pentakis मीनिंग इन हिंदी

उदाहरण वाक्य

1. The 60 vertices of degree 3 correspond to the apex vertex of each triangular pyramid of the Kleetope, or to each face of the pentakis dodecahedron.
2. This also occurs for the dual uniform polyhedra known as the great pentakis dodecahedron ( DU 58 ) and medial inverted pentagonal hexecontahedron ( DU 60 ).
3. For example, a pentakis dodecahedron is a dodecahedron with each pentagonal face replaced by five triangles .  Keenan Pepper 04 : 16, 22 April 2006 ( UTC)
4. Geometrically, Spaceship Earth is a derivative of a pentakis dodecahedron, with each of the 60 isosceles triangle faces divided into 16 smaller triangles ( with a bit of fudging to make it rounder ).
5. When pyramids are attached to a dodecahedron in other ways, they may result in an augmented dodecahedron, a metabiaugmented dodecahedron, a triaugmented dodecahedron, or even a pentakis dodecahedron if the faces are made to be irregular.
6. The 20 vertices of degree 12 and 12 vertices of degree 10 correspond to the vertices of the pentakis dodecahedron, and also respectively to the 20 hexagons and 12 pentagons of the truncated icosahedron, the dual solid to the pentakis dodecahedron.
7. The 20 vertices of degree 12 and 12 vertices of degree 10 correspond to the vertices of the pentakis dodecahedron, and also respectively to the 20 hexagons and 12 pentagons of the truncated icosahedron, the dual solid to the pentakis dodecahedron.
8. The tetrakis hexahedron is the Kleetope of the cube, formed by adding a square pyramid to each of its faces, and the pentakis dodecahedron is the Kleetope of the dodecahedron, formed by adding a pentagonal pyramid to each face of the dodecahedron.
9. If the pentagrammic faces are considered as 5 triangular faces, it shares the same surface topology as the pentakis dodecahedron, but with much taller isosceles triangle faces, with the height of the pentagonal pyramids adjusted so that the five triangles in the pentagram become coplanar.
10. It can be viewed as a dodecahedron with two pentagonal pyramids ( " J " 2 ) attached to two faces that are separated by one face . ( The two faces are not opposite, but not adjacent either . ) When pyramids are attached to a dodecahedron in other ways, they may result in an augmented dodecahedron, a parabiaugmented dodecahedron, a triaugmented dodecahedron, or even a pentakis dodecahedron if the faces are made to be irregular.