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Logarithmic, Exponential, and Other Transcendental Functions
Chapter 5 Logarithmic, Exponential, and Other Transcendental Functions
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Definition of the Natural Logarithmic Function and Figure 5.1
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Theorem 5.1 Properties of the Natural Logarithmic Function
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Theorem 5.2 Logarithmic Properties
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Definition of e and Figure 5.5
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Theorem 5.3 Derivative of the Natural Logarithmic Function
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Theorem 5.4 Derivative Involving Absolute Value
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Theorem 5.5 Log Rule for Integration
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Guidelines for Integration
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Integrals of the Six Basic Trigonometric Functions
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Definition of Inverse Function and Figure 5.10
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Theorem 5.6 Reflective Property of Inverse Functions and Figure 5.12
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Theorem 5.7 The Existence of an Inverse Function and Figure 5.13
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Guidelines for Finding an Inverse Function
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Theorem 5.8 Continuity and Differentiability of Inverse Functions
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Theorem 5.9 The Derivative of an Inverse Function
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Definition of the Natural Exponential Function and Figure 5.19
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Theorem 5.10 Operations with Exponential Functions
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Properties of the Natural Exponential Function
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Theorem 5.11 Derivative of the Natural Exponential Function
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Theorem 5.12 Integration Rules for Exponential Functions
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Definition of Exponential Function to Base a
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Definition of Logarithmic Function to Base a
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Properties of Inverse Functions
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Theorem 5.13 Derivatives for Bases Other Than e
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Theorem 5.14 The Power Rule for Real Exponents
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Theorem 5.15 A Limit Involving e
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Summary of Compound Interest Formulas
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Definitions of Inverse Trigonometric Functions
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Figure 5.29 Copyright © Houghton Mifflin Company. All rights reserved.
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Properties of Inverse Trigonometric Functions
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Theorem 5.16 Derivatives of Inverse Trigonometric Functions
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Basic Differentiation Rules for Elementary Functions
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Theorem 5.17 Integrals Involving Inverse Trigonometric Functions
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Basic Integration Rules (a > 0)
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Definitions of the Hyperbolic Functions
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Figure 5.37 Copyright © Houghton Mifflin Company. All rights reserved.
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Hyperbolic Identities
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Theorem 5.18 Derivatives and Integrals of Hyperbolic Functions
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Theorem 5.19 Inverse Hyperbolic Functions
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Figure 5.41 Copyright © Houghton Mifflin Company. All rights reserved.
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Theorem 5.20 Differentiation and Integration Involving Inverse Hyperbolic Functions
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