A Student's Guide to Laplace Transforms

Hardback

Main Details

Title A Student's Guide to Laplace Transforms
Authors and Contributors      By (author) Daniel Fleisch
SeriesStudent's Guides
Physical Properties
Format:Hardback
Pages:220
Dimensions(mm): Height 235,Width 156
ISBN/Barcode 9781009098496
ClassificationsDewey:515.723
Audience
Tertiary Education (US: College)
Illustrations Worked examples or Exercises

Publishing Details

Publisher Cambridge University Press
Imprint Cambridge University Press
Publication Date 13 January 2022
Publication Country United Kingdom

Description

The Laplace transform is a useful mathematical tool encountered by students of physics, engineering, and applied mathematics, within a wide variety of important applications in mechanics, electronics, thermodynamics and more. However, students often struggle with the rationale behind these transforms, and the physical meaning of the transform results. Using the same approach that has proven highly popular in his other Student's Guides, Professor Fleisch addresses the topics that his students have found most troublesome; providing a detailed and accessible description of Laplace transforms and how they relate to Fourier and Z-transforms. Written in plain language and including numerous, fully worked examples. The book is accompanied by a website containing a rich set of freely available supporting materials, including interactive solutions for every problem in the text, and a series of podcasts in which the author explains the important concepts, equations, and graphs of every section of the book.

Author Biography

Daniel Fleisch is Emeritus Professor of Physics at Wittenberg University, where he specialises in electromagnetics and space physics. He is the author of five other books with the Student's Guide series, published by Cambridge University Press: A Student's Guide to Maxwell's Equations (2008); A Student's Guide to Vectors and Tensors (2011); A Student's Guide to the Mathematics of Astronomy (2013), A Student's Guide to Waves (2015), and A Student's Guide to the Schroedinger Equation (2020).