3+a17=(23-3)+(217-3)=3+31=34.4.D解析 f(1)=52,f(2)=32+52,f(3)=32+32+52,f(n)=32+f(n-1),f(n)是以52為首項,32為公差的等差數(shù)列.S20=2052+20(20-1)232=335.5.A解析 因為數(shù)列a1,a2-a1,a3-a2,an-an-1,是首項為1,公比為13的等比數(shù)列,所以an-an-1=13n-1,n2.所以當(dāng)n2時,an=a1+(a2-a1)+(a3-a2)+(an-an-1)=1+13+132+13n-1=1-13n1-13=32-3213n.又當(dāng)n=1時,an=32-3213n=1,則an=32-3213n,nN*.6.2n2-n+2解析 因為an-an+1=nanan+1,所以an-an+1anan+1=1an+1-1an=n,1an=1an-1an-1+1an-1-1an-2+1a2-1a1+1a1=(n-1)+(n-2)+3+2+1+1a1=(n-1)(n-1+1)2+1=n2-n+22(n2).所以an=2n2-n+2(n2).又a1=1也滿足上式,所以an=2n2-n+2.7.-63解析 Sn=2an+1,Sn-1=2an-1+1(n2).-,得an=2an-2an-1,即an=2an-1(n2).又S1=2a1+1,a1=-1.an是以-1為首項,2為公比的等比數(shù)列,則S6=-1(1-26)1-2=-63.8.-2 017解析 Sn是等差數(shù)列an的前n項和,Snn是等差數(shù)列,設(shè)其公差為d.S2 0142 014-S2 0082 008=6,6d=6,d=1.a1=-2 017,S11=-2 017.Snn=-2 017+(n-1)1=-2 018+n.S2 017=(-2 018+2 017)2 017=-2 017.故答案為-2 017.9.解 (1)an+1=an+2n+1,an+1-an=2n+1,an-an-1=2n-1,an=a1+(a2-a1)+(a3-a2)+(an-an-1)=1+3+5+(2n-1)=n(1+2n-1)2=n2.(2)由(1)知,bn=2n+1anan+1=2n+1n2(n+1)2=1n2-1(n+1)2,Tn=112-122+122-132+1n2-1(n+1)2=1-1(n+1)2,數(shù)列Tn是遞增數(shù)列,最小值為1-1(1+1)2=34,只需要34m,m的取值范圍是-,34.10.解 (1)(方法一)nan+1=Sn+n(n+1),當(dāng)n2時,(n-1)an=Sn-1+n(n-1),兩式相減,得nan+1-(n-1)an=Sn-Sn-1+n(n+1)-n(n-1),即nan+1-(n-1)an=an+2n,得an+1-an=2.當(dāng)n=1時,1a2=S1+12,即a2-a1=2.數(shù)列an是以0為首項,2為公差的等差數(shù)列.an=2(n-1)=2n-2.(方法二)由nan+1=Sn+n(n+1),得n(Sn+1-Sn)=Sn+n(n+1),整理,得nSn+1=(n+1)Sn+n(n+1),兩邊同除以n(n+1),得Sn+1n+1-Snn=1.數(shù)列Snn是以S11=0為首項,1為公差的等差數(shù)列,Snn=0+n-1=n-1.Sn=n(n-1).當(dāng)n2時,an=Sn-Sn-1=n(n-1)-(n-1)(n-2)=2n-2.又a1=0適合上式,數(shù)列an的通項公式為an=2n-2.(2)an+log2n=log2bn,bn=n2an=n22n-2=n4n-1.Tn=b1+b2+b3+bn-1+bn=40+241+342+(n-1)4n-2+n4n-1,4Tn=41+242+343+(n-1)4n-1+n4n,由-,得-3Tn=40+41+42+4n-1-n4n=1-4n1-4-n4n=(1-3n)4n-13.Tn=19(3n-1)4n+1.11.解 (1)因為2Sn=3n+3,所以2a1=3+3,故a1=3.當(dāng)n1時,2Sn-1=3n-1+3,此時2an=2Sn-2Sn-1=3n-3n-1=23n-1,即an=3n-1,所以an=3,n=1,3n-1,n1.(2)因為anbn=log3an,所以b1=13,當(dāng)n1時,bn=31-nlog33n-1=(n-1)31-n.所以T1=b1=13;當(dāng)n1時,Tn=b1+b2+b3+bn=13+(13-1+23-2+(n-1)31-n),所以3Tn=1+(130+23-1+(n-1)32-n),兩式相減,得2Tn=23+(30+3-1+3-2+32-n)-(n-1)31-n=23+1-31-n1-3-1-(n-1)31-n=136-6n+323n,所以Tn=1312-6n+343n.經(jīng)檢驗,當(dāng)n=1時也適合.綜上可得Tn=1312-6n+343n.二、思維提升訓(xùn)練12.B解析 根據(jù)條件找規(guī)律,第1個1是分子、分母的和為2,第2個1是分子、分母的和為4,第3個1是分子、分母的和為6,第50個1是分子、分母的和為100,而分子、分母的和為2的有1項,分子、分母的和為3的有2項,分子、分母的和為4的有3項,分子、分母的和為99的有98項,分子、分母的和為100的項依次是:199,298,397,5050,5149,991,第50個1是其中第50項,在數(shù)列中的序號為1+2+3+98+50=98(1+98)2+50=4 901.13.-1n解析 由an+1=Sn+1-Sn=SnSn+1,得1Sn-1Sn+1=1,即1Sn+1-1Sn=-1,則1Sn為等差數(shù)列,首項為1S1=-1,公差為d=-1,1Sn=-n,Sn=-1n.14.解 (1)(方法一)an是等差數(shù)列,Sn=na1+n(n-1)2d=na1+n(n-1)22=n2+(a1-1)n.又由已知Sn=pn2+2n,p=1,a1-1=2,a1=3,an=a1+(n-1)d=2n+1,p=1,an=2n+1.(方法二)由已知a1=S1=p+2,S2=4p+4,即a1+a2=4p+4,a2=3p+2.又等差數(shù)列的公差為2,a2-a1=2,2p=2,p=1,a1=p+2=3,an=a1+(n-1)d=2n+1,p=1,an=2n+1.(方法三)當(dāng)n2時,an=Sn-Sn-1=pn2+2n-p(n-1)2+2(n-1)=2pn-p+2,a2=3p+2,由已知a2-a1=2,2p=2,p=1,a1=p+2=3,an=a1+(n-1)d=2n+1,p=1,an=2n+1.(2)由(1)知bn=2(2n-1)(2n+1)=12n-1-12n+1,Tn=b1+b2+b3+bn=11-13+13-15+15-17+12n-1-12n+1=1-12n+1=2n2n+1.Tn910,2n2n+1910,20n18n+9,即n92.nN*,使Tn910成立的最小正整數(shù)n的值為5.15.解 (1)由已知,有(a3+a4)-(a2+a3)=(a4+a5)-(a3+a4),即a4-a2=a5-a3,所以a2(q-1)=a3(q-1).又因為q1,故a3=a2=2,由a3=a1q,得q=2.當(dāng)n=2k-1(kN*)時,an=a2k-1=2k-1=2n-12;當(dāng)n=2k(kN*)時,an=a2k=2k=2n2.所以,an的通項公式為an=2n-12,n為奇數(shù),2n2,n為偶數(shù).(2)由(1)得bn=log2a2na2n-1=n2n-1.設(shè)bn的前n項和為Sn,則Sn=1120+2121+3122+(n-1)12n-2+n12n-1,12Sn=1121+2122+3123+(n-1)12n-1+n12n,上述兩式相減,得12Sn=1+12+122+12n-1-n2n=1-12n1-12-n2n=2-22n-n2n,整理得,Sn=4-n+22n-1.所以,數(shù)列bn的前n項和為4-n+22n-1,nN*.16.(1)解 G(A)的元素為2和5.(2)證明 因為存在an使得ana1,所以iN*|2iN,aia1.記m=miniN*|2iN,aia1,則m2,且對任意正整數(shù)km,aka1a1.由(2)知G(A).設(shè)G(A)=n1,n