第二章2.3第4课时一、选择题1.在如图的表格中,每格填上一个数字后,使每一横行成等差数列,每一纵列成等比数列,则a+b+c的值为()121abcA.1B.2C.3D.4[答案]A[解析]由题意知a=,b=,c=,故a+b+c=1.2.若Sn是数列{an}的前n项和,且Sn=n2,则{an}是()A.等比数列,但不是等差数列B.等差数列,但不是等比数列C.等差数列,但也是等比数列D.既不是等差数列,又不是等比数列[答案]B[解析]Sn=n2,Sn-1=(n-1)2(n≥2),∴an=Sn-Sn-1=n2-(n-1)2=2n-1(n≥2),又a1=S1=1满足上式,∴an=2n-1(n∈N*)∴an+1-an=2(常数)∴{an}是等差数列,但不是等比数列,故应选B.3.设等差数列{an}的前n项和为Sn.若a1=-11,a4+a6=-6,则当Sn取最小值时,n等于()A.6B.7C.8D.9[答案]A[解析]设等差数列的公差为d,由由a4+a6=-6得2a5=-6,∴a5=-3.又 a1=-11,∴-3=-11+4d,∴d=2,∴Sn=-11n+×2=n2-12n=(n-6)2-36,故当n=6时Sn取最小值,故选A.4.等比数列{an}的前n项和为Sn,且4a1,2a2,a3成等差数列.若a1=1,则S4=()A.7B.8C.15D.16[答案]C[解析]设等比数列的公比为q,则由4a1,2a2,a3成等差数列,得4a2=4a1+a3,∴4a1q=4a1+a1q2,又 a1=1,∴q2-4q+4=0,q=2.∴S4==15.5.设Sn是等差数列{an}的前n项和,已知a2=3,a6=11,则S7等于()A.13B.35C.49D.63[答案]C[解析] a1+a7=a2+a6=3+11=14,∴S7==49.6.在数列{an}中,a1,a2,a3成等差数列,a2,a3,a4成等比数列,a3,a4,a5的倒数成等差数列,则a1,a3,a5()A.成等差数列B.成等比数列C.倒数成等差数列D.不确定[答案]B[解析]由题意,得2a2=a1+a3,a=a2·a4,①=+.②∴a2=,代入①得,a4=③③代入②得,=+,∴+=+,∴a=a1a5.二、填空题7.(·天津理,11)设{an}是首项为a1,公差为-1的等差数列,Sn为其前n项和,若S1,S2,S4成等比数列,则a1的值为________.[答案]-[解析]本题考查等差数列等比数列综合应用,由条件:S1=a1,S2=a1+a2=a1+a1+d=2a1-1,S4=a1+a2+a3+a4=a1+a1+d+a1+2d+a1+3d=4a1+6d=4a1-6,∴(2a1-1)2=a1·(4a1-6),即4a+1-4a1=4a-6a1,∴a1=-.8.设等差数列{an}的前n项和为Sn,若S9=72,则a2+a4+a9=________.[答案]24[解析]设等差数列的首项为a1,公差为d,则a2+a4+a9=3a1+12d,又S9=72,∴S9=9a1+×9×8×d=9a1+36d=72,∴a1+4d=8,∴a2+a4+a9=3(a1+4d)=24.三、解答题9.(~学年度贵州遵义四中高二期中测试)已知等差数列{an}的公差不为0,a1=25,且a1,a11,a13成等比数列.(1)求{an}的通项公式;(2)求a1+a4+a7+a10…++a3n-2.[解析](1)设公差为d,由题意,得a=a1·a13,即(a1+10d)2=a1(a1+12d),又a1=25,解得d=-2或d=0(舍去).∴an=a1+(n-1)d=25+(-2)×(n-1)=27-2n.(2)由(1)知a3n-2=31-6n,∴数列a1,a4,a7,a10…,,是首项为25,公差为-6的等差数列.令Sn=a1+a4+a7…++a3n-2==-3n2+28n.一、选择题1.根据市场调查结果,预测某种家用商品从年初开始的n个月内累积的需求量Sn(万件)近似地满足Sn=·(21n-n2-5)(n=1,2…,,12).按此预测,在本年度内,需求量超过1.5万件的月份是()A.5月、6月B.6月、7月C.7月、8月D.8月、9月[答案]C[解析]设第n个月份的需求量超过1.5万件.则Sn-Sn-1=(21n-n2-5)-[21(n-1)-(n-1)2-5]>1.5,化简整理,得n2-15n+54<0,即6<n<9.∴应选C.2.已知等比数列{an}满足an>0,n=1,2…,,且a5·a2n-5=22n(n≥3),则当n≥1时,log2a1+log2a3…++log2a2n-1=()A.n(2n-1)B.(n+1)2C.n2D.(n-1)2[答案]C[解析]由已知,得an=2n,log2a2n-1=2n-1,∴log2a1+log2a3…++log2a2n-1=1+3…++(2n-1)=n2.3.等比数列{an}共有2n+1项,奇数项之积为100,偶数项之积为120,则an+1等于()A.B.C.20D.110[答案]B[解析]由题意知:S奇=a1·a3·…·a2n+1=100,S偶=a2·a4·…·a2n=120,∴=·a1=a1·qn=an+1,∴an+1==.4.已知数列{an}的首项a1=2,且an...
