Book, Paragraph

 1   I, 4  |     changes, the latter a single series. Anaxagoras again made both
 2  II, 7  |       and so at each step of the series.~Now the principles which
 3  II, 8  |         nature.~Further, where a series has a completion, all the
 4  II, 8  |    nature. Each step then in the series is for the sake of the next;
 5  II, 8  |         the earlier terms of the series is the same in both. This
 6  IV, 5  |        body which is next in the series and in contact (not by compulsion)
 7  IV, 6  |     distinguishes the terms of a series. This holds primarily in
 8   V, 2  |        regress. Thus if one of a series of changes is to be a change
 9   V, 2  |         And since in an infinite series there is no first term,
10 VII, 1  |         on continually: then the series cannot go on to infinity,
11 VII, 1  |      this is not so and take the series to be infinite. Let A then
12 VII, 1  |        so on, each member of the series being moved by that which
13 VII, 1  |          which follows it in the series: for we shall take as actual
14 VII, 1  |        impossible. Therefore the series must come to an end, and
15 VIII, 5 |   precedes the last thing in the series, or there may be one or
16 VIII, 5 |          the first movent in the series, but more strictly by the
17 VIII, 5 |      there should be an infinite series of movents, each of which
18 VIII, 5 |       else, since in an infinite series there is no first term)-
19 VIII, 5 |        there will be an infinite series. If, then, anything is a
20 VIII, 5 |          being itself moved, the series must stop somewhere and
21 VIII, 5 | something that moves itself, the series brings us at some time or
22 VIII, 5 |         of the last term in this series, namely that which has the
23 VIII, 5 |          kind of motion. But the series must stop somewhere, since
24 VIII, 5 |      that is further back in the series as well as by that which
25 VIII, 5 |          capacity for learn. the series, however, could be traced
26 VIII, 5 |      there will be an end to the series. Consequently the first
27 VIII, 5 |         If a thing is moved by a series of movents, that which is
28 VIII, 5 |          which is earlier in the series is more the cause of its
29 VIII, 5 |        unmoved: for, whether the series is closed at once by that
30 VIII, 6 |         and so on throughout the series: and so we proceeded to
31 VIII, 6 |     first principle of the whole series is the unmoved. Further
32 VIII, 10|        member of the consecutive series is at each stage less than
33 VIII, 10|           all the members of the series are moved and impart motion
34 VIII, 10|         motion but a consecutive series of separate motions), and
35 VIII, 10|          something: so we have a series that must come to an end,
36 VIII, 10|           but only a consecutive series of motions. The only continuous