Cylconinder (EntityTopic, 11)

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<[#ontology [kind topic] [cats 5D Tapertope Curved]]>
{{STS Shape
{{STS Shape
| name=Cylconinder
| name=Cylconinder
| dim=5
| dim=5
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| elements=?, ?, ?, ?, ?
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| elements=3, 3, 2, 1, 0
| genus=0
| genus=0
| ssc=[(zw)(xy)P]
| ssc=[(zw)(xy)P]
| ssc2=T2x&T2
| ssc2=T2x&T2
-
| extra={{STS Rotope
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| extra={{STS Tapertope
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| attrib=strange
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| order=2, 1
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| notation=2<sup>1</sup>2 (xy)<sup>z</sup>(wφ)
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| notation=22<sup>1</sup>
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| index=137
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| index=48
}}}}
}}}}
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A '''cylconinder''' is the [[Cartesian product]] of a [[circle]] and a [[cone]].
A '''cylconinder''' is the [[Cartesian product]] of a [[circle]] and a [[cone]].
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One of its tera is a [[duocylinder]] and the other two are curved tera. Its cells are two curved [[torii]] from the duocylinder, and another curved cell. It has two faces, one of which is the curved ridge of the duocylinder, and the other is a [[disc]]. Finally it has just one edge, which is a circle.
{{Pentashapes}}
{{Pentashapes}}
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{{Rotope Nav|136|137|138|(((II)'I)I)<br>Conic ditorus|(II)'(II)<br>Cylconinder|((II)'(II))<br>Cylconintigroid|tera}}
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{{Tapertope Nav|47|48|49|[111]<sup>2</sup><br>Cubic dipyramid|22<sup>1</sup><br>Cylconinder|2[11]<sup>1</sup><br>Cylhemoctahedrinder|tera}}

Latest revision as of 22:58, 11 February 2014

A cylconinder is the Cartesian product of a circle and a cone.

One of its tera is a duocylinder and the other two are curved tera. Its cells are two curved torii from the duocylinder, and another curved cell. It has two faces, one of which is the curved ridge of the duocylinder, and the other is a disc. Finally it has just one edge, which is a circle.


Notable Pentashapes
Flat: pyroteronaeroterongeoteron
Curved: tritoruspentasphereglonecylspherindertesserinder


47. [111]2
Cubic dipyramid
48. 221
Cylconinder
49. 2[11]1
Cylhemoctahedrinder
List of tapertopes