HOW MULTITUDE IS CLASSIFIED WITH RELATIVES.

How then is multitude classified among relatives? It forms part of relatives in that multitude is an extension of number, while its contrary is a contraction. Likewise is it with continuous dimension; we conceive of it as prolonged. Quantity therefore has a double origin: progression of unity, and of the point. If either progression cease promptly, the first one produces "little," and the second, "small." If both be prolonged, they produce "much," and "large." What then is the limit that determines these things? The same question may be asked about the beautiful, and about warmth; for there is also "warmer"; only, the latter is a relative, while Warm, taken absolutely, is a quality. As there is a "reason" of the beautiful (a reason that would produce and determine the beautiful), likewise there must be a reason for the Great, a reason by participation in which an object becomes great, as the reason of the Beautiful makes beautiful. Such are the things for which quantity admits contraries.