## Description

Test Bank for Calculus Early Transcendental Functions 4th Edition Robert T Smith

Table Of Contents

Chapter 0: Preliminaries

0.1 Polynomials and Rational Functions

0.2 Graphing Calculators and Computer Algebra Systems

0.3 Inverse Functions

0.4 Trigonometric and Inverse Trigonometric Functions

0.5 Exponential and Logarithmic Functions

0.6 Transformations of Functions

Chapter 1: Limits and Continuity

1.1 A Brief Preview of Calculus: Tangent Lines and the Length of a Curve

1.2 The Concept of Limit

1.3 Computation of Limits

1.4 Continuity and its Consequences

1.5 Limits Involving Infinity; Asymptotes

1.6 Formal Definition of the Limit

1.7 Limits and Loss-of-Significance Errors

Chapter 2: Differentiation

2.1 Tangent Lines and Velocity

2.2 The Derivative

2.3 Computation of Derivatives: The Power Rule

2.4 The Product and Quotient Rules

2.5 The Chain Rule

2.6 Derivatives of Trigonometric Functions

2.7 Derivatives of Exponential and Logarithmic Functions

2.8 Implicit Differentiation and Inverse Trigonometric Functions

2.9 The Hyperbolic Functions

2.10 The Mean Value Theorem

Chapter 3: Applications of Differentiation

3.1 Linear Approximations and Newtons Method

3.2 Indeterminate Forms and LHopitals Rule

3.3 Maximum and Minimum Values

3.4 Increasing and Decreasing Functions

3.5 Concavity and the Second Derivative Test

3.6 Overview of Curve Sketching

3.7 Optimization

3.8 Related Rates

3.9 Rates of Change in Economics and the Sciences

Chapter 4: Integration

4.1 Antiderivatives

4.2 Sums and Sigma Notation

4.3 Area

4.4 The Definite Integral

4.5 The Fundamental Theorem of Calculus

4.6 Integration by Substitution

4.7 Numerical Integration

4.8 The Natural Logarithm as an Integral

Chapter 5: Applications of the Definite Integral

5.1 Area Between Curves

5.2 Volume: Slicing, Disks, and Washers

5.3 Volumes by Cylindrical Shells

5.4 Arc Length and Surface Area

5.5 Projectile Motion

5.6 Applications of Integration to Physics and Engineering

5.7 Probability

Chapter 6: Integration Techniques

6.1 Review of Formulas and Techniques

6.2 Integration by Parts

6.3 Trigonometric Techniques of Integration

6.4 Integration of Rational Functions Using Partial Fractions

6.5 Integration Tables and Computer Algebra Systems

6.6 Improper Integrals

Chapter 7: First Order Differential Equations

7.1 Modeling with Differential Equations

7.2 Separable Differential Equations

7.3 Direction Fields and Euler’s Method

7.4 Systems of First Order Differential Equations

Chapter 8: Infinite Series

8.1 Sequences of Real Numbers

8.2 Infinite Series

8.3 The Integral Test and Comparison Tests

8.4 Alternating Series

8.5 Absolute Convergence and the Ratio Test

8.6 Power Series

8.7 Taylor Series

8.8 Applications of Taylor Series

8.9 Fourier Series

Chapter 9: Parametric Equations and Polar Coordinates

9.1 Plane Curves and Parametric Equations

9.2 Calculus and Parametric Equations

9.3 Arc Length and Surface Area in Parametric Equations

9.4 Polar Coordinates

9.5 Calculus and Polar Coordinates

9.6 Conic Sections

9.7 Conic Sections in Polar Coordinates

Chapter 10: Vectors and the Geometry of Space

10.1 Vectors in the Plane

10.2 Vectors in Space

10.3 The Dot Product

10.4 The Cross Product

10.5 Lines and Planes in Space

10.6 Surfaces in Space

Chapter 11: Vector-Valued Functions

11.1 Vector-Valued Functions

11.2 The Calculus of Vector-Valued Functions

11.3 Motion in Space

11.4 Curvature

11.5 Tangent and Normal Vectors

11.6 Parametric Surfaces

Chapter 12: Functions of Several Variables and Partial Differentiation

12.1 Functions of Several Variables

12.2 Limits and Continuity

12.3 Partial Derivatives

12.4 Tangent Planes and Linear Approximations

12.5 The Chain Rule

12.6 The Gradient and Directional Derivatives

12.7 Extrema of Functions of Several Variables

12.8 Constrained Optimization and Lagrange Multipliers

Chapter 13: Multiple Integrals

13.1 Double Integrals

13.2 Area, Volume, and Center of Mass

13.3 Double Integrals in Polar Coordinates

13.4 Surface Area

13.5 Triple Integrals

13.6 Cylindrical Coordinates

13.7 Spherical Coordinates

13.8 Change of Variables in Multiple Integrals

Chapter 14: Vector Calculus

14.1 Vector Fields

14.2 Line Integrals

14.3 Independence of Path and Conservative Vector Fields

14.4 Green’s Theorem

14.5 Curl and Divergence

14.6 Surface Integrals

14.7 The Divergence Theorem

14.8 Stokes’ Theorem

14.9 Applications of Vector Calculus

Chapter 15: Second Order Differential Equations

15.1 Second-Order Equations with Constant Coefficients

15.2 Nonhomogeneous Equations: Undetermined Coefficients

15.3 Applications of Second Order Equations

15.4 Power Series Solutions of Differential Equations