Spacial Chladni patterned surfaces  as a network of implicit curves

This worksheet shows Chladni patterned surfaces as a network of implicit curves. Here is used wave equation of 3D standing waves. It is a well known equation for the zeros of the standing wave on a square Chladni plate (side length L) is given by the following: cos(n pi x / L) cos(m pi y / L) - cos(m pi x/L)cos(n pi y / L) = 0, where n and m are integers ( http://paulbourke.net/geometry/chladni/). I generalised this equation for the three-dimensional case: cos(k*x π/L)[cos(l*y π /L) cos(m*z π /L) +s*cos(m*y π /L) cos(l*z π /L)]+ cos(l*x π /L )[cos(k*y π /L) cos(m*z π /L) +s*cos(m*y π/L) cos(k*z π /L)] + cos(m*x π /L)[cos(k*y π /L) cos(l*z π /L)+s*cos(l*y π /L ) cos(k*z π /L)]=0 , where k, l and m are integers, s=∓ 1. →→→Network of rotatable implcit curves is installed. For this reason this applet take a lot of time to load.

 

Roman Chijner

 
Type de ressources
Activité
Balises
chladni  surfaces 
Tranche d'âges
3 – 19+
Langue
German / Deutsch
 
 
 
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