Principles of Linear Algebra With Maple
Principles of Linear Algebra With Maple by Kenneth M. Shiskowski is a comprehensive resource published by Wiley on September 28, 2010. This 616-page book provides an accessible introduction to the theoretical and computational aspects of linear algebra, utilizing Maple software to enhance understanding of complex concepts and visualize geometric elements of the subject.
Readers will find a structured exploration of key topics typically covered in a first course in linear algebra, including linear systems of equations, matrices, determinants, and eigenvalues. The book begins with an introduction to Maple commands and programming guidelines, making it suitable for those with no prior experience with the software. It also delves into advanced topics such as linear transformations and the geometry of affine maps, supported by numerous graphics and animations. Additionally, a related website offers supplemental materials, including Maple code for exercises and solutions, making this edition a valuable reference for both students and professionals interested in the intersection of linear algebra and computational tools.
Official synopsis Publisher
An accessible introduction to the theoretical and computational aspects of linear algebra using MapleTM
Many topics in linear algebra can be computationally intensive, and software programs often serve as important tools for understanding challenging concepts and visualizing the geometric aspects of the subject. Principles of Linear Algebra with Maple uniquely addresses the quickly growing intersection between subject theory and numerical computation, providing all of the commands required to solve complex and computationally challenging linear algebra problems using Maple. The authors supply an informal, accessible, and easy-to-follow treatment of key topics often found in a first course in linear algebra.
Requiring no prior knowledge of the software, the book begins with an introduction to the commands and programming guidelines for working with Maple. Next, the book explores linear systems of equations and matrices, applications of linear systems and matrices, determinants, inverses, and Cramer’s rule. Basic linear algebra topics such as vectors, dot product, cross product, and vector projection are explained, as well as the more advanced topics of rotations in space, rolling a circle along a curve, and the TNB Frame. Subsequent chapters feature coverage of linear transformations from Rn to Rm, the geometry of linear and affine transformations, least squares fits and pseudoinverses, and eigenvalues and eigenvectors.
The authors explore several topics that are not often found in introductory linear algebra books, including sensitivity to error and the effects of linear and affine maps on the geometry of objects. The Maple software highlights the topic’s visual nature, as the book is complete with numerous graphics in two and three dimensions, animations, symbolic manipulations, numerical computations, and programming. In addition, a related Web site features supplemental material, including Maple code for each chapter’s problems, solutions, and color versions of the book’s figures.
Extensively class-tested to ensure an accessible presentation, Principles of Linear Algebra with Maple is an excellent book for courses on linear algebra at the undergraduate level. It is also an ideal reference for students and professionals who would like to gain a further understanding of the use of Maple to solve linear algebra problems.
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