lim an2 3n-2 (n-1)2=3

来源:学生作业帮助网 编辑:作业帮 时间:2024/11/10 20:24:43
lim an2 3n-2 (n-1)2=3
化简:1/(n+1)(n+2)+1/(n+2)(n+3)+1/(n+3)(n+4)

1/(n+1)(n+2)+1/(n+2)(n+3)+1/(n+3)(n+4)=1/(n+1)-1/(n+2)+1/(n+2)-1/(n+3)+1/(n+3)-1/(n+4)=1/(n+1)-1/(n+

lim[(n+3)/(n+1))]^(n-2) 【n无穷大】

lim[(n+3)/(n+1)]^(n-2)=lim[1+2/(n+1)]^(n-2)=lim{[1+2/(n+1)]^[(n+1)/2]}^[(n-2)×2/(n+1)]=lime^[2(n-2)/

1 + (n + 1) + n*(n + 1) + n*n + (n + 1) + 1 = 2n^2 + 3n + 3

这很简单就是整式的加减法和乘法,大约是初一(七年级)下学期的内容1+(n+1)+n*(n+1)+n*n+(n+1)+1=1+n+1+n²+n+n²+n+1+1=2n²+3

化简[n^2+(n+1)^2]/n(n+1) 化简额

[n^2+(n+1)^2]/n(n+1)=n/(n+1)+(n+1)/n再问:我也化到那这步,还可以化吗?再答:=n/(n+1)+(n+1)/n=n/(n+1)+(1/n)+1很难说哪一步更好,因为这

Lim n-无穷大 n/(n^2+1^2)+n/(n^2+2^2)+.n/(n^2+n^2)

lim(n趋近无穷){n/(n^2+1)+n/(n^2+2^2)+...+n/(n^2+n^2)}=积分(x从0到1)1/(1+x^2)dx=arctanx(x从0到1)=pi/4.

计算:n(n+1)(n+2)(n+3)+1

原式=[n(n+3)[(n+1)(n+2)]+1=(n2+3n)[(n2+3n)+2]+1(n2+3n)2+2(n2+3n)+1=(n2+3n+1)2=n2+3n+1.

[3n(n+1)+n(n+1)(2n+1)]/6+n(n+2)化简

原式=(3n²+3n+2n²-3n²+n+6n²+12n)/6=(2n²+6n²+16n)/6=(n²+3n+8)/3

化简(n+1)(n+2)(n+3)

设n+2=x所以(n+1)(n+2)(n+3)=(x-1)*x*(x+1)=(x^2-1)*x=x^3-x将n+2=x代入,得n^3+3n^2*2+3n*2^2+2^3-n-2=n^3+6n^2+12

+(n-1)!+(n-2)!+.+(n-n)!等于什么?

这道题可以是等差数列,公差为1可以写成0+1+2+3+.n=n(n+1)/2

(1/(n^2 n 1 ) 2/(n^2 n 2) 3/(n^2 n 3) ……n/(n^2 n n)) 当N越于无穷大

un=(1/(n^2+n+1)+2/(n^2+n+2)+3/(n^2+n+3)……n/(n^2+n+n)),k/(n^2+n+n)≤k/(n^2+n+k)≤k/n^2==>(1+2+..+n)/(n^

n(n+1)(n+2)数列求和

可以用归纳法比较容易首先,n=1比较容易证明然后假设n时成立求n+1时的式子,代入得到

Sn=n(n+2)(n+4)的分项等于1/6[n(n+2)(n+4)(n+5)-(n-1)n(n+2)(n+4)]吗?

等于呀,你把后面的算式一道前面来n(n+2)(n+4)+1/6)(n-1)n(n+2)(n+4)=n(n+2)(n+4)[1+1/6(n-1)]=1/6n(n+2)(n+4)(n+5)

证明不等式:(1/n)^n+(2/n)^n+(3/n)^n+.+(n/n)^n

先证明对于任意x≠0,1+xf(0)=1>0,即1+x

n(n+1)(n+2)等于多少?

n(n+1)(n+2)=(n平方+n)(n+2)=n^3+3n^2+2n再答:望采纳!再答:不懂可以问我再问:啊咧,可以加你QQ么再问:3乘以27乘以9=3的x次方,则x等于多少?

阶乘(2n-1)!=(2n)!/(2^n*n!

设A=1*3*5*…*(2n-3)*(2n-1),则2*4*6*…*(2n-2)*(2n)A=(2n)!,(2^n)*1*2*3*…*n*A=(2n)!即(2n-1)!=(2n)!/[(2^n)*n!

2^n/n*(n+1)

1/2*f(1/2)=(1/2)^2+3*(1/2)^3...+(2n-1)*(1/2)^(n+1)f(1/2)-1/2*f(1/2)=1/2+2*(1/2)^2+2*(1/2)^3+...+2*(1

lim[n/(n*n+1*1)+n/(n*n+2*2)+...+n/(n*n+n*n)],当x趋向无穷大时,怎么求极限,

其实把上下都除以n^2,则极限等于定积分关于该积分所以结果为

当n为正偶数,求证n/(n-1)+n(n-2)/(n-1)(n-3)+...+n(n-2).2/(n-1)(n-3)..

可利用归纳法证明n=2时,2/1=2,成立假设n=2k时,k为正整数,结论成立则n=2k+2时,有(2k+2)/(2k+1)+(2k+2)(2k)/[(2k+1)(2k-1)]+...+(2k+2)(

(n+1)(n+2)/1 +(n+2)(n+3)/1 +(n+3)(n+4)/1

(n+1)(n+2)/1+(n+2)(n+3)/1+(n+3)(n+4)/1=(n+1)(n+2)+(n+2)(n+3)+(n+3)(n+4)=(n+2)(n+1+n+3)+n^2+7n+12=(n+