Geodesic Icosahedron Pattern 6 [3,1] C0 = 0.0490292290809816813559980717806 C1 = 0.0811537993242050291283007970286 C2 = 0.0937079220984928965528680897233 C3 = 0.147092881929040214212477146562 C4 = 0.1698474801652096000762210461251 C5 = 0.196122111010021895568475218343 C6 = 0.225017527721244880788439023943 C7 = 0.232776402294693907345025983908 C8 = 0.281133694724888181438483705599 C9 = 0.282932208593240862452296121099 C10 = 0.374841616823381077991351795322 C11 = 0.407848762629571865256962548230 C12 = 0.421911877739872952636111616023 C13 = 0.470941106820854633992109687803 C14 = 0.487179721724804996395624028434 C15 = 0.506151222446133062226922729541 C16 = 0.512820278275195003604375971566 C17 = 0.529418476297024915608418394146 C18 = 0.592151237370428134743037451770 C19 = 0.657773825416621940443647916421 C20 = 0.6876602757424000037429180280249 C21 = 0.708942389285216899172851189909 C22 = 0.737816082040946958850188165216 C23 = 0.738927624740826969571948713449 C24 = 0.739244119299468348955514598332 C25 = 0.831524004139439855403056254939 C26 = 0.856617088920766884656713812714996 C27 = 0.878789869450426499249072236034 C28 = 0.909091599464677949031735644457 C29 = 0.912677803463644884531357051967 C30 = 0.970592484335640866195214149124 C0 = 0.0490292290809816813559980717806 = root of the polynomial: 5*(x^16) - 45*(x^15) + 135*(x^14) - 810*(x^13) - 456*(x^12) + 17001*(x^11) + 46980*(x^10) + 88389*(x^9) + 110658*(x^8) + 49509*(x^7) + 14644*(x^6) - 10485*(x^5) - 3695*(x^4) + 207*(x^3) - 49*(x^2) - 18*x + 1 C1 = 0.0811537993242050291283007970286 = root of the polynomial: 17191*(x^16) + 28*(x^15) + 91368*(x^14) - 541848*(x^13) + 1052094*(x^12) - 677772*(x^11) + 801511*(x^10) - 1588728*(x^9) + 1610988*(x^8) - 813236*(x^7) + 186958*(x^6) + 11785*(x^5) - 13190*(x^4) + 1690*(x^3) + 57*(x^2) - 22*x + 1 C2 = 0.0937079220984928965528680897233 = root of the polynomial: 17191*(x^16) + 34171*(x^15) + 182636*(x^14) + 339857*(x^13) - 685086*(x^12) - 1427995*(x^11) - 1111711*(x^10) - 440755*(x^9) + 3322816*(x^8) + 3058831*(x^7) + 1916925*(x^6) - 448619*(x^5) - 159695*(x^4) + 38753*(x^3) + 2536*(x^2) - 1015*x + 55 C3 = 0.147092881929040214212477146562 = root of the polynomial: 25*(x^16) - 75*(x^15) + 285*(x^14) - 2350*(x^13) + 12616*(x^12) + 52690*(x^11) + 43327*(x^10) - 64458*(x^9) - 125582*(x^8) - 61146*(x^7) - 990*(x^6) + 4989*(x^5) - 540*(x^4) - 306*(x^3) + 123*(x^2) - 18*x + 1 C4 = 0.1698474801652096000762210461251 = root of the polynomial: 25*(x^16) + 450*(x^15) + 3885*(x^14) + 21950*(x^13) + 75406*(x^12) + 116124*(x^11) + 107*(x^10) - 176101*(x^9) - 95920*(x^8) + 83029*(x^7) + 57795*(x^6) - 7104*(x^5) - 12900*(x^4) - 6031*(x^3) + 4914*(x^2) - 925*x + 55 C5 = 0.196122111010021895568475218343 = root of the polynomial: 25*(x^16) - 300*(x^15) + 960*(x^14) + 4670*(x^13) - 23249*(x^12) - 47606*(x^11) + 259516*(x^10) + 839475*(x^9) + 333967*(x^8) - 1768257*(x^7) - 2940354*(x^6) - 1580244*(x^5) + 62091*(x^4) + 281313*(x^3) + 5829*(x^2) - 24570*x + 3025 C6 = 0.225017527721244880788439023943 = root of the polynomial: 17191*(x^16) + 49875*(x^15) - 27864*(x^14) - 132405*(x^13) + 372400*(x^12) - 852321*(x^11) + 365142*(x^10) + 97314*(x^9) + 1336239*(x^8) - 1730957*(x^7) + 1309140*(x^6) - 264251*(x^5) - 189628*(x^4) + 72195*(x^3) + 2267*(x^2) - 1547*x - 79 C7 = 0.232776402294693907345025983908 = root of the polynomial: 17191*(x^16) + 107626*(x^15) + 357650*(x^14) + 428062*(x^13) - 212916*(x^12) - 708789*(x^11) + 790702*(x^10) + 1516443*(x^9) - 23017*(x^8) - 832152*(x^7) - 76474*(x^6) + 232150*(x^5) + 2979*(x^4) - 31490*(x^3) + 5330*(x^2) + 25*x - 25 C8 = 0.281133694724888181438483705599 = root of the polynomial: 85955*(x^16) - 356000*(x^15) + 188575*(x^14) + 1390525*(x^13) + 988989*(x^12) + 1316713*(x^11) + 5128506*(x^10) + 5941543*(x^9) + 1756019*(x^8) - 1194581*(x^7) - 948972*(x^6) - 60303*(x^5) + 69593*(x^4) - 3647*(x^3) + 2391*(x^2) - 30*x + 55 C9 = 0.282932208593240862452296121099 = root of the polynomial: 17191*(x^16) + 123302*(x^15) + 342570*(x^14) + 546308*(x^13) + 733039*(x^12) + 687170*(x^11) + 846588*(x^10) + 136637*(x^9) - 1251847*(x^8) - 130538*(x^7) + 606837*(x^6) - 196995*(x^5) + 39854*(x^4) - 15290*(x^3) + 2870*(x^2) - 102*x + 1 C10 = 0.374841616823381077991351795322 = root of the polynomial: 85955*(x^16) - 185145*(x^15) - 752670*(x^14) + 1639725*(x^13) + 8075199*(x^12) + 1780038*(x^11) - 27728778*(x^10) - 31637481*(x^9) + 26614482*(x^8) + 61165779*(x^7) + 8313064*(x^6) - 34232205*(x^5) - 9934079*(x^4) + 9077844*(x^3) + 1459736*(x^2) - 1310250*x + 166375 C11 = 0.407848762629571865256962548230 = root of the polynomial: 25*(x^16) + 75*(x^15) + 160*(x^14) + 2275*(x^13) + 10511*(x^12) - 31546*(x^11) - 412*(x^10) + 38153*(x^9) - 1544*(x^8) - 28716*(x^7) + 4672*(x^6) + 8196*(x^5) + 132*(x^4) - 2150*(x^3) - 117*(x^2) + 420*x - 79 C12 = 0.421911877739872952636111616023 = root of the polynomial: 25*(x^16) + 500*(x^15) + 4610*(x^14) + 23250*(x^13) + 65466*(x^12) + 89062*(x^11) + 43833*(x^10) - 18460*(x^9) - 31703*(x^8) - 12749*(x^7) + 4939*(x^6) + 7242*(x^5) - 309*(x^4) - 1740*(x^3) + 290*(x^2) + 100*x - 25 C13 = 0.470941106820854633992109687803 = root of the polynomial: 25*(x^16) + 275*(x^15) + 1685*(x^14) + 9570*(x^13) + 58986*(x^12) + 250216*(x^11) + 628401*(x^10) + 913553*(x^9) + 677299*(x^8) + 19831*(x^7) - 417773*(x^6) - 313275*(x^5) - 11091*(x^4) + 93903*(x^3) + 33131*(x^2) - 7730*x - 4345 C14 = 0.487179721724804996395624028434 = root of the polynomial: 25*(x^16) - 600*(x^15) + 6460*(x^14) - 41690*(x^13) + 173906*(x^12) - 460684*(x^11) + 759863*(x^10) - 754207*(x^9) + 430807*(x^8) - 210093*(x^7) + 281539*(x^6) - 343695*(x^5) + 207645*(x^4) - 41975*(x^3) - 15300*(x^2) + 9375*x - 1375 C15 = 0.506151222446133062226922729541 = root of the polynomial: 85955*(x^16) - 106625*(x^15) + 392655*(x^14) - 131625*(x^13) - 4156071*(x^12) + 2909547*(x^11) + 11856803*(x^10) - 9287182*(x^9) - 15360993*(x^8) + 12962414*(x^7) + 9492116*(x^6) - 8881964*(x^5) - 2328130*(x^4) + 2967847*(x^3) - 40855*(x^2) - 394132*x + 75931 C16 = 0.512820278275195003604375971566 = root of the polynomial: 25*(x^16) + 200*(x^15) + 460*(x^14) + 250*(x^13) - 7704*(x^12) - 16008*(x^11) + 111655*(x^10) - 173693*(x^9) + 112489*(x^8) - 31983*(x^7) + 1002*(x^6) + 2994*(x^5) - 1002*(x^4) - 104*(x^3) + 22*(x^2) + 21*x + 1 C17 = 0.529418476297024915608418394146 = root of the polynomial: 865792179505*(x^16) + 5367827472210*(x^15) + 11763330223230*(x^14) + 8167945641320*(x^13) - 6858206300916*(x^12) - 13854868314616*(x^11) - 5677018073210*(x^10) + 4196165831006*(x^9) + 6759677086751*(x^8) + 2054847676516*(x^7) - 2871411963602*(x^6) - 1778812905057*(x^5) + 737943351448*(x^4) + 495309547459*(x^3) - 139563048252*(x^2) - 52852051400*x + 15172699489 C18 = 0.592151237370428134743037451770 = root of the polynomial: 25*(x^16) - 475*(x^15) + 4285*(x^14) - 26390*(x^13) + 134271*(x^12) - 541851*(x^11) + 1582543*(x^10) - 3219743*(x^9) + 4533928*(x^8) - 4419177*(x^7) + 2976627*(x^6) - 1383312*(x^5) + 446235*(x^4) - 102011*(x^3) + 16546*(x^2) - 1635*x + 55 C19 = 0.657773825416621940443647916421 = root of the polynomial: 85955*(x^16) + 431365*(x^15) + 1127525*(x^14) + 2702245*(x^13) + 3376094*(x^12) - 2708928*(x^11) - 9755447*(x^10) - 3172980*(x^9) + 8161176*(x^8) + 5978362*(x^7) - 2980684*(x^6) - 3809603*(x^5) + 605314*(x^4) + 1238503*(x^3) - 181978*(x^2) - 176819*x + 45419 C20 = 0.6876602757424000037429180280249 = root of the polynomial: 85955*(x^16) - 877945*(x^15) + 3456680*(x^14) - 6938100*(x^13) + 8976234*(x^12) - 11093818*(x^11) + 14094239*(x^10) - 11898879*(x^9) + 4345826*(x^8) - 370333*(x^7) + 1564515*(x^6) - 2591479*(x^5) + 2075197*(x^4) - 1277948*(x^3) + 598558*(x^2) - 165726*x + 19069 C21 = 0.708942389285216899172851189909 = root of the polynomial: 25*(x^16) - 100*(x^15) + 115*(x^14) - 190*(x^13) + 831*(x^12) + 8471*(x^11) - 1603*(x^10) - 16409*(x^9) + 3290*(x^8) - 14900*(x^7) - 17802*(x^6) + 35998*(x^5) + 28893*(x^4) - 28087*(x^3) - 11150*(x^2) + 8334*x - 61 C22 = 0.737816082040946958850188165216 = root of the polynomial: 85955*(x^16) - 799565*(x^15) + 3470330*(x^14) - 8103205*(x^13) + 9381364*(x^12) + 49178*(x^11) - 16133199*(x^10) + 21664774*(x^9) - 8040722*(x^8) - 11816345*(x^7) + 20762737*(x^6) - 16563642*(x^5) + 8207524*(x^4) - 2638825*(x^3) + 532915*(x^2) - 61050*x + 3025 C23 = 0.738927624740826969571948713449 = root of the polynomial: 85955*(x^16) + 431505*(x^15) + 662275*(x^14) - 185845*(x^13) - 1738371*(x^12) - 1751540*(x^11) + 930474*(x^10) + 3178192*(x^9) + 866668*(x^8) - 2510140*(x^7) - 1311013*(x^6) + 1046860*(x^5) + 685221*(x^4) - 201356*(x^3) - 183171*(x^2) + 8296*x + 22279 C24 = 0.739244119299468348955514598332 = root of the polynomial: 25*(x^16) - 550*(x^15) + 5515*(x^14) - 32680*(x^13) + 125796*(x^12) - 328381*(x^11) + 594197*(x^10) - 749135*(x^9) + 648122*(x^8) - 378005*(x^7) + 175113*(x^6) - 116795*(x^5) + 80211*(x^4) - 11986*(x^3) - 23615*(x^2) + 14814*x - 2671 C25 = 0.831524004139439855403056254939 = root of the polynomial: 85955*(x^16) - 628710*(x^15) + 1766455*(x^14) - 1317155*(x^13) - 3627076*(x^12) + 8380358*(x^11) - 2773132*(x^10) - 12063300*(x^9) + 23817257*(x^8) - 27336847*(x^7) + 26110574*(x^6) - 21448577*(x^5) + 13609129*(x^4) - 6037594*(x^3) + 1723505*(x^2) - 280020*x + 19219 C26 = 0.856617088920766884656713812714996 = root of the polynomial: 865792179505*(x^16) - 8509830929945*(x^15) + 39870451154600*(x^14) - 120770682109285*(x^13) + 270839428308189*(x^12) - 483365363583063*(x^11) + 707222057195375*(x^10) - 848820621744518*(x^9) + 824886599452201*(x^8) - 638717257518077*(x^7) + 387779890123692*(x^6) - 181351691146649*(x^5) + 63822091673918*(x^4) - 16317431607013*(x^3) + 2857882043512*(x^2) - 306486102560*x + 15172699489 C27 = 0.878789869450426499249072236034 = root of the polynomial: 25*(x^16) + 350*(x^15) + 2315*(x^14) + 9000*(x^13) + 21176*(x^12) + 26045*(x^11) - 682*(x^10) - 52555*(x^9) - 66708*(x^8) - 7879*(x^7) + 50322*(x^6) + 37749*(x^5) + 3056*(x^4) - 9197*(x^3) - 8347*(x^2) - 1566*x - 79 C28 = 0.909091599464677949031735644457 = root of the polynomial: 25*(x^16) - 100*(x^15) + 290*(x^14) - 90*(x^13) + 1421*(x^12) - 7327*(x^11) + 10559*(x^10) - 10066*(x^9) + 22122*(x^8) - 37120*(x^7) + 28083*(x^6) - 4812*(x^5) - 7789*(x^4) + 7165*(x^3) - 2785*(x^2) + 450*x - 25 C29 = 0.912677803463644884531357051967 = root of the polynomial: 85955*(x^16) - 628570*(x^15) + 2442180*(x^14) - 6578070*(x^13) + 13327534*(x^12) - 21097234*(x^11) + 26682287*(x^10) - 27229899*(x^9) + 22497007*(x^8) - 15125843*(x^7) + 8365094*(x^6) - 3846288*(x^5) + 1466755*(x^4) - 449314*(x^3) + 102365*(x^2) - 14979*x + 1021 C30 = 0.970592484335640866195214149124 = root of the polynomial: 85955*(x^16) - 261435*(x^15) - 215055*(x^14) + 1791900*(x^13) - 1800596*(x^12) - 2876819*(x^11) + 7957552*(x^10) - 4294016*(x^9) - 7727496*(x^8) + 14817297*(x^7) - 7425578*(x^6) - 7343304*(x^5) + 15691116*(x^4) - 13470875*(x^3) + 6785830*(x^2) - 1969500*x + 255025 V0 = ( C0, -C4, 1.0) V1 = ( C0, C4, -1.0) V2 = ( -C0, C4, 1.0) V3 = ( -C0, -C4, -1.0) V4 = ( 1.0, -C0, C4) V5 = ( 1.0, C0, -C4) V6 = (-1.0, C0, C4) V7 = (-1.0, -C0, -C4) V8 = ( C4, -1.0, C0) V9 = ( C4, 1.0, -C0) V10 = ( -C4, 1.0, C0) V11 = ( -C4, -1.0, -C0) V12 = ( C8, C1, C30) V13 = ( C8, -C1, -C30) V14 = ( -C8, -C1, C30) V15 = ( -C8, C1, -C30) V16 = ( C30, C8, C1) V17 = ( C30, -C8, -C1) V18 = (-C30, -C8, C1) V19 = (-C30, C8, -C1) V20 = ( C1, C30, C8) V21 = ( C1, -C30, -C8) V22 = ( -C1, -C30, C8) V23 = ( -C1, C30, -C8) V24 = ( C10, -C7, C29) V25 = ( C10, C7, -C29) V26 = (-C10, C7, C29) V27 = (-C10, -C7, -C29) V28 = ( C29, -C10, C7) V29 = ( C29, C10, -C7) V30 = (-C29, C10, C7) V31 = (-C29, -C10, -C7) V32 = ( C7, -C29, C10) V33 = ( C7, C29, -C10) V34 = ( -C7, C29, C10) V35 = ( -C7, -C29, -C10) V36 = ( C5, C11, C28) V37 = ( C5, -C11, -C28) V38 = ( -C5, -C11, C28) V39 = ( -C5, C11, -C28) V40 = ( C28, C5, C11) V41 = ( C28, -C5, -C11) V42 = (-C28, -C5, C11) V43 = (-C28, C5, -C11) V44 = ( C11, C28, C5) V45 = ( C11, -C28, -C5) V46 = (-C11, -C28, C5) V47 = (-C11, C28, -C5) V48 = ( C3, -C14, C27) V49 = ( C3, C14, -C27) V50 = ( -C3, C14, C27) V51 = ( -C3, -C14, -C27) V52 = ( C27, -C3, C14) V53 = ( C27, C3, -C14) V54 = (-C27, C3, C14) V55 = (-C27, -C3, -C14) V56 = ( C14, -C27, C3) V57 = ( C14, C27, -C3) V58 = (-C14, C27, C3) V59 = (-C14, -C27, -C3) V60 = ( C17, 0.0, C26) V61 = ( C17, 0.0, -C26) V62 = (-C17, 0.0, C26) V63 = (-C17, 0.0, -C26) V64 = ( C26, C17, 0.0) V65 = ( C26, -C17, 0.0) V66 = (-C26, C17, 0.0) V67 = (-C26, -C17, 0.0) V68 = ( 0.0, C26, C17) V69 = ( 0.0, C26, -C17) V70 = ( 0.0, -C26, C17) V71 = ( 0.0, -C26, -C17) V72 = ( C15, C9, C25) V73 = ( C15, -C9, -C25) V74 = (-C15, -C9, C25) V75 = (-C15, C9, -C25) V76 = ( C25, C15, C9) V77 = ( C25, -C15, -C9) V78 = (-C25, -C15, C9) V79 = (-C25, C15, -C9) V80 = ( C9, C25, C15) V81 = ( C9, -C25, -C15) V82 = ( -C9, -C25, C15) V83 = ( -C9, C25, -C15) V84 = ( C13, -C16, C24) V85 = ( C13, C16, -C24) V86 = (-C13, C16, C24) V87 = (-C13, -C16, -C24) V88 = ( C24, -C13, C16) V89 = ( C24, C13, -C16) V90 = (-C24, C13, C16) V91 = (-C24, -C13, -C16) V92 = ( C16, -C24, C13) V93 = ( C16, C24, -C13) V94 = (-C16, C24, C13) V95 = (-C16, -C24, -C13) V96 = ( C2, C20, C23) V97 = ( C2, -C20, -C23) V98 = ( -C2, -C20, C23) V99 = ( -C2, C20, -C23) V100 = ( C23, C2, C20) V101 = ( C23, -C2, -C20) V102 = (-C23, -C2, C20) V103 = (-C23, C2, -C20) V104 = ( C20, C23, C2) V105 = ( C20, -C23, -C2) V106 = (-C20, -C23, C2) V107 = (-C20, C23, -C2) V108 = ( C19, -C6, C22) V109 = ( C19, C6, -C22) V110 = (-C19, C6, C22) V111 = (-C19, -C6, -C22) V112 = ( C22, -C19, C6) V113 = ( C22, C19, -C6) V114 = (-C22, C19, C6) V115 = (-C22, -C19, -C6) V116 = ( C6, -C22, C19) V117 = ( C6, C22, -C19) V118 = ( -C6, C22, C19) V119 = ( -C6, -C22, -C19) V120 = ( C12, C18, C21) V121 = ( C12, -C18, -C21) V122 = (-C12, -C18, C21) V123 = (-C12, C18, -C21) V124 = ( C21, C12, C18) V125 = ( C21, -C12, -C18) V126 = (-C21, -C12, C18) V127 = (-C21, C12, -C18) V128 = ( C18, C21, C12) V129 = ( C18, -C21, -C12) V130 = (-C18, -C21, C12) V131 = (-C18, C21, -C12) Faces: { 60, 12, 24 } { 60, 24, 108 } { 60, 108, 100 } { 60, 100, 72 } { 60, 72, 12 } { 61, 13, 25 } { 61, 25, 109 } { 61, 109, 101 } { 61, 101, 73 } { 61, 73, 13 } { 62, 14, 26 } { 62, 26, 110 } { 62, 110, 102 } { 62, 102, 74 } { 62, 74, 14 } { 63, 15, 27 } { 63, 27, 111 } { 63, 111, 103 } { 63, 103, 75 } { 63, 75, 15 } { 64, 16, 29 } { 64, 29, 113 } { 64, 113, 104 } { 64, 104, 76 } { 64, 76, 16 } { 65, 17, 28 } { 65, 28, 112 } { 65, 112, 105 } { 65, 105, 77 } { 65, 77, 17 } { 66, 19, 30 } { 66, 30, 114 } { 66, 114, 107 } { 66, 107, 79 } { 66, 79, 19 } { 67, 18, 31 } { 67, 31, 115 } { 67, 115, 106 } { 67, 106, 78 } { 67, 78, 18 } { 68, 20, 34 } { 68, 34, 118 } { 68, 118, 96 } { 68, 96, 80 } { 68, 80, 20 } { 69, 23, 33 } { 69, 33, 117 } { 69, 117, 99 } { 69, 99, 83 } { 69, 83, 23 } { 70, 22, 32 } { 70, 32, 116 } { 70, 116, 98 } { 70, 98, 82 } { 70, 82, 22 } { 71, 21, 35 } { 71, 35, 119 } { 71, 119, 97 } { 71, 97, 81 } { 71, 81, 21 } { 12, 72, 36 } { 12, 36, 2 } { 12, 2, 0 } { 13, 73, 37 } { 13, 37, 3 } { 13, 3, 1 } { 14, 74, 38 } { 14, 38, 0 } { 14, 0, 2 } { 15, 75, 39 } { 15, 39, 1 } { 15, 1, 3 } { 16, 76, 40 } { 16, 40, 4 } { 16, 4, 5 } { 17, 77, 41 } { 17, 41, 5 } { 17, 5, 4 } { 18, 78, 42 } { 18, 42, 6 } { 18, 6, 7 } { 19, 79, 43 } { 19, 43, 7 } { 19, 7, 6 } { 20, 80, 44 } { 20, 44, 9 } { 20, 9, 10 } { 21, 81, 45 } { 21, 45, 8 } { 21, 8, 11 } { 22, 82, 46 } { 22, 46, 11 } { 22, 11, 8 } { 23, 83, 47 } { 23, 47, 10 } { 23, 10, 9 } { 24, 12, 0 } { 24, 0, 48 } { 24, 48, 84 } { 25, 13, 1 } { 25, 1, 49 } { 25, 49, 85 } { 26, 14, 2 } { 26, 2, 50 } { 26, 50, 86 } { 27, 15, 3 } { 27, 3, 51 } { 27, 51, 87 } { 28, 17, 4 } { 28, 4, 52 } { 28, 52, 88 } { 29, 16, 5 } { 29, 5, 53 } { 29, 53, 89 } { 30, 19, 6 } { 30, 6, 54 } { 30, 54, 90 } { 31, 18, 7 } { 31, 7, 55 } { 31, 55, 91 } { 32, 22, 8 } { 32, 8, 56 } { 32, 56, 92 } { 33, 23, 9 } { 33, 9, 57 } { 33, 57, 93 } { 34, 20, 10 } { 34, 10, 58 } { 34, 58, 94 } { 35, 21, 11 } { 35, 11, 59 } { 35, 59, 95 } { 72, 100, 124 } { 72, 124, 120 } { 72, 120, 36 } { 73, 101, 125 } { 73, 125, 121 } { 73, 121, 37 } { 74, 102, 126 } { 74, 126, 122 } { 74, 122, 38 } { 75, 103, 127 } { 75, 127, 123 } { 75, 123, 39 } { 76, 104, 128 } { 76, 128, 124 } { 76, 124, 40 } { 77, 105, 129 } { 77, 129, 125 } { 77, 125, 41 } { 78, 106, 130 } { 78, 130, 126 } { 78, 126, 42 } { 79, 107, 131 } { 79, 131, 127 } { 79, 127, 43 } { 80, 96, 120 } { 80, 120, 128 } { 80, 128, 44 } { 81, 97, 121 } { 81, 121, 129 } { 81, 129, 45 } { 82, 98, 122 } { 82, 122, 130 } { 82, 130, 46 } { 83, 99, 123 } { 83, 123, 131 } { 83, 131, 47 } { 96, 118, 50 } { 96, 50, 36 } { 96, 36, 120 } { 97, 119, 51 } { 97, 51, 37 } { 97, 37, 121 } { 98, 116, 48 } { 98, 48, 38 } { 98, 38, 122 } { 99, 117, 49 } { 99, 49, 39 } { 99, 39, 123 } { 100, 108, 52 } { 100, 52, 40 } { 100, 40, 124 } { 101, 109, 53 } { 101, 53, 41 } { 101, 41, 125 } { 102, 110, 54 } { 102, 54, 42 } { 102, 42, 126 } { 103, 111, 55 } { 103, 55, 43 } { 103, 43, 127 } { 104, 113, 57 } { 104, 57, 44 } { 104, 44, 128 } { 105, 112, 56 } { 105, 56, 45 } { 105, 45, 129 } { 106, 115, 59 } { 106, 59, 46 } { 106, 46, 130 } { 107, 114, 58 } { 107, 58, 47 } { 107, 47, 131 } { 108, 24, 84 } { 108, 84, 88 } { 108, 88, 52 } { 109, 25, 85 } { 109, 85, 89 } { 109, 89, 53 } { 110, 26, 86 } { 110, 86, 90 } { 110, 90, 54 } { 111, 27, 87 } { 111, 87, 91 } { 111, 91, 55 } { 112, 28, 88 } { 112, 88, 92 } { 112, 92, 56 } { 113, 29, 89 } { 113, 89, 93 } { 113, 93, 57 } { 114, 30, 90 } { 114, 90, 94 } { 114, 94, 58 } { 115, 31, 91 } { 115, 91, 95 } { 115, 95, 59 } { 116, 32, 92 } { 116, 92, 84 } { 116, 84, 48 } { 117, 33, 93 } { 117, 93, 85 } { 117, 85, 49 } { 118, 34, 94 } { 118, 94, 86 } { 118, 86, 50 } { 119, 35, 95 } { 119, 95, 87 } { 119, 87, 51 } { 0, 38, 48 } { 1, 39, 49 } { 2, 36, 50 } { 3, 37, 51 } { 4, 40, 52 } { 5, 41, 53 } { 6, 42, 54 } { 7, 43, 55 } { 8, 45, 56 } { 9, 44, 57 } { 10, 47, 58 } { 11, 46, 59 } { 84, 92, 88 } { 85, 93, 89 } { 86, 94, 90 } { 87, 95, 91 } { 120, 124, 128 } { 121, 125, 129 } { 122, 126, 130 } { 123, 127, 131 }