<Table> <Tr> <Th_colspan="2"> Uniform Hexagonal prism </Th> </Tr> <Tr> <Td_colspan="2"> </Td> </Tr> <Tr> <Td> Type </Td> <Td> Prismatic uniform polyhedron </Td> </Tr> <Tr> <Td> Elements </Td> <Td> F = 8, E = 18, V = 12 (χ = 2) </Td> </Tr> <Tr> <Td> Faces by sides </Td> <Td> 6 (4) + 2 (6) </Td> </Tr> <Tr> <Td> Schläfli symbol </Td> <Td> t (2, 6) or (6) x () </Td> </Tr> <Tr> <Td> Wythoff symbol </Td> <Td> 2 6 2 2 2 3 </Td> </Tr> <Tr> <Td> Coxeter diagrams </Td> <Td> </Td> </Tr> <Tr> <Td> Symmetry </Td> <Td> D, (6, 2), (* 622), order 24 </Td> </Tr> <Tr> <Td> Rotation group </Td> <Td> D, (6, 2), (622), order 12 </Td> </Tr> <Tr> <Td> References </Td> <Td> U </Td> </Tr> <Tr> <Td> Dual </Td> <Td> Hexagonal dipyramid </Td> </Tr> <Tr> <Td> Properties </Td> <Td> convex, zonohedron </Td> </Tr> <Tr> <Td_colspan="2"> Vertex figure 4.4. 6 </Td> </Tr> </Table> <Tr> <Th_colspan="2"> Uniform Hexagonal prism </Th> </Tr> <Tr> <Td> Type </Td> <Td> Prismatic uniform polyhedron </Td> </Tr> <Tr> <Td> Elements </Td> <Td> F = 8, E = 18, V = 12 (χ = 2) </Td> </Tr>

How do you find the base of a hexagonal prism