已知数列an满足a1=二分之一,an 1=nan (n 1)(nan 1)

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已知数列an满足a1=二分之一,an 1=nan (n 1)(nan 1)
已知数列{an}满足a1=100,an+1-an=2n,则a

a2-a1=2,a3-a2=4,…an+1-an=2n,这n个式子相加,就有an+1=100+n(n+1),即an=n(n-1)+100=n2-n+100,∴ann=n+100n-1≥2n•100n-

已知数列{an}满足an=2an-1+2n+2,a1=2

你把这个数列看成俩部分a(n1)=2a(n1-1)a(n2)=2n+2an=(an1)+(an2)算算看

已知数列{an}满足a1=1,an+1=2an+2.

an+1=2an+2,an=-1,把an=-1代入bn=2^n/an,得,bn=-2^nb2-b1=-2^*2-(-2)=-6,所以{bn}是等差数列

已知数列{an}满足a1+a2+a3+.+an=n的平方,求数列通项

设前n项和为Sn,Sn=n的平方,那么前(n-1)项S(n-1)的和为(n-1)的平方.Sn-S(n-1)=an{an}的通项就是n的平方减(n-1)的平方结果是2n-1哎呀我的妈呀不会打n的平方累死

已知数列{an}满足a1=1,an+1=3an+1.

(1)在an+1=3an+1中两边加12:an+12=3(an−1+12),…2分可见数列{an+12}是以3为公比,以a1+12=32为首项的等比数列.…4分故an=32×3n−1−12=3n−12

若数列{An}满足An+1=An^2,则称数列{An}为“平方递推数列”,已知数列{an}中,a1=9,点(an,an+

x=anf(x)=a(n+1)代入函数方程a(n+1)=an^2+2ana(n+1)+1=an^2+2an+1=(an+1)^2满足平方递推数列定义,因此数列{an+1}是平方递推数列.a1+1=10

已知数列an满足条件a1=-2 an+1=2an+1则a5

a[n+1]=2a[n]+1a[n+1]+1=2(a[n]+1)则{a[n]+1}是公比为2的等比数列a[1]+1=-2+1=-1所以a[n]+1=(-1)*2^(n-1)a[n]=-2^(n-1)-

已知数列{an}满足an+1=2an-1,a1=3,

(Ⅰ)依题意有an+1-1=2an-2且a1-1=2,所以an+1−1an−1=2所以数列{an-1}是等比数列;(Ⅱ)由(Ⅰ)知an-1=(a1-1)2n-1,即an-1=2n,所以an=2n+1而

已知数列An满足A1=二分之一,An乘以An+1=二分之一乘以四分之一的n次方,n属于正整数,求数列An的通项公式

根据A1求得A2=1/4,又An*An+1=(1/2)*(1/4)^n(An+1)*(An+2)=(1/2)*(1/4)*(1/4)^(n+1),两式相比,得(An+2)/An=1/4,所以当n为奇数

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=

已知数列{an}满足a1=2,an+1=2an+3.

(1)∵a1=2,an+1=2an+3.∴an+1+3=2(an+3),a1+3=5∴数列{an+3}是以5为首项,以2为公比的等比数列∴an+3=5•2n−1∴an=5•2n−1−3(2)∵nan=

已知数列{an}满足An+1=2^nAn,且A1=1,则通项an

解An+1/An=2^n所以A2/A1=2所以数列是以1为首相2为公比的等比数列所以通向公式an=2^(n-1)

已知数列{AN}满足A1=1,AN+1=2AN+2的N次方.

1.a_(1)=1,a_(n+1)=2a_(n)+2^(n)----------------1b_(n)=a_(n)/2^(n)将式子1左右两边同时除以2^(n+1),则:b_(n+1)=b_(n)+

已知数列{an}满足,a1=2,a(n+1)=3根号an,求通项an

a1=2>0假设当n=k(k∈N+)时,ak>0,则a(k+1)=3√ak>0k为任意正整数,因此对于任意正整数n,an恒>0,数列各项均为正.a(n+1)=3√anlog3[a(n+1)]=log3

已知在数列{an}的前n项和Sn满足an+2SnSn-1=0(n大于2),a1=二分之一,求an

an+2SnSn-1=0Sn-Sn-1+2SnSn-1=01/Sn-1/Sn-1=21/Sn=2+2(n-1)Sn=1/nan=Sn-Sn-1=1/n-1/(n-1)1/2n=1an=-1/[n(n-

数列An满足a1=二分之一,A(n-1)+1=2An,(大于等于2,n属于N),求An通项公式

1.n≥2时,a(n-1)+1=2an2an-2=a(n-1)-1(an-1)/[a(n-1)-1]=1/2,为定值.a1-1=1/2-1=-1/2,数列{an-1}是以-1/2为首项,1/2为公比的

已知数列{an}满足an+1=an+n,a1等于1,则an=?

A2=A1+1A3=A2+2A4=A3+3.An=A(n-1)+(N-1)左式上下相加=右式上下相加An=A1+[1+2+3+...+(N-1)]An=1+[N(N-1)]/2

已知数列{an}满足a1=1/2,sn=n^2an,求通项an

∵s[n]=n^2a[n]∴s[n+1]=(n+1)^2a[n+1]将上述两式相减,得:a[n+1]=(n+1)^2a[n+1]-n^2a[n](n^2+2n)a[n+1]=n^2a[n]即:a[n+