Notes - Analysis I MT22, Monotone sequence theorem


Flashcards

What does the monotone sequence theorem say about an increasing $(a _ n)$?


It either diverges to $\infty$ or $a _ n \to \sup (\{a _ n : n \in \mathbb{N}\})$.

What does the monotone sequence theorem say about a decreasing $(a _ n)$?


It either diverges to $\infty$ or $a _ n \to \inf(\{a _ n : n \in \mathbb{N}\})$.

Given an increasing and bounded sequence $(a _ n)$, what do you show is the limit by using the suprema approximation property?


\[\alpha = \sup(\\{a_n : n \in N \\})\]

Given a decreasing and bounded sequence $(b _ n)$, what do you show is the limit by using the infimum approximation property?


\[\alpha = \inf(\\{a_n : n \in \mathbb{N}\\})\]



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