(Sn-1)平方=anSn
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当n>1时,an=sn-sn-1代入化简得:1/Sn-1/Sn-1=2所以:1/Sn=2n-1所以:Sn=1/(2n-1)当n>1时,an=sn-sn-1=-2/[(2n-1)(2n-3)]当n=1时
2Sn²=2anSn-an,知an=Sn-S(n-1)代换后化简可得(过程不难但打起来很闹心……)1/Sn-1/S(n-1)=2故而1/Sn的通项公式为1/Sn=2n-1(1/S1=1),即
因为S(n+1)-S(n)=A(n+1),根据题意有:2S(n+1)^2=2A(n+1)S(n+1)-A(n+1),将上式代入此式得:2S(n+1)^2=2[S(n+1)-S(n)]S(n+1)-S(
2sn^2=2ansn-an2sn^2=2[sn-s(n-1)]sn-[sn-s(n-1)]2sn^2=2sn^2-2sns(n-1)-sn+s(n-1)2sns(n-1)+sn-s(n-1)=01/
已知:数列{an}中,a1=1,Sn为数列{an}的前n项和,且2an/(anSn-Sn²)=1,(n≥2);(1).证明数列{1/Sn}是等差数列;(2).求数列{an}的通项公式.(1)
Sn=2*n²+1S(n-1)=2*(n-1)²+1Sn-S(n-1)=AnAn=2*n²+1-2*n²+4n-2-1An=4n-2N≥2A1=3
太简单了.2(S_n)^2=2a_nS_n-a_n=>2S_n(S_n-a_n)=-a_n=>2S_n*S_{n-1}=-a_n2S_n*S_{n-1}=-(S_n-S_{n-1})2=-1/S_{n
an=sn-s(n-1),2sn^2=2(sn-sn-1)sn-sn+s(n-1)=2sn^2-2s(n-1)sn-sn+s(n-1)2sns(n-1)=s(n-1)-sn2=1/sn-1/s(n-1
(2n-1)²=4n²-4n+1所以Sn=4*(1²+2²+……+n²)-4(1+2+……+n)+1*n=4*n(n+1)(2n+1)/6-4*n(n
1.证:n≥2时,2Sn²=2anSn-an=2[Sn-S(n-1)]Sn-[Sn-S(n-1)]整理,得S(n-1)-Sn=2SnS(n-1)等式两边同除以SnS(n-1)1/Sn-1/S
解:(1)由于2Sn平方=2anSn-an又:an=Sn-S(n-1)则:2Sn平方=2[Sn-S(n-1)]Sn-[Sn-S(n-1)]2Sn平方=2Sn平方-2SnS(n-1)-Sn+S(n-1)
2Sn的平方=2anSn-an2Sn(Sn-an)=-an2SnS(n-1)=S(n-1)-Sn1/Sn-1/Sn-1=2{1/Sn}等差数列公差2首项1/21/Sn=1/2+2(n-1)=[4n-3
Sn^2-n^2×Sn-(n^2+1)=0(Sn+1)[Sn-(n^2+1)]=0数列各项为非零实数,S1≠0,且Sn不恒为0,因此只有Sn=n^2+1n=1时,a1=S1=1+1=2n≥2时,an=
1/n^2+n=1/n(n+1)列项得1/n(n+1)=1/n-1/(n-1)然后累加
n=1时,(s1-1)^2=s1*s1即-2s1+1=0解得s1=1/2n=2时,(s2-1)^2=(s2-s1)*s2解得:s2=2/3n=3时,(s3-1)^2=(s3-s2)*s3解得:s3=3
2(S_n)^2=2a_nS_n-a_n=>2S_n(S_n-a_n)=-a_n=>2S_n*S_{n-1}=-a_n2S_n*S_{n-1}=-(S_n-S_{n-1})2=-1/S_{n-1}+1
由题意知:2an/[anSn-(Sn)²]=1(n>1)则:(Sn)²-anSn+2an=0(n>1)又因为:an=Sn-S(n-1)(n>1)所以:(Sn)²-[Sn-
证明:(1)∵an2-2anSn+1=0,an=Sn-Sn-1(n≥2)∴(Sn-Sn-1)2-2(Sn-Sn-1)Sn+1=0⇒Sn2-Sn-12=1故{Sn2}成等差数列.(2)∵a12-2a12
Sn=1^2-2^2+3^2-4^2+5^2-6^2+...+(-1)^(n-1)*n^2n为奇数时Sn=1^2+(-2^2+3^2)+(-4^2+5^2)+...+(-(n-1)^2+n^2)=1+