Biscribed Orthotruncated Propello Icosahedron with inradius = 1 C0 = 0.0805032416519812457171647857743 C1 = 0.0866498714482415562621725389243 C2 = 0.126578385406554672998580007477 C3 = 0.133524309336574217742529481169 C4 = 0.143719234179989727755025694344 C5 = 0.216906852645693445549714245826 C6 = 0.220705678776045158780000257072 C7 = 0.270297619586544400753605701821 C8 = 0.270459418321515802350377178199 C9 = 0.306075403062047413074838883894 C10 = 0.359766105010921735228523647581 C11 = 0.366066915076903220040510857126 C12 = 0.392725274510288969337011422818 C13 = 0.448589476571261009771479329194 C14 = 0.486344490417476408227103655058 C15 = 0.522982255707740858624553129719 C16 = 0.570875044905792358042869190843 C17 = 0.653397606400150147773837662910 C18 = 0.663184692831804771687388601017 C19 = 0.715946084050761513920936936022 C20 = 0.7188870961578054105250850310151 C21 = 0.743687934483786017404553386792 C22 = 0.765699823596232157491313857149 C23 = 0.797116840580139875528863357254 C24 = 0.852349695044473713753486396074 C25 = 0.852411405494379628267614512184 C26 = 0.930641149916714093271392838424 C27 = 0.932852936696454959470651181848 C28 = 0.986405502372277316271314114222 C29 = 1.01946452147705336781434852004 C0 = square-root of a root of the polynomial: 65536*(x^16) - 4825088*(x^15) + 122055424*(x^14) - 1451201952*(x^13) + 9842069761*(x^12) - 57652507835*(x^11) + 270763364420*(x^10) + 1103459874800*(x^9) - 23580020076650*(x^8) + 113423052854125*(x^7) - 69753383895375*(x^6) - 1982329941837500*(x^5) + 9842562706943125*(x^4) - 18016227247921875*(x^3) + 24837650361140625*(x^2) - 23966689932140625*x + 154284346265625 C1 = square-root of a root of the polynomial: 65536*(x^16) - 2080768*(x^15) - 2300416*(x^14) + 276278608*(x^13) - 1336490639*(x^12) - 1957656765*(x^11) + 253066482405*(x^10) - 394573886550*(x^9) - 14358110531850*(x^8) - 28841043242250*(x^7) - 30925308400875*(x^6) + 786966058653750*(x^5) + 8205924515670000*(x^4) - 39371990951615625*(x^3) + 85661476052568750*(x^2) - 64876183212234375*x + 482291011265625 C2 = square-root of a root of the polynomial: (x^16) - 48*(x^15) + 1414*(x^14) - 44159*(x^13) + 1022203*(x^12) - 17811014*(x^11) + 319627460*(x^10) - 5079963686*(x^9) + 53809284471*(x^8) - 355817162533*(x^7) + 1549848751951*(x^6) - 4976536934300*(x^5) + 12163254868246*(x^4) - 19547478766530*(x^3) + 19484674125660*(x^2) - 15714382247100*x + 246854954025 C3 = square-root of a root of the polynomial: 6561*(x^16) - 367416*(x^15) + 11465712*(x^14) - 267755625*(x^13) + 3198945798*(x^12) - 24866817075*(x^11) - 158118662169*(x^10) + 667541550828*(x^9) + 1764616761880*(x^8) - 10954971209084*(x^7) + 22432702086776*(x^6) - 34496013936973*(x^5) + 41992903430197*(x^4) - 27769882308588*(x^3) + 7773361762815*(x^2) - 683832711717*x + 9874198161 C4 = square-root of a root of the polynomial: (x^16) + 60*(x^15) + 1600*(x^14) + 16501*(x^13) - 76766*(x^12) - 4620425*(x^11) - 36723604*(x^10) + 25543108*(x^9) + 2008307196*(x^8) + 10914107111*(x^7) + 21384792457*(x^6) - 5240439257*(x^5) - 4871525105*(x^4) - 11971106184*(x^3) + 3750148206*(x^2) - 300075219*x + 4704561 C5 = square-root of a root of the polynomial: 65536*(x^16) - 6012928*(x^15) + 187713024*(x^14) - 2625424432*(x^13) + 19379019521*(x^12) - 108511066200*(x^11) + 670831164110*(x^10) - 5473995411950*(x^9) + 21615550640225*(x^8) - 43004184637875*(x^7) + 87458776421875*(x^6) - 2037476471020000*(x^5) - 3053756117470000*(x^4) + 13301928779046875*(x^3) + 20668173725290625*(x^2) - 2260034797406250*x + 59211101265625 C6 = square-root of a root of the polynomial: 65536*(x^16) - 1159168*(x^15) - 4153856*(x^14) - 78985792*(x^13) + 789104481*(x^12) - 2395278670*(x^11) + 19249184775*(x^10) - 242156524000*(x^9) + 1391532632425*(x^8) - 5424729254125*(x^7) + 20776591717125*(x^6) - 65536687094375*(x^5) + 153140163325625*(x^4) - 242830566153125*(x^3) + 206135744303125*(x^2) - 69520577953125*x + 2924527515625 C7 = square-root of a root of the polynomial: (x^16) - 180*(x^15) + 14014*(x^14) - 624143*(x^13) + 17658787*(x^12) - 333176009*(x^11) + 4299198356*(x^10) - 38554939835*(x^9) + 239779593438*(x^8) - 915570265507*(x^7) + 365331447394*(x^6) + 16584219440563*(x^5) - 65802277337630*(x^4) + 11082981902958*(x^3) + 410439869268300*(x^2) - 683528285652687*x + 47745764448561 C8 = square-root of a root of the polynomial: 65536*(x^16) - 4272128*(x^15) + 100683264*(x^14) - 965741632*(x^13) + 1440694881*(x^12) + 32173513710*(x^11) - 67834674865*(x^10) - 1985335503525*(x^9) + 11363751026675*(x^8) + 28866728605250*(x^7) - 432752410290250*(x^6) + 962981152406875*(x^5) + 3544469845144375*(x^4) - 22119435508300000*(x^3) + 39734116424846875*(x^2) - 20892807998890625*x + 1324223002515625 C9 = square-root of a root of the polynomial: 1638400*(x^16) - 49356800*(x^15) + 624136960*(x^14) - 4291440800*(x^13) + 13188099681*(x^12) + 39885515784*(x^11) - 489112892574*(x^10) + 831935616267*(x^9) + 8762689328335*(x^8) - 77701689809196*(x^7) + 371426665025967*(x^6) - 1150788825050742*(x^5) + 2251205314513329*(x^4) - 2692316346672203*(x^3) + 1691337467036197*(x^2) - 401134834593125*x + 24783660065761 C10 = square-root of a root of the polynomial: 6561*(x^16) - 765450*(x^15) + 35825247*(x^14) - 870957198*(x^13) + 11863612593*(x^12) - 94166710677*(x^11) + 525370273038*(x^10) - 3144321915840*(x^9) + 15538101268444*(x^8) - 41925088007237*(x^7) + 139835112169763*(x^6) - 250670872008371*(x^5) - 149781775689362*(x^4) - 148494643619104*(x^3) + 29384034868076*(x^2) - 954605855023*x + 3789510481 C11 = square-root of a root of the polynomial: 6561*(x^16) + 380538*(x^15) + 7889967*(x^14) + 43598817*(x^13) - 400694121*(x^12) - 1165965813*(x^11) + 25510262769*(x^10) - 193423661187*(x^9) + 835023405889*(x^8) - 2334122468419*(x^7) + 4350060799652*(x^6) - 5333848393510*(x^5) + 4108537165777*(x^4) - 1757718358634*(x^3) + 328273360271*(x^2) - 22164838757*x + 187169761 C12 = square-root of a root of the polynomial: 1638400*(x^16) - 128614400*(x^15) + 3569052160*(x^14) - 49561343600*(x^13) + 391481216601*(x^12) - 1848882815631*(x^11) + 5644523244846*(x^10) - 23729188492923*(x^9) + 170706638871190*(x^8) - 440695051787391*(x^7) - 511916725490343*(x^6) - 3407328739623462*(x^5) + 1537958248912254*(x^4) - 144938097709118*(x^3) - 1296496318208*(x^2) - 16682193215*x + 26946481 C13 = square-root of a root of the polynomial: 6561*(x^16) - 253692*(x^15) + 6963408*(x^14) - 133752303*(x^13) + 1563464430*(x^12) - 16043022945*(x^11) + 48456460944*(x^10) + 504388796760*(x^9) - 2986993491284*(x^8) + 970423984587*(x^7) + 23948606539137*(x^6) - 67220835336585*(x^5) + 87842471328719*(x^4) - 50317089159168*(x^3) + 13686189052770*(x^2) - 1751206987359*x + 84750272161 C14 = square-root of a root of the polynomial: 6561*(x^16) - 30618*(x^15) - 2311659*(x^14) - 38036061*(x^13) + 511625322*(x^12) + 4231694610*(x^11) + 49313223567*(x^10) - 1336106265741*(x^9) + 7425087482884*(x^8) - 32339349391838*(x^7) + 150392761883714*(x^6) - 188995115811977*(x^5) - 415583507350631*(x^4) - 233293472688562*(x^3) + 607617549559067*(x^2) - 1175822383724098*x + 248626954232281 C15 = square-root of a root of the polynomial: 1638400*(x^16) - 28672000*(x^15) + 61749760*(x^14) + 694905360*(x^13) - 3064792599*(x^12) + 3079629924*(x^11) - 2271462024*(x^10) + 110320171237*(x^9) + 2528896303410*(x^8) - 16229412732841*(x^7) + 37878375079272*(x^6) - 49937070309087*(x^5) + 20558750454444*(x^4) + 42236443953312*(x^3) - 24480112932728*(x^2) - 23107390836200*x + 7234534504681 C16 = square-root of a root of the polynomial: 6561*(x^16) - 656100*(x^15) + 29985228*(x^14) - 844951581*(x^13) + 16260155460*(x^12) - 223255918116*(x^11) + 2197861181379*(x^10) - 15228987009189*(x^9) + 71289219623158*(x^8) - 212002756659802*(x^7) + 370150725296009*(x^6) - 352751414445028*(x^5) + 190371867186067*(x^4) - 59547398643395*(x^3) + 11834194339823*(x^2) - 2069684426354*x + 258908986561 C17 = square-root of a root of the polynomial: 6561*(x^16) - 83106*(x^15) - 1191915*(x^14) - 178362*(x^13) + 374756544*(x^12) - 633535155*(x^11) - 33702356133*(x^10) - 22321598202*(x^9) + 3902301966781*(x^8) - 25323868496730*(x^7) + 44397099452919*(x^6) + 54700838240670*(x^5) + 69111655699730*(x^4) - 1712039375358177*(x^3) + 3780111111252078*(x^2) - 2459876693694243*x + 491141877681841 C18 = square-root of a root of the polynomial: 1638400*(x^16) - 6860800*(x^15) + 57448960*(x^14) + 166028160*(x^13) - 6275339559*(x^12) + 21697666329*(x^11) + 50931226116*(x^10) - 452526733943*(x^9) + 1394358127335*(x^8) - 3758442247411*(x^7) + 7001329656357*(x^6) - 6941609604132*(x^5) + 6012210009954*(x^4) - 6462735561198*(x^3) + 3904767323497*(x^2) - 966993265925*x + 68670726601 C19 = square-root of a root of the polynomial: 1638400*(x^16) - 92672000*(x^15) + 2306632960*(x^14) - 34438875280*(x^13) + 352042692161*(x^12) - 2637188096469*(x^11) + 14992573445451*(x^10) - 65714611445472*(x^9) + 222559003316705*(x^8) - 576359510662659*(x^7) + 1114351752246132*(x^6) - 1544238960724563*(x^5) + 1440201761584679*(x^4) - 837355975330082*(x^3) + 279539628141547*(x^2) - 47577211919350*x + 3163983580081 C20 = square-root of a root of the polynomial: 6561*(x^16) + 8748*(x^15) - 1662120*(x^14) - 19146942*(x^13) + 240334290*(x^12) + 2015719128*(x^11) + 3730238559*(x^10) - 273152190222*(x^9) + 223805430733*(x^8) + 6201942668215*(x^7) + 593233487486*(x^6) - 54084063979004*(x^5) - 58565987121743*(x^4) - 71151390104668*(x^3) + 39313967049824*(x^2) + 8930824079360*x + 803991982336 C21 = square-root of a root of the polynomial: 1638400*(x^16) - 65024000*(x^15) + 827804160*(x^14) - 4618088320*(x^13) + 16492779961*(x^12) - 69072768506*(x^11) + 279624454041*(x^10) - 699728005468*(x^9) + 1185718021410*(x^8) - 2145668575036*(x^7) + 3222384839472*(x^6) - 1248219684857*(x^5) - 2115793595981*(x^4) + 1237693134167*(x^3) + 312030021687*(x^2) - 207791614430*x + 6736962241 C22 = square-root of a root of the polynomial: 1638400*(x^16) - 52531200*(x^15) + 628092160*(x^14) - 3919071760*(x^13) + 17593649281*(x^12) - 70373162389*(x^11) + 221604178241*(x^10) - 504887242192*(x^9) + 757553887950*(x^8) - 1091255505314*(x^7) - 1025536628468*(x^6) + 6658794872342*(x^5) - 8070040490651*(x^4) - 5518375741557*(x^3) + 32181587053947*(x^2) - 18197945440290*x + 1271889983961 C23 = square-root of a root of the polynomial: 6561*(x^16) - 555498*(x^15) + 20958021*(x^14) - 478630539*(x^13) + 7501046958*(x^12) - 85987560231*(x^11) + 750188424978*(x^10) - 5090039419302*(x^9) + 26934936794074*(x^8) - 110287943834555*(x^7) + 348317594379278*(x^6) - 837265222839032*(x^5) + 1473865190471338*(x^4) - 1817573884289788*(x^3) + 1317520359771032*(x^2) - 425080486987495*x + 31963091195281 C24 = square-root of a root of the polynomial: 1638400*(x^16) - 74240000*(x^15) + 1229026560*(x^14) - 10234548560*(x^13) + 53627997721*(x^12) - 207310437214*(x^11) + 529443520301*(x^10) - 255179160767*(x^9) - 1359070028120*(x^8) + 6759781657071*(x^7) - 26716817902988*(x^6) - 127348139194688*(x^5) - 131122341785231*(x^4) + 39502411527108*(x^3) + 111121656825312*(x^2) - 11633240459520*x + 264426322176 C25 = square-root of a root of the polynomial: 6561*(x^16) - 577368*(x^15) + 22317606*(x^14) - 506002059*(x^13) + 7560291573*(x^12) - 79046588151*(x^11) + 597293605908*(x^10) - 3308575658772*(x^9) + 13430342773339*(x^8) - 39358593069020*(x^7) + 80680681541438*(x^6) - 109968239570852*(x^5) + 93643938820063*(x^4) - 45168538329043*(x^3) + 3840644181272*(x^2) + 3526961109965*x + 363499262281 C26 = square-root of a root of the polynomial: 6561*(x^16) - 39366*(x^15) - 223803*(x^14) + 359883*(x^13) + 7114554*(x^12) + 6280956*(x^11) - 63868797*(x^10) - 199529715*(x^9) + 424465558*(x^8) + 1879887421*(x^7) - 41879101*(x^6) - 11448858905*(x^5) - 6294486677*(x^4) + 15778524392*(x^3) + 4585802870*(x^2) - 8003778571*x + 1625783041 C27 = square-root of a root of the polynomial: 1638400*(x^16) - 52121600*(x^15) + 531068160*(x^14) - 1349045200*(x^13) - 6040362359*(x^12) - 5620382639*(x^11) + 387729331416*(x^10) - 1486853845567*(x^9) + 1479105055935*(x^8) - 533751114019*(x^7) + 6418668155517*(x^6) - 9624039362408*(x^5) + 797325010474*(x^4) + 1569024336698*(x^3) + 3766766106657*(x^2) - 4279980414365*x + 1442883842401 C28 = square-root of a root of the polynomial: 1638400*(x^16) - 39731200*(x^15) - 101859840*(x^14) + 2087870400*(x^13) + 7635522481*(x^12) - 14665164969*(x^11) - 128000312849*(x^10) - 409130300017*(x^9) - 326686786960*(x^8) + 364469301191*(x^7) + 614061446032*(x^6) + 91040183697*(x^5) - 192880507106*(x^4) - 60127838847*(x^3) + 11609537157*(x^2) - 549159750*x + 5948721 C29 = square-root of a root of the polynomial: 6561*(x^16) - 157464*(x^15) - 387828*(x^14) + 2249451*(x^13) + 14714136*(x^12) - 73155663*(x^11) + 147474081*(x^10) - 81972579*(x^9) - 232857347*(x^8) + 108638402*(x^7) + 930858107*(x^6) - 1429786577*(x^5) + 690960001*(x^4) - 284726160*(x^3) + 548271360*(x^2) - 472780800*x + 132710400 V0 = ( C2, C3, C29) V1 = ( C2, -C3, -C29) V2 = ( -C2, -C3, C29) V3 = ( -C2, C3, -C29) V4 = ( C29, C2, C3) V5 = ( C29, -C2, -C3) V6 = (-C29, -C2, C3) V7 = (-C29, C2, -C3) V8 = ( C3, C29, C2) V9 = ( C3, -C29, -C2) V10 = ( -C3, -C29, C2) V11 = ( -C3, C29, -C2) V12 = ( C9, C0, C28) V13 = ( C9, -C0, -C28) V14 = ( -C9, -C0, C28) V15 = ( -C9, C0, -C28) V16 = ( C28, C9, C0) V17 = ( C28, -C9, -C0) V18 = (-C28, -C9, C0) V19 = (-C28, C9, -C0) V20 = ( C0, C28, C9) V21 = ( C0, -C28, -C9) V22 = ( -C0, -C28, C9) V23 = ( -C0, C28, -C9) V24 = ( C7, -C11, C26) V25 = ( C7, C11, -C26) V26 = ( -C7, C11, C26) V27 = ( -C7, -C11, -C26) V28 = ( C26, -C7, C11) V29 = ( C26, C7, -C11) V30 = (-C26, C7, C11) V31 = (-C26, -C7, -C11) V32 = ( C11, -C26, C7) V33 = ( C11, C26, -C7) V34 = (-C11, C26, C7) V35 = (-C11, -C26, -C7) V36 = ( C12, -C6, C27) V37 = ( C12, C6, -C27) V38 = (-C12, C6, C27) V39 = (-C12, -C6, -C27) V40 = ( C27, -C12, C6) V41 = ( C27, C12, -C6) V42 = (-C27, C12, C6) V43 = (-C27, -C12, -C6) V44 = ( C6, -C27, C12) V45 = ( C6, C27, -C12) V46 = ( -C6, C27, C12) V47 = ( -C6, -C27, -C12) V48 = ( C4, C16, C25) V49 = ( C4, -C16, -C25) V50 = ( -C4, -C16, C25) V51 = ( -C4, C16, -C25) V52 = ( C25, C4, C16) V53 = ( C25, -C4, -C16) V54 = (-C25, -C4, C16) V55 = (-C25, C4, -C16) V56 = ( C16, C25, C4) V57 = ( C16, -C25, -C4) V58 = (-C16, -C25, C4) V59 = (-C16, C25, -C4) V60 = ( C15, C8, C24) V61 = ( C15, -C8, -C24) V62 = (-C15, -C8, C24) V63 = (-C15, C8, -C24) V64 = ( C24, C15, C8) V65 = ( C24, -C15, -C8) V66 = (-C24, -C15, C8) V67 = (-C24, C15, -C8) V68 = ( C8, C24, C15) V69 = ( C8, -C24, -C15) V70 = ( -C8, -C24, C15) V71 = ( -C8, C24, -C15) V72 = ( C18, -C5, C22) V73 = ( C18, C5, -C22) V74 = (-C18, C5, C22) V75 = (-C18, -C5, -C22) V76 = ( C22, -C18, C5) V77 = ( C22, C18, -C5) V78 = (-C22, C18, C5) V79 = (-C22, -C18, -C5) V80 = ( C5, -C22, C18) V81 = ( C5, C22, -C18) V82 = ( -C5, C22, C18) V83 = ( -C5, -C22, -C18) V84 = ( C14, C13, C23) V85 = ( C14, -C13, -C23) V86 = (-C14, -C13, C23) V87 = (-C14, C13, -C23) V88 = ( C23, C14, C13) V89 = ( C23, -C14, -C13) V90 = (-C23, -C14, C13) V91 = (-C23, C14, -C13) V92 = ( C13, C23, C14) V93 = ( C13, -C23, -C14) V94 = (-C13, -C23, C14) V95 = (-C13, C23, -C14) V96 = ( C21, C1, C19) V97 = ( C21, -C1, -C19) V98 = (-C21, -C1, C19) V99 = (-C21, C1, -C19) V100 = ( C19, C21, C1) V101 = ( C19, -C21, -C1) V102 = (-C19, -C21, C1) V103 = (-C19, C21, -C1) V104 = ( C1, C19, C21) V105 = ( C1, -C19, -C21) V106 = ( -C1, -C19, C21) V107 = ( -C1, C19, -C21) V108 = ( C10, -C17, C20) V109 = ( C10, C17, -C20) V110 = (-C10, C17, C20) V111 = (-C10, -C17, -C20) V112 = ( C20, -C10, C17) V113 = ( C20, C10, -C17) V114 = (-C20, C10, C17) V115 = (-C20, -C10, -C17) V116 = ( C17, -C20, C10) V117 = ( C17, C20, -C10) V118 = (-C17, C20, C10) V119 = (-C17, -C20, -C10) Faces: { 12, 36, 72, 96, 60 } { 13, 37, 73, 97, 61 } { 14, 38, 74, 98, 62 } { 15, 39, 75, 99, 63 } { 16, 41, 77, 100, 64 } { 17, 40, 76, 101, 65 } { 18, 43, 79, 102, 66 } { 19, 42, 78, 103, 67 } { 20, 46, 82, 104, 68 } { 21, 47, 83, 105, 69 } { 22, 44, 80, 106, 70 } { 23, 45, 81, 107, 71 } { 0, 2, 24, 36, 12 } { 1, 3, 25, 37, 13 } { 2, 0, 26, 38, 14 } { 3, 1, 27, 39, 15 } { 4, 5, 29, 41, 16 } { 5, 4, 28, 40, 17 } { 6, 7, 31, 43, 18 } { 7, 6, 30, 42, 19 } { 8, 11, 34, 46, 20 } { 9, 10, 35, 47, 21 } { 10, 9, 32, 44, 22 } { 11, 8, 33, 45, 23 } { 12, 60, 84, 48, 0 } { 13, 61, 85, 49, 1 } { 14, 62, 86, 50, 2 } { 15, 63, 87, 51, 3 } { 16, 64, 88, 52, 4 } { 17, 65, 89, 53, 5 } { 18, 66, 90, 54, 6 } { 19, 67, 91, 55, 7 } { 20, 68, 92, 56, 8 } { 21, 69, 93, 57, 9 } { 22, 70, 94, 58, 10 } { 23, 71, 95, 59, 11 } { 24, 50, 106, 80, 108 } { 25, 51, 107, 81, 109 } { 26, 48, 104, 82, 110 } { 27, 49, 105, 83, 111 } { 28, 52, 96, 72, 112 } { 29, 53, 97, 73, 113 } { 30, 54, 98, 74, 114 } { 31, 55, 99, 75, 115 } { 32, 57, 101, 76, 116 } { 33, 56, 100, 77, 117 } { 34, 59, 103, 78, 118 } { 35, 58, 102, 79, 119 } { 36, 24, 108, 112, 72 } { 37, 25, 109, 113, 73 } { 38, 26, 110, 114, 74 } { 39, 27, 111, 115, 75 } { 40, 28, 112, 116, 76 } { 41, 29, 113, 117, 77 } { 42, 30, 114, 118, 78 } { 43, 31, 115, 119, 79 } { 44, 32, 116, 108, 80 } { 45, 33, 117, 109, 81 } { 46, 34, 118, 110, 82 } { 47, 35, 119, 111, 83 } { 48, 84, 92, 68, 104 } { 49, 85, 93, 69, 105 } { 50, 86, 94, 70, 106 } { 51, 87, 95, 71, 107 } { 52, 88, 84, 60, 96 } { 53, 89, 85, 61, 97 } { 54, 90, 86, 62, 98 } { 55, 91, 87, 63, 99 } { 56, 92, 88, 64, 100 } { 57, 93, 89, 65, 101 } { 58, 94, 90, 66, 102 } { 59, 95, 91, 67, 103 } { 0, 48, 26 } { 1, 49, 27 } { 2, 50, 24 } { 3, 51, 25 } { 4, 52, 28 } { 5, 53, 29 } { 6, 54, 30 } { 7, 55, 31 } { 8, 56, 33 } { 9, 57, 32 } { 10, 58, 35 } { 11, 59, 34 } { 84, 88, 92 } { 85, 89, 93 } { 86, 90, 94 } { 87, 91, 95 } { 108, 116, 112 } { 109, 117, 113 } { 110, 118, 114 } { 111, 119, 115 }