Intro to Cauchy Sequences and Cauchy Criterion | Real Analysis

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  • Опубліковано 19 лис 2024
  • What are Cauchy sequences? We introduce the Cauchy criterion for sequences and discuss its importance. A sequence is Cauchy if and only if it converges. So Cauchy sequences are another way of characterizing convergence without involving the limit. A sequence being Cauchy roughly means that its terms get arbitrarily close to each other - no limit involved!
    We'll see an example of proving a sequence is Cauchy - we prove {1/n} is a Cauchy sequence using the Archimedean property.
    Cauchy Sequences are Bounded: • Proof: Cauchy Sequence...
    Proof Convergent Sequences are Cauchy: • Proof: Convergent Sequ...
    Proof Cauchy Sequences Converge: • Proof: Cauchy Sequence...
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