已知数列an前n项和sn=-2分之3n平方

1.Sn=-2an+3有S(n-1)=-2a(n-1)+3则an=Sn-S(n-1)=-2an+2a(n-1)=>an=a(n-1)*2/3所以,{an}为共比数列,q=2/32.Sn=-2an+3有

因为Sn-Sn-1=n^2-3n-{(n-1)^2-3(n-1)}=2n-4.又由an=Sn-Sn-1,所以an=2n-4,最后还要验证一下,当n=1时,S1=a1,符合题意.d=an-an-1=2易

第一题,n=10时,Sn=-(a1+a2+a3+……）+2（a1+a2+……+a9)=-(9+10-n)n/2+90=(n^2-19n)/2+90.第二题实在是看不清楚你是怎么样写的题目第三题：1&#

sn=3*3^1+5*3^2+.+(2n+1)*3^n①3sn=3*3^2+5*3^3+.+(2n-1)*3^n+(2n+1)*3^(n+1)②①-②-2Sn=Sn-3Sn=-2n*3^(n+1),因

因为Sn=n^2*an.1Sn-1=（n-1)^2*an-1n≥2.21-2：an=n^2*an-（n-1)^2*an-1（n^2-1）*an=（n-1)^2*an-1（n+1)*an=（n-1)*a

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

sn=n^2ans(n-1)=(n-1)^2*a(n-1)sn-s(n-1)=n^2an-(n-1)^2*a(n-1)=an(n^2-1)an=(n-1)^2a(n-1)(n+1)an=(n-1)a(

Sn=12n-n^2Snmax=36Sn=12n-n^2Sn-1=12(n-1)-(n-1)^2两式相减an=12-2n+1=-2n+13数列{|An|}的前n项和Tn当n6时Tn=36+1+3+5+

n=1时,a1=S1=k+2n≥2时,Sn=2n²+kS(n-1)=2(n-1)²+kan=Sn-S(n-1)=2n²+k-2(n-1)²-k=4n-2数列{a

Sn=3＋2^nSn-1=3＋2^n-1an=sn-sn-1=3＋2^n-3-2^(n-1)=2^n-2^(n-1)=2*2^(n-1)-2^(n-1)=2^(n-1)

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

A(n+1)=S(n+1)-Sn=2(n+1)^2+3(n+1)+2-2n^2-3n-2=2n^2+4n+2+3n+3-2n^2-3n=4n+5An=5+4(n-1)

由题意,S(n)-S(n-1)=2a(n+1)-2a(n),即a(n)=2a(n+1)-2a(n),于是a(n+1)=a(n)*3/2,即a(n)是公比是q=3/2的等比数列,且首项是a(1)=1,所

因为Sn+Sn-1=3an所以Sn-1+Sn-1+an=3an2Sn-1=2anSn-1=an因为Sn=an+1所以Sn-Sn-1=an+1-anan=an+1-an2an=an+1an+1/an=2

n=1时,a1=S1=a+bn≥2时,Sn=a×n²+bnS(n-1)=a×(n-1)²+b两式相减得：an=Sn-S(n-1)=2a×n-a∴a(n-1)=2a×(n-1)-a∴

错项相减法

由题意：a1=1^2-8×1=-7由条件sn=n^2-8n…①s(n-1)=(n-1)^2-8(n-1)…②①-②得：sn-s(n-1)=2n-9由an=sn-s(n-1)故an=2n-9,此式适用于

1.n=1时,S1=a1=(a1²+a1)/2,整理,得a1²-a1=0a1(a1-1)=0a1=0(与已知不符,舍去)或a1=1S1=a1=1n≥2时,Sn=(an²+

当n=1时,a1=S1=1当n≥2时,an=Sn-S(n-1)=3n²-2n-3(n-1)²+2(n-1)=6n-5∵当n=1时,满足an=6n-5又∵an-a(n-1)=6n-5

Sn-S(n-1)=2An-2A(n-1)=An所以An=2A(n-1)An/2A(n-1)=2即An为等比为2的等比数列令n=1,S1=3+2A1=A1A1=-3所以An=-3*[2^(n-1)]