Which Solid can be defined as the regular polyhedron (a solid with all faces identical regular polygons) with the greatest number of faces?
Please help thank you
http://en.wikipedia.org/wiki/Regular_polyhedra
There are nine regular polyhedra. Choose the one with the most faces..
learn how to spell @Rocky..
*cough* *cough* geometry *cough* *cough*
To find the regular polyhedron with the greatest number of faces, we need to refer to the nine regular polyhedra mentioned on the Wikipedia page you provided.
The regular polyhedra are:
1. Tetrahedron: A four-faced polyhedron.
2. Cube: A six-faced polyhedron.
3. Octahedron: An eight-faced polyhedron.
4. Dodecahedron: A twelve-faced polyhedron.
5. Icosahedron: A twenty-faced polyhedron.
6. Rhombic dodecahedron: A twelve-faced polyhedron composed of rhombi.
7. Rhombic triacontahedron: A thirty-faced polyhedron composed of rhombi.
8. Small stellated dodecahedron: A twelve-faced polyhedron with pointed vertices.
9. Great dodecahedron: A twelve-faced polyhedron with flat vertices.
To determine the regular polyhedron with the greatest number of faces, we simply need to compare the number of faces for each polyhedron. From the list, we can see that the polyhedron with the greatest number of faces is the "Rhombic triacontahedron" with thirty faces.
Therefore, the regular polyhedron with the greatest number of faces is the "Rhombic triacontahedron."