page 567 note ^† This case is one of a set for which M = 3 ^m , N = 4 ^m -¹; but one to which special interest attached, both in itself and as perhaps the first to which the following approximation could be successfully applied,

page 570 note ^* A difficulty may be felt from the fact that the expression for the error is appropriate only when r + s is inconsiderable. The answer is that the terms rapidly become so small that they may be left out of account altogether. We only need in effect the terms from s=0 to s=s’, where s’ is quite moderate, say 160 in the case in point. So in summing for the errors we may stop at the 160th term; but there again the sum from 0 to s’ will not be appreciably different from the sum from 0 to M’ which gives the simple result above.

page 570 note ^† A like method applies to the less important errors expressed by subsequent terms in the expansion of {1 – (r + s)/M} ^μM (§ 5); only they involve higher powers of r. Thus for the next in importance we have a cubic in r, with more complicated maxima and minima, but the general effect will be very much less.