an=2^n-1,bn=2n-1 cn=an bn

A(n+1)=(1+1/n)An+(n+1)/2^nA(n+1)=(n+1)/n×An+(n+1)/2^n两边除n+1A(n+1)/(n+1)=An/n+1/2^nB(n+1)=Bn+1/2^nBn=

(n+1)/bn=2∴bn=b1×2^(n-1)b1=a2-a1=3-1=2∴bn=2^n∴a(n+1)-an=2^n∴a2-a1=2a3-a2=2^2a4-a3=2^3……an-a(n-1)=2^(

你应该是题目打错了,(b(n)+1)/bn=2,这个条件应该是b(n+1)/bn=2吧因为如果是你所说的bn将恒等于1等于1不要紧,关键是这样的话b1=a2-a1=2且b1=1矛盾如果是我所说条件的话

Sn=-an-(1/2)^(n-1)+2所以S(n-1)=-a(n-1)-(1/2)^(n-2)+2相减Sn-S(n-1)=an=-an-(1/2)^(n-1)+a(n-1)+(1/2)^(n-2)(

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

(1+√2)^n第k项=Cnk*(√2)^(k-1)bn不带√2,所以k-1是偶数所以除了k=1时,后面各项都有因数2所以后面各项都是偶数k=1,Cnk*(√2)^(k-1)=11加偶数是奇数所以bn

(1)a(n+1)=(1+1/n)an+(n+1)/(2^n)a(n+1)/(n+1)=(1/n)an+1/(2^n)a(n+1)/(n+1)-(1/n)an=1/(2^n)an/n-a(n-1)/(

lim{[(3n^2+cn+1)/(an^2+bn)]-4n}=5lim{[(3n^2+cn+1)-4n(an^2+bn)]/(an^2+bn)}=5lim{[-4an^3+(3-4b)n^2+cn+

1.a(n+1)=2an-a(n-1)a(n+1)-an=an-a(n-1)an为以1/4为首项,1/2为公差的等差数列an=n/2-1/4bn-an=bn-n/2+1/4b(n+1)-a(n+1)=

19/31An/Bn=[a1+(n-1)d]/[b1+(n-1)s]=2n/3n-1对比得到：a1=2d=4b1=8s=6a10/b10=38/62=19/31

an=2*3^(n-1)bn=an+(-1)^n*ln（an）=2*3^(n-1)+(-1)^n*[ln2+(n-1)ln3]Sn=b1+b2+..+bn=(3^n-1)+(-1)^n*[nln2+(

首先你要知道一个非常有用也很常见的不等式：x/(1+x)

(2)由已知得an=n(n+1),bn=(n+1)^2,所以an+bn=2n^2+3n+1>2n^2+2n=2n(n+1),所以1/an+bn

  这类问题你只要把握一个规律：an是等差数列,bn是等比数列,那么an*bn或an/bn的前n项和的求法就是乘以公比（这道题目是2）,然后就会出来另一个等比数列的求和.反正就是这

an+1=[(n+1)/n]*an+2(n+1),an+1/(n+1)=an/n+2bn=an/nbn+1=bn+2{bn}是等差数列b1=a1=1bn=2n-1an=n*bn=n(2n-1)a8=1

2a(n+1)-an=n-2/n(n+1)(n+2)2a(n+1)-2/(n+1)(n+2)=an-1/n(n+1)[a(n+1)-1/(n+1)(n+2)]/[an-1/n(n+1)]=1/2bn=

1、证明：a1=λ,a2=(2/3)a1+1-4=2λ/3-3,a3=(2/3)a2+2-4=4λ/9-4.若λ=0,a1=0,显然{an}不是等比数列；若λ≠0,则a2/a1=2/3-3/λ,a3/

a(n)=aq^(n-1),a>0,q>0.a+aq=a(1)+a(2)=2[1/a(1)+1/a(2)]=2[1/a+1/(aq)]=2(q+1)/(aq),a=2/(aq),q=2/a^2,a(n

将an带入bn得bn=n/3*2^(n-1)；将Tn展开为Tn=1/3（1+2/2+3/2^2+4/2^3+...+n/2^(n-1)）---此为1式然后等是两边同时1/2*Tn=1/3（1/2+2/

lg（1+a1+a2+.+an）=n1+Sn=10^nSn=10^n-1n=1时,a1=S1=9n≥2时,an=Sn-S(n-1)=10^n-10^(n-1)=9*10^（n-1）n=1时,上式也成立