[b]Construction of a polyhedron surface based on direct calculation of the maximum sum of distances [/b]
The peculiarity of this applets is that
1. for a given number of n particles on the sphere, their extreme distribution for Convex Polyhedra is found. The [color=#c51414]maximum[/color] of the[b] sum of distances[/b] is found directly: maximization using the Maximize[]command and sliders.
2. Triangulation of polyhedral surfaces: this applets sorts and finds vertices, faces, and surface segments of a polyhedron and its dual image.
3. Visualization of polyhedral surfaces: the elements of the polyhedron and its dual image are directly translated into their 3d form.
*From Book: Extended definitions of point location estimates [url]https://www.geogebra.org/m/hhmfbvde[/url]
From: List of My Public Books on GeoGebra Topics: Constructing polyhedra -[url]https://www.geogebra.org/m/eabstecp[/url]
