Biscribed Pentakis Snub Dodecahedron (laevo) with radius = 1

C0  = 0.118190132226498019271723021788
C1  = 0.139984538474424402394152202497
C2  = 0.142681746826236955013300655974
C3  = 0.260871879052734974285023677762
C4  = 0.331220189551742483055748837811
C5  = 0.344689873377584055312317490581
C6  = 0.417735392228404116702191104107
C7  = 0.4873716202038210103256181465549
C8  = 0.525731112119133606025669084848
C9  = 0.562084105490801313286722541937
C10 = 0.648599308167462946933164808233
C11 = 0.678607271281139090987214781869
C12 = 0.766789440393960966204887830020
C13 = 0.818591809755563493381366984366
C14 = 0.850650808352039932181540497063
C15 = 0.906773978868385368599040032518
C16 = 0.979819497719205429988913646044

C0  = square-root of a root of the polynomial:  625*(x^18) - 78750*(x^17)
    + 5306375*(x^16) - 164399625*(x^15) + 2830582525*(x^14)
    - 13555289175*(x^13) + 21872571810*(x^12) + 32448313940*(x^11)
    - 136445271349*(x^10) + 51158915876*(x^9) + 575472867041*(x^8)
    - 1637070024639*(x^7) + 2329696668071*(x^6) - 2041897125050*(x^5)
    + 1138856125145*(x^4) - 389601425065*(x^3) + 72392437140*(x^2)
    - 5270526975*x + 60517205
C1  = square-root of a root of the polynomial:  50625*(x^18) - 7914375*(x^17)
    + 522582750*(x^16) - 16103572125*(x^15) + 221712402400*(x^14)
    - 1064025092450*(x^13) + 3622292029655*(x^12) - 9587755834825*(x^11)
    + 18098490423421*(x^10) - 23448067923094*(x^9) + 30569025509276*(x^8)
    - 27731814182529*(x^7) + 13455040508316*(x^6) - 3224252196405*(x^5)
    + 361818652950*(x^4) - 20202871770*(x^3) + 545995485*(x^2) - 6899985*x
    + 32805
C2  = square-root of a root of the polynomial:  78125*(x^18) + 9406250*(x^17)
    + 715575625*(x^16) + 23382300000*(x^15) + 244103682750*(x^14)
    - 630658692125*(x^13) + 897776067250*(x^12) + 4626873921850*(x^11)
    - 14277626753445*(x^10) + 3572572158460*(x^9) + 91976903804810*(x^8)
    - 46356004354770*(x^7) - 29166453033725*(x^6) - 7375586691770*(x^5)
    - 43301344674*(x^4) + 81027794355*(x^3) + 3804034035*(x^2) - 110467625*x
    + 24025
C3  = square-root of a root of the polynomial:  78125*(x^18) - 1156250*(x^17)
    + 93750625*(x^16) - 1012331250*(x^15) + 41281667000*(x^14)
    - 476608856125*(x^13) + 3009167519575*(x^12) - 12371141832800*(x^11)
    + 35532266906505*(x^10) - 71876575350475*(x^9) + 102215858536090*(x^8)
    - 102324577034225*(x^7) + 72237423082385*(x^6) - 35895981939750*(x^5)
    + 12435463628781*(x^4) - 2931135321449*(x^3) + 444264186886*(x^2)
    - 37790681764*x + 1217242321
C4  = square-root of a root of the polynomial:  10125*(x^18) + 1049625*(x^17)
    + 83916900*(x^16) + 2111387325*(x^15) + 46298142095*(x^14)
    + 228836889650*(x^13) + 839711044246*(x^12) + 2184731898246*(x^11)
    + 3703637735481*(x^10) + 3627252545021*(x^9) + 331174202056*(x^8)
    - 1698957099240*(x^7) + 477584889245*(x^6) - 84486834525*(x^5)
    + 11415819900*(x^4) - 1001142625*(x^3) + 63043625*(x^2) - 2483750*x + 625
C5  = square-root of a root of the polynomial:  50625*(x^18) + 2261250*(x^17)
    + 263244375*(x^16) - 107749500*(x^15) + 142185953875*(x^14)
    - 526385311175*(x^13) + 764669292335*(x^12) - 1895540742855*(x^11)
    + 6412789090536*(x^10) - 5815844410024*(x^9) + 11761329759631*(x^8)
    - 22422439070249*(x^7) + 22756873176661*(x^6) - 13904855507100*(x^5)
    + 5138952724710*(x^4) - 1170404538145*(x^3) + 174570488695*(x^2)
    - 16318520225*x + 685737605
C6  = square-root of a root of the polynomial:  50625*(x^18) + 9956250*(x^17)
    + 639394875*(x^16) + 14214682875*(x^15) + 66027091675*(x^14)
    - 724252676225*(x^13) + 1733137177800*(x^12) + 887646723950*(x^11)
    - 9985133042804*(x^10) + 11849135139356*(x^9) + 13293157370951*(x^8)
    - 51832707063364*(x^7) + 65240928441671*(x^6) - 45394386304750*(x^5)
    + 18937062590275*(x^4) - 4673056964290*(x^3) + 625810557370*(x^2)
    - 37851016820*x + 565941605
C7  = square-root of a root of the polynomial:  6328125*(x^18)
    - 1210781250*(x^17) + 75366556875*(x^16) - 1773045418125*(x^15)
    + 21646532223125*(x^14) - 36597900629375*(x^13) - 3501461337850*(x^12)
    + 132831601306450*(x^11) - 237104061405395*(x^10) + 42492785214360*(x^9)
    + 622647863949115*(x^8) - 1340718541376090*(x^7) + 1410075131577895*(x^6)
    - 860975702677000*(x^5) + 316259915518191*(x^4) - 69935929774489*(x^3)
    + 9025832245926*(x^2) - 619705757964*x + 17119367281
C8  = sqrt(10 * (5 - sqrt(5))) / 10
C9  = square-root of a root of the polynomial:  6328125*(x^18)
    + 301640625*(x^17) + 9498960000*(x^16) + 138265935000*(x^15)
    + 1110617457500*(x^14) - 4717705241750*(x^13) + 12585445892300*(x^12)
    - 42435921837250*(x^11) + 103333195059980*(x^10) - 132610274057605*(x^9)
    + 338574055037210*(x^8) - 320337237885115*(x^7) + 138125619246945*(x^6)
    - 31698824059150*(x^5) + 4158300749261*(x^4) - 316871050594*(x^3)
    + 13726385466*(x^2) - 311460224*x + 2859481
C10 = square-root of a root of the polynomial:  6328125*(x^18)
    - 415968750*(x^17) + 11782063125*(x^16) + 356540651250*(x^15)
    + 5719396634000*(x^14) - 7848916748000*(x^13) + 6663381606875*(x^12)
    - 22080344651850*(x^11) + 5869570495855*(x^10) + 44622782371265*(x^9)
    - 31790109800075*(x^8) - 27354755150465*(x^7) + 39939822659010*(x^6)
    - 15069189901785*(x^5) + 664933411066*(x^4) + 535053381851*(x^3)
    + 33523978046*(x^2) - 37859098419*x + 3515422681
C11 = square-root of a root of the polynomial:  6328125*(x^18)
    + 19406250*(x^17) + 2120619375*(x^16) - 94774215000*(x^15)
    + 2398185230375*(x^14) - 17323574985625*(x^13) + 54536960126275*(x^12)
    - 63259141441425*(x^11) - 35886142491720*(x^10) + 102549462212180*(x^9)
    + 79581344362600*(x^8) - 164723448548970*(x^7) + 79026418081580*(x^6)
    - 20229492766035*(x^5) + 4404203957241*(x^4) - 448695434356*(x^3)
    + 6973188611*(x^2) + 171479239*x + 54037201
C12 = square-root of a root of the polynomial:  6328125*(x^18)
    - 147656250*(x^17) + 1992706875*(x^16) - 9666395625*(x^15)
    + 28290722375*(x^14) - 58827866125*(x^13) + 105696258900*(x^12)
    - 134128511875*(x^11) + 96429936530*(x^10) - 4537309265*(x^9)
    - 23594632460*(x^8) + 809644335*(x^7) + 2589370660*(x^6) + 419111075*(x^5)
    - 6869974*(x^4) - 8193086*(x^3) - 992704*(x^2) - 28931*x + 3481
C13 = square-root of a root of the polynomial:  6328125*(x^18)
    + 381796875*(x^17) + 36196981875*(x^16) + 113386681875*(x^15)
    + 1363267934000*(x^14) - 7159523469250*(x^13) + 14669247797125*(x^12)
    - 16539298484600*(x^11) + 9341704003455*(x^10) + 685274614800*(x^9)
    - 5023749866780*(x^8) + 3160892924760*(x^7) - 155805236170*(x^6)
    - 979321543445*(x^5) + 699840474696*(x^4) - 243691359306*(x^3)
    + 44727340976*(x^2) - 3303936371*x + 80478841
C14 = sqrt(10 * (5 + sqrt(5))) / 10
C15 = square-root of a root of the polynomial:  6328125*(x^18)
    - 676265625*(x^17) + 32023456875*(x^16) - 337660811250*(x^15)
    + 1796576664125*(x^14) - 5175286936500*(x^13) + 7374959232600*(x^12)
    - 3491228561750*(x^11) - 1669722376770*(x^10) + 1974433156195*(x^9)
    - 372182240605*(x^8) - 139284579090*(x^7) + 74088258445*(x^6)
    - 17102260655*(x^5) + 5003793486*(x^4) - 1500373646*(x^3) + 23711736*(x^2)
    + 2825604*x + 44521
C16 = square-root of a root of the polynomial:  6328125*(x^18)
    + 113484375*(x^17) + 4896725625*(x^16) - 46307400000*(x^15)
    + 179080954250*(x^14) - 377882462500*(x^13) + 432240970700*(x^12)
    - 142079334425*(x^11) - 309256323470*(x^10) + 475658357335*(x^9)
    - 244948677335*(x^8) - 45038438070*(x^7) + 129218193585*(x^6)
    - 72207860805*(x^5) + 18223086861*(x^4) - 1699885845*(x^3) - 6932790*(x^2)
    - 10935000*x + 164025

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

Faces:
{ 24,  0, 48 }
{ 24, 48, 40 }
{ 24, 40, 60 }
{ 24, 60, 12 }
{ 24, 12,  0 }
{ 25,  1, 49 }
{ 25, 49, 41 }
{ 25, 41, 61 }
{ 25, 61, 13 }
{ 25, 13,  1 }
{ 26,  2, 50 }
{ 26, 50, 42 }
{ 26, 42, 62 }
{ 26, 62, 14 }
{ 26, 14,  2 }
{ 27,  3, 51 }
{ 27, 51, 43 }
{ 27, 43, 63 }
{ 27, 63, 15 }
{ 27, 15,  3 }
{ 28,  5, 53 }
{ 28, 53, 45 }
{ 28, 45, 64 }
{ 28, 64, 16 }
{ 28, 16,  5 }
{ 29,  4, 52 }
{ 29, 52, 44 }
{ 29, 44, 65 }
{ 29, 65, 17 }
{ 29, 17,  4 }
{ 30,  6, 54 }
{ 30, 54, 46 }
{ 30, 46, 67 }
{ 30, 67, 19 }
{ 30, 19,  6 }
{ 31,  7, 55 }
{ 31, 55, 47 }
{ 31, 47, 66 }
{ 31, 66, 18 }
{ 31, 18,  7 }
{ 32, 10, 58 }
{ 32, 58, 38 }
{ 32, 38, 68 }
{ 32, 68, 20 }
{ 32, 20, 10 }
{ 33,  9, 57 }
{ 33, 57, 37 }
{ 33, 37, 71 }
{ 33, 71, 23 }
{ 33, 23,  9 }
{ 34,  8, 56 }
{ 34, 56, 36 }
{ 34, 36, 70 }
{ 34, 70, 22 }
{ 34, 22,  8 }
{ 35, 11, 59 }
{ 35, 59, 39 }
{ 35, 39, 69 }
{ 35, 69, 21 }
{ 35, 21, 11 }
{  0,  2, 14 }
{  1,  3, 15 }
{  2,  0, 12 }
{  3,  1, 13 }
{  4,  5, 16 }
{  5,  4, 17 }
{  6,  7, 18 }
{  7,  6, 19 }
{  8, 11, 21 }
{  9, 10, 20 }
{ 10,  9, 23 }
{ 11,  8, 22 }
{ 12, 68, 38 }
{ 13, 69, 39 }
{ 14, 70, 36 }
{ 15, 71, 37 }
{ 16, 60, 40 }
{ 17, 61, 41 }
{ 18, 62, 42 }
{ 19, 63, 43 }
{ 20, 64, 45 }
{ 21, 65, 44 }
{ 22, 66, 47 }
{ 23, 67, 46 }
{ 36, 48,  0 }
{ 37, 49,  1 }
{ 38, 50,  2 }
{ 39, 51,  3 }
{ 40, 52,  4 }
{ 41, 53,  5 }
{ 42, 54,  6 }
{ 43, 55,  7 }
{ 44, 56,  8 }
{ 45, 57,  9 }
{ 46, 58, 10 }
{ 47, 59, 11 }
{ 48, 36, 56 }
{ 49, 37, 57 }
{ 50, 38, 58 }
{ 51, 39, 59 }
{ 52, 40, 48 }
{ 53, 41, 49 }
{ 54, 42, 50 }
{ 55, 43, 51 }
{ 56, 44, 52 }
{ 57, 45, 53 }
{ 58, 46, 54 }
{ 59, 47, 55 }
{ 60, 68, 12 }
{ 61, 69, 13 }
{ 62, 70, 14 }
{ 63, 71, 15 }
{ 64, 60, 16 }
{ 65, 61, 17 }
{ 66, 62, 18 }
{ 67, 63, 19 }
{ 68, 64, 20 }
{ 69, 65, 21 }
{ 70, 66, 22 }
{ 71, 67, 23 }
{  0, 14, 36 }
{  1, 15, 37 }
{  2, 12, 38 }
{  3, 13, 39 }
{  4, 16, 40 }
{  5, 17, 41 }
{  6, 18, 42 }
{  7, 19, 43 }
{  8, 21, 44 }
{  9, 20, 45 }
{ 10, 23, 46 }
{ 11, 22, 47 }
{ 56, 52, 48 }
{ 57, 53, 49 }
{ 58, 54, 50 }
{ 59, 55, 51 }
{ 60, 64, 68 }
{ 61, 65, 69 }
{ 62, 66, 70 }
{ 63, 67, 71 }
