SIGNIFICANCE OF FOURIER INTEGRAL THEOREM TO PARTIAL  DIFFERENTIAL EQUATIONS SIGNIFICANCE OF FOURIER INTEGRAL THEOREM TO PARTIAL  DIFFERENTIAL EQUATIONS  SIGNIFICANCE OF FOURIER INTEGRAL THEOREM TO PARTIAL

dc.contributor.author	GASHAYE ENDALE
dc.date.accessioned	2019-01-10T06:50:38Z
dc.date.available	2019-01-10T06:50:38Z
dc.date.issued	2016-10
dc.identifier.uri	http://hdl.handle.net/123456789/1082
dc.description.abstract	The Fourier integral theorem is a generalization of the Fourier series expansion. In this thesis, we solved one dimensional heat equation by using Fourier transform, Fourier sine transform, Fourier cosine transform method. We also obtained the solution of heat equation by computational method. We analyzed the solutions by using Mathematica software as well as by Mat lab programming.	en_US
dc.language.iso	en	en_US
dc.publisher	ARBA MINCH	en_US
dc.subject	Heat equation, Fourier transforms Computational method	en_US
dc.title	SIGNIFICANCE OF FOURIER INTEGRAL THEOREM TO PARTIAL DIFFERENTIAL EQUATIONS SIGNIFICANCE OF FOURIER INTEGRAL THEOREM TO PARTIAL DIFFERENTIAL EQUATIONS SIGNIFICANCE OF FOURIER INTEGRAL THEOREM TO PARTIAL	en_US
dc.type	Thesis	en_US