2020版高考数学一轮复习课后限时集训31数列求和文含解析北师大版
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课后限时集训(三十一)(建议用时:60分钟) A 组 基础达标一、选择题1.数列{a n }的通项公式为a n =(-1)n -1·(4n -3),则它的前100项之和S 100等于( )A .200B .-200C .400D .-400B [S 100=(4×1-3)-(4×2-3)+(4×3-3)-…-(4×100-3)=4×[(1-2)+(3-4)+…+(99-100)]=4×(-50)=-200.]2.在数列{a n }中,a 1=2,a 2=2,a n +2-a n =1+(-1)n,n ∈N *,则S 60的值为( ) A .990 B .1 000 C .1 100D .99A [n 为奇数时,a n +2-a n =0,a n =2;n 为偶数时,a n +2-a n =2,a n =n .故S 60=2×30+(2+4+…+60)=990.]3.数列{a n }的通项公式是a n =1n +n +1,若前n 项和为10,则项数n 为( )A .120B .99C .11D .121A [a n =1n +n +1=n +1-nn+1+n n +1-n=n +1-n ,所以a 1+a 2+…+a n =(2-1)+(3-2)+…+(n +1-n )=n +1-1=10. 即n +1=11,所以n +1=121,n =120.] 4.122-1+132-1+142-1+…+1n +2-1的值为( )A .n +1n +B .34-n +1n +C .34-12⎝ ⎛⎭⎪⎫1n +1+1n +2D .32-1n +1+1n +2 C [因为1n +2-1=1n 2+2n =1nn +=121n -1n +2, 所以122-1+132-1+142-1+…+1n +2-1=12⎝ ⎛⎭⎪⎫1-13+12-14+13-15+…+1n -1n +2=12⎝ ⎛⎭⎪⎫32-1n +1-1n +2=34-12⎝ ⎛⎭⎪⎫1n +1+1n +2.]5.S n =12+12+38+…+n2n 等于( )A .2n-n2nB .2n +1-n -22nC .2n -n +12n +1D .2n +1-n +22nB [由S n =12+222+323+…+n2n ,①得12S n =122+223+…+n -12n +n2n +1,② ①-②得,12S n =12+122+123+…+12n -n 2n +1 =12⎣⎢⎡⎦⎥⎤1-⎝ ⎛⎭⎪⎫12n 1-12-n 2n +1,所以S n =2n +1-n -22n.] 二、填空题6.(2017·全国卷Ⅱ)等差数列{a n }的前n 项和为S n ,a 3=3,S 4=10,则∑nk =1 1S k=________.2nn +1 [由⎩⎪⎨⎪⎧a 3=a 1+2d =3,S 4=4a 1+4×32d =10,得⎩⎪⎨⎪⎧a 1=1,d =1.∴S n =n ×1+n n -2×1=n n +2,1S n =2nn +=2⎝ ⎛⎭⎪⎫1n -1n +1. ∴∑nk =1 1S k =1S 1+1S 2+1S 3+…+1S n=2⎝ ⎛⎭⎪⎫1-12+12-13+13-14+…+1n -1n +1=2⎝⎛⎭⎪⎫1-1n +1=2nn +1.]7.有穷数列1,1+2,1+2+4,…,1+2+4+…+2n -1所有项的和为________.2n +1-n -2 [a n =1+2+4+…+2n -1=1-2n1-2=2n -1, 则S n =a 1+a 2+…+a n =(2+22+ (2))-n =-2n1-2-n =2n +1-n -2.]8.化简S n =n +(n -1)×2+(n -2)×22+…+2×2n -2+2n -1的结果是________.2n +1-n -2 [因为S n =n +(n -1)×2+(n -2)×22+…+2×2n -2+2n -1,①2S n =n ×2+(n -1)×22+(n -2)×23+…+2×2n -1+2n,②所以①-②得,-S n =n -(2+22+23+ (2))=n +2-2n +1,所以S n =2n +1-n -2.]三、解答题9.(2019·福州模拟)已知数列{a n }的前n 项和为S n ,且S n =2a n -1. (1)证明:数列{a n }是等比数列;(2)设b n =(2n -1)a n ,求数列{b n }的前n 项和T n .[解] (1)证明:当n =1时,a 1=S 1=2a 1-1,所以a 1=1, 当n ≥2时,a n =S n -S n -1=(2a n -1)-(2a n -1-1), 所以a n =2a n -1,所以数列{a n }是以1为首项,2为公比的等比数列. (2)由(1)知,a n =2n -1, 所以b n =(2n -1)×2n -1,所以T n =1+3×2+5×22+…+(2n -3)×2n -2+(2n -1)×2n -1,①2T n =1×2+3×22+…+(2n -3)×2n -1+(2n -1)×2n,②由①-②得-T n =1+2×(21+22+…+2n -1)-(2n -1)×2n=1+2×2-2n -1×21-2-(2n -1)×2n=(3-2n )×2n-3, 所以T n =(2n -3)×2n+3.10.(2019·唐山模拟)已知数列{a n }满足:1a 1+2a 2+…+n a n =38(32n -1),n ∈N *.(1)求数列{a n }的通项公式; (2)设b n =log 3a nn,求1b 1b 2+1b 2b 3+…+1b n b n +1.[解] (1)1a 1=38(32-1)=3,当n ≥2时,n a n =⎝ ⎛⎭⎪⎫1a 1+2a 2+…+n a n -1a 1+2a 2+…+n -1a n -1=38(32n -1)-38(32n -2-1)=32n -1,当n =1时,n a n=32n -1也成立,所以a n =n32n -1.(2)b n =log 3a nn=-(2n -1), 因为1b n b n +1=1n -n +=12⎝ ⎛⎭⎪⎫12n -1-12n +1,所以1b 1b 2+1b 2b 3+…+1b n b n +1=121-13+13-15+…+12n -1-12n +1=12⎝⎛⎭⎪⎫1-12n +1=n2n +1. B 组 能力提升1.1+⎝ ⎛⎭⎪⎫1+12+⎝ ⎛⎭⎪⎫1+12+14+…+1+12+14+…+1210的值为( )A .18+129B .20+1210C .22+1211D .18+1210B [设a n =1+12+14+…+12n -1=1×⎣⎢⎡⎦⎥⎤1-⎝ ⎛⎭⎪⎫12n 1-12=2⎣⎢⎡⎦⎥⎤1-⎝ ⎛⎭⎪⎫12n .则原式=a 1+a 2+…+a 11=2⎣⎢⎡⎦⎥⎤1-⎝ ⎛⎭⎪⎫121+2⎣⎢⎡⎦⎥⎤1-⎝ ⎛⎭⎪⎫122+…+2⎣⎢⎡⎦⎥⎤1-⎝ ⎛⎭⎪⎫1211 =2⎣⎢⎡⎦⎥⎤11-⎝ ⎛⎭⎪⎫12+122+…+1211=2⎣⎢⎡⎦⎥⎤11-12×⎝ ⎛⎭⎪⎫1-12111-12=2⎣⎢⎡⎦⎥⎤11-⎝⎛⎭⎪⎫1-1211 =2⎝⎛⎭⎪⎫11-1+1211=20+1210.] 2.已知数列{a n }满足a 1=1,a n +1·a n =2n (n ∈N *),则S 2 016=( ) A .22 016-1B .3·21 008-3 C .3·21 008-1D .3·21 007-2B [a 1=1,a 2=2a 1=2,又a n +2·a n +1a n +1·a n =2n +12n =2.∴a n +2a n=2. ∴a 1,a 3,a 5,…成等比数列;a 2,a 4,a 6,…成等比数列, ∴S 2 016=a 1+a 2+a 3+a 4+a 5+a 6+…+a 2 015+a 2 016 =(a 1+a 3+a 5+…+a 2 015)+(a 2+a 4+a 6+…+a 2 016) =1-21 0081-2+-21 0081-2=3·21 008-3.故选B.]3.(2019·龙岩模拟)已知S n 为数列{a n }的前n 项和,对n ∈N *都有S n =1-a n ,若b n =log 2a n ,则1b 1b 2+1b 2b 3+…+1b n b n +1=________.nn +1 [对n ∈N *都有S n =1-a n ,当n =1时,a 1=1-a 1,解得a 1=12. 当n ≥2时,a n =S n -S n -1=1-a n -(1-a n -1),化为a n =12a n -1.∴数列{a n }是等比数列,公比为12,首项为12.∴a n =⎝ ⎛⎭⎪⎫12n.∴b n =log 2a n =-n . ∴1b n b n +1=1-n -n -=1n -1n +1. 则1b 1b 2+1b 2b 3+…+1b n b n +1=⎝ ⎛⎭⎪⎫1-12+⎝ ⎛⎭⎪⎫12-13+…+⎝ ⎛⎭⎪⎫1n -1n +1=1-1n +1=n n +1.] 4.(2017·山东高考)已知{a n }是各项均为正数的等比数列,且a 1+a 2=6,a 1a 2=a 3. (1)求数列{a n }的通项公式;(2){b n }为各项非零的等差数列,其前n 项和为S n .已知S 2n +1=b n b n +1,求数列⎩⎨⎧⎭⎬⎫b n a n 的前n项和T n .[解] (1)设{a n }的公比为q , 由题意知a 1(1+q )=6,a 21q =a 1q 2,又a n >0,由以上两式联立方程组解得a 1=2,q =2, 所以a n =2n. (2)由题意知S 2n +1=n +b 1+b 2n +12=(2n +1)b n +1,又S 2n +1=b n b n +1,b n +1≠0, 所以b n =2n +1.令c n =b n a n ,则c n =2n +12n .因此T n =c 1+c 2+…+c n=32+522+723+…+2n -12n -1+2n +12n , 又12T n =322+523+724+…+2n -12n +2n +12n +1, 两式相减得12T n =32+⎝ ⎛⎭⎪⎫12+122+…+12n -1-2n +12n +1,所以T n =5-2n +52n .。