A. $\{a_{n} + \frac{1}{a_{n}}\}$ 发散
B. $\{a_{n} - \frac{1}{a_{n}}\}$ 发散
C. $\{e^{a_{n}} + \frac{1}{e^{a_{n}}}\}$ 发散
D. $\{e^{a_{n}} - \frac{1}{e^{a_{n}}}\}$ 发散
3 已知数列(a_{n)}(a_(n)≠0),若(a_{n)}发散,则A. $a_{n}+\frac{1}{a_{n}}$发散.B. $a_{n}-\frac{
(3)设a_(n)>0(n=1,2,...),S_(n)=a_(1)+a_(2)+...+a_(n),则数列S_(n)有界是数列a_(n)收敛的A. 充分必要条
已知数列a_n(a neq 0),若a_n发散,则()。 已知数列$\{a_n\}$($a \neq 0$),若$\{a_n\}$发散,则()。 A. $\{
2 给出以下4个命题①若lim_(ntoinfty)a_(n)=a,则当n充分大时,|a_(n)-a|0,当n充分大时,|a_(n)-a|0,当n充分大时,|a
2025·北京·高考真题)已知a_{n)}是公差不为零的等差数列,a_(1)=-2,若a_(3),a_(4),a_(6)成等比数列,则a_(10)=()A. -
3.[判断题]设A_(1),A_(2),...,A_(n)为n个事件,若对任意的i,j(1≤i,j≤n),均有P(A_(i)A_(j))=P(A_(i))P(A
若lim_(ntoinfty)a_(n)=0,则(a_{n)}必为单调递减序列。A. 对B. 错
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
9.(2025·全国一卷·高考真题)设数列(a_{n)}满足a_(1)=3,(a_(n+1))/(n)=(a_(n))/(n+1)+(1)/(n(n+1))(1
20.设a_(n)=int_(0)^1x^nsqrt(1-x^2)dx(n=0,1,2,...),则lim_(ntoinfty)((a_(n))/(a_(n-2