IMPROVED ESTIMATION OF FINITE POPULATION VARIANCE USING QUARTILES

Yıl 2013, Cilt: 6 Sayı: 3, 116 - 121, 31.12.2013

Housila P. Singh Surya Kant Pal Ramkrishna S. Solanki

Öz

IMPROVED ESTIMATION OF FINITE POPULATION VARIANCE USING QUARTILES

Öz

We have addressed the problem of estimation of finite population variance using known values
of quartiles of an auxiliary variable. Some ratio type estimators have been proposed with their properties in
simple random sampling. The suggested estimators have been compared with the usual unbiased and ratio
estimators. In addition, an empirical study is also provided in support of theoretical findings.Variation is present everywhere in our day to day life. It is law of nature that no two things or individuals are exactly alike. For instance, a physician needs a full understanding of variation in the degree of human blood pressure, body temperature and pulse rate for adequate prescription. A manufacture needs constant knowledge of the level of variation in peoples reaction to his product to be able to known whether to reduce or increase his price, or improve the quality of his product. An agriculturist needs an adequate understanding of variations in climate factors especially from place to place (or time to time) to be able to plan on when, how and where to plant his crop. Many more situations can be encountered in practice where the estimation of population variance of the study variable y assumes importance. In survey sampling, known auxiliary information is often used at the estimation stage to increase the precision of the estimators of population variance. For these reasons various authors such as Singh and Solanki (2009-2010), Tailor and Sharma (2012), Solanki and Singh (2013), Singh and Solanki (2013a, b), Subramani and Kumarapandiyan (2013a, b) and Yadav and Kadilar (2013a, b) have paid their attention towards the improved estimator of population variance of the study variable y using information on the known parameters of the auxiliary variable x such as mean, variance, coefficient of skewness, coefficient of kurtosis, correlation coefficient between the study variable y and the auxiliary variable x etc. Recently Subramani and Kumarapandiyan (2012a, b) have considered the problem of estimating the population variance of study variable y using information on variance, quartiles, inter-quartile range, semi-quartile range and semi-quartile average of the auxiliary variable x. In this paper our quest is to estimate the unknown population variance of study variable y by improving the estimators suggested by Subramani and Kumarapandiyan (2012a, b) using same information on an auxiliary variable x. Let U = (U1, U2,..., UN ) be finite population of size N and (y, x) are (study, auxiliary) variables taking values (yi , xi) respectively for the i-th unit Ui of the finite population U. Let a simple random sample (SRS) of size n be drawn without replacement (WOR) from the finite population U. The usual unbiased estimator s 2 y and the estimators of the population variance due to Isaki (1983) and Subramani and Kumarapandiyan (2012a, b) are given in the Table 1 along with their biases and mean squared errors (MSEs).

Anahtar Kelimeler

Study variable, Auxiliary variable, Bias, Mean squared error, Quartiles, Simple random sampling

Kaynakça

• Singh, D. and Chaudhary, F.S. (1986): Theory and Analysis of Sample Survey Designs. New Age International Publisher, New Delhi, India.
• Singh, H.P. and Solanki, R.S. (2009-2010): Estimation of finite population variance using auxiliary information in presence of random non-response. Gujarat Statistical Review, 36 & 37 (1 & 2): 46-58.
• Singh, H.P. and Solanki, R.S. (2013a): A new procedure for variance estimation in simple random sampling using auxiliary information. Statistical Papers 54(2): 479-497.
• Singh, H.P. and Solanki, R.S. (2013b): Improved estimation of finite population variance using auxiliary information. Communications in Statistics-Theory and Methods 42(15): 2718-2730.
• Solanki, R.S. and Singh, H.P. (2013): An improved class of estimators for the population variance. Model Assisted Statistics and Applications 8(3): 229-238.
• Subramani, J. and Kumarapandiyan, G. (2012a): Variance estimation using median of the auxiliary variable. International Journal of Probability and Statistics 1(3): 62-66.
• Subramani, J. and Kumarapandiyan, G. (2012b): Variance estimation using quartiles and their functions of an auxiliary variable. International Journal of Statistics and Applications 2(5): 67-72.
• Subramani, J. and Kumarapandiyan, G. (2013a): Estimation of variance using known co-efficient of variation and median of an auxiliary variable. Journal of Modern Applied Statistical Methods 12(1): 58-64.
• Subramani, J. and Kumarapandiyan, G. (2013b): Estimation of variance using deciles of an auxiliary variable. Proceedings of International Conference on Frontiers of Statistics and Its Applications, Bonfring Publisher: 143-149.
• Tailor, R. and Sharma, B. (2012): Modified estimators of population variance in presence of auxiliary information. Statistics in Transition-new series 13(1): 37-46.
• Yadav, S.K. and Kadilar, C. (2013a): A class of ratio-cum-dual to ratio estimator of population variance. Journal of Reliability and Statistical Studies 6(1): 29-34.
• Yadav, S.K. and Kadilar, C. (2013b): Improved Exponential type ratio estimator of population variance. Colombian Journal of Statistics 36(1): 145-152.