Biscribed Hexpropello Dodecahedron (dextro) with inradius = 1 C0 = 0.0765477113213565148434042431772 C1 = 0.0906632037610257291972376506282 C2 = 0.124566775568658149077982628267 C3 = 0.126966915977618597367788833217 C4 = 0.150379771981194169721160334790 C5 = 0.214520002439995694840829390502 C6 = 0.223243856535653443849134632978 C7 = 0.2705529438932668946493221296746 C8 = 0.274946547549852318799142963057 C9 = 0.3048984695529409687107509158653 C10 = 0.355816557479733143747170832226 C11 = 0.369660446198785598198611736136 C12 = 0.370286498263649877086944719968 C13 = 0.395561673313966697907988566494 C14 = 0.448756367784570253745166384187 C15 = 0.480383333048391292825153460493 C16 = 0.519418471992936663551580306367 C17 = 0.5718397750027187731046852135253 C18 = 0.598123166246086966399743527907 C19 = 0.650309644523639149762906877744 C20 = 0.666114617207233592557310696168 C21 = 0.716579943390136888123987664224 C22 = 0.723702915334422572544309347244 C23 = 0.7426623285285901074007149393453 C24 = 0.763889030747750338924175160920 C25 = 0.800689416504833319484067212534 C26 = 0.850669831312041169912098180461 C27 = 0.854552234508776068121412811548 C28 = 0.927656332482451916851856045751 C29 = 0.9310999458301325829648170547253 C30 = 0.967783612444872564598355264043 C31 = 0.987132887283403782773309793898 C32 = 1.02059614278728902684985159771 C0 = square-root of a root of the polynomial: (x^18) - 234*(x^17) + 18611*(x^16) - 914404*(x^15) + 27150831*(x^14) - 459955010*(x^13) + 4259685185*(x^12) - 32865875100*(x^11) + 216390641850*(x^10) + 68247743500*(x^9) - 5083622763500*(x^8) + 15493880417500*(x^7) + 101214184761250*(x^6) - 998955018787500*(x^5) + 4243529939337500*(x^4) - 10753848562125000*(x^3) + 16473385187578125*(x^2) - 13167479464453125*x + 76592087578125 C1 = square-root of a root of the polynomial: (x^18) - 54*(x^17) + 1281*(x^16) - 4389*(x^15) - 105334*(x^14) + 25745*(x^13) + 810705*(x^12) - 3778450*(x^11) + 143242225*(x^10) - 661677500*(x^9) + 2093149625*(x^8) - 12395388750*(x^7) + 51028014375*(x^6) - 137532515625*(x^5) + 371426259375*(x^4) - 834602484375*(x^3) + 859661859375*(x^2) - 69368906250*x + 512578125 C2 = square-root of a root of the polynomial: 366025*(x^18) + 3285150*(x^17) - 512877015*(x^16) - 502720425*(x^15) + 221177020856*(x^14) + 4202794179465*(x^13) - 76288644844525*(x^12) - 3496127800763400*(x^11) + 111176268014966600*(x^10) - 1358985147508997500*(x^9) + 8902510157811787250*(x^8) - 34453129987258455625*(x^7) + 77285052458061040625*(x^6) - 93853952255762053125*(x^5) + 63963947695551275000*(x^4) - 30104851557293296875*(x^3) - 1074498291974593750*(x^2) - 14399082099609375*x + 590988330078125 C3 = square-root of a root of the polynomial: 96059601*(x^18) - 21162750444*(x^17) + 1499483871846*(x^16) - 59702051628909*(x^15) + 1205112339639081*(x^14) + 22578326536290705*(x^13) - 1805868511508693295*(x^12) + 20543963177476336380*(x^11) + 688345545054766259815*(x^10) - 18040409568121779532105*(x^9) + 65944590692075969500955*(x^8) - 94637657627018767898100*(x^7) + 123230128217938835259700*(x^6) - 31657825041332644903875*(x^5) + 66358327929178478833625*(x^4) - 8826804481239222875625*(x^3) + 445442630612376369375*(x^2) - 9728835554814468750*x + 73604996162578125 C4 = square-root of a root of the polynomial: 14641*(x^18) - 276364*(x^17) + 26904376*(x^16) - 438801154*(x^15) + 24622199076*(x^14) - 160853445255*(x^13) + 4865231134575*(x^12) - 68545097378830*(x^11) - 602190292449400*(x^10) - 2259855326330240*(x^9) - 1770905631849070*(x^8) - 1857219595769475*(x^7) + 3379688828089175*(x^6) + 3733580897799250*(x^5) + 1505346326340625*(x^4) - 87227678142500*(x^3) + 3892355556875*(x^2) - 65139203125*x + 75078125 C5 = square-root of a root of the polynomial: (x^18) - 124*(x^17) + 176*(x^16) - 62684*(x^15) + 650586*(x^14) - 490825*(x^13) - 32005150*(x^12) - 48601750*(x^11) + 1240115775*(x^10) + 3597972125*(x^9) - 22616973625*(x^8) - 140753102500*(x^7) - 221720490625*(x^6) + 324780406250*(x^5) + 1182610937500*(x^4) - 711316406250*(x^3) + 334156640625*(x^2) - 15048828125*x + 48828125 C6 = square-root of a root of the polynomial: (x^18) - 224*(x^17) + 5786*(x^16) - 285364*(x^15) + 5694741*(x^14) - 202639610*(x^13) + 788611900*(x^12) - 1960506100*(x^11) + 49026279600*(x^10) - 204894854000*(x^9) + 107279844625*(x^8) - 2334423071250*(x^7) + 13010262673750*(x^6) - 8588611296875*(x^5) + 69432120759375*(x^4) - 304202119781250*(x^3) + 96245837468750*(x^2) - 219039995234375*x + 10714650078125 C7 = square-root of a root of the polynomial: (x^18) - 14*(x^17) - 339*(x^16) + 19771*(x^15) - 646664*(x^14) + 720000*(x^13) + 269234775*(x^12) - 4766318500*(x^11) + 36371642075*(x^10) - 112380192500*(x^9) - 239482090875*(x^8) + 3380443310625*(x^7) - 11030914548750*(x^6) + 2076132693750*(x^5) + 91626010075000*(x^4) - 279080362562500*(x^3) + 338500514250000*(x^2) - 144124117421875*x + 8842837578125 C8 = square-root of a root of the polynomial: 366025*(x^18) - 44449350*(x^17) + 2462690385*(x^16) - 87105420740*(x^15) + 2243332294096*(x^14) - 52781296428955*(x^13) + 1461054783141480*(x^12) - 35837673925659590*(x^11) + 586895911496078330*(x^10) - 5877994929102554230*(x^9) + 35287309147325186480*(x^8) - 122656810925662496650*(x^7) + 221421225652396785700*(x^6) - 137879118267571700000*(x^5) - 55960802715589986375*(x^4) - 1124019704463844375*(x^3) + 518960995206685000*(x^2) - 5911736690671875*x + 95097056328125 C9 = square-root of a root of the polynomial: 625*(x^18) + 3125*(x^17) - 185250*(x^16) - 704375*(x^15) + 41078200*(x^14) - 419099900*(x^13) + 1956524930*(x^12) - 2535919905*(x^11) - 13681343655*(x^10) + 51574114175*(x^9) - 25304796840*(x^8) - 123623372230*(x^7) + 175676412886*(x^6) - 39897146810*(x^5) + 100373607445*(x^4) - 255651874650*(x^3) + 79645206575*(x^2) - 8254669750*x + 277140125 C10 = square-root of a root of the polynomial: 96059601*(x^18) - 14212322289*(x^17) + 414131361741*(x^16) - 11959640997174*(x^15) + 44970903481356*(x^14) - 1601152800960105*(x^13) + 56720424367420200*(x^12) - 3880902181172414175*(x^11) + 26601586078718321725*(x^10) - 18339941643757768000*(x^9) - 467015653418446092750*(x^8) - 617587418025870433750*(x^7) - 15309601360366353125*(x^6) + 7684392950223600000*(x^5) + 581094181867478125*(x^4) - 292645808078125*(x^3) + 1525085094312500*(x^2) - 56459748046875*x + 46923828125 C11 = square-root of a root of the polynomial: 531441*(x^18) - 125242929*(x^17) + 6810062121*(x^16) - 253195577244*(x^15) + 4296440708766*(x^14) - 33281294985810*(x^13) + 128730451885290*(x^12) - 246282125708880*(x^11) + 241700743533915*(x^10) - 216892199220795*(x^9) + 67314961233855*(x^8) - 58807352192400*(x^7) + 10652461463650*(x^6) - 10060556533250*(x^5) + 1527791851750*(x^4) - 141482307500*(x^3) + 15313338125*(x^2) - 3390625*x + 78125 C12 = square-root of a root of the polynomial: 96059601*(x^18) - 13763779524*(x^17) - 822571251354*(x^16) - 14625234140904*(x^15) - 507166439835969*(x^14) - 19555180817192100*(x^13) - 279064645172293770*(x^12) + 6271801883853777825*(x^11) + 223248318577564557445*(x^10) - 3628727328653220332775*(x^9) - 3944360744123068424470*(x^8) - 2845170934208520029875*(x^7) + 18412337347590744968800*(x^6) - 5216743021940973563625*(x^5) + 927313867066812542500*(x^4) - 57425329353229522500*(x^3) - 3189784689167486875*(x^2) + 25978842293468750*x + 10296778725078125 C13 = square-root of a root of the polynomial: 625*(x^18) - 29375*(x^17) + 846000*(x^16) - 13386375*(x^15) + 146301575*(x^14) - 1062428625*(x^13) + 5415773655*(x^12) - 19422280780*(x^11) + 58793198380*(x^10) - 286749478850*(x^9) + 1513427339670*(x^8) - 6193618805450*(x^7) + 16211413576831*(x^6) - 24271123271200*(x^5) + 15652300634380*(x^4) - 4254445601525*(x^3) + 433037108000*(x^2) - 17869033500*x + 1162050125 C14 = square-root of a root of the polynomial: 96059601*(x^18) + 4316860251*(x^17) + 159550521201*(x^16) + 2505869680401*(x^15) + 18866317751181*(x^14) - 1172372119035570*(x^13) - 30329465715144315*(x^12) - 639949971487073310*(x^11) - 2025637041068586905*(x^10) - 240956383982605040285*(x^9) + 1129358485113567338330*(x^8) - 1165343429804407885575*(x^7) + 290466553942177715825*(x^6) - 976559616261496609125*(x^5) + 1435304980522911313625*(x^4) - 141531449207734976875*(x^3) - 19520872072006843125*(x^2) - 520278584864031250*x + 8497966912578125 C15 = square-root of a root of the polynomial: 2401490025*(x^18) - 318154426425*(x^17) + 13247270897085*(x^16) - 474837297264315*(x^15) + 9797354986600251*(x^14) - 201102746396742270*(x^13) + 2263882429563770925*(x^12) - 23224345984544547825*(x^11) + 209203314850705202725*(x^10) - 685069717092350177375*(x^9) + 1028469949042716316625*(x^8) - 7714402436478463973125*(x^7) + 45626900277923956387500*(x^6) - 76748746090337669275000*(x^5) + 40386781194883049087500*(x^4) - 108328315239427216171875*(x^3) + 33959937559234313296875*(x^2) - 2640679246844361328125*x + 61228017597705078125 C16 = square-root of a root of the polynomial: 625*(x^18) - 55625*(x^17) + 1120375*(x^16) - 4292375*(x^15) - 26534300*(x^14) - 199558900*(x^13) - 252961570*(x^12) - 1032919405*(x^11) + 27525966445*(x^10) - 106702971795*(x^9) + 308442652095*(x^8) - 559517954345*(x^7) + 872032397826*(x^6) - 1219841896815*(x^5) + 1242166191965*(x^4) - 781265597675*(x^3) + 268183292650*(x^2) - 39581363000*x + 1376970125 C17 = square-root of a root of the polynomial: 2401490025*(x^18) - 460140043275*(x^17) + 10879684712010*(x^16) - 338852969435835*(x^15) + 7586190002107566*(x^14) - 328418322552043605*(x^13) + 6879813837357992805*(x^12) - 158088102733866028800*(x^11) + 2605851387614305561060*(x^10) - 59175633386627043709510*(x^9) + 511255999298022059206905*(x^8) - 1176040215167357063384950*(x^7) + 3213201751783714601982450*(x^6) - 4056202687860316499424000*(x^5) + 4415196339973334225001750*(x^4) - 3066044109117632039491875*(x^3) + 625542464263464229291250*(x^2) + 4422378904503965703125*x + 32359295221143828125 C18 = square-root of a root of the polynomial: 531441*(x^18) - 49246866*(x^17) + 1126005381*(x^16) - 17257109616*(x^15) + 139855037076*(x^14) - 672579919800*(x^13) + 2228052279060*(x^12) - 5221580714640*(x^11) + 8691909167790*(x^10) - 10327052878380*(x^9) + 8551609618230*(x^8) - 4338066627600*(x^7) + 1066095052900*(x^6) - 269605331000*(x^5) + 47843050500*(x^4) - 368470000*(x^3) + 2231275625*(x^2) - 1031250*x + 78125 C19 = square-root of a root of the polynomial: 2401490025*(x^18) - 197385279300*(x^17) + 7773458504310*(x^16) - 120689446568310*(x^15) - 940024717765119*(x^14) - 26328394259429535*(x^13) + 2747806008700002165*(x^12) - 33591506572028278440*(x^11) + 44338596616661738230*(x^10) - 2229653083927510248525*(x^9) + 20934312825326679880105*(x^8) - 74067690193018751769175*(x^7) + 117128520632416137549550*(x^6) - 88016532631378799516250*(x^5) + 33611560299971247498750*(x^4) - 6172321950737735877500*(x^3) + 426206639015251425625*(x^2) - 12675113116176593750*x + 157486656281328125 C20 = square-root of a root of the polynomial: 625*(x^18) - 34375*(x^17) + 1027250*(x^16) - 19539625*(x^15) + 108783700*(x^14) - 509657075*(x^13) + 448334530*(x^12) + 18728504820*(x^11) - 135206762175*(x^10) + 308542741980*(x^9) + 814436212350*(x^8) - 7802238497325*(x^7) + 25661889889016*(x^6) - 52979868766400*(x^5) + 71784040080425*(x^4) - 48223768379575*(x^3) + 8279380515550*(x^2) + 1143308271500*x + 33296880125 C21 = square-root of a root of the polynomial: 625*(x^18) - 115625*(x^17) + 4185375*(x^16) - 114008125*(x^15) + 1568217950*(x^14) - 15275621350*(x^13) + 144684123605*(x^12) - 1189798304395*(x^11) + 7074064152065*(x^10) - 29178470889800*(x^9) + 84059091697985*(x^8) - 170783500499410*(x^7) + 256852225961921*(x^6) - 345210570877555*(x^5) + 578698415129805*(x^4) - 1244606162276025*(x^3) + 2418311189816950*(x^2) - 3256002528088500*x + 1171437823335125 C22 = square-root of a root of the polynomial: 2401490025*(x^18) - 114920890425*(x^17) + 1743199828335*(x^16) - 155826291651210*(x^15) + 2636906317852311*(x^14) - 15476463153945945*(x^13) - 315715877728014915*(x^12) + 4147342499411042085*(x^11) + 35196904853594804935*(x^10) - 18879220708845525975*(x^9) - 250459352621615594020*(x^8) - 1349697117601889183675*(x^7) + 33880968001799282740825*(x^6) - 171283959765132050531625*(x^5) + 324266146119025187638000*(x^4) - 261610365393871902146250*(x^3) + 63426635457254781110000*(x^2) + 3428563200730437250000*x + 58207785968746953125 C23 = square-root of a root of the polynomial: 625*(x^18) - 24375*(x^17) - 157750*(x^16) + 7700250*(x^15) - 57515925*(x^14) - 1889674625*(x^13) + 16631963380*(x^12) - 8292097980*(x^11) - 153444862895*(x^10) + 158281265640*(x^9) + 677276864025*(x^8) - 1096246730400*(x^7) - 3369895305099*(x^6) + 6121524572830*(x^5) + 28536978455585*(x^4) - 11368057325300*(x^3) - 2286473388125*(x^2) - 453901358625*x + 5744355125 C24 = square-root of a root of the polynomial: 625*(x^18) - 61875*(x^17) + 2743500*(x^16) - 78977625*(x^15) + 1215937075*(x^14) - 10798371025*(x^13) + 74805933480*(x^12) - 433785507320*(x^11) + 1990402696310*(x^10) - 7007355164215*(x^9) + 19954405816260*(x^8) - 47664612537450*(x^7) + 88483852449721*(x^6) - 106998973295690*(x^5) + 71010083577645*(x^4) - 3926204242950*(x^3) - 10886987472850*(x^2) + 81203544500*x + 829242450125 C25 = square-root of a root of the polynomial: 2401490025*(x^18) - 457381306800*(x^17) + 33430663440810*(x^16) - 1380769645773105*(x^15) + 35876820025475901*(x^14) - 636373084490808390*(x^13) + 8457357180632252625*(x^12) - 98708632294383978300*(x^11) + 984456569940017801380*(x^10) - 7786315886645365909035*(x^9) + 25865735079237518339880*(x^8) - 22298540184982585657900*(x^7) - 58308931648691140110325*(x^6) + 117243338250745827042750*(x^5) + 5347067236403128926250*(x^4) - 121635520168425838223750*(x^3) + 55169277218245963075625*(x^2) + 325960483701723984375*x + 478896702178203125 C26 = square-root of a root of the polynomial: 2401490025*(x^18) - 162143578575*(x^17) + 3793454245260*(x^16) - 24367641272235*(x^15) + 250834414975821*(x^14) - 7539411354891255*(x^13) + 21293793310723065*(x^12) - 170957118755746500*(x^11) + 324769522708993525*(x^10) + 42735435717384926405*(x^9) - 181420216179529415720*(x^8) - 1509077463183329406525*(x^7) + 11024093555524836315575*(x^6) - 19857197442632383582250*(x^5) + 3381744322967181342375*(x^4) + 3440956675621303501250*(x^3) + 526949218495941716250*(x^2) + 23020576362828140625*x + 1606926945496953125 C27 = square-root of a root of the polynomial: 625*(x^18) - 109375*(x^17) + 5087250*(x^16) - 114041750*(x^15) + 1391672575*(x^14) - 9330098950*(x^13) + 37035482555*(x^12) - 133328969170*(x^11) + 364722620405*(x^10) - 860489119090*(x^9) + 4226161154580*(x^8) - 11313403832550*(x^7) + 2513299557896*(x^6) + 18287568672215*(x^5) + 3621605574255*(x^4) - 28772055773075*(x^3) + 18364152934325*(x^2) - 7291025965625*x + 2476637010125 C28 = square-root of a root of the polynomial: 2401490025*(x^18) - 31887553500*(x^17) + 219654581760*(x^16) + 1875030595470*(x^15) - 50003655652044*(x^14) + 303094301296545*(x^13) + 62497896465825*(x^12) - 18493845226405620*(x^11) + 121622420944849750*(x^10) - 368972507060802765*(x^9) + 834102235197182930*(x^8) - 1476373433552746925*(x^7) + 1859684846089664800*(x^6) - 1335400149588130500*(x^5) + 334710739885699375*(x^4) + 40804785135043125*(x^3) + 3620254544847500*(x^2) - 321910697609375*x + 15332193828125 C29 = square-root of a root of the polynomial: 625*(x^18) - 4375*(x^17) + 38500*(x^16) - 413375*(x^15) + 2013825*(x^14) - 6848475*(x^13) + 25239955*(x^12) - 43103170*(x^11) + 43535715*(x^10) - 240215235*(x^9) + 89271880*(x^8) - 88186515*(x^7) + 311650126*(x^6) - 95160940*(x^5) + 100868870*(x^4) - 100523400*(x^3) - 47751600*(x^2) + 6899125*x + 17955125 C30 = square-root of a root of the polynomial: 531441*(x^18) - 22497669*(x^17) + 333567801*(x^16) - 3558450204*(x^15) + 24943124286*(x^14) - 133667406090*(x^13) + 511006962330*(x^12) - 1474500108240*(x^11) + 3012646633515*(x^10) - 4101547657095*(x^9) + 3866946759855*(x^8) - 2670362528400*(x^7) + 1312168961650*(x^6) - 389235972250*(x^5) + 43395511750*(x^4) + 2713272500*(x^3) + 332088125*(x^2) + 296875*x + 78125 C31 = square-root of a root of the polynomial: 625*(x^18) - 30625*(x^17) - 94625*(x^16) - 3529750*(x^15) + 9481825*(x^14) - 45366200*(x^13) + 162068080*(x^12) - 304148970*(x^11) + 531448580*(x^10) - 272179585*(x^9) - 503782205*(x^8) + 135640075*(x^7) + 283796406*(x^6) + 23476850*(x^5) - 24535000*(x^4) - 3570675*(x^3) + 2061675*(x^2) - 118125*x + 10125 C32 = square-root of a root of the polynomial: 164025*(x^18) - 10935000*(x^17) - 6932790*(x^16) - 1699885845*(x^15) + 18223086861*(x^14) - 72207860805*(x^13) + 129218193585*(x^12) - 45038438070*(x^11) - 244948677335*(x^10) + 475658357335*(x^9) - 309256323470*(x^8) - 142079334425*(x^7) + 432240970700*(x^6) - 377882462500*(x^5) + 179080954250*(x^4) - 46307400000*(x^3) + 4896725625*(x^2) + 113484375*x + 6328125 V0 = ( C2, C3, C32) V1 = ( C2, -C3, -C32) V2 = ( -C2, -C3, C32) V3 = ( -C2, C3, -C32) V4 = ( C32, C2, C3) V5 = ( C32, -C2, -C3) V6 = (-C32, -C2, C3) V7 = (-C32, C2, -C3) V8 = ( C3, C32, C2) V9 = ( C3, -C32, -C2) V10 = ( -C3, -C32, C2) V11 = ( -C3, C32, -C2) V12 = ( C9, C0, C31) V13 = ( C9, -C0, -C31) V14 = ( -C9, -C0, C31) V15 = ( -C9, C0, -C31) V16 = ( C31, C9, C0) V17 = ( C31, -C9, -C0) V18 = (-C31, -C9, C0) V19 = (-C31, C9, -C0) V20 = ( C0, C31, C9) V21 = ( C0, -C31, -C9) V22 = ( -C0, -C31, C9) V23 = ( -C0, C31, -C9) V24 = ( 0.0, C11, C30) V25 = ( 0.0, C11, -C30) V26 = ( 0.0, -C11, C30) V27 = ( 0.0, -C11, -C30) V28 = ( C30, 0.0, C11) V29 = ( C30, 0.0, -C11) V30 = (-C30, 0.0, C11) V31 = (-C30, 0.0, -C11) V32 = ( C11, C30, 0.0) V33 = ( C11, -C30, 0.0) V34 = (-C11, C30, 0.0) V35 = (-C11, -C30, 0.0) V36 = ( C13, -C6, C29) V37 = ( C13, C6, -C29) V38 = (-C13, C6, C29) V39 = (-C13, -C6, -C29) V40 = ( C29, -C13, C6) V41 = ( C29, C13, -C6) V42 = (-C29, C13, C6) V43 = (-C29, -C13, -C6) V44 = ( C6, -C29, C13) V45 = ( C6, C29, -C13) V46 = ( -C6, C29, C13) V47 = ( -C6, -C29, -C13) V48 = ( C8, -C12, C28) V49 = ( C8, C12, -C28) V50 = ( -C8, C12, C28) V51 = ( -C8, -C12, -C28) V52 = ( C28, -C8, C12) V53 = ( C28, C8, -C12) V54 = (-C28, C8, C12) V55 = (-C28, -C8, -C12) V56 = ( C12, -C28, C8) V57 = ( C12, C28, -C8) V58 = (-C12, C28, C8) V59 = (-C12, -C28, -C8) V60 = ( C16, C7, C27) V61 = ( C16, -C7, -C27) V62 = (-C16, -C7, C27) V63 = (-C16, C7, -C27) V64 = ( C27, C16, C7) V65 = ( C27, -C16, -C7) V66 = (-C27, -C16, C7) V67 = (-C27, C16, -C7) V68 = ( C7, C27, C16) V69 = ( C7, -C27, -C16) V70 = ( -C7, -C27, C16) V71 = ( -C7, C27, -C16) V72 = ( C4, C17, C26) V73 = ( C4, -C17, -C26) V74 = ( -C4, -C17, C26) V75 = ( -C4, C17, -C26) V76 = ( C26, C4, C17) V77 = ( C26, -C4, -C17) V78 = (-C26, -C4, C17) V79 = (-C26, C4, -C17) V80 = ( C17, C26, C4) V81 = ( C17, -C26, -C4) V82 = (-C17, -C26, C4) V83 = (-C17, C26, -C4) V84 = ( C15, C14, C25) V85 = ( C15, -C14, -C25) V86 = (-C15, -C14, C25) V87 = (-C15, C14, -C25) V88 = ( C25, C15, C14) V89 = ( C25, -C15, -C14) V90 = (-C25, -C15, C14) V91 = (-C25, C15, -C14) V92 = ( C14, C25, C15) V93 = ( C14, -C25, -C15) V94 = (-C14, -C25, C15) V95 = (-C14, C25, -C15) V96 = ( C20, -C5, C24) V97 = ( C20, C5, -C24) V98 = (-C20, C5, C24) V99 = (-C20, -C5, -C24) V100 = ( C24, -C20, C5) V101 = ( C24, C20, -C5) V102 = (-C24, C20, C5) V103 = (-C24, -C20, -C5) V104 = ( C5, -C24, C20) V105 = ( C5, C24, -C20) V106 = ( -C5, C24, C20) V107 = ( -C5, -C24, -C20) V108 = ( C23, C1, C21) V109 = ( C23, -C1, -C21) V110 = (-C23, -C1, C21) V111 = (-C23, C1, -C21) V112 = ( C21, C23, C1) V113 = ( C21, -C23, -C1) V114 = (-C21, -C23, C1) V115 = (-C21, C23, -C1) V116 = ( C1, C21, C23) V117 = ( C1, -C21, -C23) V118 = ( -C1, -C21, C23) V119 = ( -C1, C21, -C23) V120 = ( C10, -C19, C22) V121 = ( C10, C19, -C22) V122 = (-C10, C19, C22) V123 = (-C10, -C19, -C22) V124 = ( C22, -C10, C19) V125 = ( C22, C10, -C19) V126 = (-C22, C10, C19) V127 = (-C22, -C10, -C19) V128 = ( C19, -C22, C10) V129 = ( C19, C22, -C10) V130 = (-C19, C22, C10) V131 = (-C19, -C22, -C10) V132 = ( C18, C18, C18) V133 = ( C18, C18, -C18) V134 = ( C18, -C18, C18) V135 = ( C18, -C18, -C18) V136 = (-C18, C18, C18) V137 = (-C18, C18, -C18) V138 = (-C18, -C18, C18) V139 = (-C18, -C18, -C18) Faces: { 24, 0, 12, 60, 84, 72 } { 24, 72, 116, 106, 122, 50 } { 24, 50, 38, 14, 2, 0 } { 25, 3, 15, 63, 87, 75 } { 25, 75, 119, 105, 121, 49 } { 25, 49, 37, 13, 1, 3 } { 26, 2, 14, 62, 86, 74 } { 26, 74, 118, 104, 120, 48 } { 26, 48, 36, 12, 0, 2 } { 27, 1, 13, 61, 85, 73 } { 27, 73, 117, 107, 123, 51 } { 27, 51, 39, 15, 3, 1 } { 28, 4, 16, 64, 88, 76 } { 28, 76, 108, 96, 124, 52 } { 28, 52, 40, 17, 5, 4 } { 29, 5, 17, 65, 89, 77 } { 29, 77, 109, 97, 125, 53 } { 29, 53, 41, 16, 4, 5 } { 30, 6, 18, 66, 90, 78 } { 30, 78, 110, 98, 126, 54 } { 30, 54, 42, 19, 7, 6 } { 31, 7, 19, 67, 91, 79 } { 31, 79, 111, 99, 127, 55 } { 31, 55, 43, 18, 6, 7 } { 32, 8, 20, 68, 92, 80 } { 32, 80, 112, 101, 129, 57 } { 32, 57, 45, 23, 11, 8 } { 33, 9, 21, 69, 93, 81 } { 33, 81, 113, 100, 128, 56 } { 33, 56, 44, 22, 10, 9 } { 34, 11, 23, 71, 95, 83 } { 34, 83, 115, 102, 130, 58 } { 34, 58, 46, 20, 8, 11 } { 35, 10, 22, 70, 94, 82 } { 35, 82, 114, 103, 131, 59 } { 35, 59, 47, 21, 9, 10 } { 132, 84, 60, 108, 76, 88 } { 132, 88, 64, 112, 80, 92 } { 132, 92, 68, 116, 72, 84 } { 133, 121, 105, 45, 57, 129 } { 133, 129, 101, 41, 53, 125 } { 133, 125, 97, 37, 49, 121 } { 134, 120, 104, 44, 56, 128 } { 134, 128, 100, 40, 52, 124 } { 134, 124, 96, 36, 48, 120 } { 135, 85, 61, 109, 77, 89 } { 135, 89, 65, 113, 81, 93 } { 135, 93, 69, 117, 73, 85 } { 136, 122, 106, 46, 58, 130 } { 136, 130, 102, 42, 54, 126 } { 136, 126, 98, 38, 50, 122 } { 137, 87, 63, 111, 79, 91 } { 137, 91, 67, 115, 83, 95 } { 137, 95, 71, 119, 75, 87 } { 138, 86, 62, 110, 78, 90 } { 138, 90, 66, 114, 82, 94 } { 138, 94, 70, 118, 74, 86 } { 139, 123, 107, 47, 59, 131 } { 139, 131, 103, 43, 55, 127 } { 139, 127, 99, 39, 51, 123 } { 12, 36, 96, 108, 60 } { 13, 37, 97, 109, 61 } { 14, 38, 98, 110, 62 } { 15, 39, 99, 111, 63 } { 16, 41, 101, 112, 64 } { 17, 40, 100, 113, 65 } { 18, 43, 103, 114, 66 } { 19, 42, 102, 115, 67 } { 20, 46, 106, 116, 68 } { 21, 47, 107, 117, 69 } { 22, 44, 104, 118, 70 } { 23, 45, 105, 119, 71 }