Geodesic Icosahedron Pattern 5 [2,2] (Hexakis-Pentakis Chamfered Dodecahedron) C0 = 0.174408282070070202707963420126 C1 = 0.2821985283088524577360925103498 C2 = 0.306157924355581557942613490128 C3 = 0.314195968707991448766939602021 C4 = 0.362884552083985646289311976070 C5 = 0.508379756497728549579041329280 C6 = 0.529796913983333215648828463381 C7 = 0.587159539264170262301062759626 C8 = 0.588356452664434015678706000478 C9 = 0.6697822096025204111763636116051 C10 = 0.762764734734504218386669420604 C11 = 0.777572455841302666204492701829 C12 = 0.822575725205719998345980931302 C13 = 0.857229413959837584839928135903 C14 = 0.950044091348155908590374735696 C15 = 0.9519807379113728689124561219549 C16 = 1.01675951299545709915808265856 C0 = root of the polynomial: 1405*(x^6) + 2085*(x^5) - 69*(x^4) - 354*(x^3) - 33*(x^2) + 9*x + 1 C1 = root of the polynomial: 1405*(x^6) - 855*(x^5) - 486*(x^4) + 107*(x^3) + 42*(x^2) - 3*x - 1 C2 = root of the polynomial: 7025*(x^6) + 3360*(x^5) - 7249*(x^4) - 1908*(x^3) + 2289*(x^2) + 108*x - 144 C3 = root of the polynomial: 11644*(x^6) + 11334*(x^5) - 14097*(x^4) - 9414*(x^3) + 5409*(x^2) + 810*x - 405 C4 = root of the polynomial: 99*(x^6) + 387*(x^5) - 189*(x^4) - 972*(x^3) + 524*(x^2) + 160*x - 80 C5 = root of the polynomial: 11644*(x^6) - 16848*(x^5) + 297*(x^4) + 8532*(x^3) - 2421*(x^2) - 1080*x + 405 C6 = root of the polynomial: 212561*(x^6) + 722546*(x^5) + 484953*(x^4) - 349300*(x^3) - 347032*(x^2) + 38256*x + 56016 C7 = root of the polynomial: 99*(x^6) - 369*(x^5) + 249*(x^4) + 336*(x^3) - 316*(x^2) - 80*x + 80 C8 = root of the polynomial: 7025*(x^6) - 915*(x^5) - 15219*(x^4) - 1190*(x^3) + 7659*(x^2) + 525*x - 1121 C9 = root of the polynomial: 7025*(x^6) - 2395*(x^5) - 18991*(x^4) + 14908*(x^3) + 4360*(x^2) - 5824*x + 976 C10 = root of the polynomial: 7025*(x^6) + 9510*(x^5) - 3319*(x^4) - 7164*(x^3) - 468*(x^2) + 944*x + 16 C11 = root of the polynomial: 7025*(x^6) - 17095*(x^5) + 10654*(x^4) + 4771*(x^3) - 8050*(x^2) + 3093*x - 369 C12 = root of the polynomial: 11644*(x^6) - 5514*(x^5) - 14757*(x^4) + 4104*(x^3) + 5274*(x^2) - 270*x - 405 C13 = root of the polynomial: 212561*(x^6) - 661037*(x^5) + 523867*(x^4) + 293420*(x^3) - 642532*(x^2) + 329088*x - 56016 C14 = root of the polynomial: 99*(x^6) + 18*(x^5) - 369*(x^4) - 108*(x^3) + 344*(x^2) + 80*x - 80 C15 = root of the polynomial: 7025*(x^6) - 6670*(x^5) - 9856*(x^4) + 11110*(x^3) + 1904*(x^2) - 4570*x + 1121 C16 = root of the polynomial: 2911*(x^6) - 8424*(x^5) + 297*(x^4) + 17064*(x^3) - 9684*(x^2) - 8640*x + 6480 V0 = ( 0.0, 0.0, C16) V1 = ( 0.0, 0.0, -C16) V2 = ( C16, 0.0, 0.0) V3 = (-C16, 0.0, 0.0) V4 = ( 0.0, C16, 0.0) V5 = ( 0.0, -C16, 0.0) V6 = ( C2, C0, C15) V7 = ( C2, C0, -C15) V8 = ( C2, -C0, C15) V9 = ( C2, -C0, -C15) V10 = ( -C2, C0, C15) V11 = ( -C2, C0, -C15) V12 = ( -C2, -C0, C15) V13 = ( -C2, -C0, -C15) V14 = ( C15, C2, C0) V15 = ( C15, C2, -C0) V16 = ( C15, -C2, C0) V17 = ( C15, -C2, -C0) V18 = (-C15, C2, C0) V19 = (-C15, C2, -C0) V20 = (-C15, -C2, C0) V21 = (-C15, -C2, -C0) V22 = ( C0, C15, C2) V23 = ( C0, C15, -C2) V24 = ( C0, -C15, C2) V25 = ( C0, -C15, -C2) V26 = ( -C0, C15, C2) V27 = ( -C0, C15, -C2) V28 = ( -C0, -C15, C2) V29 = ( -C0, -C15, -C2) V30 = ( 0.0, C4, C14) V31 = ( 0.0, C4, -C14) V32 = ( 0.0, -C4, C14) V33 = ( 0.0, -C4, -C14) V34 = ( C14, 0.0, C4) V35 = ( C14, 0.0, -C4) V36 = (-C14, 0.0, C4) V37 = (-C14, 0.0, -C4) V38 = ( C4, C14, 0.0) V39 = ( C4, -C14, 0.0) V40 = ( -C4, C14, 0.0) V41 = ( -C4, -C14, 0.0) V42 = ( C6, 0.0, C13) V43 = ( C6, 0.0, -C13) V44 = ( -C6, 0.0, C13) V45 = ( -C6, 0.0, -C13) V46 = ( C13, C6, 0.0) V47 = ( C13, -C6, 0.0) V48 = (-C13, C6, 0.0) V49 = (-C13, -C6, 0.0) V50 = ( 0.0, C13, C6) V51 = ( 0.0, C13, -C6) V52 = ( 0.0, -C13, C6) V53 = ( 0.0, -C13, -C6) V54 = ( C3, C5, C12) V55 = ( C3, C5, -C12) V56 = ( C3, -C5, C12) V57 = ( C3, -C5, -C12) V58 = ( -C3, C5, C12) V59 = ( -C3, C5, -C12) V60 = ( -C3, -C5, C12) V61 = ( -C3, -C5, -C12) V62 = ( C12, C3, C5) V63 = ( C12, C3, -C5) V64 = ( C12, -C3, C5) V65 = ( C12, -C3, -C5) V66 = (-C12, C3, C5) V67 = (-C12, C3, -C5) V68 = (-C12, -C3, C5) V69 = (-C12, -C3, -C5) V70 = ( C5, C12, C3) V71 = ( C5, C12, -C3) V72 = ( C5, -C12, C3) V73 = ( C5, -C12, -C3) V74 = ( -C5, C12, C3) V75 = ( -C5, C12, -C3) V76 = ( -C5, -C12, C3) V77 = ( -C5, -C12, -C3) V78 = ( C8, C1, C11) V79 = ( C8, C1, -C11) V80 = ( C8, -C1, C11) V81 = ( C8, -C1, -C11) V82 = ( -C8, C1, C11) V83 = ( -C8, C1, -C11) V84 = ( -C8, -C1, C11) V85 = ( -C8, -C1, -C11) V86 = ( C11, C8, C1) V87 = ( C11, C8, -C1) V88 = ( C11, -C8, C1) V89 = ( C11, -C8, -C1) V90 = (-C11, C8, C1) V91 = (-C11, C8, -C1) V92 = (-C11, -C8, C1) V93 = (-C11, -C8, -C1) V94 = ( C1, C11, C8) V95 = ( C1, C11, -C8) V96 = ( C1, -C11, C8) V97 = ( C1, -C11, -C8) V98 = ( -C1, C11, C8) V99 = ( -C1, C11, -C8) V100 = ( -C1, -C11, C8) V101 = ( -C1, -C11, -C8) V102 = ( 0.0, C9, C10) V103 = ( 0.0, C9, -C10) V104 = ( 0.0, -C9, C10) V105 = ( 0.0, -C9, -C10) V106 = ( C10, 0.0, C9) V107 = ( C10, 0.0, -C9) V108 = (-C10, 0.0, C9) V109 = (-C10, 0.0, -C9) V110 = ( C9, C10, 0.0) V111 = ( C9, -C10, 0.0) V112 = ( -C9, C10, 0.0) V113 = ( -C9, -C10, 0.0) V114 = ( C7, C7, C7) V115 = ( C7, C7, -C7) V116 = ( C7, -C7, C7) V117 = ( C7, -C7, -C7) V118 = ( -C7, C7, C7) V119 = ( -C7, C7, -C7) V120 = ( -C7, -C7, C7) V121 = ( -C7, -C7, -C7) Faces: { 0, 6, 30 } { 0, 30, 10 } { 0, 10, 12 } { 0, 12, 32 } { 0, 32, 8 } { 0, 8, 6 } { 1, 9, 33 } { 1, 33, 13 } { 1, 13, 11 } { 1, 11, 31 } { 1, 31, 7 } { 1, 7, 9 } { 2, 14, 34 } { 2, 34, 16 } { 2, 16, 17 } { 2, 17, 35 } { 2, 35, 15 } { 2, 15, 14 } { 3, 19, 37 } { 3, 37, 21 } { 3, 21, 20 } { 3, 20, 36 } { 3, 36, 18 } { 3, 18, 19 } { 4, 22, 38 } { 4, 38, 23 } { 4, 23, 27 } { 4, 27, 40 } { 4, 40, 26 } { 4, 26, 22 } { 5, 28, 41 } { 5, 41, 29 } { 5, 29, 25 } { 5, 25, 39 } { 5, 39, 24 } { 5, 24, 28 } { 54, 6, 78 } { 54, 78, 114 } { 54, 114, 94 } { 54, 94, 102 } { 54, 102, 30 } { 54, 30, 6 } { 55, 7, 31 } { 55, 31, 103 } { 55, 103, 95 } { 55, 95, 115 } { 55, 115, 79 } { 55, 79, 7 } { 56, 8, 32 } { 56, 32, 104 } { 56, 104, 96 } { 56, 96, 116 } { 56, 116, 80 } { 56, 80, 8 } { 57, 9, 81 } { 57, 81, 117 } { 57, 117, 97 } { 57, 97, 105 } { 57, 105, 33 } { 57, 33, 9 } { 58, 10, 30 } { 58, 30, 102 } { 58, 102, 98 } { 58, 98, 118 } { 58, 118, 82 } { 58, 82, 10 } { 59, 11, 83 } { 59, 83, 119 } { 59, 119, 99 } { 59, 99, 103 } { 59, 103, 31 } { 59, 31, 11 } { 60, 12, 84 } { 60, 84, 120 } { 60, 120, 100 } { 60, 100, 104 } { 60, 104, 32 } { 60, 32, 12 } { 61, 13, 33 } { 61, 33, 105 } { 61, 105, 101 } { 61, 101, 121 } { 61, 121, 85 } { 61, 85, 13 } { 62, 14, 86 } { 62, 86, 114 } { 62, 114, 78 } { 62, 78, 106 } { 62, 106, 34 } { 62, 34, 14 } { 63, 15, 35 } { 63, 35, 107 } { 63, 107, 79 } { 63, 79, 115 } { 63, 115, 87 } { 63, 87, 15 } { 64, 16, 34 } { 64, 34, 106 } { 64, 106, 80 } { 64, 80, 116 } { 64, 116, 88 } { 64, 88, 16 } { 65, 17, 89 } { 65, 89, 117 } { 65, 117, 81 } { 65, 81, 107 } { 65, 107, 35 } { 65, 35, 17 } { 66, 18, 36 } { 66, 36, 108 } { 66, 108, 82 } { 66, 82, 118 } { 66, 118, 90 } { 66, 90, 18 } { 67, 19, 91 } { 67, 91, 119 } { 67, 119, 83 } { 67, 83, 109 } { 67, 109, 37 } { 67, 37, 19 } { 68, 20, 92 } { 68, 92, 120 } { 68, 120, 84 } { 68, 84, 108 } { 68, 108, 36 } { 68, 36, 20 } { 69, 21, 37 } { 69, 37, 109 } { 69, 109, 85 } { 69, 85, 121 } { 69, 121, 93 } { 69, 93, 21 } { 70, 22, 94 } { 70, 94, 114 } { 70, 114, 86 } { 70, 86, 110 } { 70, 110, 38 } { 70, 38, 22 } { 71, 23, 38 } { 71, 38, 110 } { 71, 110, 87 } { 71, 87, 115 } { 71, 115, 95 } { 71, 95, 23 } { 72, 24, 39 } { 72, 39, 111 } { 72, 111, 88 } { 72, 88, 116 } { 72, 116, 96 } { 72, 96, 24 } { 73, 25, 97 } { 73, 97, 117 } { 73, 117, 89 } { 73, 89, 111 } { 73, 111, 39 } { 73, 39, 25 } { 74, 26, 40 } { 74, 40, 112 } { 74, 112, 90 } { 74, 90, 118 } { 74, 118, 98 } { 74, 98, 26 } { 75, 27, 99 } { 75, 99, 119 } { 75, 119, 91 } { 75, 91, 112 } { 75, 112, 40 } { 75, 40, 27 } { 76, 28, 100 } { 76, 100, 120 } { 76, 120, 92 } { 76, 92, 113 } { 76, 113, 41 } { 76, 41, 28 } { 77, 29, 41 } { 77, 41, 113 } { 77, 113, 93 } { 77, 93, 121 } { 77, 121, 101 } { 77, 101, 29 } { 42, 8, 80 } { 42, 80, 106 } { 42, 106, 78 } { 42, 78, 6 } { 42, 6, 8 } { 43, 7, 79 } { 43, 79, 107 } { 43, 107, 81 } { 43, 81, 9 } { 43, 9, 7 } { 44, 10, 82 } { 44, 82, 108 } { 44, 108, 84 } { 44, 84, 12 } { 44, 12, 10 } { 45, 13, 85 } { 45, 85, 109 } { 45, 109, 83 } { 45, 83, 11 } { 45, 11, 13 } { 46, 15, 87 } { 46, 87, 110 } { 46, 110, 86 } { 46, 86, 14 } { 46, 14, 15 } { 47, 16, 88 } { 47, 88, 111 } { 47, 111, 89 } { 47, 89, 17 } { 47, 17, 16 } { 48, 18, 90 } { 48, 90, 112 } { 48, 112, 91 } { 48, 91, 19 } { 48, 19, 18 } { 49, 21, 93 } { 49, 93, 113 } { 49, 113, 92 } { 49, 92, 20 } { 49, 20, 21 } { 50, 26, 98 } { 50, 98, 102 } { 50, 102, 94 } { 50, 94, 22 } { 50, 22, 26 } { 51, 23, 95 } { 51, 95, 103 } { 51, 103, 99 } { 51, 99, 27 } { 51, 27, 23 } { 52, 24, 96 } { 52, 96, 104 } { 52, 104, 100 } { 52, 100, 28 } { 52, 28, 24 } { 53, 29, 101 } { 53, 101, 105 } { 53, 105, 97 } { 53, 97, 25 } { 53, 25, 29 }