The Role of Twitter Medium in Business with Regression Analysis and Statistical Modelling

Cong, Jason; Ahmad, Zubair; Alsaedi, Basim S. O.; Alamri, Osama Abdulaziz; Alkhairy, Ibrahim; Alsuhabi, Hassan

doi:10.1155/2021/1346994

Cited by 8 publications

(2 citation statements)

References 26 publications

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“…For more reading about statistical distributions using different approaches; see, [1]. Statistical methods play a crucial role in analysis of medical data [2,3], environmental data [4,5], engineering data [6,7], social data [8], actuarial data [9], test data [10], reliability data [11], sports data [12], educational data [13], measurement system errors [14], risk assessment [15], robust analysis [16,17].…”

Section: Introductionmentioning

confidence: 99%

A new detection of flexible Weibull model with application

Alomani

Emam

2023

Preprint

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The new family of distributions may provide a better fit to the data than existing families of distributions. This can lead to more accurate modeling and prediction. The new family of distributions may provide insights into the underlying mechanisms that generate the data. This can lead to improved understanding of the phenomenon being studied. The new family of distributions may generalize existing families, allowing for more flexible modeling and analysis. The new family of distributions may have applications in areas where existing families are not suitable or have not been explored. Overall, a new family of distributions can expand the toolkit available to researchers and practitioners, leading to improved modeling, analysis, and understanding in a variety of fields. In this paper, we introduce a new family of distributions, which we call the generalized Weibull exponential family. This family includes several well-known distributions as special cases. One advantage of the generalized Weibull exponential family is its flexibility in modeling a wide range of shapes and scales. It can handle both increasing and decreasing hazard rates, which are important in reliability analysis. Moreover, it can capture heavy-tailed or light-tailed behavior depending on the choice of parameters. In conclusion, we believe that the generalized Weibull exponential family is a useful addition to the existing families of distributions. Its flexibility and tractability make it a promising candidate for modeling data in various applications. Based on the proposed family, we introduce a new model with five parameters, named the generalized Weibull exponential distribution. Some mathematical properties were obtained. Maximum likelihood estimates for the model parameters were derived. A Monte Carlo simulation study was derived to assess the performance of the maximum likelihood estimates. A simulation study based on the parameters of the proposed model was performed. Finally, an application to real data set was performed.

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Section: Introductionmentioning

confidence: 99%

A new detection of flexible Weibull model with application

Alomani

Emam

2023

Preprint

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“…There are a lot of probability distributions in the science of statistics that have been identified, studied, and entered into many areas of life using real data, but we may face problems in some data because we do not reach realistic results, because the probability distribution is unable to model the data, so we use other methods, namely Mixing or synthesizing distributions. Statistical methods play a crucial role in analysis of medical data [1]- [2], environmental data [3]- [4], engineering data [5]- [6], social data [7], actuarial data [8], test data [9], reliability data [10], sports data [11], educational data [12], measurement system errors [13], risk assessment [14], robust analysis [15].…”

Section: Introductionmentioning

confidence: 99%

A Bayesian and classical estimation of the new probabilistic Inverted Topp Leone Weibull distribution with application

Alomani

Emam

2023

Preprint

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In this article, we present a new modification of the Weibull model with three parameters for analysing events in the real world, called the new Inverted Topp Leone Weibull distribution. The new model has many statistical advantages. The flexibility of the proposed model has been improved. The proposed model can be used to fit data with different shapes, it can be right skewed, left skewed, decreasing, curved and symmetric. The maximum likelihood approach and Bayesian estimation are used to estimate the distribution parameters. Three different loss functions are used for the Bayesian procedure. The calculations show the biases and estimated risks to obtain the best estimator. The bootstrap confidence intervals, the asymptotic confidence intervals, and the observed variance-covariance matrix are obtained. The Metropolis Hastings MCMC procedure is used for the calculations. We apply the composite distribution to two real data from the medical and engineering fields. The goodnessof-fit results show that it performs well compared to other distributions.

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