Un Modelo Matemático para la bola de Fútbol

  1. Escalante, René 1
  2. Pacheco, Francisco 2
  1. 1 Universidad Simón Bolívar, Departamento de Cómputo Científico y Estadística, División de Ciencias Físicas y Matemáticas
  2. 2 Two on a SeeSaw Corp.
Journal:
Revista de Matemática: Teoría y Aplicaciones

ISSN: 2215-3373 2215-3373

Year of publication: 2005

Volume: 12

Issue: 1-2

Pages: 97-109

Type: Article

DOI: 10.15517/RMTA.V12I1-2.254 DIALNET GOOGLE SCHOLAR lock_openDialnet editor

More publications in: Revista de Matemática: Teoría y Aplicaciones

Abstract

This work refers to the analysis, study and resolution of the mathematical problem involved in the design and construction of the cover of a ball, such as the ones used in sports, in order to achieve a ball with optimal roundness and sphericity factors.The design of well distributed ball structures has grown in importance in the last years, most of all in the field of sports, such as soccer. The current trend is directed mainly towards finding a fast ball that will give more dynamism to the game. In order to achieve a greater velocity of the ball during its movement it is important that it has not only an adequate distribution of panels, that give it a greater sphericity, but also that it has a structure that allows for a good distribution of the existing tension between the panels. Starting from an initial design, we define a process of readjustment of the panels in the ball cover, which will lead us to obtain optimal sphericity factors. Then, through a “twisting” process, we can add area to the surface without altering the sphericity factors, and solving the Missing Area Problem (or MAP). Finally, by redefining the final form of the panels, we propose tessellate strategies that will optimize the ball’s spherical structure.

Bibliographic References

  • Clinton, J.D. (2002) “A limited and biased view of historical insights for tessellating sphere”, in: G.A.R. Parke & P. Disney (Eds.) Procedings of the Fifth International Conference on Space Structures, Thomas Telford Publishing, Guildford, UK: 423-432.
  • Ghyka, M. (1977) The Geometry of Art and Life. Dover Publications, Inc., New York.
  • Pacheco, F. (2002) “Cover for a ball or sphere”, WO 02/30522. PCT Gazzette. Issue 16/2002.
  • Pacheco, F. (2004) “Ball having improved roundness and sphericity”, Patent Cooperation Treaty. Appl. PCT/CR04/00001.
  • Shaper, H. (1997) “Inflatable game ball”, US PAT. 5,674,149.
  • Smith, T. (2000) “Penrose tilings and Wang tilings”, http://www.innerx .net/personal/tsmith/pwtile.html.
  • Wang, H. (1961) “Proving theorems by pattern recognition. II”, Bell Systems Tech. J., 40: 1–41.
  • Weisstein, E.W. (1999) “Archimedean solids”, http://mathworld.wolfram .com/ArchimedeanSolid.html.
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