UID:
almahu_9949434608502882
Format:
1 online resource
ISBN:
9781000803709
,
1000803708
,
9781003343486
,
1003343481
,
1000803686
,
9781000803686
Series Statement:
Textbooks in mathematics
Content:
Every physicist, engineer, and certainly a mathematician, would undoubtedly agree that vector algebra is a part of basic mathematical instruments packed in their toolbox. Classical Vector Algebra should be viewed as a prerequisite, an introduction, for other mathematical courses dealing with vectors, following typical form and appropriate rigor of more advanced mathematics texts. Vector algebra discussed in this book briefly addresses vectors in general 3-dimensional Euclidian space, and then, in more detail, looks at vectors in Cartesian 3 space. These vectors are easier to visualize andtheir operational techniques are relatively simple, but they are necessary for the study of Vector Analysis. In addition, this book could also serve as a good way to build up intuitive knowledge for more abstract structures of -dimensional vector spaces. Definitions, theorems, proofs, corollaries, examples, and so onare not useless formalism, even in an introductory treatise -- they are the way mathematical thinking has to be structured. In other words, "introduction" and "rigor" are not mutually exclusive. The material in this book is neither difficult nor easy. The text is a serious exposition of a part of mathematics students need to master in order to be proficient in their field. In addition to the detailed outline of the theory, the book contains literally hundreds of corresponding examples/exercises.
Note:
Cover -- Half Title -- Series Information -- Title Page -- Copyright Page -- Table of Contents -- Preface -- The Author -- 1 Introduction -- Notes -- 2 Vector Space -- Definitions, Notation and Examples -- Notes -- 3 Three-Dimensional Vector Space V -- 3.1 Definition and Basic Features of V -- 3.2 Multiplication of a Vector By a Scalar -- 3.3 Collinear and Coplanar Vectors -- 3.4 Addition of Vectors -- 3.5 Basis of a Vector Space -- Note -- 4 Vectors in R3 Space -- 4.1 {i, j, k}-Basis of R3Space
,
4.2 Multiplication By a Scalar and Addition of Vectors in R3Space -- 4.3 Scalar (Dot) Product of Vectors -- 4.4 Cross (Vector) Product of Vectors -- 4.5 Mixed Product of Vectors -- 4.6 Triple Cross Product of Vectors -- 4.7 The Quadruple Dot and Quadruple Cross Product -- Notes -- 5 Elements of Analytic Geometry -- 5.1 Some Preliminary Remarks -- 5.2 Equations of a Line -- 5.3 The Angle Between Two Lines -- 5.4 The Distance Between a Point and a Line -- 5.5 The Equations of a Plane -- 5.6 The Angle Between Two Planes -- Note -- Appendix A -- A.1 Sets -- Appendix B
,
B.1 Sets of Numbers -- B.2 Properties of the Real Numbers -- Appendix C -- Index
Additional Edition:
Print version: ISBN 1032381000
Additional Edition:
ISBN 9781032381008
Language:
English
Keywords:
Textbooks.
DOI:
10.1201/9781003343486
URL:
https://www.taylorfrancis.com/books/9781003343486
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