Calculus
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作者马继刚,邹云志,(加)艾奇逊 编
出版社高等教育出版社
ISBN9787040292084
出版时间2010-07
版次1
装帧平装
开本16开
纸张胶版纸
页数226页
字数99999千字
定价20.5元
上书时间2024-05-26
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基本信息
书名:Calculus
定价:20.50元
作者:马继刚,邹云志,(加)艾奇逊 编
出版社:高等教育出版社
出版日期:2010-07-01
ISBN:9787040292084
字数:280000
页码:226
版次:1
装帧:平装
开本:16开
商品重量:
编辑推荐
《微积分(1)》:普通高等教育“十一五”规划教材。
内容提要
本书是英文版大学数学微积分教材,分为上、下两册。上册为单变量微积分学,包括函数、极限和连续、导数、中值定理及导数的应用以及一元函数积分学等内容;下册为多变量微积分学,包括空间解析几何及向量代数、多元函数微分学、重积分、线积分与面积分、级数及微分方程初步等内容。本书由两位国内作者和一位外籍教授共同完成,在内容体系安排上与国内主要微积分教材一致,同时也充分参考和借鉴了国外尤其是北美一些大学微积分教材的诸多特点,内容深入浅出,语言简洁通俗。本书适合作为大学本科生一学年微积分教学的教材,也可作为非双语教学的参考书。
目录
CHAPTER 1 Functio, Limits and Continuity 1.1 Mathematical Sign Language 1.1.1 Sets 1.1.2 Number 1.1.3 Intervals 1.1.4 Implication and Equivalence 1.1.5 Inequalities and Numbe 1.1.6 Absolute Value of a Number 1.1.7 Summation Notation 1.1.8 Factorial Notation 1.1.9 Binomial Coefficients 1.2 Functio 1.2.1 Definition of a Function 1.2.2 Properties of Functio 1.2.3 Invee and Composite Functio 1.2.4 Combining Functio 1.2.5 Elementary Functio 1.3 Limits 1.3.1 The Limit of a Sequence 1.3.2 The Limits of a Function 1.3.3 One-sided Limits 1.3.4 Limits Involving the Infinity Symbol 1.3.5 Properties of Limits of Functio 1.3.6 Calculating Limits Using Limit Laws 1.3.7 Two Important Limit Results 1.3.8 Asymptotic Functio and Small o Notation 1.4 Continuous and Discontinuous Functio 1.4.1 Definitio 1.4.2 Building Continuous Functio 1.4.3 Theorems on Continuous Functio 1.5 Further Results on Limits 1.5.1 The Precise Definition of a Limit 1.5.2 Limits at Infinity and Infinite Limits 1.5.3 Real Numbe and Limits 1.5.4 Asymptotes 1.5.5 Uniform Continuity 1.6 Additional Material 1.6.1 Cauchy 1.6.2 Heine 1.6.3 Weietrass 1.7 Exercises 1.7.1 Evaluating Limits 1.7.2 Continuous Functio 1.7.3 Questio to Guide Your RevisionCHAPTER 2 Differential Calculus 2.1 The Derivative 2.1.1 The Tangent to a Curve 2.1.2 Itantaneous Velocity 2.1.3 The Definition of a Derivative 2.1.4 Notatio for the Derivative 2.1.5 The Derivative as a Function 2.1.6 One-sided,Derivatives 2.1.7 Continuity of Differentiable Functio 2.1.8 Functio with no Derivative 2.2 Finding the Derivatives 2.2.1 Derivative Laws 2.2.2 Derivative of an Invee Function 2.2.3 Differentiating a Composite Funetion--The Chain Rule 2.3 Derivatives of Higher Orde 2.4 Implicit Differentiation 2.4.1 Implicitly Defined Functio 2.4.2 Finding the Derivative of an Implicitly Defined Function 2.4.3 Logarithmic Differentiation 2.4.4 Functio Defined by Parametric Equatio 2.5 Related Rates of Change 2.6 The Tangent Line Appromation and the Differential 2.7 Additional Material 2.7.1 Preliminary result needed to prove the Chain Rule 2.7.2 Proof of the Chain Rule 2.7.3 Leibnitz 2.7.4 Newton 2.8 Exercises 2.8.1 Finding Derivatives 2.8.2 Differentials 2.8.3 Questio to Guide Your Revision 3 The Mean Value Theorem and Applicatio of theCHAPTER 3 The Mean Value Theorem and Applicatio of the Derivative 3.1 The Mean Value Theorem 3.2 L'Hospital's Rule and Indeterminate Forms 3.3 Taylor Series 3.4 Monotonic and Concave Functio and Graphs 3.4.1 Monotonic Functio 3.4.2 Concave Functio 3.5 Mamum and Minimum Values of Functio 3.5.1 Global Mamum and Global Minimum 3.5.2 Curve Sketching 3.6 Solving Equatio Numerically 3.6.I Decimal Search 3.6.2 Newton's Method 3.7 Additional Materia 3.7.1 Fermat 3.7.2 L'Elospital 3.8 Exercises 3.8.l The Mean Value Theorem 3.8.2 L'Hospital's Rules 3.8.3 Taylor's Theorem 3.8.4 Applicatio of the Derivative 3.8.5 Questio to Guide Your RevisionCHAPTER 4 Integral Calculus 4.1 The Indefinite Integral 4.1.1 Definitio and Properties of Indefinite Integrals 4.1.2 Basic Antiderivatives 4.1.3 Properties of Indefinite Integrals 4.1.4 Integration By Substitution 4.1.5 Further Results Using Integration by Substitution 4.1.6 Integration by Parts 4.1.7 Partial Fractio in Integration 4.1.8 Rationalizing Substitutio 4.2 Definite Integrals and, the Fundamental Theorem of Calculus 4.2.1 Introduction 4.2.2 The Definite Integral 4.2.3 Interpreting ∫f(x) dx as an Area 4.2.4 Interpreting ∫f(t) dt as a Distance 4.2.5 Properties of the'Definite Integral 4.2.6 The Fundamental Theorem of Calculus 4.2.7 Integration by Substitution 4.2.8 Integration by Parts 4.2.9 Numerical Integration 4.2.10 Improper Integrals 4.3 Applicatio of the Definite Integral 4.3.1 The Area of the Region Between Two Curves 4.3.2 Volumes of Solids of Revolution 4.3.3 Arc Length 4.4 Additional Material 4.4.1 Riemann 4.4.2 Lagrange 4.5 Exercises 4.5.1 Indefinite Integrals 4.5.2 Definite Integrals 4.5.3 Questio to Guide Your RevisionAweReference Books
作者介绍
编者:马继刚 邹云志 (加拿大)艾奇逊(P.W.Aitchison)
序言
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