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Title: | COMPUTATIONAL METHOD FOR SOLVING A SYSTEM OF UNt:AR ALGEBRAIC EQUATIONS |
Authors: | ADAGHE, OSAZUWA JOSEPH |
Issue Date: | Mar-1998 |
Abstract: | Algebraic equation is an equation in which factors on both sides of an equality sign( =) are the same , but if the highest power of the variable that occurs in the equation is one (1), that equation is regarded as a system of linear algebraic equation and if otherwise, it is non-linear equation. This project focused on the computational method for solving a system of linear algebraic equation by the use of computer application, due to complexity of the topic itself and the repetitive nature involve in the solving of linear algebraic equation using iterative method (i. e Gauss-Seidel and Jacobs methods), the adoption of the computer application into the computation of linear algebraic eliminate the complexities involved in the computation of linear algebraic equation manually. Besides the Direct methods and Indirect methods under which the Gauss and Gauss Jordan elimination also Jacobs and Gauss -Seidel iterative methods considered some system of linear algebraic equation with the use of computer application written in dbase Language on the different system discussed with the output attached. In addition, the project looked also' into linear algebraic equation with matrices and the various types of matrix and their meaning with examples. In conclusion, the use of computer application in computations of linear algebraic equation fasten the process in solving such equation and getting accurate result in shortest possible time |
URI: | http://repository.futminna.edu.ng:8080/jspui/handle/123456789/22613 |
Appears in Collections: | Postgraduate diploma theses and dissertations. |
Files in This Item:
File | Description | Size | Format | |
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MTH PGD21649ocr.pdf | 18.25 MB | Adobe PDF | View/Open |
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