题目内容

数列{an}满足a1=1,an+1=
1
2
an+n,n为奇数
an-2n,n为偶数
,且bn=a2n-2,n∈N*
(1)求a2,a3,a4
(2)求证数列{bn}是以
1
2
为公比的等比数列,并求其通项公式.
(3)设(
3
4
n•Cn=-nbn,记Sn=C1+C2+…+Cn,求Sn
(1)当a2=
3
2
a3=-
5
2
a4=
7
4

(2)
bn+1
bn
=
a2n+2-2
a2n-2
=
1
2
a2n+1+2n+1-2
a2n-2
=
1
2
(a2n-4n)+2n-1
a2n-2
=
1
2
a2n-1
a2n-2
=
1
2

b1=a2-2=-
1
2
,∴数列{bn}是公等比为
1
2
的等比数列,且bn=(-
1
2
)×(
1
2
)n-1=-(
1
2
)n

(3)由(2)得(
3
4
)nCn=n•(
1
2
)n,∴Cn=n(
2
3
)n
Sn=C1+C2++Cn=
2
3
+2×(
2
3
)2+3×(
2
3
)3++n×(
2
3
)n.①
2
3
Sn=(
2
3
)2+2×(
2
3
)3++(n-1)×(
2
3
)n+n×(
1
2
)n+1=(
2
3
[1-(
2
3
)n]
1-
2
3
)-n(
2
3
)n+1=2[1-(
2
3
)n]-n(
2
3
)n+1
Sn=6[1-(
2
3
)n]-3n(
2
3
)n+1=6-(
2
3
)n(6+2n)
练习册系列答案
相关题目
设b>0,数列{an}满足a1=b,an=
nban-1an-1+n-1
(n≥2)
(1)求数列{an}的通项公式;
(4)证明:对于一切正整数n,2an≤bn+1+1.
若数列{an}满足a1=1,a2=2,an=
an-1an-2
(n≥3),则a17等于
 
已知a>0,数列{an}满足a1=a,an+1=a+
1
an
,n=1,2,….
(I)已知数列{an}极限存在且大于零,求A=
lim
n→∞
an(将A用a表示);
(II)设bn=an-A,n=1,2,…,证明:bn+1=-
bn
A(bn+A)

(III)若|bn|≤
1
2n
对n=1,2,…都成立,求a的取值范围.
数列{an}满足a1=1,an=
12
an-1+1(n≥2)
(1)若bn=an-2,求证{bn}为等比数列;    
(2)求{an}的通项公式.
数列{an}满足a1=
4
3
,an+1=an2-an+1(n∈N*),则m=
1
a1
+
1
a2
+…+
1
a2013
的整数部分是(  )

违法和不良信息举报电话:027-86699610 举报邮箱:58377363@163.com

精英家教网