Kepler triangle

A Kepler triangle is a right triangle with edge lengths in geometric progression. The ratio of the edges of a Kepler triangle are linked to the golden ratio

$\varphi = {1 %2B \sqrt{5} \over 2}$

and can be written: $1�: \sqrt\varphi�: \varphi$ , or approximately 1 : 1.272 : 1.618.^[1] The squares of the edges of this triangle (see figure) are in geometric progression according to the golden ratio.

Triangles with such ratios are named after the German mathematician and astronomer Johannes Kepler (1571–1630), who first demonstrated that this triangle is characterised by a ratio between short side and hypotenuse equal to the golden ratio.^[2] Kepler triangles combine two key mathematical concepts—the Pythagorean theorem and the golden ratio—that fascinated Kepler deeply, as he expressed in this quotation:

Geometry has two great treasures: one is the theorem of Pythagoras, the other the division of a line into mean and extreme ratio. The first we may compare to a mass of gold, the second we may call a precious jewel.^[3]

— Johannes Kepler

Some sources claim that a triangle with dimensions closely approximating a Kepler triangle can be recognized in the Great Pyramid of Giza.^[4]^[5]

1 Derivation
2 Relation to arithmetic, geometric, and harmonic mean
3 Constructing a Kepler triangle
4 A mathematical coincidence
5 See also
6 References

Derivation

The fact that a triangle with edges $1$ , $\sqrt\varphi$ and $\varphi$ , forms a right triangle follows directly from rewriting the defining quadratic polynomial for the golden ratio $\varphi$ :

$\varphi^2 = \varphi %2B 1$

into the form of the Pythagorean theorem:

$(\varphi)^2 = (\sqrt\varphi)^2 %2B (1)^2.$

Relation to arithmetic, geometric, and harmonic mean

For positive real numbers a and b, their arithmetic mean, geometric mean, and harmonic mean are the lengths of the sides of a right triangle if and only if that triangle is a Kepler triangle.^[6]

Constructing a Kepler triangle

A Kepler triangle can be constructed with only straightedge and compass by first creating a golden rectangle:

Construct a simple square
Draw a line from the midpoint of one side of the square to an opposite corner
Use that line as the radius to draw an arc that defines the height of the rectangle
Complete the golden rectangle
Use the longer side of the golden rectangle to draw an arc that intersects the opposite side of the rectangle and defines the hypotenuse of the Kepler triangle

Kepler constructed it differently. In a letter to his former professor Michael Mästlin, he wrote, "If on a line which is divided in extreme and mean ratio one constructs a right angled triangle, such that the right angle is on the perpendicular put at the section point, then the smaller leg will equal the larger segment of the divided line."^[2]

A mathematical coincidence

Take any Kepler triangle with sides $a, a \sqrt{\varphi}, a \varphi,$ and consider:

the circle that circumscribes it, and
a square with side equal to the middle-sized edge of the triangle.

Then the perimeters of the square ( $4a \sqrt{\varphi}$ ) and the circle ( $a \pi \varphi$ ) coincide up to an error less than 0.1%.

This is the mathematical coincidence $\pi \approx 4/\sqrt\varphi$ . The square and the circle cannot have exactly the same perimeter, because in that case one would be able to solve the classical (impossible) problem of the quadrature of the circle. In other words, $\pi \neq 4/\sqrt\varphi$ because $\pi$ is a transcendental number.

According to some sources^[7]^[8], Kepler triangles appear in the design of Egyptian pyramids, but the ancient Egyptians probably didn't know the mathematical coincidence involving the number $\pi$ and the golden ratio $\phi$ .

References

^ Roger Herz-Fischler (2000). The Shape of the Great Pyramid. Wilfrid Laurier University Press. ISBN 0889203245. http://books.google.com/books?id=066T3YLuhA0C&pg=PA81&dq=kepler-triangle+geometric&ei=ux77Ro6sGKjA7gLzrdjlDQ&sig=bngzcQrK9nHOkfZTo5O0ieNdtUs.
^ ^a ^b Livio, Mario (2002). The Golden Ratio: The Story of Phi, The World's Most Astonishing Number. New York: Broadway Books. pp. 149. ISBN 0-7679-0815-5.
^ Karl Fink, Wooster Woodruff Beman, and David Eugene Smith (1903). A Brief History of Mathematics: An Authorized Translation of Dr. Karl Fink's Geschichte der Elementar-Mathematik (2nd ed. ed.). Chicago: Open Court Publishing Co. http://books.google.com/books?id=3hkPAAAAIAAJ&pg=PA223&dq=%22Geometry+has+two+great+treasures%22&lr=&as_brr=1&ei=sQ1GSI_KH4fstgO_rvCpDQ.
^ The Best of Astraea: 17 Articles on Science, History and Philosophy. Astrea Web Radio. 2006. ISBN 1425970400. http://books.google.com/books?id=LDTPvbXLxgQC&pg=PA93&dq=kepler-triangle&ei=vCH7RuG7O4H87gLJ56XlDQ&sig=6n43Hhu5pE3TN5BW18tbQJGRHTQ.
^ Squaring the circle, Paul Calter
^ Di Domenico, Angelo, "The golden ratio—the right triangle—and the arithmetic, geometric, and harmonic means," The Mathematical Gazette 89, 2005.
^ Squaring the circle, Paul Calter
^ The Great Pyramid, The Great Discovery, and The Great Coincidence, Mark Herkommer