Numerical Solutions Using the Taylor Series Method Initial and Boundary Value Problems
Numerical Solutions Using the Taylor Series Method Initial and Boundary Value Problems | 15.08 MB
Title: Numerical Solutions Using the Taylor Series Method Initial and Boundary Value Problems
Author: Sujaul Chowdhury, Md. Golam Moktadir
Category: Nonfiction, Science & Nature, Mathematics, Mathematical Analysis, Science, Physics, Mathematical Physics
Language: English | 120 Pages | ISBN: 9783032269928
Description:
This book discusses the Taylor Series Method for numerical solution of initial and boundary value problems. A number of differential equations related to problems in physics have been solved numerically, including radioactive decay; simple harmonic motion; damped harmonic motion; driven damped harmonic motion; motion of oscillators in phase space, cyclotron motion; and differential equations for Hyperbolic functions. In addition, several Hermite polynomials have been reproduced by numerically solving two-point boundary value problems. Regarding oscillatory motion, the authors present both velocity and displacement of the oscillating particle as functions of time. For cyclotron motion, the authors simulate trajectory of electrons in magnetic field in real space. Also, Hermite polynomials H3, H4 and H5 are reproduced by numerically solving two-point boundary value problems.
DOWNLOAD:
https://rapidgator.net/file/cf668c97eda98c4ec5360ad23787535a/978-3-032-26992-8.rar
https://nitroflare.com/view/392F602532DF357/978-3-032-26992-8.rar
This book discusses the Taylor Series Method for numerical solution of initial and boundary value problems. A number of differential equations related to problems in physics have been solved numerically, including radioactive decay; simple harmonic motion; damped harmonic motion; driven damped harmonic motion; motion of oscillators in phase space, cyclotron motion; and differential equations for Hyperbolic functions. In addition, several Hermite polynomials have been reproduced by numerically solving two-point boundary value problems. Regarding oscillatory motion, the authors present both velocity and displacement of the oscillating particle as functions of time. For cyclotron motion, the authors simulate trajectory of electrons in magnetic field in real space. Also, Hermite polynomials H3, H4 and H5 are reproduced by numerically solving two-point boundary value problems.
DOWNLOAD:
https://rapidgator.net/file/cf668c97eda98c4ec5360ad23787535a/978-3-032-26992-8.rar
https://nitroflare.com/view/392F602532DF357/978-3-032-26992-8.rar
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