Vector CalculusVector calculus is the fundamental language of mathematical physics. It pro vides a way to describe physical quantities in three-dimensional space and the way in which these quantities vary. Many topics in the physical sciences can be analysed mathematically using the techniques of vector calculus. These top ics include fluid dynamics, solid mechanics and electromagnetism, all of which involve a description of vector and scalar quantities in three dimensions. This book assumes no previous knowledge of vectors. However, it is assumed that the reader has a knowledge of basic calculus, including differentiation, integration and partial differentiation. Some knowledge of linear algebra is also required, particularly the concepts of matrices and determinants. The book is designed to be self-contained, so that it is suitable for a pro gramme of individual study. Each of the eight chapters introduces a new topic, and to facilitate understanding of the material, frequent reference is made to physical applications. The physical nature of the subject is clarified with over sixty diagrams, which provide an important aid to the comprehension of the new concepts. Following the introduction of each new topic, worked examples are provided. It is essential that these are studied carefully, so that a full un derstanding is developed before moving ahead. Like much of mathematics, each section of the book is built on the foundations laid in the earlier sections and chapters. |
Contents
I | 1 |
IV | 2 |
V | 3 |
VI | 4 |
VII | 7 |
VIII | 9 |
IX | 11 |
X | 14 |
XLII | 76 |
XLIII | 78 |
XLIV | 83 |
XLVII | 85 |
XLVIII | 87 |
XLIX | 88 |
L | 91 |
LI | 93 |
XI | 16 |
XII | 17 |
XIII | 21 |
XIV | 22 |
XV | 23 |
XVI | 25 |
XVII | 26 |
XVIII | 28 |
XIX | 30 |
XX | 31 |
XXI | 33 |
XXII | 38 |
XXIII | 39 |
XXIV | 40 |
XXV | 45 |
XXVI | 47 |
XXVII | 48 |
XXVIII | 51 |
XXIX | 52 |
XXX | 53 |
XXXI | 56 |
XXXIII | 58 |
XXXIV | 60 |
XXXV | 61 |
XXXVII | 65 |
XXXVIII | 68 |
XXXIX | 70 |
XL | 72 |
XLI | 74 |
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Common terms and phrases
a x b anti-symmetric Applying C₁ Cartesian coordinate system components conservative vector field consider constant cross product curvilinear coordinate defined definition density differentiable direction div and curl divergence theorem dot product du₁ dx dy e₁ Eijk electric field equal evaluated Example exp ax Əxi field F Figure Find fluid flux follows force formula function gives grad gradient Hence irrotational isotropic Laplace's equation Laplacian line integral magnitude matrix obeys parameter partial derivatives perpendicular physical plane position vector result right-handed rotation scalar field scalar triple product scale factors second-rank tensor Section Show Similarly sin² Stokes's theorem stress tensor suffix notation surface element surface integral u₁ unit vectors velocity volume element volume integral written in terms zero მა მე მთ მი მყ