Calculus II

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Bounded sequence

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Calculus II

Definition

A bounded sequence is a sequence of numbers where all elements lie within a fixed finite interval. Mathematically, a sequence $\{a_n\}$ is bounded if there exists real numbers $M$ and $m$ such that $m \leq a_n \leq M$ for all $n$.

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5 Must Know Facts For Your Next Test

  1. A sequence can be bounded above, below, or both.
  2. If a sequence is convergent, it must be bounded.
  3. Not all bounded sequences are convergent.
  4. The Bolzano-Weierstrass theorem states that every bounded sequence has at least one convergent subsequence.
  5. To show that a sequence is bounded, you need to find specific bounds $M$ and $m$.

Review Questions

  • What does it mean for a sequence to be bounded?
  • How can you prove that a given sequence is bounded?
  • Is every bounded sequence also convergent? Why or why not?
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