Dual of Ratio Estimators of Finite Population Mean Obtained on Using Linear Transformation to Auxiliary Variable

Jhajj, H. S.; Sharma, Manoj K.; Grover, Lovleen Kumar

doi:10.14490/jjss.36.107

Cited by 25 publications

(30 citation statements)

References 4 publications

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“…It may be easily verified that f 11 (1) and f 11 (2) minimize the value of MSE (T 11 ). So, the mean square error of the proposed families of estimators T 11 will be minimum if f 11 (1) and f 11 (2) are calculated by the equations (42) and (43).…”

Section: The Bias and Mean Square Error (Mse)mentioning

confidence: 97%

“…Here (ρ, ρ 13 , ρ 23 ) and (ρ (2) , ρ 13 ′ , ρ 23 ′ ) are the correlation coefficients between (y 1 , y 2 ), (y 1 , x), (y 2 , x)for the entire and non responding group the population while ( ρ 10 , ρ 20 , ρ 30 ) and ( ρ 10 ′ , ρ 20 ′ , ρ 30 ′ ) are the biserial correlation coefficients between (y 1 , ∅), (y 2 , ∅), (x, ∅) for the entire and non responding group of population. Now following the strategies of (Khare & Sinha 2012 a, Sinha 2014 and Sinha & Kumar 2014), we have suggested two wider families of estimators for estimating the ratio and product of two population means using proportion and mean of auxiliary character for two different cases as follows: Case I -In this case we assumed that there is incomplete information on study characters y i (i= 1, 2) as well as auxiliary character x due to non-response, however the population proportion (∅ ̅ N ) and mean (X ̅ ) are known in advance.…”

Section: The Proposed Estimatorsmentioning

confidence: 99%

“…So, the mean square error of the proposed families of estimators T 11 will be minimum if f 11 (1) and f 11 (2) are calculated by the equations (42) and (43). The minimum mean square error of T 11 using f 11 (1) and f 11 (2) respectively from the equations (42) and (43) is as follows…”

Section: The Bias and Mean Square Error (Mse)mentioning

confidence: 99%

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Families of estimators for ratio and product of study characters using mean and proportion of auxiliary character in presence of non-response

Sinha

2016

IJAES

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In this paper, families of estimators for ratio and product of two population means are suggested using proportion and mean of auxiliary character in presence of non-response. The bias and mean square error (MSE) of the proposed families of estimators are obtained up to the first degree of approximation under two different cases. The specified conditions under which the members of proposed families of estimators attain minimum mean square error have been obtained. Theoretical and empirical comparisons based on real data sets are made to show that the suggested families of estimators are more efficient than the relevant estimators such as usual conventional estimator, (Khare & Sinha 2012 a) estimators and (Sinha 2014) estimators.

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Section: The Bias and Mean Square Error (Mse)mentioning

confidence: 97%

Section: The Proposed Estimatorsmentioning

confidence: 99%

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Families of estimators for ratio and product of study characters using mean and proportion of auxiliary character in presence of non-response

Sinha

2016

IJAES

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“…More detailed discussion about the ratio estimator and its modification can be found in Abdia and Shahbaz (2006), Ahmad et al (2009), Al-Jararha and AlHaj Ebrahem (2012), Bhushan (2012, Cochran (1977), Dalabehera and Sahoo (1994), David and Sukhatme (1974), Goodman and Hartley (1958), Gupta and Shabbir (2008), Jhajj et al (2006), Cingi (2003, 2004), Khoshnevisan et al (2007), Koyuncu and Kadilar (2009), Kulkarni (1978), Murthy (1967), Naik andGupta (1991), Olkin (1958), Pathak (1964), Perri (2007), Ray and Sahai (1980), Reddy (1973), Robinson (1987), Sen (1993), Shabbir and Yaab (2003), Sharma and Tailor (2010), Singh and Chaudhary (1986), Singh (2003), Singh and Espejo (2003), Singh and Agnihotri (2008), Singh and Solanki (2012), Singh andTailor (2003, 2005), Singh et al (2004, Sisodia and Dwivedi (1981) , Solanki et al (2012), Srivenkataramana (1980, Sharma (2009), Tin (1965), Upadhyaya and Singh (1999) and Yan and Tian (2010).…”

Section: Y Y Ith Existing (Jth Proposed) Modified Ratio Estimator Of Ymentioning

confidence: 99%

Generalized Modified Ratio Estimator for Estimation of Finite Population Mean

Subramani

2013

J. Mod. App. Stat. Meth.

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A generalized modified ratio estimator is proposed for estimating the population mean using the known population parameters. It is shown that the simple random sampling without replacement sample mean, the usual ratio estimator, the linear regression estimator and all the existing modified ratio estimators are the particular cases of the proposed estimator. The bias and the mean squared error of the proposed estimator are derived and are compared with that of existing estimators. The conditions for which the proposed estimator performs better than the existing estimators are also derived. The performance of the proposed estimator is assessed with that of the existing estimators for certain natural populations

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“…More detailed discussion about the ratio estimator and its modification can be found in Abdia and Shahbaz (2006) (2012), Cochran (1977), Dalabehera and Sahoo (1994), David and Sukhatme (1974), Goodman and Hartley (1958), Gupta and Shabbir (2008), Jhajj et al (2006), Cingi (2003, 2004), Khoshnevisan et al (2007), Kadilar (2009), Kulkarni (1978), Murthy (1967), Naik and Gupta (1991), Olkin (1958), Pathak (1964), Perri (2007), Ray and Sahai (1980), Reddy (1973), Robinson (1987), Sen (1993), Shabbir and Yaab (2003), Sharma and Tailor (2010), Singh and Chaudhary (1986), , Singh and Espejo (2003), Singh and Agnihotri (2008), Singh and Solanki (2012), Tailor (2003, 2005), Singh et al (2004Singh et al ( , 2008, Sisodia and Dwivedi (1981) , Solanki et al (2012), Srivenkataramana (1980), Tailor and Sharma (2009), Tin (1965), Upadhyaya and Singh (1999) and Yan and Tian (2010).…”

mentioning

confidence: 99%

Vol. 12, No. 2 (Full Issue)

2013

J. Mod. App. Stat. Meth.

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EDITORIAL ASSISTANCEJMASM (ISSN 1538−9472, http://digitalcommons.wayne.edu/jmasm) is an independent, open access electronic journal, published biannually in May and November by JMASM Inc. (PO Box 48023, Oak Park, MI, 48237) in collaboration with the Wayne State University Library System. JMASM seeks to publish (1) new statistical tests or procedures, or the comparison of existing statistical tests or procedures, using computer-intensive Monte Carlo, bootstrap, jackknife, or resampling methods, (2) the study of nonparametric, robust, permutation, exact, and approximate randomization methods, and (3) applications of computer programming, preferably in Fortran (all other programming environments are welcome), related to statistical algorithms, pseudo-random number generators, simulation techniques, and self-contained executable code to carry out new or interesting statistical methods.Journal correspondence (other than manuscript submissions) and requests for advertising may be forwarded to ea@jmasm.com. See back matter for instructions for authors. Normality is a distributional requirement of classical test statistics. In order for the test statistic to provide valid results leading to sound and reliable conclusions this requirement must be satisfied. In the not too distant past, it was claimed that violations of normality would not likely jeopardize scientific findings (See Hsu & Feldt, 1969; Lunney, 1970). Recent revelations suggest otherwise (See e.g., Micceri, 1989; Keselman, Huberty, Lix et al., 1998;Erceg-Hurn, Wilcox, & Keselman, 2013; Wilcox and Keselman, 2003; Wilcox, 2012a, b). Unfortunately the data obtained in psychological investigations rarely, if ever, meet the requirement of normally distributed data (Micceri, 1989; Wilcox, 2012a, b). Consequently, it could be the case that the results from many of the investigations conducted in psychology provide invalid results. Accordingly, authors recommend that researchers attempt to assess the validity of assuming data are normal in form prior to conducting a test of significance (Erceg-Hurn, et al., 2013; Keselman, et al., 1998). Present evidence suggests that a popular fit-statistic, the Kolmogorov-Smirnov test does a poor job of evaluating whether data are normal. Our investigation based on this statistic and other fit-statistics provides a more favorable picture of preliminary testing for normality. Keywords:Assessing normality, fit statistics, g-and-h non-normal skewed and kurtotic data, contaminated mixed-normal distributions; outlying value(s), Likert scales IntroductionPsychological researchers are often reminded that the validity of their statistical tests and the conclusions derived from these tests depends to a great extent on whether the derivational assumptions of the test procedures have been satisfied (e.g., See Keselman, Huberty, Lix et al., 1998; Wilcox, 2012a, b; Wilcox & KESELMAN ET AL 3 Keselman, 2003). Consequently, though not a common practice, researchers are still reminded about assessing derivational assumptions (See Erce...

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Dual of Ratio Estimators of Finite Population Mean Obtained on Using Linear Transformation to Auxiliary Variable

Cited by 25 publications

References 4 publications

Families of estimators for ratio and product of study characters using mean and proportion of auxiliary character in presence of non-response

Families of estimators for ratio and product of study characters using mean and proportion of auxiliary character in presence of non-response

Generalized Modified Ratio Estimator for Estimation of Finite Population Mean

Vol. 12, No. 2 (Full Issue)

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