已知数列{an}满足Sn等于2n-an,求出前四项,

由Sn^2=an(Sn-1/2),两边同时除以Sn,拆开括号,得到Sn=an-an/2Sn,移项,an-Sn=an/2Sn,两边同时除以an,乘以2,得到2(an-Sn)/an=1/Sn,那么1/(S

Sn^2=an×(Sn-1/2)=(Sn-Sn-1)×(Sn-1/2)整理,得Sn-1-Sn=2SnSn-1等式两边同除以SnSn-11/Sn-1/Sn-1=2,为定值.1/S1=1/a1=1/1=1

(2)bn=1/(2n-1)(2n+1)=1/2[1/(2n-1)-1/(2n+1)]Tn=1/2{1/1-1/3+1/3-1/5+1/5-1/7+...+1/(2n-1)-1/(2n+1)}=1/2

（1）由2S(n+1)+2S(n)=3a(n+1)^2可得2S(n)+2S(n-1)=3a(n)^2两式相减得2a(n+1)+2a(n)=3[a(n+1)^2-a(n)^2]由此可得a(n+1)=-a

1.n≥2时,an=Sn-S(n-1)=√Sn+√S(n-1)[√Sn+√S(n-1)][√Sn-√S(n-1)]=√Sn+√S(n-1)[√Sn+√S(n-1)][√Sn-√S(n-1)-1]=0算

2Sn(Sn-An)=-An2SnSn-1=Sn-1-Sn1/Sn-1/Sn-1=2{1/Sn}便是一个等差数列,其首项为1/S1=1/A1=1/2得出的结果便是：Sn＝2/(4n-3)An=2/(4

2倍的根号下Sn=An+1根号下Sn=(An+1)/2Sn=(An+1)^2/4An=Sn-S(n-1)=(An+1)^2/4-(A(n-1)+1)^2/4即：4An=(An)^2+2An-[A(n-

如图

（1）因为2an=Sn*S(n-1)所以2（Sn-S(n-1)）=Sn*S(n-1)两边同除Sn*S(n-1)整理的1/Sn-1/S(n-1)=-1/2(n>1)所以数列{1/Sn}是以1/Sn=1/

当n大于等于2时,由2Sn=b（Sn-1）+3可化为2（Sn-k）=b（Sn-1-k）其中2k-bk=3,求得k=3/（2-b）所以{Sn-k}是一首项为(S1-k)=（2-b）,公比为b/2的等比数

an=Sn-Sn-1=-SnS(n-1)(Sn-Sn-1)/[SnS(n-1)]=-11/S(n-1)-1/Sn=-11/Sn-1/S(n-1)=1,为定值.1/S1=1/a1=1/(1/2)=2数列

An+2Sn*Sn-1=0Sn-Sn-1+2Sn*Sn-1=01/Sn-1-1/Sn+2=01/Sn=2nSn=1/2n(n>=2)An=1/(2n-2n^2)(n>=2)=1/2(n=1)

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∴

已知数列a‹n›首相a₁=3,通项a‹n›和前n项和S‹n›之间满足2a‹n›=S̸

显然可递推求出:因为sn+1/sn=an-2=sn-s(n-1)-2,所以有1/sn=-s（n-1)-2,进而有sn=1/[-s(n-1)-2],据s1=a1=-1/2,得出:s2=-2/3,进而反复

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-

∵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

Sn=0.5n*an用an=Sn-S(n-1)代换,→Sn=0.5n*(Sn-S(n-1))化简得nS(n-1)=(n-2)Sn两边同除以n(n-1)(n-2)得到[S(n-1)]/[(n-1)(n-