已知an=2an-1 2n(n>2),证明:an 2n是等差数列.

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已知an=2an-1 2n(n>2),证明:an 2n是等差数列.
一道【数列】解答题已知数列{an}满足an/an-1=(n+1)/(n-1),(n∈N*,n>1),a1=2注意:an-

an/a(n-1)=(n+1)/(n-1)(n>=2)a(n-1)/a(n-2)=n(n-2)...a2/a1=3/1上式全部相乘an/a1=(n+1)!/2(n-1)!=n(n+1)/2,an=n(

已知数列满足:A1=1.AN+1=1/2AN+N,N奇数,AN-2N.N偶数

(1)bn=a(2n+1)+4n-2b(n+1)=a(2n+3)+4(n+1)-2=a(2n+2+1)+4n+2=a(2n+2)-2(2n+2)+4n+2=a(2n+1+1)-2(2n+2)+4n+2

已知数列{an}满足an+1=2an+n+1(n∈N*).

(1)由已知a2=2a1+2,a3=2a2+3=4a1+7,若{an}是等差数列,则2a2=a1+a3,即4a1+4=5a1+7,得a1=-3,a2=-4,故d=-1.  &nbs

例1.已知数列{an}中,an-2/an=2n,且an〈0

因为an-2/an=2n所以:(an)^2-2nan-2=0根据万能公式:an=n-√(n^2+2),an=n+√(n^2+2)>0又因an<0所以:an=n-√(n^2+2),假设m>n>0那么am

已知an=1/2n(n+1),求Sn

由题得:an=1/2(1/n-1/(n+1);所以:a1=1/2(1-1/2);a2=1/2(1/2-1/3);a3=1/2(1/3-1/4);.an=1/2(1/n-1/(n+1);sn=a1+a2

已知数列{an}中,a1=2,an+1=an²+2an(n∈N+)

a(n+1)=an^2+2ana(n+1)+1=(an+1)^2log2[(a(n+1)+1]=2log2[(an)+1]log2[(a(n+1)+1]/log2[an+1]=2{log2[a(n+1

已知数列{an}满足a1=1,a2=2,an+2=an+an+12,n∈N*.

(1)证b1=a2-a1=1,当n≥2时,bn=an+1−an=an−1+an2−an=−12(an−an−1)=−12bn−1,所以{bn}是以1为首项,−12为公比的等比数列.(2)解由(1)知b

已知an=(2n+1)*3^n,求Sn

an=(2n+1)*3^na1=3*3^1a2=5*3^2a3=7*3^3.an=(2n+1)*3^nSn=3*3^1+5*3^2+7*3^3+.(2n+1)*3^n3Sn=3*3^2+5*3^3+7

已知数列{An}满足A1=0.5,A1+A2+…+An=n^2An(n∈N*),试用数学归纳法证明:An=1/n(n+1

假设An=1/n(n+1)成立当n=1时A1=1/2成立令n=k(k>=0)时Ak=1/k(k+1)成立当n=k+1A1+A2+…+Ak+A(k+1)=k^2*Ak+A(k+1)=(k+1)^2*A(

在数列{An}中,已知An+A(n+1)=2n (n∈N*)

(1)证明:∵在数列{a[n]}中,已知a[n]+a[n+1]=2n(n∈N*)∴用待定系数法,有:a[n+1]+x(n+1)+y=-(a[n]+xn+y)∵-2x=2,-x-2y=0∴x=-1,y=

已知数列{an}中,a1=1,满足an+1=an+2n,n属于N*,则an等于

应该是A(n+1)=An+2n吧~~~=>a(n+1)-an=2n所以an-a(n-1)=2(n-1)a(n-1)-a(n-2)=2(n-2)...a2-a1=2*1把左边加起来,右边加起来得到an-

已知数列{an}满足an+1=2an+3.5^n,a1=6.求an

a(n+1)-2an=3.5^n,则a2-2a1=3.5^1a3-2a2=3.5^2.a(n+1)-2an=3.5^n以上式子相加,得a(n+1)-a1-Sn=3.5+3.5^2+...+3.5^n=

已知A1=1,An=2An-1+n(n>1),求An.

[]为下标A[n]+n+2=2A[n-1]+2(n-1)+4设b[n]=A[n]+n+2b[1]=4b[n]=2[bn-1]b[n]=2*2^nA[n]=b[n]-2-nA[n]=2*2^n-2-n

已知an=5n(n+1)(n+2)(n+3),求数列{an}的前n项和Sn

【方法1:强行展开a(n)表达式】1+2+……+n=n(n+1)/21^2+2^2+……+n^2=n(n+1)(2n+1)/61^3+2^3+……+n^3=n^2(n+1)^2/41^4+2^4+……

已知数列{an}中a1=6,且an-an-1=(an-1/n)+n+1(n属于N*,n≥2),求an

an=(n+1)(n+2)再问:有木有过程?再答:原式整理后得到an=(n+1)(an-1/n+1)试值:a2=(2+1)(6/2+1)=(2+1)(2x3/2+1)=12=3x4a3=(3+1)(1

已知数列an中,a1=1 2a(n+1)-an=n-2/n(n+1)(n+2) 若bn=an-1/n(n+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=

已知数列{An},An+1=2(n+1)+An,求数列An通向

A(n+1)=An+2(n+1)A(n+1)-An=2(n+1)即An-A(n-1)=2nA(n-1)-A(n-2)=2(n-1).A3-A2=2*3A2-A1=2*2以上各式相加得:An-A1=2*

已知数列an=n^2-n+2,求Sn

sn=a1+a2+a3+.+an=(1^2+2^2+3^2+.+n^2)-(1+2+3+...+n)+2n=n(n+1)(n+2)/6-n(1+n)/2+2n再问:三次方?这是什么数列?再答:an=n

在数列{an}中,已知(a1+a2+…+an)/n=(2n-1)an

sn/n=(2n-1)an(n>=1),sn=(2n^2-n)an,s(n+1)=(2n^2+3n+1)a(n+1),两者相减可得(2n+3)an+1=(2n-1)an,an=(2n-3)*a(n-1

已知数列{an}满足an=2an-1+2n-1(n≥2),a1=5,bn=an−12n

(I)证明:∵an=2an-1+2n-1(n≥2),∴an−1=2(an−1−1)+2n,∴an−12n=an−1−12n−1+1.∴bn=bn-1+1.∴{bn}是首项为a1−12=5−12=2,公