Self-Dual Hendecahedron #2 (canonical)

C0  = 0.202383717315856081497767164123
C1  = 0.315282025205356479651683313253
C2  = 0.339752656354664522195714310099
C3  = 0.456966311668627283056732459004
C4  = 0.599702049084574268078042105563
C5  = 0.646247955509383421974778054603
C6  = 0.825419058029524309817142833072
C7  = 0.889484002104574668110346758171
C8  = 0.970338298541798929326752066986
C9  = 1.02027406564833566033091903964
C10 = 1.04565115717431224217817063833
C11 = 1.09946269149982029182926489614
C12 = 2.18834512406060661506600312949

C0  = sqrt(255 - 28 * sqrt(5) - 4 * sqrt(5 * (703 - 118 * sqrt(5)))) / 11
C1  = sqrt(2 * (317 - 115*sqrt(5) - sqrt(10 * (6691 - 2935*sqrt(5))))) / 22
C2  = sqrt(29 * (19 - 7 * sqrt(5))) / 29
C3  = sqrt(29 * (15 - 4 * sqrt(5))) / 29
C4  = sqrt(2 * (505 - 129*sqrt(5) - 5 * sqrt(2*(2699 - 1057*sqrt(5))))) / 22
C5  = sqrt(58 * (15 - 4 * sqrt(5))) / 29
C6  = sqrt(2 * (247 + 73*sqrt(5) - sqrt(10 * (3151 + 1283*sqrt(5))))) / 22
C7  = sqrt(58 * (7 + 2 * sqrt(5))) / 29
C8  = sqrt(2 * (435 + 59*sqrt(5) - 5 * sqrt(2 * (1519 + 349*sqrt(5))))) / 22
C9  = 2 * sqrt(94 - 7 * sqrt(5) - sqrt(5 * (703 - 118 * sqrt(5)))) / 11
C10 = sqrt(29 * (25 + 3 * sqrt(5))) / 29
C11 = 2 * sqrt(29 * (11 - sqrt(5))) / 29
C12 = sqrt(5 * (15 + 4 * sqrt(5))) / 5

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

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