If the longer hexagon/octagon sides were all shortened, could this become nearly regular, thus qualifying it to join the “near-misses?” As it is, those long edges are too long to call it by that term, but perhaps this can be fixed.
(Note: If you’d like to make stuff like this yourself, you should check out http://www.software3d.com/stella.php.)
Software used: see http://www.software3d.com/stella.php
Software used: see http://www.software3d.com/stella.php.
This polyhedron has sixty faces which are kites, and twelve which are regular pentagons. It was created using software you can find at http://www.software3d.com/stella.php.
Software used: see http://www.software3d.com/stella.php.
Software used: see http://www.software3d.com/stella.php.
The tetrated dodecahedron is a near-miss Johnson solid. It was first discovered in 2002 by Alex Doskey. I then independently rediscovered it in 2003, and named it, not learning of Doskey’s original discovery for several years after that.
It has 28 faces: twelve regular pentagons, arranged in four panels of three pentagons each; four equilateral triangles (shown in blue); and six pairs of isosceles triangles (shown in yellow). All edges of the tetrated dodecahedron have the same length, except for the shared bases of these isosceles triangles, which are approximately 1.07 times as long as the other edges. This polyhedron has tetrahedral symmetry.
(All images here were produced using Stella 4d, which you may try for free, after downloading the trial version from this website: www.software3d.com/Stella.php.)
Software credit: http://www.software3d.com/stella.php
One always hopes the ring closes, but sometimes it doesn’t. Perhaps if the rhombic enneacontahedra were oriented differently? I may have to examine this further.
Software used: see http://www.software3d.com/stella.php to try it.
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