若两个等差数列an和bn的前n项和是sn,tn,已知sn tn=7n n 3

S9/T9=9a5/9b5=a5/b5=63/12=21/4S8/T8=4(a4+a5)/[4(b4+b5)]=(a4+a5)/(b4+b5)=56/11S7/T7=7a4/7b4=a4/b4=49/

An=[2n/(3n+1)]BnAn-1=[2n/(3n+1)]Bn-1lim(n→∞)an/bn=lim(n→∞)[An-An-1]/[Bn-Bn-1]=lim(n→∞)[2n/(3n+1)][Bn

S(2n-1)=(A1+A(2n-1))×(2n-1)/2=(A1+A1+(2n-2)d)×(2n-1)/2=(A1+(n-1)d)×(2n-1)=An×(2n-1)同理T(2n-1)=Bn×(2n-

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

由AnBn＝7n+45n+3，可设An=kn（7n+45）⇒an=An-An-1=14kn+38k，设Bn=kn（n-3）⇒bn=Bn-Bn-1=2kn+2k，所以a2n=28kn+38k，a2nbn

Sn=n(A1+An)/2Tn=n(B1+Bn)/2Sn/Tn=(A1+An)/(B1+Bn)然后n代2n-1A2n-1+A1=2AnBn同理S2n-1/T2n-1=An/Bn=7(2n-1)/(2n

取N=13Sn=(a1+a13)X13/2Tn=(b1+b13)x13/2a1+a13=2Xa7同理b7则比值为92/79

∵SnTn=2n3n+1，∴anbn=a1+a2n−1b1+b2n−1=S2n−1T2n−1=2(2n−1)3(2n−1)+1=2n−13n−1∴limn→∞anbn=limn→∞2n−13n−1=l

由等差数列的通项公式可得a2+a5+a17+a22b8+b10+b12+b16=2(2a1+21d)2(2b1+21d′)=a1+a22b1+b22=22(a1+a22)222(b1+b22)2=S2

设Sn=k(7n^2+n)an=Sn-S(n-1)=k(14n-6)Tn=k(4n^2+27n)bn=Tn-T(n-1)=k(8n+23)an:bn==(14n-6)/(8n+23)再问：错·再答：哪

∵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

∵数列{an}、{bn}是等差数列，且其前n项和分别为An、Bn，由等差数列的性质得，A21＝(a1+a21)×212=21a11，B21＝(b1+b21)×212＝21b11，∵足AnBn＝7n+1

1.若两等差数列｛an｝｛bn｝的前n项和为AnBn,满足(An/Bn)=(7n+1)/4n+27则a11/b11的值?因为是等差数列,A21＝21×a11,B21＝21×b11所以a11/b11等于

∵SnTn＝7n+3n+3∴a8b8＝2a82b8=a1+a15b1+b15=152(a1+a15)152(b1+b15)=S15T15=7×15+315+3=6故答案为：6

由题意可得S14T14=14(a1+a14)214(b1+b14)2=2a72b7=a7b7=3×14+24×14−5=4451，故答案为：4451．

解析,Sn和Tn是an和bn的前n项和,因此,Sn/Tn=(7n+3)/(n+3)=[n(7n+3)]/[n(n+3)]=(7n²+3n)/(n²+3n)设Sn=k(7n²

等差数列求和公式求解S17=(a1+a17)*17/2=2a9*17/2=17a9同理T17=17b9a9/b9=S17/T17=37/50再问：答案怎么得到的？详细点再答：由sn/tn=(2n+3)

A9＝9a5(A9=a1+a2+...a9)(因为a1+a9=2a5,a2+a8=2a5,a3+a7=2a5,a4+a6=2a5)同样的道理,B9＝9b5所以a5/b5＝A9/B9＝28/21=4/3

等差数列数列的性质a1+a[2n-1]=2an因为S[2n-1]=[(2n-1)(a1+a[2n-1])]/2=(2n-1)anT[2n-1]=[(2n-1)(b1+b[2n-1])]/2=(2n-1

1、a9/b9=(a1+8d)/(b1+8m)=[(a1+a1+16d)/2]/[(b1+b1+16m)/2]=[17(a1+a17)/2]/[17(b1+b17)/2]=S17/T172、数列为首项