三、解答题
11.数列{an}的前n项和为Sn,且Sn=(an-1),数列{bn}满足bn=bn-1-(n≥2),且b1=3.
(1)求数列{an}与{bn}的通项公式;
(2)设数列{cn}满足cn=an·log2(bn+1),其前n项和为Tn,求Tn.
解析:(1)对于数列{an}有Sn=(an-1),
Sn-1=(an-1-1)(n≥2),
由-,得an=(an-an-1),即an=3an-1,
当n=1时,S1=(a1-1)=a1,解得a1=3,
则an=a1·qn-1=3·3n-1=3n.
对于数列{bn},有bn=bn-1-(n≥2),
可得bn+1=bn-1+,即=.
bn+1=(b1+1)n-1=4n-1=42-n,
即bn=42-n-1.
(2)由(1)可知
cn=an·log2(bn+1)=3n·log2 42-n
=3n·log2 24-2n=3n(4-2n).
Tn=2·31+0·32+(-2)·33+…+(4-2n)·3n,
3Tn=2·32+0·33+…+(6-2n)·3n+(4-2n)·3n+1,
由-,得
-2Tn=2·3+(-2)·32+(-2)·33+…+(-2)·3n-(4-2n)·3n+1
=6+(-2)(32+33+…+3n)-(4-2n)·3n+1,
则Tn=-3++(2-n)·3n+1
=-+·3n+1.
12.已知数列{an}为等比数列,其前n项和为Sn,已知a1+a4=-,且对于任意的nN+有Sn,Sn+2,Sn+1成等差数列.
(1)求数列{an}的通项公式;
(2)已知bn=n(nN+),记Tn=+++…+,若(n-1)2≤m(Tn-n-1)对于n≥2恒成立,求实数m的范围.
解析:(1)设公比为q,
S1,S3,S2成等差数列,
2S3=S1+S2,
2a1(1+q+q2)=a1(2+q),得q=-,
又a1+a4=a1(1+q3)=-,
a1=-, an=a1qn-1=n.
(2)∵ bn=n,an=n,
=n·2n,
Tn=1·2+2·22+3·23+…+n·2n,
2Tn=1·22+2·23+3·24+…+(n-1)·2n+n·2n+1,
①-,得-Tn=2+22+23+…+2n-n·2n+1,
Tn=-=(n-1)·2n+1+2.
若(n-1)2≤m(Tn-n-1)对于n≥2恒成立,
则(n-1)2≤m[(n-1)·2n+1+2-n-1],
(n-1)2≤m(n-1)·(2n+1-1),
m≥.
令f(n)=,f(n+1)-f(n)=-=<0,
f(n)为减函数,
f(n)≤f(2)=.
m≥.即m的取值范围是.
13.数列{an}是公比为的等比数列,且1-a2是a1与1+a3的等比中项,前n项和为Sn;数列{bn}是等差数列,b1=8,其前n项和Tn满足Tn=nλ·bn+1(λ为常数,且λ≠1).
(1)求数列{an}的通项公式及λ的值;
(2)比较+++…+与Sn的大小.
解析:(1)由题意得(1-a2)2=a1(a3+1),
即2=a1,
解得a1=, an=n.
又即
解得或(舍).λ=.
(2)由(1)知Sn=1-n,
Sn=-n+1≥,
又Tn=4n2+4n,
==,
++…+
=1-+-+…+-
=<.
由可知,++…+
