A torus in a 120-cell
This picture gives you an idea of how to get a 120-cell, which is one of the six regular polytypes in 4D space, made up of 120 dodecahedrons, which meet 3 to 3 at each edge.
You start with a stack of 10 dodecahedra that you have to imagine as being closed in 4D space to form a ring (just like a row of four squares drawn on paper that you can fold into 3D space so as to form four faces of a cube). Then you 'fatten' this ring with 5 wheels rotelle of 5 dodecahedra each so that you then get a bigger ring of 60 (10+50) dodecahedra (as you can see in the picture). You then glue two due of these rings so that a parallel of one sticks to a meridian of the other.
© matematita
immagine di Gian Marco Todesco
The image belongs to the sections...:
120-cell (4D geometry)
From "towards the 4th dimension" (From "XlaTangente")
Further information:
http://www.toonz.com/personal/todesco
