This is a calculus problem. I don't know Russian.
Показать, что существуют последовательности, расходящиеся в $+\infty$ (сходящиеся к нулю) и несравнимые с точки зрения скорости стремления к $+\infty$ (сходимости к нулю).
2026-05-10 16:56:50.1778432210
Can anybody tell me what this problem is about?
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Show that there exist sequences which diverge (namely limit of sequence equals $+\infty$) (or converge to 0) and these sequences aren't compareble with respect to rate of convergence (or rate it goes to infinity with(i.e. diverge)). Is my wording clear?I'm sorry for my English.