Under classical test theory (CTT), it often is claimed that the standard error of measurement (SEM) of a measurement scale is sample invariant [SEM = standard deviation*square root of (1 - scale reliability)]. To evaluate this claim, we conducted Monte Carlo simulations on real and simulated data. The real data were obtained from a study of obsessive-compulsive disorder that used the Schwartz Outcomes Scale (SOS-10), a measure of the effectiveness of psychiatric treatment. The simulations involved random samples of varying size in which the standard deviation and Cronbach's alpha (\alpha, a measure of scale reliability) were computed for 300,000 replications. The invariance property was tested based on a theoretical regression model [SD^2 = SEM^2/(1 - \alpha)] in which the regression coefficient SEM^2 and the coefficient of determination (r^2) were estimated. The estimated SEM^2 was 12.19 (close to the true value of 12.41), and the estimated r^2 of 0.99 was virtually perfect (and close to the theoretical value of 1). Therefore, results based on clinical trial data were confirmed with simulated data. The claim that the SEM of a measurement scale is sample invariant is supported.