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 1     I, 2 |         PHYSIOGNOMY; HIS PHILOSOPHY OF NUMBERS; HIS SYSTEM OF THE TRANSMIGRATION
 2     I, 2 |                down as a basis certain numbers and measures, saying that
 3     I, 2 | incomprehensible, having in itself all numbers that, according to plurality,
 4     I, 2 |            monad became a principle of numbers, according to sub stance."--
 5     I, 2 |             parent all the rest of the numbers. Secondly, the duad is a
 6     I, 2 |              female. Therefore all the numbers that have been derived from
 7     I, 2 |            essentially for each of the numbers. Pythagoras affirmed this
 8     I, 2 |               from this number all the numbers receive their originating
 9     I, 2 |                result. So that all the numbers from which the production
10     I, 2 |                production of existing (numbers) arises, are seven,--namely,
11     I, 2 |                Egyptians his system of numbers and measures; and I being
12     I, 22|                  from calculations and numbers by the Pythagorean art;
13    IV, 8 |               depending upon the seven numbers. For among them there are
14    IV, 8 |                the monad three double (numbers), viz., 2, 4, 8, and three
15    IV, 10|              with these distances. The numbers, however, advanced by Archimedes,
16    IV, 10|            stadii, by increasing these numbers double and triple, (it will
17    IV, 10|          attend to the matter--how the numbers are mutually related, and
18    IV, 13|               religion by measures and numbers. And others there are (who
19    IV, 13|               secure the philosophy by numbers and elements. Now certain (
20    IV, 14|              means of calculations and numbers, and elements and names,
21    IV, 14|               is a root of each of the numbers; in the case of thousands,
22    IV, 14|               the name Patroclus these numbers are roots: 8, 1, 3, 1, 7,
23    IV, 14|                however, there were two numbers, for example, both of them
24    IV, 14|              victory. According to the numbers, no doubt, Ajax is victorious,
25    IV, 14|            employ even these customary numbers, but different ones: for
26    IV, 15|       arithmeticians, who, by means of numbers and of names, suppose that
27    IV, 43|          THEOLOGY BASED ON A THEORY OF NUMBERS; THEIR SYSTEM OF COSMOGONY.~
28    IV, 43|                produces the succeeding numbers; for instance, the monad,
29    IV, 43|               the beginning and end of numbers. Wherefore it is that the
30    IV, 43|                quantities, the kindred numbers of the monad comprehend
31    IV, 43|          position and division of even numbers. But the kindred number
32    IV, 43|           taking from the monad of the numbers an idea of virtue, progressed
33    IV, 43|              generated among masculine numbers is beneficent, while that (
34    IV, 43|              produced) among feminine (numbers) is mischievous. For instance,
35    IV, 43|              this--becomes 361, which (numbers) terminate in a monad by
36    IV, 44|             Persons attending to these numbers reckon as many as are homogeneous
37    IV, 51|                these, tint introducing numbers of this sort among the Greeks
38    IV, 51|         furnished principles. And from numbers that can continually progress
39    IV, 51|           comprising in itself all the numbers that can go on ad infinitum
40    IV, 51|         according to substance, of the numbers, which (principle) is a
41    IV, 51|         paternally all the rest of the numbers. Secondly, the duad is a
42    IV, 51|              denominated even. All the numbers therefore, taken generically,
43    IV, 51|             substance, for each of the numbers. This is the sacred quaternion,
44    IV, 51|             nature, that is, all other numbers; for eleven, and twelve,
45    IV, 51|                cube. Wherefore all the numbers are seven; so that the generation
46     V, 3 |                abide for ever in great numbers, even though the things
47     V, 8 |          remainder of the even and odd numbers. Some, however, dividing
48    VI, 11|                of) smelling is a test. Numbers, the fourth of the books,
49    VI, 16|           thinkers) in names only, and numbers, and has adopted a peculiar
50    VI, 18|           XVIII. PYTHAGORAS' SYSTEM OF NUMBERS.~Pythagoras, then, declared
51    VI, 18|              duad, and the rest of the numbers. And he says that the monad
52    VI, 18|               triad and the succeeding numbers up to ten. For Pythagoras
53    VI, 19|           collection of the succeeding numbers, we make some one very large
54    VI, 19|              totality of the aggregate numbers; so likewise he asserts
55    VI, 23|                adept in the science of numbers, and a geometrician, has
56    VI, 24|                this is first of those (numbers) that are formed by plurality, (
57    VI, 29|              THE PYTHAGOREAN SYSTEM OF NUMBERS.~The quaternion, then, advocated
58    VI, 41|         corresponding with the (three) numbers (nine, seven, and eight),--(
59    VI, 43|             the aggregate of the seven numbers, in order that the result
60    VI, 45|             Jesus, who consists of all numbers. And that on this account
61    VI, 47|             give a fabulous account of numbers. And in this way, they affirm,
62    VI, 49|                times, and seasons, and numbers, measuring many years in
63    VI, 50|              accord with the aforesaid numbers, they (attempt to) criminate
64  VIII, 6 |           ennead, up to ten. For these numbers, he says, are capable of
65  VIII, 6 |               For such compositions of numbers out of the simple and uncompounded
66  VIII, 7 |                earth, have arisen from numbers which are comprehended in
67    IX, 9 |            obviously, the measures and numbers of the aforesaid Pythagorean
68     X, 3 |        universe proceeds from infinite numbers of atoms; and we have previously
69     X, 13|                have been produced from numbers comprehended in that simple