a1=1 2,Sn=n^2*an-n(n-1)
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Sn=(a1+an)n/2Sn=na1+n(n-1)d/2=n[2a1+(n-1)d]/2=na1+n²d/2-nd/2=n²d/2+n(a1-d/2)Sn=An²+Bn
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
an=-Sn.S(n-1)Sn-S(n-1)=-Sn.S(n-1)1/Sn-1/S(n-1)=11/Sn-1/S1=n-11/Sn=nSn=1/n
由题意得:2S(n+1)=4Sn+a1,则2Sn=4S(n-1)+a1解得:a(n+1)=2an,则{an}为等比数列,公比q=2所以,an=a1q^(n-1)=2^n同样:2S(n+1)=4Sn+a
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(
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
已知a_(n+1)=S_n得a_n=S_(n-1)(n>1)两式相减a_(n+1)-a_n=S_n-S_(n-1)=a_n(n>1)得a_(n+1)=2a_n(n>1)因为a_2=S_1=a_1=-2
an+1=2Snan-1=2Sn-1an+1-an-1=2anan=(-1)^(n+1)Sn=1/2+1/2*(-1)^(n+1)看懂了给我满意,没有别的要求,
2Sn=an+1那么2Sn-1=an-1+1两是相减2an=an-an-1an=-an-1这个数列相当于是a1,-a1,a1,-a1.nan这个数列就是a1,-2a1,3a1,-4a1,.,(n-1)
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/
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
(1)由sn=sn-12sn-1+1(n≥2),a1=2,两边取倒数得1Sn=1Sn-1+2,即1Sn-1Sn-1=2.∴{1sn}是首项为1S1=1a1=12,2为公差的等差数列;(2)由(1)可得
(1)S1=a1=-23,∵Sn+1Sn=an-2(n≥2,n∈N),令n=2可得,S2+1S2=a2-2=S2-a1-2,∴1S2=23-2,∴S2=-34.同理可求得S3=-45,S4=-56.(
Sn-1=(n-1)(n-1)an-1Sn-Sn-1=an=nnan-(n-1)(n-1)an-1(nn-1)an=(n-1)(n-1)an-1an=(n-1)/(n+1)*(n-2)/(n-1)*…
an=sn-s(n-1)代入得Sn=2S(n-1)+2^n,即Sn/2^n=S(n-1)/2^(n-1)+1所以Sn=(n+1/2)*2^n,所以an=Sn-S(n-1)=n*2^n+2^(n-1).
a[n+1]=a[n]/(a[n]+2)是不是这样子?那么两边同时取倒数.1/a[n+1]=[an+2]/an=1+2/an1/a[n+1]+1==2+2/an=2{1/an+1}所以形如1/an+1
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-
∵s[n]=n^2a[n]∴s[n+1]=(n+1)^2a[n+1]将上述两式相减,得:a[n+1]=(n+1)^2a[n+1]-n^2a[n](n^2+2n)a[n+1]=n^2a[n]即:a[n+
/>n≥2时,Sn=n²×anS(n-1)=(n-1)²×a(n-1)an=Sn-S(n-1)=n²×an-(n-1)²×a(n-1)(n²-1)an