1.数列a 1+2,…,a k +2k ,…,a 10+20共有十项,且其和为240,则a 1+…+a k +…+a 10之值为
( )
A .31
B .120
C .130
D .185 解析:a 1+…+a k +…+a 10=240-(2+…+2k +…+20)=240-(2+20)×102=240-110=130.
答案:C
2.已知数列{a n }的通项公式是a n =2n -12n ,其前n 项和S n =321
64,
则项数n 等于 ( )
A .13
B .10
C .9
D .6 解析:∵a n =1-1
2
n ,
∴S n =(1-12)+(1-14)+(1-18)+…+(1-1
2n )
=n -(12+14+18+…+1
2n )
=n -12[1-(12)n ]1-
12
=n -1+12n ,
由S n =32164=n -1+1
2n ,
观察可得出n =6. 答案:D
3.已知数列{a n }中,a 1=2,点(a n -1,a n )(n >1,且n ∈N *)满足
y =2x -1,则a 1+a 2+…+a 10=________.
解析:∵a n =2a n -1-1,∴a n -1=2(a n -1-1) ∴{a n -1}为等比数列,则a n =2n -1+1, ∴a 1+a 2+…+a 10=10+(20+21+…+29) =10+1-210
1-2=1 033.
答案:1 033
4.设函数f ()=m +的导函数′(x )=2x +1,则数列
{
1
f (n )}(n ∈N *)的前n 项和是 ( ) A.
n n +1
B.
n +2n +1
C.
n
n -1
D.
n +1n
解析:f ′(x )=mx m -1+a =2x +1,∴a =1,m =2, ∴f (x )=x (x +1),
1
f (n )=1
n (n +1)=1
n -1
n +1,用裂项法求和得S n =n
n +1. 答案:A 5.数列a n =
1
n (n +1)
,其前n 项之和为9
10
,则在平面直角坐标系
中,直线(n +1)x +y +n =0在y 轴上的截距为 ( )
A .-10
B .-9
C .10
D .9
解析:数列的前n 项和为
1
1×2+1
2×3+…+1
n (n +1)=1-1
n +1=n n +1=9
10, 所以n =9,
于是直线(n +1)x +y +n =0即为10x +y +9=0, 所以在y 轴上的截距为-9. 答案:B
6.在数列{a n }中,a n =
1n +1+2n +1+…+n n +1,又b n =2
a n ·a n +1
,
求数列{b n }的前n 项的和. 解:由已知得:a n =
1
n +1(1+2+3+…+n )=n
2, b n =2
n 2·n +12
=8(1
n -1n +1
),
∴数列{b n }的前n 项和为
S n =8[(1-12)+(12-13)+(13-14)+…+(1n -1n +1)]
=8(1-1
n +1)=8n
n +1.
7.求和:S n =1a +2a 2+3a 3+…+a
n .
解:当a =1时,S n =1+2+3+…+n =n (n +1)
2
;
当a ≠1时,S n =1a +2a 2+3a 3+…+n
a
n ,
1
a S n =1a 2+2a 3+3a 4+…+n -1a n +n
a
n +1, 两式相减得,(1-1
a )S n =1
a +
1a
2
+1a
3
+…+
1a n
-
n a n +1
=
1a [1-(1a
)n ]
1-
1a
-
n
a n +1
,
即S n =
a (a n -1)-n (a -1)
a n (a -1)2
,
∴S n
=⎩
⎪⎨
⎪⎧
n (n +1)2,a =1,a (a n
-1)-n (a -1)
a n
(a -1)2
,a ≠1.
8.(2010·昌平模拟)设数列{a n }满足a 1+3a 2+32a 3+…+3n -
1
a n =n
3
,n ∈N *.
(1)求数列{a n }的通项公式;
(2)设b n =n
a n
,求数列{b n }的前n 项和S n .
