[or bound,] should not be the cause of binding together things which are borne along to infinity. It terminates therefore, their progression, and brings back their dispersed section to the one essence of connection. And thus much concerning the connective triad.
CHAPTER XXXVII.
But the third, as they say, to the saviour, and let us also following Plato in what remains celebrate the perfective order of the Gods. Because, therefore, the end of the connective order was the finite, [or the bounded] the perfective order has extremes. For the end [or bound] is the extremity. There however indeed the one was said to be the finite, but here it is said to have an extremity, as receiving according to participation that which has the power of terminating many things. And there indeed, the one was end or bound, which also connectedly contains the infinite; but here having an extremity, it will also have a middle and beginning, and will be perfect. For that which receives its completion from all these, is perfect. Here, therefore, the perfection which consists of parts is apparent. For the consummation of the parts, produces the perfect. Moreover, because such a one as this has a middle and extremes, it will have the figure of a circumference, or it will be rectilinear, or it will be mixed [from the right and circular line]. For all these require a middle and extremes; some indeed with simplicity, but others with connexion. Three peculiarities, therefore, again present themselves to our view; the first, indeed, being that which we said was to have extremes; the second, being according to the perfect; and the third, according to figure. And there are also three perfective