| 1. | This is the Coxeter complex of the infinite dihedral group.
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| 2. | This permutation group is abstractly known as the dihedral group of order 8.
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| 3. | In abstract algebra, } } refers to the dihedral group of order.
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| 4. | The dihedral group D 12 is the group of symmetries of a hexagon.
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| 5. | The dihedral group ( discussed above ) is a finite group of order 8.
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| 6. | The notation for the dihedral group of order differs in geometry and abstract algebra.
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| 7. | Their symmetry group, the dihedral group of order 4, has eight elements.
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| 8. | As an example of a group cycle graph, consider the dihedral group Dih 4.
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| 9. | The properties of the dihedral groups } } with depend on whether is even or odd.
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| 10. | Its symmetry group is the dihedral group of order 6 " D " 3.
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