设an前n项和为sn,4sn=an^2 2an-3,且a1,a2,a3,a4a5
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应该是“Sn=2an+Sn-1”吧?
(Ⅰ)因为a1=S1,2a1=S1+2,所以a1=2,S1=2,由2an=Sn+2n知:2an+1=Sn+1+2n+1=an+1+Sn+2n+1,得an+1=sn+2n+1①,则a2=S1+22=2+
(1)由已知有:2a1=4096得a1=2048,又an+sn=4096,an+1+Sn+1=4096,两式相减得an+1=an/2,所以an是以1/2为公比的等比数列,故an=2048*(1/2)^
因为Sn+1,Sn,Sn+2成等差数列S(n+1)+S(n+2)=2*S(n)(q^(n+1)-1)*a1/(q-1)+(q^(n+2)-1)*a1/(q-1)=2*(q^(n)-1)*a1/(q-1
解题思路:分析与答案如下,如有疑问请添加讨论,谢谢!点击可放大解题过程:最终答案:略
2^(n+1)-2^n=2*2^n-2^n=2^nb*an-2^n=(b-1)Sn,b*a(n+1)-2^(n+1)=(b-1)S(n+1)两式相减(左-左=右-右):[b*a(n+1)-2^(n+1
设数列{an}的前n项和为Sn,Sn=a1(3n−1)2(对于所有n≥1),则a4=S4-S3=a1(81−1)2−a1(27−1)2=27a1,且a4=54,则a1=2故答案为2
Sn=a1(1-q^n)/(1-q)Sn+1=a1[1-q^(n+1)]/(1-q)Sn+2=a1[1-q^(n+2)]/(1-q)2Sn+2=Sn+Sn+1a1[1-q^(n+1)]/(1-q)+a
Sn+1=4an+2Sn=4a(n-1)+2相减得Sn+1-Sn=4an+2-4a(n-1)-2an+1=4an-4a(n-1)an+1-2an=2(an-2an-1)bn=2bn-1(2)求数列{a
由1/S1+1/S2+1/S3+.+1/Sn=n/(n+1),知,当n=1时,s1=2,当n≥2时1/S1+1/S2+1/S3+.+1/Sn-1=(n-1)/n,两式相减得,1/sn=1/[n(n+1
(一)(1)由a1=1,S(n+1)=4an+2.可得:a1=1,a2=5,a3=16.a4=44.∴由bn=(an)/2^n得:b1=2/4,b2=5/4,b3=8/4,b4=11/4.显然,b1,
S(n+1)=Sn+a(n+1)=10Sn+10S(n+1)+10/9=10*(Sn+10/9)Sn+10/9成等比数列,q=10S1+10/9=10+10/9=100/9Sn+10/9=10*(n-
证明:(1)由于S(n+1)=4an+2则有:Sn=4a(n-1)+2两式相减,得:S(n+1)-Sn=4(an-a(n-1))a(n+1)-2an=2[an-2a(n-1)]由于bn=A(n+1)-
a1=1a2=s2-a1=2-1=1a3=s3-a1-a2=4-1-1=2a4=s4-a1-a2-a3=6-1-1-2=2a5=s5-a1-a2-a3-a4=8-1-1-2-2=2a6=s6-a1-a
(1)当n=1时,T1=2S1-1因为T1=S1=a1,所以a1=2a1-1,求得a1=1(2)当n≥2时,Sn=Tn-Tn-1=2Sn-n2-[2Sn-1-(n-1)2]=2Sn-2Sn-1-2n+
(1)∵an+Sn=4096,∴a1+S1=4096,a1=2048.当n≥2时,an=Sn-Sn-1=(4096-an)-(4096-an-1)=an-1-an∴anan−1=12an=2048(1
An+1=1/3Sn3An+1=Sn(1)3An=Sn-1(2)(1)-(2)得3An+1=4An(n大于等于2),所以An是以A2为首项q=4/3的等比数列A2=1/3A1,所以A2等于1/3An=
(1)令n=1,得a1=-1.Sn=2an+n,S(n+1)=2a(n+1)+n+1.两式相减,得a(n+1)=2a(n+1)-2an+1.整理得a(n+1)-1=2(an-1),a1-1=-2.综上
解题思路:考查数列的通项,考查等差数列的证明,考查数列的求和,考查存在性问题的探究,考查分离参数法的运用解题过程:
an+Sn=41a(n+1)+S(n+1)=2a(n+1)+Sn=422-1得2a(n+1)-an=0a(n+1)=1/2anan+Sn=4an≠0a(n+1)/an=1/2数列{an}是等比数列