Suppose that {an} is a monotone sequence such that1 an 2 for all n. Must the sequence
Chapter 9, Problem 25(choose chapter or problem)
Suppose that \(\left\{a_{n}\right\}\) is a monotone sequence such that \(1 \leq a_{n} \leq 2\) for all \(n\). Must the sequence converge? If so, what can you say about the limit?
Equation Transcription:
Text Transcription:
{a_n}
1 leq a_n leq 2
n
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