Conic diprism (no ontology)

From Higher Dimensions Database

A conic diprism is a special case of a prism where the base is a coninder. It is also a special case of a diprism where the base is a cone. It is bounded by four coninders, a cubinder and a cubindrogram.

Equations

• Variables:

r ⇒ radius of base of conic diprism
h ⇒ height of conic diprism
l ⇒ length of conic diprism

• The hypervolumes of a conic diprism are given by:

total edge length = Unknown
total surface area = Unknown
surcell volume = Unknown
surteron bulk = Unknown
pentavolume = πr²hl²3^-1

• The flunic cross-sections (n) of a conic diprism are:

[!x,!y] ⇒ Unknown
[!z] ⇒ cubinder of radius (r-rnh^-1) and height l
[!w,!φ] ⇒ coninder of base radius r, height h and length l