Dodecahedron (EntityTopic, 12)
From Hi.gher. Space
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- | {{Shape|Dodecahedron|http://img129.imageshack.us/img129/2226/dodecahedron8do.png|3|12, 30, 20|0| | + | {{Shape |
+ | | attrib=none | ||
+ | | name=Dodecahedron | ||
+ | | image=http://img129.imageshack.us/img129/2226/dodecahedron8do.png | ||
+ | | dim=3 | ||
+ | | elements=12, 30, 20 | ||
+ | | genus=0 | ||
+ | | 20=SSC | ||
+ | | ssc={G5<sup>3</sup>} | ||
+ | | pv_circle=~0.6649 | ||
+ | | wythoff=<nowiki>3 | 2 5 </nowiki> | ||
+ | | schlaefli={[[Pentagon|5,]]3} | ||
+ | | vlayout=[[Pentagon|5]]<sup>3</sup> | ||
+ | | vfigure=Equilateral [[triangle]], edge ''tau'' | ||
+ | | bowers=Doe | ||
+ | | dual=[[Icosahedron]] | ||
+ | }} | ||
== Equations == | == Equations == | ||
*Assumption: Dodecahedron is centered at the origin. | *Assumption: Dodecahedron is centered at the origin. |
Revision as of 19:11, 16 November 2007
Equations
- Assumption: Dodecahedron is centered at the origin.
- Variables:
l ⇒ length of edges of the dodecahedron
- The hypervolumes of a dodecahedron are given by:
total edge length = 30l
surface area = 15l2tan(3π10-1)
volume = 5l3(tan(3π10-1))2(tan(sin-1(2sin(π5-1))-1))2-1
- The planar cross-sections (n) of a dodecahedron are:
Unknown
Notable Trishapes | |
Regular: | tetrahedron • cube • octahedron • dodecahedron • icosahedron |
Direct truncates: | tetrahedral truncate • cubic truncate • octahedral truncate • dodecahedral truncate • icosahedral truncate |
Mesotruncates: | stauromesohedron • stauroperihedron • stauropantohedron • rhodomesohedron • rhodoperihedron • rhodopantohedron |
Snubs: | snub staurohedron • snub rhodohedron |
Curved: | sphere • torus • cylinder • cone • frustum • crind |