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mansour, G., Barakat, H., Alawady, M., Husseiny, I. (2025). Statistical Investigations of Sarmanov Bivariate Weibull Distribution with Application to Medical Data. Bulletin of Faculty of Science, Zagazig University, 2025(1), 124-140. doi: 10.21608/bfszu.2024.298238.1401
ghada mansour; H. M. Barakat; Metwally Alsayed Alawady; I. A. Husseiny. "Statistical Investigations of Sarmanov Bivariate Weibull Distribution with Application to Medical Data". Bulletin of Faculty of Science, Zagazig University, 2025, 1, 2025, 124-140. doi: 10.21608/bfszu.2024.298238.1401
mansour, G., Barakat, H., Alawady, M., Husseiny, I. (2025). 'Statistical Investigations of Sarmanov Bivariate Weibull Distribution with Application to Medical Data', Bulletin of Faculty of Science, Zagazig University, 2025(1), pp. 124-140. doi: 10.21608/bfszu.2024.298238.1401
mansour, G., Barakat, H., Alawady, M., Husseiny, I. Statistical Investigations of Sarmanov Bivariate Weibull Distribution with Application to Medical Data. Bulletin of Faculty of Science, Zagazig University, 2025; 2025(1): 124-140. doi: 10.21608/bfszu.2024.298238.1401

Statistical Investigations of Sarmanov Bivariate Weibull Distribution with Application to Medical Data

Article 45, Volume 2025, Issue 1, April 2025, Page 124-140  XML PDF (1.45 MB)
Document Type: Original Article
DOI: 10.21608/bfszu.2024.298238.1401
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Authors
ghada mansour email 1; H. M. Barakat1; Metwally Alsayed Alawady2; I. A. Husseiny1
1Department of Mathematics, Faculty of Science, Zagazig University, Zagazig, Egypt
2Mathematics Department, Faculty of Science, Zagazig Univesity
Abstract
The Weibull distribution is highly versatile and capable of fitting various shapes of datasets. It is similar to the normal distribution, which is a unimodal distribution that represents probabilities for continuous data. This distribution is often considered the most fundamental and elementary lifespan distribution. This work utilizes the Sarmanov copula and Weibull marginal distribution to construct a bivariate distribution known as the bivariate Weibull Sarmanov distribution (BW-SARD). The statistical characteristics of the BW-SARD are examined, including marginal distributions, product moment, moment generating function, coefficient of correlation between the inner variables, conditional distributions, and conditional expectation. In addition, we calculate various reliability measures, including the hazard rate function, reversed hazard rate function, positive quadrant dependence property, mean residual life function, and vitality function. Model parameter estimation is conducted using the maximum likelihood and Bayesian approaches. Ultimately, genuine data collection is presented, and examined to explore the model, and valuable outcomes are acquired for illustrative intentions
Keywords
Bivariate Weibull distribution; Sarmanov family; Maximum likelihood estimation; Bayesian estimation; Confidence intervals
Statistics
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