We verify an upper bound of Tóth [Combinatorica 17 (1997), 427-439, Discrete and Computational Geometry 36, (2006), 527-552] on the midrange crossing constant. Details of their 8 9π 2 upper bound have not been available. Our verification is different from their method and hinges on a result of Moon [J. Soc. Indust. Appl. Math. 13(1965), 506-510]. As Moon's result is optimal, we raise the question whether the midrange crossing constant is 8 9π 2 .