Classically the non-parametric coverage interval is estimated by empirical quantiles. We introduce an alternative way for estimating the coverage interval by symmetric quantiles of Chen and Chiang (1996). We further show that this alternative estimator has a better precision in the sense that its asymptotic variances are smaller than the classical one. In an attempt to develop a scheme for monitoring a vector of distributional quantiles, we propose a symmetric-quantiles-based control chart. Comparative studies in terms of the asymptotic covariance matrix and the average run length show that the proposed control chart is more efficient than the classical empirical-quantiles-based control chart. The monitoring of process/product profiles is presently a growing and promising area of research in statistical process control. We focus on developing monitoring schemes for nonlinear profiles with random effects in this study. We utilize the technique of principal components analysis to analyze the covariance structure of the profiles and propose monitoring schemes based on principal component (PC) scores. In the Phase I analysis of historical data, due to the dependency of the PC-scores, we adopt the usual Hotelling T2 chart to check the stability. For Phase II monitoring, we study individual PC-score control charts, a combined chart scheme that combines all the PC-score charts, and a T2 chart. Although an individual PC-score chart may be perfect for monitoring a particular mode of variation, a chart that can detect general shifts, such as the T2 chart and the combined chart scheme, is more feasible in practice. The performances of the schemes under study are evaluated in terms of the average run length.