An Improved Poisson Approximation to Binomial Distribution

Kanint Teerapabolarn

doi:https://doi.org/10.14445/22315373/IJMTT-V68I9P504

International Journal of Mathematics Trends and Technology

Research Article | Open Access | Download PDF

Volume 68 | Issue 9 | Year 2022 | Article Id. IJMTT-V68I9P504 | DOI : https://doi.org/10.14445/22315373/IJMTT-V68I9P504

An Improved Poisson Approximation to Binomial Distribution

Kanint Teerapabolarn

Received	Revised	Accepted	Published
22 Jul 2022	28 Aug 2022	12 Sep 2022	27 Sep 2022

Abstract

We determine a new improved Poisson distribution with mean λ=np/q from the binomial distribution with parameters n and p. In view of three approximations to the binomial distribution, the improved Poisson approximation of this study is more accurate than both the improved Poisson approximation [26] and simple Poisson approximation.

Keywords

Binomial distribution, Improved Poisson approximation, Poisson distribution.

References

[1] L. C. Friedman, W. L. Bradford and D. B. Peart, “Application of Binomial Distributions to Quality Assurance of Quantitative Chemical Analyses,” Journal of Environmental Science and Health. Part A: Environmental Science and Engineering, vol. 18, no. 4, pp. 561-570, 2008.
[2] D. P. Hu, Y. Q. Cui and A. H. Yin, “An Improved Negative Binomial Approximation for Negative Hypergeometric Distribution,” Applied Mechanics and Materials, vol. 427-429, pp. 2549-2553, 2013.
[3] K. Jaioun and K. Teerapabolarn, “An Improved Binomial Approximation for the Hypergeometric Distribution,” Applied Mathematical Sciences, vol. 8, no. 13, pp. 613-617, 2014.
[4] K. Jaioun and K. Teerapabolarn, “A New Improvement of Negative Binomial Approximation for the Negative Hypergeometric,” Applied Mathematical Sciences, vol. 8, no. 80, pp. 3991-3995, 2014.
[5] K. Jaioun and K. Teerapabolarn, “An Improved Negative Binomial Approximation for the Beta Binomial Distribution,”Applied Mathematical Sciences, vol. 8, no. 111, pp. 5529-5532, 2014.
[6] K. Jaioun and K. Teerapabolarn, “An Improved Poisson Approximation for the Binomial Distribution,” Applied Mathematical Sciences, vol. 8, no. 174, pp. 8651-8654, 2014.
[7] N. Kumar and S. K. Chandrawanshi, “Monsoon, Post Monsoon Rainy Days Analysis by Using Normal, Binomial Distribution and Discrete Probability for South Gujarat,” Mausam, vol. 73, no. 1, pp. 37-58, 2022.
[8] F. Mosteller and J. W. Tukey, “The Uses and Usefulness of Binomial Probability Paper,” Journal of the American Statistical Association, vol. 44, no. 246, pp. 174-212, 1949.
[9] B. O. Osu, S. O. Eggege and E. J. Ekpeyong, “Application of Generalized Binomial Distribution Model for Option Pricing,” American Journal of Applied Mathematics and Statistics, vol. 5, no. 2, pp. 62-71, 2017.
[10] M. J. Raffin and D. Schafer, “Application of A Probability Model Based on the Binomial Distribution to Speech-Discrimination Scores,” Journal of Speech, Language, and Hearing Research, vol. 23, no. 3, pp. 570-575, 1980.
[11] T. Rahman, P. J. Hazarika and M. P. Barman, “One Inflated Binomial Distribution and Its Real-Life Applications,” Indian Journal of Science and Technology, vol. 14, no. 22, pp. 1839-1854, 2021.
[12] I. Taufiq, F. Sulistyowati and A. Usman, “Binomial Distribution at High School: an Analysis Based on Learning Trajectory,” Journal of Physics: Conference Series, vol. 1521, pp. 1-7, 2020.
[13] K. Teerapabolarn, “An Improved Binomial to Approximate the Hypergeometric Distribution,” International Journal of Pure and Applied Mathematics, vol. 90, no. 4, pp. 515-518, 2014.
[14] K. Teerapabolarn, “An Improved Binomial Distribution to Approximate the Negative Hypergeometric Distribution,” International Journal of Pure and Applied Mathematics, vol. 91, no. 1, pp. 77-81, 2014.
[15] K. Teerapabolarn, “An Improved Geometric Distribution to Approximate the Yule Distribution,” International Journal of Pure and Applied Mathematics, vol. 91, no. 1, pp. 83-86, 2014.
[16] K. Teerapabolarn, “An Improved Negative Binomial Distribution to Approximate the Negative Hypergeometric Distribution,” International Journal of Pure and Applied Mathematics, vol. 91, no. 2, pp. 231-235, 2014.
[17] K. Teerapabolarn, “An Improved Poisson Distribution to Approximate the Negative Binomial Distribution,” International Journal of Pure and Applied Mathematics, vol. 91, no. 3, pp. 369-373, 2014.
[18] K. Teerapabolarn, “An Improved Negative Binomial Distribution to Approximate the Polya Distribution,” International Journal of Pure and Applied Mathematics, vol. 93, no. 5, pp. 625-628, 2014.
[19] K. Teerapabolarn, “An Improved Binomial Distribution to Approximate the Polya Distribution,” International Journal of Pure and Applied Mathematics, vol. 93, no. 5, pp. 629-632, 2014.
[20] K. Teerapabolarn, “An Improved Geometric Approximation for a Beta Binomial Distribution,” Applied Mathematical Sciences, vol. 8, no. 161, pp. 8037-8040, 2014.
[21] K. Teerapabolarn, “An Improved Geometric Approximation for the Beta Geometric Distribution,” Applied Mathematical Sciences, vol. 8, no. 161, pp. 8041-8044, 2014.
[22] K. Teerapabolarn, “An Improved Binomial Approximation for the Beta Binomial Distribution,”International Journal of Pure and Applied Mathematics, vol. 97, no. 4, pp. 511-514, 2014.
[23] K. Teerapabolarn, “Improved Negative Binomial Approximation to Negative Polya Distribution,” International Journal of Mathematics Trends and Technology, vol. 66, no. 7, pp. 69-72, 2020.
[24] K. Teerapabolarn, “The Exact Formula for the Supremum of Poisson-Poisson Binomial Relative Error,” International Journal of Mathematics and Computer Science, vol. 17, no. 2, pp. 601-609, 2022.
[25] K. Teerapabolarn and K. Jaioun, “An Improved Poisson Approximation for the Negative Binomial Distribution,” Applied Mathematical Sciences, vol. 8, no. 89, pp. 4441-4445, 2014.
[26] K. Teerapabolarn and K. Jaioun, “Approximation of Binomial Distribution by an Improved Poisson Distribution,” International Journal of Pure and Applied Mathematics, vol. 97, no. 4, pp. 491-495, 2014.
[27] C. Yuan, “Based on Knowledge Recognition and Using Binomial Distribution Function to Establish a Mathematical Model of Random Selection of Test Questions in the Test Bank,” Journal of Electrical and Computer Engineering, vol. 2021, pp. 1-8, 2021.

Citation :

Kanint Teerapabolarn, "An Improved Poisson Approximation to Binomial Distribution," International Journal of Mathematics Trends and Technology (IJMTT), vol. 68, no. 9, pp. 16-20, 2022. Crossref, https://doi.org/10.14445/22315373/IJMTT-V68I9P504