高考数学 数列求和 专题

  • 格式:doc
  • 大小:508.50 KB
  • 文档页数:4

高考数学 数列求和 专题时间:45分钟 分值:100分一、选择题(每小题5分,共30分)1.设数列{a n }的前n 项和为S n ,且a n =-2n +1,则数列{S nn}的前11项和为( )A .-45B .-50C .-55D .-66解析:S n =n [-1+(-2n +1)]2=-n 2,即S n n =-n ,则数列{S nn }的前11项和为-1-2-3-4-…-11=-66.答案:D2.若S n =1-2+3-4+…+(-1)n -1n ,则S 17+S 33+S 50等于( )A .1B .-1C .0D .2解析:S 2n =-n ,S 2n +1=S 2n +a 2n +1=-n +2n +1=n +1,∴S 17+S 33+S 50=9+17-25=1. 答案:A3.数列1,1+2,1+2+4,…,1+2+22+…+2n -1,…的前n 项和S n >1020,那么n 的最小值是( )A .7B .8C .9D .10解析:a n =1+2+22+…+2n -1=2n -1, ∴S n=(21+22+…+2n )-n =2(2n -1)2-1-n =2n +1-2-n . S n >1020 即2n +1-2-n >1020. ∵210=1024,1024-2-9=1013<1020. 故n min =10. 答案:D4.已知数列{2(n +1)2-1}的前n 项和为S n ,则lim n →∞S n 等于 ( )A .0B .1 C.32D .2解析:∵2(n +1)2-1=2n (n +2)=1n -1n +2∴S n =(11-13)+(12-14)+(13-15)+…+(1n -2-1n )+(1n -1-1n +1)+(1n -1n +2)=1+12-1n +1-1n +2.∴lim n →∞S n =lim n →∞ (1+12-1n +1-1n +2)=32. 答案:C5.已知S n 是等差数列{a n }的前n 项和,S 10>0且S 11=0,若S n ≤S k 对n ∈N *恒成立,则正整数k 的构成集合为( )A .{5}B .{6}C .{5,6}D .{7}解析:由S 10>0,且S 11=0得 S 10=10(a 1+a 10)2>0⇒a 1+a 10=a 5+a 6>0 S 11=11(a 1+a 11)2=0⇒a 1+a 11=2a 6=0,故可知{a n }为递减数列且a 6=0,所以S 5=S 6≥S n ,即k =5或6.答案:C6.(2009·江西高考)数列{a n }的通项a n =n 2(cos 2nπ3-sin 2nπ3),其前n 项和为S n ,则S 30为( )A .470B .490C .495D .510解析:a n =n 2·cos 2n 3π,a 1=12·(-12),a 2=22(-12),a 3=32,a 4=42(-12),…S 30=(-12)(12+22-2·32+42+52-2·62+…+282+292-2·302)=(-12)∑k =110[(3k -2)2+(3k-1)2-2·(3k )2]=(-12)∑k =110 (-18k +5)=-12=470. 答案:A二、填空题(每小题5分,共20分)7.数列{a n }的通项公式为a n =n +2n (n =1,2,3,…),则{a n }的前n 项和S n =__________. 解析:由题意得数列{a n }的前n 项和等于(1+2+3+…+n )+(2+22+23+…+2n )=n (n +1)2+2-2n +11-2=n (n +1)2+2n +1-2. 答案:n (n +1)2+2n +1-28.数列112+2,122+4,132+6,142+8…的前n 项和等于________.解析:a n =1n 2+2n =12⎝ ⎛⎭⎪⎫1n -1n +2∴S n =12⎣⎡⎝⎛⎭⎫1-13+⎝⎛⎭⎫12-14+⎝⎛⎭⎫13-15+…⎦⎤+⎝⎛⎭⎫1n -1n +2 =12⎝⎛⎭⎫1+12-1n +1-1n +2=34-2n +32(n +1)(n +2).答案:34-2n +32(n +1)(n +2)9.已知数列{a n }的通项公式为a n =2n -1+1,则a 1C 0n +a 2C 1n +a 3C 2n +…+a n +1C n n =________.解析:a 1C 0n +a 2C 1n +…+a n +1C n n =(20+1)C 0n +(21+1)C 1n +(22+1)C 2n +…+(2n +1)C n n =20C 0n +21C 1n +22C 2n +…+2n C n n +C 0n +C 1n +…+C n n =(2+1)n +2n =3n +2n .答案:2n +3n10.(2010·重庆质检二)设数列{a n }为等差数列,{b n }为公比大于1的等比数列,且a 1=b 1=2,a 2=b 2,a 2+a 62=b 2b 4,令数列{c n }满足c n =a n b n2,则数列{c n }的前n 项和S n 等于________.解析:设{a n }的公差为d ,{b n }的公比为q (q >1),∵a 2+a 62=b 2b 4,∴a 4=b 3,∴2+3d =2q 2①,由a 2=b 2,得:2+d =2q ②, 由①②得d =2,q =2,∴a n =2+(n -1)·2=2n ,b n =2·2n -1=2n .∴c n =a n b n2=n ·2n ,∴S n=c 1+c 2+…+c n =1·2+2·22+…+n ·2n ③∴2S n =1·22+2·23+…+n ·2n +1④,③-④得:-S n =2+(22+23+…+2n )-n ·2n +1=2(1-2n )1-2-n ·2n +1=(1-n )·2n +1-2, ∴S n =(n -1)2n +1+2.答案:(n -1)2n +1+2 三、解答题(共50分)11.(15分)求和:(1)11×3+13×5+…+1(2n -1)(2n +1).(2)12!+23!+34!+…+n (n +1)!. 解:(1)∵1(2n -1)(2n +1)=12(12n -1-12n +1)∴原式=12(1-13)+12(13-15)+…+12(12n -1-12n +1)=12(1-13+13-15+…+12n -1-12n +1) =12(1-12n +1)=n 2n +1. (2)∵n (n +1)!=(n +1)-1(n +1)!=1n !-1(n +1)!∴原式=11!-12!+12!-13!+…+1n !-1(n +1)!=1-1(n +1)!.12.(15分)已知数列{a n },{b n }满足a 1=2,2a n =1+a n a n +1,b n =a n -1,数列{b n }的前n 项和为S n ,T n =S 2n -S n .(1)求数列{b n }的通项公式; (2)求证:T n +1>T n ;解:(1)由b n =a n -1得a n =b n +1,代入2a n =1+a n a n +1,得2(b n +1)=1+(b n +1)(b n +1+1),整理,得b n b n +1+b n +1-b n =0,从而有1b n +1-1b n=1,∵b 1=a 1-1=2-1=1,∴{1b n }是首项为1,公差为1的等差数列, ∴1b n =n ,即b n =1n. (2)∵S n =1+12+…+1n,∴T n =S 2n -S n =1n +1+1n +2+…+12n ,T n +1=1n +2+1n +3+…+12n +12n +1+12n +2,T n +1-T n =12n +1+12n +2-1n +1>12n +2+12n +2-1n +1=0,(∵2n +1<2n +2)∴T n +1>T n .13.(20分)(2009·全国卷Ⅰ)在数列{a n }中,a 1=1,a n +1=(1+1n )a n +n +12n .(1)设b n =a nn,求数列{b n }的通项公式;(2)求数列{a n }的前n 项和S n .解:(1)由已知得b 1=a 1=1,且a n +1n +1=a n n +12n ,即b n +1=b n +12n ,从而b 2=b 1+12,b 3=b 2+122,…b n =b n -1+12n -1(n ≥2),于是b n =b 1+12+122+…+12n -1=2-12n -1(n ≥2).又b 1=1,故所求数列{b n }的通项公式为b n =2-12n -1.(2)由(1)知a n =n (2-12n -1)=2n -n2n -1.令T n =∑k =1nk2k -1,则2T n =∑k =1nk2k -2,于是T n =2T n -T n =∑k =0n -112k -1-n2n -1=4-n +22n -1. 又∑k =1n(2k )=n (n +1),所以S n =n (n +1)+n +22n -1-4.。