Book, Paragraph

 1  VI, 1 |      continuous can be composed "of indivisibles": e.g. a line cannot be
 2  VI, 1 |          applies in the case of all indivisibles. Now for the reason given
 3  VI, 1 |          part with whole. But since indivisibles have no parts, they must
 4  VI, 1 |           could thus be composed of indivisibles, they could be divided into
 5  VI, 1 |          they could be divided into indivisibles, since each is divisible
 6  VI, 1 |            be divisible either into indivisibles or into divisibles that
 7  VI, 1 |           if it were divisible into indivisibles, we should have an indivisible
 8  VI, 1 |            of these are composed of indivisibles and are divisible into indivisibles,
 9  VI, 1 | indivisibles and are divisible into indivisibles, or none. This may be made
10  VI, 1 |            magnitude is composed of indivisibles, the motion over that magnitude
11  VI, 1 |    magnitude ABG is composed of the indivisibles A, B, G, each corresponding
12  VI, 1 |            will also be composed of indivisibles. So O traversed A when its
13  VI, 1 |             of it. Moreover, if the indivisibles composing DEZ are motions,
14  VI, 2 |          magnitude ABGD, into three indivisibles, and that of the slower
15  VI, 2 |             the slower into the two indivisibles EZ, ZH. Then the time may
16  VI, 2 |          also be divided into three indivisibles, for an equal magnitude
17  VI, 9 |            magnitude is composed of indivisibles.~Zeno’s arguments about
18  VI, 10|             makes motion consist of indivisibles in exactly the same way