高等数学(上) 英文版 / 高等院校双语教学规划教材
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作者: 东南大学大学数学教研室
出版时间:2014-09
出版社:东南大学出版社
- 东南大学出版社
- 9787564151737
- 58388
- 2014-09
- O13
内容简介
东南大学大学数学教研室编著的《高等数学》是为响应东南大学国际化需要,根据国家教育部非数学专业数学基础课教学指导分委员会制定的工科类本科数学基础课程教学基本要求,并结合东南大学数学系多年教学改革实践经验编写的全英文教材。全书分为上、下两册,内容包括极限、一元函数微分学、一元函数积分学、常微分方程、级数、向鼍代数与空间解析几何、多元函数微分学、多元函数积分学、向量场的积分、复变函数等十个章节。
本书可作为高等理工科院校非数学类专业本科生学习高等数学的英文教材。也可供其他专业选用和社会读者阅读。
本书可作为高等理工科院校非数学类专业本科生学习高等数学的英文教材。也可供其他专业选用和社会读者阅读。
目录
Chapter 1 Limits
1.1 The Concept of Limits and its Properties
1.1.1 Limits of Sequence
1.1.2 Limits of Functions
1.1.3 Properties of Limits
Exercise 1.1
1.2 Limits Theorem
1.2.1 Rules for Finding Limits
1.2.2 The Sandwich Theorem
1.2.3 Monotonic Sequence Theorem
1.2.4 The Cauchy Criterion
Exercise 1.2
1.3 Two Important Special Limits
Exercise 1.3
1.4 Infinitesimal and Infinite
1.4.1 Infinitesimal
1.4.2 Infinite
Exercise 1.4
1.5 Continuous Function
1.5.1 Continuity
1.5.2 Discontinuity
Exercise 1.5
1.6 Theorems about Continuous Function on a Closed Interval
Exercise 1.6
Review and Exercise
Chapter 2 Differentiation
2.1 The Derivative
Exercise 2.1
2.2 Rules for Fingding the Derivative
2.2.1 Derivative of Arithmetic Combination
2.2.2 The Derivative Rule for Inverses
2.2.3 Derivative of Composition
2.2.4 Implicit Differentiation
2.2.5 Parametric Differentiation
2.2.6 Related Rates of Change
Exercise 2.2
2.3 Higher-Order Derivatives
Exercise 2.3
2.4 Differentials
Exercise 2.4
2.5 The Mean Value Theorem
Exercise 2.5
2.6 L'Hospital's Rule
Exercise 2.6
2.7 Taylor's Theorem
Exercise 2.7
2.8 Applications of Derivatives
2.8.1 Monotonicity
2.8.2 Local Extreme Values
2.8.3 Extreme Values
2.8.4 Concavity
2.8.5 Graphing Functions
Exercise 2.8
Review and Exercise
Chapter 3 The Integration
3.1 The Definite Integral
3.1.1 Two Examples
3.1.2 The Definition of Definite Integral
3.1.3 Properties of Definite Integrals
Exercise 3.1
3.2 The Indefinite Integral
Exercise 3.2
3.3 The Fundamental Theorem
3.3.1 First Fundamental Theorem
3.3.2 Second Fundamental Theorem
Exercise 3.3
3.4 Techniques of Indefinite Integration
3.4.1 Substitution in Indefinite Integrals
3.4.2 Indefinite Integration by Parts
3.4.3 Indefinite Integration of Rational Functions by
Partial Fractions
Exercise 3.4
3.5 Techniques of Definite Integration
3.5.1 Substitution in Definite Integrals
3.5.2 Definite Integration by Parts
Exercise 3.5
3.6 Applications of Definite Integrals
3.6.1 Lengths of Plane Curves
3.6.2 Area between Two Curves
3.6.3 Volumes of Solids
3.6.4 Areas of Surface of Revolution
3.6.5 Moments and Center of Mass
3.6.6 Work and Fluid Force
Exercise 3.6
3.7 Improper Integrals
3.7.1 Improper finite Limits of Integration
3.7.2 Improper Integrals: Infinite Integrands
Exercise 3.7
Review and Exercise
Chapter 4 Differential Equations
4.1 The Concept of Differential Equations
Exercise 4.1
4.2 Differential Equations of the First Order
4.2.1 Equations with Variable Separable
4.2.2 Homogeneous Equation
Exercise 4.2
4.3 First-order Linear Differential Equations
Exercise 4.3
4.4 Equations Reducible to First Order
4.4.1 Equations of the Form y(n)=f(x)
4.4,2 Equations of the Form y =y (x,y )
4.4.3 Equations of the Form y=f(y,y')
Exercise 4.4
4.5 Linear Differential Equations
4.5.1 Basic Theory of Linear Differential Equations
4.5.2 Homogeneous Linear Differential Equations of the
Second Order with Constant Coefficients
4.5.3 Nonhomogeneous Linear Differential Equations of the
Second Order with Constant Coefficients
4.5.4 Euler Differential Equation
Exercise 4.5
4.6 Systems of Linear Differential Equations
with Constant Coefficients
Exercise 4.6
4.7 Applications
Exercise 4.7
Review and Exercise
1.1 The Concept of Limits and its Properties
1.1.1 Limits of Sequence
1.1.2 Limits of Functions
1.1.3 Properties of Limits
Exercise 1.1
1.2 Limits Theorem
1.2.1 Rules for Finding Limits
1.2.2 The Sandwich Theorem
1.2.3 Monotonic Sequence Theorem
1.2.4 The Cauchy Criterion
Exercise 1.2
1.3 Two Important Special Limits
Exercise 1.3
1.4 Infinitesimal and Infinite
1.4.1 Infinitesimal
1.4.2 Infinite
Exercise 1.4
1.5 Continuous Function
1.5.1 Continuity
1.5.2 Discontinuity
Exercise 1.5
1.6 Theorems about Continuous Function on a Closed Interval
Exercise 1.6
Review and Exercise
Chapter 2 Differentiation
2.1 The Derivative
Exercise 2.1
2.2 Rules for Fingding the Derivative
2.2.1 Derivative of Arithmetic Combination
2.2.2 The Derivative Rule for Inverses
2.2.3 Derivative of Composition
2.2.4 Implicit Differentiation
2.2.5 Parametric Differentiation
2.2.6 Related Rates of Change
Exercise 2.2
2.3 Higher-Order Derivatives
Exercise 2.3
2.4 Differentials
Exercise 2.4
2.5 The Mean Value Theorem
Exercise 2.5
2.6 L'Hospital's Rule
Exercise 2.6
2.7 Taylor's Theorem
Exercise 2.7
2.8 Applications of Derivatives
2.8.1 Monotonicity
2.8.2 Local Extreme Values
2.8.3 Extreme Values
2.8.4 Concavity
2.8.5 Graphing Functions
Exercise 2.8
Review and Exercise
Chapter 3 The Integration
3.1 The Definite Integral
3.1.1 Two Examples
3.1.2 The Definition of Definite Integral
3.1.3 Properties of Definite Integrals
Exercise 3.1
3.2 The Indefinite Integral
Exercise 3.2
3.3 The Fundamental Theorem
3.3.1 First Fundamental Theorem
3.3.2 Second Fundamental Theorem
Exercise 3.3
3.4 Techniques of Indefinite Integration
3.4.1 Substitution in Indefinite Integrals
3.4.2 Indefinite Integration by Parts
3.4.3 Indefinite Integration of Rational Functions by
Partial Fractions
Exercise 3.4
3.5 Techniques of Definite Integration
3.5.1 Substitution in Definite Integrals
3.5.2 Definite Integration by Parts
Exercise 3.5
3.6 Applications of Definite Integrals
3.6.1 Lengths of Plane Curves
3.6.2 Area between Two Curves
3.6.3 Volumes of Solids
3.6.4 Areas of Surface of Revolution
3.6.5 Moments and Center of Mass
3.6.6 Work and Fluid Force
Exercise 3.6
3.7 Improper Integrals
3.7.1 Improper finite Limits of Integration
3.7.2 Improper Integrals: Infinite Integrands
Exercise 3.7
Review and Exercise
Chapter 4 Differential Equations
4.1 The Concept of Differential Equations
Exercise 4.1
4.2 Differential Equations of the First Order
4.2.1 Equations with Variable Separable
4.2.2 Homogeneous Equation
Exercise 4.2
4.3 First-order Linear Differential Equations
Exercise 4.3
4.4 Equations Reducible to First Order
4.4.1 Equations of the Form y(n)=f(x)
4.4,2 Equations of the Form y =y (x,y )
4.4.3 Equations of the Form y=f(y,y')
Exercise 4.4
4.5 Linear Differential Equations
4.5.1 Basic Theory of Linear Differential Equations
4.5.2 Homogeneous Linear Differential Equations of the
Second Order with Constant Coefficients
4.5.3 Nonhomogeneous Linear Differential Equations of the
Second Order with Constant Coefficients
4.5.4 Euler Differential Equation
Exercise 4.5
4.6 Systems of Linear Differential Equations
with Constant Coefficients
Exercise 4.6
4.7 Applications
Exercise 4.7
Review and Exercise
