International Journal of Science and Research (IJSR)

International Journal of Science and Research (IJSR)
Call for Papers | Fully Refereed | Open Access | Double Blind Peer Reviewed

ISSN: 2319-7064


Downloads: 117

Research Paper | Statistics | India | Volume 3 Issue 9, September 2014


Bayesian Estimation of Parameter of Inverse Maxwell Distribution via Size-Biased Sampling

Kusum Lata Singh [2] | R. S. Srivastava [5]


Abstract: In this paper, we have discussed Bayesian estimation of the parameter of an Inverse Maxwell distribution via Size-Biased sampling. Bayes estimators of the scale parameter of the Inverse Maxwell distribution under squared error, precautionary, entropy, and another two loss functions for using quasi-prior have been obtained. The risk functions of these estimators relative to squared error loss function have been obtained for the sake of comparison. The corresponding graphs have also been plotted.


Keywords: Bayes theorem, squared error loss function, precautionary loss function, entropy loss function, quasi prior, Risk function


Edition: Volume 3 Issue 9, September 2014,


Pages: 1835 - 1839


How to Download this Article?

You Need to Register Your Email Address Before You Can Download the Article PDF


How to Cite this Article?

Kusum Lata Singh, R. S. Srivastava, "Bayesian Estimation of Parameter of Inverse Maxwell Distribution via Size-Biased Sampling", International Journal of Science and Research (IJSR), Volume 3 Issue 9, September 2014, pp. 1835-1839, https://www.ijsr.net/get_abstract.php?paper_id=26081401

Similar Articles with Keyword 'squared error loss function'

Downloads: 113

Research Paper, Statistics, Egypt, Volume 4 Issue 9, September 2015

Pages: 1805 - 1813

Bayesian and Non Bayesian Estimations for Birnbaum-Saunders Distribution under Partially Accelerated Life Testing Based on Censoring Sampling

Mohamed S. Hamouda

Share this Article

Downloads: 113

Research Paper, Statistics, India, Volume 5 Issue 6, June 2016

Pages: 1869 - 1871

Bayesian Analysis of Rayleigh Distribution Under Quasi-Prior for Different Loss Functions

Paresh Sanat | R. S. Srivastava [5]

Share this Article
Top