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| Alphabetical [« »] spy 2 squalid 3 squander 1 square 37 squared 4 squares 9 squaring 1 | Frequency [« »] 37 related 37 rhapsode 37 sitting 37 square 37 supposes 37 watch 37 witnesses | Plato Partial collection IntraText - Concordances square |
Critias Part
1 Intro| lots, each of which was a square of ten stadia; and the owner 2 Text | the size of a lot was a square of ten stadia each way, The First Alcibiades Part
3 Text | shoemaker, for example, uses a square tool, and a circular tool, Meno Part
4 Intro| figures. The theorem that the square of the diagonal is double 5 Intro| the diagonal is double the square of the side—that famous 6 Text | a figure like this is a square?~BOY: I do.~SOCRATES: And 7 Text | SOCRATES: And you know that a square figure has these four lines 8 Text | through the middle of the square are also equal?~BOY: Yes.~ 9 Text | equal?~BOY: Yes.~SOCRATES: A square may be of any size?~BOY: 10 Text | are.~SOCRATES: Then the square is of twice two feet?~BOY: 11 Text | might there not be another square twice as large as this, 12 Text | the side of that double square: this is two feet—what will 13 Text | produce a figure of eight square feet; does he not?~MENO: 14 Text | guesses that because the square is double, the line is double.~ 15 Text | still say that a double square comes from double line?~ 16 Text | Tell me, boy, is not this a square of four feet which I have 17 Text | SOCRATES: And now I add another square equal to the former one?~ 18 Text | the double space is the square of the diagonal?~BOY: Certainly, The Republic Book
19 6 | draw, but of the absolute square and the absolute diameter, 20 8 | two harmonies; the first a square which is 100 times as great ( 21 8 | rational diameters of a square (i.e., omitting fractions), 22 8 | by one (than the perfect square which includes the fractions, 23 8 | irrational diameters (of a square the side of which is five = The Statesman Part
24 Text | number, whether simple or square or cube, or comprising motion,— Theaetetus Part
25 Intro| a general conception of square and oblong numbers, but 26 Intro| division of numbers into square numbers, 4, 9, 16, etc., 27 Intro| solid what space is to the square or surface. And all our 28 Text | another, which we compared to square figures and called square 29 Text | square figures and called square or equilateral numbers;— Timaeus Part
30 Intro| of scalene which has the square of the longer side three 31 Intro| three times as great as the square of the lesser side; and 32 Intro| measurable by unity). The square of any such number represents 33 Intro| proportional between two square numbers are rather perhaps 34 Intro| isosceles triangles into one square and of six squares into 35 Text | numbers, whether cube or square, there is a mean, which 36 Text | isosceles, the other having the square of the longer side equal 37 Text | equal to three times the square of the lesser side.~Now