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Implementation of Gaussian- Elimination
Awatif M.A. Elsiddieg

Awatif M.A. Elsiddieg, Faculty of Mathematical Sciences Elneilain University Math. Department Khartoum Sudan.
Manuscript received on 09 April 2016 | Revised Manuscript received on 16 April 2016 | Manuscript Published on 30 April 2016 | PP: 7-19 | Volume-5 Issue-11, April 2016 | Retrieval Number: K22830451116/2016©BEIESP
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© The Authors. Blue Eyes Intelligence Engineering and Sciences Publication (BEIESP). This is an open access article under the CC-BY-NC-ND license (http://creativecommons.org/licenses/by-nc-nd/4.0/)

Abstract: Gaussian elimination is an algorithm for solving systems of linear equations, can also use to find the rank of any matrix ,we use Gaussian Jordan elimination to find the inverse of a non singular square matrix. This work gives basic concepts in section (1) , show what is pivoting , and implementation of Gaussian elimination to solve a system of linear equations. Section (2) we find the rank of any matrix. Section (3) we use Gaussian elimination to find the inverse of a non singular square matrix. We compare the method by Gauss Jordan method. In section (4) practical implementation of the method we inherit the computation features of Gaussian elimination we use programs in Matlab software.
Keywords: Gaussian elimination, algorithm Gauss, Jordan, method, computation, features, programs in Matlab, software.

Scope of the Article: Software Engineering & Its Applications