The bootstrap is a popular frequentist nonparametric technique for creating interval estimates, which claims to produce well-calibrated intervals no matter what the underlying distribution F is. However, since it's based solely on the empirical cumulative distribution function, it has no information about F beyond the largest data value Y(n). When n is moderate and F is heavy-tailed and/or heavily skewed, this can ignore much of the "weight" of the underlying distribution, leading to (extremely) poor calibration for location and scale functionals. In this talk I will describe the use of Bayesian nonparametric (Dirichlet process mixture) modeling to produce well-calibrated location and scale intervals, even when n is quite small and the (unknown) data-generating F is quite skewed and/or heavy-tailed.