Self-Dual Tridecahedron #16 (canonical)

C0  = 0.0511423848782328191918018823813 = (7 * sqrt(10) - 12 * sqrt(2)) / 101
C1  = 0.0885812090293414927091136227682 = (7 * sqrt(30) - 12 * sqrt(6)) / 101
C2  = 0.102284769756465638383603764763  = 2*(7 * sqrt(10) - 12 * sqrt(2)) / 101
C3  = 0.189264966656133956144792810567  = (2 * sqrt(10) - 3 * sqrt(2)) / 11
C4  = 0.3278165383412534522315948574453 = (2 * sqrt(30) - 3 * sqrt(6)) / 11
C5  = 0.378529933312267912289585621134  = 2 * (2 * sqrt(10) - 3 * sqrt(2)) / 11
C6  = 0.408881731069662298124372716771  = sqrt(15) - 2 * sqrt(3)
C7  = 0.540181513475452907203086314098  = (3 * sqrt(2) - sqrt(10)) / 2
C8  = 0.632455532033675866399778708887  = sqrt(10) / 5
C9  = 0.774596669241483377035853079956  = sqrt(15) / 5
C10 = 0.9356218266489365800110771980548 = (3 * sqrt(6) - sqrt(30)) / 2
C11 = 0.981926052407538732662640978710  = (4 * sqrt(3) + sqrt(15)) / 11
C12 = 0.998691371980837082403131292318  = (56 * sqrt(3) + sqrt(15)) / 101
C13 = 1.001310342770427005939330427146  = (56 * sqrt(3) - sqrt(15)) / 93
C14 = 1.08036302695090581440617262820   = 3 * sqrt(2) - sqrt(10)
C15 = 1.09544511501033222691393956560   = sqrt(30) / 5
C16 = 1.26491106406735173279955741777   = 2 * sqrt(10) / 5

V0  = (  C1,  -C0, -C12)
V1  = ( -C1,  -C0, -C12)
V2  = (  C4,   C3,  C11)
V3  = ( -C4,   C3,  C11)
V4  = ( C15,  -C8,  -C9)
V5  = (-C15,  -C8,  -C9)
V6  = ( C10,   C7,   C6)
V7  = (-C10,   C7,   C6)
V8  = ( 0.0,  0.0,  C13)
V9  = ( 0.0,   C2, -C12)
V10 = ( 0.0,  -C5,  C11)
V11 = ( 0.0,  C16,  -C9)
V12 = ( 0.0, -C14,   C6)

Faces:
{  2,  6, 11,  7,  3 }
{  2, 10, 12,  4,  6 }
{  3,  7,  5, 12, 10 }
{  0,  4,  5,  1 }
{  0,  9, 11,  4 }
{  1,  5, 11,  9 }
{  8,  2,  3 }
{  8,  3, 10 }
{  8, 10,  2 }
{  4, 11,  6 }
{  4, 12,  5 }
{  0,  1,  9 }
{  5,  7, 11 }
