(RETRACTED) The development of Newton’s method by enhancing the starting point
(1) Universitas Sumatera Utara, Medan, Indonesia
(2) Universitas Sumatera Utara, Medan, Indonesia
(3) Universitas Sumatera Utara, Medan, Indonesia
Corresponding Author
AbstractReason for Retraction (February 01st, 2024):
This article has been retracted by the editors due to publication ethics misconduct by authors that the authors did not have ownership of the data that they report. Ismi Ratin Nabiyah as a corresponding Author of the article and as the representative of all authors, has asked the editor to retracted this article and recognize the mistakes for him. Keywordsdevelopment; newton’s method; newton-raphson; starting point
|
Article DOIDOI: https://doi.org/10.33122/ijtmer.v6i1.205 |
|
Article MetricsAbstract views : 1062PDF views : 166 |
Article PagesPages: 12-18 |
Full Text:PDF |
References
Azizi, A. Abdi, S. 2015. A new idea for constructing Halley’s method.Internationalv Journal of Applied Mathematics. Vol. 28, 107-110.
Behl, R dan Kanwar, V. 2013. Variants of Chebyshev’s Method with Optimal Order of Convergence. Tamsui Oxford Journal of International and Mathematical Sciences. Vol. 29, 39-53.
Chen, J. Vuik, C. 2016. Globalization tecjnique for projected Newton-Krylov method. International Journal for National Method’s in Engineering.
Chun, C. 2007. Some improvements of Jarratt’s method with sixth-order convergence. Appl. Math.Comput. Vol. 190, 1432-1437.
Traub, J.F. 1982. Iterative methods for the solution of equations, Englewood: Prentice-Hall.
Sharma, J.R, Guha, R.K. 2007. A family of modiefied Ostrowski methods with accelerated sixth order convergence. Appl. Math. Comput. Vol.190, 111-115.
Kanwar, V. dan Tomar, S.K. 2009. Exponentially fitted variants of Newton’s methods with quadratic and cubic convergence. Journal of Computer Mathematics. Vol. 86, 1603-1611.
Kho, J. 2014. Steffensen-Newton method with third order convergence to solve nonlinear equation. Journal of Applied Mathematics. Vol. 140, 519-522.
Kreyszig E. 1998. Advanced Engineering Mathematics 8th edition. New York: John Wiley.
Sanchez, M.G. dan Barrero, J.L.D. 2011. A Technique to composite a modiefied Newton’s method for solving nonlinear Equations. Cornell University Library.
Weerakoon, S. dan Fernando. 2000. A variant of Newton’s methode with accelerated third order convergence. Applied Mathematics Letters. Vol.13, 87-93.
Refbacks
- There are currently no refbacks.
Copyright (c) 2023 Ismi Ratin Nabiyah, Opim Salim, Tulus Tulus
International Journal of Trends in Mathematics Education Research (IJTMER)
E-ISSN 2621-8488Published by the SAINTIS Publishing
Homepage: http://ijtmer.saintispub.com/index.php/ijtmer/index
Editor E-mail : ijtmer@saintispub.com; ijtmer@gmail.com
IJTMER is licensed under a Creative Commons Attribution-ShareAlike 4.0 International License.