Cylinder (EntityTopic, 14)

From Hi.gher. Space

(Difference between revisions)
m (CSG -> SSC)
(update to STS)
Line 1: Line 1:
-
{{Shape|Cylinder|http://img392.imageshack.us/img392/1103/cylinder8gi.png|3|3, 2, 0|0|N/A|N/A|[(xy)z]|21 (xy)z|N/A|N/A|N/A|11|[(xy)z]|7|pure|~0.3934|<sup>π</sup>⁄<sub>4</sub> ≈ 0.7854|N/A|SSC}}
+
{{STS Shape
 +
| image=http://img392.imageshack.us/img392/1103/cylinder8gi.png
 +
| dim=3
 +
| elements=3, 2, 0
 +
| genus=0
 +
| ssc=[(xy)z]
 +
| pv_circle=~0.3934
 +
| pv_square=~π⁄4 ≈ 0.7854
 +
| extra={{STS Rotope
 +
| attrib=pure
 +
| notation=21 (xy)z
 +
| index=11
 +
}}{{STS Bracketope
 +
| index=7
 +
}}}}
 +
 
A '''cylinder''' is a special case of a [[prism]] where the base is a [[circle]].
A '''cylinder''' is a special case of a [[prism]] where the base is a [[circle]].

Revision as of 15:46, 14 March 2008


A cylinder is a special case of a prism where the base is a circle.

Equations

  • Variables:
r ⇒ radius of cylinder
h ⇒ height of cylinder
  • All points (x, y, z) that lie on the surface of a cylinder will satisfy the following equations:
x2 + y2 = r2
abs(z) ≤ h/2
   -- or --
x2 + y2 < r2
abs(z) = h/2
  • All points (x, y, z) that lie on the edges of a cylinder will satisfy the following equations:
x2 + y2 = r2
abs(z) = h/2
total edge length = 4πr
surface area = 2πr(r+h)
volume = πr2h
[!x,!y] ⇒ rectangle with width (2rcos(πn/2)), height (h)
[!z] ⇒ circle of radius (r)




Notable Trishapes
Regular: tetrahedroncubeoctahedrondodecahedronicosahedron
Direct truncates: tetrahedral truncatecubic truncateoctahedral truncatedodecahedral truncateicosahedral truncate
Mesotruncates: stauromesohedronstauroperihedronstauropantohedronrhodomesohedronrhodoperihedronrhodopantohedron
Snubs: snub staurohedronsnub rhodohedron
Curved: spheretoruscylinderconefrustumcrind

Template:Rotope Nav

6. [z]
Cuboid 		7. [(xy)z]
Cylinder 		8. <[xy]z>
Wide octahedron
List of bracketopes
Retrieved from "http://hi.gher.space/wiki/Cylinder"