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1860797562845396992
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INTELEK Repository
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Online Access
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https://intelek.unisza.edu.my/intelek/pages/search.php?search=!collection407072
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| date |
2016-10-09 08:10:31
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Restricted Document
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13256
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UniSZA
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| internalnotes |
[1] H. J. Zimmermann, Fuzzy Set Theory and Its Applications, 3rd ed., Kluwer Academic, Norwell, MA, 1991. [2] M. Amirfakhrian, Numerical solution of algebraic fuzzy equations with crisp variable by Gauss-Newton method, Appl. Math. Model. 32 (2008), 1859-1868. [3] L. A. Zadeh, Fuzzy sets, Information and Control 8 (1965), 338-353. [4] M. Waziri and A. Moyi, An alternative approach for solving dual fuzzy nonlinear equations, Inter. J. Fuzzy Systems 18 (2016), 103-107. [5] J. J. Buckley and Y. Qu, Solving fuzzy equations: a new solution concept, Fuzzy Sets and Systems 39 (1991), 291- 301. [6] J. J. Buckley and Yunxia Qu, Solving linear and quadratic fuzzy equations, Fuzzy Sets and Systems 38 (1990), 43-59. [7] S. Abbasbandy and B. Asady, Newton method for solving fuzzy nonlinear equations, Appl. Math. Comput. 159 (2004), 349-356. [8] J. H. Mathews and K. D. Fink, Numerical Method Using MATLAB, Prentice Hull, Upper Saddle River, NJ 07458, 1999. [9] A. Ramli, M. L. Abdullah and M. Mamat, Broyden’s method for solving fuzzy nonlinear equations, Advances in Fuzzy Systems 2010 (2010), Article ID 763270, 6 pp. http://dx.doi.org/10.1155/2010/763270. [10] J. Ma and G. Feng, An approach to H∞ control of fuzzy dynamic systems, Fuzzy Sets and Systems 137 (2003), 367-386. [11] D. Dubois and H. Prade, Fuzzy Sets and Systems: Theory and Application, Academic Press, New York, NY, USA, 1980. [12] S. Muzzioli and H. Reynaerts, Fuzzy linear systems of the form A1x + b1 = A2x , + b2 Fuzzy Sets and Systems 157(7) (2006), 939-951. [13] L. S. Senthilkumar and K. Ganesan, Bisection method for fuzzy nonlinear equations, Global J. Pure Appl. Math. 12(1) (2016), 271-276.
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norman
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oai_dc
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13256 https://intelek.unisza.edu.my/intelek/pages/view.php?ref=13256 https://intelek.unisza.edu.my/intelek/pages/search.php?search=!collection407072 Restricted Document Article Journal image/jpeg inches 96 96 norman 762 20 20 1429 2016-10-09 08:10:31 1429x762 7566-01-FH02-FIK-16-06685.jpg UniSZA Private Access Regula falsi method for solving fuzzy nonlinear equation Far East Journal of Mathematical Sciences In this paper, we introduce numerical method for solving algebraic fuzzy equation of degree n with fuzzy coefficients and crisp variable. The fuzzy quantities are presented in parametric form. Some numerical examples are provided to illustrate the efficiency of the method. 100 6 Pushpa Publishing House Pushpa Publishing House 873-884 [1] H. J. Zimmermann, Fuzzy Set Theory and Its Applications, 3rd ed., Kluwer Academic, Norwell, MA, 1991. [2] M. Amirfakhrian, Numerical solution of algebraic fuzzy equations with crisp variable by Gauss-Newton method, Appl. Math. Model. 32 (2008), 1859-1868. [3] L. A. Zadeh, Fuzzy sets, Information and Control 8 (1965), 338-353. [4] M. Waziri and A. Moyi, An alternative approach for solving dual fuzzy nonlinear equations, Inter. J. Fuzzy Systems 18 (2016), 103-107. [5] J. J. Buckley and Y. Qu, Solving fuzzy equations: a new solution concept, Fuzzy Sets and Systems 39 (1991), 291- 301. [6] J. J. Buckley and Yunxia Qu, Solving linear and quadratic fuzzy equations, Fuzzy Sets and Systems 38 (1990), 43-59. [7] S. Abbasbandy and B. Asady, Newton method for solving fuzzy nonlinear equations, Appl. Math. Comput. 159 (2004), 349-356. [8] J. H. Mathews and K. D. Fink, Numerical Method Using MATLAB, Prentice Hull, Upper Saddle River, NJ 07458, 1999. [9] A. Ramli, M. L. Abdullah and M. Mamat, Broyden’s method for solving fuzzy nonlinear equations, Advances in Fuzzy Systems 2010 (2010), Article ID 763270, 6 pp. http://dx.doi.org/10.1155/2010/763270. [10] J. Ma and G. Feng, An approach to H∞ control of fuzzy dynamic systems, Fuzzy Sets and Systems 137 (2003), 367-386. [11] D. Dubois and H. Prade, Fuzzy Sets and Systems: Theory and Application, Academic Press, New York, NY, USA, 1980. [12] S. Muzzioli and H. Reynaerts, Fuzzy linear systems of the form A1x + b1 = A2x , + b2 Fuzzy Sets and Systems 157(7) (2006), 939-951. [13] L. S. Senthilkumar and K. Ganesan, Bisection method for fuzzy nonlinear equations, Global J. Pure Appl. Math. 12(1) (2016), 271-276.
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| spellingShingle |
Regula falsi method for solving fuzzy nonlinear equation
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| summary |
In this paper, we introduce numerical method for solving algebraic fuzzy equation of degree n with fuzzy coefficients and crisp variable. The fuzzy quantities are presented in parametric form. Some numerical examples are provided to illustrate the efficiency of the method.
|
| title |
Regula falsi method for solving fuzzy nonlinear equation
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| title_full |
Regula falsi method for solving fuzzy nonlinear equation
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| title_fullStr |
Regula falsi method for solving fuzzy nonlinear equation
|
| title_full_unstemmed |
Regula falsi method for solving fuzzy nonlinear equation
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| title_short |
Regula falsi method for solving fuzzy nonlinear equation
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| title_sort |
regula falsi method for solving fuzzy nonlinear equation
|