在使用公式an=sn-sn-1注意以下三点

数列{a(n)}中,已知s(n)=a(n)-1/s(n)-2,①：求出s(1),s(2),s(3),s(4),②：猜想数列{a(n)}的前n项和s(n)的公式,并加以证明s(1)=a(1)=a(1)-

取倒数1/(Sn+1)=(4n+3)/Sn令bn=1/(Sn)得b1=1b(n+1)=bn*(4n+3)得b(n+1)/bn=4n+3(1)同理bn/(bn-1)=4(n-1)+3(2)...b2/b

an,Sn,Sn-1/2成等比数列an(Sn-1/2)=Sn^2a2(S2-1/2)=S2^2a2(a2+1/2)=(a2+1)^2a2=-2/3a3(S3-1/2)=S3^2a3(a3-1/6)=(

解题思路：将an用Sn－S(n-1)表示，整理得到Sn与S(n-1)的关系，归结为等差数列的定义形式解题过程：数列{an}的首项an=1，前n项和sn之间满足，求证{1/sn}成等差数列；并求Sn的表

第一个搞定我就不罗嗦了即1/Sn-1/Sn-1=2所以有1/Sn-1/Sn-1=21/Sn-1-1/Sn-2=21/Sn-2-1/Sn-3=2…………1/S2-1/S1=2叠加得1/Sn-1/S1=2

/>a1=S1=1^2+1=2Sn=n^2+1Sn-1=(n-1)^2+1an=n^2+1-(n-1)^2-1=2n-1n=1时,a1=1,与a1=2矛盾,n=1时,a1=2数列{an}的通项公式为a

由题意可得an=2Sn^2/(2Sn-1)又由于an=Sn-S(n-1)即Sn-S(n-1)=2Sn^2/(2Sn-1)化简得Sn+2SnS(n-1)-S(n-1)=0两边同除SnS(n-1)得1/S

因为：An+1=2Sn,则A(n-1)+1=2S(n-1)那么：2Sn-2S(n-1)=（An+1）-（A(n-1)+1）（n>=2）又因为：2Sn-2S(n-1)=2An（n>=2）所以：2An=（

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

Tn=n/(n+2)+(n+2)/n-2=4/n(n+2)=2[1/n-1/(n+2)]于是T1+T2+T3+……Tn=2[1-1/3+1/2-1/4+1/3-1/5+……+1/（n-1）-1/（n+

/>an=sn-s(n-1)=an+n^2-n-[a(n-1)+(n-1)^2-(n-1)]=an-a(n-1)+2n-2a(n-1)=2(n-1)an=2n所以,数列an为公差为2的等差数列.

an=Sn-Sn-1=>an=n^2*an-(n-1)^2*an-1an/an-1=(n-1)/n+1)所以an-1/an-2=(n-2)/n)an-2/an-3=(n-3)/n-1)an-3/an-

Sn-a1=48,Sn-an=36,Sn-a1-a2-an-1-an=21,∴2Sn-(a1+an)=84Sn-(a1+an)-(a2+an-1)=21∴2Sn-2Sn/n=84Sn-4Sn/n=21

n>=2时：∵an=2Sn^2/[（2Sn）-1]∴Sn-(Sn-1)=2Sn^2/[（2Sn）-1]两边同时乘以（2Sn）-1并化简得2Sn(Sn-1)+Sn-(Sn-1)=0两边同时除以Sn(Sn

a1=2,点(根号Sn,根号Sn-1)在直线x-y-根号2=0上:√Sn-√S(n-1)=√2令bn=√Sn则bn是以√2为公差的等差数列bn=b1+(n-1)√2S1=a1=2所以b1=√S1=√2

∵等差数列{a[n]},S[n]=[(a[n]+1)/2]^2∴4S[n]=a[n]^2+2a[n]+1∵4S[n+1]=a[n+1]^2+2a[n+1]+1∴将上面两式相减,得：4a[n+1]=a[

n≥2时,an=Sn-S(n-1)=2Sn²/(2Sn-1)[Sn-S(n-1)](2Sn-1)=2Sn²-Sn-2SnS(n-1)+S(n-1)=0S(n-1)-Sn=2SnS(

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

sn/n=9-nsn=9n-n²n=1时,a1=S1-9-1=8n≥2时,an=Sn-S(n-1)=9n-n²-【9(n-1)-(n-1)²】=9n-n²-(-

Sn=1/3an—2Sn-1=1/3an-1—2Sn—Sn-1=1/3an—1/3an-1an=1/3an—1/3an-1an/an-1=-1/2q=-1/2S1=1/3a1—2a1=1/3a1—22