Book,  Paragraph

 1   I,  4 |      motion goes from the same point towards the same point,
 2   I,  4 |    same point towards the same point, and contrary motion was
 3   I,  4 |      for both move to the same point, because that which moves
 4   I,  4 |       in a circle, at whatever point it begins, must necessarily
 5   I,  5 |      Therefore there will be a point at which ACE began for the
 6   I,  6 | determined; for, from whatever point the body which sinks to
 7   I,  6 |         but there is a further point. If there is no such thing
 8   I,  8 |       plain that there is some point to which earth and fire
 9   I,  9 | raising a difficulty. From one point of view it might seem impossible
10   I,  10|     But in this case the facts point the other way: generated
11   I,  11|       a thousand and one. This point need not trouble us, for
12   I,  12|       take our start from this point. The impossible and the
13  II,  6 |        view, proceeds from one point to another and is definite
14  II,  12|        is satisfied to reach a point not far removed from that
15  II,  13|        the inquiry only to the point at which one can no longer
16  II,  13|    Empedocles there is another point which might be made. When
17  II,  13|       related to every extreme point; and to move in contrary
18  II,  13|       related to every extreme point: for this would apply to
19  II,  13| indifferently related to every point on the extremity. Nevertheless
20  II,  13|     move in a mass to a single point on the circumference-the
21  II,  13|         For since no body is a point, it will have parts. The
22  II,  14|  straight upward return to the point from which they started,
23  II,  14|        shows, to move from any point to the centre, as of fire
24  II,  14|       the whole to move to the point to which the part naturally
25 III,  1 |       briefly consider at this point. For the impossible consequences
26 III,  1 |   themselves admit. Now if the point has no weight, clearly the
27 III,  1 |   further, manifest that their point cannot have weight. For
28 III,  1 |        is common ground that a point is indivisible. Again, suppose
29 III,  1 |      in the same cubic area. A point, then, if it may be heavy
30 III,  1 |     dense is divisible while a point is indivisible. And if what
31 III,  1 |   weight heavier is the single point which remains when the common
32 III,  1 |        is subtracted. A single point, therefore, has weight.~
33 III,  1 |       clearly the line and the point will have weight. For the
34 III,  1 |       be done away with. For a point is to a line as a line is
35 III,  1 |      indivisible now is like a point in a line. The same consequences
36 III,  2 | originate in chance. This is a point which Anaxagoras seems to
37  IV,  1 |        every way, and from any point on the earth’s surface a
38  IV,  1 |    identically related to each point on the extremity, they would
39  IV,  4 |      But the centre is a fixed point. If therefore there is some