Topology Lecture 23: Compactness III
We prove that closed, bounded intervals of the real line are compact, along with the Heine-Borel theorem, and the extreme value theorem. 00:00 Introduction 03:17 Closed & bounded intervals are compact 23:03 Heine-Borel: The compact subsets of R^n are exactly the closed & bounded ones 29:17 Extreme value theorem This lecture follows Lee's "Introduction to topological manifolds", chapter 4. A playlist with all the videos in this series can be found here: • Topology
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Topology Lecture 24: Closed Map Lemma
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The Concept So Much of Modern Math is Built On | Compactness
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Topology Lecture 01: Topological Spaces
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Trump Attends NBA Finals, Cries Election Fraud in California & Storms Out of Interview
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The Metric Topology
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When Math Isn’t Based in Reality
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The Insane Genius of a Formula 1 Gearbox
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The 4-Page Paper That Broke Mathematics
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The Pattern Nobody Can Prove (But Everyone Believes)
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The most beautiful formula not enough people understand
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Topology Lecture 21: Compactness I
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The biggest lie about the double slit experiment
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Four-manifolds with boundary and fundamental group Z
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Weird spaces where π = 4
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Professor Jiang: World War 3 Is About To Begin, Let Me Explain!
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I visited the world's hardest math class
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Open Covers, Finite Subcovers, and Compact Sets | Real Analysis
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The Most Misunderstood Concept in Math
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