Biscribed Orthokis Propello Dodecahedron with radius = 1

C0  = 0.124304888176907892285193547942
C1  = 0.133795886474740834809030264851
C2  = 0.141137867071334512242825932818
C3  = 0.265442755248242404528019480760
C4  = 0.334925420512732756522426899142
C5  = 0.340791180047960912476071916814
C6  = 0.356822089773089931941969843046
C7  = 0.417615825909044941904275003164
C8  = 0.481929047119295424718897849632
C9  = 0.525731112119133606025669084848
C10 = 0.563291286533816577252098916258
C11 = 0.577350269189625764509148780502
C12 = 0.645981691930128762633947020280
C13 = 0.683058581157287346432294483924
C14 = 0.770286580107036654919140568222
C15 = 0.816854467632028181241324748774
C16 = 0.850650808352039932181540497063
C17 = 0.904082466581777489728170833072
C18 = 0.934172358962715696451118623548
C19 = 0.980907112442861519156373919422

C0  = square-root of a root of the polynomial:  65536*(x^16) + 7495680*(x^15)
    + 491227904*(x^14) + 6351072352*(x^13) + 275775342497*(x^12)
    - 1095517973379*(x^11) + 1674140947946*(x^10) + 1083824367585*(x^9)
    - 3600142894742*(x^8) - 4593062551707*(x^7) + 20976967234099*(x^6)
    - 25157358946087*(x^5) + 13667821908375*(x^4) - 3422706059857*(x^3)
    + 339746751490*(x^2) - 12370820272*x + 121903681
C1  = square-root of a root of the polynomial:  5308416*(x^16)
    - 590561280*(x^15) + 60381937152*(x^14) - 2405572267824*(x^13)
    + 46671079626865*(x^12) - 403784934147936*(x^11) + 3725855716166208*(x^10)
    - 17372873844108216*(x^9) + 39545854787741490*(x^8)
    - 48468316923230040*(x^7) + 36660251379282930*(x^6)
    - 19068574664577096*(x^5) + 6641295329000025*(x^4) - 1285678643612427*(x^3)
    + 114235193692764*(x^2) - 3393426691971*x + 30866624721
C2  = square-root of a root of the polynomial:  1638400*(x^16)
    + 161894400*(x^15) + 16904245760*(x^14) + 584160551680*(x^13)
    + 9747928869161*(x^12) + 51823480827597*(x^11) + 704033609424200*(x^10)
    + 1982083718516679*(x^9) + 1797496181280307*(x^8) + 340143935694066*(x^7)
    - 96437035959263*(x^6) - 17859593400946*(x^5) + 2634167841627*(x^4)
    - 114361958338*(x^3) + 2200318498*(x^2) - 19096948*x + 58081
C3  = square-root of a root of the polynomial:  1638400*(x^16)
    - 355020800*(x^15) + 28135682560*(x^14) - 1010178947840*(x^13)
    + 18115311041481*(x^12) - 162727072180758*(x^11) + 874637498242779*(x^10)
    - 3022920365426274*(x^9) + 7002174945012643*(x^8) - 10992583157548359*(x^7)
    + 11657532596151570*(x^6) - 8244174840311346*(x^5) + 3813303729269031*(x^4)
    - 1116871193398913*(x^3) + 194646801397351*(x^2) - 17685461388230*x
    + 589453882081
C4  = square-root of a root of the polynomial:  5308416*(x^16)
    + 869253120*(x^15) + 53178306048*(x^14) + 1211579052624*(x^13)
    + 6933394572865*(x^12) - 25040529354071*(x^11) + 692691831422064*(x^10)
    + 560272730342391*(x^9) + 1162115393275953*(x^8) - 1659825239650207*(x^7)
    - 523052296112086*(x^6) + 585947654830942*(x^5) + 37942564553097*(x^4)
    - 58068581953680*(x^3) + 9229745492418*(x^2) - 472451383159*x + 3789510481
C5  = square-root of a root of the polynomial:  5308416*(x^16)
    - 1051176960*(x^15) + 73018160640*(x^14) - 2211476689344*(x^13)
    + 33557396261329*(x^12) - 199969417354360*(x^11) + 636232838978296*(x^10)
    - 1348264246167432*(x^9) + 2050280731034356*(x^8) - 2140767250581809*(x^7)
    + 1683050804407312*(x^6) - 960201898510217*(x^5) + 308412580195300*(x^4)
    - 46309265225109*(x^3) + 3061239083951*(x^2) - 71799728769*x + 187169761
C6  = (sqrt(15) - sqrt(3)) / 6
C7  = square-root of a root of the polynomial:  5308416*(x^16)
    - 82391040*(x^15) + 21432743424*(x^14) + 426025787712*(x^13)
    + 13626200363857*(x^12) + 57175879101526*(x^11) + 176667404058891*(x^10)
    - 738247299620370*(x^9) - 174151001829417*(x^8) + 1644648411902513*(x^7)
    - 349526528975446*(x^6) - 1892524430846732*(x^5) + 1824336595279335*(x^4)
    - 652347048927942*(x^3) + 95235930949275*(x^2) - 5168447349622*x
    + 84750272161
C8  = square-root of a root of the polynomial:  132710400*(x^16)
    + 13624934400*(x^15) + 801743823360*(x^14) + 8973919199760*(x^13)
    + 297115326012361*(x^12) + 770834183980683*(x^11) - 1143739244441065*(x^10)
    - 6150602790532344*(x^9) + 20691043981826317*(x^8)
    - 27524252633480111*(x^7) + 19464212005891432*(x^6)
    - 7762531754599079*(x^5) + 1722354480909667*(x^4) - 198552966350862*(x^3)
    + 10145327586223*(x^2) - 175130481142*x + 912704521
C9  = sqrt(10 * (5 - sqrt(5))) / 10
C10 = square-root of a root of the polynomial:  132710400*(x^16)
    - 6668697600*(x^15) + 494812085760*(x^14) + 1578138217920*(x^13)
    + 162607917625441*(x^12) + 1382855720739815*(x^11)
    + 6346813427592807*(x^10) - 10071980784336678*(x^9)
    + 17085313146533199*(x^8) - 21134672289899537*(x^7)
    + 11834757599991947*(x^6) - 2608268293867561*(x^5) + 40446017461095*(x^4)
    + 41348825266602*(x^3) + 1723623650391*(x^2) - 778641685421*x + 110271001
C11 = sqrt(3) / 3
C12 = square-root of a root of the polynomial:  132710400*(x^16)
    + 15043276800*(x^15) + 625823919360*(x^14) + 5245307859120*(x^13)
    - 56601556333799*(x^12) - 123442595216608*(x^11) + 5380879793799264*(x^10)
    - 19483452038877114*(x^9) + 30153432895862658*(x^8)
    - 19190428803449504*(x^7) - 3300010749252145*(x^6)
    + 10135065455773814*(x^5) - 2494641020219979*(x^4) - 2009370924379413*(x^3)
    + 1177704567955926*(x^2) - 178259946657740*x + 1327521056761
C13 = square-root of a root of the polynomial:  132710400*(x^16)
    + 9112780800*(x^15) + 335742312960*(x^14) + 5579014246800*(x^13)
    + 74648822523001*(x^12) + 463728456904268*(x^11) + 784341306636174*(x^10)
    - 4564425807696096*(x^9) + 12990783849805353*(x^8)
    - 12683317234690541*(x^7) + 4755472993516700*(x^6) - 633482470020589*(x^5)
    + 22959377543136*(x^4) + 111550465638*(x^3) + 38544616341*(x^2)
    - 310197545*x + 358801
C14 = square-root of a root of the polynomial:  132710400*(x^16)
    - 13688524800*(x^15) + 573245717760*(x^14) - 12335751333840*(x^13)
    + 148871412739081*(x^12) - 1029887583406813*(x^11)
    + 3951943698203979*(x^10) - 7584494157932094*(x^9) + 5751880528628163*(x^8)
    + 1858342253476906*(x^7) - 5329344089371270*(x^6) + 2107152068279174*(x^5)
    + 643535014571811*(x^4) - 618884604880488*(x^3) + 127523600113806*(x^2)
    - 5984181061295*x + 76259374801
C15 = square-root of a root of the polynomial:  132710400*(x^16)
    - 10633420800*(x^15) + 328264508160*(x^14) - 5245263396000*(x^13)
    + 51887194958641*(x^12) - 319378745391760*(x^11) + 1099282783066902*(x^10)
    - 1394671057087008*(x^9) + 1173221525925789*(x^8) - 852405948399482*(x^7)
    + 400053782210822*(x^6) - 213812651865046*(x^5) + 193259968544130*(x^4)
    - 96187977354663*(x^3) + 20173970756601*(x^2) - 1440615171386*x
    + 1096868161
C16 = sqrt(10 * (5 + sqrt(5))) / 10
C17 = square-root of a root of the polynomial:  132710400*(x^16)
    + 4901990400*(x^15) + 99116156160*(x^14) + 592459922160*(x^13)
    + 1952101435681*(x^12) + 5963995539953*(x^11) + 29620333033998*(x^10)
    - 133103844064497*(x^9) + 191430260771652*(x^8) - 148846888346669*(x^7)
    + 71807250877232*(x^6) - 21938339249131*(x^5) + 4041763692312*(x^4)
    - 411550921944*(x^3) + 22040954580*(x^2) - 567891992*x + 5480281
C18 = (sqrt(3) + sqrt(15)) / 6
C19 = square-root of a root of the polynomial:  132710400*(x^16)
    - 472780800*(x^15) + 548271360*(x^14) - 284726160*(x^13) + 690960001*(x^12)
    - 1429786577*(x^11) + 930858107*(x^10) + 108638402*(x^9) - 232857347*(x^8)
    - 81972579*(x^7) + 147474081*(x^6) - 73155663*(x^5) + 14714136*(x^4)
    + 2249451*(x^3) - 387828*(x^2) - 157464*x + 6561

V0  = (  C2,  -C1,  C19)
V1  = (  C2,   C1, -C19)
V2  = ( -C2,   C1,  C19)
V3  = ( -C2,  -C1, -C19)
V4  = ( C19,  -C2,   C1)
V5  = ( C19,   C2,  -C1)
V6  = (-C19,   C2,   C1)
V7  = (-C19,  -C2,  -C1)
V8  = (  C1, -C19,   C2)
V9  = (  C1,  C19,  -C2)
V10 = ( -C1,  C19,   C2)
V11 = ( -C1, -C19,  -C2)
V12 = ( 0.0,   C6,  C18)
V13 = ( 0.0,   C6, -C18)
V14 = ( 0.0,  -C6,  C18)
V15 = ( 0.0,  -C6, -C18)
V16 = ( C18,  0.0,   C6)
V17 = ( C18,  0.0,  -C6)
V18 = (-C18,  0.0,   C6)
V19 = (-C18,  0.0,  -C6)
V20 = (  C6,  C18,  0.0)
V21 = (  C6, -C18,  0.0)
V22 = ( -C6,  C18,  0.0)
V23 = ( -C6, -C18,  0.0)
V24 = (  C3,   C4,  C17)
V25 = (  C3,  -C4, -C17)
V26 = ( -C3,  -C4,  C17)
V27 = ( -C3,   C4, -C17)
V28 = ( C17,   C3,   C4)
V29 = ( C17,  -C3,  -C4)
V30 = (-C17,  -C3,   C4)
V31 = (-C17,   C3,  -C4)
V32 = (  C4,  C17,   C3)
V33 = (  C4, -C17,  -C3)
V34 = ( -C4, -C17,   C3)
V35 = ( -C4,  C17,  -C3)
V36 = (  C9,  0.0,  C16)
V37 = (  C9,  0.0, -C16)
V38 = ( -C9,  0.0,  C16)
V39 = ( -C9,  0.0, -C16)
V40 = ( C16,   C9,  0.0)
V41 = ( C16,  -C9,  0.0)
V42 = (-C16,   C9,  0.0)
V43 = (-C16,  -C9,  0.0)
V44 = ( 0.0,  C16,   C9)
V45 = ( 0.0,  C16,  -C9)
V46 = ( 0.0, -C16,   C9)
V47 = ( 0.0, -C16,  -C9)
V48 = (  C8,  -C7,  C14)
V49 = (  C8,   C7, -C14)
V50 = ( -C8,   C7,  C14)
V51 = ( -C8,  -C7, -C14)
V52 = ( C14,  -C8,   C7)
V53 = ( C14,   C8,  -C7)
V54 = (-C14,   C8,   C7)
V55 = (-C14,  -C8,  -C7)
V56 = (  C7, -C14,   C8)
V57 = (  C7,  C14,  -C8)
V58 = ( -C7,  C14,   C8)
V59 = ( -C7, -C14,  -C8)
V60 = (  C0, -C10,  C15)
V61 = (  C0,  C10, -C15)
V62 = ( -C0,  C10,  C15)
V63 = ( -C0, -C10, -C15)
V64 = ( C15,  -C0,  C10)
V65 = ( C15,   C0, -C10)
V66 = (-C15,   C0,  C10)
V67 = (-C15,  -C0, -C10)
V68 = ( C10, -C15,   C0)
V69 = ( C10,  C15,  -C0)
V70 = (-C10,  C15,   C0)
V71 = (-C10, -C15,  -C0)
V72 = (  C5,  C12,  C13)
V73 = (  C5, -C12, -C13)
V74 = ( -C5, -C12,  C13)
V75 = ( -C5,  C12, -C13)
V76 = ( C13,   C5,  C12)
V77 = ( C13,  -C5, -C12)
V78 = (-C13,  -C5,  C12)
V79 = (-C13,   C5, -C12)
V80 = ( C12,  C13,   C5)
V81 = ( C12, -C13,  -C5)
V82 = (-C12, -C13,   C5)
V83 = (-C12,  C13,  -C5)
V84 = ( C11,  C11,  C11)
V85 = ( C11,  C11, -C11)
V86 = ( C11, -C11,  C11)
V87 = ( C11, -C11, -C11)
V88 = (-C11,  C11,  C11)
V89 = (-C11,  C11, -C11)
V90 = (-C11, -C11,  C11)
V91 = (-C11, -C11, -C11)

Faces:
{ 12,  2,  0, 24 }
{ 12, 24, 72, 62 }
{ 12, 62, 50,  2 }
{ 13,  1,  3, 27 }
{ 13, 27, 75, 61 }
{ 13, 61, 49,  1 }
{ 14,  0,  2, 26 }
{ 14, 26, 74, 60 }
{ 14, 60, 48,  0 }
{ 15,  3,  1, 25 }
{ 15, 25, 73, 63 }
{ 15, 63, 51,  3 }
{ 16,  4,  5, 28 }
{ 16, 28, 76, 64 }
{ 16, 64, 52,  4 }
{ 17,  5,  4, 29 }
{ 17, 29, 77, 65 }
{ 17, 65, 53,  5 }
{ 18,  6,  7, 30 }
{ 18, 30, 78, 66 }
{ 18, 66, 54,  6 }
{ 19,  7,  6, 31 }
{ 19, 31, 79, 67 }
{ 19, 67, 55,  7 }
{ 20,  9, 10, 32 }
{ 20, 32, 80, 69 }
{ 20, 69, 57,  9 }
{ 21,  8, 11, 33 }
{ 21, 33, 81, 68 }
{ 21, 68, 56,  8 }
{ 22, 10,  9, 35 }
{ 22, 35, 83, 70 }
{ 22, 70, 58, 10 }
{ 23, 11,  8, 34 }
{ 23, 34, 82, 71 }
{ 23, 71, 59, 11 }
{ 84, 72, 24, 76 }
{ 84, 76, 28, 80 }
{ 84, 80, 32, 72 }
{ 85, 49, 61, 57 }
{ 85, 57, 69, 53 }
{ 85, 53, 65, 49 }
{ 86, 48, 60, 56 }
{ 86, 56, 68, 52 }
{ 86, 52, 64, 48 }
{ 87, 73, 25, 77 }
{ 87, 77, 29, 81 }
{ 87, 81, 33, 73 }
{ 88, 50, 62, 58 }
{ 88, 58, 70, 54 }
{ 88, 54, 66, 50 }
{ 89, 75, 27, 79 }
{ 89, 79, 31, 83 }
{ 89, 83, 35, 75 }
{ 90, 74, 26, 78 }
{ 90, 78, 30, 82 }
{ 90, 82, 34, 74 }
{ 91, 51, 63, 59 }
{ 91, 59, 71, 55 }
{ 91, 55, 67, 51 }
{ 36, 24,  0 }
{ 36, 76, 24 }
{ 36, 64, 76 }
{ 36, 48, 64 }
{ 36,  0, 48 }
{ 37, 25,  1 }
{ 37, 77, 25 }
{ 37, 65, 77 }
{ 37, 49, 65 }
{ 37,  1, 49 }
{ 38, 26,  2 }
{ 38, 78, 26 }
{ 38, 66, 78 }
{ 38, 50, 66 }
{ 38,  2, 50 }
{ 39, 27,  3 }
{ 39, 79, 27 }
{ 39, 67, 79 }
{ 39, 51, 67 }
{ 39,  3, 51 }
{ 40, 28,  5 }
{ 40, 80, 28 }
{ 40, 69, 80 }
{ 40, 53, 69 }
{ 40,  5, 53 }
{ 41, 29,  4 }
{ 41, 81, 29 }
{ 41, 68, 81 }
{ 41, 52, 68 }
{ 41,  4, 52 }
{ 42, 31,  6 }
{ 42, 83, 31 }
{ 42, 70, 83 }
{ 42, 54, 70 }
{ 42,  6, 54 }
{ 43, 30,  7 }
{ 43, 82, 30 }
{ 43, 71, 82 }
{ 43, 55, 71 }
{ 43,  7, 55 }
{ 44, 32, 10 }
{ 44, 72, 32 }
{ 44, 62, 72 }
{ 44, 58, 62 }
{ 44, 10, 58 }
{ 45, 35,  9 }
{ 45, 75, 35 }
{ 45, 61, 75 }
{ 45, 57, 61 }
{ 45,  9, 57 }
{ 46, 34,  8 }
{ 46, 74, 34 }
{ 46, 60, 74 }
{ 46, 56, 60 }
{ 46,  8, 56 }
{ 47, 33, 11 }
{ 47, 73, 33 }
{ 47, 63, 73 }
{ 47, 59, 63 }
{ 47, 11, 59 }
