等比数列,Sn=1 4an 1
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A(n+1)=2S(n)+1,A(n)=2S(n-1)+1,A(n+1)-A(n)=2[S(n)-S(n-1)]=2[A(n)],A(n+1)=3A(n)所以,数列{A(n)}是首项为1,公比为3的等
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
摆动数列:1,-1,1,-1…为公比q=-1的等比数列,显然数列{Sn}中有无数项为零,故选:D
设各项均为正数的等比数列{an}的公比等于q,∵Sn=2,S3n=14,∴q≠1∴a1(1-qn)1-q=2,a1(1-q3n)1-q=14,解得 qn=2,a11-q=-2.∴S4n=a1
设{an}的公比为q,则a2=2q,a3=2q^2则(a2+1)^2=(a1+1)(a3+1)即(2q+1)^2=3(2q^2+1)解得q=1所以{an}为常数数列Sn=na1=2n
设等比数列{a[n]}的公比为q则S[n]=a[1](1-qⁿ)/(1-q)=2(1-qⁿ)/(1-q)则S[n]+1=2(1-qⁿ)/(1-q)+1S[1]+1=
(a2+1)²=(a1+1)(a3+1)a1=2,设an公比q(2q+1)²=3(2q²+1)4q²+4q+1=6q²+32q²-4q+2=
因数列{an}为等比,则an=2qn-1,因数列{an+1}也是等比数列,则(an+1+1)2=(an+1)(an+2+1)∴an+12+2an+1=anan+2+an+an+2∴an+an+2=2a
n=1时,a1=1+3a1.即a1=-1/2.n>1时,an=Sn-Sn-1=1+3an-(1+3a(n-1))=3an-3a(n-1),即an=3/2a(n-1),即an=-1/2*(3/2)^(n
Sn,S2n-Sn,S3n-S2n成等比数列48,12,3S3n-S2n=3S3n=3+S2n=63
因为an=Sn-S(n-1),注意到(n-1)/[n(n+1)]=(n-1)/n-(n-1)/(n+1)=1-1/n-(1-2/(n+1))=2/(n+1)-1/n所以Sn+an=Sn+(Sn-S(n
设首项为a1,公比为r,当r=1时,Sn=n(a1),此时Sn/S(n+1)的极限为1r≠1时,Sn=a1(1-r^n)/(1-r),Sn/S(n+1)=(1-r^n)/(1-r^(n+1)),极限为
∵a(n+1)=(n+2)Sn/n且a(n+1)=S(n+1)-Sn∴S(n+1)-Sn=(n+2)*Sn/n∴S(n+1)=[(n+2)/n+1]Sn=(2n+2)/n*Sn∴S(n+1)/(n+1
Sn=2an-3n+5S(n-1)=2a(n-1)-3(n-1)+5相减an=2a(n-1)+3an+3=2a(n-1)+6an+3=2[2a(n-1)+3]
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
30http://zhidao.baidu.com/question/545777455.html这个是详解地址
(1)∵S3=a1+a2+a3=14,S6=a1+a2+…+a6=126∴a4+a5+a6=112,∵数列{an}是等比数列,∴a4+a5+a6=(a1+a2+a3)q3=112∴q3=8∴q=2由a
因为n,an,Sn成等差数列所以2an=Sn+n又因为an=Sn-Sn-1所以Sn+n=2Sn-1+2n左右两边同时加2Sn+n+2=2Sn-1+2n+2右边再变化Sn+n+2=2Sn-1+2n+2-
已知Sn=2An-1取n=1得:S1=2A1-1又因为S1=A1,解上述方程可得:A1=1Sn=2An-1S(n-1)=2A(n-1)-1注:"n-1"为下标上下两式相减得:Sn-S(n-1)=2An
(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