<P> T - numbers can be represented in different ways, for example T = 1 can only be represented as an icosahedron or a dodecahedron and, depending on the type of quasi-symmetry, T = 3 can be presented as a truncated dodecahedron, an icosidodecahedron, or a truncated icosahedron and their respective duals a triakis icosahedron, a rhombic triacontahedron, or a pentakis dodecahedron . </P> <Table> <Tr> <Th_colspan="9"> (show) Representation of viral capsid T - numbers up to (6, 6) </Th> </Tr> <Tr> <Th_colspan="2"> Capsid parameters </Th> <Th> Class </Th> <Th_colspan="3"> hexagon / pentagon system </Th> <Th_colspan="3"> triangle system </Th> </Tr> <Tr> <Th> (h, k) </Th> <Th> </Th> <Th> #hex </Th> <Th> Conway </Th> <Th> image </Th> <Th> #tri </Th> <Th> Conway </Th> <Th> image </Th> </Tr> <Tr> <Th> (1, 0) </Th> <Td> </Td> <Td> </Td> <Td> 0 </Td> <Td> </Td> <Td> </Td> <Td> 20 </Td> <Td> dD = I </Td> <Td> </Td> </Tr> <Tr> <Th> (1, 1) </Th> <Td> </Td> <Td> II </Td> <Td> 20 </Td> <Td> dkD = tI </Td> <Td> </Td> <Td> 60 </Td> <Td> kD </Td> <Td> </Td> </Tr> <Tr> <Th> (2, 0) </Th> <Td> </Td> <Td> </Td> <Td> 30 </Td> <Td> cD </Td> <Td> </Td> <Td> 80 </Td> <Td> dcdI = dcD </Td> <Td> </Td> </Tr> <Tr> <Th> (2, 1) </Th> <Td> 7 </Td> <Td> III </Td> <Td> 60 </Td> <Td> wD </Td> <Td> </Td> <Td> 140 </Td> <Td> dwdI = dwD </Td> <Td> </Td> </Tr> <Tr> <Th> (3, 0) </Th> <Td> 9 </Td> <Td> </Td> <Td> 80 </Td> <Td> tkD </Td> <Td> </Td> <Td> 180 </Td> <Td> dtkD = ktI </Td> <Td> </Td> </Tr> <Tr> <Th> (2, 2) </Th> <Td> 12 </Td> <Td> II </Td> <Td> 110 </Td> <Td> cdkD </Td> <Td> </Td> <Td> 240 </Td> <Td> dcdkD = dctI </Td> <Td> </Td> </Tr> <Tr> <Th> (3, 1) </Th> <Td> 13 </Td> <Td> III </Td> <Td> 120 </Td> <Td> </Td> <Td> </Td> <Td> 260 </Td> <Td> </Td> <Td> </Td> </Tr> <Tr> <Th> (4, 0) </Th> <Td> 16 </Td> <Td> </Td> <Td> 150 </Td> <Td> ccD </Td> <Td> </Td> <Td> 320 </Td> <Td> dccdI = dccD </Td> <Td> </Td> </Tr> <Tr> <Th> (3, 2) </Th> <Td> 19 </Td> <Td> III </Td> <Td> 180 </Td> <Td> </Td> <Td> </Td> <Td> 380 </Td> <Td> </Td> <Td> </Td> </Tr> <Tr> <Th> (4, 1) </Th> <Td> 21 </Td> <Td> III </Td> <Td> 200 </Td> <Td> dkwD </Td> <Td> </Td> <Td> 420 </Td> <Td> kwdI = kwD </Td> <Td> </Td> </Tr> <Tr> <Th> (5, 0) </Th> <Td> 25 </Td> <Td> </Td> <Td> 240 </Td> <Td> </Td> <Td> </Td> <Td> 500 </Td> <Td> </Td> <Td> </Td> </Tr> <Tr> <Th> (3, 3) </Th> <Td> 27 </Td> <Td> II </Td> <Td> 260 </Td> <Td> dktkD = tktI </Td> <Td> </Td> <Td> 540 </Td> <Td> tktI </Td> <Td> </Td> </Tr> <Tr> <Th> (4, 2) </Th> <Td> 28 </Td> <Td> III </Td> <Td> </Td> <Td> cwD </Td> <Td> </Td> <Td> </Td> <Td> dcwdI = dcwD </Td> <Td> </Td> </Tr> <Tr> <Th> (5, 1) </Th> <Td> 31 </Td> <Td> III </Td> <Td> </Td> <Td> </Td> <Td> </Td> <Td> </Td> <Td> </Td> <Td> </Td> </Tr> <Tr> <Th> (6, 0) </Th> <Td> 36 </Td> <Td> </Td> <Td> 350 </Td> <Td> ctkD </Td> <Td> </Td> <Td> 720 </Td> <Td> dctkdI = dctkD </Td> <Td> </Td> </Tr> <Tr> <Th> (4, 3) </Th> <Td> 37 </Td> <Td> III </Td> <Td> </Td> <Td> </Td> <Td> </Td> <Td> </Td> <Td> </Td> <Td> </Td> </Tr> <Tr> <Th> (5, 2) </Th> <Td> 39 </Td> <Td> III </Td> <Td> </Td> <Td> </Td> <Td> </Td> <Td> </Td> <Td> </Td> <Td> </Td> </Tr> <Tr> <Th> (6, 1) </Th> <Td> 43 </Td> <Td> III </Td> <Td> </Td> <Td> </Td> <Td> </Td> <Td> </Td> <Td> </Td> <Td> </Td> </Tr> <Tr> <Th> (4, 4) </Th> <Td> 48 </Td> <Td> II </Td> <Td> 470 </Td> <Td> cctkD </Td> <Td> </Td> <Td> 960 </Td> <Td> dcctI </Td> <Td> </Td> </Tr> <Tr> <Th> (6, 2) </Th> <Td> 48 </Td> <Td> III </Td> <Td> </Td> <Td> </Td> <Td> </Td> <Td> </Td> <Td> </Td> <Td> </Td> </Tr> <Tr> <Th> (7, 0) </Th> <Td> 49 </Td> <Td> </Td> <Td> </Td> <Td> wrwD </Td> <Td> </Td> <Td> </Td> <Td> dwrwD </Td> <Td> </Td> </Tr> <Tr> <Th> (5, 3) </Th> <Td> 49 </Td> <Td> III </Td> <Td> </Td> <Td> wwD </Td> <Td> </Td> <Td> </Td> <Td> dwwD </Td> <Td> </Td> </Tr> <Tr> <Th> (5, 4) </Th> <Td> 61 </Td> <Td> III </Td> <Td> </Td> <Td> </Td> <Td> </Td> <Td> </Td> <Td> </Td> <Td> </Td> </Tr> <Tr> <Th> (6, 3) </Th> <Td> 64 </Td> <Td> III </Td> <Td> </Td> <Td> tkwD </Td> <Td> </Td> <Td> </Td> <Td> dtkwD </Td> <Td> </Td> </Tr> <Tr> <Th> (5, 5) </Th> <Td> 75 </Td> <Td> II </Td> <Td> </Td> <Td> </Td> <Td> </Td> <Td> </Td> <Td> </Td> <Td> </Td> </Tr> <Tr> <Th> (6, 4) </Th> <Td> 76 </Td> <Td> III </Td> <Td> </Td> <Td> </Td> <Td> </Td> <Td> </Td> <Td> </Td> <Td> </Td> </Tr> <Tr> <Th> (8, 2) </Th> <Td> 84 </Td> <Td> III </Td> <Td> </Td> <Td> dkcwD </Td> <Td> </Td> <Td> </Td> <Td> kcwD </Td> <Td> </Td> </Tr> <Tr> <Th> (6, 5) </Th> <Td> 91 </Td> <Td> III </Td> <Td> </Td> <Td> </Td> <Td> </Td> <Td> </Td> <Td> </Td> <Td> </Td> </Tr> <Tr> <Th> (6, 6) </Th> <Td> 108 </Td> <Td> II </Td> <Td> </Td> <Td> ctkdkD = ctktI </Td> <Td> </Td> <Td> </Td> <Td> dctktI </Td> <Td> </Td> </Tr> <Tr> <Th> (8, 4) </Th> <Td> 112 </Td> <Td> III </Td> <Td> </Td> <Td> ccwD </Td> <Td> </Td> <Td> </Td> <Td> dccwD </Td> <Td> </Td> </Tr> </Table> <Tr> <Th_colspan="9"> (show) Representation of viral capsid T - numbers up to (6, 6) </Th> </Tr> <Tr> <Th_colspan="2"> Capsid parameters </Th> <Th> Class </Th> <Th_colspan="3"> hexagon / pentagon system </Th> <Th_colspan="3"> triangle system </Th> </Tr>

Where are the genes for the capsid proteins found