The 'cosine' of a sphere [Le 'cosinus' d'une sphère].




A tridimensional object is defined as a set of points P={X,Y,Z}. To each point P is associated the following octonion O={X,Y,Z,0,0,0,0,0}. Then each octonion O is submitted to the transformation: 
                    
                    O --> O' = cos(O)


At last a new point P' is defined with {X',Y',Z'} being arbitrary linear combinations of the components of O'. The set of points P' defines a new tridimensional object...


See some related pictures using octonions (possibly including this one):


exponential
cosine
sine
tangent
hyperbolic cosine
hyperbolic sine
hyperbolic tangent


See some related pictures using pseudo-octonions (possibly including this one):


exponential
cosine
sine
tangent
hyperbolic cosine
hyperbolic sine
hyperbolic tangent


Nota: the radius and the colors of each particle visualizing a point P' vary according to its {X',Y',Z'} coordinates...


See a related picture:




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