求sn=1 2X5 1 5X8 1 8X11

1/S(n+1)=3/Sn+4令1/Sn=bn则有b(n+1)=3bn+4b(n+1)+2=3(bn+2)等比数列,则bn+2=(b1+2)*3^(n-1)b1=1/S1=1/a1=1所以bn=3^n

=10*a+a;这一步错了第二个a应该是初始值a你这样写全是变量b了#includeintmain(){\x09inta,n,b,c,Sn,i;\x09scanf("%d%d",&a,&n);c=a;

当n=1时、有2s1+1=3a1,即有a1=1,因为2Sn+1=3an,所以2Sn+1+1=3an+1.后式减去前式,得2an+1=3an+1-3an.即有an+1=3an,为等比数列,且公比为3,所

因为但看1+2+3...+n这个数列,通项公式为n(n+1)/2=n^/2+n/2所以1=1/2(1^+1)1+2=1/2(2^+2)1+2+3=1/2(3^+3)以此类推,提出共因数1/2,合并括号

你说的应该是平方和的数列吧.解法如下：a(n)=n^2=n(n+1)-n,n(n+1)=[n(n+1)(n+2)-(n-1)n(n+1)]/3,n=[n(n+1)-(n-1)n]/2,a(n)=[n(

Sn-S(n-m)=A(n-m+1)+A(n-m+2)+……+A(n-m+m)=b共m项A(n-m+1)=A1+(n-m)dA(n-m+2)=A2+(n-m)d……A(n-m+m)=An=Am+(n-

设首项为a1,公比为r,当r＝1时,Sn＝n(a1),此时Sn/S(n+1)的极限为1r≠1时,Sn＝a1(1-r^n)/(1-r),Sn/S(n+1)＝(1-r^n)/(1-r^(n+1)),极限为

S3=a1+a2+a3=3a2=12a2=4设公差为d,则a1=a2-d=4-da3=a2+d=4+d2a1、a2、a3+1成等比数列,则a2²=(2a1)(a3+1)2(4-d)(4+d+

答案如下

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+

{an}是等差数列S3=a1+a2+a3=3a2=12a2=4设公差为da1=4-da3=4+d2a1,a2,a3+1成等比数列(a2)^2=2a1·(a3+1)4^2=2(4-d)(4+d+1)8=

An=6Sn/(An+3)6Sn=(An)^2+3Ann>=26S(n-1)=(A(n-1))^2+3A(n-1)6An=(An)^2+3An-(A(n-1))^2-3A(n-1)(An)^2-(A(

我会我会Sn+1=Sn-2nSn+1Sn两边同除以Sn+1*Sn得1/Sn+1-1/Sn=2n以此类推1/Sn-1/Sn-1=2(n-1)1/Sn-1-1/Sn-2=2(n-2)...1/S2-1/S

由1/S1+1/S2+1/S3+.+1/Sn=n/(n+1),知,当n=1时,s1=2,当n≥2时1/S1+1/S2+1/S3+.+1/Sn-1=（n-1）/n,两式相减得,1/sn=1/[n(n+1

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=

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

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

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(

设等差数列{an}的公差为d，由题意得a22＝2a1(a3+1)3a1+3×22d＝12，解得a1＝1d＝3或a1＝8d＝−4，∴sn=12n（3n-1）或sn=2n（5-n）．

2(Sn+1)(Sn)/(Sn-Sn+1)=1上下除以(Sn+1)(Sn)得到2/(1/Sn+1-1/Sn)=11/(Sn+1)-1/Sn=2因此1/Sn+1为等差数列,1/S1=1/a1=1/21/