等比数列{an}的前n项和sn=a*2^n a-2,则a=
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S4=a1+a2+a3+a4=a2/q+a2+a2*q+a2*q^2S4/a2=1/q+1+q+q^2=7.5
n,an,Sn成等差数列,所以n+Sn=2an,即Sn=2an-n,an+1=Sn+1-Sn=2an+1-n-1-2an+n=2an+1-2an-1化简就是an+1=2an+1an+1+1=2an+2
(Ⅰ)∵等比数列{an}的前n项和为Sn,S1,S3,S2成等差数列,∴2(a1+a1q+a1q2)=a1+a1+a1q,解得q=-12或q=0(舍).∴q=-12.(Ⅱ)∵a1-a3=3,q=-12
a1=S1=2+ka2=S2-S1=(4+k)-(2+k)=2a3=S3-S2=(8+k)-(4+k)=4等比则a2²=a1a34=4(2+k)k=-1
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S1=a1S2=a1(1+q)S3=a1(1+q+q^2)S1,S3,S2成等差数列即s3-s1=s2-s31+q+q^2-1=1+q-(1+q+q^2)q^2+q=-q^2q=0或-1/2如果a1-
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
a2=a1qa8=a1q^7a5=a1q^42a8=a2+a52a1q^7=a1q+a1q^42q^6=1+q^32q^6=1+q^32q^6-q^3-1=0(2q^3+1)(q^3-1)=0q^3=
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]
求出首项a1和公比q代入公式就可以了当q≠1时an=a1q^(n-1)sn=a1(1-q^n)/(1-q)当q=1时an=a1sn=na1
为了避免混淆,我把下角标放在内.首先从数列本身的基本意义出发a=S-S其次,从已知a=S(n+2)/n出发a=S*(n+1)/(n-1)因此S-S=S*(n+1)/(n-1)移项整理S=S
1、A(n+1)=(n+2)sn/n=S(n+1)-Sn即nS(n+1)-nSn=(n+2)SnnS(n+1)=(n+2)Sn+nSnnS(n+1)=(2n+2)SnS(n+1)/(n+1)=2Sn/
(Ⅰ)当q=1时,S3=3a1,S9=9a1,S6=6a1,∵2S9≠S3+S6,∴S3,S9,S6不成等差数列,与已知矛盾,∴q≠1.(2分)由2S9=S3+S6得:2•a1(1−q9)1−q=a1
1)设an=a1*q^(n-1),则有Sn=a1*(1-q^n)/(1-q),[Sn*Sn+2-(Sn+1)^2]=a1^2*{(1-q^n)*[1-q^(n+2)]-[1-q^(n+1)]^2}/(
a3=a1*q^2;a9=a1*q^8;a6=a1*q^5;因为a3,a9,a6是等差数列,所以,2a9=a3+a6.化简,2q^9=q^3+q^6.s3+s6=a1*(1-q^3)/(1-q)+a1
由题意,S9-S3=S6-S9而S9-S3=A4+...+A9S6-S9=-(A7+A8+A9)而(A4+A5+A6)+2(A7+A8+A9)=0A3(Q+Q²+Q²)+2A6(Q
这个直接用a5=s5-s4=(32+r)-(16+r)=16
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
a1=s1=5-aan=sn-s(n-1)=5^n-a-(5^(n-1)-a)=5^n-5^(n-1)=4*5^(n-1)当n=1时,an=4即5-a=4a=1