Applications Of Vector Analysis And Complex Variables In Engineering
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Applications Of Vector Analysis And Complex Variables In Engineering
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Author : Otto D. L. Strack
language : en
Publisher:
Release Date : 2020
Applications Of Vector Analysis And Complex Variables In Engineering written by Otto D. L. Strack and has been published by this book supported file pdf, txt, epub, kindle and other format this book has been release on 2020 with Electronic books categories.
This textbook presents the application of mathematical methods and theorems to solve engineering problems, rather than focusing on mathematical proofs. Applications of Vector Analysis and Complex Variables in Engineering explains the mathematical principles in a manner suitable for engineering students, who generally think quite differently than students of mathematics. The objective is to emphasize mathematical methods and applications, rather than emphasizing general theorems and principles, for which the reader is referred to the literature.
Applications Of Vector Analysis And Complex Variables In Engineering
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Author : Otto D. L. Strack
language : en
Publisher: Springer Nature
Release Date : 2020-04-18
Applications Of Vector Analysis And Complex Variables In Engineering written by Otto D. L. Strack and has been published by Springer Nature this book supported file pdf, txt, epub, kindle and other format this book has been release on 2020-04-18 with Technology & Engineering categories.
This textbook presents the application of mathematical methods and theorems tosolve engineering problems, rather than focusing on mathematical proofs. Applications of Vector Analysis and Complex Variables in Engineering explains the mathematical principles in a manner suitable for engineering students, who generally think quite differently than students of mathematics. The objective is to emphasize mathematical methods and applications, rather than emphasizing general theorems and principles, for which the reader is referred to the literature. Vector analysis plays an important role in engineering, and is presented in terms of indicial notation, making use of the Einstein summation convention. This text differs from most texts in that symbolic vector notation is completely avoided, as suggested in the textbooks on tensor algebra and analysis written in German by Duschek and Hochreiner, in the 1960s. The defining properties of vector fields, the divergence and curl, are introduced in terms of fluid mechanics. The integral theorems of Gauss (the divergence theorem), Stokes, and Green are introduced also in the context of fluid mechanics. The final application of vector analysis consists of the introduction of non-Cartesian coordinate systems with straight axes, the formal definition of vectors and tensors. The stress and strain tensors are defined as an application. Partial differential equations of the first and second order are discussed. Two-dimensional linear partial differential equations of the second order are covered, emphasizing the three types of equation: hyperbolic, parabolic, and elliptic. The hyperbolic partial differential equations have two real characteristic directions, and writing the equations along these directions simplifies the solution process. The parabolic partial differential equations have two coinciding characteristics; this gives useful information regarding the character of the equation, but does not help in solving problems. The elliptic partial differential equations do not have real characteristics. In contrast to most texts, rather than abandoning the idea of using characteristics, here the complex characteristics are determined, and the differential equations are written along these characteristics. This leads to a generalized complex variable system, introduced by Wirtinger. The vector field is written in terms of a complex velocity, and the divergence and the curl of the vector field is written in complex form, reducing both equations to a single one. Complex variable methods are applied to elliptical problems in fluid mechanics, and linear elasticity. The techniques presented for solving parabolic problems are the Laplace transform and separation of variables, illustrated for problems of heat flow and soil mechanics. Hyperbolic problems of vibrating strings and bars, governed by the wave equation are solved by the method of characteristics as well as by Laplace transform. The method of characteristics for quasi-linear hyperbolic partial differential equations is illustrated for the case of a failing granular material, such as sand, underneath a strip footing. The Navier Stokes equations are derived and discussed in the final chapter as an illustration of a highly non-linear set of partial differential equations and the solutions are interpreted by illustrating the role of rotation (curl) in energy transfer of a fluid.
Applications Of Vector Analysis And Complex Variables In Engineering
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Author : Otto D. L. Strack
language : en
Publisher: Springer
Release Date : 2020-05-25
Applications Of Vector Analysis And Complex Variables In Engineering written by Otto D. L. Strack and has been published by Springer this book supported file pdf, txt, epub, kindle and other format this book has been release on 2020-05-25 with Technology & Engineering categories.
This textbook presents the application of mathematical methods and theorems tosolve engineering problems, rather than focusing on mathematical proofs. Applications of Vector Analysis and Complex Variables in Engineering explains the mathematical principles in a manner suitable for engineering students, who generally think quite differently than students of mathematics. The objective is to emphasize mathematical methods and applications, rather than emphasizing general theorems and principles, for which the reader is referred to the literature. Vector analysis plays an important role in engineering, and is presented in terms of indicial notation, making use of the Einstein summation convention. This text differs from most texts in that symbolic vector notation is completely avoided, as suggested in the textbooks on tensor algebra and analysis written in German by Duschek and Hochreiner, in the 1960s. The defining properties of vector fields, the divergence and curl, are introduced in terms of fluid mechanics. The integral theorems of Gauss (the divergence theorem), Stokes, and Green are introduced also in the context of fluid mechanics. The final application of vector analysis consists of the introduction of non-Cartesian coordinate systems with straight axes, the formal definition of vectors and tensors. The stress and strain tensors are defined as an application. Partial differential equations of the first and second order are discussed. Two-dimensional linear partial differential equations of the second order are covered, emphasizing the three types of equation: hyperbolic, parabolic, and elliptic. The hyperbolic partial differential equations have two real characteristic directions, and writing the equations along these directions simplifies the solution process. The parabolic partial differential equations have two coinciding characteristics; this gives useful information regarding the character of the equation, but does not help in solving problems. The elliptic partial differential equations do not have real characteristics. In contrast to most texts, rather than abandoning the idea of using characteristics, here the complex characteristics are determined, and the differential equations are written along these characteristics. This leads to a generalized complex variable system, introduced by Wirtinger. The vector field is written in terms of a complex velocity, and the divergence and the curl of the vector field is written in complex form, reducing both equations to a single one. Complex variable methods are applied to elliptical problems in fluid mechanics, and linear elasticity. The techniques presented for solving parabolic problems are the Laplace transform and separation of variables, illustrated for problems of heat flow and soil mechanics. Hyperbolic problems of vibrating strings and bars, governed by the wave equation are solved by the method of characteristics as well as by Laplace transform. The method of characteristics for quasi-linear hyperbolic partial differential equations is illustrated for the case of a failing granular material, such as sand, underneath a strip footing. The Navier Stokes equations are derived and discussed in the final chapter as an illustration of a highly non-linear set of partial differential equations and the solutions are interpreted by illustrating the role of rotation (curl) in energy transfer of a fluid.
Linear And Complex Analysis For Applications
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Author : John P. D'Angelo
language : en
Publisher: CRC Press
Release Date : 2017-08-02
Linear And Complex Analysis For Applications written by John P. D'Angelo and has been published by CRC Press this book supported file pdf, txt, epub, kindle and other format this book has been release on 2017-08-02 with Mathematics categories.
Linear and Complex Analysis for Applications aims to unify various parts of mathematical analysis in an engaging manner and to provide a diverse and unusual collection of applications, both to other fields of mathematics and to physics and engineering. The book evolved from several of the author’s teaching experiences, his research in complex analysis in several variables, and many conversations with friends and colleagues. It has three primary goals: to develop enough linear analysis and complex variable theory to prepare students in engineering or applied mathematics for advanced work, to unify many distinct and seemingly isolated topics, to show mathematics as both interesting and useful, especially via the juxtaposition of examples and theorems. The book realizes these goals by beginning with reviews of Linear Algebra, Complex Numbers, and topics from Calculus III. As the topics are being reviewed, new material is inserted to help the student develop skill in both computation and theory. The material on linear algebra includes infinite-dimensional examples arising from elementary calculus and differential equations. Line and surface integrals are computed both in the language of classical vector analysis and by using differential forms. Connections among the topics and applications appear throughout the book. The text weaves abstract mathematics, routine computational problems, and applications into a coherent whole, whose unifying theme is linear systems. It includes many unusual examples and contains more than 450 exercises.
Complex Variables For Scientists And Engineers
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Author : John D. Paliouras
language : en
Publisher: Courier Corporation
Release Date : 2014-02-20
Complex Variables For Scientists And Engineers written by John D. Paliouras and has been published by Courier Corporation this book supported file pdf, txt, epub, kindle and other format this book has been release on 2014-02-20 with Mathematics categories.
Outstanding undergraduate text provides a thorough understanding of fundamentals and creates the basis for higher-level courses. Numerous examples and extensive exercise sections of varying difficulty, plus answers to selected exercises. 1990 edition.
Linear And Complex Analysis For Applications
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Author : John P. D'Angelo
language : en
Publisher: CRC Press
Release Date : 2017-08-02
Linear And Complex Analysis For Applications written by John P. D'Angelo and has been published by CRC Press this book supported file pdf, txt, epub, kindle and other format this book has been release on 2017-08-02 with Mathematics categories.
Linear and Complex Analysis for Applications aims to unify various parts of mathematical analysis in an engaging manner and to provide a diverse and unusual collection of applications, both to other fields of mathematics and to physics and engineering. The book evolved from several of the author’s teaching experiences, his research in complex analysis in several variables, and many conversations with friends and colleagues. It has three primary goals: to develop enough linear analysis and complex variable theory to prepare students in engineering or applied mathematics for advanced work, to unify many distinct and seemingly isolated topics, to show mathematics as both interesting and useful, especially via the juxtaposition of examples and theorems. The book realizes these goals by beginning with reviews of Linear Algebra, Complex Numbers, and topics from Calculus III. As the topics are being reviewed, new material is inserted to help the student develop skill in both computation and theory. The material on linear algebra includes infinite-dimensional examples arising from elementary calculus and differential equations. Line and surface integrals are computed both in the language of classical vector analysis and by using differential forms. Connections among the topics and applications appear throughout the book. The text weaves abstract mathematics, routine computational problems, and applications into a coherent whole, whose unifying theme is linear systems. It includes many unusual examples and contains more than 450 exercises.
Complex Variables And Transform Calculus
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Author : Matiur Rahman
language : en
Publisher: Southhampton, UK : Computational Mechanics Publications
Release Date : 1997
Complex Variables And Transform Calculus written by Matiur Rahman and has been published by Southhampton, UK : Computational Mechanics Publications this book supported file pdf, txt, epub, kindle and other format this book has been release on 1997 with Mathematics categories.
Based on a series of lectures given by the author this text is designed for undergraduate students with an understanding of vector calculus, solution techniques of ordinary and partial differential equations and elementary knowledge of integral transforms. It will also be an invaluable reference to scientists and engineers who need to know the basic mathematical development of the theory of complex variables in order to solve field problems. The theorems given are well illustrated with examples.
University Of Michigan Official Publication
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Author :
language : en
Publisher: UM Libraries
Release Date : 1951
University Of Michigan Official Publication written by and has been published by UM Libraries this book supported file pdf, txt, epub, kindle and other format this book has been release on 1951 with Education, Higher categories.
Mathematical Techniques For Engineers And Scientists
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Author : Larry C. Andrews
language : en
Publisher: SPIE Press
Release Date : 2003
Mathematical Techniques For Engineers And Scientists written by Larry C. Andrews and has been published by SPIE Press this book supported file pdf, txt, epub, kindle and other format this book has been release on 2003 with Mathematics categories.
"This self-study text for practicing engineers and scientists explains the mathematical tools that are required for advanced technological applications, but are often not covered in undergraduate school. The authors (University of Central Florida) describe special functions, matrix methods, vector operations, the transformation laws of tensors, the analytic functions of a complex variable, integral transforms, partial differential equations, probability theory, and random processes. The book could also serve as a supplemental graduate text."--Memento.
Calculus Concept And Applications
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Author : Dr. Sivasankar
language : en
Publisher: Shineeks Publishers
Release Date : 2024-05-21
Calculus Concept And Applications written by Dr. Sivasankar and has been published by Shineeks Publishers this book supported file pdf, txt, epub, kindle and other format this book has been release on 2024-05-21 with Education categories.
Calculus is a cornerstone of modern mathematics and serves as a vital tool for understanding the world around us. From modeling the growth of populations to predicting the trajectory of rockets, the concepts of calculus are deeply embedded in the fabric of science, engineering, economics, and numerous other fields. This book, Introduction to Calculus, is designed to offer a comprehensive yet accessible exploration of calculus, bridging foundational theory with practical applications. The journey begins with a focus on the Introduction to Calculus, offering a conceptual framework by exploring rates of change, the historical context of its development, and its significance in various disciplines. This historical perspective not only situates calculus within the broader narrative of mathematical discovery but also demonstrates its lasting impact on various scientific and engineering endeavors. In subsequent chapters, we delve deeper into key topics that form the core of calculus. The chapter on Functions and Limits establishes the groundwork by explaining fundamental concepts such as functions, types of functions, and limits. These ideas serve as the building blocks for the study of Differentiation and Integration, where the rules and techniques are systematically explored. Each chapter is structured to introduce new concepts gradually, followed by relevant applications—optimization, curve sketching, and areas under curves—to show the tangible use of calculus in real-world problem-solving. Beyond the basics, the book expands to cover more advanced topics. The chapters on Differential Equations introduce first-order equations and their practical applications, while Sequences and Series provide insights into the behavior of infinite processes, such as Taylor and Maclaurin series. A special section on Multivariable Calculus addresses functions of several variables, partial derivatives, and vector calculus, extending the scope of the reader’s understanding into more complex dimensions. Recognizing the interdisciplinary nature of calculus, we have included a chapter dedicated to its applications in Science and Engineering. This section illustrates how calculus supports the exploration of phenomena in physics, engineering, economics, and biology, emphasizing its broad relevance. The final chapters introduce readers to Advanced Topics in Calculus, including nonlinear differential equations, Laplace transforms, and Fourier series, as well as computational tools such as MATLAB, Mathematica, and Python. These computational tools allow readers to apply numerical methods and visualize calculus problems in ways that were previously unimaginable. The aim of this book is to provide a clear, structured, and engaging approach to learning calculus, regardless of the reader’s background or experience level. Whether you are a student embarking on your first encounter with calculus or a professional looking to refresh your knowledge, we hope this book will guide you through both the theoretical and practical aspects of the subject. We encourage you to engage deeply with the exercises and real-world applications provided in each chapter. By doing so, you will not only master the fundamental concepts but also gain an appreciation for the elegance and power of calculus.