Talk:Regular icosahedron

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The stellations of the icosahedron are described in University of Toronto Studies Number 6 - The Fifty-Nine Icosahedra - by HSM Coxeter, P Du Val, HT Flather, and JF Petrie - University of Toronto Press 1938 (Derek Locke)

(Comment from Trevor: I'd LOVE to see a proof on this. Til then, I don't buy it.) —Preceding unsigned comment added by Btrevoryoung (talk • contribs) 12:38, 14 June 2006

If you refer to the table of volumes in Platonic solid it is relatively easy to calculate. R, the circumradius, corresponds to the radius of the sphere that the polyhedron is inscribed in. If you do some calculations you will find that (volume of dodecahedron with circumradius R)/(volume of sphere with radius R) is greater than (volume of icosahedron with circumradius R)/(volume of sphere with radius R). This is an alternative way of explaining what the article states. This may be counter-intuitive to some because it is unlike the similar situation in regards to circles and polygons. I will leave the math to you.

The following Wikimedia Commons file used on this page has been nominated for deletion:

• Rhombicdodecahedron.jpg

Participate in the deletion discussion at the nomination page. —Community Tech bot (talk) 17:54, 18 May 2019 (UTC)[reply]

The formulas for dimensions etc are given with no proof or reference.  Andreas  ^(T) 13:48, 12 October 2023 (UTC)[reply]

The section Construction describes in its second paragraph a method for constructing the regular icosahedron from a cube.

The edge-length of the cube is never mentioned, so this section needs work.

But even if the cube were assumed to have a specific edge-length, this paragraph is still extremely confusing.

I hope someone familiar with this construction can make this paragraph much clearer than it is.

The construction in Cartesian coordinates is also misleading. When reading an expression like ${\displaystyle \left(0,\pm 1,\pm \varphi \right)}$ it is not immediately obvious that this is defining more than 2 points. The implication is of course that the signs are independent, but it could also be equally well understood as a shorthand for ${\displaystyle \pm \left(0,1,\varphi \right)}$. The article for the cube and the regular dodecahedron have the same quirk, but for the dodecahedron there is a figure that clarifies what is meant. Since the edit introducing ${\displaystyle \left(0,\pm 1,\mp \varphi \right)}$ was reverted the question is how and whether this ambiguity should be addressed. — Preceding unsigned comment added by 2A01:CB08:8EA5:5F00:A4CB:7AE2:2DB6:9EFA (talk) 13:11, 21 January 2025 (UTC)[reply]