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Estimation of the Population Mean Based on Extremes Ranked Set Sampling

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dc.contributor.author Biradar, B.A
dc.contributor.author Santosha, C.D
dc.date.accessioned 2022-01-31T10:04:16Z
dc.date.available 2022-01-31T10:04:16Z
dc.date.issued 2015
dc.identifier.issn 2162-8475
dc.identifier.uri https://dox.org/10.5923/j.ajms.20150501.05
dc.identifier.uri http://192.168.100.26:8080/xmlui/handle/123456789/3324
dc.description.abstract This paper is concerned with ranked set sampling theory which is useful to estimate the population mean when the order of a sample of small size can be found without measurements or with other methods. In practice ranking a sample of moderate size and observing the i-th ranked unit (ranking of middle ordered units) is a difficult task. Therefore, in this paper we propose two estimators of the population mean based on extremes ranked set sampling methods. The proposed estimators are unbiased for the population mean when the underlying distribution is symmetric. It is shown that the proposed estimators are more efficient than their counter part simple random sampling method for distributions considered in this study.
dc.publisher Scientific & Academic Publishing Co
dc.title Estimation of the Population Mean Based on Extremes Ranked Set Sampling
dc.type Article
dc.issueno 1
dc.journalname American Journal of Mathematics and Statistics
dc.pageno 32-36
dc.terms Ranked set sampling, Extremes ranked set sampling, Population mean, Relative efficiency, Errors in Ranking
dc.volumeno 5


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