A Mathematical Method for Visualizing Ptolemy’s India in ...
PTOLEMY’S THEOREM: A well-known result that is not that well-known.
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PTOLEMYS THEOREM: A well-known result that is not that well-known.
PTOLEMYS THEOREM:A well-known resultthat is not thatwell-known.Pat TouheyMisericordia UniversityDallas, PA [email protected]
1PtolemysTheoremThe product of the diagonals equals the sum of the products of the two pairs of opposite sides.
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(Proof)
First,consider
3
then
Constructequal to (Elements I - 23)
4But we also have
5But we also haveSince they are inscribed angles intercepting the same arc.
(Elements III 21)
6Thus we have similar triangles.
7Thus we have similar triangles.
And by corresponding parts,
8Thus we have similar triangles.
And by corresponding parts,
So (1)
9 Now note since =
10 Now note since =
addingto both
11 yields
12But we also have
13But we also haveAgain,since they are inscribed angles intercepting the same arc.
14 And so we have similar, overlapping triangles,
15 And we have similar, overlapping triangles,
16 And by corresponding parts we have
So (2)
17 Now consider our two equations,
(1)
and
(2)
18 plus
yields
19 plus
yields
20 plus
yields
21PtolemysTheoremThe product of the diagonals equals the sum of the products of the two pairs of opposite sides.
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Ptolemys Almagest
translated by G. J. Toomer , Princeton (1998)
23Ptolemys - Almagest - c.150 AD
by the early fourth century the Almagest had become the standard textbook on astronomy which it was to remain for more than a thousand years.It was dominant to an extent and for a length of time which is unsurpassed by any scientific work except Euclids Elements.- G.J. Toomer
24Ptolemys Almagest
* Early mathematical Astronomy
* Based on Spherical Trigonometry
* Table of Chords
* Plane Trigonometry
25Trigonometriae 1595 by Bartholomew Pitiscus
26 Trigonometry
Right Triangles
SOHCAHTOA
27Radius = 1 Center (0,0)Geometry of the Unit Circle
28Geometry of the Circle
A circle of radius R and an angle
29Duplicate the configuration to form an angle and its associatedchord
30And any inscribed angle cutting off that chord measures
31Now let R =
So that the diameter is a unit.
And we see that the chord subtended by an inscribed angle is simply
32Using the diameter as one side of the inscribed angle we have a triangle.
33Using the diameter as one side of the inscribed angle we have a triangle.
A right triangle, by Thales.
34And bySOHCAHTOA we have the Pythagorean Identity
35Using another inscribed angle perform similar constructions on the other side of the diameter AC.
The two triangles form a quadrilateral.
36The diameter is one diagonal. Construct the other and use Ptolemy.
37The diameter is one diagonal. Construct the other and use Ptolemy.
To get the addition formula for sine.
38PtolemysAlmagest
The first corollary ofPtolemys Theorem.
39Consider an equilateral triangle
40Construct the circumcircle
41Pick any point on the circumcircle
42Draw the segment from to the farthest vertex,
43Draw the segment from to the farthest vertexIt equals the sum of the segments to the other vertices
44(Proof)Consider the quadrilateral ACPB and use Ptolemys.
45(Proof)Consider the quadrilateral ACPB and use Ptolemys.
46Law of cosines via Ptolemy's theorem
Kung S.H. (1992).
Proof without Words: The Law of Cosines via Ptolemy's Theorem, Mathematics Magazine, 65 (2) 103.
47Derrick W. & Hirstein J. (2012). Proof Without Words: Ptolemys Theorem, The College Mathematics Journal, 43 (5) 386-386.
http://docmadhattan.fieldofscience.com/2012/11/proofs-without-words-ptolemys-theorem.html
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Caseys TheoremCasey, J. (1866), Math. Proc. R. Ir. Acad. 9: 396.
49References:Ptolemys Almagest: translated by G. J. Toomer , Princeton (1998)
Euclids Elements translated by T. L. Heath, Green Lion (2002)
Trigonometric Delights by Eli Maor, Princeton (1998)
The Mathematics of the Heavens and the Earth by Glen Van Brummelen, Princeton (2009)
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