Test Bank for Single Variable CalculusEarly Transcendentals 8th Edition by James Stewart 1305693205 9781305693203

Ch 1: Functions and Models

Ch 1: Introduction

1.1: Four Ways to Represent a Function

1.1: Exercises

1.2: Mathematical Models: A Catalog of Essential Functions

1.2: Exercises

1.3: New Functions from Old Functions

1.3: Exercises

1.4: Exponential Functions

1.4: Exercises

1.5: Inverse Functions and Logarithms

1.5: Exercises

Ch 1: Review

Principles of Problem Solving

Ch 2: Limits and Derivatives

Ch 2: Introduction

2.1: The Tangent and Velocity Problems

2.1: Exercises

2.2: The Limit of a Function

2.2: Exercises

2.3: Calculating Limits Using the Limit Laws

2.3: Exercises

2.4: The Precise Definition of a Limit

2.4: Exercises

2.5: Continuity

2.5: Exercises

2.6: Limits at Infinity; Horizontal Asymptotes

2.6: Exercises

2.7: Derivatives and Rates of Change

2.7: Exercises

2.8: The Derivative as a Function

2.8: Exercises

Ch 2: Review

Ch 2: Problems Plus

Ch 3: Differentiation Rules

Ch 3: Introduction

3.1: Derivatives of Polynomials and Exponential Functions

3.1: Exercises

3.2: The Product and Quotient Rules

3.2: Exercises

3.3: Derivatives of Trigonometric Functions

3.3: Exercises

3.4: The Chain Rule

3.4: Exercises

3.5: Implicit Differentiation

3.5: Exercises

3.6: Derivatives of Logarithmic Functions

3.6: Exercises

3.7: Rates of Change in the Natural and Social Sciences

3.7: Exercises

3.8: Exponential Growth and Decay

3.8: Exercises

3.9: Related Rates

3.9: Exercises

3.10: Linear Approximations and Differentials

3.10: Exercises

3.11: Hyperbolic Functions

3.11: Exercises

Ch 3: Review

Ch 3: Problems Plus

Ch 4: Applications of Differentiation

Ch 4: Introduction

4.1: Maximum and Minimum Values

4.1: Exercises

4.2: The Mean Value Theorem

4.2: Exercises

4.3: How Derivatives Affect the Shape of a Graph

4.3: Exercises

4.4: Indeterminate Forms and l’Hospital’s Rule

4.4: Exercises

4.5: Summary of Curve Sketching

4.5: Exercises

4.6: Graphing with Calculus and Calculators

4.6: Exercises

4.7: Optimization Problems

4.7: Exercises

4.8: Newton’s Method

4.8: Exercises

4.9: Antiderivatives

4.9: Exercises

Ch 4: Review

Ch 4: Problems Plus

Ch 5: Integrals

Ch 5: Introduction

5.1: Areas and Distances

5.1: Exercises

5.2: The Definite Integral

5.2: Exercises

5.3: The Fundamental Theorem of Calculus

5.3: Exercises

5.4: Indefinite Integrals and the Net Change Theorem

5.4: Exercises

5.5: The Substitution Rule

5.5: Exercises

Ch 5: Review

Ch 5: Problems Plus

Ch 6: Applications of Integration

Ch 6: Introduction

6.1: Areas Between Curves

6.1: Exercises

6.2: Volumes

6.2: Exercises

6.3: Volumes by Cylindrical Shells

6.3: Exercises

6.4 Work

6.4: Exercises

6.5: Average Value of a Function

6.5: Exercises

Ch 6: Review

Ch 6: Problems Plus

Ch 7: Techniques of Integration

Ch 7: Introduction

7.1: Integration by Parts

7.1: Exercises

7.2: Trigonometric Integrals

7.2: Exercises

7.3: Trigonometric Substitution

7.3: Exercises

7.4: Integration of Rational Functions by Partial Fractions

7.4: Exercises

7.5: Strategy for Integration

7.5: Exercises

7.6: Integration Using Tables and Computer Algebra Systems

7.6: Exercises

7.7: Approximate Integration

7.7: Exercises

7.8: Improper Integrals

7.8: Exercises

Ch 7: Review

Ch 7: Problems Plus

Ch 8: Further Applications of Integration

Ch 8: Introduction

8.1: Arc Length

8.1: Exercises

8.2: Area of a Surface of Revolution

8.2: Exercises

8.3: Applications to Physics and Engineering

8.3: Exercises

8.4: Applications to Economics and Biology

8.4: Exercises

8.5: Probability

8.5: Exercises

Ch 8: Review

Ch 8: Problems Plus

Ch 9: Differential Equations

Ch 9: Introduction

9.1: Modeling with Differential Equations

9.1: Exercises

9.2: Direction Fields and Euler’s Method

9.2: Exercises

9.3: Separable Equations

9.3: Exercises

9.4: Models for Population Growth

9.4: Exercises

9.5: Linear Equations

9.5: Exercises

9.6: Predator-Prey Systems

9.6: Exercises

Ch 9: Review

Ch 9: Problems Plus

Ch 10: Parametric Equations and Polar Coordinates

Ch 10: Introduction

10.1: Curves Defined by Parametric Equations

10.1: Exercises

10.2: Calculus with Parametric Curves

10.2: Exercises

10.3: Polar Coordinates

10.3: Exercises

10.4: Areas and Lengths in Polar Coordinates

10.4: Exercises

10.5: Conic Sections

10.5: Exercises

10.6: Conic Sections in Polar Coordinates

10.6: Exercises

Ch 10: Review

Ch 10: Problems Plus

Ch 11: Infinite Sequences and Series

Ch 11: Introduction

11.1: Sequences

11.1: Exercises

11.2: Series

11.2: Exercises

11.3: The Integral Test and Estimates of Sums

11.3: Exercises

11.4: The Comparison Tests

11.4: Exercises

11.5: Alternating Series

11.5: Exercises

11.6: Absolute Convergence and the Ratio and Root Tests

11.6: Exercises

11.7: Strategy for Testing Series

11.7: Exercises

11.8: Power Series

11.8: Exercises

11.9: Representations of Functions as Power Series

11.9: Exercises

11.10: Taylor and Maclaurin Series

11.10: Exercises

11.11: Applications of Taylor Polynomials

11.11: Exercises

Ch 11: Review

Ch 11: Problems Plus

Appendixes

Appendix A: Numbers, Inequalities, and Absolute Values

Appendix B: Coordinate Geometry and Lines

Appendix C: Graphs of Second-Degree Equations

Appendix D: Trigonometry

Appendix E: Sigma Notation

Appendix F: Proofs of Theorems

Appendix G: The Logarithm Defined as an Integral

Appendix H: Complex Numbers

Appendix I: Answers to Odd-Numbered Exercises