Calculus with Complex Numbers
โ John B. Reade
๐ Library
๐
2003
๐ CRC Press
๐ English
โฆ LIBER โฆ
๐
Calculus with Complex Numbers, 1st Edition
โ Scribed by John B. Reade
- Year
- 2003
- Tongue
- English
- Leaves
- 109
- Edition
- 1
- Category
- Library
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No coin nor oath required. For personal study only.
โฆ Synopsis
This practical treatment explains the applications complex calculus without requiring the rigor of a real analysis background. The author explores algebraic and geometric aspects of complex numbers, differentiation, contour integration, finite and infinite real integrals, summation of series, and the fundamental theorem of algebra. The Residue Theorem for evaluating complex integrals is presented in a straightforward way, laying the groundwork for further study. A working knowledge of real calculus and familiarity with complex numbers is assumed. This book is useful for graduate students in calculus and undergraduate students of applied mathematics, physical science, and engineering.
๐ SIMILAR VOLUMES
Calculus with complex numbers
โ Reade J.B.
๐ Library
๐
2003
๐ English
This text is a practical course in complex calculus that covers the applications, but does not assume the full rigor of a real analysis background. Topics covered include algebraic and geometric aspects of complex numbers, differentiation, contour integration, evaluation of finite and infinite real
Calculus With Complex Numbers
๐ Library
๐ Taylor & Francis
๐ English
Calculus with Complex Numbers
โ John B. Reade
๐ Library
๐
2003
๐ CRC Press
๐ English
that they are too verbose, too much geared toward teaching everything to everyone (rather than teaching the basics to everyone), too heavy, and too expensive. This little slim volume is in some sense an optimal solution to this problem. It covers the very basics of complex analysis in such a way t
Calculus with Complex Number
โ Reade J.B.
๐ Library
๐ English
CRC, 2003. - 128 pages.<div class="bb-sep"></div>This practical course in complex calculus explains the applications, without requiring the rigor of a real analysis background. The author explores algebraic and geometric aspects of complex numbers, differentiation, contour integration, finite and in
Calculus With Complex Numbers. Read
๐ Library
๐ English