Volume 66 | Issue 4 | Year 2020 | Article Id. IJMTT-V66I4P502 | DOI : https://doi.org/10.14445/22315373/IJMTT-V66I4P502
Prof. Manoj P.Khere, Prof. Ashvini D. Nakhale, Prof.S.R.Hole, "Analysis And Observation of Conventional Method of Partial Fraction," International Journal of Mathematics Trends and Technology (IJMTT), vol. 66, no. 4, pp. 10-12, 2020. Crossref, https://doi.org/10.14445/22315373/IJMTT-V66I4P502
[1] Yiu-Kwong Man, “ On Partial Fraction Decomposition of Rational Functions with Irreducible Quadratic Factors in the Denominators” Proceedings of the World Congress on Engineering 2011 Vol I WCE 2011, July 6-8, 2011, London, U.K.
[2] Allen Leung Yiu-Kwong Man “ Teaching a New Method of Partial Fraction Decomposition to Senior Secondary Students: Results and Analysis from a Pilot Study” Proceedings of the 2nd International Conference on the Teaching of Mathematics, Crete, Greece: John Wiley & Sons, 2002.
[3] Youngsoo Kim, Byunghoon Lee “ Partial Fraction Decomposition by Repeated Synthetic Division” American Journal of Computational Mathematics, 2016, 6, 153-158 Published Online June 2016 in SciRes
[4] Kung, H.T. and Tong, D.M. (1977) Fast Algorithms for Partial Fraction Decomposition. SIAM: SIAM Journal on Computing, 6, 582-593.
[5] Kwang Hyun Kim and Xin Zhang “ ℎ-Adic Polynomials and Partial Fraction Decomposition of Proper Rational Functions over R or C” Hindawi International Journal of Mathematics and Mathematical Sciences Volume 2018, Article ID 7495964, 6 pages
[6] Y. K. Man, A simple algorithm for computing partial fraction expansions with multiple poles. International Journal of Mathematics Education in Science and Technology, 38 (2007), pp. 247-251.
[7] Y. K. Man, On partial fraction decomposition of rational functions with irreducible quadratic factors in the denominators. Proceedings of the World Congress on Engineering 2011, Vol. I (2011), pp. 237-239, London: International Association of Engineers.
[8] J. Mikusinski and P. Mikusinski, An Introduction to Analysis, New York: John Wiley & Sons, 1993.
[9] Annraoi de Paor, How to simplify differentiation when performing partial fraction expansion in the presence of a single multiple pole. International Journal of Electrical Engineering Education. 40 (2003), pp. 315-320.
[10] T. Wang, Techniques on partial fractions. Proceedings of the AMATYC 33rd Annual Conference, Minneapolis: American Mathematical Association of Two Year College, 2007. Retrieved on Dec 30, 2011 from:http://www.amatyc.org/publications/Electronic-proceedings/2007Minneapolis/wang07.pdf
[11] R. Witula, D. Slota, Partial fraction decompositions of some rational functions. Applied Mathematics and Computation, 197 (2008), pp. 328-336.