Property of Fourier Transforms with ?-Shifting and x-Shifting

Authors

  • Shiferaw Geremew Kebede Department of Mathematics, Madda Walabu University, Bale Robe, Ethiopia, PO Box: 247

Keywords:

Fourier transforms Heaviside functions.

Abstract

The authors establish a set of presumably new properties. If we have the Fourier transform of  this property helps us to get immediately the Fourier transform of   Also complicated inputs     (right sides of linear differential equations) can be handled very efficiently and Heaviside shall drop variables when this simplifies formulas without causing confusion by using this properties [3].

References

Ordinary Differential equations, GABRIEL NAGY, Mathematics Department, SEPTEMBER 14, 2015

Introduction to Ordinary Differential Equations and Some Applications, Edward Burkard

Advanced Engineering Mathematics, Erwin Kreyszing, Herbert Kreyszing, Edward J. Norminton 10th Edition

A first Course in Differential equations, Rudolph E. Longer, 1954

Differential Equation and Integral Equations, Peter J. Collins, 2006

Differential Equations, James R. Brannan, William E. Boyce, 2nd edition

Differential Equations for Engineers, Wei-Chau Xie, 2010

Advanced Engineering Mathematics 7th Edition, PETER V. ONEIL

Historically, how and why was the Laplace Transform invented? Written 18 Oct 2015 From Wikipedia:

Shiferaw Geremew Kebede, Properties of Fourier cosine and sine transforms, IJSBAR, 35(3) (2017) 184-193

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Published

2017-12-03

How to Cite

Kebede, S. G. (2017). Property of Fourier Transforms with ?-Shifting and x-Shifting. International Journal of Sciences: Basic and Applied Research (IJSBAR), 36(7), 81–85. Retrieved from https://www.gssrr.org/index.php/JournalOfBasicAndApplied/article/view/8428

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Articles