Journal of Engineering and Applied Sciences
Year:
2019
Volume:
14
Issue:
3
Page No.
927 - 930
References
Afify, E.E., 2004. Comparing of estimators of parameters for the Rayleigh Distribution. Faculty of Eng. Shibeen El Koom. Menoufia University, Shibin Al Kawm, Al Minufiyah, Egypt. http://webcache.googleusercontent.com/search?q=cache:XPPo4VVRW6gJ:interstat.statjournals.net/YEAR/2003/articles/0306001.pdf+&cd=2&hl=en&ct=clnk&gl=pk
Al-Aabdi, F.A. and M.Z. Karidi, 2018. Comparison between Methods Estimation of Rayleigh Distribution. ‎Lambert Academic Publishing, Riga, Latvia, ISBN:978-6139898596,.
Kotz, S. and M. Pensky, 2003. The Stress-Strength Model and its Generalizations: Theory and Applications. World Scientific, Singapore, ISBN:9789812380579, Pages: 253.
Kundu, D. and M.Z. Raqab, 2009. Estimation of R= P (Y< X) for three-parameter Weibull distribution. Stat. Probab. Lett., 79: 1839-1846.
CrossRef | Direct Link | Kundu, D. and R.D. Gupta, 2006. Estimation of P [Y< X] for Weibull distributions. IEEE. Trans. Reliab., 55: 270-280.
CrossRef | Direct Link | Lee, K.R., C.H. Kapadia and D.B. Brock, 1980. On estimating the scale parameter of the Rayleigh distribution from doubly censored samples. Stat. Hefte, 21: 14-29.
CrossRef | Direct Link | Martinez, W.L. and A.R. Martinez, 2007. Computational Statistics Handbook with MATLAB. Chapman and Hall, London, UK., ISBN:9781420010862, Pages: 792.
Pandey, M. and S.K. Upadhyay, 1986. Bayes estimation of reliability in stress-strength model of Weibull distribution with equal scale parameters. Microelectron. Reliab., 26: 275-278.
Direct Link | Rao, G.S., 2012. Estimation of reliability in multicomponent stress-strength based on generalized exponential distribution. Rev. Colomb. Estadistica, 35: 67-76.
Direct Link | Rao, G.S., 2012. Estimation of reliability in multicomponent stress-strength model based on Rayleigh distribution. Prob. Stat. Forum, 5: 150-161.
Direct Link |