Part, Question

 1   1, 76  |        division ~in measurable quantities. Therefore we must suppose
 2   1, 75  |        division ~in measurable quantities. Therefore we must suppose
 3   1, 84  | sensible qualities are. Hence ~quantities, such as number, dimension,
 4   2, 1   |    infinity: thus mathematical quantities have no limit. For the same
 5   2, 19  |      speak of these respective quantities from the point of view ~
 6   2, 52  |        transferred from bodily quantities to intelligible spiritual
 7   2, 52  |  imagination. Now in corporeal quantities, a thing is ~said to be
 8   2, 52  |        is taken from corporeal quantities and ~applied to the intelligible
 9   2, 52  |      to forms, from ~corporeal quantities. But in corporeal quantities
10   2, 52  |   quantities. But in corporeal quantities there is no increase ~without
11   2, 102 |     earth may be had in great ~quantities with very little effort:
12   3, 10  |  finite in another, as when in quantities we imagine a surface ~infinite
13   3, 76  |   impossible for two dimensive quantities to be ~together, even though
14   3, 76  |       if two unequal dimensive quantities be set side by side, ~the
15   3, 76  |     Reply OBJ 2: Two dimensive quantities cannot naturally be in the
16 Suppl, 64|        is observed between two quantities of ~the same measure, for
17 Suppl, 71|     equal but by proportionate quantities, for instance if ~we begin
18 Suppl, 81|        applies to mathematical quantities: for instance the ratio