Book, Paragraph

 1 III, 1  |          difficulty of our thinking points to a "knot" in the object;
 2 III, 1  |           and lines and figures and points a kind of substance or not,
 3 III, 2  |        treats, nor have geometrical points the same nature as the actual
 4 III, 2  |        enough to consider even such points as the following:-It is
 5 III, 4  |             the line is made out of points.~But even if ore supposes
 6 III, 5  |           and bodies and planes and points are substances of a kind,
 7 III, 5  |            admitted, that lines and points are substance more than
 8 III, 5  |          becoming or perishing; but points and lines and surfaces cannot
 9 III, 5  |       evidently the same is true of points and lines and planes; for
10  VI, 3  |  starting-point, but this no longer points to something further. This
11 VII, 8  |             circumference is at all points equidistant from the centre",
12 VIII, 5 |             and ceasing to be, e.g. points, if they can be said to
13  IX, 8  |          derived from "action", and points to the complete reality.~
14  XI, 2  |             latter of bodies (while points are sections and divisions
15  XI, 12 |              for contact belongs to points, but not to units, which
16 XII, 8  |     unresting; we have proved these points in the physical treatises),
17 XIII, 1 |            be content to state some points better than one’s predecessors,
18 XIII, 1 |            demands; for most of the points have been repeatedly made
19 XIII, 2 |             and separate planes and points and lines; for consistency
20 XIII, 2 |            the planes and lines and points of the mathematical solid
21 XIII, 2 |           argument, other lines and points; and prior to these points
22 XIII, 2 |          points; and prior to these points in the prior lines there
23 XIII, 2 |         there will have to be other points, though there will be no
24 XIII, 2 |             lines, and five sets of points. With which of these, then,
25 XIII, 2 |            the planes and lines and points in the motionless solid;
26 XIII, 2 |        units apart from each set of points, and also apart from each
27 XIII, 2 |         which is neither number nor points nor spatial magnitude nor
28 XIII, 2 |           out of lines or planes or points, while if these had been
29 XIII, 4 |      absolute-besides all the other points on which certain people,
30 XIII, 6 |             we have discussed these points, it is well to consider
31 XIII, 7 |             difference to them; for points too are indivisible, but
32 XIII, 9 |             out of what each of the points is formed. Certainly not
33 XIII, 10|         presents indeed, of all the points we have mentioned, the greatest
34 XIV, 5  | being-whether (1) as boundaries (as points are of spatial magnitudes).