1.已知等差数列{an}的前n项和为Sn,若a3+a5=8,则S7=( ) A.28 B.32 C.56 D.24 7×(a1+a7)7×(a3+a5)
解析:S7===28.故选A. 22答案:A
2.等比数列{an}的前n项和为Sn,若2S4=S5+S6,则数列{an}的公比q的值为( ) A.-2或1 C.-2
B.-1或2 D.1
答案:C
a693.设等差数列{an}的前n项和为Sn,a1>0且a=11,则当Sn取最大值时,n的值为( )
5
A.9 B.10 C.11 D.12
解析:由题意,不妨设a6=9t,a5=11t,则公差d=-2t,其中t>0,因此a10=t,a11=-t,即当n=10时,Sn取得最大值.
答案:B
4.在各项均为正数的等比数列{an}中,若am+1·am-1=2am(m≥2),数列{an}的前n项积为Tn,若T2m-1=512,则m的值为( )
A.4 B.5 C.6 D.7
解析:由等比数列的性质可知am+1·am-1=a2m=2am(m≥2),∴am=2,即数列{an}为常数列,an=2,
∴T2m-1=22m1=512=29,即2m-1=9,所以m=5.
-
答案:B
a8+a91
5.已知等比数列{an}的各项都是正数,且3a1,2a3,2a2成等差数列,则=( )
a6+a7A.6 B.7 C.8 D.9
1
解析:∴3a1,2a3,2a2成等差数列, ∴a3=3a1+2a2,
∴q2-2q-3=0,∴q=3或q=-1(舍去). a8+a9a1q7+a1q8q2+q3∴=5=q2=32=9. 6=a6+a7a1q+a1q1+q答案:D
6.等比数列{an}的前n项和为Sn,若a1+a2+a3+a4=1,a5+a6+a7+a8=2,Sn=15,则项数n为( )
A.12 B.14 C.15 D.16 答案:D
7.已知各项均为正数的等比数列{an}中,a1a2a3=5,a7a8a9=10,则a4a5a6=( ) A.52 B.7 C.6 D.42 答案:A
解析:由题意知a1a2a3,a4a5a6,a7a8a9三数成等比数列,所以(a4a5a6)2=(a1a2a3)·(a7a8a9)=50.又an>0,
∴a4a5a6=52,故选A.
8.已知Sn是等比数列{an}的前n项和,若存在m∈N*,满足数列{an}的公比为( )
A.-2 B.2 C.-3 D.3 答案:B
S2ma2m5m+1
=9,=,则Smamm-1
a1(1-q2m)
1-qS2mS2m
解析:设公比为q,若q=1,则=2,与题中条件矛盾,故q≠1.∵=SmSma1(1-qm)
1-q=qm+1=9,∴qm=8.
2m1
5m+1a2ma1q
∴=m-1=qm=8=, ama1qm-1
-
∴m=3,∴q3=8, ∴q=2.
9.已知等比数列{an}中,a2=1,则其前3项的和S3的取值范围是( ) A.(-∞,-1] B.(-∞,0)∪(1,+∞) C.[3,+∞)
D.(-∞,-1]∪[3,+∞) 答案:D
an+m10.数列{an}满足a1=2且对任意的m,n∈N*,都有=an,则a3=________;{an}
am
的前n项和Sn=________.
an+m
【解析】 ∵=an,
am∴an+m=an·am,
∴a3=a1+2=a1·a2=a1·a1·a1=23=8. 令m=1,则有an+1=an·a1=2an,
∴数列{an}是首项为a1=2,公比为q=2的等比数列, 2(1-2n)n+1∴Sn==2-2.
1-2
【答案】 8 2n1-2
+
11.已知数列{an}满足a1=a2=1,an+2=an+1+an(n∈N*).若存在正实数λ使得数列{an
+1
+λan}为等比数列,则λ=________. 【解析】 由题意可知,
1
an+2+λan+1=(1+λ)an+1+an=(1+λ)?an+1+1+λan?,
??
∴
-1+5-1-51
=λ,解得λ=或λ=(舍),
221+λ
-1+5
∵a1=a2=1,∴a3=2,易验证当n=1时满足题意.故λ=. 2
-1+5
2
*
12.各项均不为零的等差数列{an}中,a1=2,若a2n≥2),则S2 016n-an-1-an+1=0(n∈N,【答案】 =________.
*2解析:由于a2n-an-1-an+1=0(n∈N,n≥2),即an-2an=0,∴an=2,n≥2,又a1=2,
∴an=2,n∈N*,故S2 016=4 032.
答案:4 032
13.设数列{an}的前n项和为Sn.若S2=4,an+1=2Sn+1,n∈N*,则a1=________,S5=________.
答案:1 121
14.已知数列{an}的各项均为正数,Sn为其前n项和,且对任意n∈N*,均有an,Sn,a2n成等差数列,则an=________.
2解析:∵an,Sn,a2n成等差数列,∴2Sn=an+an.
当n=1时,2a1=2S1=a1+a21. 又a1>0,∴a1=1.
222当n≥2时,2an=2(Sn-Sn-1)=an+a2n-an-1-an-1,∴(an-an-1)-(an+an-1)=0,
∴(an+an-1)(an-an-1)-(an+an-1)=0, 又an+an-1>0,∴an-an-1=1,
∴{an}是以1为首项,1为公差的等差数列, ∴an=n(n∈N*). 答案:n
9
15.已知等差数列{an}满足a3=2,前3项和S3=2. (1)求{an}的通项公式;
(2)设等比数列{bn}满足b1=a1,b4=a15,求{bn}的前n项和Tn.
35
16.设数列{an}的前n项和为Sn,n∈N*.已知a1=1,a2=2,a3=4,且当n≥2时,4Sn+2+5Sn=8Sn+1+Sn-1.
(1)求a4的值;
?1?
(2)证明:?an+1-2an?为等比数列;
?
?
(3)求数列{an}的通项公式.
(1)解:当n=2时,4S4+5S2=8S3+S1,
即4(a1+a2+a3+a4)+5(a1+a2)=8(a1+a2+a3)+a1,
4a3-a2
整理得a4=4, 35
又a2=2,a3=4, 7
所以a4=8. (2)证明:当n≥2时,有4Sn+2+5Sn=8Sn+1+Sn-1, 即4Sn+2+4Sn+Sn=4Sn+1+4Sn+1+Sn-1, ∴4(Sn+2-Sn+1)=4(Sn+1-Sn)-(Sn-Sn-1), 1
即an+2=an+1-4an(n≥2). 经检验,当n=1时,上式成立.
1?11?11??an+2-2an+1an+1-4an-2an+12an+1-2an
