chapter 15 vector analysis. copyright © houghton mifflin company. all rights reserved.15-2...
TRANSCRIPT
Chapter 15
Vector Analysis
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Definition of Vector Field
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Figure 15.1
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Figure 15.2
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Figure 15.3
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Definition of Inverse Square Field
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Definition of Conservative Vector Field
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Theorem 15.1 Test for Conservative Vector Field in the Plane
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Definition of Curl of a Vector Field
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Theorem 15.2 Test for Conservative Vector Field in Space
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Definition of Divergence of a Vector Field
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Theorem 15.3 Relationship Between Divergence and Curl
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Figure 15.8
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Definition of Line Integral
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Theorem 15.4 Evaluation of a Line Integral as a Definite Integral
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Figure 15.12
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Figure 15.13
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Definition of Line Integral of a Vector Field
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Theorem 15.5 Fundamental Theorem of Line Integrals
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Figure 15.22
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Theorem 15.6 Independence of Path and Conservative Vector Fields
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Figure 15.23
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Theorem 15.7 Equivalent Conditions
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Figure 15.25
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Figure 15.26
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Theorem 15.8 Green's Theorem
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Figure 15.27
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Theorem 15.9 Line Integral for Area
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Figure 15.34
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Definition of Parametric Surface
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Figure 15.35
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Figure 15.40
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Normal Vector to a Smooth Parametric Surface
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Figure 15.42
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Area of a Parametric Surface
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Figure 15.44
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Theorem 15.10 Evaluating a Surface Integral
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Figure 15.50
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Figure 15.51
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Definition of Flux Integral
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Theorem 15.11 Evaluating a Flux Integral
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Summary of Line and Surface Integrals
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Figure 15.54
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Theorem 15.12 The Divergence Theorem
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Figure 15.55
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Figure 15.59
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Figure 15.60
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Figure 15.61
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Figure 15.62 and Figure 15.63
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Theorem 15.13 Stokes's Theorem
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Figure 15.66
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Figure 15.67
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Summary of Integration Formulas