Page:Ante-Nicene Christian Library Vol 6.djvu/84

78 regarding them has been made by Hipparchus; and a different one still by Apollonius the mathematician. It is sufficient, however, for us, following the Platonic opinion, to suppose twofold and threefold distances from one another of the erratic stars; for the doctrine is thus preserved of the composition of the universe out of harmony, on concordant principles in keeping with these distances. The numbers, however, advanced by Archimedes, and the accounts rendered by the rest concerning the distances, if they be not on principles of symphony,—that is, the double and triple [distances] spoken of by Plato,—but are discovered independent of harmonies, would not preserve the doctrine of the formation of the universe according to harmony. For it is neither credible nor possible that the distances of these should be both contrary to some reasonable plan, and independent of harmonious and proportional principles, except perhaps only the Moon, on account of wanings and the shadow of the Earth, in regard also of the distance of which alone—that is, the lunar [planet] from Earth—one may trust Archimedes. It will, however, be easy for those who, according to the Platonic dogma itself, adopt this distance to comprehend by numerical calculation [intervals] according to what is double and triple, as Plato requires, and the rest of the distances. If, then, according to Archimedes, the Moon is distant from the surface of the Earth 5,544,130 stadii, by increasing these numbers double and triple, [it will be] easy to find also the distances of the rest, as if subtracting one part of the number of stadii which the Moon is distant from the Earth.

But because the rest of the numbers—those alleged by Archimedes concerning the distance of the erratic