例句與造句

1. The dual to that truncation will be the triakis truncated tetrahedron.
2. The truncated 5-cell is the 4-dimensional analogue of the truncated tetrahedron.
3. Start with a truncated tetrahedron, with four small triangular faces and four large hexagonal ones.
4. Each hexagonal face of the truncated tetrahedra is joined in complementary orientation to the neighboring truncated tetrahedron.
5. The "'rectified truncated tetrahedron "'is a polyhedron, constructed as a rectified truncated tetrahedron.
6. It's difficult to find truncated tetrahedron in a sentence. 用truncated tetrahedron造句挺難的
7. The "'rectified truncated tetrahedron "'is a polyhedron, constructed as a rectified truncated tetrahedron.
8. It is created by attaching a triangular cupola ( " J " 3 ) to one hexagonal face of an truncated tetrahedron.
9. The triakis truncated tetrahedron is the shape of the Voronoi cell of the carbon atoms in diamond, which lie on the diamond cubic crystal structure.
10. This layout of cells in projection is analogous to the layout of faces in the face-first projection of the truncated tetrahedron into 2-dimensional space.
11. Its 3-dimensional analogue would be a truncated tetrahedron ( truncated 3-demicube ), and Coxeter diagram or as a " cantic cube ".
12. It can look a little like a truncated tetrahedron, 40px, which has 4 hexagonal and 4 triangular faces, which is the related Goldberg polyhedron : G III ( 1, 1 ).
13. A " truncated tetrahedron " can be called a "'cantic cube "', with Coxeter diagram,, having half of the vertices of the cantellated cube ( rhombicuboctahedron ),.
14. Meffert also produces a similar puzzle called the "'Tetraminx "', which is the same as the Pyraminx except that the trivial tips are removed, turning the puzzle into a truncated tetrahedron.
15. However, not all vertex-transitive graphs are symmetric ( for example, the edges of the truncated tetrahedron ), and not all regular graphs are vertex-transitive ( for example, the Frucht graph and Tietze's graph ).
16. A large variety of closed polyhedra meeting this criterion can be constructed, of which the simplest are the truncated tetrahedron, the truncated octahedron, and the octahedron, which are Platonic solids or amino-acid residues ( " n " = 2 ).