Ranked set sampling (RSS) was first used to obtain a more efficient estimator of the population mean, as compared to the one based on simple random sampling. This technique is useful when judgment ordering of a simple random sample (SRS) of small size can be done easily and fairly accurately, but exact measurement of an observation is difficult and expensive. It is noted that, due to the complicated likelihood, parametric estimation with RSS is difficult. In this article, the notion of steady-state RSS is introduced, its relation to stratified sampling is established, and its possible use in parametric estimation is explored and put forward for further investigations.