Transforms and Applications Primer for Engineers with Examples and MATLAB® Electrical Engineering Primer Series
Auteur : Poularikas Alexander D.
Transforms and Applications Primer for Engineers with Examples and MATLAB is required reading for engineering and science students, professionals, and anyone working on problems involving transforms. This invaluable primer contains the most essential integral transforms that both practicing engineers and students need to understand. It provides a large number of examples to explain the use of transforms in different areas, including circuit analysis, differential equations, signals and systems, and mechanical vibrations.
Includes an appendix with suggestions and explanations to help you optimize your use of MATLAB
Laplace and Fourier transforms are by far the most widely used and most useful of all integral transforms, so they are given a more extensive treatment in this book, compared to other texts that include them. Offering numerous MATLAB functions created by the author, this comprehensive book contains several appendices to complement the main subjects. Perhaps the most important feature is the extensive tables of transforms, which are provided to supplement the learning process. This book presents advanced material in a format that makes it easier to understand, further enhancing its immense value as a teaching tool for engineers and research scientists in academia and industry, as well as students in science and engineering.
Date de parution : 11-2017
15.6x23.4 cm
Date de parution : 03-2010
Ouvrage de 456 p.
15.6x23.4 cm
Thèmes de Transforms and Applications Primer for Engineers with... :
Mots-clés :
General Frequency Response Function; RLC Series Circuit; Fourier Series; Ordinary Differential Equations; Fourier Transforms; Book MATLAB; Relatives to the Fourier Transform; LTI System; Discrete-Time Transforms; DFT Property; Sampling of Continuous Signals; Discrete Time Signal; Book MATLAB Function; 2p Ts; Convolution Property; Sin Npx; Ω0 Ωs; Frequency Response Function; Ts X1; nT 2T; Partial Fraction Form; Difference Equation; Nyquist Frequency; Frequency Bins; Sin Av; Gravity Torque; Ce Ju; Cos Av; L1 Di1