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R. Michael Range 著
店铺: 中华商务进口图书旗舰店 出版社: World Scientific ISBN:9789814644488 商品编码:16005744082 出版时间:2015-10-06 页数:372 正文语种:英语 什么是微积分?从简单代数到深入分析 英文原版 What Is Calculus? From Simple Algebra To Deep Analysis
作者:R. Michael Range
Publisher: World Scientific Publishing Co Pte Ltd (2015/10/6)
平装: 372 pages
Language: 英语
ISBN: 981464448X
EAN: 9789814644488
Product Dimensions: 15.2 x 2.1 x 22.9 cm
ASIN: 981464448X
内容简介
This unique book provides a new and well-motivated introduction to calculus and analysis, historically significant fundamental areas of mathematics that are widely used in many disciplines. It begins with familiar elementary high school geometry and algebra, and develops important concepts such as tangents and derivatives without using any advanced tools based on limits and infinite processes that dominate the traditional introductions to the subject. This simple algebraic method is a modern version of an idea that goes back to René Descartes and that has been largely forgotten. Moving beyond algebra, the need for new analytic concepts based on completeness, continuity, and limits becomes clearly visible to the reader while investigating exponential functions.
The author carefully develops the necessary foundations while minimizing the use of technical language. He expertly guides the reader to deep fundamental analysis results, including completeness, key differential equations, definite integrals, Taylor series for standard functions, and the Euler identity. This pioneering book takes the sophisticated reader from simple familiar algebra to the heart of analysis.
Furthermore, it should be of interest as a source of new ideas and as supplementary reading for high school teachers, and for students and instructors of calculus and analysis.
媒体推荐
"It is a well-written and worthwhile addition to the long list of books on calculus. The treatment of derivatives and the basics of real analysis are excellent."
——Professor John P D'Angelo,University of Illinois at Urbana Champaign
"The book can be recommended for interested students as well as for teachers in mathematical analysis."
——Zentralblatt Math
"It certainly would provide excellent corrective revision of calculus for those who have been taught it simplistically. Another attractive feature of the book is its historical element, which includes reference to the algebraic/geometric method of Apollonius for finding tangents etc. This, together with the above-mentioned features, make this book a uniquely imaginative introduction to real analysis alongside a cogent account of the principles, and applications, of differentiation and the Riemann integral."
——MAA
"This alternate presentation of basic calculus can serve as a course text or as a very useful supplement to the more standard introductory calculus courses. The author’s discussions of the motivations for various concepts and the need for more sophisticated tools will be particularly useful to the beginning student. The book would be a valuable addition to high-school and undergraduate mathematics libraries."
——Mathematical Reviews Clippings
作者简介
R.Michael Range is an expert in multidimensional complex analysis. He has written numerous articles for professional journals, and he is the author of a widely known book in the field that was first published in 1986. He has also won a Lester R Ford award of the American Mathematical Association for one of his expository articles.
Besides advanced graduate level courses, he has taught calculus and analysis at all levels over many years. These experiences have led him to search for alternate approaches and simplifications that are reflected in this path-breaking book.
目录
Prelude to Calculus:
Introduction
Tangents to Circles
Tangents to Parabolas
Motion with Variable Speed
Tangents to Graphs of Polynomials
Rules for Differentiation
More General Algebraic Functions
Beyond Algebraic Functions
The Cast: Functions of a Real Variable:
Real Numbers
Functions
Simple Periodic Functions
Exponential Functions
Natural Operations on Functions
Algebraic Operations and Functions
Derivatives: How to Measure Change:
Algebraic Derivatives by Approximation
Derivatives of Exponential Functions
Differentiability and Local Linear Approximation
Properties of Continuous Functions
Derivatives of Trigonometric Functions
Simple Differentiation Rules
Product and Quotient Rules
Some Applications of Derivatives:
Exponential Models
The Inverse Problem and Antiderivatives
"Explosive Growth" Models
Acceleration and Motion with Constant Acceleration
Periodic Motions
Geometric Properties of Graphs
An Algorithm for Solving Equations
Applications to Optimization
Higher Order Approximations and Taylor Polynomials
The Definite Integral:
The Inverse Problem: Construction of Antiderivatives
The Area Problem
More Applications of Definite Integrals
Properties of Definite Integrals
The Fundamental Theorem of Calculus
Existence of Definite Integrals
Reversing the Chain Rule: Substitution
Reversing the Product Rule: Integration by Parts
Higher Order Approximations, Part 2: Taylor's Theorem
Excursion into Complex Numbers and the Euler Identity
什么是微积分?从简单代数到深入分析 英文原版 What Is Calculus? 数学科学 电子书 下载 mobi epub pdf txt
什么是微积分?从简单代数到深入分析 英文原版 What Is Calculus? 数学科学-so88
什么是微积分?从简单代数到深入分析 英文原版 What Is Calculus? 数学科学 pdf epub mobi txt 电子书 下载 2022
图书介绍
☆☆☆☆☆
||
R. Michael Range 著
店铺: 中华商务进口图书旗舰店 出版社: World Scientific ISBN:9789814644488 商品编码:16005744082 出版时间:2015-10-06 页数:372 正文语种:英语 什么是微积分?从简单代数到深入分析 英文原版 What Is Calculus? From Simple Algebra To Deep Analysis
作者:R. Michael Range
Publisher: World Scientific Publishing Co Pte Ltd (2015/10/6)
平装: 372 pages
Language: 英语
ISBN: 981464448X
EAN: 9789814644488
Product Dimensions: 15.2 x 2.1 x 22.9 cm
ASIN: 981464448X
内容简介
This unique book provides a new and well-motivated introduction to calculus and analysis, historically significant fundamental areas of mathematics that are widely used in many disciplines. It begins with familiar elementary high school geometry and algebra, and develops important concepts such as tangents and derivatives without using any advanced tools based on limits and infinite processes that dominate the traditional introductions to the subject. This simple algebraic method is a modern version of an idea that goes back to René Descartes and that has been largely forgotten. Moving beyond algebra, the need for new analytic concepts based on completeness, continuity, and limits becomes clearly visible to the reader while investigating exponential functions.
The author carefully develops the necessary foundations while minimizing the use of technical language. He expertly guides the reader to deep fundamental analysis results, including completeness, key differential equations, definite integrals, Taylor series for standard functions, and the Euler identity. This pioneering book takes the sophisticated reader from simple familiar algebra to the heart of analysis.
Furthermore, it should be of interest as a source of new ideas and as supplementary reading for high school teachers, and for students and instructors of calculus and analysis.
媒体推荐
"It is a well-written and worthwhile addition to the long list of books on calculus. The treatment of derivatives and the basics of real analysis are excellent."
——Professor John P D'Angelo,University of Illinois at Urbana Champaign
"The book can be recommended for interested students as well as for teachers in mathematical analysis."
——Zentralblatt Math
"It certainly would provide excellent corrective revision of calculus for those who have been taught it simplistically. Another attractive feature of the book is its historical element, which includes reference to the algebraic/geometric method of Apollonius for finding tangents etc. This, together with the above-mentioned features, make this book a uniquely imaginative introduction to real analysis alongside a cogent account of the principles, and applications, of differentiation and the Riemann integral."
——MAA
"This alternate presentation of basic calculus can serve as a course text or as a very useful supplement to the more standard introductory calculus courses. The author’s discussions of the motivations for various concepts and the need for more sophisticated tools will be particularly useful to the beginning student. The book would be a valuable addition to high-school and undergraduate mathematics libraries."
——Mathematical Reviews Clippings
作者简介
R.Michael Range is an expert in multidimensional complex analysis. He has written numerous articles for professional journals, and he is the author of a widely known book in the field that was first published in 1986. He has also won a Lester R Ford award of the American Mathematical Association for one of his expository articles.
Besides advanced graduate level courses, he has taught calculus and analysis at all levels over many years. These experiences have led him to search for alternate approaches and simplifications that are reflected in this path-breaking book.
目录
Prelude to Calculus:
Introduction
Tangents to Circles
Tangents to Parabolas
Motion with Variable Speed
Tangents to Graphs of Polynomials
Rules for Differentiation
More General Algebraic Functions
Beyond Algebraic Functions
The Cast: Functions of a Real Variable:
Real Numbers
Functions
Simple Periodic Functions
Exponential Functions
Natural Operations on Functions
Algebraic Operations and Functions
Derivatives: How to Measure Change:
Algebraic Derivatives by Approximation
Derivatives of Exponential Functions
Differentiability and Local Linear Approximation
Properties of Continuous Functions
Derivatives of Trigonometric Functions
Simple Differentiation Rules
Product and Quotient Rules
Some Applications of Derivatives:
Exponential Models
The Inverse Problem and Antiderivatives
"Explosive Growth" Models
Acceleration and Motion with Constant Acceleration
Periodic Motions
Geometric Properties of Graphs
An Algorithm for Solving Equations
Applications to Optimization
Higher Order Approximations and Taylor Polynomials
The Definite Integral:
The Inverse Problem: Construction of Antiderivatives
The Area Problem
More Applications of Definite Integrals
Properties of Definite Integrals
The Fundamental Theorem of Calculus
Existence of Definite Integrals
Reversing the Chain Rule: Substitution
Reversing the Product Rule: Integration by Parts
Higher Order Approximations, Part 2: Taylor's Theorem
Excursion into Complex Numbers and the Euler Identity
什么是微积分?从简单代数到深入分析 英文原版 What Is Calculus? 数学科学 电子书 下载 mobi epub pdf txt
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