This paper discusses the comment on the issue of the AP-S Magazine by Mosig in December 2005. There, he describes the evaluation of an infinite series by a rearrangement of the terms in the series in a manner that is "...a discrete equivalent of the classical integration-by-parts technique". The desirable performance of this approach is demonstrated by its application to the Leibniz-Gregory series for /spl pi/, and found to yield an accuracy of about 10 digits using 50 terms in the original series, compared to the 10/sup +10/ terms that would otherwise be required. The summation-by-parts procedure is one of the class of numerical techniques that can be described as convergence-acceleration methods (CAMs). As exemplified by Mosig's illustrative example, many ways have been found to evaluate /spl pi/, most of which are computationally intensive and not at all practicable unless a convergence-acceleration-method approach is applicable.