Performance of some confidence intervals for estimating the population coefficient of variation under both symmetric and skewed distributions
Article
Abu-Shawiesh, MOA, Akyz, HE, Kibria, BMG. (2019). Performance of some confidence intervals for estimating the population coefficient of variation under both symmetric and skewed distributions
. 7(2), 277-290. 10.19139/soic.v7i2.630
Abu-Shawiesh, MOA, Akyz, HE, Kibria, BMG. (2019). Performance of some confidence intervals for estimating the population coefficient of variation under both symmetric and skewed distributions
. 7(2), 277-290. 10.19139/soic.v7i2.630
This paper aims to compare the performance of proposed confidence intervals for population coefficient of variation (CV) with the existing confidence intervals, namely, McKay, Miller, and Gulher et al. confidence intervals under both symmetric and skewed distributions.We observed that the proposed augmented-large-sample (AA & K-ALS) confidence interval performed well in terms of coverage probability in all cases. The large-sample (A & A-LS) and adjusted degrees of freedom (AA & K-ADJ) confidence intervals had much lower coverage probability than the nominal level for skewed distributions. However, the average widths of the AA & K-LS confidence interval are narrower than that of the rest confidence intervals. Two real-life data are analyzed to illustrate the implementation of the several methods.