@article{
 title = {A New Exponentiated Weibull Distribution’s Extension: Copula, Mathematical Properties and Applications},
 type = {article},
 year = {2020},
 pages = {57-66},
 volume = {1},
 websites = {exponentiated  Weibull  distribution;  Poisson  distribution;  Farlie–Gumbel–Morgenstern  copulas;  Clayton  copula;  maximum  likelihood.},
 id = {11dd5924-2a80-3405-a831-e0ca9a8feefd},
 created = {2021-08-31T15:29:44.947Z},
 file_attached = {true},
 profile_id = {49efd9d1-b84a-3562-b8db-36e64ac7ba81},
 last_modified = {2021-08-31T15:49:14.837Z},
 read = {false},
 starred = {false},
 authored = {true},
 confirmed = {true},
 hidden = {false},
 citation_key = {pop00032},
 source_type = {article},
 user_context = {Journal article},
 notes = {<b>From Duplicate 1 (<i>A new exponentiated Weibull distribution's extension: copula, mathematical properties and applications</i> - Mansour, M M; Butt, N S; Ansari, S I; Yousof, H M; Ali, M M; Ibrahim, M)<br/></b><br/>Query date: 2021-03-09 14:22:05},
 folder_uuids = {4cfcf1ef-e8a1-481b-9768-92f271f79e14},
 private_publication = {false},
 abstract = {We introduce a new continuous distribution based on the zero truncated Poisson model which accommodates many im- portant failure rate shapes. Some of its mathematical properties are derived. The density of the new distribution can be expressed as a combination of exponentiated Weibull densities. The method of the maximum likelihood is considered to estimate the model parameters. The importance and flexibility of the proposed distribution are also demonstrated via mod- eling three data sets.},
 bibtype = {article},
 author = {Mahmoud M. Mansour, Nadeem S. Butt, Saiful I. Ansari, Haitham M. Yousof, Mir M. Ali, Mohamed Ibrahim and Mansour, M M and Butt, N S and Ansari, S I and Yousof, H M and Ali, M M and Ibrahim, M},
 doi = {10.47443/cm.2020.0018},
 journal = {Contributions to Mathematics},
 number = {1}
}

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