等差数列的前n项和是sn已知S14>0

1、Sn=(a1+an)n/2所以nan/Sn=2an/(a1+an)=2[a1+(n-1)d]/[2a1+(n-1)d]上下除以(n-1)=2[a1/(n-1)+d]/[2a1/(n-1)+d]n-

1、Sn=(a1+an)n/2所以nan/Sn=2an/(a1+an)=2[a1+(n-1)d]/[2a1+(n-1)d]上下除以(n-1)=2[a1/(n-1)+d]/[2a1/(n-1)+d]n-

在等差数列中，∵SmSn=m2n2，∴aman＝2am2an＝a1+a2m−1a1+a2n−1＝a1+a2m−12a1+a2n−12＝a1+a2m−12×(2m−1)a1+a2n−12×(2n−1)×

S6=(a1+a6)*6/2=362a1+5d=12Sn-S(n-6)=180即[a(n-5)+an]*6/2=180最后6项的和是6an-15d=1802an-5d=60相加2(a1+an)=72S

由题意可得a1b1=S1T1=524=13，故a1=13b1．设等差数列{an}和{bn}的公差分别为d1 和d2，由S2T2=a1+a1+d 1b1+b1 +d&nbs

an+2Sn*Sn-1=0其中an=Sn-Sn-1代入上式：Sn-Sn-1+2Sn*Sn-1=0a1＝1/2,故Sn和Sn-1≠0,上式两边同除以Sn*Sn-1得：1/Sn-1-1/Sn+2＝0即：1

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-

由Sn=Sn-1/2Sn-1+1,两边同时取倒数可得1/Sn=(2Sn-1+1)/Sn-11/Sn=2+1/Sn-1即1/Sn-1/Sn-1=2故{1/Sn}是首项为1/2,公差为2的等差数列1/Sn

因为Sn=324,s(n-6)=144所以最后六项和=324-144=180=a(n-5)+a(n-4)+,+an又S6=36=a1+a2+,+a6两侧同时相加,有6(a1+an)=216a1+an=

等差数列前n项和Sn=na1+n*（n-1）*d/2n=6时S6=6a1+6*5*d/2S6=6a1+15d36=6a1+15da1=6-(5/2)dSn=na1+n*(n-1)*d/2=324将a1

{Sn^(1/2)}是等差数列的充要条件是：原数列{An}也是一个等差数列,并且其公差d=2A1≥0.证明：可设An=A1+（n-1）(2A1),(A1≥0）所以Sn=nA1+n(n-1)d/2=A1

a2=a1qa8=a1q^7a5=a1q^42a8=a2+a52a1q^7=a1q+a1q^42q^6=1+q^32q^6=1+q^32q^6-q^3-1=0(2q^3+1)(q^3-1)=0q^3=

An=n^2-17n分解因式得An=（n-17）n这个二次函数与x轴的交点是0和170和17的中点是8.5就是说n取8或9均可以使得Sn最小答案：8或9

证明：设等差数列{an}的首项为a1，公差为d，则Sn=na1+n(n−1)d2．bn＝Snn＝a1+n−12d．则bn+1−bn＝a1+n2d−a1−n−12d＝d2．∴数列{bn}是等差数列．

∵等差数列{an}{bn}的前n项和分别为Sn，Tn，∵SnTn＝7nn+3，∴a5b5=s9T9＝7×99+3=6312＝214，故答案为：214

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∴

a3=a1*q^2；a9=a1*q^8；a6=a1*q^5；因为a3,a9,a6是等差数列,所以,2a9=a3+a6.化简,2q^9=q^3+q^6.s3+s6=a1*（1-q^3）/（1-q）+a1

S5=(a1+a5)*5/2=30a1+a5=12a1+a1+4d=12a1+2d=6S10=(a1+a10)*10/2=10a1+a10=2a1+a1+9d=22a1+9d=2所以d=-2,a1=1

假设m>nSn=A1+A2+……+AnSm=A1+A2+……+An+A(n+1)+A(n+2)+……+AmSm-Sn=A(n+1)+A(n+2)+……+Am=0(共m-n项)从A(n+1)项到Am项也

由题意,S9-S3=S6-S9而S9-S3=A4+...+A9S6-S9=-(A7+A8+A9)而(A4+A5+A6)+2(A7+A8+A9)=0A3(Q+Q²+Q²)+2A6(Q