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Chapter 2 Limits and Continuity Section 2.3 Continuity
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Quick Review
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Quick Review
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Quick Review
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Quick Review
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Quick Review Solutions
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Quick Review Solutions
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Quick Review Solutions
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Quick Review Solutions
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What you’ll learn about
Definition of continuity at a point Types of discontinuities Sums, differences, products, quotients, and compositions of continuous functions Common continuous functions Continuity and the Intermediate Value Theorem …and why Continuous functions are used to describe how a body moves through space and how the speed of a chemical reaction changes with time.
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Continuity at a Point
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Example Continuity at a Point
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Continuity at a Point
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Continuity at a Point
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Continuity at a Point The typical discontinuity types are:
Removable (2.21b and 2.21c) Jump (2.21d) Infinite (2.21e) Oscillating (2.21f)
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Continuity at a Point
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Example Continuity at a Point
[5,5] by [5,10]
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Continuous Functions
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Continuous Functions [5,5] by [5,10]
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Properties of Continuous Functions
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Composite of Continuous Functions
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Intermediate Value Theorem for Continuous Functions
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Intermediate Value Theorem for Continuous Functions
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Intermediate Value Theorem for Continuous Functions
The Intermediate Value Theorem for Continuous Functions is the reason why the graph of a function continuous on an interval cannot have any breaks. The graph will be connected, a single, unbroken curve. It will not have jumps or separate branches.
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