^{page 349 note *} For the present purpose a somewhat narrow view has to be taken of the proper function of graduation; for a much broader view, with which the present writer is in entire sympathy, see remarks by Hardy, G. F., J.I.A., xxxiii, 491.Google Scholar

^{page 354 note *} In order to save space, only one-half of the curve is shown in each case, viz., the left-hand half (corresponding to the central and preceding terms) for Spencer's and G. F. Hardy's formulæ, and the right-hand half (corresponding to the central and following terms) for Woolhouse's and Higham's formulæ. In each case the curve is in fact continued symmetrically on the other side of the maximum ordinate.

^{page 356 note *} In these diagrams, the straight line represents the average value of the unadjusted values. The graduated values tend in general to group themselves round the straight line; but in the particular case represented in Diagram B, the graduated values are seen to lie almost entirely above the straight line. This is because the average value of those ungraduated values for which graduated values are obtained, happens in this case to be appreciably greater than the general average of the whole ungraduated series, including the values at the beginning and end of the series, where no graduated values are obtainable.