微积分(英文版 原书第9版) / 时代教育·国外高校优秀教材精选
¥149.00定价
作者: [美]Dale.Varberg Edwin J.Purcell等
出版时间:2017-07
出版社:机械工业出版社
- 机械工业出版社
- 9787111275985
- 1-15
- 82826
- 40241159-9
- 平装
- 16开
- 2017-07
- 1234
- 796
- 理学
- 数学
- O172
- 大学数学
- 本科
内容简介
目录
出版说明
序
Preface
0 Preliminaries
0.1 Real Numbers.Estimation,and Logic
0.2 Inequalities and Absolute Values
0.3 The Rectangular Coordinate System
0.4 Graphs of Equations
0.5 Functions and Their Graphs
0.6 Operations on Functions
0.7 Trigonometric Functions
0.8 Chapter Review
Review and Preview Problems
1 Limits
1.1 Introduction to Limits
1.2 Rigorous Study of Limits
1.3 Limit Theorems
1.4 Limits Involving Trigonometric Functions
1.5 Limits at Infinity;Infinite Limits
1.6 Continuity of Functions
1.7 Chapter Review
Review and Preview Problems
2 The Derivative
2.1 Two Problems with One Theme
2.2 The Derivative
2.3 Rules for Finding Derivatives
2.4 Derivatives of Trigonometric Functions
2.5 The Chain Rule
2.6 Higher-Order Derivatives
2.7 Implicit Differentiation
2.8 Related Rates
2.9 Differentials and Approximations
2.10 Chapter Review
Review and Preview Problems
3 Applications of the Derivative
3.1 Maxima and Minima
3.2 Monotonicity and Concavity
3.3 Local Extrema and Extrema on Open Intervals
3.4 Practical Problems
3.5 Graphing Functions Using Calculus
3.6 The Mean Value Theorem for Derivatives
3.7 Solving Equations Numerically
3.8 Antiderivatives
3.9 Introduction to Differential Equations
3.10 Chapter Review
Review and Preview Problems
4 The Deftnite Integral
4.1 Introduction to Area
4.2 The Definite Integral
4.3 The First Fundamental Theorem of Calculus
4.4 The Second Fundamental Theorem of Calculus and the Method of Substitution
4.5 The Mean Value Theorem for Integrals and the Use of Symmetry
4.6 Numerical Integration
4.7 Chapter Review
Review and Preview Problems
5 Applications of the Integral
5.1 The Area of a Plane Region
5.2 Volumes of Solids:Slabs.Disks,Wlashers
5.3 Volumes of Solids of Revolution:Shells
5.4 Length of a Plane Curve
5.5 Work and Fluid Force
5.6 Moments and Center of Mass
5.7 Probability and Random Variabtes
5.8 Chapter Review322
Review and Preview Problems
6 Transcendental Functions
6.1 The Natural Logarithm Function
6.2 Inverse Functions and Their Derivatives
6.3 The Natural Exponential Function
6.4 General Exponential and Logarithmic Functions
6.5 Exponential Growth and Decay
6.6 First.Order Linear Differential Equations
6.7 Approximations for Differential Equations
6.8 The Inverse Trigonometric Functions and Their Derivatives
6.9 The Hyperbolic Functions and Their Inverses
6.10 Chapter Review
Review and Preview Problems
7 Techniques of Integration
7.1 Basic Integration Rules
7.2 Integration by Parts
7.3 Some Trigonometric Integrals
7.4 Rationalizing Substitutions
7.5 Integration of Rational Functions Using Partial Fractions
7.6 Strategies for Integration
7.7 Chapter Review
Review and Preview Problems
8 Indeterminate Forms and Improper
Integrals
8.1 Indeterminate Forms of Type 0/0
8.2 Other Indeterminate Forms
8.3 Improper Integrals: Infinite Limits of Integration
8.4 Improper Integrals: Infinite Integrands
8.5 Chapter Review
Review and Preview Problems
9 Infinite Series
9.1 Infinite Sequences
9.2 Infinite Series
9.3 Positive Series: The Integral Test
9.4 Positive Series: Other Tests
9.5 Alternating Series, Absolute Convergence, and Conditional Convergence
9.6 Power Series
9.7 Operations on Power Series
9.8 Taylor and Maclaurin Series
9.9 The Taylor Approximation to a Function
9.10 Chapter Review
Review and Preview Problems
10 Conics and Polar Coordinates
10.1 The Parabola
10.2 Ellipses and Hyperbolas
10.3 Translation and Rotation of Axes
10.4 Parametric Representation of Curves in the Plane
10.5 The Polar Coordinate System
10.6 Graphs of Polar Equations
10.7 Calculus in Polar Coordinates
10.8 Chapter Review
Review and Preview Problems
11 Geometry in Space and Vectors
11.1 Cartesian Coordinates in Three-Space
11.2 Vectors
11.3 The Dot Product
11.4 The Cross Product
11.5 Vector-Valued Functions and Curvilinear Motion
11.6 Lines and Tangent Lines in Three-Space
11.7 Curvature and Components of Acceleration
11.8 Surfaces in Three-Space
11.9 Cylindrical and Spherical Coordinates
11.10 Chapter Review
Review and Preview Problems
12 Derivatives for Functions of Two or More Variables
12.1 Functions of Two or More Variables
12.2 Partial Derivatives
12.3 Limits and Continuity
12.4 Differentiability
12.5 Directional Derivatives and Gradients
12.6 The Chain Rule
12.7 Tangent Planes and Approximations
12.8 Maxima and Minima
12.9 The Method of Lagrange Multipliers
12.10 Chapter Review
Review and Preview Problems
13 Multiple Integrals
13.1 Double Integrals over Rectangles
13.2 Iterated Integrals
13.3 Double Integrals over Nonrectangular Regions
13.4 Double Integrals in Polar Coordinates
13.5 Applications of Double Integrals
13.6 Surface Area
13.7 Triple Integrals in Cartesian Coordinates
13.8 Triple Integrals in Cylindrical and Spherical Coordinates
13.9 Change of Variables in Multiple Integrals
13.10 Chapter Review
Review and Preview Problems
14 Vector Calculus
14.1 Vector Fields
14.2 Line Integrals
14.3 Independence of Path
14.4 Green's Theorem in the Plane
14.5 Surface Integrals
14.6 Gauss's Divergence Theorem
14.7 Stokes's Theorem
14.8 Chapter Review
Appendix
A.1 Mathematical Induction
A.2 Proofs of Several Theorems
教辅材料说明
教辅材料申请表
序
Preface
0 Preliminaries
0.1 Real Numbers.Estimation,and Logic
0.2 Inequalities and Absolute Values
0.3 The Rectangular Coordinate System
0.4 Graphs of Equations
0.5 Functions and Their Graphs
0.6 Operations on Functions
0.7 Trigonometric Functions
0.8 Chapter Review
Review and Preview Problems
1 Limits
1.1 Introduction to Limits
1.2 Rigorous Study of Limits
1.3 Limit Theorems
1.4 Limits Involving Trigonometric Functions
1.5 Limits at Infinity;Infinite Limits
1.6 Continuity of Functions
1.7 Chapter Review
Review and Preview Problems
2 The Derivative
2.1 Two Problems with One Theme
2.2 The Derivative
2.3 Rules for Finding Derivatives
2.4 Derivatives of Trigonometric Functions
2.5 The Chain Rule
2.6 Higher-Order Derivatives
2.7 Implicit Differentiation
2.8 Related Rates
2.9 Differentials and Approximations
2.10 Chapter Review
Review and Preview Problems
3 Applications of the Derivative
3.1 Maxima and Minima
3.2 Monotonicity and Concavity
3.3 Local Extrema and Extrema on Open Intervals
3.4 Practical Problems
3.5 Graphing Functions Using Calculus
3.6 The Mean Value Theorem for Derivatives
3.7 Solving Equations Numerically
3.8 Antiderivatives
3.9 Introduction to Differential Equations
3.10 Chapter Review
Review and Preview Problems
4 The Deftnite Integral
4.1 Introduction to Area
4.2 The Definite Integral
4.3 The First Fundamental Theorem of Calculus
4.4 The Second Fundamental Theorem of Calculus and the Method of Substitution
4.5 The Mean Value Theorem for Integrals and the Use of Symmetry
4.6 Numerical Integration
4.7 Chapter Review
Review and Preview Problems
5 Applications of the Integral
5.1 The Area of a Plane Region
5.2 Volumes of Solids:Slabs.Disks,Wlashers
5.3 Volumes of Solids of Revolution:Shells
5.4 Length of a Plane Curve
5.5 Work and Fluid Force
5.6 Moments and Center of Mass
5.7 Probability and Random Variabtes
5.8 Chapter Review322
Review and Preview Problems
6 Transcendental Functions
6.1 The Natural Logarithm Function
6.2 Inverse Functions and Their Derivatives
6.3 The Natural Exponential Function
6.4 General Exponential and Logarithmic Functions
6.5 Exponential Growth and Decay
6.6 First.Order Linear Differential Equations
6.7 Approximations for Differential Equations
6.8 The Inverse Trigonometric Functions and Their Derivatives
6.9 The Hyperbolic Functions and Their Inverses
6.10 Chapter Review
Review and Preview Problems
7 Techniques of Integration
7.1 Basic Integration Rules
7.2 Integration by Parts
7.3 Some Trigonometric Integrals
7.4 Rationalizing Substitutions
7.5 Integration of Rational Functions Using Partial Fractions
7.6 Strategies for Integration
7.7 Chapter Review
Review and Preview Problems
8 Indeterminate Forms and Improper
Integrals
8.1 Indeterminate Forms of Type 0/0
8.2 Other Indeterminate Forms
8.3 Improper Integrals: Infinite Limits of Integration
8.4 Improper Integrals: Infinite Integrands
8.5 Chapter Review
Review and Preview Problems
9 Infinite Series
9.1 Infinite Sequences
9.2 Infinite Series
9.3 Positive Series: The Integral Test
9.4 Positive Series: Other Tests
9.5 Alternating Series, Absolute Convergence, and Conditional Convergence
9.6 Power Series
9.7 Operations on Power Series
9.8 Taylor and Maclaurin Series
9.9 The Taylor Approximation to a Function
9.10 Chapter Review
Review and Preview Problems
10 Conics and Polar Coordinates
10.1 The Parabola
10.2 Ellipses and Hyperbolas
10.3 Translation and Rotation of Axes
10.4 Parametric Representation of Curves in the Plane
10.5 The Polar Coordinate System
10.6 Graphs of Polar Equations
10.7 Calculus in Polar Coordinates
10.8 Chapter Review
Review and Preview Problems
11 Geometry in Space and Vectors
11.1 Cartesian Coordinates in Three-Space
11.2 Vectors
11.3 The Dot Product
11.4 The Cross Product
11.5 Vector-Valued Functions and Curvilinear Motion
11.6 Lines and Tangent Lines in Three-Space
11.7 Curvature and Components of Acceleration
11.8 Surfaces in Three-Space
11.9 Cylindrical and Spherical Coordinates
11.10 Chapter Review
Review and Preview Problems
12 Derivatives for Functions of Two or More Variables
12.1 Functions of Two or More Variables
12.2 Partial Derivatives
12.3 Limits and Continuity
12.4 Differentiability
12.5 Directional Derivatives and Gradients
12.6 The Chain Rule
12.7 Tangent Planes and Approximations
12.8 Maxima and Minima
12.9 The Method of Lagrange Multipliers
12.10 Chapter Review
Review and Preview Problems
13 Multiple Integrals
13.1 Double Integrals over Rectangles
13.2 Iterated Integrals
13.3 Double Integrals over Nonrectangular Regions
13.4 Double Integrals in Polar Coordinates
13.5 Applications of Double Integrals
13.6 Surface Area
13.7 Triple Integrals in Cartesian Coordinates
13.8 Triple Integrals in Cylindrical and Spherical Coordinates
13.9 Change of Variables in Multiple Integrals
13.10 Chapter Review
Review and Preview Problems
14 Vector Calculus
14.1 Vector Fields
14.2 Line Integrals
14.3 Independence of Path
14.4 Green's Theorem in the Plane
14.5 Surface Integrals
14.6 Gauss's Divergence Theorem
14.7 Stokes's Theorem
14.8 Chapter Review
Appendix
A.1 Mathematical Induction
A.2 Proofs of Several Theorems
教辅材料说明
教辅材料申请表
