好吧问答库 > 高数题目:∑1⼀2^n-n收敛还是发散怎么证明

高数题目:∑1⼀2^n-n收敛还是发散怎么证明

2025年04月08日 08:34
有4个网友回答
网友(1):

简单计算一下即可,答案如图所示

网友(2):

首先要注意, 你写的in应该是ln, 这种完全是低级错误
显然这个级数不可能绝对收敛, 因为n足够大时(ln n)^2/n>1/n, 而sum 1/n已经发散了
然后证明sum(-1)^n(ln n)^2/n收敛, 也就是条件收敛, 这可以用Abel--Dirichlet判别法:
令a_n=(-1)^n/n^{1/2}, b_n=(ln n/n^{1/4})^2, 那么sum a_n收敛, b_n在n充分大时单调有界

网友(3):

收敛的,用比较审敛法的比值形式。除以1/2^n,极限是1

网友(4):

你做作业么

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