Pentaflake
The pentaflake is a fractal with 5-fold symmetry. As illustrated above, five pentagons can be arranged around an identical pentagon to form the first iteration of the pentaflake. This cluster of six pentagons has the shape of a pentagon with five triangular wedges removed. This construction was first noticed by Albrecht Dürer (Dixon 1991).
For a pentagon of side length 1, the first ring of pentagons has centers at radius
| d_1=2r=1/2(1+sqrt(5))R=phiR, |
(1)
|
where phi is the golden ratio. The inradius r and circumradius R are related by
| r=Rcos(1/5pi)=1/4(sqrt(5)+1)R, |
(2)
|
and these are related to the side length s by
| s=2sqrt(R^2-r^2)=1/2Rsqrt(10-2sqrt(5)). |
(3)
|
The height h is
| h=ssin(2/5pi)=1/4ssqrt(10+2sqrt(5))=1/2sqrt(5)R, |
(4)
|
giving a radius of the second ring as
| d_2=2(R+h)=(2+sqrt(5))R=phi^3R. |
(5)
|
Continuing, the nth pentagon ring is located at
| d_n=phi^(2n-1). |
(6)
|
Now, the length of the side of the first pentagon compound is given by
| s_2=2sqrt((2r+R)^2-(h+R)^2)=Rsqrt(5+2sqrt(5)), |
(7)
|
so the ratio of side lengths of the original pentagon to that of the compound is
We can now calculate the dimension of the pentaflake fractal. Let N_n be the number of black pentagons and L_n the length of side of a pentagon after the n iteration,
The capacity dimension is therefore
(OEIS A113212).
An attractive variation obtained by recursive construction of pentagons is illustrated above (Aigner et al. 1991; Zeitler 2002; Trott 2004, pp. 21-22).
See also
PentagonExplore with Wolfram|Alpha
More things to try:
References
Aigner, M.; Pein, J.; and Stechmüller, T. T. Math. Semesterber. 38, 242, 1991.Ding, R.; Schattschneider, D.; and Zamfirescu, T. "Tiling the Pentagon." Discr. Math. 221, 113-124, 2000.Dixon, R. Mathographics. New York: Dover, pp. 186-188, 1991.Kabai, S. Mathematical Graphics I: Lessons in Computer Graphics Using Mathematica. Püspökladány, Hungary: Uniconstant, pp. 76 and 109, 2002.Livio, M. The Golden Ratio: The Story of Phi, the World's Most Astonishing Number. New York: Broadway Books, pp. 64-65, 2002.Lück, R. Mat. Sci. Eng. A 263, 194-296, 2000.Sloane, N. J. A. Sequence A113212 in "The On-Line Encyclopedia of Integer Sequences."Trott, M. Graphica 1: The World of Mathematica Graphics. The Imaginary Made Real: The Images of Michael Trott. Champaign, IL: Wolfram Media, pp. 60 and 88, 1999.Trott, M. The Mathematica GuideBook for Programming. New York: Springer-Verlag, pp. 40-42, 2004. http://www.mathematicaguidebooks.org/.Trott, M. The Mathematica GuideBook for Graphics. New York: Springer-Verlag, p. 19, 2004. http://www.mathematicaguidebooks.org/.Wells, D. The Penguin Dictionary of Curious and Interesting Geometry. London: Penguin, p. 104, 1991.Zeitler, H. Math. Semesterber. 49, 185, 2002.Referenced on Wolfram|Alpha
PentaflakeCite this as:
Weisstein, Eric W. "Pentaflake." From MathWorld--A Wolfram Resource. https://mathworld.wolfram.com/Pentaflake.html