A. 0
B. e
C. e^{-1}
D. +∞
9.设a_(n)=int_(0)^1x^nsqrt(1-x^2)dx,b_(n)=int_(0)^(pi)/(2)sin^ntdt,则极限lim_(ntoinf
20.设a_(n)=int_(0)^1x^nsqrt(1-x^2)dx(n=0,1,2,...),则lim_(ntoinfty)((a_(n))/(a_(n-2
2.[判断题] 判断:int_(0)^1x^m(1-x)^ndx=int_(0)^1x^n(1-x)^mdx,(m,nin N).()A. 对B. 错
4.证明:int_(0)^1x^m(1-x)^ndx=int_(0)^1x^n(1-x)^mdx(m,nin N).4.证明:$\int_{0}^{1}x^{m
设 M=int_(-(pi)/(2))^(pi)/(2) (sin x)/(1+x^2) cos^4 x dx,N=int_(-(pi)/(2))^(pi)/(
设数列|x_(n)|满足:x_(1)in(0,pi),x_(n+1)=sin x_(n)(nin N_(+)).证明lim_(ntoinfty)x_(n)存在,
设A_(1),A_(2),...,A_(n),...是事件列,若A_(n)subset A_(n+1),n=1,2,...,A=bigcap_(i=1)^inf
2、设级数sum_(n=1)^inftya_(n)收敛,lim_(ntoinfty)na_(n)=a.证明:sum_(n=1)^inftyn(a_(n)-a_(
(6)设 _(n)=dfrac (3)(2)(int )_(0)^dfrac (n{n+1)}(x)^n-1sqrt (1+{x)^n}dx, 则极限limna
设x_(0)=0,x_(n)=(1+2x_(n-1))/(1+x_(n-1))(n=1,2,3,...),则lim_(ntoinfty)x_(n)=设$x_{0