/* Group 1259712.jq downloaded from the LMFDB on 18 July 2026. */ /* Various presentations of this group are stored in this file: GPC is polycyclic presentation GPerm is permutation group GLZ, GLFp, GLZA, GLZq, GLFq if they exist are matrix groups Many characteristics of the group are stored as booleans in a record: Agroup, Zgroup, abelian, almost_simple,cyclic, metabelian, metacyclic, monomial, nilpotent, perfect, quasisimple, rational, solvable, supersolvable The character table is stored as chartbl_n_i where n is the order of the group and i is which group of that order it is. Conjugacy classes are stored in the variable 'C' with elements from the group 'G'. */ /* Constructions */ GPC := PCGroup([15, 2, 3, 2, 2, 2, 2, 3, 3, 2, 3, 3, 3, 3, 3, 3, 30, 16387216, 51505742, 8105822, 63867963, 6605478, 23022904, 8543944, 2750134, 5252599, 214, 10579685, 2585540, 17868275, 782330, 102947046, 55883541, 3001386, 1761, 411, 50423047, 31104022, 2592067, 1522, 82061108, 43282778, 10604558, 11542553, 3982568, 2228393, 1575953, 394178, 398, 107683209, 34099224, 17884839, 8553654, 3504069, 43284, 594, 147216970, 8601145, 24377800, 7056775, 2890870, 35725, 202176011, 88845146, 21049961, 10706456, 9331271, 466646, 26051, 716, 165784332, 41502267, 27471642, 13820097, 7581672, 379167, 21192, 97292173, 36872668, 39214603, 19607338, 1496953, 4898968, 272293, 838, 22291214, 100926029, 31503644, 15751859, 4811474, 3936689, 218834]); a,b,c,d,e,f,g,h := Explode([GPC.1, GPC.3, GPC.4, GPC.5, GPC.7, GPC.9, GPC.12, GPC.14]); AssignNames(~GPC, ["a", "a2", "b", "c", "d", "d2", "e", "e3", "f", "f2", "f6", "g", "g3", "h", "h3"]); GPerm := PermutationGroup< 36 | (1,13,26,3,15,25,2,14,27)(4,31,35,28,9,11)(5,32,36,30,8,10)(6,33,34,29,7,12)(16,20,22,17,21,23)(18,19,24), (1,22,8,15,34,33,26,12,19,3,23,7,14,35,32,25,10,21,2,24,9,13,36,31,27,11,20)(4,6)(16,29,18,30,17,28) >; /* Booleans */ RF := recformat< Agroup, Zgroup, abelian, almost_simple, cyclic, metabelian, metacyclic, monomial, nilpotent, perfect, quasisimple, rational, solvable, supersolvable : BoolElt >; booleans_1259712_jq := rec< RF | Agroup := false, Zgroup := false, abelian := false, almost_simple := false, cyclic := false, metabelian := false, metacyclic := false, nilpotent := false, perfect := false, quasisimple := false, rational := false, solvable := true, supersolvable := false>; /* Character Table */ G:= GPC; C := SequenceToConjugacyClasses([car |< 1, 1, Id(G)>,< 2, 36, a^3*c*e^2*f^16*g*h^5>,< 2, 486, b*d^2*e*f^2*g^5*h>,< 2, 972, c*d^3*e^4*f^5*g^2*h^2>,< 2, 2916, a^3*b*c*d^2*e^2*f^12*g^3*h^7>,< 2, 6561, d^2*e^2*f^2*g^5*h^2>,< 3, 8, e^3>,< 3, 16, g^3>,< 3, 24, f^6>,< 3, 32, e^3*g^3>,< 3, 3888, a^4*b*c*d*e^4*f^7*g^3>,< 3, 3888, a^2*e^4*f^9*g^3*h^8>,< 4, 17496, a^3*b*c*d^3*e^5*f^5*g^6>,< 4, 78732, b*e^6*f^13*g^7*h^5>,< 6, 216, a^3*c*e^2*f^4*g^7*h^8>,< 6, 288, a^3*e^4*f^4*g^7*h^7>,< 6, 432, a^3*c*e^5*f^4*g^7*h^8>,< 6, 1944, b*d^2*e^4*f^14*g^8*h>,< 6, 1944, b*c*e^3*f^6*g^3*h^6>,< 6, 3888, c*d^3*e^7*f^11*g^8*h^5>,< 6, 3888, b*c*d^3*e*f^4*h^4>,< 6, 5832, a^3*b*c*d^2*e^2*f^6*g^6*h^4>,< 6, 11664, a*b*c*d^2*e^8*f^9*g^5*h^7>,< 6, 11664, a^5*b*c*d^3*e^7*f^2*h^7>,< 6, 34992, a^5*b*c*f^13*g^5*h^3>,< 6, 34992, a*b*c*d*e^6*f^15*g^4*h^7>,< 6, 104976, a^2*d^2*e^7*f^11*g^7*h^6>,< 6, 104976, a^4*b*c*d^3*e^7*f^13*g^7*h^5>,< 9, 24, f^4*g^7*h^8>,< 9, 24, e^2*f^4*g^7*h^8>,< 9, 24, e^4*f^8*g^5*h^7>,< 9, 24, e^8*f^16*g*h^5>,< 9, 32, e*f^12*g^2*h>,< 9, 32, e^2*f^6*g^4*h^2>,< 9, 32, e^4*f^12*g^8*h^4>,< 9, 48, f^8*h^2>,< 9, 48, e^5*f^4*g^7*h^8>,< 9, 48, e*f^8*g^5*h^7>,< 9, 48, e^2*f^16*g*h^5>,< 9, 48, e^4*h^6>,< 9, 48, e^8*h^3>,< 9, 48, e^7*h^6>,< 9, 64, e^8*f^8*g^6*h^5>,< 9, 64, e^7*f^16*g^3*h>,< 9, 64, e^5*f^14*g^6*h^2>,< 9, 96, e^4*f^4*g^7*h^4>,< 9, 96, e^4*f^4*g^7*h>,< 9, 96, e^4*f^4*g^7>,< 9, 96, e^8*f^8*g^5>,< 9, 96, e^7*f^16*g>,< 9, 96, e^4*f^16*g*h>,< 9, 96, e^8*f^14*g^2*h^2>,< 9, 96, e^7*f^10*g^4*h^4>,< 9, 96, e^4*f^2*g^8*h^2>,< 9, 96, e^8*f^4*g^7*h^4>,< 9, 96, e^7*f^8*g^5*h^8>,< 9, 96, e^4*f^10*g^4*h>,< 9, 96, e^8*f^2*g^8*h^2>,< 9, 96, e^7*f^4*g^7*h^4>,< 9, 96, e^4*f^4*g^7*h^6>,< 9, 96, e^8*f^8*g^5*h^3>,< 9, 96, e^7*f^16*g*h^6>,< 9, 96, e^4*f^6*g^6*h^4>,< 9, 96, e^8*f^12*g^3*h^8>,< 9, 96, e^7*f^6*g^6*h^7>,< 9, 96, e^2*f^16*g^7*h^4>,< 9, 96, e^4*f^14*g^5*h^8>,< 9, 96, e^8*f^10*g*h^7>,< 9, 96, e^3*f^12*g^2*h^6>,< 9, 96, e^6*f^6*g^4*h^3>,< 9, 96, e^3*f^12*g^8*h^6>,< 9, 192, e^3*g>,< 9, 192, e*g^3>,< 9, 192, e*g>,< 9, 192, e^3*g^2>,< 9, 192, e*f^6*g>,< 9, 192, f^6*g>,< 9, 192, f^6*g^2>,< 9, 192, f^6*g^4>,< 9, 192, f^2*g^3>,< 9, 192, f^4*g^3>,< 9, 192, f^8*g^3>,< 9, 192, f^2*g^2>,< 9, 192, f^4*g^4>,< 9, 192, f^8*g>,< 9, 192, f^2*g^2*h^3>,< 9, 192, e^2*f^2*h^3>,< 9, 192, e^3*f^2*g^2>,< 9, 7776, a^4*d*f^2*g^8*h^3>,< 9, 7776, a^2*b*d^3*e^7*f^17*g^5*h^6>,< 9, 7776, a^4*b*c*d*e^2*f^16*g^7*h^5>,< 9, 7776, a^2*b*c*d*e*f^15*g^6*h^2>,< 9, 15552, a^2*b*d*e^8*f^6*g*h^7>,< 9, 15552, a^4*b*c*e^5*f^13*g^2*h^5>,< 12, 34992, a^3*c*d*e^3*f^17*g^3>,< 18, 216, a^3*c*e^2>,< 18, 216, a^3*c*e*g^2>,< 18, 216, a^3*g^2*h^6>,< 18, 288, a^3*c*e^7*f^4*g^2*h>,< 18, 288, a^3*c*f^10*g^6*h^3>,< 18, 288, a^3*c*e*f^4*g^8*h^4>,< 18, 432, a^3*c>,< 18, 432, a^3*e^2*f^6>,< 18, 432, a^3*g*h>,< 18, 432, a^3*g^2>,< 18, 432, a^3*g^2*h^3>,< 18, 432, a^3*e^3*g^2>,< 18, 432, a^3*e^2>,< 18, 432, a^3*g*h^3>,< 18, 432, a^3*b*c*e^3>,< 18, 432, a^3*c*h>,< 18, 432, a^3*f^2*g^3*h>,< 18, 432, a^3*g^2*h^2>,< 18, 432, a^3*c*e^3>,< 18, 432, a^3*g^6*h>,< 18, 432, a^3*c*g^2>,< 18, 864, a^3*h^3>,< 18, 864, a^3*h^6>,< 18, 864, a^3*h>,< 18, 864, a^3*f^2*g^2>,< 18, 864, a^3*f^6*g>,< 18, 864, a^3*g^3>,< 18, 864, a^3*e^3*h^6>,< 18, 864, a^3*e^3>,< 18, 864, a^3*g>,< 18, 864, a^3*h^2>,< 18, 864, a^3*e^3*f^2>,< 18, 864, a^3*f^6>,< 18, 864, a^3*e^3*g^3>,< 18, 864, a^3*g^6>,< 18, 864, a^3*h^4>,< 18, 864, a^3*g*h^6>,< 18, 864, a^3*c*g^3>,< 18, 864, a^3*f^2*h>,< 18, 864, a^3*f^6*g^2>,< 18, 864, a^3*g^5>,< 18, 1944, b*d^2*e^8*f^6*g^3*h^7>,< 18, 1944, b*d^2*f^4*g^4*h^4>,< 18, 1944, b*d^2*e^5*f^12*h^7>,< 18, 1944, b*e*f^12*g^3*h^8>,< 18, 1944, b*e^6*f^12*g^3*h^8>,< 18, 1944, b*e^4*f^12*g^3*h^8>,< 18, 3888, c*d^3*e^6*f^11*g^4*h^7>,< 18, 3888, c*d^3*e^6*f^9*g^4*h^2>,< 18, 3888, c*d^3*e^6*f^17*g^4*h^4>,< 18, 3888, b*c*e^7*f^6*g^3>,< 18, 3888, b*c*e^8*f^6*g^3*h^3>,< 18, 3888, b*c*e^4*f^6*g^3>,< 18, 3888, b*c*e^3*f^4*g^7*h^4>,< 18, 3888, b*c*e^6*f^4*g^7*h^6>,< 18, 3888, b*c*e^3*f^4*g^7*h^7>,< 18, 3888, b*d*e*g^4*h^7>,< 18, 3888, b*d*e^2*f^2*g^3*h^2>,< 18, 3888, b*d*e^7*f^12*g^7*h^4>,< 18, 7776, c*d^3*e^5*f^13*g*h^3>,< 18, 7776, c*d^3*f^9*g^6*h^7>,< 18, 7776, c*d^3*e^2*f^7*g^4>,< 18, 7776, b*c*d^3*e^7*f^10*g^7*h^7>,< 18, 7776, b*c*d^3*e^4*f^16*g^2*h>,< 18, 7776, b*c*d^3*e^7*f^10*g^4*h^7>,< 18, 17496, a^3*c*d^2*e^7*f^2*g>,< 18, 23328, a^5*b*c*d^3*e^8*f^7*h^2>,< 18, 23328, a*b*d^3*e^7*f^2*g*h^7>,< 18, 69984, a^5*b*d^3*f^17*g^6*h^8>,< 18, 69984, a*c*d*e^7*f^10*g^2*h^4>,< 27, 7776, a^4*d^3*e^6*f^13*g^2*h>,< 27, 7776, a^2*c*f^13*g^7*h^8>,< 27, 7776, a^2*c*e*f^7*h^8>,< 27, 7776, a^4*d^3*e^5*f*h>,< 27, 7776, a^4*d^3*e^7*f^7*g^4*h>,< 27, 7776, a^2*c*e^8*f*g^5*h^8>,< 27, 15552, a^4*e^5*f^5*g^5*h^7>,< 27, 15552, a^2*b*c*d*e^8*f^4*g^4*h^2>,< 27, 15552, a^2*b*c*d*e^7*f^12*g*h^7>,< 27, 15552, a^4*e^6*f^15*g^8*h>,< 27, 15552, a^4*e^4*f^13*g^2*h^4>,< 27, 15552, a^2*b*c*d*f^14*g^7*h^6>,< 36, 34992, a^3*b*c*d^3*e^4*f^7*g^5*h^4>,< 36, 34992, a^3*b*c*d^3*f^15*g*h^2>,< 36, 34992, a^3*c*d*e^8*f^7*g^8*h^7>,< 54, 23328, a^5*b*c*d^2*e^7*f*g^2*h^7>,< 54, 23328, a*b*c*d^3*e^5*f^3*g^7*h^4>,< 54, 23328, a*b*c*d^3*e^6*f^15*h^4>,< 54, 23328, a^5*b*c*d^2*e^6*f^7*h^7>,< 54, 23328, a^5*b*c*d^2*e^8*f^13*g^4*h^7>,< 54, 23328, a*b*c*d^3*e^4*f^9*g^5*h^4>]); CR := CharacterRing(G); x := CR!\[1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1]; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; x := CR!\[1, -1, 1, 1, -1, 1, 1, 1, 1, 1, 1, 1, -1, 1, -1, -1, -1, 1, 1, 1, 1, -1, -1, -1, -1, -1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, -1, -1, -1, -1, -1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, -1, -1, -1, -1, -1, -1, -1, -1, -1]; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(3: Sparse := true); S := [ K |1,1,1,1,1,1,1,1,1,1,K.1^-1,K.1,1,1,1,1,1,1,1,1,1,1,K.1^-1,K.1,K.1,K.1^-1,K.1,K.1^-1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,K.1^-1,K.1,K.1^-1,K.1,K.1,K.1^-1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,K.1,K.1^-1,K.1,K.1^-1,K.1^-1,K.1,K.1,K.1^-1,K.1^-1,K.1,K.1^-1,K.1,K.1,K.1^-1,K.1^-1,K.1,1,1,1,K.1,K.1^-1,K.1^-1,K.1,K.1,K.1^-1]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; K := CyclotomicField(3: Sparse := true); S := [ K |1,1,1,1,1,1,1,1,1,1,K.1,K.1^-1,1,1,1,1,1,1,1,1,1,1,K.1,K.1^-1,K.1^-1,K.1,K.1^-1,K.1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,K.1,K.1^-1,K.1,K.1^-1,K.1^-1,K.1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,K.1^-1,K.1,K.1^-1,K.1,K.1,K.1^-1,K.1^-1,K.1,K.1,K.1^-1,K.1,K.1^-1,K.1^-1,K.1,K.1,K.1^-1,1,1,1,K.1^-1,K.1,K.1,K.1^-1,K.1^-1,K.1]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; K := CyclotomicField(3: Sparse := true); S := [ K |1,-1,1,1,-1,1,1,1,1,1,K.1^-1,K.1,-1,1,-1,-1,-1,1,1,1,1,-1,-1*K.1^-1,-1*K.1,-1*K.1,-1*K.1^-1,K.1,K.1^-1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,K.1^-1,K.1,K.1^-1,K.1,K.1,K.1^-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,-1,-1*K.1,-1*K.1^-1,-1*K.1,-1*K.1^-1,K.1^-1,K.1,K.1,K.1^-1,K.1^-1,K.1,K.1^-1,K.1,K.1,K.1^-1,K.1^-1,K.1,-1,-1,-1,-1*K.1,-1*K.1^-1,-1*K.1^-1,-1*K.1,-1*K.1,-1*K.1^-1]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; K := CyclotomicField(3: Sparse := true); S := [ K |1,-1,1,1,-1,1,1,1,1,1,K.1,K.1^-1,-1,1,-1,-1,-1,1,1,1,1,-1,-1*K.1,-1*K.1^-1,-1*K.1^-1,-1*K.1,K.1^-1,K.1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,K.1,K.1^-1,K.1,K.1^-1,K.1^-1,K.1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,-1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,-1,-1*K.1^-1,-1*K.1,-1*K.1^-1,-1*K.1,K.1,K.1^-1,K.1^-1,K.1,K.1,K.1^-1,K.1,K.1^-1,K.1^-1,K.1,K.1,K.1^-1,-1,-1,-1,-1*K.1^-1,-1*K.1,-1*K.1,-1*K.1^-1,-1*K.1^-1,-1*K.1]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; x := CR!\[3, 3, 3, -1, 3, 3, 3, 3, 3, 3, 0, 0, -1, -1, 3, 3, 3, 3, 3, -1, -1, 3, 0, 0, 0, 0, 0, 0, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 0, 0, 0, 0, 0, 0, -1, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, -1, -1, -1, 3, 3, 3, 3, 3, 3, -1, -1, -1, -1, -1, -1, -1, -1, -1, 3, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, -1, -1, -1, 0, 0, 0, 0, 0, 0]; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; x := CR!\[3, -3, 3, -1, -3, 3, 3, 3, 3, 3, 0, 0, 1, -1, -3, -3, -3, 3, 3, -1, -1, -3, 0, 0, 0, 0, 0, 0, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 0, 0, 0, 0, 0, 0, 1, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, 3, 3, 3, 3, 3, 3, -1, -1, -1, 3, 3, 3, 3, 3, 3, -1, -1, -1, -1, -1, -1, -1, -1, -1, -3, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1, 1, 1, 0, 0, 0, 0, 0, 0]; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; x := CR!\[4, -2, 0, 0, 2, -4, 4, 4, 4, 4, 1, 1, 0, 0, -2, -2, -2, 0, 0, 0, 0, 2, 1, 1, -1, -1, -1, -1, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 1, 1, 1, 1, 1, 1, 0, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 2, 1, 1, -1, -1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 0, 0, 0, 1, 1, 1, 1, 1, 1]; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; x := CR!\[4, 2, 0, 0, -2, -4, 4, 4, 4, 4, 1, 1, 0, 0, 2, 2, 2, 0, 0, 0, 0, -2, -1, -1, 1, 1, -1, -1, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 4, 1, 1, 1, 1, 1, 1, 0, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, -2, -1, -1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 0, 0, 0, -1, -1, -1, -1, -1, -1]; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(3: Sparse := true); S := [ K |4,-2,0,0,2,-4,4,4,4,4,K.1^-1,K.1,0,0,-2,-2,-2,0,0,0,0,2,K.1^-1,K.1,-1*K.1,-1*K.1^-1,-1*K.1,-1*K.1^-1,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,K.1^-1,K.1,K.1^-1,K.1,K.1,K.1^-1,0,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,2,K.1,K.1^-1,-1*K.1,-1*K.1^-1,K.1^-1,K.1,K.1,K.1^-1,K.1^-1,K.1,K.1^-1,K.1,K.1,K.1^-1,K.1^-1,K.1,0,0,0,K.1,K.1^-1,K.1^-1,K.1,K.1,K.1^-1]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; K := CyclotomicField(3: Sparse := true); S := [ K |4,-2,0,0,2,-4,4,4,4,4,K.1,K.1^-1,0,0,-2,-2,-2,0,0,0,0,2,K.1,K.1^-1,-1*K.1^-1,-1*K.1,-1*K.1^-1,-1*K.1,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,K.1,K.1^-1,K.1,K.1^-1,K.1^-1,K.1,0,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,2,K.1^-1,K.1,-1*K.1^-1,-1*K.1,K.1,K.1^-1,K.1^-1,K.1,K.1,K.1^-1,K.1,K.1^-1,K.1^-1,K.1,K.1,K.1^-1,0,0,0,K.1^-1,K.1,K.1,K.1^-1,K.1^-1,K.1]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; K := CyclotomicField(3: Sparse := true); S := [ K |4,2,0,0,-2,-4,4,4,4,4,K.1^-1,K.1,0,0,2,2,2,0,0,0,0,-2,-1*K.1^-1,-1*K.1,K.1,K.1^-1,-1*K.1,-1*K.1^-1,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,K.1^-1,K.1,K.1^-1,K.1,K.1,K.1^-1,0,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-2,-1*K.1,-1*K.1^-1,K.1,K.1^-1,K.1^-1,K.1,K.1,K.1^-1,K.1^-1,K.1,K.1^-1,K.1,K.1,K.1^-1,K.1^-1,K.1,0,0,0,-1*K.1,-1*K.1^-1,-1*K.1^-1,-1*K.1,-1*K.1,-1*K.1^-1]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; K := CyclotomicField(3: Sparse := true); S := [ K |4,2,0,0,-2,-4,4,4,4,4,K.1,K.1^-1,0,0,2,2,2,0,0,0,0,-2,-1*K.1,-1*K.1^-1,K.1^-1,K.1,-1*K.1^-1,-1*K.1,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,4,K.1,K.1^-1,K.1,K.1^-1,K.1^-1,K.1,0,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-2,-1*K.1^-1,-1*K.1,K.1^-1,K.1,K.1,K.1^-1,K.1^-1,K.1,K.1,K.1^-1,K.1,K.1^-1,K.1^-1,K.1,K.1,K.1^-1,0,0,0,-1*K.1^-1,-1*K.1,-1*K.1,-1*K.1^-1,-1*K.1^-1,-1*K.1]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; x := CR!\[6, 0, -2, -2, 0, 6, 6, 6, 6, 6, 0, 0, 0, 2, 0, 0, 0, -2, -2, -2, -2, 0, 0, 0, 0, 0, 0, 0, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, -2, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0]; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; x := CR!\[6, 0, -2, 2, 0, 6, 6, 6, 6, 6, 0, 0, 0, -2, 0, 0, 0, -2, -2, 2, 2, 0, 0, 0, 0, 0, 0, 0, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 6, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, -2, -2, -2, -2, -2, -2, 2, 2, 2, -2, -2, -2, -2, -2, -2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0]; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; x := CR!\[8, 6, 4, 0, 2, 0, 8, 8, 8, 8, 2, 2, 0, 0, 6, 6, 6, 4, 4, 0, 0, 2, 0, 0, 2, 2, 0, 0, 5, 2, 2, 2, -1, -1, -1, -4, 2, 2, 2, 5, 5, 5, -1, -1, -1, -1, -1, 2, 2, 2, -1, -1, -1, 2, 2, 2, -1, -1, -1, 2, 2, 2, 5, 5, 5, 2, 2, 2, -4, -4, -4, -4, 5, -1, -4, -1, -4, -4, -4, 2, 2, 2, -1, -1, -1, -1, -1, -1, 2, 2, -1, -1, -1, -1, 0, 3, 3, 3, -3, -3, -3, 0, 0, 0, 3, 3, 3, 0, 0, 0, 3, 3, 3, 0, 0, 0, -3, -3, 0, 0, 0, -3, -3, -3, 0, 0, 0, -3, -3, -3, 0, 0, 0, 3, 3, 3, -2, -2, -2, 1, 1, 1, 0, 0, 0, 1, 1, 1, -2, -2, -2, 0, 0, 0, 0, 0, 0, 0, 0, 0, -1, 0, 0, -1, -1, 2, 2, 2, 2, 2, 2, -1, -1, -1, -1, -1, -1, 0, 0, 0, 0, 0, 0, 0, 0, 0]; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; x := CR!\[8, -6, 4, 0, -2, 0, 8, 8, 8, 8, 2, 2, 0, 0, -6, -6, -6, 4, 4, 0, 0, -2, 0, 0, -2, -2, 0, 0, 5, 2, 2, 2, -1, -1, -1, -4, 2, 2, 2, 5, 5, 5, -1, -1, -1, -1, -1, 2, 2, 2, -1, -1, -1, 2, 2, 2, -1, -1, -1, 2, 2, 2, 5, 5, 5, 2, 2, 2, -4, -4, -4, -4, 5, -1, -4, -1, -4, -4, -4, 2, 2, 2, -1, -1, -1, -1, -1, -1, 2, 2, -1, -1, -1, -1, 0, -3, -3, -3, 3, 3, 3, 0, 0, 0, -3, -3, -3, 0, 0, 0, -3, -3, -3, 0, 0, 0, 3, 3, 0, 0, 0, 3, 3, 3, 0, 0, 0, 3, 3, 3, 0, 0, 0, -3, -3, -3, -2, -2, -2, 1, 1, 1, 0, 0, 0, 1, 1, 1, -2, -2, -2, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1, 0, 0, 1, 1, 2, 2, 2, 2, 2, 2, -1, -1, -1, -1, -1, -1, 0, 0, 0, 0, 0, 0, 0, 0, 0]; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(3: Sparse := true); S := [ K |8,6,4,0,2,0,8,8,8,8,2*K.1^-1,2*K.1,0,0,6,6,6,4,4,0,0,2,0,0,2*K.1,2*K.1^-1,0,0,5,2,2,2,-1,-1,-1,-4,2,2,2,5,5,5,-1,-1,-1,-1,-1,2,2,2,-1,-1,-1,2,2,2,-1,-1,-1,2,2,2,5,5,5,2,2,2,-4,-4,-4,-4,5,-1,-4,-1,-4,-4,-4,2,2,2,-1,-1,-1,-1,-1,-1,2*K.1^-1,2*K.1,-1*K.1^-1,-1*K.1,-1*K.1,-1*K.1^-1,0,3,3,3,-3,-3,-3,0,0,0,3,3,3,0,0,0,3,3,3,0,0,0,-3,-3,0,0,0,-3,-3,-3,0,0,0,-3,-3,-3,0,0,0,3,3,3,-2,-2,-2,1,1,1,0,0,0,1,1,1,-2,-2,-2,0,0,0,0,0,0,0,0,0,-1,0,0,-1*K.1,-1*K.1^-1,2*K.1^-1,2*K.1,2*K.1,2*K.1^-1,2*K.1^-1,2*K.1,-1*K.1^-1,-1*K.1,-1*K.1,-1*K.1^-1,-1*K.1^-1,-1*K.1,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; K := CyclotomicField(3: Sparse := true); S := [ K |8,6,4,0,2,0,8,8,8,8,2*K.1,2*K.1^-1,0,0,6,6,6,4,4,0,0,2,0,0,2*K.1^-1,2*K.1,0,0,5,2,2,2,-1,-1,-1,-4,2,2,2,5,5,5,-1,-1,-1,-1,-1,2,2,2,-1,-1,-1,2,2,2,-1,-1,-1,2,2,2,5,5,5,2,2,2,-4,-4,-4,-4,5,-1,-4,-1,-4,-4,-4,2,2,2,-1,-1,-1,-1,-1,-1,2*K.1,2*K.1^-1,-1*K.1,-1*K.1^-1,-1*K.1^-1,-1*K.1,0,3,3,3,-3,-3,-3,0,0,0,3,3,3,0,0,0,3,3,3,0,0,0,-3,-3,0,0,0,-3,-3,-3,0,0,0,-3,-3,-3,0,0,0,3,3,3,-2,-2,-2,1,1,1,0,0,0,1,1,1,-2,-2,-2,0,0,0,0,0,0,0,0,0,-1,0,0,-1*K.1^-1,-1*K.1,2*K.1,2*K.1^-1,2*K.1^-1,2*K.1,2*K.1,2*K.1^-1,-1*K.1,-1*K.1^-1,-1*K.1^-1,-1*K.1,-1*K.1,-1*K.1^-1,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; K := CyclotomicField(3: Sparse := true); S := [ K |8,-6,4,0,-2,0,8,8,8,8,2*K.1^-1,2*K.1,0,0,-6,-6,-6,4,4,0,0,-2,0,0,-2*K.1,-2*K.1^-1,0,0,5,2,2,2,-1,-1,-1,-4,2,2,2,5,5,5,-1,-1,-1,-1,-1,2,2,2,-1,-1,-1,2,2,2,-1,-1,-1,2,2,2,5,5,5,2,2,2,-4,-4,-4,-4,5,-1,-4,-1,-4,-4,-4,2,2,2,-1,-1,-1,-1,-1,-1,2*K.1^-1,2*K.1,-1*K.1^-1,-1*K.1,-1*K.1,-1*K.1^-1,0,-3,-3,-3,3,3,3,0,0,0,-3,-3,-3,0,0,0,-3,-3,-3,0,0,0,3,3,0,0,0,3,3,3,0,0,0,3,3,3,0,0,0,-3,-3,-3,-2,-2,-2,1,1,1,0,0,0,1,1,1,-2,-2,-2,0,0,0,0,0,0,0,0,0,1,0,0,K.1,K.1^-1,2*K.1^-1,2*K.1,2*K.1,2*K.1^-1,2*K.1^-1,2*K.1,-1*K.1^-1,-1*K.1,-1*K.1,-1*K.1^-1,-1*K.1^-1,-1*K.1,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; K := CyclotomicField(3: Sparse := true); S := [ K |8,-6,4,0,-2,0,8,8,8,8,2*K.1,2*K.1^-1,0,0,-6,-6,-6,4,4,0,0,-2,0,0,-2*K.1^-1,-2*K.1,0,0,5,2,2,2,-1,-1,-1,-4,2,2,2,5,5,5,-1,-1,-1,-1,-1,2,2,2,-1,-1,-1,2,2,2,-1,-1,-1,2,2,2,5,5,5,2,2,2,-4,-4,-4,-4,5,-1,-4,-1,-4,-4,-4,2,2,2,-1,-1,-1,-1,-1,-1,2*K.1,2*K.1^-1,-1*K.1,-1*K.1^-1,-1*K.1^-1,-1*K.1,0,-3,-3,-3,3,3,3,0,0,0,-3,-3,-3,0,0,0,-3,-3,-3,0,0,0,3,3,0,0,0,3,3,3,0,0,0,3,3,3,0,0,0,-3,-3,-3,-2,-2,-2,1,1,1,0,0,0,1,1,1,-2,-2,-2,0,0,0,0,0,0,0,0,0,1,0,0,K.1^-1,K.1,2*K.1,2*K.1^-1,2*K.1^-1,2*K.1,2*K.1,2*K.1^-1,-1*K.1,-1*K.1^-1,-1*K.1^-1,-1*K.1,-1*K.1,-1*K.1^-1,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; x := CR!\[16, 0, 0, 4, 0, 0, 16, 16, 16, 16, 4, 4, 0, 0, 0, 0, 0, 0, 0, 4, 4, 0, 0, 0, 0, 0, 0, 0, -8, 4, 4, 4, -2, -2, -2, 1, 4, 4, 4, -8, -8, -8, -2, -2, -2, -2, -2, 4, 4, 4, -2, -2, -2, 4, 4, 4, -2, -2, -2, 4, 4, 4, -8, -8, -8, 4, 4, 4, 1, 1, 1, 1, -8, -2, 1, -2, 1, 1, 1, 4, 4, 4, -2, -2, -2, -2, -2, -2, 4, 4, -2, -2, -2, -2, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1, 1, 1, 0, 0, 0, 0, 0, 0, -2, -2, -2, -2, -2, -2, 1, 1, 1, 0, 0, 0, 0, 0, -2, -2, -2, -2, -2, -2, 1, 1, 1, 1, 1, 1, 0, 0, 0, 0, 0, 0, 0, 0, 0]; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(3: Sparse := true); S := [ K |16,0,0,4,0,0,16,16,16,16,4*K.1^-1,4*K.1,0,0,0,0,0,0,0,4,4,0,0,0,0,0,0,0,-8,4,4,4,-2,-2,-2,1,4,4,4,-8,-8,-8,-2,-2,-2,-2,-2,4,4,4,-2,-2,-2,4,4,4,-2,-2,-2,4,4,4,-8,-8,-8,4,4,4,1,1,1,1,-8,-2,1,-2,1,1,1,4,4,4,-2,-2,-2,-2,-2,-2,4*K.1^-1,4*K.1,-2*K.1^-1,-2*K.1,-2*K.1,-2*K.1^-1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,1,1,1,0,0,0,0,0,0,-2,-2,-2,-2,-2,-2,1,1,1,0,0,0,0,0,-2*K.1^-1,-2*K.1,-2*K.1,-2*K.1^-1,-2*K.1^-1,-2*K.1,K.1^-1,K.1,K.1,K.1^-1,K.1^-1,K.1,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; K := CyclotomicField(3: Sparse := true); S := [ K |16,0,0,4,0,0,16,16,16,16,4*K.1,4*K.1^-1,0,0,0,0,0,0,0,4,4,0,0,0,0,0,0,0,-8,4,4,4,-2,-2,-2,1,4,4,4,-8,-8,-8,-2,-2,-2,-2,-2,4,4,4,-2,-2,-2,4,4,4,-2,-2,-2,4,4,4,-8,-8,-8,4,4,4,1,1,1,1,-8,-2,1,-2,1,1,1,4,4,4,-2,-2,-2,-2,-2,-2,4*K.1,4*K.1^-1,-2*K.1,-2*K.1^-1,-2*K.1^-1,-2*K.1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,1,1,1,0,0,0,0,0,0,-2,-2,-2,-2,-2,-2,1,1,1,0,0,0,0,0,-2*K.1,-2*K.1^-1,-2*K.1^-1,-2*K.1,-2*K.1,-2*K.1^-1,K.1,K.1^-1,K.1^-1,K.1,K.1,K.1^-1,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; x := CR!\[24, 12, 4, 4, 0, 0, 24, 24, 24, 24, 0, 0, 2, 0, 12, 12, 12, 4, 4, 4, 4, 0, 0, 0, 0, 0, 0, 0, 6, -3, -3, -3, -3, -3, -3, 6, -3, -3, -3, 6, 6, 6, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, 6, 6, 6, -3, -3, -3, 6, 6, 6, 6, 6, -3, 6, -3, 6, 6, 6, -3, -3, -3, -3, -3, -3, -3, -3, -3, 0, 0, 0, 0, 0, 0, 2, 0, 0, 0, 3, 3, 3, -3, -3, -3, 0, 0, 0, -3, -3, -3, 0, 0, 0, -3, -3, -3, 3, 3, -3, -3, -3, 3, 3, 3, -3, -3, -3, 3, 3, 3, -3, -3, -3, 0, 0, 0, 1, 1, 1, -2, -2, -2, -2, -2, -2, -2, -2, -2, 1, 1, 1, 1, 1, 1, 1, 1, 1, -2, -2, -2, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, -1, -1, -1, 0, 0, 0, 0, 0, 0]; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; x := CR!\[24, 18, 12, 0, 6, 0, 15, -12, 6, -3, 0, 0, 0, 0, 9, -9, 0, -6, 3, 0, 0, -3, 0, 0, 0, 0, 0, 0, 18, 12, 12, 12, 6, 6, 6, 0, 12, 12, 12, 9, 9, 9, -3, -3, -3, 6, 6, 3, 3, 3, 6, 6, 6, 3, 3, 3, 6, 6, 6, 3, 3, 3, 0, 0, 0, -6, -6, -6, 0, 0, 0, 0, -9, -3, 0, -3, 0, 0, 0, -6, -6, -6, -3, -3, -3, -3, -3, -3, 0, 0, 0, 0, 0, 0, 0, 12, 12, 12, 0, 0, 0, 6, 6, 6, 3, 3, 3, 6, 6, 6, 3, 3, 3, 6, 6, 6, 0, 0, -3, -3, -3, 0, 0, 0, -3, -3, -3, 0, 0, 0, -3, -3, -3, -6, -6, -6, 0, 0, 0, 6, 6, 6, 0, 0, 0, -3, -3, -3, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0]; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; x := CR!\[24, -6, -4, 0, 6, 0, 24, 24, 24, 24, 0, 0, 0, 0, -6, -6, -6, -4, -4, 0, 0, 6, 0, 0, 0, 0, 0, 0, 15, 6, 6, 6, -3, -3, -3, -12, 6, 6, 6, 15, 15, 15, -3, -3, -3, -3, -3, 6, 6, 6, -3, -3, -3, 6, 6, 6, -3, -3, -3, 6, 6, 6, 15, 15, 15, 6, 6, 6, -12, -12, -12, -12, 15, -3, -12, -3, -12, -12, -12, 6, 6, 6, -3, -3, -3, -3, -3, -3, 0, 0, 0, 0, 0, 0, 0, -3, -3, -3, 3, 3, 3, 0, 0, 0, -3, -3, -3, 0, 0, 0, -3, -3, -3, 0, 0, 0, 3, 3, 0, 0, 0, 3, 3, 3, 0, 0, 0, 3, 3, 3, 0, 0, 0, -3, -3, -3, 2, 2, 2, -1, -1, -1, 0, 0, 0, -1, -1, -1, 2, 2, 2, 0, 0, 0, 0, 0, 0, 0, 0, 0, -3, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0]; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; x := CR!\[24, -18, 12, 0, -6, 0, 15, -12, 6, -3, 0, 0, 0, 0, -9, 9, 0, -6, 3, 0, 0, 3, 0, 0, 0, 0, 0, 0, 18, 12, 12, 12, 6, 6, 6, 0, 12, 12, 12, 9, 9, 9, -3, -3, -3, 6, 6, 3, 3, 3, 6, 6, 6, 3, 3, 3, 6, 6, 6, 3, 3, 3, 0, 0, 0, -6, -6, -6, 0, 0, 0, 0, -9, -3, 0, -3, 0, 0, 0, -6, -6, -6, -3, -3, -3, -3, -3, -3, 0, 0, 0, 0, 0, 0, 0, -12, -12, -12, 0, 0, 0, -6, -6, -6, -3, -3, -3, -6, -6, -6, -3, -3, -3, -6, -6, -6, 0, 0, 3, 3, 3, 0, 0, 0, 3, 3, 3, 0, 0, 0, 3, 3, 3, 6, 6, 6, 0, 0, 0, 6, 6, 6, 0, 0, 0, -3, -3, -3, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0]; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; x := CR!\[24, -12, 4, -4, 0, 0, 24, 24, 24, 24, 0, 0, 2, 0, -12, -12, -12, 4, 4, -4, -4, 0, 0, 0, 0, 0, 0, 0, 6, -3, -3, -3, -3, -3, -3, 6, -3, -3, -3, 6, 6, 6, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, 6, 6, 6, -3, -3, -3, 6, 6, 6, 6, 6, -3, 6, -3, 6, 6, 6, -3, -3, -3, -3, -3, -3, -3, -3, -3, 0, 0, 0, 0, 0, 0, 2, 0, 0, 0, -3, -3, -3, 3, 3, 3, 0, 0, 0, 3, 3, 3, 0, 0, 0, 3, 3, 3, -3, -3, 3, 3, 3, -3, -3, -3, 3, 3, 3, -3, -3, -3, 3, 3, 3, 0, 0, 0, 1, 1, 1, -2, -2, -2, 2, 2, 2, -2, -2, -2, 1, 1, 1, -1, -1, -1, -1, -1, -1, 2, 2, 2, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, -1, -1, -1, 0, 0, 0, 0, 0, 0]; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; x := CR!\[24, -12, 4, 4, 0, 0, 24, 24, 24, 24, 0, 0, -2, 0, -12, -12, -12, 4, 4, 4, 4, 0, 0, 0, 0, 0, 0, 0, 6, -3, -3, -3, -3, -3, -3, 6, -3, -3, -3, 6, 6, 6, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, 6, 6, 6, -3, -3, -3, 6, 6, 6, 6, 6, -3, 6, -3, 6, 6, 6, -3, -3, -3, -3, -3, -3, -3, -3, -3, 0, 0, 0, 0, 0, 0, -2, 0, 0, 0, -3, -3, -3, 3, 3, 3, 0, 0, 0, 3, 3, 3, 0, 0, 0, 3, 3, 3, -3, -3, 3, 3, 3, -3, -3, -3, 3, 3, 3, -3, -3, -3, 3, 3, 3, 0, 0, 0, 1, 1, 1, -2, -2, -2, -2, -2, -2, -2, -2, -2, 1, 1, 1, 1, 1, 1, 1, 1, 1, -2, -2, -2, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1, 1, 1, 0, 0, 0, 0, 0, 0]; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; x := CR!\[24, 6, -4, 0, -6, 0, 24, 24, 24, 24, 0, 0, 0, 0, 6, 6, 6, -4, -4, 0, 0, -6, 0, 0, 0, 0, 0, 0, 15, 6, 6, 6, -3, -3, -3, -12, 6, 6, 6, 15, 15, 15, -3, -3, -3, -3, -3, 6, 6, 6, -3, -3, -3, 6, 6, 6, -3, -3, -3, 6, 6, 6, 15, 15, 15, 6, 6, 6, -12, -12, -12, -12, 15, -3, -12, -3, -12, -12, -12, 6, 6, 6, -3, -3, -3, -3, -3, -3, 0, 0, 0, 0, 0, 0, 0, 3, 3, 3, -3, -3, -3, 0, 0, 0, 3, 3, 3, 0, 0, 0, 3, 3, 3, 0, 0, 0, -3, -3, 0, 0, 0, -3, -3, -3, 0, 0, 0, -3, -3, -3, 0, 0, 0, 3, 3, 3, 2, 2, 2, -1, -1, -1, 0, 0, 0, -1, -1, -1, 2, 2, 2, 0, 0, 0, 0, 0, 0, 0, 0, 0, 3, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0]; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; x := CR!\[24, 12, 4, -4, 0, 0, 24, 24, 24, 24, 0, 0, -2, 0, 12, 12, 12, 4, 4, -4, -4, 0, 0, 0, 0, 0, 0, 0, 6, -3, -3, -3, -3, -3, -3, 6, -3, -3, -3, 6, 6, 6, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, -3, 6, 6, 6, -3, -3, -3, 6, 6, 6, 6, 6, -3, 6, -3, 6, 6, 6, -3, -3, -3, -3, -3, -3, -3, -3, -3, 0, 0, 0, 0, 0, 0, -2, 0, 0, 0, 3, 3, 3, -3, -3, -3, 0, 0, 0, -3, -3, -3, 0, 0, 0, -3, -3, -3, 3, 3, -3, -3, -3, 3, 3, 3, -3, -3, -3, 3, 3, 3, -3, -3, -3, 0, 0, 0, 1, 1, 1, -2, -2, -2, 2, 2, 2, -2, -2, -2, 1, 1, 1, -1, -1, -1, -1, -1, -1, 2, 2, 2, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1, 1, 1, 0, 0, 0, 0, 0, 0]; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |24,12,4,4,0,0,6,6,-3,-3,0,0,2,0,0,3,-3,1,-2,1,-2,0,0,0,0,0,0,0,12,6-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,6+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,6+K.1-K.1^2-4*K.1^4-5*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,12,3+K.1-K.1^2+2*K.1^4+K.1^-4,3+K.1-K.1^2-K.1^4-2*K.1^-4,3-2*K.1+2*K.1^2-K.1^4+K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3,6,-3+K.1-K.1^2+5*K.1^4+4*K.1^-4,-3+4*K.1-4*K.1^2-K.1^4-5*K.1^-4,-3-5*K.1+5*K.1^2-4*K.1^4+K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3+K.1-K.1^2-4*K.1^4-5*K.1^-4,-3-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,-3+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,-3+3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,3+K.1-K.1^2+2*K.1^4+K.1^-4,3+K.1-K.1^2-K.1^4-2*K.1^-4,3-2*K.1+2*K.1^2-K.1^4+K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,3,3,6,3,-3,-3-3*K.1+3*K.1^2-3*K.1^4,-3+3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,0,0,0,0,0,0,0,0,0,-1,4-2*K.1+2*K.1^2+2*K.1^-4,4-2*K.1^4-2*K.1^-4,4+2*K.1-2*K.1^2+2*K.1^4,-3-3*K.1+3*K.1^2-3*K.1^4,-3+3*K.1-3*K.1^2-3*K.1^-4,-3+3*K.1^4+3*K.1^-4,-1-4*K.1+4*K.1^2-3*K.1^4+K.1^-4,-1+3*K.1-3*K.1^2-K.1^4-4*K.1^-4,-1+K.1-K.1^2+4*K.1^4+3*K.1^-4,-2+K.1-K.1^2+3*K.1^4+2*K.1^-4,-2-3*K.1+3*K.1^2-2*K.1^4+K.1^-4,-2+2*K.1-2*K.1^2-K.1^4-3*K.1^-4,-1+2*K.1-2*K.1^2+3*K.1^4+K.1^-4,-1-3*K.1+3*K.1^2-K.1^4+2*K.1^-4,-1+K.1-K.1^2-2*K.1^4-3*K.1^-4,-2-2*K.1+2*K.1^2-3*K.1^4-K.1^-4,-2+3*K.1-3*K.1^2+K.1^4-2*K.1^-4,-2-K.1+K.1^2+2*K.1^4+3*K.1^-4,2+K.1-K.1^2-2*K.1^4-3*K.1^-4,2+2*K.1-2*K.1^2+3*K.1^4+K.1^-4,2-3*K.1+3*K.1^2-K.1^4+2*K.1^-4,-3,6,-1-K.1+K.1^2+K.1^-4,-1-K.1^4-K.1^-4,-1+K.1-K.1^2+K.1^4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1+2*K.1-2*K.1^2+3*K.1^4+K.1^-4,-1-3*K.1+3*K.1^2-K.1^4+2*K.1^-4,-1+K.1-K.1^2-2*K.1^4-3*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,2-K.1^4-K.1^-4,2+K.1-K.1^2+K.1^4,2-K.1+K.1^2+K.1^-4,1-K.1+K.1^2-K.1^4,1+K.1-K.1^2-K.1^-4,1+K.1^4+K.1^-4,2+K.1^4+K.1^-4,2-K.1+K.1^2-K.1^4,2+K.1-K.1^2-K.1^-4,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,-1+K.1^4+K.1^-4,-1-K.1+K.1^2-K.1^4,-1+K.1-K.1^2-K.1^-4,2-K.1+K.1^2-K.1^4,2+K.1-K.1^2-K.1^-4,2+K.1^4+K.1^-4,-1+K.1^4+K.1^-4,-1-K.1+K.1^2-K.1^4,-1+K.1-K.1^2-K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1^2+K.1^-2,K.1+K.1^-1,K.1^4+K.1^-4,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |24,12,4,4,0,0,6,6,-3,-3,0,0,2,0,0,3,-3,1,-2,1,-2,0,0,0,0,0,0,0,12,6+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,6+K.1-K.1^2-4*K.1^4-5*K.1^-4,6-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,12,3+K.1-K.1^2-K.1^4-2*K.1^-4,3-2*K.1+2*K.1^2-K.1^4+K.1^-4,3+K.1-K.1^2+2*K.1^4+K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3,6,-3+4*K.1-4*K.1^2-K.1^4-5*K.1^-4,-3-5*K.1+5*K.1^2-4*K.1^4+K.1^-4,-3+K.1-K.1^2+5*K.1^4+4*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,-3+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,-3+K.1-K.1^2-4*K.1^4-5*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,-3+3*K.1^4+3*K.1^-4,3+K.1-K.1^2-K.1^4-2*K.1^-4,3-2*K.1+2*K.1^2-K.1^4+K.1^-4,3+K.1-K.1^2+2*K.1^4+K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,3,3,6,3,-3,-3+3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,K.1-K.1^2+2*K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,0,0,0,0,0,0,0,0,0,-1,4+2*K.1-2*K.1^2+2*K.1^4,4-2*K.1+2*K.1^2+2*K.1^-4,4-2*K.1^4-2*K.1^-4,-3+3*K.1^4+3*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,-3+3*K.1-3*K.1^2-3*K.1^-4,-1+K.1-K.1^2+4*K.1^4+3*K.1^-4,-1-4*K.1+4*K.1^2-3*K.1^4+K.1^-4,-1+3*K.1-3*K.1^2-K.1^4-4*K.1^-4,-2+2*K.1-2*K.1^2-K.1^4-3*K.1^-4,-2+K.1-K.1^2+3*K.1^4+2*K.1^-4,-2-3*K.1+3*K.1^2-2*K.1^4+K.1^-4,-1+K.1-K.1^2-2*K.1^4-3*K.1^-4,-1+2*K.1-2*K.1^2+3*K.1^4+K.1^-4,-1-3*K.1+3*K.1^2-K.1^4+2*K.1^-4,-2-K.1+K.1^2+2*K.1^4+3*K.1^-4,-2-2*K.1+2*K.1^2-3*K.1^4-K.1^-4,-2+3*K.1-3*K.1^2+K.1^4-2*K.1^-4,2-3*K.1+3*K.1^2-K.1^4+2*K.1^-4,2+K.1-K.1^2-2*K.1^4-3*K.1^-4,2+2*K.1-2*K.1^2+3*K.1^4+K.1^-4,-3,6,-1+K.1-K.1^2+K.1^4,-1-K.1+K.1^2+K.1^-4,-1-K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,-1+K.1-K.1^2-2*K.1^4-3*K.1^-4,-1+2*K.1-2*K.1^2+3*K.1^4+K.1^-4,-1-3*K.1+3*K.1^2-K.1^4+2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,2-K.1+K.1^2+K.1^-4,2-K.1^4-K.1^-4,2+K.1-K.1^2+K.1^4,1+K.1^4+K.1^-4,1-K.1+K.1^2-K.1^4,1+K.1-K.1^2-K.1^-4,2+K.1-K.1^2-K.1^-4,2+K.1^4+K.1^-4,2-K.1+K.1^2-K.1^4,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,-1+K.1-K.1^2-K.1^-4,-1+K.1^4+K.1^-4,-1-K.1+K.1^2-K.1^4,2+K.1^4+K.1^-4,2-K.1+K.1^2-K.1^4,2+K.1-K.1^2-K.1^-4,-1+K.1-K.1^2-K.1^-4,-1+K.1^4+K.1^-4,-1-K.1+K.1^2-K.1^4,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1^4+K.1^-4,K.1^2+K.1^-2,K.1+K.1^-1,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |24,12,4,4,0,0,6,6,-3,-3,0,0,2,0,0,3,-3,1,-2,1,-2,0,0,0,0,0,0,0,12,6+K.1-K.1^2-4*K.1^4-5*K.1^-4,6-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,6+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,12,3-2*K.1+2*K.1^2-K.1^4+K.1^-4,3+K.1-K.1^2+2*K.1^4+K.1^-4,3+K.1-K.1^2-K.1^4-2*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3,6,-3-5*K.1+5*K.1^2-4*K.1^4+K.1^-4,-3+K.1-K.1^2+5*K.1^4+4*K.1^-4,-3+4*K.1-4*K.1^2-K.1^4-5*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,-3+K.1-K.1^2-4*K.1^4-5*K.1^-4,-3-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,-3+3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^-4,3-2*K.1+2*K.1^2-K.1^4+K.1^-4,3+K.1-K.1^2+2*K.1^4+K.1^-4,3+K.1-K.1^2-K.1^4-2*K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,3,3,6,3,-3,-3+3*K.1-3*K.1^2-3*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,-3+3*K.1^4+3*K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,0,0,0,0,0,0,0,0,0,-1,4-2*K.1^4-2*K.1^-4,4+2*K.1-2*K.1^2+2*K.1^4,4-2*K.1+2*K.1^2+2*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^-4,-3+3*K.1^4+3*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,-1+3*K.1-3*K.1^2-K.1^4-4*K.1^-4,-1+K.1-K.1^2+4*K.1^4+3*K.1^-4,-1-4*K.1+4*K.1^2-3*K.1^4+K.1^-4,-2-3*K.1+3*K.1^2-2*K.1^4+K.1^-4,-2+2*K.1-2*K.1^2-K.1^4-3*K.1^-4,-2+K.1-K.1^2+3*K.1^4+2*K.1^-4,-1-3*K.1+3*K.1^2-K.1^4+2*K.1^-4,-1+K.1-K.1^2-2*K.1^4-3*K.1^-4,-1+2*K.1-2*K.1^2+3*K.1^4+K.1^-4,-2+3*K.1-3*K.1^2+K.1^4-2*K.1^-4,-2-K.1+K.1^2+2*K.1^4+3*K.1^-4,-2-2*K.1+2*K.1^2-3*K.1^4-K.1^-4,2+2*K.1-2*K.1^2+3*K.1^4+K.1^-4,2-3*K.1+3*K.1^2-K.1^4+2*K.1^-4,2+K.1-K.1^2-2*K.1^4-3*K.1^-4,-3,6,-1-K.1^4-K.1^-4,-1+K.1-K.1^2+K.1^4,-1-K.1+K.1^2+K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1-3*K.1+3*K.1^2-K.1^4+2*K.1^-4,-1+K.1-K.1^2-2*K.1^4-3*K.1^-4,-1+2*K.1-2*K.1^2+3*K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,2+K.1-K.1^2+K.1^4,2-K.1+K.1^2+K.1^-4,2-K.1^4-K.1^-4,1+K.1-K.1^2-K.1^-4,1+K.1^4+K.1^-4,1-K.1+K.1^2-K.1^4,2-K.1+K.1^2-K.1^4,2+K.1-K.1^2-K.1^-4,2+K.1^4+K.1^-4,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1-K.1+K.1^2-K.1^4,-1+K.1-K.1^2-K.1^-4,-1+K.1^4+K.1^-4,2+K.1-K.1^2-K.1^-4,2+K.1^4+K.1^-4,2-K.1+K.1^2-K.1^4,-1-K.1+K.1^2-K.1^4,-1+K.1-K.1^2-K.1^-4,-1+K.1^4+K.1^-4,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1+K.1^-1,K.1^4+K.1^-4,K.1^2+K.1^-2,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |24,-6,-4,0,6,0,15,-12,6,-3,0,0,0,0,-3,3,0,2,-1,0,0,-3,0,0,0,0,0,0,18,12,12,12,6,6,6,0,12,12,12,9,9,9,-3,-3,-3,6,6,3,3,3,6,6,6,3,3,3,6,6,6,3,3,3,0,0,0,-6,-6,-6,0,0,0,0,-9,-3,0,-3,0,0,0,-6,-6,-6,-3,-3,-3,-3,-3,-3,0,0,0,0,0,0,0,-4+2*K.1^4+2*K.1^-4,-4-2*K.1+2*K.1^2-2*K.1^4,-4+2*K.1-2*K.1^2-2*K.1^-4,6*K.1^4+6*K.1^-4,6*K.1^2+6*K.1^-2,6*K.1+6*K.1^-1,-2-2*K.1+2*K.1^2+2*K.1^-4,-2-2*K.1^4-2*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,-1+2*K.1^4+2*K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,-1+2*K.1-2*K.1^2-2*K.1^-4,-2+4*K.1-4*K.1^2-4*K.1^-4,-2+4*K.1^4+4*K.1^-4,-2-4*K.1+4*K.1^2-4*K.1^4,-1+2*K.1^4+2*K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,-1+2*K.1-2*K.1^2-2*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,-2-2*K.1+2*K.1^2+2*K.1^-4,-2-2*K.1^4-2*K.1^-4,0,0,1+4*K.1-4*K.1^2-4*K.1^-4,1+4*K.1^4+4*K.1^-4,1-4*K.1+4*K.1^2-4*K.1^4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,1-2*K.1+2*K.1^2+2*K.1^-4,1-2*K.1^4-2*K.1^-4,1+2*K.1-2*K.1^2+2*K.1^4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,1-2*K.1^4-2*K.1^-4,1+2*K.1-2*K.1^2+2*K.1^4,1-2*K.1+2*K.1^2+2*K.1^-4,2+2*K.1-2*K.1^2-2*K.1^-4,2+2*K.1^4+2*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,4*K.1+4*K.1^-1,4*K.1^4+4*K.1^-4,4*K.1^2+4*K.1^-2,-2+2*K.1^4+2*K.1^-4,-2-2*K.1+2*K.1^2-2*K.1^4,-2+2*K.1-2*K.1^2-2*K.1^-4,0,0,0,1+2*K.1^4+2*K.1^-4,1-2*K.1+2*K.1^2-2*K.1^4,1+2*K.1-2*K.1^2-2*K.1^-4,-2*K.1-2*K.1^-1,-2*K.1^4-2*K.1^-4,-2*K.1^2-2*K.1^-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |24,-6,-4,0,6,0,15,-12,6,-3,0,0,0,0,-3,3,0,2,-1,0,0,-3,0,0,0,0,0,0,18,12,12,12,6,6,6,0,12,12,12,9,9,9,-3,-3,-3,6,6,3,3,3,6,6,6,3,3,3,6,6,6,3,3,3,0,0,0,-6,-6,-6,0,0,0,0,-9,-3,0,-3,0,0,0,-6,-6,-6,-3,-3,-3,-3,-3,-3,0,0,0,0,0,0,0,-4-2*K.1+2*K.1^2-2*K.1^4,-4+2*K.1-2*K.1^2-2*K.1^-4,-4+2*K.1^4+2*K.1^-4,6*K.1^2+6*K.1^-2,6*K.1+6*K.1^-1,6*K.1^4+6*K.1^-4,-2-2*K.1^4-2*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,-2-2*K.1+2*K.1^2+2*K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,-1+2*K.1-2*K.1^2-2*K.1^-4,-1+2*K.1^4+2*K.1^-4,-2+4*K.1^4+4*K.1^-4,-2-4*K.1+4*K.1^2-4*K.1^4,-2+4*K.1-4*K.1^2-4*K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,-1+2*K.1-2*K.1^2-2*K.1^-4,-1+2*K.1^4+2*K.1^-4,-2-2*K.1+2*K.1^2+2*K.1^-4,-2-2*K.1^4-2*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,0,0,1+4*K.1^4+4*K.1^-4,1-4*K.1+4*K.1^2-4*K.1^4,1+4*K.1-4*K.1^2-4*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,1-2*K.1^4-2*K.1^-4,1+2*K.1-2*K.1^2+2*K.1^4,1-2*K.1+2*K.1^2+2*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,1+2*K.1-2*K.1^2+2*K.1^4,1-2*K.1+2*K.1^2+2*K.1^-4,1-2*K.1^4-2*K.1^-4,2+2*K.1^4+2*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,2+2*K.1-2*K.1^2-2*K.1^-4,4*K.1^4+4*K.1^-4,4*K.1^2+4*K.1^-2,4*K.1+4*K.1^-1,-2-2*K.1+2*K.1^2-2*K.1^4,-2+2*K.1-2*K.1^2-2*K.1^-4,-2+2*K.1^4+2*K.1^-4,0,0,0,1-2*K.1+2*K.1^2-2*K.1^4,1+2*K.1-2*K.1^2-2*K.1^-4,1+2*K.1^4+2*K.1^-4,-2*K.1^4-2*K.1^-4,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |24,-6,-4,0,6,0,15,-12,6,-3,0,0,0,0,-3,3,0,2,-1,0,0,-3,0,0,0,0,0,0,18,12,12,12,6,6,6,0,12,12,12,9,9,9,-3,-3,-3,6,6,3,3,3,6,6,6,3,3,3,6,6,6,3,3,3,0,0,0,-6,-6,-6,0,0,0,0,-9,-3,0,-3,0,0,0,-6,-6,-6,-3,-3,-3,-3,-3,-3,0,0,0,0,0,0,0,-4+2*K.1-2*K.1^2-2*K.1^-4,-4+2*K.1^4+2*K.1^-4,-4-2*K.1+2*K.1^2-2*K.1^4,6*K.1+6*K.1^-1,6*K.1^4+6*K.1^-4,6*K.1^2+6*K.1^-2,-2+2*K.1-2*K.1^2+2*K.1^4,-2-2*K.1+2*K.1^2+2*K.1^-4,-2-2*K.1^4-2*K.1^-4,-1+2*K.1-2*K.1^2-2*K.1^-4,-1+2*K.1^4+2*K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,-2-4*K.1+4*K.1^2-4*K.1^4,-2+4*K.1-4*K.1^2-4*K.1^-4,-2+4*K.1^4+4*K.1^-4,-1+2*K.1-2*K.1^2-2*K.1^-4,-1+2*K.1^4+2*K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,-2-2*K.1^4-2*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,-2-2*K.1+2*K.1^2+2*K.1^-4,0,0,1-4*K.1+4*K.1^2-4*K.1^4,1+4*K.1-4*K.1^2-4*K.1^-4,1+4*K.1^4+4*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,1+2*K.1-2*K.1^2+2*K.1^4,1-2*K.1+2*K.1^2+2*K.1^-4,1-2*K.1^4-2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,1-2*K.1+2*K.1^2+2*K.1^-4,1-2*K.1^4-2*K.1^-4,1+2*K.1-2*K.1^2+2*K.1^4,2-2*K.1+2*K.1^2-2*K.1^4,2+2*K.1-2*K.1^2-2*K.1^-4,2+2*K.1^4+2*K.1^-4,4*K.1^2+4*K.1^-2,4*K.1+4*K.1^-1,4*K.1^4+4*K.1^-4,-2+2*K.1-2*K.1^2-2*K.1^-4,-2+2*K.1^4+2*K.1^-4,-2-2*K.1+2*K.1^2-2*K.1^4,0,0,0,1+2*K.1-2*K.1^2-2*K.1^-4,1+2*K.1^4+2*K.1^-4,1-2*K.1+2*K.1^2-2*K.1^4,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1^4-2*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |24,-12,4,-4,0,0,6,6,-3,-3,0,0,2,0,0,-3,3,1,-2,-1,2,0,0,0,0,0,0,0,12,6-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,6+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,6+K.1-K.1^2-4*K.1^4-5*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,12,3+K.1-K.1^2+2*K.1^4+K.1^-4,3+K.1-K.1^2-K.1^4-2*K.1^-4,3-2*K.1+2*K.1^2-K.1^4+K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3,6,-3+K.1-K.1^2+5*K.1^4+4*K.1^-4,-3+4*K.1-4*K.1^2-K.1^4-5*K.1^-4,-3-5*K.1+5*K.1^2-4*K.1^4+K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3+K.1-K.1^2-4*K.1^4-5*K.1^-4,-3-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,-3+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,-3+3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,3+K.1-K.1^2+2*K.1^4+K.1^-4,3+K.1-K.1^2-K.1^4-2*K.1^-4,3-2*K.1+2*K.1^2-K.1^4+K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,3,3,6,3,-3,-3-3*K.1+3*K.1^2-3*K.1^4,-3+3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,0,0,0,0,0,0,0,0,0,-1,-4+2*K.1-2*K.1^2-2*K.1^-4,-4+2*K.1^4+2*K.1^-4,-4-2*K.1+2*K.1^2-2*K.1^4,3+3*K.1-3*K.1^2+3*K.1^4,3-3*K.1+3*K.1^2+3*K.1^-4,3-3*K.1^4-3*K.1^-4,1+4*K.1-4*K.1^2+3*K.1^4-K.1^-4,1-3*K.1+3*K.1^2+K.1^4+4*K.1^-4,1-K.1+K.1^2-4*K.1^4-3*K.1^-4,2-K.1+K.1^2-3*K.1^4-2*K.1^-4,2+3*K.1-3*K.1^2+2*K.1^4-K.1^-4,2-2*K.1+2*K.1^2+K.1^4+3*K.1^-4,1-2*K.1+2*K.1^2-3*K.1^4-K.1^-4,1+3*K.1-3*K.1^2+K.1^4-2*K.1^-4,1-K.1+K.1^2+2*K.1^4+3*K.1^-4,2+2*K.1-2*K.1^2+3*K.1^4+K.1^-4,2-3*K.1+3*K.1^2-K.1^4+2*K.1^-4,2+K.1-K.1^2-2*K.1^4-3*K.1^-4,-2-K.1+K.1^2+2*K.1^4+3*K.1^-4,-2-2*K.1+2*K.1^2-3*K.1^4-K.1^-4,-2+3*K.1-3*K.1^2+K.1^4-2*K.1^-4,3,-6,1+K.1-K.1^2-K.1^-4,1+K.1^4+K.1^-4,1-K.1+K.1^2-K.1^4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,1-2*K.1+2*K.1^2-3*K.1^4-K.1^-4,1+3*K.1-3*K.1^2+K.1^4-2*K.1^-4,1-K.1+K.1^2+2*K.1^4+3*K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,-2+K.1^4+K.1^-4,-2-K.1+K.1^2-K.1^4,-2+K.1-K.1^2-K.1^-4,-1+K.1-K.1^2+K.1^4,-1-K.1+K.1^2+K.1^-4,-1-K.1^4-K.1^-4,2+K.1^4+K.1^-4,2-K.1+K.1^2-K.1^4,2+K.1-K.1^2-K.1^-4,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1^4-2*K.1^-4,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,-1+K.1^4+K.1^-4,-1-K.1+K.1^2-K.1^4,-1+K.1-K.1^2-K.1^-4,-2+K.1-K.1^2+K.1^4,-2-K.1+K.1^2+K.1^-4,-2-K.1^4-K.1^-4,1-K.1^4-K.1^-4,1+K.1-K.1^2+K.1^4,1-K.1+K.1^2+K.1^-4,K.1^4+K.1^-4,K.1^2+K.1^-2,K.1+K.1^-1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1^2+K.1^-2,K.1+K.1^-1,K.1^4+K.1^-4,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |24,-12,4,-4,0,0,6,6,-3,-3,0,0,2,0,0,-3,3,1,-2,-1,2,0,0,0,0,0,0,0,12,6+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,6+K.1-K.1^2-4*K.1^4-5*K.1^-4,6-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,12,3+K.1-K.1^2-K.1^4-2*K.1^-4,3-2*K.1+2*K.1^2-K.1^4+K.1^-4,3+K.1-K.1^2+2*K.1^4+K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3,6,-3+4*K.1-4*K.1^2-K.1^4-5*K.1^-4,-3-5*K.1+5*K.1^2-4*K.1^4+K.1^-4,-3+K.1-K.1^2+5*K.1^4+4*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,-3+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,-3+K.1-K.1^2-4*K.1^4-5*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,-3+3*K.1^4+3*K.1^-4,3+K.1-K.1^2-K.1^4-2*K.1^-4,3-2*K.1+2*K.1^2-K.1^4+K.1^-4,3+K.1-K.1^2+2*K.1^4+K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,3,3,6,3,-3,-3+3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,K.1-K.1^2+2*K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,0,0,0,0,0,0,0,0,0,-1,-4-2*K.1+2*K.1^2-2*K.1^4,-4+2*K.1-2*K.1^2-2*K.1^-4,-4+2*K.1^4+2*K.1^-4,3-3*K.1^4-3*K.1^-4,3+3*K.1-3*K.1^2+3*K.1^4,3-3*K.1+3*K.1^2+3*K.1^-4,1-K.1+K.1^2-4*K.1^4-3*K.1^-4,1+4*K.1-4*K.1^2+3*K.1^4-K.1^-4,1-3*K.1+3*K.1^2+K.1^4+4*K.1^-4,2-2*K.1+2*K.1^2+K.1^4+3*K.1^-4,2-K.1+K.1^2-3*K.1^4-2*K.1^-4,2+3*K.1-3*K.1^2+2*K.1^4-K.1^-4,1-K.1+K.1^2+2*K.1^4+3*K.1^-4,1-2*K.1+2*K.1^2-3*K.1^4-K.1^-4,1+3*K.1-3*K.1^2+K.1^4-2*K.1^-4,2+K.1-K.1^2-2*K.1^4-3*K.1^-4,2+2*K.1-2*K.1^2+3*K.1^4+K.1^-4,2-3*K.1+3*K.1^2-K.1^4+2*K.1^-4,-2+3*K.1-3*K.1^2+K.1^4-2*K.1^-4,-2-K.1+K.1^2+2*K.1^4+3*K.1^-4,-2-2*K.1+2*K.1^2-3*K.1^4-K.1^-4,3,-6,1-K.1+K.1^2-K.1^4,1+K.1-K.1^2-K.1^-4,1+K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,1-K.1+K.1^2+2*K.1^4+3*K.1^-4,1-2*K.1+2*K.1^2-3*K.1^4-K.1^-4,1+3*K.1-3*K.1^2+K.1^4-2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-2+K.1-K.1^2-K.1^-4,-2+K.1^4+K.1^-4,-2-K.1+K.1^2-K.1^4,-1-K.1^4-K.1^-4,-1+K.1-K.1^2+K.1^4,-1-K.1+K.1^2+K.1^-4,2+K.1-K.1^2-K.1^-4,2+K.1^4+K.1^-4,2-K.1+K.1^2-K.1^4,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,-2*K.1^4-2*K.1^-4,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,-1+K.1-K.1^2-K.1^-4,-1+K.1^4+K.1^-4,-1-K.1+K.1^2-K.1^4,-2-K.1^4-K.1^-4,-2+K.1-K.1^2+K.1^4,-2-K.1+K.1^2+K.1^-4,1-K.1+K.1^2+K.1^-4,1-K.1^4-K.1^-4,1+K.1-K.1^2+K.1^4,K.1+K.1^-1,K.1^4+K.1^-4,K.1^2+K.1^-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1^4+K.1^-4,K.1^2+K.1^-2,K.1+K.1^-1,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |24,-12,4,-4,0,0,6,6,-3,-3,0,0,2,0,0,-3,3,1,-2,-1,2,0,0,0,0,0,0,0,12,6+K.1-K.1^2-4*K.1^4-5*K.1^-4,6-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,6+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,12,3-2*K.1+2*K.1^2-K.1^4+K.1^-4,3+K.1-K.1^2+2*K.1^4+K.1^-4,3+K.1-K.1^2-K.1^4-2*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3,6,-3-5*K.1+5*K.1^2-4*K.1^4+K.1^-4,-3+K.1-K.1^2+5*K.1^4+4*K.1^-4,-3+4*K.1-4*K.1^2-K.1^4-5*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,-3+K.1-K.1^2-4*K.1^4-5*K.1^-4,-3-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,-3+3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^-4,3-2*K.1+2*K.1^2-K.1^4+K.1^-4,3+K.1-K.1^2+2*K.1^4+K.1^-4,3+K.1-K.1^2-K.1^4-2*K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,3,3,6,3,-3,-3+3*K.1-3*K.1^2-3*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,-3+3*K.1^4+3*K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,0,0,0,0,0,0,0,0,0,-1,-4+2*K.1^4+2*K.1^-4,-4-2*K.1+2*K.1^2-2*K.1^4,-4+2*K.1-2*K.1^2-2*K.1^-4,3-3*K.1+3*K.1^2+3*K.1^-4,3-3*K.1^4-3*K.1^-4,3+3*K.1-3*K.1^2+3*K.1^4,1-3*K.1+3*K.1^2+K.1^4+4*K.1^-4,1-K.1+K.1^2-4*K.1^4-3*K.1^-4,1+4*K.1-4*K.1^2+3*K.1^4-K.1^-4,2+3*K.1-3*K.1^2+2*K.1^4-K.1^-4,2-2*K.1+2*K.1^2+K.1^4+3*K.1^-4,2-K.1+K.1^2-3*K.1^4-2*K.1^-4,1+3*K.1-3*K.1^2+K.1^4-2*K.1^-4,1-K.1+K.1^2+2*K.1^4+3*K.1^-4,1-2*K.1+2*K.1^2-3*K.1^4-K.1^-4,2-3*K.1+3*K.1^2-K.1^4+2*K.1^-4,2+K.1-K.1^2-2*K.1^4-3*K.1^-4,2+2*K.1-2*K.1^2+3*K.1^4+K.1^-4,-2-2*K.1+2*K.1^2-3*K.1^4-K.1^-4,-2+3*K.1-3*K.1^2+K.1^4-2*K.1^-4,-2-K.1+K.1^2+2*K.1^4+3*K.1^-4,3,-6,1+K.1^4+K.1^-4,1-K.1+K.1^2-K.1^4,1+K.1-K.1^2-K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,1+3*K.1-3*K.1^2+K.1^4-2*K.1^-4,1-K.1+K.1^2+2*K.1^4+3*K.1^-4,1-2*K.1+2*K.1^2-3*K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-2-K.1+K.1^2-K.1^4,-2+K.1-K.1^2-K.1^-4,-2+K.1^4+K.1^-4,-1-K.1+K.1^2+K.1^-4,-1-K.1^4-K.1^-4,-1+K.1-K.1^2+K.1^4,2-K.1+K.1^2-K.1^4,2+K.1-K.1^2-K.1^-4,2+K.1^4+K.1^-4,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,-2*K.1-2*K.1^-1,-2*K.1^4-2*K.1^-4,-2*K.1^2-2*K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1-K.1+K.1^2-K.1^4,-1+K.1-K.1^2-K.1^-4,-1+K.1^4+K.1^-4,-2-K.1+K.1^2+K.1^-4,-2-K.1^4-K.1^-4,-2+K.1-K.1^2+K.1^4,1+K.1-K.1^2+K.1^4,1-K.1+K.1^2+K.1^-4,1-K.1^4-K.1^-4,K.1^2+K.1^-2,K.1+K.1^-1,K.1^4+K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1+K.1^-1,K.1^4+K.1^-4,K.1^2+K.1^-2,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |24,-12,4,4,0,0,6,6,-3,-3,0,0,-2,0,0,-3,3,1,-2,1,-2,0,0,0,0,0,0,0,12,6-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,6+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,6+K.1-K.1^2-4*K.1^4-5*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,12,3+K.1-K.1^2+2*K.1^4+K.1^-4,3+K.1-K.1^2-K.1^4-2*K.1^-4,3-2*K.1+2*K.1^2-K.1^4+K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3,6,-3+K.1-K.1^2+5*K.1^4+4*K.1^-4,-3+4*K.1-4*K.1^2-K.1^4-5*K.1^-4,-3-5*K.1+5*K.1^2-4*K.1^4+K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3+K.1-K.1^2-4*K.1^4-5*K.1^-4,-3-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,-3+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,-3+3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,3+K.1-K.1^2+2*K.1^4+K.1^-4,3+K.1-K.1^2-K.1^4-2*K.1^-4,3-2*K.1+2*K.1^2-K.1^4+K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,3,3,6,3,-3,-3-3*K.1+3*K.1^2-3*K.1^4,-3+3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,0,0,0,0,0,0,0,0,0,1,-4+2*K.1-2*K.1^2-2*K.1^-4,-4+2*K.1^4+2*K.1^-4,-4-2*K.1+2*K.1^2-2*K.1^4,3+3*K.1-3*K.1^2+3*K.1^4,3-3*K.1+3*K.1^2+3*K.1^-4,3-3*K.1^4-3*K.1^-4,1+4*K.1-4*K.1^2+3*K.1^4-K.1^-4,1-3*K.1+3*K.1^2+K.1^4+4*K.1^-4,1-K.1+K.1^2-4*K.1^4-3*K.1^-4,2-K.1+K.1^2-3*K.1^4-2*K.1^-4,2+3*K.1-3*K.1^2+2*K.1^4-K.1^-4,2-2*K.1+2*K.1^2+K.1^4+3*K.1^-4,1-2*K.1+2*K.1^2-3*K.1^4-K.1^-4,1+3*K.1-3*K.1^2+K.1^4-2*K.1^-4,1-K.1+K.1^2+2*K.1^4+3*K.1^-4,2+2*K.1-2*K.1^2+3*K.1^4+K.1^-4,2-3*K.1+3*K.1^2-K.1^4+2*K.1^-4,2+K.1-K.1^2-2*K.1^4-3*K.1^-4,-2-K.1+K.1^2+2*K.1^4+3*K.1^-4,-2-2*K.1+2*K.1^2-3*K.1^4-K.1^-4,-2+3*K.1-3*K.1^2+K.1^4-2*K.1^-4,3,-6,1+K.1-K.1^2-K.1^-4,1+K.1^4+K.1^-4,1-K.1+K.1^2-K.1^4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,1-2*K.1+2*K.1^2-3*K.1^4-K.1^-4,1+3*K.1-3*K.1^2+K.1^4-2*K.1^-4,1-K.1+K.1^2+2*K.1^4+3*K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,-2+K.1^4+K.1^-4,-2-K.1+K.1^2-K.1^4,-2+K.1-K.1^2-K.1^-4,-1+K.1-K.1^2+K.1^4,-1-K.1+K.1^2+K.1^-4,-1-K.1^4-K.1^-4,2+K.1^4+K.1^-4,2-K.1+K.1^2-K.1^4,2+K.1-K.1^2-K.1^-4,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,-1+K.1^4+K.1^-4,-1-K.1+K.1^2-K.1^4,-1+K.1-K.1^2-K.1^-4,2-K.1+K.1^2-K.1^4,2+K.1-K.1^2-K.1^-4,2+K.1^4+K.1^-4,-1+K.1^4+K.1^-4,-1-K.1+K.1^2-K.1^4,-1+K.1-K.1^2-K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |24,-12,4,4,0,0,6,6,-3,-3,0,0,-2,0,0,-3,3,1,-2,1,-2,0,0,0,0,0,0,0,12,6+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,6+K.1-K.1^2-4*K.1^4-5*K.1^-4,6-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,12,3+K.1-K.1^2-K.1^4-2*K.1^-4,3-2*K.1+2*K.1^2-K.1^4+K.1^-4,3+K.1-K.1^2+2*K.1^4+K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3,6,-3+4*K.1-4*K.1^2-K.1^4-5*K.1^-4,-3-5*K.1+5*K.1^2-4*K.1^4+K.1^-4,-3+K.1-K.1^2+5*K.1^4+4*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,-3+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,-3+K.1-K.1^2-4*K.1^4-5*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,-3+3*K.1^4+3*K.1^-4,3+K.1-K.1^2-K.1^4-2*K.1^-4,3-2*K.1+2*K.1^2-K.1^4+K.1^-4,3+K.1-K.1^2+2*K.1^4+K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,3,3,6,3,-3,-3+3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,K.1-K.1^2+2*K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,0,0,0,0,0,0,0,0,0,1,-4-2*K.1+2*K.1^2-2*K.1^4,-4+2*K.1-2*K.1^2-2*K.1^-4,-4+2*K.1^4+2*K.1^-4,3-3*K.1^4-3*K.1^-4,3+3*K.1-3*K.1^2+3*K.1^4,3-3*K.1+3*K.1^2+3*K.1^-4,1-K.1+K.1^2-4*K.1^4-3*K.1^-4,1+4*K.1-4*K.1^2+3*K.1^4-K.1^-4,1-3*K.1+3*K.1^2+K.1^4+4*K.1^-4,2-2*K.1+2*K.1^2+K.1^4+3*K.1^-4,2-K.1+K.1^2-3*K.1^4-2*K.1^-4,2+3*K.1-3*K.1^2+2*K.1^4-K.1^-4,1-K.1+K.1^2+2*K.1^4+3*K.1^-4,1-2*K.1+2*K.1^2-3*K.1^4-K.1^-4,1+3*K.1-3*K.1^2+K.1^4-2*K.1^-4,2+K.1-K.1^2-2*K.1^4-3*K.1^-4,2+2*K.1-2*K.1^2+3*K.1^4+K.1^-4,2-3*K.1+3*K.1^2-K.1^4+2*K.1^-4,-2+3*K.1-3*K.1^2+K.1^4-2*K.1^-4,-2-K.1+K.1^2+2*K.1^4+3*K.1^-4,-2-2*K.1+2*K.1^2-3*K.1^4-K.1^-4,3,-6,1-K.1+K.1^2-K.1^4,1+K.1-K.1^2-K.1^-4,1+K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,1-K.1+K.1^2+2*K.1^4+3*K.1^-4,1-2*K.1+2*K.1^2-3*K.1^4-K.1^-4,1+3*K.1-3*K.1^2+K.1^4-2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-2+K.1-K.1^2-K.1^-4,-2+K.1^4+K.1^-4,-2-K.1+K.1^2-K.1^4,-1-K.1^4-K.1^-4,-1+K.1-K.1^2+K.1^4,-1-K.1+K.1^2+K.1^-4,2+K.1-K.1^2-K.1^-4,2+K.1^4+K.1^-4,2-K.1+K.1^2-K.1^4,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,-1+K.1-K.1^2-K.1^-4,-1+K.1^4+K.1^-4,-1-K.1+K.1^2-K.1^4,2+K.1^4+K.1^-4,2-K.1+K.1^2-K.1^4,2+K.1-K.1^2-K.1^-4,-1+K.1-K.1^2-K.1^-4,-1+K.1^4+K.1^-4,-1-K.1+K.1^2-K.1^4,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |24,-12,4,4,0,0,6,6,-3,-3,0,0,-2,0,0,-3,3,1,-2,1,-2,0,0,0,0,0,0,0,12,6+K.1-K.1^2-4*K.1^4-5*K.1^-4,6-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,6+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,12,3-2*K.1+2*K.1^2-K.1^4+K.1^-4,3+K.1-K.1^2+2*K.1^4+K.1^-4,3+K.1-K.1^2-K.1^4-2*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3,6,-3-5*K.1+5*K.1^2-4*K.1^4+K.1^-4,-3+K.1-K.1^2+5*K.1^4+4*K.1^-4,-3+4*K.1-4*K.1^2-K.1^4-5*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,-3+K.1-K.1^2-4*K.1^4-5*K.1^-4,-3-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,-3+3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^-4,3-2*K.1+2*K.1^2-K.1^4+K.1^-4,3+K.1-K.1^2+2*K.1^4+K.1^-4,3+K.1-K.1^2-K.1^4-2*K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,3,3,6,3,-3,-3+3*K.1-3*K.1^2-3*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,-3+3*K.1^4+3*K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,0,0,0,0,0,0,0,0,0,1,-4+2*K.1^4+2*K.1^-4,-4-2*K.1+2*K.1^2-2*K.1^4,-4+2*K.1-2*K.1^2-2*K.1^-4,3-3*K.1+3*K.1^2+3*K.1^-4,3-3*K.1^4-3*K.1^-4,3+3*K.1-3*K.1^2+3*K.1^4,1-3*K.1+3*K.1^2+K.1^4+4*K.1^-4,1-K.1+K.1^2-4*K.1^4-3*K.1^-4,1+4*K.1-4*K.1^2+3*K.1^4-K.1^-4,2+3*K.1-3*K.1^2+2*K.1^4-K.1^-4,2-2*K.1+2*K.1^2+K.1^4+3*K.1^-4,2-K.1+K.1^2-3*K.1^4-2*K.1^-4,1+3*K.1-3*K.1^2+K.1^4-2*K.1^-4,1-K.1+K.1^2+2*K.1^4+3*K.1^-4,1-2*K.1+2*K.1^2-3*K.1^4-K.1^-4,2-3*K.1+3*K.1^2-K.1^4+2*K.1^-4,2+K.1-K.1^2-2*K.1^4-3*K.1^-4,2+2*K.1-2*K.1^2+3*K.1^4+K.1^-4,-2-2*K.1+2*K.1^2-3*K.1^4-K.1^-4,-2+3*K.1-3*K.1^2+K.1^4-2*K.1^-4,-2-K.1+K.1^2+2*K.1^4+3*K.1^-4,3,-6,1+K.1^4+K.1^-4,1-K.1+K.1^2-K.1^4,1+K.1-K.1^2-K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,1+3*K.1-3*K.1^2+K.1^4-2*K.1^-4,1-K.1+K.1^2+2*K.1^4+3*K.1^-4,1-2*K.1+2*K.1^2-3*K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-2-K.1+K.1^2-K.1^4,-2+K.1-K.1^2-K.1^-4,-2+K.1^4+K.1^-4,-1-K.1+K.1^2+K.1^-4,-1-K.1^4-K.1^-4,-1+K.1-K.1^2+K.1^4,2-K.1+K.1^2-K.1^4,2+K.1-K.1^2-K.1^-4,2+K.1^4+K.1^-4,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1-K.1+K.1^2-K.1^4,-1+K.1-K.1^2-K.1^-4,-1+K.1^4+K.1^-4,2+K.1-K.1^2-K.1^-4,2+K.1^4+K.1^-4,2-K.1+K.1^2-K.1^4,-1-K.1+K.1^2-K.1^4,-1+K.1-K.1^2-K.1^-4,-1+K.1^4+K.1^-4,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |24,6,-4,0,-6,0,15,-12,6,-3,0,0,0,0,3,-3,0,2,-1,0,0,3,0,0,0,0,0,0,18,12,12,12,6,6,6,0,12,12,12,9,9,9,-3,-3,-3,6,6,3,3,3,6,6,6,3,3,3,6,6,6,3,3,3,0,0,0,-6,-6,-6,0,0,0,0,-9,-3,0,-3,0,0,0,-6,-6,-6,-3,-3,-3,-3,-3,-3,0,0,0,0,0,0,0,4-2*K.1+2*K.1^2+2*K.1^-4,4-2*K.1^4-2*K.1^-4,4+2*K.1-2*K.1^2+2*K.1^4,-6*K.1-6*K.1^-1,-6*K.1^4-6*K.1^-4,-6*K.1^2-6*K.1^-2,2-2*K.1+2*K.1^2-2*K.1^4,2+2*K.1-2*K.1^2-2*K.1^-4,2+2*K.1^4+2*K.1^-4,1-2*K.1+2*K.1^2+2*K.1^-4,1-2*K.1^4-2*K.1^-4,1+2*K.1-2*K.1^2+2*K.1^4,2+4*K.1-4*K.1^2+4*K.1^4,2-4*K.1+4*K.1^2+4*K.1^-4,2-4*K.1^4-4*K.1^-4,1-2*K.1+2*K.1^2+2*K.1^-4,1-2*K.1^4-2*K.1^-4,1+2*K.1-2*K.1^2+2*K.1^4,2+2*K.1^4+2*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,2+2*K.1-2*K.1^2-2*K.1^-4,0,0,-1+4*K.1-4*K.1^2+4*K.1^4,-1-4*K.1+4*K.1^2+4*K.1^-4,-1-4*K.1^4-4*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,-1+2*K.1-2*K.1^2-2*K.1^-4,-1+2*K.1^4+2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,-1+2*K.1-2*K.1^2-2*K.1^-4,-1+2*K.1^4+2*K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,-2+2*K.1-2*K.1^2+2*K.1^4,-2-2*K.1+2*K.1^2+2*K.1^-4,-2-2*K.1^4-2*K.1^-4,4*K.1^2+4*K.1^-2,4*K.1+4*K.1^-1,4*K.1^4+4*K.1^-4,-2+2*K.1-2*K.1^2-2*K.1^-4,-2+2*K.1^4+2*K.1^-4,-2-2*K.1+2*K.1^2-2*K.1^4,0,0,0,1+2*K.1-2*K.1^2-2*K.1^-4,1+2*K.1^4+2*K.1^-4,1-2*K.1+2*K.1^2-2*K.1^4,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1^4-2*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |24,6,-4,0,-6,0,15,-12,6,-3,0,0,0,0,3,-3,0,2,-1,0,0,3,0,0,0,0,0,0,18,12,12,12,6,6,6,0,12,12,12,9,9,9,-3,-3,-3,6,6,3,3,3,6,6,6,3,3,3,6,6,6,3,3,3,0,0,0,-6,-6,-6,0,0,0,0,-9,-3,0,-3,0,0,0,-6,-6,-6,-3,-3,-3,-3,-3,-3,0,0,0,0,0,0,0,4+2*K.1-2*K.1^2+2*K.1^4,4-2*K.1+2*K.1^2+2*K.1^-4,4-2*K.1^4-2*K.1^-4,-6*K.1^2-6*K.1^-2,-6*K.1-6*K.1^-1,-6*K.1^4-6*K.1^-4,2+2*K.1^4+2*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,2+2*K.1-2*K.1^2-2*K.1^-4,1+2*K.1-2*K.1^2+2*K.1^4,1-2*K.1+2*K.1^2+2*K.1^-4,1-2*K.1^4-2*K.1^-4,2-4*K.1^4-4*K.1^-4,2+4*K.1-4*K.1^2+4*K.1^4,2-4*K.1+4*K.1^2+4*K.1^-4,1+2*K.1-2*K.1^2+2*K.1^4,1-2*K.1+2*K.1^2+2*K.1^-4,1-2*K.1^4-2*K.1^-4,2+2*K.1-2*K.1^2-2*K.1^-4,2+2*K.1^4+2*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,0,0,-1-4*K.1^4-4*K.1^-4,-1+4*K.1-4*K.1^2+4*K.1^4,-1-4*K.1+4*K.1^2+4*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-1+2*K.1^4+2*K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,-1+2*K.1-2*K.1^2-2*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,-1+2*K.1-2*K.1^2-2*K.1^-4,-1+2*K.1^4+2*K.1^-4,-2-2*K.1^4-2*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,-2-2*K.1+2*K.1^2+2*K.1^-4,4*K.1^4+4*K.1^-4,4*K.1^2+4*K.1^-2,4*K.1+4*K.1^-1,-2-2*K.1+2*K.1^2-2*K.1^4,-2+2*K.1-2*K.1^2-2*K.1^-4,-2+2*K.1^4+2*K.1^-4,0,0,0,1-2*K.1+2*K.1^2-2*K.1^4,1+2*K.1-2*K.1^2-2*K.1^-4,1+2*K.1^4+2*K.1^-4,-2*K.1^4-2*K.1^-4,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |24,6,-4,0,-6,0,15,-12,6,-3,0,0,0,0,3,-3,0,2,-1,0,0,3,0,0,0,0,0,0,18,12,12,12,6,6,6,0,12,12,12,9,9,9,-3,-3,-3,6,6,3,3,3,6,6,6,3,3,3,6,6,6,3,3,3,0,0,0,-6,-6,-6,0,0,0,0,-9,-3,0,-3,0,0,0,-6,-6,-6,-3,-3,-3,-3,-3,-3,0,0,0,0,0,0,0,4-2*K.1^4-2*K.1^-4,4+2*K.1-2*K.1^2+2*K.1^4,4-2*K.1+2*K.1^2+2*K.1^-4,-6*K.1^4-6*K.1^-4,-6*K.1^2-6*K.1^-2,-6*K.1-6*K.1^-1,2+2*K.1-2*K.1^2-2*K.1^-4,2+2*K.1^4+2*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,1-2*K.1^4-2*K.1^-4,1+2*K.1-2*K.1^2+2*K.1^4,1-2*K.1+2*K.1^2+2*K.1^-4,2-4*K.1+4*K.1^2+4*K.1^-4,2-4*K.1^4-4*K.1^-4,2+4*K.1-4*K.1^2+4*K.1^4,1-2*K.1^4-2*K.1^-4,1+2*K.1-2*K.1^2+2*K.1^4,1-2*K.1+2*K.1^2+2*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,2+2*K.1-2*K.1^2-2*K.1^-4,2+2*K.1^4+2*K.1^-4,0,0,-1-4*K.1+4*K.1^2+4*K.1^-4,-1-4*K.1^4-4*K.1^-4,-1+4*K.1-4*K.1^2+4*K.1^4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-1+2*K.1-2*K.1^2-2*K.1^-4,-1+2*K.1^4+2*K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-1+2*K.1^4+2*K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,-1+2*K.1-2*K.1^2-2*K.1^-4,-2-2*K.1+2*K.1^2+2*K.1^-4,-2-2*K.1^4-2*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,4*K.1+4*K.1^-1,4*K.1^4+4*K.1^-4,4*K.1^2+4*K.1^-2,-2+2*K.1^4+2*K.1^-4,-2-2*K.1+2*K.1^2-2*K.1^4,-2+2*K.1-2*K.1^2-2*K.1^-4,0,0,0,1+2*K.1^4+2*K.1^-4,1-2*K.1+2*K.1^2-2*K.1^4,1+2*K.1-2*K.1^2-2*K.1^-4,-2*K.1-2*K.1^-1,-2*K.1^4-2*K.1^-4,-2*K.1^2-2*K.1^-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |24,12,4,-4,0,0,6,6,-3,-3,0,0,-2,0,0,3,-3,1,-2,-1,2,0,0,0,0,0,0,0,12,6-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,6+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,6+K.1-K.1^2-4*K.1^4-5*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,12,3+K.1-K.1^2+2*K.1^4+K.1^-4,3+K.1-K.1^2-K.1^4-2*K.1^-4,3-2*K.1+2*K.1^2-K.1^4+K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3,6,-3+K.1-K.1^2+5*K.1^4+4*K.1^-4,-3+4*K.1-4*K.1^2-K.1^4-5*K.1^-4,-3-5*K.1+5*K.1^2-4*K.1^4+K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3+K.1-K.1^2-4*K.1^4-5*K.1^-4,-3-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,-3+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,-3+3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,3+K.1-K.1^2+2*K.1^4+K.1^-4,3+K.1-K.1^2-K.1^4-2*K.1^-4,3-2*K.1+2*K.1^2-K.1^4+K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,3,3,6,3,-3,-3-3*K.1+3*K.1^2-3*K.1^4,-3+3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,0,0,0,0,0,0,0,0,0,1,4-2*K.1+2*K.1^2+2*K.1^-4,4-2*K.1^4-2*K.1^-4,4+2*K.1-2*K.1^2+2*K.1^4,-3-3*K.1+3*K.1^2-3*K.1^4,-3+3*K.1-3*K.1^2-3*K.1^-4,-3+3*K.1^4+3*K.1^-4,-1-4*K.1+4*K.1^2-3*K.1^4+K.1^-4,-1+3*K.1-3*K.1^2-K.1^4-4*K.1^-4,-1+K.1-K.1^2+4*K.1^4+3*K.1^-4,-2+K.1-K.1^2+3*K.1^4+2*K.1^-4,-2-3*K.1+3*K.1^2-2*K.1^4+K.1^-4,-2+2*K.1-2*K.1^2-K.1^4-3*K.1^-4,-1+2*K.1-2*K.1^2+3*K.1^4+K.1^-4,-1-3*K.1+3*K.1^2-K.1^4+2*K.1^-4,-1+K.1-K.1^2-2*K.1^4-3*K.1^-4,-2-2*K.1+2*K.1^2-3*K.1^4-K.1^-4,-2+3*K.1-3*K.1^2+K.1^4-2*K.1^-4,-2-K.1+K.1^2+2*K.1^4+3*K.1^-4,2+K.1-K.1^2-2*K.1^4-3*K.1^-4,2+2*K.1-2*K.1^2+3*K.1^4+K.1^-4,2-3*K.1+3*K.1^2-K.1^4+2*K.1^-4,-3,6,-1-K.1+K.1^2+K.1^-4,-1-K.1^4-K.1^-4,-1+K.1-K.1^2+K.1^4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1+2*K.1-2*K.1^2+3*K.1^4+K.1^-4,-1-3*K.1+3*K.1^2-K.1^4+2*K.1^-4,-1+K.1-K.1^2-2*K.1^4-3*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,2-K.1^4-K.1^-4,2+K.1-K.1^2+K.1^4,2-K.1+K.1^2+K.1^-4,1-K.1+K.1^2-K.1^4,1+K.1-K.1^2-K.1^-4,1+K.1^4+K.1^-4,2+K.1^4+K.1^-4,2-K.1+K.1^2-K.1^4,2+K.1-K.1^2-K.1^-4,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1^4-2*K.1^-4,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,-1+K.1^4+K.1^-4,-1-K.1+K.1^2-K.1^4,-1+K.1-K.1^2-K.1^-4,-2+K.1-K.1^2+K.1^4,-2-K.1+K.1^2+K.1^-4,-2-K.1^4-K.1^-4,1-K.1^4-K.1^-4,1+K.1-K.1^2+K.1^4,1-K.1+K.1^2+K.1^-4,K.1^4+K.1^-4,K.1^2+K.1^-2,K.1+K.1^-1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |24,12,4,-4,0,0,6,6,-3,-3,0,0,-2,0,0,3,-3,1,-2,-1,2,0,0,0,0,0,0,0,12,6+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,6+K.1-K.1^2-4*K.1^4-5*K.1^-4,6-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,12,3+K.1-K.1^2-K.1^4-2*K.1^-4,3-2*K.1+2*K.1^2-K.1^4+K.1^-4,3+K.1-K.1^2+2*K.1^4+K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3,6,-3+4*K.1-4*K.1^2-K.1^4-5*K.1^-4,-3-5*K.1+5*K.1^2-4*K.1^4+K.1^-4,-3+K.1-K.1^2+5*K.1^4+4*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,-3+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,-3+K.1-K.1^2-4*K.1^4-5*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,-3+3*K.1^4+3*K.1^-4,3+K.1-K.1^2-K.1^4-2*K.1^-4,3-2*K.1+2*K.1^2-K.1^4+K.1^-4,3+K.1-K.1^2+2*K.1^4+K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,3,3,6,3,-3,-3+3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,K.1-K.1^2+2*K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,0,0,0,0,0,0,0,0,0,1,4+2*K.1-2*K.1^2+2*K.1^4,4-2*K.1+2*K.1^2+2*K.1^-4,4-2*K.1^4-2*K.1^-4,-3+3*K.1^4+3*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,-3+3*K.1-3*K.1^2-3*K.1^-4,-1+K.1-K.1^2+4*K.1^4+3*K.1^-4,-1-4*K.1+4*K.1^2-3*K.1^4+K.1^-4,-1+3*K.1-3*K.1^2-K.1^4-4*K.1^-4,-2+2*K.1-2*K.1^2-K.1^4-3*K.1^-4,-2+K.1-K.1^2+3*K.1^4+2*K.1^-4,-2-3*K.1+3*K.1^2-2*K.1^4+K.1^-4,-1+K.1-K.1^2-2*K.1^4-3*K.1^-4,-1+2*K.1-2*K.1^2+3*K.1^4+K.1^-4,-1-3*K.1+3*K.1^2-K.1^4+2*K.1^-4,-2-K.1+K.1^2+2*K.1^4+3*K.1^-4,-2-2*K.1+2*K.1^2-3*K.1^4-K.1^-4,-2+3*K.1-3*K.1^2+K.1^4-2*K.1^-4,2-3*K.1+3*K.1^2-K.1^4+2*K.1^-4,2+K.1-K.1^2-2*K.1^4-3*K.1^-4,2+2*K.1-2*K.1^2+3*K.1^4+K.1^-4,-3,6,-1+K.1-K.1^2+K.1^4,-1-K.1+K.1^2+K.1^-4,-1-K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,-1+K.1-K.1^2-2*K.1^4-3*K.1^-4,-1+2*K.1-2*K.1^2+3*K.1^4+K.1^-4,-1-3*K.1+3*K.1^2-K.1^4+2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,2-K.1+K.1^2+K.1^-4,2-K.1^4-K.1^-4,2+K.1-K.1^2+K.1^4,1+K.1^4+K.1^-4,1-K.1+K.1^2-K.1^4,1+K.1-K.1^2-K.1^-4,2+K.1-K.1^2-K.1^-4,2+K.1^4+K.1^-4,2-K.1+K.1^2-K.1^4,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,-2*K.1^4-2*K.1^-4,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,-1+K.1-K.1^2-K.1^-4,-1+K.1^4+K.1^-4,-1-K.1+K.1^2-K.1^4,-2-K.1^4-K.1^-4,-2+K.1-K.1^2+K.1^4,-2-K.1+K.1^2+K.1^-4,1-K.1+K.1^2+K.1^-4,1-K.1^4-K.1^-4,1+K.1-K.1^2+K.1^4,K.1+K.1^-1,K.1^4+K.1^-4,K.1^2+K.1^-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |24,12,4,-4,0,0,6,6,-3,-3,0,0,-2,0,0,3,-3,1,-2,-1,2,0,0,0,0,0,0,0,12,6+K.1-K.1^2-4*K.1^4-5*K.1^-4,6-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,6+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,12,3-2*K.1+2*K.1^2-K.1^4+K.1^-4,3+K.1-K.1^2+2*K.1^4+K.1^-4,3+K.1-K.1^2-K.1^4-2*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3,6,-3-5*K.1+5*K.1^2-4*K.1^4+K.1^-4,-3+K.1-K.1^2+5*K.1^4+4*K.1^-4,-3+4*K.1-4*K.1^2-K.1^4-5*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,-3+K.1-K.1^2-4*K.1^4-5*K.1^-4,-3-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,-3+3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^-4,3-2*K.1+2*K.1^2-K.1^4+K.1^-4,3+K.1-K.1^2+2*K.1^4+K.1^-4,3+K.1-K.1^2-K.1^4-2*K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,3,3,6,3,-3,-3+3*K.1-3*K.1^2-3*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,-3+3*K.1^4+3*K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,0,0,0,0,0,0,0,0,0,1,4-2*K.1^4-2*K.1^-4,4+2*K.1-2*K.1^2+2*K.1^4,4-2*K.1+2*K.1^2+2*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^-4,-3+3*K.1^4+3*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,-1+3*K.1-3*K.1^2-K.1^4-4*K.1^-4,-1+K.1-K.1^2+4*K.1^4+3*K.1^-4,-1-4*K.1+4*K.1^2-3*K.1^4+K.1^-4,-2-3*K.1+3*K.1^2-2*K.1^4+K.1^-4,-2+2*K.1-2*K.1^2-K.1^4-3*K.1^-4,-2+K.1-K.1^2+3*K.1^4+2*K.1^-4,-1-3*K.1+3*K.1^2-K.1^4+2*K.1^-4,-1+K.1-K.1^2-2*K.1^4-3*K.1^-4,-1+2*K.1-2*K.1^2+3*K.1^4+K.1^-4,-2+3*K.1-3*K.1^2+K.1^4-2*K.1^-4,-2-K.1+K.1^2+2*K.1^4+3*K.1^-4,-2-2*K.1+2*K.1^2-3*K.1^4-K.1^-4,2+2*K.1-2*K.1^2+3*K.1^4+K.1^-4,2-3*K.1+3*K.1^2-K.1^4+2*K.1^-4,2+K.1-K.1^2-2*K.1^4-3*K.1^-4,-3,6,-1-K.1^4-K.1^-4,-1+K.1-K.1^2+K.1^4,-1-K.1+K.1^2+K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1-3*K.1+3*K.1^2-K.1^4+2*K.1^-4,-1+K.1-K.1^2-2*K.1^4-3*K.1^-4,-1+2*K.1-2*K.1^2+3*K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,2+K.1-K.1^2+K.1^4,2-K.1+K.1^2+K.1^-4,2-K.1^4-K.1^-4,1+K.1-K.1^2-K.1^-4,1+K.1^4+K.1^-4,1-K.1+K.1^2-K.1^4,2-K.1+K.1^2-K.1^4,2+K.1-K.1^2-K.1^-4,2+K.1^4+K.1^-4,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,-2*K.1-2*K.1^-1,-2*K.1^4-2*K.1^-4,-2*K.1^2-2*K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1-K.1+K.1^2-K.1^4,-1+K.1-K.1^2-K.1^-4,-1+K.1^4+K.1^-4,-2-K.1+K.1^2+K.1^-4,-2-K.1^4-K.1^-4,-2+K.1-K.1^2+K.1^4,1+K.1-K.1^2+K.1^4,1-K.1+K.1^2+K.1^-4,1-K.1^4-K.1^-4,K.1^2+K.1^-2,K.1+K.1^-1,K.1^4+K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; x := CR!\[32, 8, 0, 0, 0, 0, 32, 32, 32, 32, 2, 2, 0, 0, 8, 8, 8, 0, 0, 0, 0, 0, 2, 2, 0, 0, 0, 0, -4, -4, -4, -4, 5, 5, 5, -4, -4, -4, -4, -4, -4, -4, 5, 5, 5, 5, 5, -4, -4, -4, 5, 5, 5, -4, -4, -4, 5, 5, 5, -4, -4, -4, -4, -4, -4, -4, -4, -4, -4, -4, -4, -4, -4, 5, -4, 5, -4, -4, -4, -4, -4, -4, 5, 5, 5, 5, 5, 5, 2, 2, 2, 2, 2, 2, 0, -4, -4, -4, -1, -1, -1, 2, 2, 2, -4, -4, -4, 2, 2, 2, -4, -4, -4, 2, 2, 2, -1, -1, 2, 2, 2, -1, -1, -1, 2, 2, 2, -1, -1, -1, 2, 2, 2, -4, -4, -4, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 2, 2, 0, 0, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, 0, 0, 0, -1, -1, -1, -1, -1, -1]; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; x := CR!\[32, -8, 0, 0, 0, 0, 32, 32, 32, 32, 2, 2, 0, 0, -8, -8, -8, 0, 0, 0, 0, 0, -2, -2, 0, 0, 0, 0, -4, -4, -4, -4, 5, 5, 5, -4, -4, -4, -4, -4, -4, -4, 5, 5, 5, 5, 5, -4, -4, -4, 5, 5, 5, -4, -4, -4, 5, 5, 5, -4, -4, -4, -4, -4, -4, -4, -4, -4, -4, -4, -4, -4, -4, 5, -4, 5, -4, -4, -4, -4, -4, -4, 5, 5, 5, 5, 5, 5, 2, 2, 2, 2, 2, 2, 0, 4, 4, 4, 1, 1, 1, -2, -2, -2, 4, 4, 4, -2, -2, -2, 4, 4, 4, -2, -2, -2, 1, 1, -2, -2, -2, 1, 1, 1, -2, -2, -2, 1, 1, 1, -2, -2, -2, 4, 4, 4, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, -2, -2, 0, 0, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, -1, 0, 0, 0, 1, 1, 1, 1, 1, 1]; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(3: Sparse := true); S := [ K |32,8,0,0,0,0,32,32,32,32,2*K.1^-1,2*K.1,0,0,8,8,8,0,0,0,0,0,2*K.1^-1,2*K.1,0,0,0,0,-4,-4,-4,-4,5,5,5,-4,-4,-4,-4,-4,-4,-4,5,5,5,5,5,-4,-4,-4,5,5,5,-4,-4,-4,5,5,5,-4,-4,-4,-4,-4,-4,-4,-4,-4,-4,-4,-4,-4,-4,5,-4,5,-4,-4,-4,-4,-4,-4,5,5,5,5,5,5,2*K.1^-1,2*K.1,2*K.1^-1,2*K.1,2*K.1,2*K.1^-1,0,-4,-4,-4,-1,-1,-1,2,2,2,-4,-4,-4,2,2,2,-4,-4,-4,2,2,2,-1,-1,2,2,2,-1,-1,-1,2,2,2,-1,-1,-1,2,2,2,-4,-4,-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,2*K.1,2*K.1^-1,0,0,-1*K.1^-1,-1*K.1,-1*K.1,-1*K.1^-1,-1*K.1^-1,-1*K.1,-1*K.1^-1,-1*K.1,-1*K.1,-1*K.1^-1,-1*K.1^-1,-1*K.1,0,0,0,-1*K.1,-1*K.1^-1,-1*K.1^-1,-1*K.1,-1*K.1,-1*K.1^-1]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; K := CyclotomicField(3: Sparse := true); S := [ K |32,8,0,0,0,0,32,32,32,32,2*K.1,2*K.1^-1,0,0,8,8,8,0,0,0,0,0,2*K.1,2*K.1^-1,0,0,0,0,-4,-4,-4,-4,5,5,5,-4,-4,-4,-4,-4,-4,-4,5,5,5,5,5,-4,-4,-4,5,5,5,-4,-4,-4,5,5,5,-4,-4,-4,-4,-4,-4,-4,-4,-4,-4,-4,-4,-4,-4,5,-4,5,-4,-4,-4,-4,-4,-4,5,5,5,5,5,5,2*K.1,2*K.1^-1,2*K.1,2*K.1^-1,2*K.1^-1,2*K.1,0,-4,-4,-4,-1,-1,-1,2,2,2,-4,-4,-4,2,2,2,-4,-4,-4,2,2,2,-1,-1,2,2,2,-1,-1,-1,2,2,2,-1,-1,-1,2,2,2,-4,-4,-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,2*K.1^-1,2*K.1,0,0,-1*K.1,-1*K.1^-1,-1*K.1^-1,-1*K.1,-1*K.1,-1*K.1^-1,-1*K.1,-1*K.1^-1,-1*K.1^-1,-1*K.1,-1*K.1,-1*K.1^-1,0,0,0,-1*K.1^-1,-1*K.1,-1*K.1,-1*K.1^-1,-1*K.1^-1,-1*K.1]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; K := CyclotomicField(3: Sparse := true); S := [ K |32,-8,0,0,0,0,32,32,32,32,2*K.1^-1,2*K.1,0,0,-8,-8,-8,0,0,0,0,0,-2*K.1^-1,-2*K.1,0,0,0,0,-4,-4,-4,-4,5,5,5,-4,-4,-4,-4,-4,-4,-4,5,5,5,5,5,-4,-4,-4,5,5,5,-4,-4,-4,5,5,5,-4,-4,-4,-4,-4,-4,-4,-4,-4,-4,-4,-4,-4,-4,5,-4,5,-4,-4,-4,-4,-4,-4,5,5,5,5,5,5,2*K.1^-1,2*K.1,2*K.1^-1,2*K.1,2*K.1,2*K.1^-1,0,4,4,4,1,1,1,-2,-2,-2,4,4,4,-2,-2,-2,4,4,4,-2,-2,-2,1,1,-2,-2,-2,1,1,1,-2,-2,-2,1,1,1,-2,-2,-2,4,4,4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-2*K.1,-2*K.1^-1,0,0,-1*K.1^-1,-1*K.1,-1*K.1,-1*K.1^-1,-1*K.1^-1,-1*K.1,-1*K.1^-1,-1*K.1,-1*K.1,-1*K.1^-1,-1*K.1^-1,-1*K.1,0,0,0,K.1,K.1^-1,K.1^-1,K.1,K.1,K.1^-1]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; K := CyclotomicField(3: Sparse := true); S := [ K |32,-8,0,0,0,0,32,32,32,32,2*K.1,2*K.1^-1,0,0,-8,-8,-8,0,0,0,0,0,-2*K.1,-2*K.1^-1,0,0,0,0,-4,-4,-4,-4,5,5,5,-4,-4,-4,-4,-4,-4,-4,5,5,5,5,5,-4,-4,-4,5,5,5,-4,-4,-4,5,5,5,-4,-4,-4,-4,-4,-4,-4,-4,-4,-4,-4,-4,-4,-4,5,-4,5,-4,-4,-4,-4,-4,-4,5,5,5,5,5,5,2*K.1,2*K.1^-1,2*K.1,2*K.1^-1,2*K.1^-1,2*K.1,0,4,4,4,1,1,1,-2,-2,-2,4,4,4,-2,-2,-2,4,4,4,-2,-2,-2,1,1,-2,-2,-2,1,1,1,-2,-2,-2,1,1,1,-2,-2,-2,4,4,4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-2*K.1^-1,-2*K.1,0,0,-1*K.1,-1*K.1^-1,-1*K.1^-1,-1*K.1,-1*K.1,-1*K.1^-1,-1*K.1,-1*K.1^-1,-1*K.1^-1,-1*K.1,-1*K.1,-1*K.1^-1,0,0,0,K.1^-1,K.1,K.1,K.1^-1,K.1^-1,K.1]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |32,8,0,0,0,0,-4,-4,-4,5,2,2,0,0,-4,-1,2,0,0,0,0,0,2,2,0,0,0,0,8,-4+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-4+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-4-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-7-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-7-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-7+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-4,2+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,2-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-4-6*K.1+6*K.1^2-6*K.1^4,-4+6*K.1^4+6*K.1^-4,-4+6*K.1-6*K.1^2-6*K.1^-4,2-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,2+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,11,-7,-4-2*K.1+2*K.1^2-K.1^4+K.1^-4,-4+K.1-K.1^2+2*K.1^4+K.1^-4,-4+K.1-K.1^2-K.1^4-2*K.1^-4,-1-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-1+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-1-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,5-2*K.1+2*K.1^2-K.1^4+K.1^-4,5+K.1-K.1^2+2*K.1^4+K.1^-4,5+K.1-K.1^2-K.1^4-2*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^-4,2+3*K.1-3*K.1^2+3*K.1^4,2-3*K.1^4-3*K.1^-4,-1-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,-1+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,-1+K.1-K.1^2-4*K.1^4-5*K.1^-4,2-3*K.1+3*K.1^2-3*K.1^4,2+3*K.1^4+3*K.1^-4,2+3*K.1-3*K.1^2-3*K.1^-4,2-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,2-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,2-6*K.1+6*K.1^2-6*K.1^4,2+6*K.1^4+6*K.1^-4,2+6*K.1-6*K.1^2-6*K.1^-4,5,-1,2,-4,-7,-1+3*K.1^4+3*K.1^-4,-1+3*K.1-3*K.1^2-3*K.1^-4,-1-3*K.1+3*K.1^2-3*K.1^4,-1-2*K.1+2*K.1^2-K.1^4+K.1^-4,-1+K.1-K.1^2+2*K.1^4+K.1^-4,-1+K.1-K.1^2-K.1^4-2*K.1^-4,-1,-1,-1,2-3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^-4,2+3*K.1-3*K.1^2+3*K.1^4,-1,-1,2,2,-1,-1,0,4*K.1^4+4*K.1^-4,4*K.1^2+4*K.1^-2,4*K.1+4*K.1^-1,-1+3*K.1^4+3*K.1^-4,-1-3*K.1+3*K.1^2-3*K.1^4,-1+3*K.1-3*K.1^2-3*K.1^-4,-2-2*K.1+2*K.1^2-2*K.1^4,-2+2*K.1-2*K.1^2-2*K.1^-4,-2+2*K.1^4+2*K.1^-4,-2*K.1^4-2*K.1^-4,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,4-2*K.1+2*K.1^2-2*K.1^4,4+2*K.1-2*K.1^2-2*K.1^-4,4+2*K.1^4+2*K.1^-4,-2*K.1^4-2*K.1^-4,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-2+2*K.1^4+2*K.1^-4,-2-2*K.1+2*K.1^2-2*K.1^4,-2+2*K.1-2*K.1^2-2*K.1^-4,-1,-1,-2+K.1-K.1^2+K.1^4,-2-K.1+K.1^2+K.1^-4,-2-K.1^4-K.1^-4,-1-K.1+K.1^2-2*K.1^4-K.1^-4,-1+2*K.1-2*K.1^2+K.1^4-K.1^-4,-1-K.1+K.1^2+K.1^4+2*K.1^-4,1+K.1-K.1^2+K.1^4,1-K.1+K.1^2+K.1^-4,1-K.1^4-K.1^-4,2-2*K.1+2*K.1^2-K.1^4+K.1^-4,2+K.1-K.1^2-K.1^4-2*K.1^-4,2+K.1-K.1^2+2*K.1^4+K.1^-4,1-K.1+K.1^2+K.1^-4,1-K.1^4-K.1^-4,1+K.1-K.1^2+K.1^4,K.1+K.1^-1,K.1^4+K.1^-4,K.1^2+K.1^-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1,-1,0,0,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^4+K.1^-4,K.1^4+K.1^-4,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^4+K.1^-4,K.1^4+K.1^-4,K.1+K.1^-1,K.1+K.1^-1,0,0,0,K.1^4+K.1^-4,K.1^4+K.1^-4,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1,K.1+K.1^-1]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |32,8,0,0,0,0,-4,-4,-4,5,2,2,0,0,-4,-1,2,0,0,0,0,0,2,2,0,0,0,0,8,-4-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-4+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-4+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-7+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-7-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-7-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-4,2-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-4+6*K.1-6*K.1^2-6*K.1^-4,-4-6*K.1+6*K.1^2-6*K.1^4,-4+6*K.1^4+6*K.1^-4,2+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,11,-7,-4+K.1-K.1^2-K.1^4-2*K.1^-4,-4-2*K.1+2*K.1^2-K.1^4+K.1^-4,-4+K.1-K.1^2+2*K.1^4+K.1^-4,-1-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-1-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-1+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,5+K.1-K.1^2-K.1^4-2*K.1^-4,5-2*K.1+2*K.1^2-K.1^4+K.1^-4,5+K.1-K.1^2+2*K.1^4+K.1^-4,2-3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^-4,2+3*K.1-3*K.1^2+3*K.1^4,-1+K.1-K.1^2-4*K.1^4-5*K.1^-4,-1-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,-1+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,2+3*K.1-3*K.1^2-3*K.1^-4,2-3*K.1+3*K.1^2-3*K.1^4,2+3*K.1^4+3*K.1^-4,2+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,2-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,2-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,2+6*K.1-6*K.1^2-6*K.1^-4,2-6*K.1+6*K.1^2-6*K.1^4,2+6*K.1^4+6*K.1^-4,5,-1,2,-4,-7,-1-3*K.1+3*K.1^2-3*K.1^4,-1+3*K.1^4+3*K.1^-4,-1+3*K.1-3*K.1^2-3*K.1^-4,-1+K.1-K.1^2-K.1^4-2*K.1^-4,-1-2*K.1+2*K.1^2-K.1^4+K.1^-4,-1+K.1-K.1^2+2*K.1^4+K.1^-4,-1,-1,-1,2+3*K.1-3*K.1^2+3*K.1^4,2-3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^-4,-1,-1,2,2,-1,-1,0,4*K.1^2+4*K.1^-2,4*K.1+4*K.1^-1,4*K.1^4+4*K.1^-4,-1-3*K.1+3*K.1^2-3*K.1^4,-1+3*K.1-3*K.1^2-3*K.1^-4,-1+3*K.1^4+3*K.1^-4,-2+2*K.1-2*K.1^2-2*K.1^-4,-2+2*K.1^4+2*K.1^-4,-2-2*K.1+2*K.1^2-2*K.1^4,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1^4-2*K.1^-4,4+2*K.1-2*K.1^2-2*K.1^-4,4+2*K.1^4+2*K.1^-4,4-2*K.1+2*K.1^2-2*K.1^4,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1^4-2*K.1^-4,-2-2*K.1+2*K.1^2-2*K.1^4,-2+2*K.1-2*K.1^2-2*K.1^-4,-2+2*K.1^4+2*K.1^-4,-1,-1,-2-K.1+K.1^2+K.1^-4,-2-K.1^4-K.1^-4,-2+K.1-K.1^2+K.1^4,-1+2*K.1-2*K.1^2+K.1^4-K.1^-4,-1-K.1+K.1^2+K.1^4+2*K.1^-4,-1-K.1+K.1^2-2*K.1^4-K.1^-4,1-K.1+K.1^2+K.1^-4,1-K.1^4-K.1^-4,1+K.1-K.1^2+K.1^4,2+K.1-K.1^2-K.1^4-2*K.1^-4,2+K.1-K.1^2+2*K.1^4+K.1^-4,2-2*K.1+2*K.1^2-K.1^4+K.1^-4,1-K.1^4-K.1^-4,1+K.1-K.1^2+K.1^4,1-K.1+K.1^2+K.1^-4,K.1^4+K.1^-4,K.1^2+K.1^-2,K.1+K.1^-1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1,-1,0,0,K.1^4+K.1^-4,K.1^4+K.1^-4,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^4+K.1^-4,K.1^4+K.1^-4,0,0,0,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1,K.1+K.1^-1,K.1^4+K.1^-4,K.1^4+K.1^-4]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |32,8,0,0,0,0,-4,-4,-4,5,2,2,0,0,-4,-1,2,0,0,0,0,0,2,2,0,0,0,0,8,-4+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-4-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-4+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-7-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-7+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-7-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-4,2+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,2-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-4+6*K.1^4+6*K.1^-4,-4+6*K.1-6*K.1^2-6*K.1^-4,-4-6*K.1+6*K.1^2-6*K.1^4,2-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,2+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,11,-7,-4+K.1-K.1^2+2*K.1^4+K.1^-4,-4+K.1-K.1^2-K.1^4-2*K.1^-4,-4-2*K.1+2*K.1^2-K.1^4+K.1^-4,-1+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-1-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-1-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,5+K.1-K.1^2+2*K.1^4+K.1^-4,5+K.1-K.1^2-K.1^4-2*K.1^-4,5-2*K.1+2*K.1^2-K.1^4+K.1^-4,2+3*K.1-3*K.1^2+3*K.1^4,2-3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^-4,-1+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,-1+K.1-K.1^2-4*K.1^4-5*K.1^-4,-1-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,2+3*K.1^4+3*K.1^-4,2+3*K.1-3*K.1^2-3*K.1^-4,2-3*K.1+3*K.1^2-3*K.1^4,2-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,2-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,2+6*K.1^4+6*K.1^-4,2+6*K.1-6*K.1^2-6*K.1^-4,2-6*K.1+6*K.1^2-6*K.1^4,5,-1,2,-4,-7,-1+3*K.1-3*K.1^2-3*K.1^-4,-1-3*K.1+3*K.1^2-3*K.1^4,-1+3*K.1^4+3*K.1^-4,-1+K.1-K.1^2+2*K.1^4+K.1^-4,-1+K.1-K.1^2-K.1^4-2*K.1^-4,-1-2*K.1+2*K.1^2-K.1^4+K.1^-4,-1,-1,-1,2-3*K.1+3*K.1^2+3*K.1^-4,2+3*K.1-3*K.1^2+3*K.1^4,2-3*K.1^4-3*K.1^-4,-1,-1,2,2,-1,-1,0,4*K.1+4*K.1^-1,4*K.1^4+4*K.1^-4,4*K.1^2+4*K.1^-2,-1+3*K.1-3*K.1^2-3*K.1^-4,-1+3*K.1^4+3*K.1^-4,-1-3*K.1+3*K.1^2-3*K.1^4,-2+2*K.1^4+2*K.1^-4,-2-2*K.1+2*K.1^2-2*K.1^4,-2+2*K.1-2*K.1^2-2*K.1^-4,-2*K.1-2*K.1^-1,-2*K.1^4-2*K.1^-4,-2*K.1^2-2*K.1^-2,4+2*K.1^4+2*K.1^-4,4-2*K.1+2*K.1^2-2*K.1^4,4+2*K.1-2*K.1^2-2*K.1^-4,-2*K.1-2*K.1^-1,-2*K.1^4-2*K.1^-4,-2*K.1^2-2*K.1^-2,-2+2*K.1-2*K.1^2-2*K.1^-4,-2+2*K.1^4+2*K.1^-4,-2-2*K.1+2*K.1^2-2*K.1^4,-1,-1,-2-K.1^4-K.1^-4,-2+K.1-K.1^2+K.1^4,-2-K.1+K.1^2+K.1^-4,-1-K.1+K.1^2+K.1^4+2*K.1^-4,-1-K.1+K.1^2-2*K.1^4-K.1^-4,-1+2*K.1-2*K.1^2+K.1^4-K.1^-4,1-K.1^4-K.1^-4,1+K.1-K.1^2+K.1^4,1-K.1+K.1^2+K.1^-4,2+K.1-K.1^2+2*K.1^4+K.1^-4,2-2*K.1+2*K.1^2-K.1^4+K.1^-4,2+K.1-K.1^2-K.1^4-2*K.1^-4,1+K.1-K.1^2+K.1^4,1-K.1+K.1^2+K.1^-4,1-K.1^4-K.1^-4,K.1^2+K.1^-2,K.1+K.1^-1,K.1^4+K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1,-1,0,0,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^4+K.1^-4,K.1^4+K.1^-4,K.1+K.1^-1,K.1+K.1^-1,K.1^4+K.1^-4,K.1^4+K.1^-4,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,0,0,0,K.1+K.1^-1,K.1+K.1^-1,K.1^4+K.1^-4,K.1^4+K.1^-4,K.1^2+K.1^-2,K.1^2+K.1^-2]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |32,-8,0,0,0,0,-4,-4,-4,5,2,2,0,0,4,1,-2,0,0,0,0,0,-2,-2,0,0,0,0,8,-4+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-4+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-4-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-7-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-7-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-7+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-4,2+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,2-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-4-6*K.1+6*K.1^2-6*K.1^4,-4+6*K.1^4+6*K.1^-4,-4+6*K.1-6*K.1^2-6*K.1^-4,2-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,2+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,11,-7,-4-2*K.1+2*K.1^2-K.1^4+K.1^-4,-4+K.1-K.1^2+2*K.1^4+K.1^-4,-4+K.1-K.1^2-K.1^4-2*K.1^-4,-1-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-1+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-1-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,5-2*K.1+2*K.1^2-K.1^4+K.1^-4,5+K.1-K.1^2+2*K.1^4+K.1^-4,5+K.1-K.1^2-K.1^4-2*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^-4,2+3*K.1-3*K.1^2+3*K.1^4,2-3*K.1^4-3*K.1^-4,-1-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,-1+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,-1+K.1-K.1^2-4*K.1^4-5*K.1^-4,2-3*K.1+3*K.1^2-3*K.1^4,2+3*K.1^4+3*K.1^-4,2+3*K.1-3*K.1^2-3*K.1^-4,2-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,2-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,2-6*K.1+6*K.1^2-6*K.1^4,2+6*K.1^4+6*K.1^-4,2+6*K.1-6*K.1^2-6*K.1^-4,5,-1,2,-4,-7,-1+3*K.1^4+3*K.1^-4,-1+3*K.1-3*K.1^2-3*K.1^-4,-1-3*K.1+3*K.1^2-3*K.1^4,-1-2*K.1+2*K.1^2-K.1^4+K.1^-4,-1+K.1-K.1^2+2*K.1^4+K.1^-4,-1+K.1-K.1^2-K.1^4-2*K.1^-4,-1,-1,-1,2-3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^-4,2+3*K.1-3*K.1^2+3*K.1^4,-1,-1,2,2,-1,-1,0,-4*K.1^4-4*K.1^-4,-4*K.1^2-4*K.1^-2,-4*K.1-4*K.1^-1,1-3*K.1^4-3*K.1^-4,1+3*K.1-3*K.1^2+3*K.1^4,1-3*K.1+3*K.1^2+3*K.1^-4,2+2*K.1-2*K.1^2+2*K.1^4,2-2*K.1+2*K.1^2+2*K.1^-4,2-2*K.1^4-2*K.1^-4,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,-4+2*K.1-2*K.1^2+2*K.1^4,-4-2*K.1+2*K.1^2+2*K.1^-4,-4-2*K.1^4-2*K.1^-4,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2-2*K.1^4-2*K.1^-4,2+2*K.1-2*K.1^2+2*K.1^4,2-2*K.1+2*K.1^2+2*K.1^-4,1,1,2-K.1+K.1^2-K.1^4,2+K.1-K.1^2-K.1^-4,2+K.1^4+K.1^-4,1+K.1-K.1^2+2*K.1^4+K.1^-4,1-2*K.1+2*K.1^2-K.1^4+K.1^-4,1+K.1-K.1^2-K.1^4-2*K.1^-4,-1-K.1+K.1^2-K.1^4,-1+K.1-K.1^2-K.1^-4,-1+K.1^4+K.1^-4,-2+2*K.1-2*K.1^2+K.1^4-K.1^-4,-2-K.1+K.1^2+K.1^4+2*K.1^-4,-2-K.1+K.1^2-2*K.1^4-K.1^-4,-1+K.1-K.1^2-K.1^-4,-1+K.1^4+K.1^-4,-1-K.1+K.1^2-K.1^4,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,1,1,0,0,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^4+K.1^-4,K.1^4+K.1^-4,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^4+K.1^-4,K.1^4+K.1^-4,K.1+K.1^-1,K.1+K.1^-1,0,0,0,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1-K.1^-1]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |32,-8,0,0,0,0,-4,-4,-4,5,2,2,0,0,4,1,-2,0,0,0,0,0,-2,-2,0,0,0,0,8,-4-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-4+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-4+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-7+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-7-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-7-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-4,2-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-4+6*K.1-6*K.1^2-6*K.1^-4,-4-6*K.1+6*K.1^2-6*K.1^4,-4+6*K.1^4+6*K.1^-4,2+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,11,-7,-4+K.1-K.1^2-K.1^4-2*K.1^-4,-4-2*K.1+2*K.1^2-K.1^4+K.1^-4,-4+K.1-K.1^2+2*K.1^4+K.1^-4,-1-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-1-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-1+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,5+K.1-K.1^2-K.1^4-2*K.1^-4,5-2*K.1+2*K.1^2-K.1^4+K.1^-4,5+K.1-K.1^2+2*K.1^4+K.1^-4,2-3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^-4,2+3*K.1-3*K.1^2+3*K.1^4,-1+K.1-K.1^2-4*K.1^4-5*K.1^-4,-1-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,-1+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,2+3*K.1-3*K.1^2-3*K.1^-4,2-3*K.1+3*K.1^2-3*K.1^4,2+3*K.1^4+3*K.1^-4,2+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,2-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,2-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,2+6*K.1-6*K.1^2-6*K.1^-4,2-6*K.1+6*K.1^2-6*K.1^4,2+6*K.1^4+6*K.1^-4,5,-1,2,-4,-7,-1-3*K.1+3*K.1^2-3*K.1^4,-1+3*K.1^4+3*K.1^-4,-1+3*K.1-3*K.1^2-3*K.1^-4,-1+K.1-K.1^2-K.1^4-2*K.1^-4,-1-2*K.1+2*K.1^2-K.1^4+K.1^-4,-1+K.1-K.1^2+2*K.1^4+K.1^-4,-1,-1,-1,2+3*K.1-3*K.1^2+3*K.1^4,2-3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^-4,-1,-1,2,2,-1,-1,0,-4*K.1^2-4*K.1^-2,-4*K.1-4*K.1^-1,-4*K.1^4-4*K.1^-4,1+3*K.1-3*K.1^2+3*K.1^4,1-3*K.1+3*K.1^2+3*K.1^-4,1-3*K.1^4-3*K.1^-4,2-2*K.1+2*K.1^2+2*K.1^-4,2-2*K.1^4-2*K.1^-4,2+2*K.1-2*K.1^2+2*K.1^4,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,-4-2*K.1+2*K.1^2+2*K.1^-4,-4-2*K.1^4-2*K.1^-4,-4+2*K.1-2*K.1^2+2*K.1^4,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,2+2*K.1-2*K.1^2+2*K.1^4,2-2*K.1+2*K.1^2+2*K.1^-4,2-2*K.1^4-2*K.1^-4,1,1,2+K.1-K.1^2-K.1^-4,2+K.1^4+K.1^-4,2-K.1+K.1^2-K.1^4,1-2*K.1+2*K.1^2-K.1^4+K.1^-4,1+K.1-K.1^2-K.1^4-2*K.1^-4,1+K.1-K.1^2+2*K.1^4+K.1^-4,-1+K.1-K.1^2-K.1^-4,-1+K.1^4+K.1^-4,-1-K.1+K.1^2-K.1^4,-2-K.1+K.1^2+K.1^4+2*K.1^-4,-2-K.1+K.1^2-2*K.1^4-K.1^-4,-2+2*K.1-2*K.1^2+K.1^4-K.1^-4,-1+K.1^4+K.1^-4,-1-K.1+K.1^2-K.1^4,-1+K.1-K.1^2-K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,1,1,0,0,K.1^4+K.1^-4,K.1^4+K.1^-4,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^4+K.1^-4,K.1^4+K.1^-4,0,0,0,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |32,-8,0,0,0,0,-4,-4,-4,5,2,2,0,0,4,1,-2,0,0,0,0,0,-2,-2,0,0,0,0,8,-4+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-4-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-4+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-7-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-7+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-7-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-4,2+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,2-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-4+6*K.1^4+6*K.1^-4,-4+6*K.1-6*K.1^2-6*K.1^-4,-4-6*K.1+6*K.1^2-6*K.1^4,2-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,2+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,11,-7,-4+K.1-K.1^2+2*K.1^4+K.1^-4,-4+K.1-K.1^2-K.1^4-2*K.1^-4,-4-2*K.1+2*K.1^2-K.1^4+K.1^-4,-1+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-1-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-1-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,5+K.1-K.1^2+2*K.1^4+K.1^-4,5+K.1-K.1^2-K.1^4-2*K.1^-4,5-2*K.1+2*K.1^2-K.1^4+K.1^-4,2+3*K.1-3*K.1^2+3*K.1^4,2-3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^-4,-1+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,-1+K.1-K.1^2-4*K.1^4-5*K.1^-4,-1-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,2+3*K.1^4+3*K.1^-4,2+3*K.1-3*K.1^2-3*K.1^-4,2-3*K.1+3*K.1^2-3*K.1^4,2-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,2-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,2+6*K.1^4+6*K.1^-4,2+6*K.1-6*K.1^2-6*K.1^-4,2-6*K.1+6*K.1^2-6*K.1^4,5,-1,2,-4,-7,-1+3*K.1-3*K.1^2-3*K.1^-4,-1-3*K.1+3*K.1^2-3*K.1^4,-1+3*K.1^4+3*K.1^-4,-1+K.1-K.1^2+2*K.1^4+K.1^-4,-1+K.1-K.1^2-K.1^4-2*K.1^-4,-1-2*K.1+2*K.1^2-K.1^4+K.1^-4,-1,-1,-1,2-3*K.1+3*K.1^2+3*K.1^-4,2+3*K.1-3*K.1^2+3*K.1^4,2-3*K.1^4-3*K.1^-4,-1,-1,2,2,-1,-1,0,-4*K.1-4*K.1^-1,-4*K.1^4-4*K.1^-4,-4*K.1^2-4*K.1^-2,1-3*K.1+3*K.1^2+3*K.1^-4,1-3*K.1^4-3*K.1^-4,1+3*K.1-3*K.1^2+3*K.1^4,2-2*K.1^4-2*K.1^-4,2+2*K.1-2*K.1^2+2*K.1^4,2-2*K.1+2*K.1^2+2*K.1^-4,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,-4-2*K.1^4-2*K.1^-4,-4+2*K.1-2*K.1^2+2*K.1^4,-4-2*K.1+2*K.1^2+2*K.1^-4,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,2-2*K.1+2*K.1^2+2*K.1^-4,2-2*K.1^4-2*K.1^-4,2+2*K.1-2*K.1^2+2*K.1^4,1,1,2+K.1^4+K.1^-4,2-K.1+K.1^2-K.1^4,2+K.1-K.1^2-K.1^-4,1+K.1-K.1^2-K.1^4-2*K.1^-4,1+K.1-K.1^2+2*K.1^4+K.1^-4,1-2*K.1+2*K.1^2-K.1^4+K.1^-4,-1+K.1^4+K.1^-4,-1-K.1+K.1^2-K.1^4,-1+K.1-K.1^2-K.1^-4,-2-K.1+K.1^2-2*K.1^4-K.1^-4,-2+2*K.1-2*K.1^2+K.1^4-K.1^-4,-2-K.1+K.1^2+K.1^4+2*K.1^-4,-1-K.1+K.1^2-K.1^4,-1+K.1-K.1^2-K.1^-4,-1+K.1^4+K.1^-4,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,1,1,0,0,K.1^2+K.1^-2,K.1^2+K.1^-2,K.1^4+K.1^-4,K.1^4+K.1^-4,K.1+K.1^-1,K.1+K.1^-1,K.1^4+K.1^-4,K.1^4+K.1^-4,K.1+K.1^-1,K.1+K.1^-1,K.1^2+K.1^-2,K.1^2+K.1^-2,0,0,0,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |32,8,0,0,0,0,-4,-4,-4,5,2*K.1^-3,2*K.1^3,0,0,-4,-1,2,0,0,0,0,0,2*K.1^-3,2*K.1^3,0,0,0,0,8,-4+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-4+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-4-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-7-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-7-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-7+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-4,2+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,2-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-4-6*K.1+6*K.1^2-6*K.1^4,-4+6*K.1^4+6*K.1^-4,-4+6*K.1-6*K.1^2-6*K.1^-4,2-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,2+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,11,-7,-4-2*K.1+2*K.1^2-K.1^4+K.1^-4,-4+K.1-K.1^2+2*K.1^4+K.1^-4,-4+K.1-K.1^2-K.1^4-2*K.1^-4,-1-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-1+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-1-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,5-2*K.1+2*K.1^2-K.1^4+K.1^-4,5+K.1-K.1^2+2*K.1^4+K.1^-4,5+K.1-K.1^2-K.1^4-2*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^-4,2+3*K.1-3*K.1^2+3*K.1^4,2-3*K.1^4-3*K.1^-4,-1-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,-1+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,-1+K.1-K.1^2-4*K.1^4-5*K.1^-4,2-3*K.1+3*K.1^2-3*K.1^4,2+3*K.1^4+3*K.1^-4,2+3*K.1-3*K.1^2-3*K.1^-4,2-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,2-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,2-6*K.1+6*K.1^2-6*K.1^4,2+6*K.1^4+6*K.1^-4,2+6*K.1-6*K.1^2-6*K.1^-4,5,-1,2,-4,-7,-1+3*K.1^4+3*K.1^-4,-1+3*K.1-3*K.1^2-3*K.1^-4,-1-3*K.1+3*K.1^2-3*K.1^4,-1-2*K.1+2*K.1^2-K.1^4+K.1^-4,-1+K.1-K.1^2+2*K.1^4+K.1^-4,-1+K.1-K.1^2-K.1^4-2*K.1^-4,-1,-1,-1,2-3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^-4,2+3*K.1-3*K.1^2+3*K.1^4,-1*K.1^-3,-1*K.1^3,2*K.1^-3,2*K.1^3,-1*K.1^3,-1*K.1^-3,0,4*K.1^4+4*K.1^-4,4*K.1^2+4*K.1^-2,4*K.1+4*K.1^-1,-1+3*K.1^4+3*K.1^-4,-1-3*K.1+3*K.1^2-3*K.1^4,-1+3*K.1-3*K.1^2-3*K.1^-4,-2-2*K.1+2*K.1^2-2*K.1^4,-2+2*K.1-2*K.1^2-2*K.1^-4,-2+2*K.1^4+2*K.1^-4,-2*K.1^4-2*K.1^-4,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,4-2*K.1+2*K.1^2-2*K.1^4,4+2*K.1-2*K.1^2-2*K.1^-4,4+2*K.1^4+2*K.1^-4,-2*K.1^4-2*K.1^-4,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-2+2*K.1^4+2*K.1^-4,-2-2*K.1+2*K.1^2-2*K.1^4,-2+2*K.1-2*K.1^2-2*K.1^-4,-1,-1,-2+K.1-K.1^2+K.1^4,-2-K.1+K.1^2+K.1^-4,-2-K.1^4-K.1^-4,-1-K.1+K.1^2-2*K.1^4-K.1^-4,-1+2*K.1-2*K.1^2+K.1^4-K.1^-4,-1-K.1+K.1^2+K.1^4+2*K.1^-4,1+K.1-K.1^2+K.1^4,1-K.1+K.1^2+K.1^-4,1-K.1^4-K.1^-4,2-2*K.1+2*K.1^2-K.1^4+K.1^-4,2+K.1-K.1^2-K.1^4-2*K.1^-4,2+K.1-K.1^2+2*K.1^4+K.1^-4,1-K.1+K.1^2+K.1^-4,1-K.1^4-K.1^-4,1+K.1-K.1^2+K.1^4,K.1+K.1^-1,K.1^4+K.1^-4,K.1^2+K.1^-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1^3,-1*K.1^-3,0,0,-1*K.1-K.1^4+K.1^-4,K.1^2+K.1^4,K.1+K.1^-4,-1*K.1^2+K.1^4-K.1^-4,K.1+K.1^2,K.1^-2+K.1^-1,-1*K.1^2+K.1^4-K.1^-4,K.1+K.1^-4,K.1^-2+K.1^-1,K.1+K.1^2,-1*K.1-K.1^4+K.1^-4,K.1^2+K.1^4,0,0,0,K.1^-2+K.1^-1,K.1+K.1^2,-1*K.1^2+K.1^4-K.1^-4,K.1+K.1^-4,K.1^2+K.1^4,-1*K.1-K.1^4+K.1^-4]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |32,8,0,0,0,0,-4,-4,-4,5,2*K.1^3,2*K.1^-3,0,0,-4,-1,2,0,0,0,0,0,2*K.1^3,2*K.1^-3,0,0,0,0,8,-4+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-4+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-4-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-7-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-7-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-7+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-4,2+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,2-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-4-6*K.1+6*K.1^2-6*K.1^4,-4+6*K.1^4+6*K.1^-4,-4+6*K.1-6*K.1^2-6*K.1^-4,2-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,2+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,11,-7,-4-2*K.1+2*K.1^2-K.1^4+K.1^-4,-4+K.1-K.1^2+2*K.1^4+K.1^-4,-4+K.1-K.1^2-K.1^4-2*K.1^-4,-1-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-1+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-1-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,5-2*K.1+2*K.1^2-K.1^4+K.1^-4,5+K.1-K.1^2+2*K.1^4+K.1^-4,5+K.1-K.1^2-K.1^4-2*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^-4,2+3*K.1-3*K.1^2+3*K.1^4,2-3*K.1^4-3*K.1^-4,-1-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,-1+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,-1+K.1-K.1^2-4*K.1^4-5*K.1^-4,2-3*K.1+3*K.1^2-3*K.1^4,2+3*K.1^4+3*K.1^-4,2+3*K.1-3*K.1^2-3*K.1^-4,2-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,2-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,2-6*K.1+6*K.1^2-6*K.1^4,2+6*K.1^4+6*K.1^-4,2+6*K.1-6*K.1^2-6*K.1^-4,5,-1,2,-4,-7,-1+3*K.1^4+3*K.1^-4,-1+3*K.1-3*K.1^2-3*K.1^-4,-1-3*K.1+3*K.1^2-3*K.1^4,-1-2*K.1+2*K.1^2-K.1^4+K.1^-4,-1+K.1-K.1^2+2*K.1^4+K.1^-4,-1+K.1-K.1^2-K.1^4-2*K.1^-4,-1,-1,-1,2-3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^-4,2+3*K.1-3*K.1^2+3*K.1^4,-1*K.1^3,-1*K.1^-3,2*K.1^3,2*K.1^-3,-1*K.1^-3,-1*K.1^3,0,4*K.1^4+4*K.1^-4,4*K.1^2+4*K.1^-2,4*K.1+4*K.1^-1,-1+3*K.1^4+3*K.1^-4,-1-3*K.1+3*K.1^2-3*K.1^4,-1+3*K.1-3*K.1^2-3*K.1^-4,-2-2*K.1+2*K.1^2-2*K.1^4,-2+2*K.1-2*K.1^2-2*K.1^-4,-2+2*K.1^4+2*K.1^-4,-2*K.1^4-2*K.1^-4,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,4-2*K.1+2*K.1^2-2*K.1^4,4+2*K.1-2*K.1^2-2*K.1^-4,4+2*K.1^4+2*K.1^-4,-2*K.1^4-2*K.1^-4,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-2+2*K.1^4+2*K.1^-4,-2-2*K.1+2*K.1^2-2*K.1^4,-2+2*K.1-2*K.1^2-2*K.1^-4,-1,-1,-2+K.1-K.1^2+K.1^4,-2-K.1+K.1^2+K.1^-4,-2-K.1^4-K.1^-4,-1-K.1+K.1^2-2*K.1^4-K.1^-4,-1+2*K.1-2*K.1^2+K.1^4-K.1^-4,-1-K.1+K.1^2+K.1^4+2*K.1^-4,1+K.1-K.1^2+K.1^4,1-K.1+K.1^2+K.1^-4,1-K.1^4-K.1^-4,2-2*K.1+2*K.1^2-K.1^4+K.1^-4,2+K.1-K.1^2-K.1^4-2*K.1^-4,2+K.1-K.1^2+2*K.1^4+K.1^-4,1-K.1+K.1^2+K.1^-4,1-K.1^4-K.1^-4,1+K.1-K.1^2+K.1^4,K.1+K.1^-1,K.1^4+K.1^-4,K.1^2+K.1^-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1^-3,-1*K.1^3,0,0,K.1^2+K.1^4,-1*K.1-K.1^4+K.1^-4,-1*K.1^2+K.1^4-K.1^-4,K.1+K.1^-4,K.1^-2+K.1^-1,K.1+K.1^2,K.1+K.1^-4,-1*K.1^2+K.1^4-K.1^-4,K.1+K.1^2,K.1^-2+K.1^-1,K.1^2+K.1^4,-1*K.1-K.1^4+K.1^-4,0,0,0,K.1+K.1^2,K.1^-2+K.1^-1,K.1+K.1^-4,-1*K.1^2+K.1^4-K.1^-4,-1*K.1-K.1^4+K.1^-4,K.1^2+K.1^4]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |32,8,0,0,0,0,-4,-4,-4,5,2*K.1^-3,2*K.1^3,0,0,-4,-1,2,0,0,0,0,0,2*K.1^-3,2*K.1^3,0,0,0,0,8,-4-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-4+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-4+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-7+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-7-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-7-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-4,2-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-4+6*K.1-6*K.1^2-6*K.1^-4,-4-6*K.1+6*K.1^2-6*K.1^4,-4+6*K.1^4+6*K.1^-4,2+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,11,-7,-4+K.1-K.1^2-K.1^4-2*K.1^-4,-4-2*K.1+2*K.1^2-K.1^4+K.1^-4,-4+K.1-K.1^2+2*K.1^4+K.1^-4,-1-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-1-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-1+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,5+K.1-K.1^2-K.1^4-2*K.1^-4,5-2*K.1+2*K.1^2-K.1^4+K.1^-4,5+K.1-K.1^2+2*K.1^4+K.1^-4,2-3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^-4,2+3*K.1-3*K.1^2+3*K.1^4,-1+K.1-K.1^2-4*K.1^4-5*K.1^-4,-1-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,-1+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,2+3*K.1-3*K.1^2-3*K.1^-4,2-3*K.1+3*K.1^2-3*K.1^4,2+3*K.1^4+3*K.1^-4,2+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,2-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,2-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,2+6*K.1-6*K.1^2-6*K.1^-4,2-6*K.1+6*K.1^2-6*K.1^4,2+6*K.1^4+6*K.1^-4,5,-1,2,-4,-7,-1-3*K.1+3*K.1^2-3*K.1^4,-1+3*K.1^4+3*K.1^-4,-1+3*K.1-3*K.1^2-3*K.1^-4,-1+K.1-K.1^2-K.1^4-2*K.1^-4,-1-2*K.1+2*K.1^2-K.1^4+K.1^-4,-1+K.1-K.1^2+2*K.1^4+K.1^-4,-1,-1,-1,2+3*K.1-3*K.1^2+3*K.1^4,2-3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^-4,-1*K.1^-3,-1*K.1^3,2*K.1^-3,2*K.1^3,-1*K.1^3,-1*K.1^-3,0,4*K.1^2+4*K.1^-2,4*K.1+4*K.1^-1,4*K.1^4+4*K.1^-4,-1-3*K.1+3*K.1^2-3*K.1^4,-1+3*K.1-3*K.1^2-3*K.1^-4,-1+3*K.1^4+3*K.1^-4,-2+2*K.1-2*K.1^2-2*K.1^-4,-2+2*K.1^4+2*K.1^-4,-2-2*K.1+2*K.1^2-2*K.1^4,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1^4-2*K.1^-4,4+2*K.1-2*K.1^2-2*K.1^-4,4+2*K.1^4+2*K.1^-4,4-2*K.1+2*K.1^2-2*K.1^4,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1^4-2*K.1^-4,-2-2*K.1+2*K.1^2-2*K.1^4,-2+2*K.1-2*K.1^2-2*K.1^-4,-2+2*K.1^4+2*K.1^-4,-1,-1,-2-K.1+K.1^2+K.1^-4,-2-K.1^4-K.1^-4,-2+K.1-K.1^2+K.1^4,-1+2*K.1-2*K.1^2+K.1^4-K.1^-4,-1-K.1+K.1^2+K.1^4+2*K.1^-4,-1-K.1+K.1^2-2*K.1^4-K.1^-4,1-K.1+K.1^2+K.1^-4,1-K.1^4-K.1^-4,1+K.1-K.1^2+K.1^4,2+K.1-K.1^2-K.1^4-2*K.1^-4,2+K.1-K.1^2+2*K.1^4+K.1^-4,2-2*K.1+2*K.1^2-K.1^4+K.1^-4,1-K.1^4-K.1^-4,1+K.1-K.1^2+K.1^4,1-K.1+K.1^2+K.1^-4,K.1^4+K.1^-4,K.1^2+K.1^-2,K.1+K.1^-1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1^3,-1*K.1^-3,0,0,K.1+K.1^2,K.1^-2+K.1^-1,K.1^2+K.1^4,-1*K.1-K.1^4+K.1^-4,-1*K.1^2+K.1^4-K.1^-4,K.1+K.1^-4,-1*K.1-K.1^4+K.1^-4,K.1^2+K.1^4,K.1+K.1^-4,-1*K.1^2+K.1^4-K.1^-4,K.1+K.1^2,K.1^-2+K.1^-1,0,0,0,K.1+K.1^-4,-1*K.1^2+K.1^4-K.1^-4,-1*K.1-K.1^4+K.1^-4,K.1^2+K.1^4,K.1^-2+K.1^-1,K.1+K.1^2]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |32,8,0,0,0,0,-4,-4,-4,5,2*K.1^3,2*K.1^-3,0,0,-4,-1,2,0,0,0,0,0,2*K.1^3,2*K.1^-3,0,0,0,0,8,-4-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-4+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-4+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-7+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-7-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-7-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-4,2-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-4+6*K.1-6*K.1^2-6*K.1^-4,-4-6*K.1+6*K.1^2-6*K.1^4,-4+6*K.1^4+6*K.1^-4,2+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,11,-7,-4+K.1-K.1^2-K.1^4-2*K.1^-4,-4-2*K.1+2*K.1^2-K.1^4+K.1^-4,-4+K.1-K.1^2+2*K.1^4+K.1^-4,-1-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-1-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-1+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,5+K.1-K.1^2-K.1^4-2*K.1^-4,5-2*K.1+2*K.1^2-K.1^4+K.1^-4,5+K.1-K.1^2+2*K.1^4+K.1^-4,2-3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^-4,2+3*K.1-3*K.1^2+3*K.1^4,-1+K.1-K.1^2-4*K.1^4-5*K.1^-4,-1-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,-1+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,2+3*K.1-3*K.1^2-3*K.1^-4,2-3*K.1+3*K.1^2-3*K.1^4,2+3*K.1^4+3*K.1^-4,2+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,2-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,2-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,2+6*K.1-6*K.1^2-6*K.1^-4,2-6*K.1+6*K.1^2-6*K.1^4,2+6*K.1^4+6*K.1^-4,5,-1,2,-4,-7,-1-3*K.1+3*K.1^2-3*K.1^4,-1+3*K.1^4+3*K.1^-4,-1+3*K.1-3*K.1^2-3*K.1^-4,-1+K.1-K.1^2-K.1^4-2*K.1^-4,-1-2*K.1+2*K.1^2-K.1^4+K.1^-4,-1+K.1-K.1^2+2*K.1^4+K.1^-4,-1,-1,-1,2+3*K.1-3*K.1^2+3*K.1^4,2-3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^-4,-1*K.1^3,-1*K.1^-3,2*K.1^3,2*K.1^-3,-1*K.1^-3,-1*K.1^3,0,4*K.1^2+4*K.1^-2,4*K.1+4*K.1^-1,4*K.1^4+4*K.1^-4,-1-3*K.1+3*K.1^2-3*K.1^4,-1+3*K.1-3*K.1^2-3*K.1^-4,-1+3*K.1^4+3*K.1^-4,-2+2*K.1-2*K.1^2-2*K.1^-4,-2+2*K.1^4+2*K.1^-4,-2-2*K.1+2*K.1^2-2*K.1^4,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1^4-2*K.1^-4,4+2*K.1-2*K.1^2-2*K.1^-4,4+2*K.1^4+2*K.1^-4,4-2*K.1+2*K.1^2-2*K.1^4,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1^4-2*K.1^-4,-2-2*K.1+2*K.1^2-2*K.1^4,-2+2*K.1-2*K.1^2-2*K.1^-4,-2+2*K.1^4+2*K.1^-4,-1,-1,-2-K.1+K.1^2+K.1^-4,-2-K.1^4-K.1^-4,-2+K.1-K.1^2+K.1^4,-1+2*K.1-2*K.1^2+K.1^4-K.1^-4,-1-K.1+K.1^2+K.1^4+2*K.1^-4,-1-K.1+K.1^2-2*K.1^4-K.1^-4,1-K.1+K.1^2+K.1^-4,1-K.1^4-K.1^-4,1+K.1-K.1^2+K.1^4,2+K.1-K.1^2-K.1^4-2*K.1^-4,2+K.1-K.1^2+2*K.1^4+K.1^-4,2-2*K.1+2*K.1^2-K.1^4+K.1^-4,1-K.1^4-K.1^-4,1+K.1-K.1^2+K.1^4,1-K.1+K.1^2+K.1^-4,K.1^4+K.1^-4,K.1^2+K.1^-2,K.1+K.1^-1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1^-3,-1*K.1^3,0,0,K.1^-2+K.1^-1,K.1+K.1^2,-1*K.1-K.1^4+K.1^-4,K.1^2+K.1^4,K.1+K.1^-4,-1*K.1^2+K.1^4-K.1^-4,K.1^2+K.1^4,-1*K.1-K.1^4+K.1^-4,-1*K.1^2+K.1^4-K.1^-4,K.1+K.1^-4,K.1^-2+K.1^-1,K.1+K.1^2,0,0,0,-1*K.1^2+K.1^4-K.1^-4,K.1+K.1^-4,K.1^2+K.1^4,-1*K.1-K.1^4+K.1^-4,K.1+K.1^2,K.1^-2+K.1^-1]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |32,8,0,0,0,0,-4,-4,-4,5,2*K.1^-3,2*K.1^3,0,0,-4,-1,2,0,0,0,0,0,2*K.1^-3,2*K.1^3,0,0,0,0,8,-4+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-4-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-4+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-7-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-7+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-7-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-4,2+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,2-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-4+6*K.1^4+6*K.1^-4,-4+6*K.1-6*K.1^2-6*K.1^-4,-4-6*K.1+6*K.1^2-6*K.1^4,2-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,2+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,11,-7,-4+K.1-K.1^2+2*K.1^4+K.1^-4,-4+K.1-K.1^2-K.1^4-2*K.1^-4,-4-2*K.1+2*K.1^2-K.1^4+K.1^-4,-1+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-1-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-1-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,5+K.1-K.1^2+2*K.1^4+K.1^-4,5+K.1-K.1^2-K.1^4-2*K.1^-4,5-2*K.1+2*K.1^2-K.1^4+K.1^-4,2+3*K.1-3*K.1^2+3*K.1^4,2-3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^-4,-1+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,-1+K.1-K.1^2-4*K.1^4-5*K.1^-4,-1-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,2+3*K.1^4+3*K.1^-4,2+3*K.1-3*K.1^2-3*K.1^-4,2-3*K.1+3*K.1^2-3*K.1^4,2-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,2-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,2+6*K.1^4+6*K.1^-4,2+6*K.1-6*K.1^2-6*K.1^-4,2-6*K.1+6*K.1^2-6*K.1^4,5,-1,2,-4,-7,-1+3*K.1-3*K.1^2-3*K.1^-4,-1-3*K.1+3*K.1^2-3*K.1^4,-1+3*K.1^4+3*K.1^-4,-1+K.1-K.1^2+2*K.1^4+K.1^-4,-1+K.1-K.1^2-K.1^4-2*K.1^-4,-1-2*K.1+2*K.1^2-K.1^4+K.1^-4,-1,-1,-1,2-3*K.1+3*K.1^2+3*K.1^-4,2+3*K.1-3*K.1^2+3*K.1^4,2-3*K.1^4-3*K.1^-4,-1*K.1^-3,-1*K.1^3,2*K.1^-3,2*K.1^3,-1*K.1^3,-1*K.1^-3,0,4*K.1+4*K.1^-1,4*K.1^4+4*K.1^-4,4*K.1^2+4*K.1^-2,-1+3*K.1-3*K.1^2-3*K.1^-4,-1+3*K.1^4+3*K.1^-4,-1-3*K.1+3*K.1^2-3*K.1^4,-2+2*K.1^4+2*K.1^-4,-2-2*K.1+2*K.1^2-2*K.1^4,-2+2*K.1-2*K.1^2-2*K.1^-4,-2*K.1-2*K.1^-1,-2*K.1^4-2*K.1^-4,-2*K.1^2-2*K.1^-2,4+2*K.1^4+2*K.1^-4,4-2*K.1+2*K.1^2-2*K.1^4,4+2*K.1-2*K.1^2-2*K.1^-4,-2*K.1-2*K.1^-1,-2*K.1^4-2*K.1^-4,-2*K.1^2-2*K.1^-2,-2+2*K.1-2*K.1^2-2*K.1^-4,-2+2*K.1^4+2*K.1^-4,-2-2*K.1+2*K.1^2-2*K.1^4,-1,-1,-2-K.1^4-K.1^-4,-2+K.1-K.1^2+K.1^4,-2-K.1+K.1^2+K.1^-4,-1-K.1+K.1^2+K.1^4+2*K.1^-4,-1-K.1+K.1^2-2*K.1^4-K.1^-4,-1+2*K.1-2*K.1^2+K.1^4-K.1^-4,1-K.1^4-K.1^-4,1+K.1-K.1^2+K.1^4,1-K.1+K.1^2+K.1^-4,2+K.1-K.1^2+2*K.1^4+K.1^-4,2-2*K.1+2*K.1^2-K.1^4+K.1^-4,2+K.1-K.1^2-K.1^4-2*K.1^-4,1+K.1-K.1^2+K.1^4,1-K.1+K.1^2+K.1^-4,1-K.1^4-K.1^-4,K.1^2+K.1^-2,K.1+K.1^-1,K.1^4+K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1^3,-1*K.1^-3,0,0,-1*K.1^2+K.1^4-K.1^-4,K.1+K.1^-4,K.1^-2+K.1^-1,K.1+K.1^2,-1*K.1-K.1^4+K.1^-4,K.1^2+K.1^4,K.1+K.1^2,K.1^-2+K.1^-1,K.1^2+K.1^4,-1*K.1-K.1^4+K.1^-4,-1*K.1^2+K.1^4-K.1^-4,K.1+K.1^-4,0,0,0,K.1^2+K.1^4,-1*K.1-K.1^4+K.1^-4,K.1+K.1^2,K.1^-2+K.1^-1,K.1+K.1^-4,-1*K.1^2+K.1^4-K.1^-4]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |32,8,0,0,0,0,-4,-4,-4,5,2*K.1^3,2*K.1^-3,0,0,-4,-1,2,0,0,0,0,0,2*K.1^3,2*K.1^-3,0,0,0,0,8,-4+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-4-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-4+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-7-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-7+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-7-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-4,2+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,2-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-4+6*K.1^4+6*K.1^-4,-4+6*K.1-6*K.1^2-6*K.1^-4,-4-6*K.1+6*K.1^2-6*K.1^4,2-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,2+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,11,-7,-4+K.1-K.1^2+2*K.1^4+K.1^-4,-4+K.1-K.1^2-K.1^4-2*K.1^-4,-4-2*K.1+2*K.1^2-K.1^4+K.1^-4,-1+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-1-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-1-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,5+K.1-K.1^2+2*K.1^4+K.1^-4,5+K.1-K.1^2-K.1^4-2*K.1^-4,5-2*K.1+2*K.1^2-K.1^4+K.1^-4,2+3*K.1-3*K.1^2+3*K.1^4,2-3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^-4,-1+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,-1+K.1-K.1^2-4*K.1^4-5*K.1^-4,-1-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,2+3*K.1^4+3*K.1^-4,2+3*K.1-3*K.1^2-3*K.1^-4,2-3*K.1+3*K.1^2-3*K.1^4,2-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,2-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,2+6*K.1^4+6*K.1^-4,2+6*K.1-6*K.1^2-6*K.1^-4,2-6*K.1+6*K.1^2-6*K.1^4,5,-1,2,-4,-7,-1+3*K.1-3*K.1^2-3*K.1^-4,-1-3*K.1+3*K.1^2-3*K.1^4,-1+3*K.1^4+3*K.1^-4,-1+K.1-K.1^2+2*K.1^4+K.1^-4,-1+K.1-K.1^2-K.1^4-2*K.1^-4,-1-2*K.1+2*K.1^2-K.1^4+K.1^-4,-1,-1,-1,2-3*K.1+3*K.1^2+3*K.1^-4,2+3*K.1-3*K.1^2+3*K.1^4,2-3*K.1^4-3*K.1^-4,-1*K.1^3,-1*K.1^-3,2*K.1^3,2*K.1^-3,-1*K.1^-3,-1*K.1^3,0,4*K.1+4*K.1^-1,4*K.1^4+4*K.1^-4,4*K.1^2+4*K.1^-2,-1+3*K.1-3*K.1^2-3*K.1^-4,-1+3*K.1^4+3*K.1^-4,-1-3*K.1+3*K.1^2-3*K.1^4,-2+2*K.1^4+2*K.1^-4,-2-2*K.1+2*K.1^2-2*K.1^4,-2+2*K.1-2*K.1^2-2*K.1^-4,-2*K.1-2*K.1^-1,-2*K.1^4-2*K.1^-4,-2*K.1^2-2*K.1^-2,4+2*K.1^4+2*K.1^-4,4-2*K.1+2*K.1^2-2*K.1^4,4+2*K.1-2*K.1^2-2*K.1^-4,-2*K.1-2*K.1^-1,-2*K.1^4-2*K.1^-4,-2*K.1^2-2*K.1^-2,-2+2*K.1-2*K.1^2-2*K.1^-4,-2+2*K.1^4+2*K.1^-4,-2-2*K.1+2*K.1^2-2*K.1^4,-1,-1,-2-K.1^4-K.1^-4,-2+K.1-K.1^2+K.1^4,-2-K.1+K.1^2+K.1^-4,-1-K.1+K.1^2+K.1^4+2*K.1^-4,-1-K.1+K.1^2-2*K.1^4-K.1^-4,-1+2*K.1-2*K.1^2+K.1^4-K.1^-4,1-K.1^4-K.1^-4,1+K.1-K.1^2+K.1^4,1-K.1+K.1^2+K.1^-4,2+K.1-K.1^2+2*K.1^4+K.1^-4,2-2*K.1+2*K.1^2-K.1^4+K.1^-4,2+K.1-K.1^2-K.1^4-2*K.1^-4,1+K.1-K.1^2+K.1^4,1-K.1+K.1^2+K.1^-4,1-K.1^4-K.1^-4,K.1^2+K.1^-2,K.1+K.1^-1,K.1^4+K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-1*K.1^-3,-1*K.1^3,0,0,K.1+K.1^-4,-1*K.1^2+K.1^4-K.1^-4,K.1+K.1^2,K.1^-2+K.1^-1,K.1^2+K.1^4,-1*K.1-K.1^4+K.1^-4,K.1^-2+K.1^-1,K.1+K.1^2,-1*K.1-K.1^4+K.1^-4,K.1^2+K.1^4,K.1+K.1^-4,-1*K.1^2+K.1^4-K.1^-4,0,0,0,-1*K.1-K.1^4+K.1^-4,K.1^2+K.1^4,K.1^-2+K.1^-1,K.1+K.1^2,-1*K.1^2+K.1^4-K.1^-4,K.1+K.1^-4]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |32,-8,0,0,0,0,-4,-4,-4,5,2*K.1^-3,2*K.1^3,0,0,4,1,-2,0,0,0,0,0,-2*K.1^-3,-2*K.1^3,0,0,0,0,8,-4+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-4+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-4-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-7-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-7-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-7+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-4,2+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,2-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-4-6*K.1+6*K.1^2-6*K.1^4,-4+6*K.1^4+6*K.1^-4,-4+6*K.1-6*K.1^2-6*K.1^-4,2-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,2+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,11,-7,-4-2*K.1+2*K.1^2-K.1^4+K.1^-4,-4+K.1-K.1^2+2*K.1^4+K.1^-4,-4+K.1-K.1^2-K.1^4-2*K.1^-4,-1-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-1+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-1-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,5-2*K.1+2*K.1^2-K.1^4+K.1^-4,5+K.1-K.1^2+2*K.1^4+K.1^-4,5+K.1-K.1^2-K.1^4-2*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^-4,2+3*K.1-3*K.1^2+3*K.1^4,2-3*K.1^4-3*K.1^-4,-1-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,-1+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,-1+K.1-K.1^2-4*K.1^4-5*K.1^-4,2-3*K.1+3*K.1^2-3*K.1^4,2+3*K.1^4+3*K.1^-4,2+3*K.1-3*K.1^2-3*K.1^-4,2-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,2-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,2-6*K.1+6*K.1^2-6*K.1^4,2+6*K.1^4+6*K.1^-4,2+6*K.1-6*K.1^2-6*K.1^-4,5,-1,2,-4,-7,-1+3*K.1^4+3*K.1^-4,-1+3*K.1-3*K.1^2-3*K.1^-4,-1-3*K.1+3*K.1^2-3*K.1^4,-1-2*K.1+2*K.1^2-K.1^4+K.1^-4,-1+K.1-K.1^2+2*K.1^4+K.1^-4,-1+K.1-K.1^2-K.1^4-2*K.1^-4,-1,-1,-1,2-3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^-4,2+3*K.1-3*K.1^2+3*K.1^4,-1*K.1^-3,-1*K.1^3,2*K.1^-3,2*K.1^3,-1*K.1^3,-1*K.1^-3,0,-4*K.1^4-4*K.1^-4,-4*K.1^2-4*K.1^-2,-4*K.1-4*K.1^-1,1-3*K.1^4-3*K.1^-4,1+3*K.1-3*K.1^2+3*K.1^4,1-3*K.1+3*K.1^2+3*K.1^-4,2+2*K.1-2*K.1^2+2*K.1^4,2-2*K.1+2*K.1^2+2*K.1^-4,2-2*K.1^4-2*K.1^-4,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,-4+2*K.1-2*K.1^2+2*K.1^4,-4-2*K.1+2*K.1^2+2*K.1^-4,-4-2*K.1^4-2*K.1^-4,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2-2*K.1^4-2*K.1^-4,2+2*K.1-2*K.1^2+2*K.1^4,2-2*K.1+2*K.1^2+2*K.1^-4,1,1,2-K.1+K.1^2-K.1^4,2+K.1-K.1^2-K.1^-4,2+K.1^4+K.1^-4,1+K.1-K.1^2+2*K.1^4+K.1^-4,1-2*K.1+2*K.1^2-K.1^4+K.1^-4,1+K.1-K.1^2-K.1^4-2*K.1^-4,-1-K.1+K.1^2-K.1^4,-1+K.1-K.1^2-K.1^-4,-1+K.1^4+K.1^-4,-2+2*K.1-2*K.1^2+K.1^4-K.1^-4,-2-K.1+K.1^2+K.1^4+2*K.1^-4,-2-K.1+K.1^2-2*K.1^4-K.1^-4,-1+K.1-K.1^2-K.1^-4,-1+K.1^4+K.1^-4,-1-K.1+K.1^2-K.1^4,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1^3,K.1^-3,0,0,-1*K.1-K.1^4+K.1^-4,K.1^2+K.1^4,K.1+K.1^-4,-1*K.1^2+K.1^4-K.1^-4,K.1+K.1^2,K.1^-2+K.1^-1,-1*K.1^2+K.1^4-K.1^-4,K.1+K.1^-4,K.1^-2+K.1^-1,K.1+K.1^2,-1*K.1-K.1^4+K.1^-4,K.1^2+K.1^4,0,0,0,-1*K.1^-2-K.1^-1,-1*K.1-K.1^2,K.1^2-K.1^4+K.1^-4,-1*K.1-K.1^-4,-1*K.1^2-K.1^4,K.1+K.1^4-K.1^-4]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |32,-8,0,0,0,0,-4,-4,-4,5,2*K.1^3,2*K.1^-3,0,0,4,1,-2,0,0,0,0,0,-2*K.1^3,-2*K.1^-3,0,0,0,0,8,-4+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-4+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-4-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-7-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-7-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-7+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-4,2+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,2-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-4-6*K.1+6*K.1^2-6*K.1^4,-4+6*K.1^4+6*K.1^-4,-4+6*K.1-6*K.1^2-6*K.1^-4,2-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,2+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,11,-7,-4-2*K.1+2*K.1^2-K.1^4+K.1^-4,-4+K.1-K.1^2+2*K.1^4+K.1^-4,-4+K.1-K.1^2-K.1^4-2*K.1^-4,-1-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-1+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-1-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,5-2*K.1+2*K.1^2-K.1^4+K.1^-4,5+K.1-K.1^2+2*K.1^4+K.1^-4,5+K.1-K.1^2-K.1^4-2*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^-4,2+3*K.1-3*K.1^2+3*K.1^4,2-3*K.1^4-3*K.1^-4,-1-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,-1+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,-1+K.1-K.1^2-4*K.1^4-5*K.1^-4,2-3*K.1+3*K.1^2-3*K.1^4,2+3*K.1^4+3*K.1^-4,2+3*K.1-3*K.1^2-3*K.1^-4,2-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,2-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,2-6*K.1+6*K.1^2-6*K.1^4,2+6*K.1^4+6*K.1^-4,2+6*K.1-6*K.1^2-6*K.1^-4,5,-1,2,-4,-7,-1+3*K.1^4+3*K.1^-4,-1+3*K.1-3*K.1^2-3*K.1^-4,-1-3*K.1+3*K.1^2-3*K.1^4,-1-2*K.1+2*K.1^2-K.1^4+K.1^-4,-1+K.1-K.1^2+2*K.1^4+K.1^-4,-1+K.1-K.1^2-K.1^4-2*K.1^-4,-1,-1,-1,2-3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^-4,2+3*K.1-3*K.1^2+3*K.1^4,-1*K.1^3,-1*K.1^-3,2*K.1^3,2*K.1^-3,-1*K.1^-3,-1*K.1^3,0,-4*K.1^4-4*K.1^-4,-4*K.1^2-4*K.1^-2,-4*K.1-4*K.1^-1,1-3*K.1^4-3*K.1^-4,1+3*K.1-3*K.1^2+3*K.1^4,1-3*K.1+3*K.1^2+3*K.1^-4,2+2*K.1-2*K.1^2+2*K.1^4,2-2*K.1+2*K.1^2+2*K.1^-4,2-2*K.1^4-2*K.1^-4,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,-4+2*K.1-2*K.1^2+2*K.1^4,-4-2*K.1+2*K.1^2+2*K.1^-4,-4-2*K.1^4-2*K.1^-4,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2-2*K.1^4-2*K.1^-4,2+2*K.1-2*K.1^2+2*K.1^4,2-2*K.1+2*K.1^2+2*K.1^-4,1,1,2-K.1+K.1^2-K.1^4,2+K.1-K.1^2-K.1^-4,2+K.1^4+K.1^-4,1+K.1-K.1^2+2*K.1^4+K.1^-4,1-2*K.1+2*K.1^2-K.1^4+K.1^-4,1+K.1-K.1^2-K.1^4-2*K.1^-4,-1-K.1+K.1^2-K.1^4,-1+K.1-K.1^2-K.1^-4,-1+K.1^4+K.1^-4,-2+2*K.1-2*K.1^2+K.1^4-K.1^-4,-2-K.1+K.1^2+K.1^4+2*K.1^-4,-2-K.1+K.1^2-2*K.1^4-K.1^-4,-1+K.1-K.1^2-K.1^-4,-1+K.1^4+K.1^-4,-1-K.1+K.1^2-K.1^4,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1^-3,K.1^3,0,0,K.1^2+K.1^4,-1*K.1-K.1^4+K.1^-4,-1*K.1^2+K.1^4-K.1^-4,K.1+K.1^-4,K.1^-2+K.1^-1,K.1+K.1^2,K.1+K.1^-4,-1*K.1^2+K.1^4-K.1^-4,K.1+K.1^2,K.1^-2+K.1^-1,K.1^2+K.1^4,-1*K.1-K.1^4+K.1^-4,0,0,0,-1*K.1-K.1^2,-1*K.1^-2-K.1^-1,-1*K.1-K.1^-4,K.1^2-K.1^4+K.1^-4,K.1+K.1^4-K.1^-4,-1*K.1^2-K.1^4]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |32,-8,0,0,0,0,-4,-4,-4,5,2*K.1^-3,2*K.1^3,0,0,4,1,-2,0,0,0,0,0,-2*K.1^-3,-2*K.1^3,0,0,0,0,8,-4-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-4+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-4+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-7+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-7-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-7-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-4,2-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-4+6*K.1-6*K.1^2-6*K.1^-4,-4-6*K.1+6*K.1^2-6*K.1^4,-4+6*K.1^4+6*K.1^-4,2+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,11,-7,-4+K.1-K.1^2-K.1^4-2*K.1^-4,-4-2*K.1+2*K.1^2-K.1^4+K.1^-4,-4+K.1-K.1^2+2*K.1^4+K.1^-4,-1-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-1-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-1+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,5+K.1-K.1^2-K.1^4-2*K.1^-4,5-2*K.1+2*K.1^2-K.1^4+K.1^-4,5+K.1-K.1^2+2*K.1^4+K.1^-4,2-3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^-4,2+3*K.1-3*K.1^2+3*K.1^4,-1+K.1-K.1^2-4*K.1^4-5*K.1^-4,-1-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,-1+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,2+3*K.1-3*K.1^2-3*K.1^-4,2-3*K.1+3*K.1^2-3*K.1^4,2+3*K.1^4+3*K.1^-4,2+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,2-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,2-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,2+6*K.1-6*K.1^2-6*K.1^-4,2-6*K.1+6*K.1^2-6*K.1^4,2+6*K.1^4+6*K.1^-4,5,-1,2,-4,-7,-1-3*K.1+3*K.1^2-3*K.1^4,-1+3*K.1^4+3*K.1^-4,-1+3*K.1-3*K.1^2-3*K.1^-4,-1+K.1-K.1^2-K.1^4-2*K.1^-4,-1-2*K.1+2*K.1^2-K.1^4+K.1^-4,-1+K.1-K.1^2+2*K.1^4+K.1^-4,-1,-1,-1,2+3*K.1-3*K.1^2+3*K.1^4,2-3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^-4,-1*K.1^-3,-1*K.1^3,2*K.1^-3,2*K.1^3,-1*K.1^3,-1*K.1^-3,0,-4*K.1^2-4*K.1^-2,-4*K.1-4*K.1^-1,-4*K.1^4-4*K.1^-4,1+3*K.1-3*K.1^2+3*K.1^4,1-3*K.1+3*K.1^2+3*K.1^-4,1-3*K.1^4-3*K.1^-4,2-2*K.1+2*K.1^2+2*K.1^-4,2-2*K.1^4-2*K.1^-4,2+2*K.1-2*K.1^2+2*K.1^4,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,-4-2*K.1+2*K.1^2+2*K.1^-4,-4-2*K.1^4-2*K.1^-4,-4+2*K.1-2*K.1^2+2*K.1^4,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,2+2*K.1-2*K.1^2+2*K.1^4,2-2*K.1+2*K.1^2+2*K.1^-4,2-2*K.1^4-2*K.1^-4,1,1,2+K.1-K.1^2-K.1^-4,2+K.1^4+K.1^-4,2-K.1+K.1^2-K.1^4,1-2*K.1+2*K.1^2-K.1^4+K.1^-4,1+K.1-K.1^2-K.1^4-2*K.1^-4,1+K.1-K.1^2+2*K.1^4+K.1^-4,-1+K.1-K.1^2-K.1^-4,-1+K.1^4+K.1^-4,-1-K.1+K.1^2-K.1^4,-2-K.1+K.1^2+K.1^4+2*K.1^-4,-2-K.1+K.1^2-2*K.1^4-K.1^-4,-2+2*K.1-2*K.1^2+K.1^4-K.1^-4,-1+K.1^4+K.1^-4,-1-K.1+K.1^2-K.1^4,-1+K.1-K.1^2-K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1^3,K.1^-3,0,0,K.1+K.1^2,K.1^-2+K.1^-1,K.1^2+K.1^4,-1*K.1-K.1^4+K.1^-4,-1*K.1^2+K.1^4-K.1^-4,K.1+K.1^-4,-1*K.1-K.1^4+K.1^-4,K.1^2+K.1^4,K.1+K.1^-4,-1*K.1^2+K.1^4-K.1^-4,K.1+K.1^2,K.1^-2+K.1^-1,0,0,0,-1*K.1-K.1^-4,K.1^2-K.1^4+K.1^-4,K.1+K.1^4-K.1^-4,-1*K.1^2-K.1^4,-1*K.1^-2-K.1^-1,-1*K.1-K.1^2]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |32,-8,0,0,0,0,-4,-4,-4,5,2*K.1^3,2*K.1^-3,0,0,4,1,-2,0,0,0,0,0,-2*K.1^3,-2*K.1^-3,0,0,0,0,8,-4-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-4+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-4+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-7+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-7-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-7-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-4,2-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-4+6*K.1-6*K.1^2-6*K.1^-4,-4-6*K.1+6*K.1^2-6*K.1^4,-4+6*K.1^4+6*K.1^-4,2+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,11,-7,-4+K.1-K.1^2-K.1^4-2*K.1^-4,-4-2*K.1+2*K.1^2-K.1^4+K.1^-4,-4+K.1-K.1^2+2*K.1^4+K.1^-4,-1-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-1-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-1+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,5+K.1-K.1^2-K.1^4-2*K.1^-4,5-2*K.1+2*K.1^2-K.1^4+K.1^-4,5+K.1-K.1^2+2*K.1^4+K.1^-4,2-3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^-4,2+3*K.1-3*K.1^2+3*K.1^4,-1+K.1-K.1^2-4*K.1^4-5*K.1^-4,-1-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,-1+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,2+3*K.1-3*K.1^2-3*K.1^-4,2-3*K.1+3*K.1^2-3*K.1^4,2+3*K.1^4+3*K.1^-4,2+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,2-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,2-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,2+6*K.1-6*K.1^2-6*K.1^-4,2-6*K.1+6*K.1^2-6*K.1^4,2+6*K.1^4+6*K.1^-4,5,-1,2,-4,-7,-1-3*K.1+3*K.1^2-3*K.1^4,-1+3*K.1^4+3*K.1^-4,-1+3*K.1-3*K.1^2-3*K.1^-4,-1+K.1-K.1^2-K.1^4-2*K.1^-4,-1-2*K.1+2*K.1^2-K.1^4+K.1^-4,-1+K.1-K.1^2+2*K.1^4+K.1^-4,-1,-1,-1,2+3*K.1-3*K.1^2+3*K.1^4,2-3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^-4,-1*K.1^3,-1*K.1^-3,2*K.1^3,2*K.1^-3,-1*K.1^-3,-1*K.1^3,0,-4*K.1^2-4*K.1^-2,-4*K.1-4*K.1^-1,-4*K.1^4-4*K.1^-4,1+3*K.1-3*K.1^2+3*K.1^4,1-3*K.1+3*K.1^2+3*K.1^-4,1-3*K.1^4-3*K.1^-4,2-2*K.1+2*K.1^2+2*K.1^-4,2-2*K.1^4-2*K.1^-4,2+2*K.1-2*K.1^2+2*K.1^4,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,-4-2*K.1+2*K.1^2+2*K.1^-4,-4-2*K.1^4-2*K.1^-4,-4+2*K.1-2*K.1^2+2*K.1^4,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,2+2*K.1-2*K.1^2+2*K.1^4,2-2*K.1+2*K.1^2+2*K.1^-4,2-2*K.1^4-2*K.1^-4,1,1,2+K.1-K.1^2-K.1^-4,2+K.1^4+K.1^-4,2-K.1+K.1^2-K.1^4,1-2*K.1+2*K.1^2-K.1^4+K.1^-4,1+K.1-K.1^2-K.1^4-2*K.1^-4,1+K.1-K.1^2+2*K.1^4+K.1^-4,-1+K.1-K.1^2-K.1^-4,-1+K.1^4+K.1^-4,-1-K.1+K.1^2-K.1^4,-2-K.1+K.1^2+K.1^4+2*K.1^-4,-2-K.1+K.1^2-2*K.1^4-K.1^-4,-2+2*K.1-2*K.1^2+K.1^4-K.1^-4,-1+K.1^4+K.1^-4,-1-K.1+K.1^2-K.1^4,-1+K.1-K.1^2-K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1^-3,K.1^3,0,0,K.1^-2+K.1^-1,K.1+K.1^2,-1*K.1-K.1^4+K.1^-4,K.1^2+K.1^4,K.1+K.1^-4,-1*K.1^2+K.1^4-K.1^-4,K.1^2+K.1^4,-1*K.1-K.1^4+K.1^-4,-1*K.1^2+K.1^4-K.1^-4,K.1+K.1^-4,K.1^-2+K.1^-1,K.1+K.1^2,0,0,0,K.1^2-K.1^4+K.1^-4,-1*K.1-K.1^-4,-1*K.1^2-K.1^4,K.1+K.1^4-K.1^-4,-1*K.1-K.1^2,-1*K.1^-2-K.1^-1]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |32,-8,0,0,0,0,-4,-4,-4,5,2*K.1^-3,2*K.1^3,0,0,4,1,-2,0,0,0,0,0,-2*K.1^-3,-2*K.1^3,0,0,0,0,8,-4+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-4-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-4+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-7-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-7+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-7-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-4,2+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,2-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-4+6*K.1^4+6*K.1^-4,-4+6*K.1-6*K.1^2-6*K.1^-4,-4-6*K.1+6*K.1^2-6*K.1^4,2-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,2+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,11,-7,-4+K.1-K.1^2+2*K.1^4+K.1^-4,-4+K.1-K.1^2-K.1^4-2*K.1^-4,-4-2*K.1+2*K.1^2-K.1^4+K.1^-4,-1+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-1-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-1-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,5+K.1-K.1^2+2*K.1^4+K.1^-4,5+K.1-K.1^2-K.1^4-2*K.1^-4,5-2*K.1+2*K.1^2-K.1^4+K.1^-4,2+3*K.1-3*K.1^2+3*K.1^4,2-3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^-4,-1+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,-1+K.1-K.1^2-4*K.1^4-5*K.1^-4,-1-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,2+3*K.1^4+3*K.1^-4,2+3*K.1-3*K.1^2-3*K.1^-4,2-3*K.1+3*K.1^2-3*K.1^4,2-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,2-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,2+6*K.1^4+6*K.1^-4,2+6*K.1-6*K.1^2-6*K.1^-4,2-6*K.1+6*K.1^2-6*K.1^4,5,-1,2,-4,-7,-1+3*K.1-3*K.1^2-3*K.1^-4,-1-3*K.1+3*K.1^2-3*K.1^4,-1+3*K.1^4+3*K.1^-4,-1+K.1-K.1^2+2*K.1^4+K.1^-4,-1+K.1-K.1^2-K.1^4-2*K.1^-4,-1-2*K.1+2*K.1^2-K.1^4+K.1^-4,-1,-1,-1,2-3*K.1+3*K.1^2+3*K.1^-4,2+3*K.1-3*K.1^2+3*K.1^4,2-3*K.1^4-3*K.1^-4,-1*K.1^-3,-1*K.1^3,2*K.1^-3,2*K.1^3,-1*K.1^3,-1*K.1^-3,0,-4*K.1-4*K.1^-1,-4*K.1^4-4*K.1^-4,-4*K.1^2-4*K.1^-2,1-3*K.1+3*K.1^2+3*K.1^-4,1-3*K.1^4-3*K.1^-4,1+3*K.1-3*K.1^2+3*K.1^4,2-2*K.1^4-2*K.1^-4,2+2*K.1-2*K.1^2+2*K.1^4,2-2*K.1+2*K.1^2+2*K.1^-4,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,-4-2*K.1^4-2*K.1^-4,-4+2*K.1-2*K.1^2+2*K.1^4,-4-2*K.1+2*K.1^2+2*K.1^-4,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,2-2*K.1+2*K.1^2+2*K.1^-4,2-2*K.1^4-2*K.1^-4,2+2*K.1-2*K.1^2+2*K.1^4,1,1,2+K.1^4+K.1^-4,2-K.1+K.1^2-K.1^4,2+K.1-K.1^2-K.1^-4,1+K.1-K.1^2-K.1^4-2*K.1^-4,1+K.1-K.1^2+2*K.1^4+K.1^-4,1-2*K.1+2*K.1^2-K.1^4+K.1^-4,-1+K.1^4+K.1^-4,-1-K.1+K.1^2-K.1^4,-1+K.1-K.1^2-K.1^-4,-2-K.1+K.1^2-2*K.1^4-K.1^-4,-2+2*K.1-2*K.1^2+K.1^4-K.1^-4,-2-K.1+K.1^2+K.1^4+2*K.1^-4,-1-K.1+K.1^2-K.1^4,-1+K.1-K.1^2-K.1^-4,-1+K.1^4+K.1^-4,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1^3,K.1^-3,0,0,-1*K.1^2+K.1^4-K.1^-4,K.1+K.1^-4,K.1^-2+K.1^-1,K.1+K.1^2,-1*K.1-K.1^4+K.1^-4,K.1^2+K.1^4,K.1+K.1^2,K.1^-2+K.1^-1,K.1^2+K.1^4,-1*K.1-K.1^4+K.1^-4,-1*K.1^2+K.1^4-K.1^-4,K.1+K.1^-4,0,0,0,-1*K.1^2-K.1^4,K.1+K.1^4-K.1^-4,-1*K.1-K.1^2,-1*K.1^-2-K.1^-1,-1*K.1-K.1^-4,K.1^2-K.1^4+K.1^-4]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |32,-8,0,0,0,0,-4,-4,-4,5,2*K.1^3,2*K.1^-3,0,0,4,1,-2,0,0,0,0,0,-2*K.1^3,-2*K.1^-3,0,0,0,0,8,-4+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-4-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-4+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-7-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-7+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-7-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-4,2+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,2-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-4+6*K.1^4+6*K.1^-4,-4+6*K.1-6*K.1^2-6*K.1^-4,-4-6*K.1+6*K.1^2-6*K.1^4,2-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,2+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,11,-7,-4+K.1-K.1^2+2*K.1^4+K.1^-4,-4+K.1-K.1^2-K.1^4-2*K.1^-4,-4-2*K.1+2*K.1^2-K.1^4+K.1^-4,-1+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-1-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-1-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,5+K.1-K.1^2+2*K.1^4+K.1^-4,5+K.1-K.1^2-K.1^4-2*K.1^-4,5-2*K.1+2*K.1^2-K.1^4+K.1^-4,2+3*K.1-3*K.1^2+3*K.1^4,2-3*K.1^4-3*K.1^-4,2-3*K.1+3*K.1^2+3*K.1^-4,-1+4*K.1-4*K.1^2+5*K.1^4+K.1^-4,-1+K.1-K.1^2-4*K.1^4-5*K.1^-4,-1-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,2+3*K.1^4+3*K.1^-4,2+3*K.1-3*K.1^2-3*K.1^-4,2-3*K.1+3*K.1^2-3*K.1^4,2-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,2-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,2+6*K.1^4+6*K.1^-4,2+6*K.1-6*K.1^2-6*K.1^-4,2-6*K.1+6*K.1^2-6*K.1^4,5,-1,2,-4,-7,-1+3*K.1-3*K.1^2-3*K.1^-4,-1-3*K.1+3*K.1^2-3*K.1^4,-1+3*K.1^4+3*K.1^-4,-1+K.1-K.1^2+2*K.1^4+K.1^-4,-1+K.1-K.1^2-K.1^4-2*K.1^-4,-1-2*K.1+2*K.1^2-K.1^4+K.1^-4,-1,-1,-1,2-3*K.1+3*K.1^2+3*K.1^-4,2+3*K.1-3*K.1^2+3*K.1^4,2-3*K.1^4-3*K.1^-4,-1*K.1^3,-1*K.1^-3,2*K.1^3,2*K.1^-3,-1*K.1^-3,-1*K.1^3,0,-4*K.1-4*K.1^-1,-4*K.1^4-4*K.1^-4,-4*K.1^2-4*K.1^-2,1-3*K.1+3*K.1^2+3*K.1^-4,1-3*K.1^4-3*K.1^-4,1+3*K.1-3*K.1^2+3*K.1^4,2-2*K.1^4-2*K.1^-4,2+2*K.1-2*K.1^2+2*K.1^4,2-2*K.1+2*K.1^2+2*K.1^-4,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,-4-2*K.1^4-2*K.1^-4,-4+2*K.1-2*K.1^2+2*K.1^4,-4-2*K.1+2*K.1^2+2*K.1^-4,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,2-2*K.1+2*K.1^2+2*K.1^-4,2-2*K.1^4-2*K.1^-4,2+2*K.1-2*K.1^2+2*K.1^4,1,1,2+K.1^4+K.1^-4,2-K.1+K.1^2-K.1^4,2+K.1-K.1^2-K.1^-4,1+K.1-K.1^2-K.1^4-2*K.1^-4,1+K.1-K.1^2+2*K.1^4+K.1^-4,1-2*K.1+2*K.1^2-K.1^4+K.1^-4,-1+K.1^4+K.1^-4,-1-K.1+K.1^2-K.1^4,-1+K.1-K.1^2-K.1^-4,-2-K.1+K.1^2-2*K.1^4-K.1^-4,-2+2*K.1-2*K.1^2+K.1^4-K.1^-4,-2-K.1+K.1^2+K.1^4+2*K.1^-4,-1-K.1+K.1^2-K.1^4,-1+K.1-K.1^2-K.1^-4,-1+K.1^4+K.1^-4,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,K.1^-3,K.1^3,0,0,K.1+K.1^-4,-1*K.1^2+K.1^4-K.1^-4,K.1+K.1^2,K.1^-2+K.1^-1,K.1^2+K.1^4,-1*K.1-K.1^4+K.1^-4,K.1^-2+K.1^-1,K.1+K.1^2,-1*K.1-K.1^4+K.1^-4,K.1^2+K.1^4,K.1+K.1^-4,-1*K.1^2+K.1^4-K.1^-4,0,0,0,K.1+K.1^4-K.1^-4,-1*K.1^2-K.1^4,-1*K.1^-2-K.1^-1,-1*K.1-K.1^2,K.1^2-K.1^4+K.1^-4,-1*K.1-K.1^-4]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; x := CR!\[48, 0, 0, 12, 0, 0, -24, 3, 12, -6, 0, 0, 0, 0, 0, 0, 0, 0, 0, -6, 3, 0, 0, 0, 0, 0, 0, 0, 0, 24, 24, 24, -6, -6, -6, 18, -12, -12, -12, 0, 0, 0, 3, 3, 3, -6, -6, 6, 6, 6, -6, -6, -6, 6, 6, 6, 12, 12, 12, -12, -12, -12, 0, 0, 0, 6, 6, 6, 9, 9, 9, -9, 0, 3, -9, 3, 0, 0, 0, -3, -3, -3, 3, 3, 3, -6, -6, -6, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 6, 6, 6, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, -3, -3, -3, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0]; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; x := CR!\[48, 0, 0, -4, 0, 0, 48, 48, 48, 48, 0, 0, 0, 0, 0, 0, 0, 0, 0, -4, -4, 0, 0, 0, 0, 0, 0, 0, -24, 12, 12, 12, -6, -6, -6, 3, 12, 12, 12, -24, -24, -24, -6, -6, -6, -6, -6, 12, 12, 12, -6, -6, -6, 12, 12, 12, -6, -6, -6, 12, 12, 12, -24, -24, -24, 12, 12, 12, 3, 3, 3, 3, -24, -6, 3, -6, 3, 3, 3, 12, 12, 12, -6, -6, -6, -6, -6, -6, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, -1, -1, -1, 0, 0, 0, 0, 0, 0, 2, 2, 2, 2, 2, 2, -1, -1, -1, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0]; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; x := CR!\[48, 0, -8, 0, 0, 0, 48, 48, 48, 48, 0, 0, 0, 0, 0, 0, 0, -8, -8, 0, 0, 0, 0, 0, 0, 0, 0, 0, 12, -6, -6, -6, -6, -6, -6, 12, -6, -6, -6, 12, 12, 12, -6, -6, -6, -6, -6, -6, -6, -6, -6, -6, -6, -6, -6, -6, -6, -6, -6, -6, -6, -6, 12, 12, 12, -6, -6, -6, 12, 12, 12, 12, 12, -6, 12, -6, 12, 12, 12, -6, -6, -6, -6, -6, -6, -6, -6, -6, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, -2, -2, -2, 4, 4, 4, 0, 0, 0, 4, 4, 4, -2, -2, -2, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0]; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |48,24,8,0,0,0,12,12,-6,-6,0,0,0,0,0,6,-6,2,-4,0,0,0,0,0,0,0,0,0,24,6+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,6+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,6-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,3-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,-12,9+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,9+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,9-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,3*K.1+3*K.1^-1,3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,3,-6,-3+5*K.1-5*K.1^2+7*K.1^4+2*K.1^-4,-3+2*K.1-2*K.1^2-5*K.1^4-7*K.1^-4,-3-7*K.1+7*K.1^2-2*K.1^4+5*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-3-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-3+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-3+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,0,0,0,-6-K.1+K.1^2-2*K.1^4-K.1^-4,-6-K.1+K.1^2+K.1^4+2*K.1^-4,-6+2*K.1-2*K.1^2+K.1^4-K.1^-4,-6+3*K.1-3*K.1^2+3*K.1^4,-6-3*K.1^4-3*K.1^-4,-6-3*K.1+3*K.1^2+3*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-3,6,-6,-3,3,3+6*K.1-6*K.1^2-6*K.1^-4,3-6*K.1+6*K.1^2-6*K.1^4,3+6*K.1^4+6*K.1^-4,3+2*K.1-2*K.1^2+K.1^4-K.1^-4,3-K.1+K.1^2-2*K.1^4-K.1^-4,3-K.1+K.1^2+K.1^4+2*K.1^-4,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,3*K.1+3*K.1^-1,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,0,0,0,0,0,0,0,8+2*K.1^4+2*K.1^-4,8-2*K.1+2*K.1^2-2*K.1^4,8+2*K.1-2*K.1^2-2*K.1^-4,3+6*K.1-6*K.1^2-6*K.1^-4,3+6*K.1^4+6*K.1^-4,3-6*K.1+6*K.1^2-6*K.1^4,1-6*K.1+6*K.1^2-2*K.1^4+4*K.1^-4,1+2*K.1-2*K.1^2-4*K.1^4-6*K.1^-4,1+4*K.1-4*K.1^2+6*K.1^4+2*K.1^-4,-4+3*K.1-3*K.1^2+2*K.1^4-K.1^-4,-4-2*K.1+2*K.1^2+K.1^4+3*K.1^-4,-4-K.1+K.1^2-3*K.1^4-2*K.1^-4,1-2*K.1^4-2*K.1^-4,1+2*K.1-2*K.1^2+2*K.1^4,1-2*K.1+2*K.1^2+2*K.1^-4,-4-3*K.1+3*K.1^2-K.1^4+2*K.1^-4,-4+K.1-K.1^2-2*K.1^4-3*K.1^-4,-4+2*K.1-2*K.1^2+3*K.1^4+K.1^-4,-2-2*K.1+2*K.1^2+2*K.1^-4,-2-2*K.1^4-2*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,3,-6,1-3*K.1+3*K.1^2-2*K.1^4+K.1^-4,1+2*K.1-2*K.1^2-K.1^4-3*K.1^-4,1+K.1-K.1^2+3*K.1^4+2*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,1-2*K.1^4-2*K.1^-4,1+2*K.1-2*K.1^2+2*K.1^4,1-2*K.1+2*K.1^2+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-2+2*K.1-2*K.1^2-K.1^4-3*K.1^-4,-2+K.1-K.1^2+3*K.1^4+2*K.1^-4,-2-3*K.1+3*K.1^2-2*K.1^4+K.1^-4,2-K.1+K.1^2+K.1^-4,2-K.1^4-K.1^-4,2+K.1-K.1^2+K.1^4,-2-2*K.1+2*K.1^2-2*K.1^4,-2+2*K.1-2*K.1^2-2*K.1^-4,-2+2*K.1^4+2*K.1^-4,-2*K.1^4-2*K.1^-4,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,0,0,0,K.1^4+K.1^-4,K.1^2+K.1^-2,K.1+K.1^-1,1-2*K.1+2*K.1^2-2*K.1^4,1+2*K.1-2*K.1^2-2*K.1^-4,1+2*K.1^4+2*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K 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x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K 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x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K 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x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |48,24,8,0,0,0,30,-24,12,-6,0,0,0,0,12,-12,0,-4,2,0,0,0,0,0,0,0,0,0,18,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-6+9*K.1^4+9*K.1^-4,-6+9*K.1-9*K.1^2-9*K.1^-4,-6-9*K.1+9*K.1^2-9*K.1^4,0,3*K.1+3*K.1^-1,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,9,9,9,3+9*K.1-9*K.1^2-9*K.1^-4,3-9*K.1+9*K.1^2-9*K.1^4,3+9*K.1^4+9*K.1^-4,-6,-6,3*K.1+3*K.1^-1,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,-6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,3*K.1+3*K.1^-1,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,-6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,0,0,0,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,0,0,0,0,-9,3,0,3,0,0,0,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,3*K.1+3*K.1^-1,3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,0,0,0,0,0,0,0,4+2*K.1-2*K.1^2+2*K.1^4,4-2*K.1+2*K.1^2+2*K.1^-4,4-2*K.1^4-2*K.1^-4,3*K.1^2+3*K.1^-2,3*K.1+3*K.1^-1,3*K.1^4+3*K.1^-4,-4+5*K.1^4+5*K.1^-4,-4-5*K.1+5*K.1^2-5*K.1^4,-4+5*K.1-5*K.1^2-5*K.1^-4,1+2*K.1-2*K.1^2+2*K.1^4,1-2*K.1+2*K.1^2+2*K.1^-4,1-2*K.1^4-2*K.1^-4,-4-K.1^4-K.1^-4,-4+K.1-K.1^2+K.1^4,-4-K.1+K.1^2+K.1^-4,1+2*K.1-2*K.1^2+2*K.1^4,1-2*K.1+2*K.1^2+2*K.1^-4,1-2*K.1^4-2*K.1^-4,-4-4*K.1+4*K.1^2+4*K.1^-4,-4-4*K.1^4-4*K.1^-4,-4+4*K.1-4*K.1^2+4*K.1^4,0,0,2-K.1^4-K.1^-4,2+K.1-K.1^2+K.1^4,2-K.1+K.1^2+K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,2+5*K.1^4+5*K.1^-4,2-5*K.1+5*K.1^2-5*K.1^4,2+5*K.1-5*K.1^2-5*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,2+4*K.1-4*K.1^2+4*K.1^4,2-4*K.1+4*K.1^2+4*K.1^-4,2-4*K.1^4-4*K.1^-4,-2-2*K.1^4-2*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,-2-2*K.1+2*K.1^2+2*K.1^-4,-2*K.1^4-2*K.1^-4,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-2-2*K.1+2*K.1^2-2*K.1^4,-2+2*K.1-2*K.1^2-2*K.1^-4,-2+2*K.1^4+2*K.1^-4,0,0,0,1-2*K.1+2*K.1^2-2*K.1^4,1+2*K.1-2*K.1^2-2*K.1^-4,1+2*K.1^4+2*K.1^-4,K.1^4+K.1^-4,K.1^2+K.1^-2,K.1+K.1^-1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |48,24,8,0,0,0,30,-24,12,-6,0,0,0,0,12,-12,0,-4,2,0,0,0,0,0,0,0,0,0,18,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-6+9*K.1-9*K.1^2-9*K.1^-4,-6-9*K.1+9*K.1^2-9*K.1^4,-6+9*K.1^4+9*K.1^-4,0,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,3*K.1+3*K.1^-1,9,9,9,3-9*K.1+9*K.1^2-9*K.1^4,3+9*K.1^4+9*K.1^-4,3+9*K.1-9*K.1^2-9*K.1^-4,-6,-6,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,3*K.1+3*K.1^-1,-6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,3*K.1+3*K.1^-1,-6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,0,0,0,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,0,0,0,0,-9,3,0,3,0,0,0,3*K.1^4+3*K.1^-4,3*K.1+3*K.1^-1,3*K.1^2+3*K.1^-2,3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,0,0,0,0,0,0,0,4-2*K.1^4-2*K.1^-4,4+2*K.1-2*K.1^2+2*K.1^4,4-2*K.1+2*K.1^2+2*K.1^-4,3*K.1^4+3*K.1^-4,3*K.1^2+3*K.1^-2,3*K.1+3*K.1^-1,-4+5*K.1-5*K.1^2-5*K.1^-4,-4+5*K.1^4+5*K.1^-4,-4-5*K.1+5*K.1^2-5*K.1^4,1-2*K.1^4-2*K.1^-4,1+2*K.1-2*K.1^2+2*K.1^4,1-2*K.1+2*K.1^2+2*K.1^-4,-4-K.1+K.1^2+K.1^-4,-4-K.1^4-K.1^-4,-4+K.1-K.1^2+K.1^4,1-2*K.1^4-2*K.1^-4,1+2*K.1-2*K.1^2+2*K.1^4,1-2*K.1+2*K.1^2+2*K.1^-4,-4+4*K.1-4*K.1^2+4*K.1^4,-4-4*K.1+4*K.1^2+4*K.1^-4,-4-4*K.1^4-4*K.1^-4,0,0,2-K.1+K.1^2+K.1^-4,2-K.1^4-K.1^-4,2+K.1-K.1^2+K.1^4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,2+5*K.1-5*K.1^2-5*K.1^-4,2+5*K.1^4+5*K.1^-4,2-5*K.1+5*K.1^2-5*K.1^4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,2-4*K.1^4-4*K.1^-4,2+4*K.1-4*K.1^2+4*K.1^4,2-4*K.1+4*K.1^2+4*K.1^-4,-2-2*K.1+2*K.1^2+2*K.1^-4,-2-2*K.1^4-2*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,-2*K.1-2*K.1^-1,-2*K.1^4-2*K.1^-4,-2*K.1^2-2*K.1^-2,-2+2*K.1^4+2*K.1^-4,-2-2*K.1+2*K.1^2-2*K.1^4,-2+2*K.1-2*K.1^2-2*K.1^-4,0,0,0,1+2*K.1^4+2*K.1^-4,1-2*K.1+2*K.1^2-2*K.1^4,1+2*K.1-2*K.1^2-2*K.1^-4,K.1+K.1^-1,K.1^4+K.1^-4,K.1^2+K.1^-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |48,0,0,-4,0,0,-24,3,12,-6,0,0,0,0,0,0,0,0,0,2,-1,0,0,0,0,0,0,0,0,24,24,24,-6,-6,-6,18,-12,-12,-12,0,0,0,3,3,3,-6,-6,6,6,6,-6,-6,-6,6,6,6,12,12,12,-12,-12,-12,0,0,0,6,6,6,9,9,9,-9,0,3,-9,3,0,0,0,-3,-3,-3,3,3,3,-6,-6,-6,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-2+2*K.1^4+2*K.1^-4,-2-2*K.1+2*K.1^2-2*K.1^4,-2+2*K.1-2*K.1^2-2*K.1^-4,0,0,0,0,0,0,4*K.1^2+4*K.1^-2,4*K.1+4*K.1^-1,4*K.1^4+4*K.1^-4,-2*K.1^4-2*K.1^-4,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,1+2*K.1-2*K.1^2-2*K.1^-4,1+2*K.1^4+2*K.1^-4,1-2*K.1+2*K.1^2-2*K.1^4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |48,0,0,-4,0,0,-24,3,12,-6,0,0,0,0,0,0,0,0,0,2,-1,0,0,0,0,0,0,0,0,24,24,24,-6,-6,-6,18,-12,-12,-12,0,0,0,3,3,3,-6,-6,6,6,6,-6,-6,-6,6,6,6,12,12,12,-12,-12,-12,0,0,0,6,6,6,9,9,9,-9,0,3,-9,3,0,0,0,-3,-3,-3,3,3,3,-6,-6,-6,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-2-2*K.1+2*K.1^2-2*K.1^4,-2+2*K.1-2*K.1^2-2*K.1^-4,-2+2*K.1^4+2*K.1^-4,0,0,0,0,0,0,4*K.1+4*K.1^-1,4*K.1^4+4*K.1^-4,4*K.1^2+4*K.1^-2,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1^4-2*K.1^-4,1+2*K.1^4+2*K.1^-4,1-2*K.1+2*K.1^2-2*K.1^4,1+2*K.1-2*K.1^2-2*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |48,0,0,-4,0,0,-24,3,12,-6,0,0,0,0,0,0,0,0,0,2,-1,0,0,0,0,0,0,0,0,24,24,24,-6,-6,-6,18,-12,-12,-12,0,0,0,3,3,3,-6,-6,6,6,6,-6,-6,-6,6,6,6,12,12,12,-12,-12,-12,0,0,0,6,6,6,9,9,9,-9,0,3,-9,3,0,0,0,-3,-3,-3,3,3,3,-6,-6,-6,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-2+2*K.1-2*K.1^2-2*K.1^-4,-2+2*K.1^4+2*K.1^-4,-2-2*K.1+2*K.1^2-2*K.1^4,0,0,0,0,0,0,4*K.1^4+4*K.1^-4,4*K.1^2+4*K.1^-2,4*K.1+4*K.1^-1,-2*K.1-2*K.1^-1,-2*K.1^4-2*K.1^-4,-2*K.1^2-2*K.1^-2,1-2*K.1+2*K.1^2-2*K.1^4,1+2*K.1-2*K.1^2-2*K.1^-4,1+2*K.1^4+2*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |48,-24,8,0,0,0,12,12,-6,-6,0,0,0,0,0,-6,6,2,-4,0,0,0,0,0,0,0,0,0,24,6+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,6+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,6-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,3-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,-12,9+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,9+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,9-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,3*K.1+3*K.1^-1,3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,3,-6,-3+5*K.1-5*K.1^2+7*K.1^4+2*K.1^-4,-3+2*K.1-2*K.1^2-5*K.1^4-7*K.1^-4,-3-7*K.1+7*K.1^2-2*K.1^4+5*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-3-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-3+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-3+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,0,0,0,-6-K.1+K.1^2-2*K.1^4-K.1^-4,-6-K.1+K.1^2+K.1^4+2*K.1^-4,-6+2*K.1-2*K.1^2+K.1^4-K.1^-4,-6+3*K.1-3*K.1^2+3*K.1^4,-6-3*K.1^4-3*K.1^-4,-6-3*K.1+3*K.1^2+3*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-3,6,-6,-3,3,3+6*K.1-6*K.1^2-6*K.1^-4,3-6*K.1+6*K.1^2-6*K.1^4,3+6*K.1^4+6*K.1^-4,3+2*K.1-2*K.1^2+K.1^4-K.1^-4,3-K.1+K.1^2-2*K.1^4-K.1^-4,3-K.1+K.1^2+K.1^4+2*K.1^-4,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,3*K.1+3*K.1^-1,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,0,0,0,0,0,0,0,-8-2*K.1^4-2*K.1^-4,-8+2*K.1-2*K.1^2+2*K.1^4,-8-2*K.1+2*K.1^2+2*K.1^-4,-3-6*K.1+6*K.1^2+6*K.1^-4,-3-6*K.1^4-6*K.1^-4,-3+6*K.1-6*K.1^2+6*K.1^4,-1+6*K.1-6*K.1^2+2*K.1^4-4*K.1^-4,-1-2*K.1+2*K.1^2+4*K.1^4+6*K.1^-4,-1-4*K.1+4*K.1^2-6*K.1^4-2*K.1^-4,4-3*K.1+3*K.1^2-2*K.1^4+K.1^-4,4+2*K.1-2*K.1^2-K.1^4-3*K.1^-4,4+K.1-K.1^2+3*K.1^4+2*K.1^-4,-1+2*K.1^4+2*K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,-1+2*K.1-2*K.1^2-2*K.1^-4,4+3*K.1-3*K.1^2+K.1^4-2*K.1^-4,4-K.1+K.1^2+2*K.1^4+3*K.1^-4,4-2*K.1+2*K.1^2-3*K.1^4-K.1^-4,2+2*K.1-2*K.1^2-2*K.1^-4,2+2*K.1^4+2*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,-3,6,-1+3*K.1-3*K.1^2+2*K.1^4-K.1^-4,-1-2*K.1+2*K.1^2+K.1^4+3*K.1^-4,-1-K.1+K.1^2-3*K.1^4-2*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-1+2*K.1^4+2*K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,-1+2*K.1-2*K.1^2-2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,2-2*K.1+2*K.1^2+K.1^4+3*K.1^-4,2-K.1+K.1^2-3*K.1^4-2*K.1^-4,2+3*K.1-3*K.1^2+2*K.1^4-K.1^-4,-2+K.1-K.1^2-K.1^-4,-2+K.1^4+K.1^-4,-2-K.1+K.1^2-K.1^4,-2-2*K.1+2*K.1^2-2*K.1^4,-2+2*K.1-2*K.1^2-2*K.1^-4,-2+2*K.1^4+2*K.1^-4,-2*K.1^4-2*K.1^-4,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,0,0,0,K.1^4+K.1^-4,K.1^2+K.1^-2,K.1+K.1^-1,1-2*K.1+2*K.1^2-2*K.1^4,1+2*K.1-2*K.1^2-2*K.1^-4,1+2*K.1^4+2*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |48,-24,8,0,0,0,12,12,-6,-6,0,0,0,0,0,-6,6,2,-4,0,0,0,0,0,0,0,0,0,24,6-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,6+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,6+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,3+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,3-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,-12,9-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,9+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,9+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,3*K.1+3*K.1^-1,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,3,-6,-3-7*K.1+7*K.1^2-2*K.1^4+5*K.1^-4,-3+5*K.1-5*K.1^2+7*K.1^4+2*K.1^-4,-3+2*K.1-2*K.1^2-5*K.1^4-7*K.1^-4,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-3+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-3-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-3+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,0,0,0,-6+2*K.1-2*K.1^2+K.1^4-K.1^-4,-6-K.1+K.1^2-2*K.1^4-K.1^-4,-6-K.1+K.1^2+K.1^4+2*K.1^-4,-6-3*K.1+3*K.1^2+3*K.1^-4,-6+3*K.1-3*K.1^2+3*K.1^4,-6-3*K.1^4-3*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-3,6,-6,-3,3,3+6*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2-6*K.1^-4,3-6*K.1+6*K.1^2-6*K.1^4,3-K.1+K.1^2+K.1^4+2*K.1^-4,3+2*K.1-2*K.1^2+K.1^4-K.1^-4,3-K.1+K.1^2-2*K.1^4-K.1^-4,3*K.1+3*K.1^-1,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,0,0,0,0,0,0,0,-8+2*K.1-2*K.1^2+2*K.1^4,-8-2*K.1+2*K.1^2+2*K.1^-4,-8-2*K.1^4-2*K.1^-4,-3-6*K.1^4-6*K.1^-4,-3+6*K.1-6*K.1^2+6*K.1^4,-3-6*K.1+6*K.1^2+6*K.1^-4,-1-2*K.1+2*K.1^2+4*K.1^4+6*K.1^-4,-1-4*K.1+4*K.1^2-6*K.1^4-2*K.1^-4,-1+6*K.1-6*K.1^2+2*K.1^4-4*K.1^-4,4+2*K.1-2*K.1^2-K.1^4-3*K.1^-4,4+K.1-K.1^2+3*K.1^4+2*K.1^-4,4-3*K.1+3*K.1^2-2*K.1^4+K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,-1+2*K.1-2*K.1^2-2*K.1^-4,-1+2*K.1^4+2*K.1^-4,4-K.1+K.1^2+2*K.1^4+3*K.1^-4,4-2*K.1+2*K.1^2-3*K.1^4-K.1^-4,4+3*K.1-3*K.1^2+K.1^4-2*K.1^-4,2+2*K.1^4+2*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,2+2*K.1-2*K.1^2-2*K.1^-4,-3,6,-1-2*K.1+2*K.1^2+K.1^4+3*K.1^-4,-1-K.1+K.1^2-3*K.1^4-2*K.1^-4,-1+3*K.1-3*K.1^2+2*K.1^4-K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,-1+2*K.1-2*K.1^2-2*K.1^-4,-1+2*K.1^4+2*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,2-K.1+K.1^2-3*K.1^4-2*K.1^-4,2+3*K.1-3*K.1^2+2*K.1^4-K.1^-4,2-2*K.1+2*K.1^2+K.1^4+3*K.1^-4,-2+K.1^4+K.1^-4,-2-K.1+K.1^2-K.1^4,-2+K.1-K.1^2-K.1^-4,-2+2*K.1-2*K.1^2-2*K.1^-4,-2+2*K.1^4+2*K.1^-4,-2-2*K.1+2*K.1^2-2*K.1^4,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1^4-2*K.1^-4,0,0,0,K.1^2+K.1^-2,K.1+K.1^-1,K.1^4+K.1^-4,1+2*K.1-2*K.1^2-2*K.1^-4,1+2*K.1^4+2*K.1^-4,1-2*K.1+2*K.1^2-2*K.1^4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |48,-24,8,0,0,0,12,12,-6,-6,0,0,0,0,0,-6,6,2,-4,0,0,0,0,0,0,0,0,0,24,6+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,6-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,6+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,3+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,3-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,-12,9+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,9-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,9+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,3*K.1^4+3*K.1^-4,3*K.1+3*K.1^-1,3*K.1^2+3*K.1^-2,3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,3,-6,-3+2*K.1-2*K.1^2-5*K.1^4-7*K.1^-4,-3-7*K.1+7*K.1^2-2*K.1^4+5*K.1^-4,-3+5*K.1-5*K.1^2+7*K.1^4+2*K.1^-4,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-3+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-3+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-3-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,0,0,0,-6-K.1+K.1^2+K.1^4+2*K.1^-4,-6+2*K.1-2*K.1^2+K.1^4-K.1^-4,-6-K.1+K.1^2-2*K.1^4-K.1^-4,-6-3*K.1^4-3*K.1^-4,-6-3*K.1+3*K.1^2+3*K.1^-4,-6+3*K.1-3*K.1^2+3*K.1^4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-3,6,-6,-3,3,3-6*K.1+6*K.1^2-6*K.1^4,3+6*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2-6*K.1^-4,3-K.1+K.1^2-2*K.1^4-K.1^-4,3-K.1+K.1^2+K.1^4+2*K.1^-4,3+2*K.1-2*K.1^2+K.1^4-K.1^-4,3*K.1^4+3*K.1^-4,3*K.1+3*K.1^-1,3*K.1^2+3*K.1^-2,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,0,0,0,0,0,0,0,-8-2*K.1+2*K.1^2+2*K.1^-4,-8-2*K.1^4-2*K.1^-4,-8+2*K.1-2*K.1^2+2*K.1^4,-3+6*K.1-6*K.1^2+6*K.1^4,-3-6*K.1+6*K.1^2+6*K.1^-4,-3-6*K.1^4-6*K.1^-4,-1-4*K.1+4*K.1^2-6*K.1^4-2*K.1^-4,-1+6*K.1-6*K.1^2+2*K.1^4-4*K.1^-4,-1-2*K.1+2*K.1^2+4*K.1^4+6*K.1^-4,4+K.1-K.1^2+3*K.1^4+2*K.1^-4,4-3*K.1+3*K.1^2-2*K.1^4+K.1^-4,4+2*K.1-2*K.1^2-K.1^4-3*K.1^-4,-1+2*K.1-2*K.1^2-2*K.1^-4,-1+2*K.1^4+2*K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,4-2*K.1+2*K.1^2-3*K.1^4-K.1^-4,4+3*K.1-3*K.1^2+K.1^4-2*K.1^-4,4-K.1+K.1^2+2*K.1^4+3*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,2+2*K.1-2*K.1^2-2*K.1^-4,2+2*K.1^4+2*K.1^-4,-3,6,-1-K.1+K.1^2-3*K.1^4-2*K.1^-4,-1+3*K.1-3*K.1^2+2*K.1^4-K.1^-4,-1-2*K.1+2*K.1^2+K.1^4+3*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-1+2*K.1-2*K.1^2-2*K.1^-4,-1+2*K.1^4+2*K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,2+3*K.1-3*K.1^2+2*K.1^4-K.1^-4,2-2*K.1+2*K.1^2+K.1^4+3*K.1^-4,2-K.1+K.1^2-3*K.1^4-2*K.1^-4,-2-K.1+K.1^2-K.1^4,-2+K.1-K.1^2-K.1^-4,-2+K.1^4+K.1^-4,-2+2*K.1^4+2*K.1^-4,-2-2*K.1+2*K.1^2-2*K.1^4,-2+2*K.1-2*K.1^2-2*K.1^-4,-2*K.1-2*K.1^-1,-2*K.1^4-2*K.1^-4,-2*K.1^2-2*K.1^-2,0,0,0,K.1+K.1^-1,K.1^4+K.1^-4,K.1^2+K.1^-2,1+2*K.1^4+2*K.1^-4,1-2*K.1+2*K.1^2-2*K.1^4,1+2*K.1-2*K.1^2-2*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |48,-24,8,0,0,0,30,-24,12,-6,0,0,0,0,-12,12,0,-4,2,0,0,0,0,0,0,0,0,0,18,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-6-9*K.1+9*K.1^2-9*K.1^4,-6+9*K.1^4+9*K.1^-4,-6+9*K.1-9*K.1^2-9*K.1^-4,0,3*K.1^4+3*K.1^-4,3*K.1+3*K.1^-1,3*K.1^2+3*K.1^-2,9,9,9,3+9*K.1^4+9*K.1^-4,3+9*K.1-9*K.1^2-9*K.1^-4,3-9*K.1+9*K.1^2-9*K.1^4,-6,-6,3*K.1^4+3*K.1^-4,3*K.1+3*K.1^-1,3*K.1^2+3*K.1^-2,-6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,3*K.1^4+3*K.1^-4,3*K.1+3*K.1^-1,3*K.1^2+3*K.1^-2,-6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,0,0,0,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,0,0,0,0,-9,3,0,3,0,0,0,3*K.1+3*K.1^-1,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,0,0,0,0,0,0,0,-4+2*K.1-2*K.1^2-2*K.1^-4,-4+2*K.1^4+2*K.1^-4,-4-2*K.1+2*K.1^2-2*K.1^4,-3*K.1-3*K.1^-1,-3*K.1^4-3*K.1^-4,-3*K.1^2-3*K.1^-2,4+5*K.1-5*K.1^2+5*K.1^4,4-5*K.1+5*K.1^2+5*K.1^-4,4-5*K.1^4-5*K.1^-4,-1+2*K.1-2*K.1^2-2*K.1^-4,-1+2*K.1^4+2*K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,4-K.1+K.1^2-K.1^4,4+K.1-K.1^2-K.1^-4,4+K.1^4+K.1^-4,-1+2*K.1-2*K.1^2-2*K.1^-4,-1+2*K.1^4+2*K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,4+4*K.1^4+4*K.1^-4,4-4*K.1+4*K.1^2-4*K.1^4,4+4*K.1-4*K.1^2-4*K.1^-4,0,0,-2-K.1+K.1^2-K.1^4,-2+K.1-K.1^2-K.1^-4,-2+K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2+5*K.1-5*K.1^2+5*K.1^4,-2-5*K.1+5*K.1^2+5*K.1^-4,-2-5*K.1^4-5*K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,-2+4*K.1-4*K.1^2-4*K.1^-4,-2+4*K.1^4+4*K.1^-4,-2-4*K.1+4*K.1^2-4*K.1^4,2-2*K.1+2*K.1^2-2*K.1^4,2+2*K.1-2*K.1^2-2*K.1^-4,2+2*K.1^4+2*K.1^-4,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1^4-2*K.1^-4,-2+2*K.1-2*K.1^2-2*K.1^-4,-2+2*K.1^4+2*K.1^-4,-2-2*K.1+2*K.1^2-2*K.1^4,0,0,0,1+2*K.1-2*K.1^2-2*K.1^-4,1+2*K.1^4+2*K.1^-4,1-2*K.1+2*K.1^2-2*K.1^4,K.1^2+K.1^-2,K.1+K.1^-1,K.1^4+K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |48,-24,8,0,0,0,30,-24,12,-6,0,0,0,0,-12,12,0,-4,2,0,0,0,0,0,0,0,0,0,18,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-6+9*K.1^4+9*K.1^-4,-6+9*K.1-9*K.1^2-9*K.1^-4,-6-9*K.1+9*K.1^2-9*K.1^4,0,3*K.1+3*K.1^-1,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,9,9,9,3+9*K.1-9*K.1^2-9*K.1^-4,3-9*K.1+9*K.1^2-9*K.1^4,3+9*K.1^4+9*K.1^-4,-6,-6,3*K.1+3*K.1^-1,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,-6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,3*K.1+3*K.1^-1,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,-6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,0,0,0,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,0,0,0,0,-9,3,0,3,0,0,0,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,3*K.1+3*K.1^-1,3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,0,0,0,0,0,0,0,-4-2*K.1+2*K.1^2-2*K.1^4,-4+2*K.1-2*K.1^2-2*K.1^-4,-4+2*K.1^4+2*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1-3*K.1^-1,-3*K.1^4-3*K.1^-4,4-5*K.1^4-5*K.1^-4,4+5*K.1-5*K.1^2+5*K.1^4,4-5*K.1+5*K.1^2+5*K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,-1+2*K.1-2*K.1^2-2*K.1^-4,-1+2*K.1^4+2*K.1^-4,4+K.1^4+K.1^-4,4-K.1+K.1^2-K.1^4,4+K.1-K.1^2-K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,-1+2*K.1-2*K.1^2-2*K.1^-4,-1+2*K.1^4+2*K.1^-4,4+4*K.1-4*K.1^2-4*K.1^-4,4+4*K.1^4+4*K.1^-4,4-4*K.1+4*K.1^2-4*K.1^4,0,0,-2+K.1^4+K.1^-4,-2-K.1+K.1^2-K.1^4,-2+K.1-K.1^2-K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,-2-5*K.1^4-5*K.1^-4,-2+5*K.1-5*K.1^2+5*K.1^4,-2-5*K.1+5*K.1^2+5*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-2-4*K.1+4*K.1^2-4*K.1^4,-2+4*K.1-4*K.1^2-4*K.1^-4,-2+4*K.1^4+4*K.1^-4,2+2*K.1^4+2*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,2+2*K.1-2*K.1^2-2*K.1^-4,-2*K.1^4-2*K.1^-4,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-2-2*K.1+2*K.1^2-2*K.1^4,-2+2*K.1-2*K.1^2-2*K.1^-4,-2+2*K.1^4+2*K.1^-4,0,0,0,1-2*K.1+2*K.1^2-2*K.1^4,1+2*K.1-2*K.1^2-2*K.1^-4,1+2*K.1^4+2*K.1^-4,K.1^4+K.1^-4,K.1^2+K.1^-2,K.1+K.1^-1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |48,-24,8,0,0,0,30,-24,12,-6,0,0,0,0,-12,12,0,-4,2,0,0,0,0,0,0,0,0,0,18,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-6+9*K.1-9*K.1^2-9*K.1^-4,-6-9*K.1+9*K.1^2-9*K.1^4,-6+9*K.1^4+9*K.1^-4,0,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,3*K.1+3*K.1^-1,9,9,9,3-9*K.1+9*K.1^2-9*K.1^4,3+9*K.1^4+9*K.1^-4,3+9*K.1-9*K.1^2-9*K.1^-4,-6,-6,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,3*K.1+3*K.1^-1,-6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,3*K.1+3*K.1^-1,-6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,0,0,0,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,0,0,0,0,-9,3,0,3,0,0,0,3*K.1^4+3*K.1^-4,3*K.1+3*K.1^-1,3*K.1^2+3*K.1^-2,3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,0,0,0,0,0,0,0,-4+2*K.1^4+2*K.1^-4,-4-2*K.1+2*K.1^2-2*K.1^4,-4+2*K.1-2*K.1^2-2*K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1-3*K.1^-1,4-5*K.1+5*K.1^2+5*K.1^-4,4-5*K.1^4-5*K.1^-4,4+5*K.1-5*K.1^2+5*K.1^4,-1+2*K.1^4+2*K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,-1+2*K.1-2*K.1^2-2*K.1^-4,4+K.1-K.1^2-K.1^-4,4+K.1^4+K.1^-4,4-K.1+K.1^2-K.1^4,-1+2*K.1^4+2*K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,-1+2*K.1-2*K.1^2-2*K.1^-4,4-4*K.1+4*K.1^2-4*K.1^4,4+4*K.1-4*K.1^2-4*K.1^-4,4+4*K.1^4+4*K.1^-4,0,0,-2+K.1-K.1^2-K.1^-4,-2+K.1^4+K.1^-4,-2-K.1+K.1^2-K.1^4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,-2-5*K.1+5*K.1^2+5*K.1^-4,-2-5*K.1^4-5*K.1^-4,-2+5*K.1-5*K.1^2+5*K.1^4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-2+4*K.1^4+4*K.1^-4,-2-4*K.1+4*K.1^2-4*K.1^4,-2+4*K.1-4*K.1^2-4*K.1^-4,2+2*K.1-2*K.1^2-2*K.1^-4,2+2*K.1^4+2*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,-2*K.1-2*K.1^-1,-2*K.1^4-2*K.1^-4,-2*K.1^2-2*K.1^-2,-2+2*K.1^4+2*K.1^-4,-2-2*K.1+2*K.1^2-2*K.1^4,-2+2*K.1-2*K.1^2-2*K.1^-4,0,0,0,1+2*K.1^4+2*K.1^-4,1-2*K.1+2*K.1^2-2*K.1^4,1+2*K.1-2*K.1^2-2*K.1^-4,K.1+K.1^-1,K.1^4+K.1^-4,K.1^2+K.1^-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |48,0,-8,0,0,0,12,12,-6,-6,0,0,0,0,0,0,0,-2,4,0,0,0,0,0,0,0,0,0,24,6+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,6+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,6-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,3-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,-12,9+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,9+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,9-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,3*K.1+3*K.1^-1,3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,3,-6,-3+5*K.1-5*K.1^2+7*K.1^4+2*K.1^-4,-3+2*K.1-2*K.1^2-5*K.1^4-7*K.1^-4,-3-7*K.1+7*K.1^2-2*K.1^4+5*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-3-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-3+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-3+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,0,0,0,-6-K.1+K.1^2-2*K.1^4-K.1^-4,-6-K.1+K.1^2+K.1^4+2*K.1^-4,-6+2*K.1-2*K.1^2+K.1^4-K.1^-4,-6+3*K.1-3*K.1^2+3*K.1^4,-6-3*K.1^4-3*K.1^-4,-6-3*K.1+3*K.1^2+3*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-3,6,-6,-3,3,3+6*K.1-6*K.1^2-6*K.1^-4,3-6*K.1+6*K.1^2-6*K.1^4,3+6*K.1^4+6*K.1^-4,3+2*K.1-2*K.1^2+K.1^4-K.1^-4,3-K.1+K.1^2-2*K.1^4-K.1^-4,3-K.1+K.1^2+K.1^4+2*K.1^-4,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,3*K.1+3*K.1^-1,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,0,0,0,0,0,0,0,-6*K.1^4-6*K.1^-4,-6*K.1^2-6*K.1^-2,-6*K.1-6*K.1^-1,-9,-9,-9,3,3,3,3*K.1+3*K.1^-1,3*K.1^4+3*K.1^-4,3*K.1^2+3*K.1^-2,-3-6*K.1+6*K.1^2+6*K.1^-4,-3-6*K.1^4-6*K.1^-4,-3+6*K.1-6*K.1^2+6*K.1^4,3*K.1^2+3*K.1^-2,3*K.1+3*K.1^-1,3*K.1^4+3*K.1^-4,6*K.1^2+6*K.1^-2,6*K.1+6*K.1^-1,6*K.1^4+6*K.1^-4,9,0,-3+3*K.1-3*K.1^2-3*K.1^-4,-3+3*K.1^4+3*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,0,0,0,3,3,3,0,0,0,-3*K.1^4-3*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1-3*K.1^-1,3*K.1+3*K.1^-1,3*K.1^4+3*K.1^-4,3*K.1^2+3*K.1^-2,2+2*K.1-2*K.1^2+2*K.1^4,2-2*K.1+2*K.1^2+2*K.1^-4,2-2*K.1^4-2*K.1^-4,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,0,0,0,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1+2*K.1-2*K.1^2+2*K.1^4,-1-2*K.1+2*K.1^2+2*K.1^-4,-1-2*K.1^4-2*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |48,0,-8,0,0,0,12,12,-6,-6,0,0,0,0,0,0,0,-2,4,0,0,0,0,0,0,0,0,0,24,6-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,6+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,6+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,3+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,3-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,-12,9-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,9+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,9+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,3*K.1+3*K.1^-1,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,3,-6,-3-7*K.1+7*K.1^2-2*K.1^4+5*K.1^-4,-3+5*K.1-5*K.1^2+7*K.1^4+2*K.1^-4,-3+2*K.1-2*K.1^2-5*K.1^4-7*K.1^-4,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-3+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-3-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-3+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,0,0,0,-6+2*K.1-2*K.1^2+K.1^4-K.1^-4,-6-K.1+K.1^2-2*K.1^4-K.1^-4,-6-K.1+K.1^2+K.1^4+2*K.1^-4,-6-3*K.1+3*K.1^2+3*K.1^-4,-6+3*K.1-3*K.1^2+3*K.1^4,-6-3*K.1^4-3*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-3,6,-6,-3,3,3+6*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2-6*K.1^-4,3-6*K.1+6*K.1^2-6*K.1^4,3-K.1+K.1^2+K.1^4+2*K.1^-4,3+2*K.1-2*K.1^2+K.1^4-K.1^-4,3-K.1+K.1^2-2*K.1^4-K.1^-4,3*K.1+3*K.1^-1,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,0,0,0,0,0,0,0,-6*K.1^2-6*K.1^-2,-6*K.1-6*K.1^-1,-6*K.1^4-6*K.1^-4,-9,-9,-9,3,3,3,3*K.1^4+3*K.1^-4,3*K.1^2+3*K.1^-2,3*K.1+3*K.1^-1,-3-6*K.1^4-6*K.1^-4,-3+6*K.1-6*K.1^2+6*K.1^4,-3-6*K.1+6*K.1^2+6*K.1^-4,3*K.1+3*K.1^-1,3*K.1^4+3*K.1^-4,3*K.1^2+3*K.1^-2,6*K.1+6*K.1^-1,6*K.1^4+6*K.1^-4,6*K.1^2+6*K.1^-2,9,0,-3+3*K.1^4+3*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,-3+3*K.1-3*K.1^2-3*K.1^-4,0,0,0,3,3,3,0,0,0,-3*K.1^2-3*K.1^-2,-3*K.1-3*K.1^-1,-3*K.1^4-3*K.1^-4,3*K.1^4+3*K.1^-4,3*K.1^2+3*K.1^-2,3*K.1+3*K.1^-1,2-2*K.1+2*K.1^2+2*K.1^-4,2-2*K.1^4-2*K.1^-4,2+2*K.1-2*K.1^2+2*K.1^4,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,0,0,0,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,-1-2*K.1+2*K.1^2+2*K.1^-4,-1-2*K.1^4-2*K.1^-4,-1+2*K.1-2*K.1^2+2*K.1^4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |48,0,-8,0,0,0,12,12,-6,-6,0,0,0,0,0,0,0,-2,4,0,0,0,0,0,0,0,0,0,24,6+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,6-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,6+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,3+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,3-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,-12,9+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,9-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,9+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,3*K.1^4+3*K.1^-4,3*K.1+3*K.1^-1,3*K.1^2+3*K.1^-2,3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,3,-6,-3+2*K.1-2*K.1^2-5*K.1^4-7*K.1^-4,-3-7*K.1+7*K.1^2-2*K.1^4+5*K.1^-4,-3+5*K.1-5*K.1^2+7*K.1^4+2*K.1^-4,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-3+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-3+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-3-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,0,0,0,-6-K.1+K.1^2+K.1^4+2*K.1^-4,-6+2*K.1-2*K.1^2+K.1^4-K.1^-4,-6-K.1+K.1^2-2*K.1^4-K.1^-4,-6-3*K.1^4-3*K.1^-4,-6-3*K.1+3*K.1^2+3*K.1^-4,-6+3*K.1-3*K.1^2+3*K.1^4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-3,6,-6,-3,3,3-6*K.1+6*K.1^2-6*K.1^4,3+6*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2-6*K.1^-4,3-K.1+K.1^2-2*K.1^4-K.1^-4,3-K.1+K.1^2+K.1^4+2*K.1^-4,3+2*K.1-2*K.1^2+K.1^4-K.1^-4,3*K.1^4+3*K.1^-4,3*K.1+3*K.1^-1,3*K.1^2+3*K.1^-2,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,0,0,0,0,0,0,0,-6*K.1-6*K.1^-1,-6*K.1^4-6*K.1^-4,-6*K.1^2-6*K.1^-2,-9,-9,-9,3,3,3,3*K.1^2+3*K.1^-2,3*K.1+3*K.1^-1,3*K.1^4+3*K.1^-4,-3+6*K.1-6*K.1^2+6*K.1^4,-3-6*K.1+6*K.1^2+6*K.1^-4,-3-6*K.1^4-6*K.1^-4,3*K.1^4+3*K.1^-4,3*K.1^2+3*K.1^-2,3*K.1+3*K.1^-1,6*K.1^4+6*K.1^-4,6*K.1^2+6*K.1^-2,6*K.1+6*K.1^-1,9,0,-3-3*K.1+3*K.1^2-3*K.1^4,-3+3*K.1-3*K.1^2-3*K.1^-4,-3+3*K.1^4+3*K.1^-4,0,0,0,3,3,3,0,0,0,-3*K.1-3*K.1^-1,-3*K.1^4-3*K.1^-4,-3*K.1^2-3*K.1^-2,3*K.1^2+3*K.1^-2,3*K.1+3*K.1^-1,3*K.1^4+3*K.1^-4,2-2*K.1^4-2*K.1^-4,2+2*K.1-2*K.1^2+2*K.1^4,2-2*K.1+2*K.1^2+2*K.1^-4,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,0,0,0,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,-1-2*K.1^4-2*K.1^-4,-1+2*K.1-2*K.1^2+2*K.1^4,-1-2*K.1+2*K.1^2+2*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |48,0,-8,0,0,0,12,12,-6,-6,0,0,0,0,0,0,0,-2,4,0,0,0,0,0,0,0,0,0,24,6+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,6+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,6-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,3-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,-12,9+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,9+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,9-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,3*K.1+3*K.1^-1,3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,3,-6,-3+5*K.1-5*K.1^2+7*K.1^4+2*K.1^-4,-3+2*K.1-2*K.1^2-5*K.1^4-7*K.1^-4,-3-7*K.1+7*K.1^2-2*K.1^4+5*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-3-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-3+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-3+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,0,0,0,-6-K.1+K.1^2-2*K.1^4-K.1^-4,-6-K.1+K.1^2+K.1^4+2*K.1^-4,-6+2*K.1-2*K.1^2+K.1^4-K.1^-4,-6+3*K.1-3*K.1^2+3*K.1^4,-6-3*K.1^4-3*K.1^-4,-6-3*K.1+3*K.1^2+3*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-3,6,-6,-3,3,3+6*K.1-6*K.1^2-6*K.1^-4,3-6*K.1+6*K.1^2-6*K.1^4,3+6*K.1^4+6*K.1^-4,3+2*K.1-2*K.1^2+K.1^4-K.1^-4,3-K.1+K.1^2-2*K.1^4-K.1^-4,3-K.1+K.1^2+K.1^4+2*K.1^-4,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,3*K.1+3*K.1^-1,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,0,0,0,0,0,0,0,6*K.1^4+6*K.1^-4,6*K.1^2+6*K.1^-2,6*K.1+6*K.1^-1,9,9,9,-3,-3,-3,-3*K.1-3*K.1^-1,-3*K.1^4-3*K.1^-4,-3*K.1^2-3*K.1^-2,3+6*K.1-6*K.1^2-6*K.1^-4,3+6*K.1^4+6*K.1^-4,3-6*K.1+6*K.1^2-6*K.1^4,-3*K.1^2-3*K.1^-2,-3*K.1-3*K.1^-1,-3*K.1^4-3*K.1^-4,-6*K.1^2-6*K.1^-2,-6*K.1-6*K.1^-1,-6*K.1^4-6*K.1^-4,-9,0,3-3*K.1+3*K.1^2+3*K.1^-4,3-3*K.1^4-3*K.1^-4,3+3*K.1-3*K.1^2+3*K.1^4,0,0,0,-3,-3,-3,0,0,0,3*K.1^4+3*K.1^-4,3*K.1^2+3*K.1^-2,3*K.1+3*K.1^-1,-3*K.1-3*K.1^-1,-3*K.1^4-3*K.1^-4,-3*K.1^2-3*K.1^-2,2+2*K.1-2*K.1^2+2*K.1^4,2-2*K.1+2*K.1^2+2*K.1^-4,2-2*K.1^4-2*K.1^-4,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,0,0,0,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1+2*K.1-2*K.1^2+2*K.1^4,-1-2*K.1+2*K.1^2+2*K.1^-4,-1-2*K.1^4-2*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |48,0,-8,0,0,0,12,12,-6,-6,0,0,0,0,0,0,0,-2,4,0,0,0,0,0,0,0,0,0,24,6-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,6+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,6+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,3+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,3-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,-12,9-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,9+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,9+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,3*K.1+3*K.1^-1,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,3,-6,-3-7*K.1+7*K.1^2-2*K.1^4+5*K.1^-4,-3+5*K.1-5*K.1^2+7*K.1^4+2*K.1^-4,-3+2*K.1-2*K.1^2-5*K.1^4-7*K.1^-4,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-3+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-3-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-3+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,0,0,0,-6+2*K.1-2*K.1^2+K.1^4-K.1^-4,-6-K.1+K.1^2-2*K.1^4-K.1^-4,-6-K.1+K.1^2+K.1^4+2*K.1^-4,-6-3*K.1+3*K.1^2+3*K.1^-4,-6+3*K.1-3*K.1^2+3*K.1^4,-6-3*K.1^4-3*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-3,6,-6,-3,3,3+6*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2-6*K.1^-4,3-6*K.1+6*K.1^2-6*K.1^4,3-K.1+K.1^2+K.1^4+2*K.1^-4,3+2*K.1-2*K.1^2+K.1^4-K.1^-4,3-K.1+K.1^2-2*K.1^4-K.1^-4,3*K.1+3*K.1^-1,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,0,0,0,0,0,0,0,6*K.1^2+6*K.1^-2,6*K.1+6*K.1^-1,6*K.1^4+6*K.1^-4,9,9,9,-3,-3,-3,-3*K.1^4-3*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1-3*K.1^-1,3+6*K.1^4+6*K.1^-4,3-6*K.1+6*K.1^2-6*K.1^4,3+6*K.1-6*K.1^2-6*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^4-3*K.1^-4,-3*K.1^2-3*K.1^-2,-6*K.1-6*K.1^-1,-6*K.1^4-6*K.1^-4,-6*K.1^2-6*K.1^-2,-9,0,3-3*K.1^4-3*K.1^-4,3+3*K.1-3*K.1^2+3*K.1^4,3-3*K.1+3*K.1^2+3*K.1^-4,0,0,0,-3,-3,-3,0,0,0,3*K.1^2+3*K.1^-2,3*K.1+3*K.1^-1,3*K.1^4+3*K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1-3*K.1^-1,2-2*K.1+2*K.1^2+2*K.1^-4,2-2*K.1^4-2*K.1^-4,2+2*K.1-2*K.1^2+2*K.1^4,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,0,0,0,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,-1-2*K.1+2*K.1^2+2*K.1^-4,-1-2*K.1^4-2*K.1^-4,-1+2*K.1-2*K.1^2+2*K.1^4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |48,0,-8,0,0,0,12,12,-6,-6,0,0,0,0,0,0,0,-2,4,0,0,0,0,0,0,0,0,0,24,6+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,6-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,6+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,3+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,3-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,-12,9+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,9-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,9+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,3*K.1^4+3*K.1^-4,3*K.1+3*K.1^-1,3*K.1^2+3*K.1^-2,3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,3,-6,-3+2*K.1-2*K.1^2-5*K.1^4-7*K.1^-4,-3-7*K.1+7*K.1^2-2*K.1^4+5*K.1^-4,-3+5*K.1-5*K.1^2+7*K.1^4+2*K.1^-4,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-3+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-3+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-3-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,0,0,0,-6-K.1+K.1^2+K.1^4+2*K.1^-4,-6+2*K.1-2*K.1^2+K.1^4-K.1^-4,-6-K.1+K.1^2-2*K.1^4-K.1^-4,-6-3*K.1^4-3*K.1^-4,-6-3*K.1+3*K.1^2+3*K.1^-4,-6+3*K.1-3*K.1^2+3*K.1^4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-3,6,-6,-3,3,3-6*K.1+6*K.1^2-6*K.1^4,3+6*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2-6*K.1^-4,3-K.1+K.1^2-2*K.1^4-K.1^-4,3-K.1+K.1^2+K.1^4+2*K.1^-4,3+2*K.1-2*K.1^2+K.1^4-K.1^-4,3*K.1^4+3*K.1^-4,3*K.1+3*K.1^-1,3*K.1^2+3*K.1^-2,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,0,0,0,0,0,0,0,6*K.1+6*K.1^-1,6*K.1^4+6*K.1^-4,6*K.1^2+6*K.1^-2,9,9,9,-3,-3,-3,-3*K.1^2-3*K.1^-2,-3*K.1-3*K.1^-1,-3*K.1^4-3*K.1^-4,3-6*K.1+6*K.1^2-6*K.1^4,3+6*K.1-6*K.1^2-6*K.1^-4,3+6*K.1^4+6*K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1-3*K.1^-1,-6*K.1^4-6*K.1^-4,-6*K.1^2-6*K.1^-2,-6*K.1-6*K.1^-1,-9,0,3+3*K.1-3*K.1^2+3*K.1^4,3-3*K.1+3*K.1^2+3*K.1^-4,3-3*K.1^4-3*K.1^-4,0,0,0,-3,-3,-3,0,0,0,3*K.1+3*K.1^-1,3*K.1^4+3*K.1^-4,3*K.1^2+3*K.1^-2,-3*K.1^2-3*K.1^-2,-3*K.1-3*K.1^-1,-3*K.1^4-3*K.1^-4,2-2*K.1^4-2*K.1^-4,2+2*K.1-2*K.1^2+2*K.1^4,2-2*K.1+2*K.1^2+2*K.1^-4,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,0,0,0,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,-1-2*K.1^4-2*K.1^-4,-1+2*K.1-2*K.1^2+2*K.1^4,-1-2*K.1+2*K.1^2+2*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |48,0,-8,0,0,0,12,12,-6,-6,0,0,0,0,0,0,0,-2,4,0,0,0,0,0,0,0,0,0,24,12-10*K.1+10*K.1^2-2*K.1^4+8*K.1^-4,12+8*K.1-8*K.1^2+10*K.1^4+2*K.1^-4,12+2*K.1-2*K.1^2-8*K.1^4-10*K.1^-4,-6-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,-6+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,-6+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,24,6+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,6+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,6-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-6+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,-6-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,-6+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,-6,12,-6+2*K.1-2*K.1^2+10*K.1^4+8*K.1^-4,-6+8*K.1-8*K.1^2-2*K.1^4-10*K.1^-4,-6-10*K.1+10*K.1^2-8*K.1^4+2*K.1^-4,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-6+2*K.1-2*K.1^2-8*K.1^4-10*K.1^-4,-6-10*K.1+10*K.1^2-2*K.1^4+8*K.1^-4,-6+8*K.1-8*K.1^2+10*K.1^4+2*K.1^-4,6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-6+6*K.1^4+6*K.1^-4,-6+6*K.1-6*K.1^2-6*K.1^-4,-6-6*K.1+6*K.1^2-6*K.1^4,6+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,6+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,6-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,6,6,12,6,-6,-6-6*K.1+6*K.1^2-6*K.1^4,-6+6*K.1^4+6*K.1^-4,-6+6*K.1-6*K.1^2-6*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-4-2*K.1^4-2*K.1^-4,-4+2*K.1-2*K.1^2+2*K.1^4,-4-2*K.1+2*K.1^2+2*K.1^-4,-4*K.1-4*K.1^-1,-4*K.1^4-4*K.1^-4,-4*K.1^2-4*K.1^-2,0,0,0,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,2-2*K.1^4-2*K.1^-4,2+2*K.1-2*K.1^2+2*K.1^4,2-2*K.1+2*K.1^2+2*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |48,0,-8,0,0,0,12,12,-6,-6,0,0,0,0,0,0,0,-2,4,0,0,0,0,0,0,0,0,0,24,12+8*K.1-8*K.1^2+10*K.1^4+2*K.1^-4,12+2*K.1-2*K.1^2-8*K.1^4-10*K.1^-4,12-10*K.1+10*K.1^2-2*K.1^4+8*K.1^-4,-6+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,-6+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,-6-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,24,6+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,6-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,6+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-6-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,-6+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,-6+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,-6,12,-6+8*K.1-8*K.1^2-2*K.1^4-10*K.1^-4,-6-10*K.1+10*K.1^2-8*K.1^4+2*K.1^-4,-6+2*K.1-2*K.1^2+10*K.1^4+8*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-6-10*K.1+10*K.1^2-2*K.1^4+8*K.1^-4,-6+8*K.1-8*K.1^2+10*K.1^4+2*K.1^-4,-6+2*K.1-2*K.1^2-8*K.1^4-10*K.1^-4,6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-6+6*K.1-6*K.1^2-6*K.1^-4,-6-6*K.1+6*K.1^2-6*K.1^4,-6+6*K.1^4+6*K.1^-4,6+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,6-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,6+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,6,6,12,6,-6,-6+6*K.1^4+6*K.1^-4,-6+6*K.1-6*K.1^2-6*K.1^-4,-6-6*K.1+6*K.1^2-6*K.1^4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-4-2*K.1+2*K.1^2+2*K.1^-4,-4-2*K.1^4-2*K.1^-4,-4+2*K.1-2*K.1^2+2*K.1^4,-4*K.1^2-4*K.1^-2,-4*K.1-4*K.1^-1,-4*K.1^4-4*K.1^-4,0,0,0,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,2-2*K.1+2*K.1^2+2*K.1^-4,2-2*K.1^4-2*K.1^-4,2+2*K.1-2*K.1^2+2*K.1^4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |48,0,-8,0,0,0,12,12,-6,-6,0,0,0,0,0,0,0,-2,4,0,0,0,0,0,0,0,0,0,24,12+2*K.1-2*K.1^2-8*K.1^4-10*K.1^-4,12-10*K.1+10*K.1^2-2*K.1^4+8*K.1^-4,12+8*K.1-8*K.1^2+10*K.1^4+2*K.1^-4,-6+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,-6-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,-6+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,24,6-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,6+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,6+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-6+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,-6+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,-6-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,-6,12,-6-10*K.1+10*K.1^2-8*K.1^4+2*K.1^-4,-6+2*K.1-2*K.1^2+10*K.1^4+8*K.1^-4,-6+8*K.1-8*K.1^2-2*K.1^4-10*K.1^-4,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-6+8*K.1-8*K.1^2+10*K.1^4+2*K.1^-4,-6+2*K.1-2*K.1^2-8*K.1^4-10*K.1^-4,-6-10*K.1+10*K.1^2-2*K.1^4+8*K.1^-4,-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-6-6*K.1+6*K.1^2-6*K.1^4,-6+6*K.1^4+6*K.1^-4,-6+6*K.1-6*K.1^2-6*K.1^-4,6-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,6+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,6+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,6,6,12,6,-6,-6+6*K.1-6*K.1^2-6*K.1^-4,-6-6*K.1+6*K.1^2-6*K.1^4,-6+6*K.1^4+6*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-4+2*K.1-2*K.1^2+2*K.1^4,-4-2*K.1+2*K.1^2+2*K.1^-4,-4-2*K.1^4-2*K.1^-4,-4*K.1^4-4*K.1^-4,-4*K.1^2-4*K.1^-2,-4*K.1-4*K.1^-1,0,0,0,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2+2*K.1-2*K.1^2+2*K.1^4,2-2*K.1+2*K.1^2+2*K.1^-4,2-2*K.1^4-2*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |48,0,-8,0,0,0,30,-24,12,-6,0,0,0,0,0,0,0,4,-2,0,0,0,0,0,0,0,0,0,18,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-6-9*K.1+9*K.1^2-9*K.1^4,-6+9*K.1^4+9*K.1^-4,-6+9*K.1-9*K.1^2-9*K.1^-4,0,3*K.1^4+3*K.1^-4,3*K.1+3*K.1^-1,3*K.1^2+3*K.1^-2,9,9,9,3+9*K.1^4+9*K.1^-4,3+9*K.1-9*K.1^2-9*K.1^-4,3-9*K.1+9*K.1^2-9*K.1^4,-6,-6,3*K.1^4+3*K.1^-4,3*K.1+3*K.1^-1,3*K.1^2+3*K.1^-2,-6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,3*K.1^4+3*K.1^-4,3*K.1+3*K.1^-1,3*K.1^2+3*K.1^-2,-6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,0,0,0,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,0,0,0,0,-9,3,0,3,0,0,0,3*K.1+3*K.1^-1,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,0,0,0,0,0,0,0,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-9-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,-9+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-9-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,9-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,9+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,9-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,0,0,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,3*K.1^4+3*K.1^-4,3*K.1^2+3*K.1^-2,3*K.1+3*K.1^-1,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1-3*K.1^-1,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,2-2*K.1+2*K.1^2+2*K.1^-4,2-2*K.1^4-2*K.1^-4,2+2*K.1-2*K.1^2+2*K.1^4,0,0,0,-1-2*K.1+2*K.1^2+2*K.1^-4,-1-2*K.1^4-2*K.1^-4,-1+2*K.1-2*K.1^2+2*K.1^4,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K 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x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K 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x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K 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x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |48,0,-8,0,0,0,30,-24,12,-6,0,0,0,0,0,0,0,4,-2,0,0,0,0,0,0,0,0,0,18,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-6+9*K.1^4+9*K.1^-4,-6+9*K.1-9*K.1^2-9*K.1^-4,-6-9*K.1+9*K.1^2-9*K.1^4,0,3*K.1+3*K.1^-1,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,9,9,9,3+9*K.1-9*K.1^2-9*K.1^-4,3-9*K.1+9*K.1^2-9*K.1^4,3+9*K.1^4+9*K.1^-4,-6,-6,3*K.1+3*K.1^-1,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,-6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,3*K.1+3*K.1^-1,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,-6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,0,0,0,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,0,0,0,0,-9,3,0,3,0,0,0,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,3*K.1+3*K.1^-1,3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,0,0,0,0,0,0,0,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,9+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,9+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,9-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-9+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-9+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-9-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,0,0,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^4-3*K.1^-4,-3*K.1^2-3*K.1^-2,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,3*K.1+3*K.1^-1,3*K.1^4+3*K.1^-4,3*K.1^2+3*K.1^-2,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2+2*K.1-2*K.1^2+2*K.1^4,2-2*K.1+2*K.1^2+2*K.1^-4,2-2*K.1^4-2*K.1^-4,0,0,0,-1+2*K.1-2*K.1^2+2*K.1^4,-1-2*K.1+2*K.1^2+2*K.1^-4,-1-2*K.1^4-2*K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |48,0,-8,0,0,0,30,-24,12,-6,0,0,0,0,0,0,0,4,-2,0,0,0,0,0,0,0,0,0,18,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-6+9*K.1-9*K.1^2-9*K.1^-4,-6-9*K.1+9*K.1^2-9*K.1^4,-6+9*K.1^4+9*K.1^-4,0,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,3*K.1+3*K.1^-1,9,9,9,3-9*K.1+9*K.1^2-9*K.1^4,3+9*K.1^4+9*K.1^-4,3+9*K.1-9*K.1^2-9*K.1^-4,-6,-6,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,3*K.1+3*K.1^-1,-6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,3*K.1^2+3*K.1^-2,3*K.1^4+3*K.1^-4,3*K.1+3*K.1^-1,-6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,0,0,0,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,0,0,0,0,-9,3,0,3,0,0,0,3*K.1^4+3*K.1^-4,3*K.1+3*K.1^-1,3*K.1^2+3*K.1^-2,3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,0,0,0,0,0,0,0,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,9-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,9+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,9+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,-9-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-9+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-9+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,0,0,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1-3*K.1^-1,-3*K.1^4-3*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,3*K.1^2+3*K.1^-2,3*K.1+3*K.1^-1,3*K.1^4+3*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,2-2*K.1^4-2*K.1^-4,2+2*K.1-2*K.1^2+2*K.1^4,2-2*K.1+2*K.1^2+2*K.1^-4,0,0,0,-1-2*K.1^4-2*K.1^-4,-1+2*K.1-2*K.1^2+2*K.1^4,-1-2*K.1+2*K.1^2+2*K.1^-4,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |64,0,0,0,0,0,-8,-8,-8,10,4,4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-8,-8+8*K.1-8*K.1^2+16*K.1^4+8*K.1^-4,-8+8*K.1-8*K.1^2-8*K.1^4-16*K.1^-4,-8-16*K.1+16*K.1^2-8*K.1^4+8*K.1^-4,4-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,4+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,4-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,4,4-4*K.1+4*K.1^2-8*K.1^4-4*K.1^-4,4-4*K.1+4*K.1^2+4*K.1^4+8*K.1^-4,4+8*K.1-8*K.1^2+4*K.1^4-4*K.1^-4,4+12*K.1-12*K.1^2-12*K.1^-4,4-12*K.1+12*K.1^2-12*K.1^4,4+12*K.1^4+12*K.1^-4,-5+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-5-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-5+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-14,4,-8-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-8+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-8+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-2,-2,-2,10-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,10+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,10+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,4-6*K.1+6*K.1^2+6*K.1^-4,4+6*K.1-6*K.1^2+6*K.1^4,4-6*K.1^4-6*K.1^-4,-2+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-2+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-2-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-2+6*K.1-6*K.1^2-6*K.1^-4,-2-6*K.1+6*K.1^2-6*K.1^4,-2+6*K.1^4+6*K.1^-4,4+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,4+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,4-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-2-6*K.1+6*K.1^2+6*K.1^-4,-2+6*K.1-6*K.1^2+6*K.1^4,-2-6*K.1^4-6*K.1^-4,-5,1,-5,4,4,1+3*K.1-3*K.1^2+3*K.1^4,1-3*K.1^4-3*K.1^-4,1-3*K.1+3*K.1^2+3*K.1^-4,-2-K.1+K.1^2-5*K.1^4-4*K.1^-4,-2-4*K.1+4*K.1^2+K.1^4+5*K.1^-4,-2+5*K.1-5*K.1^2+4*K.1^4-K.1^-4,-2+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-2-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-2-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,4+3*K.1^4+3*K.1^-4,4+3*K.1-3*K.1^2-3*K.1^-4,4-3*K.1+3*K.1^2-3*K.1^4,-2,-2,-2,-2,1,1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,2*K.1^4+2*K.1^-4,2*K.1^4+2*K.1^-4,2*K.1+2*K.1^-1,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^2+2*K.1^-2,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |64,0,0,0,0,0,-8,-8,-8,10,4,4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-8,-8-16*K.1+16*K.1^2-8*K.1^4+8*K.1^-4,-8+8*K.1-8*K.1^2+16*K.1^4+8*K.1^-4,-8+8*K.1-8*K.1^2-8*K.1^4-16*K.1^-4,4-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,4-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,4+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,4,4+8*K.1-8*K.1^2+4*K.1^4-4*K.1^-4,4-4*K.1+4*K.1^2-8*K.1^4-4*K.1^-4,4-4*K.1+4*K.1^2+4*K.1^4+8*K.1^-4,4+12*K.1^4+12*K.1^-4,4+12*K.1-12*K.1^2-12*K.1^-4,4-12*K.1+12*K.1^2-12*K.1^4,-5+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-5+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-5-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-14,4,-8+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-8-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-8+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-2,-2,-2,10+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,10-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,10+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,4-6*K.1^4-6*K.1^-4,4-6*K.1+6*K.1^2+6*K.1^-4,4+6*K.1-6*K.1^2+6*K.1^4,-2-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-2+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-2+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-2+6*K.1^4+6*K.1^-4,-2+6*K.1-6*K.1^2-6*K.1^-4,-2-6*K.1+6*K.1^2-6*K.1^4,4-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,4+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,4+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-2-6*K.1^4-6*K.1^-4,-2-6*K.1+6*K.1^2+6*K.1^-4,-2+6*K.1-6*K.1^2+6*K.1^4,-5,1,-5,4,4,1-3*K.1+3*K.1^2+3*K.1^-4,1+3*K.1-3*K.1^2+3*K.1^4,1-3*K.1^4-3*K.1^-4,-2+5*K.1-5*K.1^2+4*K.1^4-K.1^-4,-2-K.1+K.1^2-5*K.1^4-4*K.1^-4,-2-4*K.1+4*K.1^2+K.1^4+5*K.1^-4,-2-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-2+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-2-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,4-3*K.1+3*K.1^2-3*K.1^4,4+3*K.1^4+3*K.1^-4,4+3*K.1-3*K.1^2-3*K.1^-4,-2,-2,-2,-2,1,1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,2*K.1^2+2*K.1^-2,2*K.1^2+2*K.1^-2,2*K.1^4+2*K.1^-4,2*K.1^4+2*K.1^-4,2*K.1+2*K.1^-1,2*K.1+2*K.1^-1,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,-1*K.1-K.1^-1,-1*K.1-K.1^-1,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |64,0,0,0,0,0,-8,-8,-8,10,4,4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-8,-8+8*K.1-8*K.1^2-8*K.1^4-16*K.1^-4,-8-16*K.1+16*K.1^2-8*K.1^4+8*K.1^-4,-8+8*K.1-8*K.1^2+16*K.1^4+8*K.1^-4,4+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,4-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,4-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,4,4-4*K.1+4*K.1^2+4*K.1^4+8*K.1^-4,4+8*K.1-8*K.1^2+4*K.1^4-4*K.1^-4,4-4*K.1+4*K.1^2-8*K.1^4-4*K.1^-4,4-12*K.1+12*K.1^2-12*K.1^4,4+12*K.1^4+12*K.1^-4,4+12*K.1-12*K.1^2-12*K.1^-4,-5-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-5+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-5+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-14,4,-8+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-8+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-8-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-2,-2,-2,10+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,10+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,10-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,4+6*K.1-6*K.1^2+6*K.1^4,4-6*K.1^4-6*K.1^-4,4-6*K.1+6*K.1^2+6*K.1^-4,-2+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-2-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-2+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-2-6*K.1+6*K.1^2-6*K.1^4,-2+6*K.1^4+6*K.1^-4,-2+6*K.1-6*K.1^2-6*K.1^-4,4+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,4-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,4+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-2+6*K.1-6*K.1^2+6*K.1^4,-2-6*K.1^4-6*K.1^-4,-2-6*K.1+6*K.1^2+6*K.1^-4,-5,1,-5,4,4,1-3*K.1^4-3*K.1^-4,1-3*K.1+3*K.1^2+3*K.1^-4,1+3*K.1-3*K.1^2+3*K.1^4,-2-4*K.1+4*K.1^2+K.1^4+5*K.1^-4,-2+5*K.1-5*K.1^2+4*K.1^4-K.1^-4,-2-K.1+K.1^2-5*K.1^4-4*K.1^-4,-2-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-2-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-2+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,4+3*K.1-3*K.1^2-3*K.1^-4,4-3*K.1+3*K.1^2-3*K.1^4,4+3*K.1^4+3*K.1^-4,-2,-2,-2,-2,1,1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,2*K.1+2*K.1^-1,2*K.1+2*K.1^-1,2*K.1^2+2*K.1^-2,2*K.1^2+2*K.1^-2,2*K.1^4+2*K.1^-4,2*K.1^4+2*K.1^-4,-1*K.1^2-K.1^-2,-1*K.1^2-K.1^-2,-1*K.1^4-K.1^-4,-1*K.1^4-K.1^-4,-1*K.1-K.1^-1,-1*K.1-K.1^-1,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |64,0,0,0,0,0,-8,-8,-8,10,4*K.1^-3,4*K.1^3,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-8,-8+8*K.1-8*K.1^2+16*K.1^4+8*K.1^-4,-8+8*K.1-8*K.1^2-8*K.1^4-16*K.1^-4,-8-16*K.1+16*K.1^2-8*K.1^4+8*K.1^-4,4-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,4+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,4-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,4,4-4*K.1+4*K.1^2-8*K.1^4-4*K.1^-4,4-4*K.1+4*K.1^2+4*K.1^4+8*K.1^-4,4+8*K.1-8*K.1^2+4*K.1^4-4*K.1^-4,4+12*K.1-12*K.1^2-12*K.1^-4,4-12*K.1+12*K.1^2-12*K.1^4,4+12*K.1^4+12*K.1^-4,-5+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-5-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-5+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-14,4,-8-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-8+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-8+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-2,-2,-2,10-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,10+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,10+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,4-6*K.1+6*K.1^2+6*K.1^-4,4+6*K.1-6*K.1^2+6*K.1^4,4-6*K.1^4-6*K.1^-4,-2+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-2+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-2-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-2+6*K.1-6*K.1^2-6*K.1^-4,-2-6*K.1+6*K.1^2-6*K.1^4,-2+6*K.1^4+6*K.1^-4,4+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,4+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,4-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-2-6*K.1+6*K.1^2+6*K.1^-4,-2+6*K.1-6*K.1^2+6*K.1^4,-2-6*K.1^4-6*K.1^-4,-5,1,-5,4,4,1+3*K.1-3*K.1^2+3*K.1^4,1-3*K.1^4-3*K.1^-4,1-3*K.1+3*K.1^2+3*K.1^-4,-2-K.1+K.1^2-5*K.1^4-4*K.1^-4,-2-4*K.1+4*K.1^2+K.1^4+5*K.1^-4,-2+5*K.1-5*K.1^2+4*K.1^4-K.1^-4,-2+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-2-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-2-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,4+3*K.1^4+3*K.1^-4,4+3*K.1-3*K.1^2-3*K.1^-4,4-3*K.1+3*K.1^2-3*K.1^4,-2*K.1^-3,-2*K.1^3,-2*K.1^-3,-2*K.1^3,K.1^3,K.1^-3,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,2*K.1+2*K.1^2,2*K.1^-2+2*K.1^-1,2*K.1^2+2*K.1^4,-2*K.1-2*K.1^4+2*K.1^-4,-2*K.1^2+2*K.1^4-2*K.1^-4,2*K.1+2*K.1^-4,K.1+K.1^4-K.1^-4,-1*K.1^2-K.1^4,-1*K.1-K.1^-4,K.1^2-K.1^4+K.1^-4,-1*K.1-K.1^2,-1*K.1^-2-K.1^-1,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |64,0,0,0,0,0,-8,-8,-8,10,4*K.1^3,4*K.1^-3,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-8,-8+8*K.1-8*K.1^2+16*K.1^4+8*K.1^-4,-8+8*K.1-8*K.1^2-8*K.1^4-16*K.1^-4,-8-16*K.1+16*K.1^2-8*K.1^4+8*K.1^-4,4-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,4+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,4-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,4,4-4*K.1+4*K.1^2-8*K.1^4-4*K.1^-4,4-4*K.1+4*K.1^2+4*K.1^4+8*K.1^-4,4+8*K.1-8*K.1^2+4*K.1^4-4*K.1^-4,4+12*K.1-12*K.1^2-12*K.1^-4,4-12*K.1+12*K.1^2-12*K.1^4,4+12*K.1^4+12*K.1^-4,-5+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-5-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-5+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-14,4,-8-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-8+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-8+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-2,-2,-2,10-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,10+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,10+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,4-6*K.1+6*K.1^2+6*K.1^-4,4+6*K.1-6*K.1^2+6*K.1^4,4-6*K.1^4-6*K.1^-4,-2+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-2+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-2-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-2+6*K.1-6*K.1^2-6*K.1^-4,-2-6*K.1+6*K.1^2-6*K.1^4,-2+6*K.1^4+6*K.1^-4,4+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,4+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,4-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-2-6*K.1+6*K.1^2+6*K.1^-4,-2+6*K.1-6*K.1^2+6*K.1^4,-2-6*K.1^4-6*K.1^-4,-5,1,-5,4,4,1+3*K.1-3*K.1^2+3*K.1^4,1-3*K.1^4-3*K.1^-4,1-3*K.1+3*K.1^2+3*K.1^-4,-2-K.1+K.1^2-5*K.1^4-4*K.1^-4,-2-4*K.1+4*K.1^2+K.1^4+5*K.1^-4,-2+5*K.1-5*K.1^2+4*K.1^4-K.1^-4,-2+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-2-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-2-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,4+3*K.1^4+3*K.1^-4,4+3*K.1-3*K.1^2-3*K.1^-4,4-3*K.1+3*K.1^2-3*K.1^4,-2*K.1^3,-2*K.1^-3,-2*K.1^3,-2*K.1^-3,K.1^-3,K.1^3,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,2*K.1^-2+2*K.1^-1,2*K.1+2*K.1^2,-2*K.1-2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^4,2*K.1+2*K.1^-4,-2*K.1^2+2*K.1^4-2*K.1^-4,-1*K.1^2-K.1^4,K.1+K.1^4-K.1^-4,K.1^2-K.1^4+K.1^-4,-1*K.1-K.1^-4,-1*K.1^-2-K.1^-1,-1*K.1-K.1^2,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |64,0,0,0,0,0,-8,-8,-8,10,4*K.1^-3,4*K.1^3,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-8,-8-16*K.1+16*K.1^2-8*K.1^4+8*K.1^-4,-8+8*K.1-8*K.1^2+16*K.1^4+8*K.1^-4,-8+8*K.1-8*K.1^2-8*K.1^4-16*K.1^-4,4-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,4-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,4+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,4,4+8*K.1-8*K.1^2+4*K.1^4-4*K.1^-4,4-4*K.1+4*K.1^2-8*K.1^4-4*K.1^-4,4-4*K.1+4*K.1^2+4*K.1^4+8*K.1^-4,4+12*K.1^4+12*K.1^-4,4+12*K.1-12*K.1^2-12*K.1^-4,4-12*K.1+12*K.1^2-12*K.1^4,-5+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-5+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-5-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-14,4,-8+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-8-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-8+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-2,-2,-2,10+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,10-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,10+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,4-6*K.1^4-6*K.1^-4,4-6*K.1+6*K.1^2+6*K.1^-4,4+6*K.1-6*K.1^2+6*K.1^4,-2-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-2+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-2+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-2+6*K.1^4+6*K.1^-4,-2+6*K.1-6*K.1^2-6*K.1^-4,-2-6*K.1+6*K.1^2-6*K.1^4,4-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,4+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,4+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-2-6*K.1^4-6*K.1^-4,-2-6*K.1+6*K.1^2+6*K.1^-4,-2+6*K.1-6*K.1^2+6*K.1^4,-5,1,-5,4,4,1-3*K.1+3*K.1^2+3*K.1^-4,1+3*K.1-3*K.1^2+3*K.1^4,1-3*K.1^4-3*K.1^-4,-2+5*K.1-5*K.1^2+4*K.1^4-K.1^-4,-2-K.1+K.1^2-5*K.1^4-4*K.1^-4,-2-4*K.1+4*K.1^2+K.1^4+5*K.1^-4,-2-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-2+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-2-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,4-3*K.1+3*K.1^2-3*K.1^4,4+3*K.1^4+3*K.1^-4,4+3*K.1-3*K.1^2-3*K.1^-4,-2*K.1^-3,-2*K.1^3,-2*K.1^-3,-2*K.1^3,K.1^3,K.1^-3,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-2*K.1^2+2*K.1^4-2*K.1^-4,2*K.1+2*K.1^-4,2*K.1^-2+2*K.1^-1,2*K.1+2*K.1^2,-2*K.1-2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^4,-1*K.1-K.1^2,-1*K.1^-2-K.1^-1,-1*K.1^2-K.1^4,K.1+K.1^4-K.1^-4,K.1^2-K.1^4+K.1^-4,-1*K.1-K.1^-4,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |64,0,0,0,0,0,-8,-8,-8,10,4*K.1^3,4*K.1^-3,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-8,-8-16*K.1+16*K.1^2-8*K.1^4+8*K.1^-4,-8+8*K.1-8*K.1^2+16*K.1^4+8*K.1^-4,-8+8*K.1-8*K.1^2-8*K.1^4-16*K.1^-4,4-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,4-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,4+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,4,4+8*K.1-8*K.1^2+4*K.1^4-4*K.1^-4,4-4*K.1+4*K.1^2-8*K.1^4-4*K.1^-4,4-4*K.1+4*K.1^2+4*K.1^4+8*K.1^-4,4+12*K.1^4+12*K.1^-4,4+12*K.1-12*K.1^2-12*K.1^-4,4-12*K.1+12*K.1^2-12*K.1^4,-5+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-5+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-5-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-14,4,-8+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-8-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-8+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-2,-2,-2,10+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,10-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,10+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,4-6*K.1^4-6*K.1^-4,4-6*K.1+6*K.1^2+6*K.1^-4,4+6*K.1-6*K.1^2+6*K.1^4,-2-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-2+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-2+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-2+6*K.1^4+6*K.1^-4,-2+6*K.1-6*K.1^2-6*K.1^-4,-2-6*K.1+6*K.1^2-6*K.1^4,4-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,4+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,4+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-2-6*K.1^4-6*K.1^-4,-2-6*K.1+6*K.1^2+6*K.1^-4,-2+6*K.1-6*K.1^2+6*K.1^4,-5,1,-5,4,4,1-3*K.1+3*K.1^2+3*K.1^-4,1+3*K.1-3*K.1^2+3*K.1^4,1-3*K.1^4-3*K.1^-4,-2+5*K.1-5*K.1^2+4*K.1^4-K.1^-4,-2-K.1+K.1^2-5*K.1^4-4*K.1^-4,-2-4*K.1+4*K.1^2+K.1^4+5*K.1^-4,-2-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-2+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-2-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,4-3*K.1+3*K.1^2-3*K.1^4,4+3*K.1^4+3*K.1^-4,4+3*K.1-3*K.1^2-3*K.1^-4,-2*K.1^3,-2*K.1^-3,-2*K.1^3,-2*K.1^-3,K.1^-3,K.1^3,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,2*K.1+2*K.1^-4,-2*K.1^2+2*K.1^4-2*K.1^-4,2*K.1+2*K.1^2,2*K.1^-2+2*K.1^-1,2*K.1^2+2*K.1^4,-2*K.1-2*K.1^4+2*K.1^-4,-1*K.1^-2-K.1^-1,-1*K.1-K.1^2,K.1+K.1^4-K.1^-4,-1*K.1^2-K.1^4,-1*K.1-K.1^-4,K.1^2-K.1^4+K.1^-4,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |64,0,0,0,0,0,-8,-8,-8,10,4*K.1^-3,4*K.1^3,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-8,-8+8*K.1-8*K.1^2-8*K.1^4-16*K.1^-4,-8-16*K.1+16*K.1^2-8*K.1^4+8*K.1^-4,-8+8*K.1-8*K.1^2+16*K.1^4+8*K.1^-4,4+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,4-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,4-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,4,4-4*K.1+4*K.1^2+4*K.1^4+8*K.1^-4,4+8*K.1-8*K.1^2+4*K.1^4-4*K.1^-4,4-4*K.1+4*K.1^2-8*K.1^4-4*K.1^-4,4-12*K.1+12*K.1^2-12*K.1^4,4+12*K.1^4+12*K.1^-4,4+12*K.1-12*K.1^2-12*K.1^-4,-5-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-5+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-5+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-14,4,-8+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-8+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-8-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-2,-2,-2,10+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,10+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,10-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,4+6*K.1-6*K.1^2+6*K.1^4,4-6*K.1^4-6*K.1^-4,4-6*K.1+6*K.1^2+6*K.1^-4,-2+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-2-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-2+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-2-6*K.1+6*K.1^2-6*K.1^4,-2+6*K.1^4+6*K.1^-4,-2+6*K.1-6*K.1^2-6*K.1^-4,4+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,4-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,4+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-2+6*K.1-6*K.1^2+6*K.1^4,-2-6*K.1^4-6*K.1^-4,-2-6*K.1+6*K.1^2+6*K.1^-4,-5,1,-5,4,4,1-3*K.1^4-3*K.1^-4,1-3*K.1+3*K.1^2+3*K.1^-4,1+3*K.1-3*K.1^2+3*K.1^4,-2-4*K.1+4*K.1^2+K.1^4+5*K.1^-4,-2+5*K.1-5*K.1^2+4*K.1^4-K.1^-4,-2-K.1+K.1^2-5*K.1^4-4*K.1^-4,-2-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-2-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-2+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,4+3*K.1-3*K.1^2-3*K.1^-4,4-3*K.1+3*K.1^2-3*K.1^4,4+3*K.1^4+3*K.1^-4,-2*K.1^-3,-2*K.1^3,-2*K.1^-3,-2*K.1^3,K.1^3,K.1^-3,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-2*K.1-2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^4,2*K.1+2*K.1^-4,-2*K.1^2+2*K.1^4-2*K.1^-4,2*K.1+2*K.1^2,2*K.1^-2+2*K.1^-1,K.1^2-K.1^4+K.1^-4,-1*K.1-K.1^-4,-1*K.1^-2-K.1^-1,-1*K.1-K.1^2,K.1+K.1^4-K.1^-4,-1*K.1^2-K.1^4,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |64,0,0,0,0,0,-8,-8,-8,10,4*K.1^3,4*K.1^-3,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-8,-8+8*K.1-8*K.1^2-8*K.1^4-16*K.1^-4,-8-16*K.1+16*K.1^2-8*K.1^4+8*K.1^-4,-8+8*K.1-8*K.1^2+16*K.1^4+8*K.1^-4,4+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,4-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,4-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,4,4-4*K.1+4*K.1^2+4*K.1^4+8*K.1^-4,4+8*K.1-8*K.1^2+4*K.1^4-4*K.1^-4,4-4*K.1+4*K.1^2-8*K.1^4-4*K.1^-4,4-12*K.1+12*K.1^2-12*K.1^4,4+12*K.1^4+12*K.1^-4,4+12*K.1-12*K.1^2-12*K.1^-4,-5-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-5+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-5+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-14,4,-8+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-8+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-8-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-2,-2,-2,10+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,10+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,10-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,4+6*K.1-6*K.1^2+6*K.1^4,4-6*K.1^4-6*K.1^-4,4-6*K.1+6*K.1^2+6*K.1^-4,-2+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-2-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-2+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-2-6*K.1+6*K.1^2-6*K.1^4,-2+6*K.1^4+6*K.1^-4,-2+6*K.1-6*K.1^2-6*K.1^-4,4+2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,4-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,4+2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-2+6*K.1-6*K.1^2+6*K.1^4,-2-6*K.1^4-6*K.1^-4,-2-6*K.1+6*K.1^2+6*K.1^-4,-5,1,-5,4,4,1-3*K.1^4-3*K.1^-4,1-3*K.1+3*K.1^2+3*K.1^-4,1+3*K.1-3*K.1^2+3*K.1^4,-2-4*K.1+4*K.1^2+K.1^4+5*K.1^-4,-2+5*K.1-5*K.1^2+4*K.1^4-K.1^-4,-2-K.1+K.1^2-5*K.1^4-4*K.1^-4,-2-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-2-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-2+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,4+3*K.1-3*K.1^2-3*K.1^-4,4-3*K.1+3*K.1^2-3*K.1^4,4+3*K.1^4+3*K.1^-4,-2*K.1^3,-2*K.1^-3,-2*K.1^3,-2*K.1^-3,K.1^-3,K.1^3,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,2*K.1^2+2*K.1^4,-2*K.1-2*K.1^4+2*K.1^-4,-2*K.1^2+2*K.1^4-2*K.1^-4,2*K.1+2*K.1^-4,2*K.1^-2+2*K.1^-1,2*K.1+2*K.1^2,-1*K.1-K.1^-4,K.1^2-K.1^4+K.1^-4,-1*K.1-K.1^2,-1*K.1^-2-K.1^-1,-1*K.1^2-K.1^4,K.1+K.1^4-K.1^-4,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 0; x`IsIrreducible := true; x := CR!\[96, 24, 0, 0, 0, 0, -12, -12, -12, 15, 0, 0, 0, 0, -12, -3, 6, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 24, -12, -12, -12, 33, 33, 33, -12, 6, 6, 6, -12, -12, -12, -21, -21, -21, -21, -21, 15, 15, 15, -3, -3, -3, -12, -12, -12, 6, 6, 6, -3, -3, -3, 6, 6, 6, 6, 6, 6, 6, 6, 6, 15, -3, 6, -12, 6, -3, -3, -3, -3, -3, -3, -3, -3, -3, 6, 6, 6, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, -3, -3, -3, 12, 12, 12, 0, 0, 0, -6, -6, -6, 0, 0, 0, -6, -6, -6, -3, -3, 3, 3, 3, -3, -3, -3, -6, -6, -6, 6, 6, 6, 3, 3, 3, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0]; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; x := CR!\[96, 24, 0, 0, 0, 0, -12, -12, -12, 15, 0, 0, 0, 0, -12, -3, 6, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 24, 24, 24, 24, -21, -21, -21, -12, -12, -12, -12, -12, -12, -12, 6, 6, 6, -21, 33, -3, -3, -3, -3, -3, -3, -3, -3, -3, 6, 6, 6, 6, 6, 6, 6, 6, 6, -12, -12, -12, 6, 6, 6, 15, -3, -21, -12, 6, -3, -3, -3, 6, 6, 6, -3, -3, -3, 6, 6, 6, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, -3, -3, -3, -6, -6, -6, 0, 0, 0, -6, -6, -6, 0, 0, 0, 12, 12, 12, -3, -3, 3, 3, 3, -3, -3, -3, 3, 3, 3, 6, 6, 6, -6, -6, -6, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0]; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; x := CR!\[96, -24, 0, 0, 0, 0, -12, -12, -12, 15, 0, 0, 0, 0, 12, 3, -6, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 24, -12, -12, -12, 33, 33, 33, -12, 6, 6, 6, -12, -12, -12, -21, -21, -21, -21, -21, 15, 15, 15, -3, -3, -3, -12, -12, -12, 6, 6, 6, -3, -3, -3, 6, 6, 6, 6, 6, 6, 6, 6, 6, 15, -3, 6, -12, 6, -3, -3, -3, -3, -3, -3, -3, -3, -3, 6, 6, 6, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 3, 3, 3, -12, -12, -12, 0, 0, 0, 6, 6, 6, 0, 0, 0, 6, 6, 6, 3, 3, -3, -3, -3, 3, 3, 3, 6, 6, 6, -6, -6, -6, -3, -3, -3, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0]; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; x := CR!\[96, -24, 0, 0, 0, 0, -12, -12, -12, 15, 0, 0, 0, 0, 12, 3, -6, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 24, 24, 24, 24, -21, -21, -21, -12, -12, -12, -12, -12, -12, -12, 6, 6, 6, -21, 33, -3, -3, -3, -3, -3, -3, -3, -3, -3, 6, 6, 6, 6, 6, 6, 6, 6, 6, -12, -12, -12, 6, 6, 6, 15, -3, -21, -12, 6, -3, -3, -3, 6, 6, 6, -3, -3, -3, 6, 6, 6, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 3, 3, 3, 6, 6, 6, 0, 0, 0, 6, 6, 6, 0, 0, 0, -12, -12, -12, 3, 3, -3, -3, -3, 3, 3, 3, -3, -3, -3, -6, -6, -6, 6, 6, 6, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0]; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,0,0,8,0,0,-48,6,24,-12,0,0,0,0,0,0,0,0,0,-4,2,0,0,0,0,0,0,0,0,-12*K.1-12*K.1^-1,-12*K.1^2-12*K.1^-2,-12*K.1^4-12*K.1^-4,6+18*K.1-18*K.1^2-18*K.1^-4,6-18*K.1+18*K.1^2-18*K.1^4,6+18*K.1^4+18*K.1^-4,18,-12*K.1^4-12*K.1^-4,-12*K.1-12*K.1^-1,-12*K.1^2-12*K.1^-2,0,0,0,-3+9*K.1-9*K.1^2+9*K.1^4,-3-9*K.1^4-9*K.1^-4,-3-9*K.1+9*K.1^2+9*K.1^-4,6,6,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,6-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,6+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,-12+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,-12+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,-12-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,0,0,0,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,9,9,9,-9,0,-3,-9,-3,0,0,0,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-2-2*K.1+2*K.1^2-2*K.1^4,-2+2*K.1-2*K.1^2-2*K.1^-4,-2+2*K.1^4+2*K.1^-4,0,0,0,0,0,0,-2*K.1-2*K.1^-1,-2*K.1^4-2*K.1^-4,-2*K.1^2-2*K.1^-2,K.1^2+K.1^-2,K.1+K.1^-1,K.1^4+K.1^-4,1+2*K.1^4+2*K.1^-4,1-2*K.1+2*K.1^2-2*K.1^4,1+2*K.1-2*K.1^2-2*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,0,0,8,0,0,-48,6,24,-12,0,0,0,0,0,0,0,0,0,-4,2,0,0,0,0,0,0,0,0,-12*K.1^2-12*K.1^-2,-12*K.1^4-12*K.1^-4,-12*K.1-12*K.1^-1,6-18*K.1+18*K.1^2-18*K.1^4,6+18*K.1^4+18*K.1^-4,6+18*K.1-18*K.1^2-18*K.1^-4,18,-12*K.1-12*K.1^-1,-12*K.1^2-12*K.1^-2,-12*K.1^4-12*K.1^-4,0,0,0,-3-9*K.1^4-9*K.1^-4,-3-9*K.1+9*K.1^2+9*K.1^-4,-3+9*K.1-9*K.1^2+9*K.1^4,6,6,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,6+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,-12+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,-12-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,-12+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,0,0,0,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,9,9,9,-9,0,-3,-9,-3,0,0,0,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-2+2*K.1^4+2*K.1^-4,-2-2*K.1+2*K.1^2-2*K.1^4,-2+2*K.1-2*K.1^2-2*K.1^-4,0,0,0,0,0,0,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1^4-2*K.1^-4,K.1^4+K.1^-4,K.1^2+K.1^-2,K.1+K.1^-1,1+2*K.1-2*K.1^2-2*K.1^-4,1+2*K.1^4+2*K.1^-4,1-2*K.1+2*K.1^2-2*K.1^4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,0,0,8,0,0,-48,6,24,-12,0,0,0,0,0,0,0,0,0,-4,2,0,0,0,0,0,0,0,0,-12*K.1^4-12*K.1^-4,-12*K.1-12*K.1^-1,-12*K.1^2-12*K.1^-2,6+18*K.1^4+18*K.1^-4,6+18*K.1-18*K.1^2-18*K.1^-4,6-18*K.1+18*K.1^2-18*K.1^4,18,-12*K.1^2-12*K.1^-2,-12*K.1^4-12*K.1^-4,-12*K.1-12*K.1^-1,0,0,0,-3-9*K.1+9*K.1^2+9*K.1^-4,-3+9*K.1-9*K.1^2+9*K.1^4,-3-9*K.1^4-9*K.1^-4,6,6,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,6-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,6+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,-12-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,-12+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,-12+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,0,0,0,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,9,9,9,-9,0,-3,-9,-3,0,0,0,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-2+2*K.1-2*K.1^2-2*K.1^-4,-2+2*K.1^4+2*K.1^-4,-2-2*K.1+2*K.1^2-2*K.1^4,0,0,0,0,0,0,-2*K.1^4-2*K.1^-4,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,K.1+K.1^-1,K.1^4+K.1^-4,K.1^2+K.1^-2,1-2*K.1+2*K.1^2-2*K.1^4,1+2*K.1-2*K.1^2-2*K.1^-4,1+2*K.1^4+2*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,0,0,8,0,0,24,24,-12,-12,0,0,0,0,0,0,0,0,0,2,-4,0,0,0,0,0,0,0,-24,12+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,12+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,12-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,6+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,12,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-12*K.1^2-12*K.1^-2,-12*K.1^4-12*K.1^-4,-12*K.1-12*K.1^-1,6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,6,-12,-6+10*K.1-10*K.1^2+14*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2-10*K.1^4-14*K.1^-4,-6-14*K.1+14*K.1^2-4*K.1^4+10*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,-6-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,0,0,0,6-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,6-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,6+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,6-12*K.1+12*K.1^2-12*K.1^4,6+12*K.1^4+12*K.1^-4,6+12*K.1-12*K.1^2-12*K.1^-4,9+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,9+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,9-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,3,-6,-12,3,6,-3+3*K.1-3*K.1^2-3*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,-3+3*K.1^4+3*K.1^-4,-3+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-3-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,-3-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-2*K.1-2*K.1^-1,-2*K.1^4-2*K.1^-4,-2*K.1^2-2*K.1^-2,0,0,0,0,0,0,-2+2*K.1-2*K.1^2-2*K.1^-4,-2+2*K.1^4+2*K.1^-4,-2-2*K.1+2*K.1^2-2*K.1^4,1-2*K.1+2*K.1^2-2*K.1^4,1+2*K.1-2*K.1^2-2*K.1^-4,1+2*K.1^4+2*K.1^-4,K.1^2+K.1^-2,K.1+K.1^-1,K.1^4+K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,0,0,8,0,0,24,24,-12,-12,0,0,0,0,0,0,0,0,0,2,-4,0,0,0,0,0,0,0,-24,12-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,12+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,12+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,6-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,6+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,12,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-12*K.1-12*K.1^-1,-12*K.1^2-12*K.1^-2,-12*K.1^4-12*K.1^-4,6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,6,-12,-6-14*K.1+14*K.1^2-4*K.1^4+10*K.1^-4,-6+10*K.1-10*K.1^2+14*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2-10*K.1^4-14*K.1^-4,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,-6+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-6-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,0,0,0,6+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,6-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,6-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,6+12*K.1-12*K.1^2-12*K.1^-4,6-12*K.1+12*K.1^2-12*K.1^4,6+12*K.1^4+12*K.1^-4,9-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,9+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,9+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,3,-6,-12,3,6,-3+3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,-3-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-3+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-3-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-2*K.1^4-2*K.1^-4,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,0,0,0,0,0,0,-2+2*K.1^4+2*K.1^-4,-2-2*K.1+2*K.1^2-2*K.1^4,-2+2*K.1-2*K.1^2-2*K.1^-4,1+2*K.1-2*K.1^2-2*K.1^-4,1+2*K.1^4+2*K.1^-4,1-2*K.1+2*K.1^2-2*K.1^4,K.1+K.1^-1,K.1^4+K.1^-4,K.1^2+K.1^-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,0,0,8,0,0,24,24,-12,-12,0,0,0,0,0,0,0,0,0,2,-4,0,0,0,0,0,0,0,-24,12+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,12-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,12+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,6-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,6+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,12,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-12*K.1^4-12*K.1^-4,-12*K.1-12*K.1^-1,-12*K.1^2-12*K.1^-2,6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,6,-12,-6+4*K.1-4*K.1^2-10*K.1^4-14*K.1^-4,-6-14*K.1+14*K.1^2-4*K.1^4+10*K.1^-4,-6+10*K.1-10*K.1^2+14*K.1^4+4*K.1^-4,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,-6+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-6-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,0,0,0,6-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,6+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,6-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,6+12*K.1^4+12*K.1^-4,6+12*K.1-12*K.1^2-12*K.1^-4,6-12*K.1+12*K.1^2-12*K.1^4,9+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,9-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,9+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,3,-6,-12,3,6,-3-3*K.1+3*K.1^2-3*K.1^4,-3+3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^-4,-3-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,-3-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-3+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-2*K.1^2-2*K.1^-2,-2*K.1-2*K.1^-1,-2*K.1^4-2*K.1^-4,0,0,0,0,0,0,-2-2*K.1+2*K.1^2-2*K.1^4,-2+2*K.1-2*K.1^2-2*K.1^-4,-2+2*K.1^4+2*K.1^-4,1+2*K.1^4+2*K.1^-4,1-2*K.1+2*K.1^2-2*K.1^4,1+2*K.1-2*K.1^2-2*K.1^-4,K.1^4+K.1^-4,K.1^2+K.1^-2,K.1+K.1^-1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,24,0,0,0,0,-12,-12,-12,15,0,0,0,0,-12,-3,6,0,0,0,0,0,0,0,0,0,0,0,24,-12*K.1-12*K.1^-1,-12*K.1^2-12*K.1^-2,-12*K.1^4-12*K.1^-4,-3-9*K.1+9*K.1^2+9*K.1^4+18*K.1^-4,-3+18*K.1-18*K.1^2+9*K.1^4-9*K.1^-4,-3-9*K.1+9*K.1^2-18*K.1^4-9*K.1^-4,-12,-12*K.1^2-12*K.1^-2,-12*K.1^4-12*K.1^-4,-12*K.1-12*K.1^-1,-12-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,-12-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,-12+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,-3,-3,-3,-3,-3,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-9*K.1+9*K.1^2-3*K.1^4+6*K.1^-4,6*K.1-6*K.1^2+9*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-6*K.1^4-9*K.1^-4,6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,6+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,-12,-3,-3,15,-3,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,0,0,0,0,0,0,0,-4*K.1+4*K.1^2+4*K.1^4+8*K.1^-4,-4*K.1+4*K.1^2-8*K.1^4-4*K.1^-4,8*K.1-8*K.1^2+4*K.1^4-4*K.1^-4,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,-3,-3,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,6+3*K.1-3*K.1^2+3*K.1^4,6-3*K.1+3*K.1^2+3*K.1^-4,6-3*K.1^4-3*K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^-4,-3+3*K.1^4+3*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,24,0,0,0,0,-12,-12,-12,15,0,0,0,0,-12,-3,6,0,0,0,0,0,0,0,0,0,0,0,24,-12*K.1^2-12*K.1^-2,-12*K.1^4-12*K.1^-4,-12*K.1-12*K.1^-1,-3+18*K.1-18*K.1^2+9*K.1^4-9*K.1^-4,-3-9*K.1+9*K.1^2-18*K.1^4-9*K.1^-4,-3-9*K.1+9*K.1^2+9*K.1^4+18*K.1^-4,-12,-12*K.1^4-12*K.1^-4,-12*K.1-12*K.1^-1,-12*K.1^2-12*K.1^-2,-12-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,-12+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,-12-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,-3,-3,-3,-3,-3,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6*K.1-6*K.1^2+9*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-6*K.1^4-9*K.1^-4,-9*K.1+9*K.1^2-3*K.1^4+6*K.1^-4,6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,6-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,6+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,-12,-3,-3,15,-3,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,0,0,0,0,0,0,0,8*K.1-8*K.1^2+4*K.1^4-4*K.1^-4,-4*K.1+4*K.1^2+4*K.1^4+8*K.1^-4,-4*K.1+4*K.1^2-8*K.1^4-4*K.1^-4,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-3,-3,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,6-3*K.1^4-3*K.1^-4,6+3*K.1-3*K.1^2+3*K.1^4,6-3*K.1+3*K.1^2+3*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,-3+3*K.1-3*K.1^2-3*K.1^-4,-3+3*K.1^4+3*K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,24,0,0,0,0,-12,-12,-12,15,0,0,0,0,-12,-3,6,0,0,0,0,0,0,0,0,0,0,0,24,-12*K.1^4-12*K.1^-4,-12*K.1-12*K.1^-1,-12*K.1^2-12*K.1^-2,-3-9*K.1+9*K.1^2-18*K.1^4-9*K.1^-4,-3-9*K.1+9*K.1^2+9*K.1^4+18*K.1^-4,-3+18*K.1-18*K.1^2+9*K.1^4-9*K.1^-4,-12,-12*K.1-12*K.1^-1,-12*K.1^2-12*K.1^-2,-12*K.1^4-12*K.1^-4,-12+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,-12-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,-12-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,-3,-3,-3,-3,-3,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,3*K.1-3*K.1^2-6*K.1^4-9*K.1^-4,-9*K.1+9*K.1^2-3*K.1^4+6*K.1^-4,6*K.1-6*K.1^2+9*K.1^4+3*K.1^-4,6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,6-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,6+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,-12,-3,-3,15,-3,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,0,0,0,0,0,0,0,-4*K.1+4*K.1^2-8*K.1^4-4*K.1^-4,8*K.1-8*K.1^2+4*K.1^4-4*K.1^-4,-4*K.1+4*K.1^2+4*K.1^4+8*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-3,-3,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,6-3*K.1+3*K.1^2+3*K.1^-4,6-3*K.1^4-3*K.1^-4,6+3*K.1-3*K.1^2+3*K.1^4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,-3+3*K.1^4+3*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,-3+3*K.1-3*K.1^2-3*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,24,0,0,0,0,-12,-12,-12,15,0,0,0,0,-12,-3,6,0,0,0,0,0,0,0,0,0,0,0,24,12*K.1-12*K.1^2+24*K.1^4+12*K.1^-4,12*K.1-12*K.1^2-12*K.1^4-24*K.1^-4,-24*K.1+24*K.1^2-12*K.1^4+12*K.1^-4,6-9*K.1^4-9*K.1^-4,6-9*K.1+9*K.1^2+9*K.1^-4,6+9*K.1-9*K.1^2+9*K.1^4,24,0,0,0,-12-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,-12+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,-12+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,6+9*K.1-9*K.1^2+9*K.1^4,6-9*K.1^4-9*K.1^-4,6-9*K.1+9*K.1^2+9*K.1^-4,6,6,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3-9*K.1^4-9*K.1^-4,-3-9*K.1+9*K.1^2+9*K.1^-4,-3+9*K.1-9*K.1^2+9*K.1^4,-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,0,0,0,-12+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,-12+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,-12-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,-3,-3,6,-3,6,6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3,-3,-3,0,0,0,0,0,0,0,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,6,6,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-3+3*K.1^4+3*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,-3+3*K.1-3*K.1^2-3*K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-3+3*K.1-3*K.1^2+3*K.1^4,-3-3*K.1+3*K.1^2+3*K.1^-4,-3-3*K.1^4-3*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,24,0,0,0,0,-12,-12,-12,15,0,0,0,0,-12,-3,6,0,0,0,0,0,0,0,0,0,0,0,24,-24*K.1+24*K.1^2-12*K.1^4+12*K.1^-4,12*K.1-12*K.1^2+24*K.1^4+12*K.1^-4,12*K.1-12*K.1^2-12*K.1^4-24*K.1^-4,6+9*K.1-9*K.1^2+9*K.1^4,6-9*K.1^4-9*K.1^-4,6-9*K.1+9*K.1^2+9*K.1^-4,24,0,0,0,-12+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,-12-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,-12+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,6-9*K.1+9*K.1^2+9*K.1^-4,6+9*K.1-9*K.1^2+9*K.1^4,6-9*K.1^4-9*K.1^-4,6,6,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3+9*K.1-9*K.1^2+9*K.1^4,-3-9*K.1^4-9*K.1^-4,-3-9*K.1+9*K.1^2+9*K.1^-4,-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,0,0,0,-12-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,-12+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,-12+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,-3,-3,6,-3,6,6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3,-3,-3,0,0,0,0,0,0,0,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,6,6,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,-3+3*K.1-3*K.1^2-3*K.1^-4,-3+3*K.1^4+3*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-3-3*K.1+3*K.1^2+3*K.1^-4,-3-3*K.1^4-3*K.1^-4,-3+3*K.1-3*K.1^2+3*K.1^4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,24,0,0,0,0,-12,-12,-12,15,0,0,0,0,-12,-3,6,0,0,0,0,0,0,0,0,0,0,0,24,12*K.1-12*K.1^2-12*K.1^4-24*K.1^-4,-24*K.1+24*K.1^2-12*K.1^4+12*K.1^-4,12*K.1-12*K.1^2+24*K.1^4+12*K.1^-4,6-9*K.1+9*K.1^2+9*K.1^-4,6+9*K.1-9*K.1^2+9*K.1^4,6-9*K.1^4-9*K.1^-4,24,0,0,0,-12+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,-12+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,-12-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,6-9*K.1^4-9*K.1^-4,6-9*K.1+9*K.1^2+9*K.1^-4,6+9*K.1-9*K.1^2+9*K.1^4,6,6,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3-9*K.1+9*K.1^2+9*K.1^-4,-3+9*K.1-9*K.1^2+9*K.1^4,-3-9*K.1^4-9*K.1^-4,6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,0,0,0,-12+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,-12-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,-12+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,-3,-3,6,-3,6,6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3,-3,-3,0,0,0,0,0,0,0,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,6,6,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^-4,-3+3*K.1^4+3*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,-3-3*K.1^4-3*K.1^-4,-3+3*K.1-3*K.1^2+3*K.1^4,-3-3*K.1+3*K.1^2+3*K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,24,0,0,0,0,24,24,-12,-12,0,0,0,0,0,6,-6,0,0,0,0,0,0,0,0,0,0,0,12,-12+4*K.1-4*K.1^2+20*K.1^4+16*K.1^-4,-12+16*K.1-16*K.1^2-4*K.1^4-20*K.1^-4,-12-20*K.1+20*K.1^2-16*K.1^4+4*K.1^-4,-12+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-12-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-12+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,12,-6+10*K.1-10*K.1^2+14*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2-10*K.1^4-14*K.1^-4,-6-14*K.1+14*K.1^2-4*K.1^4+10*K.1^-4,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,-12+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-12+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-12-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,15,-3,6-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,6+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,6-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,6+7*K.1-7*K.1^2+11*K.1^4+4*K.1^-4,6+4*K.1-4*K.1^2-7*K.1^4-11*K.1^-4,6-11*K.1+11*K.1^2-4*K.1^4+7*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,K.1-K.1^2-4*K.1^4-5*K.1^-4,-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,4*K.1-4*K.1^2+5*K.1^4+K.1^-4,-3+6*K.1-6*K.1^2+6*K.1^4,-3-6*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2+6*K.1^-4,-6+10*K.1-10*K.1^2+14*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2-10*K.1^4-14*K.1^-4,-6-14*K.1+14*K.1^2-4*K.1^4+10*K.1^-4,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,3,3,-3,3,15,-3-6*K.1+6*K.1^2+6*K.1^-4,-3+6*K.1-6*K.1^2+6*K.1^4,-3-6*K.1^4-6*K.1^-4,4*K.1-4*K.1^2+5*K.1^4+K.1^-4,K.1-K.1^2-4*K.1^4-5*K.1^-4,-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,0,0,0,0,0,0,0,0,0,0,-4+8*K.1^4+8*K.1^-4,-4-8*K.1+8*K.1^2-8*K.1^4,-4+8*K.1-8*K.1^2-8*K.1^-4,-6-3*K.1+3*K.1^2+3*K.1^-4,-6-3*K.1^4-3*K.1^-4,-6+3*K.1-3*K.1^2+3*K.1^4,-2-2*K.1^4-2*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,-2-2*K.1+2*K.1^2+2*K.1^-4,2+2*K.1^4+2*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,2+2*K.1-2*K.1^2-2*K.1^-4,4-6*K.1+6*K.1^2-2*K.1^4+4*K.1^-4,4+2*K.1-2*K.1^2-4*K.1^4-6*K.1^-4,4+4*K.1-4*K.1^2+6*K.1^4+2*K.1^-4,2+2*K.1^4+2*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,2+2*K.1-2*K.1^2-2*K.1^-4,-2-2*K.1+2*K.1^2+2*K.1^-4,-2-2*K.1^4-2*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,3,3,4-2*K.1^4-2*K.1^-4,4+2*K.1-2*K.1^2+2*K.1^4,4-2*K.1+2*K.1^2+2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,-2-3*K.1+3*K.1^2-2*K.1^4+K.1^-4,-2+2*K.1-2*K.1^2-K.1^4-3*K.1^-4,-2+K.1-K.1^2+3*K.1^4+2*K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-2+2*K.1-2*K.1^2-K.1^4-3*K.1^-4,-2+K.1-K.1^2+3*K.1^4+2*K.1^-4,-2-3*K.1+3*K.1^2-2*K.1^4+K.1^-4,-1-4*K.1+4*K.1^2+4*K.1^-4,-1-4*K.1^4-4*K.1^-4,-1+4*K.1-4*K.1^2+4*K.1^4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,24,0,0,0,0,24,24,-12,-12,0,0,0,0,0,6,-6,0,0,0,0,0,0,0,0,0,0,0,12,-12-20*K.1+20*K.1^2-16*K.1^4+4*K.1^-4,-12+4*K.1-4*K.1^2+20*K.1^4+16*K.1^-4,-12+16*K.1-16*K.1^2-4*K.1^4-20*K.1^-4,-12+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-12+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-12-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,12,-6-14*K.1+14*K.1^2-4*K.1^4+10*K.1^-4,-6+10*K.1-10*K.1^2+14*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2-10*K.1^4-14*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,-12-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-12+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-12+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,15,-3,6-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,6-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,6+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,6-11*K.1+11*K.1^2-4*K.1^4+7*K.1^-4,6+7*K.1-7*K.1^2+11*K.1^4+4*K.1^-4,6+4*K.1-4*K.1^2-7*K.1^4-11*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,4*K.1-4*K.1^2+5*K.1^4+K.1^-4,K.1-K.1^2-4*K.1^4-5*K.1^-4,-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,-3-6*K.1+6*K.1^2+6*K.1^-4,-3+6*K.1-6*K.1^2+6*K.1^4,-3-6*K.1^4-6*K.1^-4,-6-14*K.1+14*K.1^2-4*K.1^4+10*K.1^-4,-6+10*K.1-10*K.1^2+14*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2-10*K.1^4-14*K.1^-4,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,3,3,-3,3,15,-3-6*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2+6*K.1^-4,-3+6*K.1-6*K.1^2+6*K.1^4,-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,4*K.1-4*K.1^2+5*K.1^4+K.1^-4,K.1-K.1^2-4*K.1^4-5*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,0,0,0,0,0,0,0,0,0,0,-4-8*K.1+8*K.1^2-8*K.1^4,-4+8*K.1-8*K.1^2-8*K.1^-4,-4+8*K.1^4+8*K.1^-4,-6-3*K.1^4-3*K.1^-4,-6+3*K.1-3*K.1^2+3*K.1^4,-6-3*K.1+3*K.1^2+3*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,-2-2*K.1+2*K.1^2+2*K.1^-4,-2-2*K.1^4-2*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,2+2*K.1-2*K.1^2-2*K.1^-4,2+2*K.1^4+2*K.1^-4,4+2*K.1-2*K.1^2-4*K.1^4-6*K.1^-4,4+4*K.1-4*K.1^2+6*K.1^4+2*K.1^-4,4-6*K.1+6*K.1^2-2*K.1^4+4*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,2+2*K.1-2*K.1^2-2*K.1^-4,2+2*K.1^4+2*K.1^-4,-2-2*K.1^4-2*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,-2-2*K.1+2*K.1^2+2*K.1^-4,3,3,4+2*K.1-2*K.1^2+2*K.1^4,4-2*K.1+2*K.1^2+2*K.1^-4,4-2*K.1^4-2*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2+2*K.1-2*K.1^2-K.1^4-3*K.1^-4,-2+K.1-K.1^2+3*K.1^4+2*K.1^-4,-2-3*K.1+3*K.1^2-2*K.1^4+K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-2+K.1-K.1^2+3*K.1^4+2*K.1^-4,-2-3*K.1+3*K.1^2-2*K.1^4+K.1^-4,-2+2*K.1-2*K.1^2-K.1^4-3*K.1^-4,-1-4*K.1^4-4*K.1^-4,-1+4*K.1-4*K.1^2+4*K.1^4,-1-4*K.1+4*K.1^2+4*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,24,0,0,0,0,24,24,-12,-12,0,0,0,0,0,6,-6,0,0,0,0,0,0,0,0,0,0,0,12,-12+16*K.1-16*K.1^2-4*K.1^4-20*K.1^-4,-12-20*K.1+20*K.1^2-16*K.1^4+4*K.1^-4,-12+4*K.1-4*K.1^2+20*K.1^4+16*K.1^-4,-12-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-12+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-12+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,12,-6+4*K.1-4*K.1^2-10*K.1^4-14*K.1^-4,-6-14*K.1+14*K.1^2-4*K.1^4+10*K.1^-4,-6+10*K.1-10*K.1^2+14*K.1^4+4*K.1^-4,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,-12+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-12-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-12+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,15,-3,6+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,6-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,6-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,6+4*K.1-4*K.1^2-7*K.1^4-11*K.1^-4,6-11*K.1+11*K.1^2-4*K.1^4+7*K.1^-4,6+7*K.1-7*K.1^2+11*K.1^4+4*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,4*K.1-4*K.1^2+5*K.1^4+K.1^-4,K.1-K.1^2-4*K.1^4-5*K.1^-4,-3-6*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2+6*K.1^-4,-3+6*K.1-6*K.1^2+6*K.1^4,-6+4*K.1-4*K.1^2-10*K.1^4-14*K.1^-4,-6-14*K.1+14*K.1^2-4*K.1^4+10*K.1^-4,-6+10*K.1-10*K.1^2+14*K.1^4+4*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,3,3,-3,3,15,-3+6*K.1-6*K.1^2+6*K.1^4,-3-6*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2+6*K.1^-4,K.1-K.1^2-4*K.1^4-5*K.1^-4,-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,4*K.1-4*K.1^2+5*K.1^4+K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,0,0,0,0,0,0,0,0,0,0,-4+8*K.1-8*K.1^2-8*K.1^-4,-4+8*K.1^4+8*K.1^-4,-4-8*K.1+8*K.1^2-8*K.1^4,-6+3*K.1-3*K.1^2+3*K.1^4,-6-3*K.1+3*K.1^2+3*K.1^-4,-6-3*K.1^4-3*K.1^-4,-2-2*K.1+2*K.1^2+2*K.1^-4,-2-2*K.1^4-2*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,2+2*K.1-2*K.1^2-2*K.1^-4,2+2*K.1^4+2*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,4+4*K.1-4*K.1^2+6*K.1^4+2*K.1^-4,4-6*K.1+6*K.1^2-2*K.1^4+4*K.1^-4,4+2*K.1-2*K.1^2-4*K.1^4-6*K.1^-4,2+2*K.1-2*K.1^2-2*K.1^-4,2+2*K.1^4+2*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,-2+2*K.1-2*K.1^2+2*K.1^4,-2-2*K.1+2*K.1^2+2*K.1^-4,-2-2*K.1^4-2*K.1^-4,3,3,4-2*K.1+2*K.1^2+2*K.1^-4,4-2*K.1^4-2*K.1^-4,4+2*K.1-2*K.1^2+2*K.1^4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,-2+K.1-K.1^2+3*K.1^4+2*K.1^-4,-2-3*K.1+3*K.1^2-2*K.1^4+K.1^-4,-2+2*K.1-2*K.1^2-K.1^4-3*K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,-2-3*K.1+3*K.1^2-2*K.1^4+K.1^-4,-2+2*K.1-2*K.1^2-K.1^4-3*K.1^-4,-2+K.1-K.1^2+3*K.1^4+2*K.1^-4,-1+4*K.1-4*K.1^2+4*K.1^4,-1-4*K.1+4*K.1^2+4*K.1^-4,-1-4*K.1^4-4*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,24,0,0,0,0,24,24,-12,-12,0,0,0,0,0,6,-6,0,0,0,0,0,0,0,0,0,0,0,12,-12-20*K.1+20*K.1^2-4*K.1^4+16*K.1^-4,-12+16*K.1-16*K.1^2+20*K.1^4+4*K.1^-4,-12+4*K.1-4*K.1^2-16*K.1^4-20*K.1^-4,15-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,15+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,15+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,12,-6+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-6-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,15+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,15-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,15+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-12,-3,6+4*K.1-4*K.1^2-7*K.1^4-11*K.1^-4,6-11*K.1+11*K.1^2-4*K.1^4+7*K.1^-4,6+7*K.1-7*K.1^2+11*K.1^4+4*K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,6+4*K.1-4*K.1^2+11*K.1^4+7*K.1^-4,6+7*K.1-7*K.1^2-4*K.1^4-11*K.1^-4,6-11*K.1+11*K.1^2-7*K.1^4+4*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-3-6*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2+6*K.1^-4,-3+6*K.1-6*K.1^2+6*K.1^4,-6+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-6-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,3,3,-3,3,-12,-3+6*K.1-6*K.1^2+6*K.1^4,-3-6*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2+6*K.1^-4,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,0,0,0,0,0,0,0,0,0,0,-4-4*K.1+4*K.1^2+4*K.1^-4,-4-4*K.1^4-4*K.1^-4,-4+4*K.1-4*K.1^2+4*K.1^4,3+3*K.1-3*K.1^2+3*K.1^4,3-3*K.1+3*K.1^2+3*K.1^-4,3-3*K.1^4-3*K.1^-4,4-2*K.1+2*K.1^2+2*K.1^-4,4-2*K.1^4-2*K.1^-4,4+2*K.1-2*K.1^2+2*K.1^4,2-4*K.1+4*K.1^2-6*K.1^4-2*K.1^-4,2+6*K.1-6*K.1^2+2*K.1^4-4*K.1^-4,2-2*K.1+2*K.1^2+4*K.1^4+6*K.1^-4,-2-2*K.1+2*K.1^2+2*K.1^-4,-2-2*K.1^4-2*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,2+2*K.1-2*K.1^2+6*K.1^4+4*K.1^-4,2-6*K.1+6*K.1^2-4*K.1^4+2*K.1^-4,2+4*K.1-4*K.1^2-2*K.1^4-6*K.1^-4,-2+2*K.1-2*K.1^2-4*K.1^4-6*K.1^-4,-2+4*K.1-4*K.1^2+6*K.1^4+2*K.1^-4,-2-6*K.1+6*K.1^2-2*K.1^4+4*K.1^-4,-6,3,-2+K.1-K.1^2+3*K.1^4+2*K.1^-4,-2-3*K.1+3*K.1^2-2*K.1^4+K.1^-4,-2+2*K.1-2*K.1^2-K.1^4-3*K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,4+K.1-K.1^2+3*K.1^4+2*K.1^-4,4-3*K.1+3*K.1^2-2*K.1^4+K.1^-4,4+2*K.1-2*K.1^2-K.1^4-3*K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,-2-2*K.1^4-2*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,-2-2*K.1+2*K.1^2+2*K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,-1+2*K.1-2*K.1^2-2*K.1^-4,-1+2*K.1^4+2*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,24,0,0,0,0,24,24,-12,-12,0,0,0,0,0,6,-6,0,0,0,0,0,0,0,0,0,0,0,12,-12+16*K.1-16*K.1^2+20*K.1^4+4*K.1^-4,-12+4*K.1-4*K.1^2-16*K.1^4-20*K.1^-4,-12-20*K.1+20*K.1^2-4*K.1^4+16*K.1^-4,15+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,15+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,15-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,12,-6+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-6-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,15-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,15+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,15+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-12,-3,6-11*K.1+11*K.1^2-4*K.1^4+7*K.1^-4,6+7*K.1-7*K.1^2+11*K.1^4+4*K.1^-4,6+4*K.1-4*K.1^2-7*K.1^4-11*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,6+7*K.1-7*K.1^2-4*K.1^4-11*K.1^-4,6-11*K.1+11*K.1^2-7*K.1^4+4*K.1^-4,6+4*K.1-4*K.1^2+11*K.1^4+7*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-3-6*K.1+6*K.1^2+6*K.1^-4,-3+6*K.1-6*K.1^2+6*K.1^4,-3-6*K.1^4-6*K.1^-4,-6+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-6-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,3,3,-3,3,-12,-3-6*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2+6*K.1^-4,-3+6*K.1-6*K.1^2+6*K.1^4,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,0,0,0,0,0,0,0,0,0,0,-4+4*K.1-4*K.1^2+4*K.1^4,-4-4*K.1+4*K.1^2+4*K.1^-4,-4-4*K.1^4-4*K.1^-4,3-3*K.1^4-3*K.1^-4,3+3*K.1-3*K.1^2+3*K.1^4,3-3*K.1+3*K.1^2+3*K.1^-4,4+2*K.1-2*K.1^2+2*K.1^4,4-2*K.1+2*K.1^2+2*K.1^-4,4-2*K.1^4-2*K.1^-4,2-2*K.1+2*K.1^2+4*K.1^4+6*K.1^-4,2-4*K.1+4*K.1^2-6*K.1^4-2*K.1^-4,2+6*K.1-6*K.1^2+2*K.1^4-4*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,-2-2*K.1+2*K.1^2+2*K.1^-4,-2-2*K.1^4-2*K.1^-4,2+4*K.1-4*K.1^2-2*K.1^4-6*K.1^-4,2+2*K.1-2*K.1^2+6*K.1^4+4*K.1^-4,2-6*K.1+6*K.1^2-4*K.1^4+2*K.1^-4,-2-6*K.1+6*K.1^2-2*K.1^4+4*K.1^-4,-2+2*K.1-2*K.1^2-4*K.1^4-6*K.1^-4,-2+4*K.1-4*K.1^2+6*K.1^4+2*K.1^-4,-6,3,-2+2*K.1-2*K.1^2-K.1^4-3*K.1^-4,-2+K.1-K.1^2+3*K.1^4+2*K.1^-4,-2-3*K.1+3*K.1^2-2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,4+2*K.1-2*K.1^2-K.1^4-3*K.1^-4,4+K.1-K.1^2+3*K.1^4+2*K.1^-4,4-3*K.1+3*K.1^2-2*K.1^4+K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-2-2*K.1+2*K.1^2+2*K.1^-4,-2-2*K.1^4-2*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,-1+2*K.1^4+2*K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,-1+2*K.1-2*K.1^2-2*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,24,0,0,0,0,24,24,-12,-12,0,0,0,0,0,6,-6,0,0,0,0,0,0,0,0,0,0,0,12,-12+4*K.1-4*K.1^2-16*K.1^4-20*K.1^-4,-12-20*K.1+20*K.1^2-4*K.1^4+16*K.1^-4,-12+16*K.1-16*K.1^2+20*K.1^4+4*K.1^-4,15+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,15-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,15+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,12,-6-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,15+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,15+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,15-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-12,-3,6+7*K.1-7*K.1^2+11*K.1^4+4*K.1^-4,6+4*K.1-4*K.1^2-7*K.1^4-11*K.1^-4,6-11*K.1+11*K.1^2-4*K.1^4+7*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,6-11*K.1+11*K.1^2-7*K.1^4+4*K.1^-4,6+4*K.1-4*K.1^2+11*K.1^4+7*K.1^-4,6+7*K.1-7*K.1^2-4*K.1^4-11*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-3+6*K.1-6*K.1^2+6*K.1^4,-3-6*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2+6*K.1^-4,-6-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,3,3,-3,3,-12,-3-6*K.1+6*K.1^2+6*K.1^-4,-3+6*K.1-6*K.1^2+6*K.1^4,-3-6*K.1^4-6*K.1^-4,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,0,0,0,0,0,0,0,0,0,0,-4-4*K.1^4-4*K.1^-4,-4+4*K.1-4*K.1^2+4*K.1^4,-4-4*K.1+4*K.1^2+4*K.1^-4,3-3*K.1+3*K.1^2+3*K.1^-4,3-3*K.1^4-3*K.1^-4,3+3*K.1-3*K.1^2+3*K.1^4,4-2*K.1^4-2*K.1^-4,4+2*K.1-2*K.1^2+2*K.1^4,4-2*K.1+2*K.1^2+2*K.1^-4,2+6*K.1-6*K.1^2+2*K.1^4-4*K.1^-4,2-2*K.1+2*K.1^2+4*K.1^4+6*K.1^-4,2-4*K.1+4*K.1^2-6*K.1^4-2*K.1^-4,-2-2*K.1^4-2*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,-2-2*K.1+2*K.1^2+2*K.1^-4,2-6*K.1+6*K.1^2-4*K.1^4+2*K.1^-4,2+4*K.1-4*K.1^2-2*K.1^4-6*K.1^-4,2+2*K.1-2*K.1^2+6*K.1^4+4*K.1^-4,-2+4*K.1-4*K.1^2+6*K.1^4+2*K.1^-4,-2-6*K.1+6*K.1^2-2*K.1^4+4*K.1^-4,-2+2*K.1-2*K.1^2-4*K.1^4-6*K.1^-4,-6,3,-2-3*K.1+3*K.1^2-2*K.1^4+K.1^-4,-2+2*K.1-2*K.1^2-K.1^4-3*K.1^-4,-2+K.1-K.1^2+3*K.1^4+2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,4-3*K.1+3*K.1^2-2*K.1^4+K.1^-4,4+2*K.1-2*K.1^2-K.1^4-3*K.1^-4,4+K.1-K.1^2+3*K.1^4+2*K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,-2-2*K.1+2*K.1^2+2*K.1^-4,-2-2*K.1^4-2*K.1^-4,-1+2*K.1-2*K.1^2-2*K.1^-4,-1+2*K.1^4+2*K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,24,0,0,0,0,24,24,-12,-12,0,0,0,0,0,6,-6,0,0,0,0,0,0,0,0,0,0,0,12,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-3+3*K.1-3*K.1^2-12*K.1^4-15*K.1^-4,-3-15*K.1+15*K.1^2-3*K.1^4+12*K.1^-4,-3+12*K.1-12*K.1^2+15*K.1^4+3*K.1^-4,-24,-12-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,-12-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-12+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-12*K.1-12*K.1^-1,-12*K.1^2-12*K.1^-2,-12*K.1^4-12*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3,6,K.1-K.1^2-4*K.1^4-5*K.1^-4,-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,4*K.1-4*K.1^2+5*K.1^4+K.1^-4,3*K.1-3*K.1^2-6*K.1^4-9*K.1^-4,-9*K.1+9*K.1^2-3*K.1^4+6*K.1^-4,6*K.1-6*K.1^2+9*K.1^4+3*K.1^-4,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,12+4*K.1-4*K.1^2-K.1^4-5*K.1^-4,12-5*K.1+5*K.1^2-4*K.1^4+K.1^-4,12+K.1-K.1^2+5*K.1^4+4*K.1^-4,-3+12*K.1-12*K.1^2-12*K.1^-4,-3-12*K.1+12*K.1^2-12*K.1^4,-3+12*K.1^4+12*K.1^-4,6-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,6-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,6+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,-6,3,6,-6,-3,6-6*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2+6*K.1^-4,6+6*K.1-6*K.1^2+6*K.1^4,-6+K.1-K.1^2+5*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2-K.1^4-5*K.1^-4,-6-5*K.1+5*K.1^2-4*K.1^4+K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,0,0,0,0,0,0,0,-4+4*K.1-4*K.1^2+4*K.1^4,-4-4*K.1+4*K.1^2+4*K.1^-4,-4-4*K.1^4-4*K.1^-4,3-3*K.1^4-3*K.1^-4,3+3*K.1-3*K.1^2+3*K.1^4,3-3*K.1+3*K.1^2+3*K.1^-4,-2+2*K.1-2*K.1^2-4*K.1^4-6*K.1^-4,-2+4*K.1-4*K.1^2+6*K.1^4+2*K.1^-4,-2-6*K.1+6*K.1^2-2*K.1^4+4*K.1^-4,2+4*K.1-4*K.1^2-2*K.1^4-6*K.1^-4,2+2*K.1-2*K.1^2+6*K.1^4+4*K.1^-4,2-6*K.1+6*K.1^2-4*K.1^4+2*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,-2-2*K.1+2*K.1^2+2*K.1^-4,-2-2*K.1^4-2*K.1^-4,2-2*K.1+2*K.1^2+4*K.1^4+6*K.1^-4,2-4*K.1+4*K.1^2-6*K.1^4-2*K.1^-4,2+6*K.1-6*K.1^2+2*K.1^4-4*K.1^-4,4-2*K.1^4-2*K.1^-4,4+2*K.1-2*K.1^2+2*K.1^4,4-2*K.1+2*K.1^2+2*K.1^-4,3,-6,-2+2*K.1-2*K.1^2-K.1^4-3*K.1^-4,-2+K.1-K.1^2+3*K.1^4+2*K.1^-4,-2-3*K.1+3*K.1^2-2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,-2-2*K.1+2*K.1^2+2*K.1^-4,-2-2*K.1^4-2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,4+K.1-K.1^2+3*K.1^4+2*K.1^-4,4-3*K.1+3*K.1^2-2*K.1^4+K.1^-4,4+2*K.1-2*K.1^2-K.1^4-3*K.1^-4,-1+2*K.1^4+2*K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,-1+2*K.1-2*K.1^2-2*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,24,0,0,0,0,24,24,-12,-12,0,0,0,0,0,6,-6,0,0,0,0,0,0,0,0,0,0,0,12,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-3+12*K.1-12*K.1^2+15*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-12*K.1^4-15*K.1^-4,-3-15*K.1+15*K.1^2-3*K.1^4+12*K.1^-4,-24,-12+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-12-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,-12-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-12*K.1^4-12*K.1^-4,-12*K.1-12*K.1^-1,-12*K.1^2-12*K.1^-2,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3,6,4*K.1-4*K.1^2+5*K.1^4+K.1^-4,K.1-K.1^2-4*K.1^4-5*K.1^-4,-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,6*K.1-6*K.1^2+9*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-6*K.1^4-9*K.1^-4,-9*K.1+9*K.1^2-3*K.1^4+6*K.1^-4,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,12+K.1-K.1^2+5*K.1^4+4*K.1^-4,12+4*K.1-4*K.1^2-K.1^4-5*K.1^-4,12-5*K.1+5*K.1^2-4*K.1^4+K.1^-4,-3+12*K.1^4+12*K.1^-4,-3+12*K.1-12*K.1^2-12*K.1^-4,-3-12*K.1+12*K.1^2-12*K.1^4,6+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,6-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,6-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,-6,3,6,-6,-3,6+6*K.1-6*K.1^2+6*K.1^4,6-6*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2+6*K.1^-4,-6-5*K.1+5*K.1^2-4*K.1^4+K.1^-4,-6+K.1-K.1^2+5*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2-K.1^4-5*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,0,0,0,0,0,0,0,-4-4*K.1+4*K.1^2+4*K.1^-4,-4-4*K.1^4-4*K.1^-4,-4+4*K.1-4*K.1^2+4*K.1^4,3+3*K.1-3*K.1^2+3*K.1^4,3-3*K.1+3*K.1^2+3*K.1^-4,3-3*K.1^4-3*K.1^-4,-2+4*K.1-4*K.1^2+6*K.1^4+2*K.1^-4,-2-6*K.1+6*K.1^2-2*K.1^4+4*K.1^-4,-2+2*K.1-2*K.1^2-4*K.1^4-6*K.1^-4,2+2*K.1-2*K.1^2+6*K.1^4+4*K.1^-4,2-6*K.1+6*K.1^2-4*K.1^4+2*K.1^-4,2+4*K.1-4*K.1^2-2*K.1^4-6*K.1^-4,-2-2*K.1+2*K.1^2+2*K.1^-4,-2-2*K.1^4-2*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,2-4*K.1+4*K.1^2-6*K.1^4-2*K.1^-4,2+6*K.1-6*K.1^2+2*K.1^4-4*K.1^-4,2-2*K.1+2*K.1^2+4*K.1^4+6*K.1^-4,4+2*K.1-2*K.1^2+2*K.1^4,4-2*K.1+2*K.1^2+2*K.1^-4,4-2*K.1^4-2*K.1^-4,3,-6,-2+K.1-K.1^2+3*K.1^4+2*K.1^-4,-2-3*K.1+3*K.1^2-2*K.1^4+K.1^-4,-2+2*K.1-2*K.1^2-K.1^4-3*K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,-2-2*K.1+2*K.1^2+2*K.1^-4,-2-2*K.1^4-2*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,4-3*K.1+3*K.1^2-2*K.1^4+K.1^-4,4+2*K.1-2*K.1^2-K.1^4-3*K.1^-4,4+K.1-K.1^2+3*K.1^4+2*K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,-1+2*K.1-2*K.1^2-2*K.1^-4,-1+2*K.1^4+2*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,24,0,0,0,0,24,24,-12,-12,0,0,0,0,0,6,-6,0,0,0,0,0,0,0,0,0,0,0,12,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-3-15*K.1+15*K.1^2-3*K.1^4+12*K.1^-4,-3+12*K.1-12*K.1^2+15*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-12*K.1^4-15*K.1^-4,-24,-12-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-12+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-12-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,-12*K.1^2-12*K.1^-2,-12*K.1^4-12*K.1^-4,-12*K.1-12*K.1^-1,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3,6,-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,4*K.1-4*K.1^2+5*K.1^4+K.1^-4,K.1-K.1^2-4*K.1^4-5*K.1^-4,-9*K.1+9*K.1^2-3*K.1^4+6*K.1^-4,6*K.1-6*K.1^2+9*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-6*K.1^4-9*K.1^-4,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,12-5*K.1+5*K.1^2-4*K.1^4+K.1^-4,12+K.1-K.1^2+5*K.1^4+4*K.1^-4,12+4*K.1-4*K.1^2-K.1^4-5*K.1^-4,-3-12*K.1+12*K.1^2-12*K.1^4,-3+12*K.1^4+12*K.1^-4,-3+12*K.1-12*K.1^2-12*K.1^-4,6-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,6+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,6-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,-6,3,6,-6,-3,6-6*K.1+6*K.1^2+6*K.1^-4,6+6*K.1-6*K.1^2+6*K.1^4,6-6*K.1^4-6*K.1^-4,-6+4*K.1-4*K.1^2-K.1^4-5*K.1^-4,-6-5*K.1+5*K.1^2-4*K.1^4+K.1^-4,-6+K.1-K.1^2+5*K.1^4+4*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,0,0,0,0,0,0,0,-4-4*K.1^4-4*K.1^-4,-4+4*K.1-4*K.1^2+4*K.1^4,-4-4*K.1+4*K.1^2+4*K.1^-4,3-3*K.1+3*K.1^2+3*K.1^-4,3-3*K.1^4-3*K.1^-4,3+3*K.1-3*K.1^2+3*K.1^4,-2-6*K.1+6*K.1^2-2*K.1^4+4*K.1^-4,-2+2*K.1-2*K.1^2-4*K.1^4-6*K.1^-4,-2+4*K.1-4*K.1^2+6*K.1^4+2*K.1^-4,2-6*K.1+6*K.1^2-4*K.1^4+2*K.1^-4,2+4*K.1-4*K.1^2-2*K.1^4-6*K.1^-4,2+2*K.1-2*K.1^2+6*K.1^4+4*K.1^-4,-2-2*K.1^4-2*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,-2-2*K.1+2*K.1^2+2*K.1^-4,2+6*K.1-6*K.1^2+2*K.1^4-4*K.1^-4,2-2*K.1+2*K.1^2+4*K.1^4+6*K.1^-4,2-4*K.1+4*K.1^2-6*K.1^4-2*K.1^-4,4-2*K.1+2*K.1^2+2*K.1^-4,4-2*K.1^4-2*K.1^-4,4+2*K.1-2*K.1^2+2*K.1^4,3,-6,-2-3*K.1+3*K.1^2-2*K.1^4+K.1^-4,-2+2*K.1-2*K.1^2-K.1^4-3*K.1^-4,-2+K.1-K.1^2+3*K.1^4+2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,-2-2*K.1^4-2*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,-2-2*K.1+2*K.1^2+2*K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,4+2*K.1-2*K.1^2-K.1^4-3*K.1^-4,4+K.1-K.1^2+3*K.1^4+2*K.1^-4,4-3*K.1+3*K.1^2-2*K.1^4+K.1^-4,-1+2*K.1-2*K.1^2-2*K.1^-4,-1+2*K.1^4+2*K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,24,0,0,0,0,60,-48,24,-12,0,0,0,0,12,-12,0,0,0,0,0,0,0,0,0,0,0,0,0,-12+12*K.1^4+12*K.1^-4,-12+12*K.1-12*K.1^2-12*K.1^-4,-12-12*K.1+12*K.1^2-12*K.1^4,6+9*K.1-9*K.1^2-9*K.1^-4,6-9*K.1+9*K.1^2-9*K.1^4,6+9*K.1^4+9*K.1^-4,0,-12+6*K.1-6*K.1^2+6*K.1^4,-12-6*K.1^4-6*K.1^-4,-12-6*K.1+6*K.1^2+6*K.1^-4,0,0,0,-3-9*K.1+9*K.1^2-9*K.1^4,-3+9*K.1^4+9*K.1^-4,-3+9*K.1-9*K.1^2-9*K.1^-4,6,6,-3+6*K.1-6*K.1^2+6*K.1^4,-3-6*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2+6*K.1^-4,6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3+6*K.1-6*K.1^2+6*K.1^4,-3-6*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2+6*K.1^-4,6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3+12*K.1-12*K.1^2-12*K.1^-4,-3-12*K.1+12*K.1^2-12*K.1^4,-3+12*K.1^4+12*K.1^-4,0,0,0,6-12*K.1+12*K.1^2-12*K.1^4,6+12*K.1^4+12*K.1^-4,6+12*K.1-12*K.1^2-12*K.1^-4,0,0,0,0,0,-3,0,-3,0,0,0,6-6*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2+6*K.1^-4,6+6*K.1-6*K.1^2+6*K.1^4,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,0,0,0,0,0,0,0,-8+4*K.1^4+4*K.1^-4,-8-4*K.1+4*K.1^2-4*K.1^4,-8+4*K.1-4*K.1^2-4*K.1^-4,3*K.1^4+3*K.1^-4,3*K.1^2+3*K.1^-2,3*K.1+3*K.1^-1,2+2*K.1-2*K.1^2-2*K.1^-4,2+2*K.1^4+2*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,-2+4*K.1^4+4*K.1^-4,-2-4*K.1+4*K.1^2-4*K.1^4,-2+4*K.1-4*K.1^2-4*K.1^-4,2-4*K.1+4*K.1^2+4*K.1^-4,2-4*K.1^4-4*K.1^-4,2+4*K.1-4*K.1^2+4*K.1^4,-2+4*K.1^4+4*K.1^-4,-2-4*K.1+4*K.1^2-4*K.1^4,-2+4*K.1-4*K.1^2-4*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,2+2*K.1-2*K.1^2-2*K.1^-4,2+2*K.1^4+2*K.1^-4,0,0,-1-4*K.1+4*K.1^2+4*K.1^-4,-1-4*K.1^4-4*K.1^-4,-1+4*K.1-4*K.1^2+4*K.1^4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1+2*K.1-2*K.1^2-2*K.1^-4,-1+2*K.1^4+2*K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,-1+2*K.1^4+2*K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,-1+2*K.1-2*K.1^2-2*K.1^-4,4+4*K.1-4*K.1^2-4*K.1^-4,4+4*K.1^4+4*K.1^-4,4-4*K.1+4*K.1^2-4*K.1^4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,24,0,0,0,0,60,-48,24,-12,0,0,0,0,12,-12,0,0,0,0,0,0,0,0,0,0,0,0,0,-12-12*K.1+12*K.1^2-12*K.1^4,-12+12*K.1^4+12*K.1^-4,-12+12*K.1-12*K.1^2-12*K.1^-4,6+9*K.1^4+9*K.1^-4,6+9*K.1-9*K.1^2-9*K.1^-4,6-9*K.1+9*K.1^2-9*K.1^4,0,-12-6*K.1+6*K.1^2+6*K.1^-4,-12+6*K.1-6*K.1^2+6*K.1^4,-12-6*K.1^4-6*K.1^-4,0,0,0,-3+9*K.1-9*K.1^2-9*K.1^-4,-3-9*K.1+9*K.1^2-9*K.1^4,-3+9*K.1^4+9*K.1^-4,6,6,-3-6*K.1+6*K.1^2+6*K.1^-4,-3+6*K.1-6*K.1^2+6*K.1^4,-3-6*K.1^4-6*K.1^-4,6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3-6*K.1+6*K.1^2+6*K.1^-4,-3+6*K.1-6*K.1^2+6*K.1^4,-3-6*K.1^4-6*K.1^-4,6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3+12*K.1^4+12*K.1^-4,-3+12*K.1-12*K.1^2-12*K.1^-4,-3-12*K.1+12*K.1^2-12*K.1^4,0,0,0,6+12*K.1-12*K.1^2-12*K.1^-4,6-12*K.1+12*K.1^2-12*K.1^4,6+12*K.1^4+12*K.1^-4,0,0,0,0,0,-3,0,-3,0,0,0,6+6*K.1-6*K.1^2+6*K.1^4,6-6*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2+6*K.1^-4,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,0,0,0,0,0,0,0,-8-4*K.1+4*K.1^2-4*K.1^4,-8+4*K.1-4*K.1^2-4*K.1^-4,-8+4*K.1^4+4*K.1^-4,3*K.1^2+3*K.1^-2,3*K.1+3*K.1^-1,3*K.1^4+3*K.1^-4,2+2*K.1^4+2*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,2+2*K.1-2*K.1^2-2*K.1^-4,-2-4*K.1+4*K.1^2-4*K.1^4,-2+4*K.1-4*K.1^2-4*K.1^-4,-2+4*K.1^4+4*K.1^-4,2-4*K.1^4-4*K.1^-4,2+4*K.1-4*K.1^2+4*K.1^4,2-4*K.1+4*K.1^2+4*K.1^-4,-2-4*K.1+4*K.1^2-4*K.1^4,-2+4*K.1-4*K.1^2-4*K.1^-4,-2+4*K.1^4+4*K.1^-4,2+2*K.1-2*K.1^2-2*K.1^-4,2+2*K.1^4+2*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,0,0,-1-4*K.1^4-4*K.1^-4,-1+4*K.1-4*K.1^2+4*K.1^4,-1-4*K.1+4*K.1^2+4*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1+2*K.1^4+2*K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,-1+2*K.1-2*K.1^2-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,-1+2*K.1-2*K.1^2-2*K.1^-4,-1+2*K.1^4+2*K.1^-4,4+4*K.1^4+4*K.1^-4,4-4*K.1+4*K.1^2-4*K.1^4,4+4*K.1-4*K.1^2-4*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,24,0,0,0,0,60,-48,24,-12,0,0,0,0,12,-12,0,0,0,0,0,0,0,0,0,0,0,0,0,-12+12*K.1-12*K.1^2-12*K.1^-4,-12-12*K.1+12*K.1^2-12*K.1^4,-12+12*K.1^4+12*K.1^-4,6-9*K.1+9*K.1^2-9*K.1^4,6+9*K.1^4+9*K.1^-4,6+9*K.1-9*K.1^2-9*K.1^-4,0,-12-6*K.1^4-6*K.1^-4,-12-6*K.1+6*K.1^2+6*K.1^-4,-12+6*K.1-6*K.1^2+6*K.1^4,0,0,0,-3+9*K.1^4+9*K.1^-4,-3+9*K.1-9*K.1^2-9*K.1^-4,-3-9*K.1+9*K.1^2-9*K.1^4,6,6,-3-6*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2+6*K.1^-4,-3+6*K.1-6*K.1^2+6*K.1^4,6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3-6*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2+6*K.1^-4,-3+6*K.1-6*K.1^2+6*K.1^4,6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3-12*K.1+12*K.1^2-12*K.1^4,-3+12*K.1^4+12*K.1^-4,-3+12*K.1-12*K.1^2-12*K.1^-4,0,0,0,6+12*K.1^4+12*K.1^-4,6+12*K.1-12*K.1^2-12*K.1^-4,6-12*K.1+12*K.1^2-12*K.1^4,0,0,0,0,0,-3,0,-3,0,0,0,6-6*K.1+6*K.1^2+6*K.1^-4,6+6*K.1-6*K.1^2+6*K.1^4,6-6*K.1^4-6*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,0,0,0,0,0,0,0,-8+4*K.1-4*K.1^2-4*K.1^-4,-8+4*K.1^4+4*K.1^-4,-8-4*K.1+4*K.1^2-4*K.1^4,3*K.1+3*K.1^-1,3*K.1^4+3*K.1^-4,3*K.1^2+3*K.1^-2,2-2*K.1+2*K.1^2-2*K.1^4,2+2*K.1-2*K.1^2-2*K.1^-4,2+2*K.1^4+2*K.1^-4,-2+4*K.1-4*K.1^2-4*K.1^-4,-2+4*K.1^4+4*K.1^-4,-2-4*K.1+4*K.1^2-4*K.1^4,2+4*K.1-4*K.1^2+4*K.1^4,2-4*K.1+4*K.1^2+4*K.1^-4,2-4*K.1^4-4*K.1^-4,-2+4*K.1-4*K.1^2-4*K.1^-4,-2+4*K.1^4+4*K.1^-4,-2-4*K.1+4*K.1^2-4*K.1^4,2+2*K.1^4+2*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,2+2*K.1-2*K.1^2-2*K.1^-4,0,0,-1+4*K.1-4*K.1^2+4*K.1^4,-1-4*K.1+4*K.1^2+4*K.1^-4,-1-4*K.1^4-4*K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,-1+2*K.1-2*K.1^2-2*K.1^-4,-1+2*K.1^4+2*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-1+2*K.1-2*K.1^2-2*K.1^-4,-1+2*K.1^4+2*K.1^-4,-1-2*K.1+2*K.1^2-2*K.1^4,4-4*K.1+4*K.1^2-4*K.1^4,4+4*K.1-4*K.1^2-4*K.1^-4,4+4*K.1^4+4*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,-24,0,0,0,0,-12,-12,-12,15,0,0,0,0,12,3,-6,0,0,0,0,0,0,0,0,0,0,0,24,-12*K.1-12*K.1^-1,-12*K.1^2-12*K.1^-2,-12*K.1^4-12*K.1^-4,-3-9*K.1+9*K.1^2+9*K.1^4+18*K.1^-4,-3+18*K.1-18*K.1^2+9*K.1^4-9*K.1^-4,-3-9*K.1+9*K.1^2-18*K.1^4-9*K.1^-4,-12,-12*K.1^2-12*K.1^-2,-12*K.1^4-12*K.1^-4,-12*K.1-12*K.1^-1,-12-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,-12-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,-12+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,-3,-3,-3,-3,-3,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-9*K.1+9*K.1^2-3*K.1^4+6*K.1^-4,6*K.1-6*K.1^2+9*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-6*K.1^4-9*K.1^-4,6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,6+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,-12,-3,-3,15,-3,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,0,0,0,0,0,0,0,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,3,3,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-6-3*K.1+3*K.1^2-3*K.1^4,-6+3*K.1-3*K.1^2-3*K.1^-4,-6+3*K.1^4+3*K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,3-3*K.1+3*K.1^2+3*K.1^-4,3-3*K.1^4-3*K.1^-4,3+3*K.1-3*K.1^2+3*K.1^4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,-24,0,0,0,0,-12,-12,-12,15,0,0,0,0,12,3,-6,0,0,0,0,0,0,0,0,0,0,0,24,-12*K.1^2-12*K.1^-2,-12*K.1^4-12*K.1^-4,-12*K.1-12*K.1^-1,-3+18*K.1-18*K.1^2+9*K.1^4-9*K.1^-4,-3-9*K.1+9*K.1^2-18*K.1^4-9*K.1^-4,-3-9*K.1+9*K.1^2+9*K.1^4+18*K.1^-4,-12,-12*K.1^4-12*K.1^-4,-12*K.1-12*K.1^-1,-12*K.1^2-12*K.1^-2,-12-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,-12+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,-12-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,-3,-3,-3,-3,-3,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6*K.1-6*K.1^2+9*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-6*K.1^4-9*K.1^-4,-9*K.1+9*K.1^2-3*K.1^4+6*K.1^-4,6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,6-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,6+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,-12,-3,-3,15,-3,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,0,0,0,0,0,0,0,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,3,3,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,-6+3*K.1^4+3*K.1^-4,-6-3*K.1+3*K.1^2-3*K.1^4,-6+3*K.1-3*K.1^2-3*K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,3+3*K.1-3*K.1^2+3*K.1^4,3-3*K.1+3*K.1^2+3*K.1^-4,3-3*K.1^4-3*K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,-24,0,0,0,0,-12,-12,-12,15,0,0,0,0,12,3,-6,0,0,0,0,0,0,0,0,0,0,0,24,-12*K.1^4-12*K.1^-4,-12*K.1-12*K.1^-1,-12*K.1^2-12*K.1^-2,-3-9*K.1+9*K.1^2-18*K.1^4-9*K.1^-4,-3-9*K.1+9*K.1^2+9*K.1^4+18*K.1^-4,-3+18*K.1-18*K.1^2+9*K.1^4-9*K.1^-4,-12,-12*K.1-12*K.1^-1,-12*K.1^2-12*K.1^-2,-12*K.1^4-12*K.1^-4,-12+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,-12-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,-12-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,-3,-3,-3,-3,-3,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,3*K.1-3*K.1^2-6*K.1^4-9*K.1^-4,-9*K.1+9*K.1^2-3*K.1^4+6*K.1^-4,6*K.1-6*K.1^2+9*K.1^4+3*K.1^-4,6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,6-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,6+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,-12,-3,-3,15,-3,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,0,0,0,0,0,0,0,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,3,3,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-6+3*K.1-3*K.1^2-3*K.1^-4,-6+3*K.1^4+3*K.1^-4,-6-3*K.1+3*K.1^2-3*K.1^4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,3-3*K.1^4-3*K.1^-4,3+3*K.1-3*K.1^2+3*K.1^4,3-3*K.1+3*K.1^2+3*K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,-24,0,0,0,0,-12,-12,-12,15,0,0,0,0,12,3,-6,0,0,0,0,0,0,0,0,0,0,0,24,12*K.1-12*K.1^2+24*K.1^4+12*K.1^-4,12*K.1-12*K.1^2-12*K.1^4-24*K.1^-4,-24*K.1+24*K.1^2-12*K.1^4+12*K.1^-4,6-9*K.1^4-9*K.1^-4,6-9*K.1+9*K.1^2+9*K.1^-4,6+9*K.1-9*K.1^2+9*K.1^4,24,0,0,0,-12-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,-12+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,-12+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,6+9*K.1-9*K.1^2+9*K.1^4,6-9*K.1^4-9*K.1^-4,6-9*K.1+9*K.1^2+9*K.1^-4,6,6,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3-9*K.1^4-9*K.1^-4,-3-9*K.1+9*K.1^2+9*K.1^-4,-3+9*K.1-9*K.1^2+9*K.1^4,-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,0,0,0,-12+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,-12+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,-12-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,-3,-3,6,-3,6,6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3,-3,-3,0,0,0,0,0,0,0,-4*K.1+4*K.1^2-8*K.1^4-4*K.1^-4,8*K.1-8*K.1^2+4*K.1^4-4*K.1^-4,-4*K.1+4*K.1^2+4*K.1^4+8*K.1^-4,-6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,-6,-6,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,3-3*K.1^4-3*K.1^-4,3+3*K.1-3*K.1^2+3*K.1^4,3-3*K.1+3*K.1^2+3*K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,3-3*K.1+3*K.1^2-3*K.1^4,3+3*K.1-3*K.1^2-3*K.1^-4,3+3*K.1^4+3*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,-24,0,0,0,0,-12,-12,-12,15,0,0,0,0,12,3,-6,0,0,0,0,0,0,0,0,0,0,0,24,-24*K.1+24*K.1^2-12*K.1^4+12*K.1^-4,12*K.1-12*K.1^2+24*K.1^4+12*K.1^-4,12*K.1-12*K.1^2-12*K.1^4-24*K.1^-4,6+9*K.1-9*K.1^2+9*K.1^4,6-9*K.1^4-9*K.1^-4,6-9*K.1+9*K.1^2+9*K.1^-4,24,0,0,0,-12+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,-12-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,-12+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,6-9*K.1+9*K.1^2+9*K.1^-4,6+9*K.1-9*K.1^2+9*K.1^4,6-9*K.1^4-9*K.1^-4,6,6,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3+9*K.1-9*K.1^2+9*K.1^4,-3-9*K.1^4-9*K.1^-4,-3-9*K.1+9*K.1^2+9*K.1^-4,-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,0,0,0,-12-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,-12+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,-12+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,-3,-3,6,-3,6,6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3,-3,-3,0,0,0,0,0,0,0,8*K.1-8*K.1^2+4*K.1^4-4*K.1^-4,-4*K.1+4*K.1^2+4*K.1^4+8*K.1^-4,-4*K.1+4*K.1^2-8*K.1^4-4*K.1^-4,-6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-6,-6,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,3+3*K.1-3*K.1^2+3*K.1^4,3-3*K.1+3*K.1^2+3*K.1^-4,3-3*K.1^4-3*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,3+3*K.1-3*K.1^2-3*K.1^-4,3+3*K.1^4+3*K.1^-4,3-3*K.1+3*K.1^2-3*K.1^4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,-24,0,0,0,0,-12,-12,-12,15,0,0,0,0,12,3,-6,0,0,0,0,0,0,0,0,0,0,0,24,12*K.1-12*K.1^2-12*K.1^4-24*K.1^-4,-24*K.1+24*K.1^2-12*K.1^4+12*K.1^-4,12*K.1-12*K.1^2+24*K.1^4+12*K.1^-4,6-9*K.1+9*K.1^2+9*K.1^-4,6+9*K.1-9*K.1^2+9*K.1^4,6-9*K.1^4-9*K.1^-4,24,0,0,0,-12+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,-12+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,-12-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,6-9*K.1^4-9*K.1^-4,6-9*K.1+9*K.1^2+9*K.1^-4,6+9*K.1-9*K.1^2+9*K.1^4,6,6,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3-9*K.1+9*K.1^2+9*K.1^-4,-3+9*K.1-9*K.1^2+9*K.1^4,-3-9*K.1^4-9*K.1^-4,6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,0,0,0,-12+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,-12-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,-12+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,-3,-3,6,-3,6,6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3,-3,-3,0,0,0,0,0,0,0,-4*K.1+4*K.1^2+4*K.1^4+8*K.1^-4,-4*K.1+4*K.1^2-8*K.1^4-4*K.1^-4,8*K.1-8*K.1^2+4*K.1^4-4*K.1^-4,-6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,2*K.1-2*K.1^2-2*K.1^4-4*K.1^-4,2*K.1-2*K.1^2+4*K.1^4+2*K.1^-4,-4*K.1+4*K.1^2-2*K.1^4+2*K.1^-4,-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-6,-6,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,3-3*K.1+3*K.1^2+3*K.1^-4,3-3*K.1^4-3*K.1^-4,3+3*K.1-3*K.1^2+3*K.1^4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,3+3*K.1^4+3*K.1^-4,3-3*K.1+3*K.1^2-3*K.1^4,3+3*K.1-3*K.1^2-3*K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,-24,0,0,0,0,24,24,-12,-12,0,0,0,0,0,-6,6,0,0,0,0,0,0,0,0,0,0,0,12,-12+4*K.1-4*K.1^2+20*K.1^4+16*K.1^-4,-12+16*K.1-16*K.1^2-4*K.1^4-20*K.1^-4,-12-20*K.1+20*K.1^2-16*K.1^4+4*K.1^-4,-12+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-12-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-12+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,12,-6+10*K.1-10*K.1^2+14*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2-10*K.1^4-14*K.1^-4,-6-14*K.1+14*K.1^2-4*K.1^4+10*K.1^-4,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,-12+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-12+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-12-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,15,-3,6-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,6+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,6-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,6+7*K.1-7*K.1^2+11*K.1^4+4*K.1^-4,6+4*K.1-4*K.1^2-7*K.1^4-11*K.1^-4,6-11*K.1+11*K.1^2-4*K.1^4+7*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,K.1-K.1^2-4*K.1^4-5*K.1^-4,-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,4*K.1-4*K.1^2+5*K.1^4+K.1^-4,-3+6*K.1-6*K.1^2+6*K.1^4,-3-6*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2+6*K.1^-4,-6+10*K.1-10*K.1^2+14*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2-10*K.1^4-14*K.1^-4,-6-14*K.1+14*K.1^2-4*K.1^4+10*K.1^-4,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,3,3,-3,3,15,-3-6*K.1+6*K.1^2+6*K.1^-4,-3+6*K.1-6*K.1^2+6*K.1^4,-3-6*K.1^4-6*K.1^-4,4*K.1-4*K.1^2+5*K.1^4+K.1^-4,K.1-K.1^2-4*K.1^4-5*K.1^-4,-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,0,0,0,0,0,0,0,0,0,0,4-8*K.1^4-8*K.1^-4,4+8*K.1-8*K.1^2+8*K.1^4,4-8*K.1+8*K.1^2+8*K.1^-4,6+3*K.1-3*K.1^2-3*K.1^-4,6+3*K.1^4+3*K.1^-4,6-3*K.1+3*K.1^2-3*K.1^4,2+2*K.1^4+2*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,2+2*K.1-2*K.1^2-2*K.1^-4,-2-2*K.1^4-2*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,-2-2*K.1+2*K.1^2+2*K.1^-4,-4+6*K.1-6*K.1^2+2*K.1^4-4*K.1^-4,-4-2*K.1+2*K.1^2+4*K.1^4+6*K.1^-4,-4-4*K.1+4*K.1^2-6*K.1^4-2*K.1^-4,-2-2*K.1^4-2*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,-2-2*K.1+2*K.1^2+2*K.1^-4,2+2*K.1-2*K.1^2-2*K.1^-4,2+2*K.1^4+2*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,-3,-3,-4+2*K.1^4+2*K.1^-4,-4-2*K.1+2*K.1^2-2*K.1^4,-4+2*K.1-2*K.1^2-2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,2+3*K.1-3*K.1^2+2*K.1^4-K.1^-4,2-2*K.1+2*K.1^2+K.1^4+3*K.1^-4,2-K.1+K.1^2-3*K.1^4-2*K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,2-2*K.1+2*K.1^2+K.1^4+3*K.1^-4,2-K.1+K.1^2-3*K.1^4-2*K.1^-4,2+3*K.1-3*K.1^2+2*K.1^4-K.1^-4,1+4*K.1-4*K.1^2-4*K.1^-4,1+4*K.1^4+4*K.1^-4,1-4*K.1+4*K.1^2-4*K.1^4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,-24,0,0,0,0,24,24,-12,-12,0,0,0,0,0,-6,6,0,0,0,0,0,0,0,0,0,0,0,12,-12-20*K.1+20*K.1^2-16*K.1^4+4*K.1^-4,-12+4*K.1-4*K.1^2+20*K.1^4+16*K.1^-4,-12+16*K.1-16*K.1^2-4*K.1^4-20*K.1^-4,-12+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-12+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-12-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,12,-6-14*K.1+14*K.1^2-4*K.1^4+10*K.1^-4,-6+10*K.1-10*K.1^2+14*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2-10*K.1^4-14*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,-12-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-12+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-12+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,15,-3,6-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,6-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,6+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,6-11*K.1+11*K.1^2-4*K.1^4+7*K.1^-4,6+7*K.1-7*K.1^2+11*K.1^4+4*K.1^-4,6+4*K.1-4*K.1^2-7*K.1^4-11*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,4*K.1-4*K.1^2+5*K.1^4+K.1^-4,K.1-K.1^2-4*K.1^4-5*K.1^-4,-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,-3-6*K.1+6*K.1^2+6*K.1^-4,-3+6*K.1-6*K.1^2+6*K.1^4,-3-6*K.1^4-6*K.1^-4,-6-14*K.1+14*K.1^2-4*K.1^4+10*K.1^-4,-6+10*K.1-10*K.1^2+14*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2-10*K.1^4-14*K.1^-4,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,3,3,-3,3,15,-3-6*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2+6*K.1^-4,-3+6*K.1-6*K.1^2+6*K.1^4,-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,4*K.1-4*K.1^2+5*K.1^4+K.1^-4,K.1-K.1^2-4*K.1^4-5*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,0,0,0,0,0,0,0,0,0,0,4+8*K.1-8*K.1^2+8*K.1^4,4-8*K.1+8*K.1^2+8*K.1^-4,4-8*K.1^4-8*K.1^-4,6+3*K.1^4+3*K.1^-4,6-3*K.1+3*K.1^2-3*K.1^4,6+3*K.1-3*K.1^2-3*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,2+2*K.1-2*K.1^2-2*K.1^-4,2+2*K.1^4+2*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,-2-2*K.1+2*K.1^2+2*K.1^-4,-2-2*K.1^4-2*K.1^-4,-4-2*K.1+2*K.1^2+4*K.1^4+6*K.1^-4,-4-4*K.1+4*K.1^2-6*K.1^4-2*K.1^-4,-4+6*K.1-6*K.1^2+2*K.1^4-4*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,-2-2*K.1+2*K.1^2+2*K.1^-4,-2-2*K.1^4-2*K.1^-4,2+2*K.1^4+2*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,2+2*K.1-2*K.1^2-2*K.1^-4,-3,-3,-4-2*K.1+2*K.1^2-2*K.1^4,-4+2*K.1-2*K.1^2-2*K.1^-4,-4+2*K.1^4+2*K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2-2*K.1+2*K.1^2+K.1^4+3*K.1^-4,2-K.1+K.1^2-3*K.1^4-2*K.1^-4,2+3*K.1-3*K.1^2+2*K.1^4-K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,2-K.1+K.1^2-3*K.1^4-2*K.1^-4,2+3*K.1-3*K.1^2+2*K.1^4-K.1^-4,2-2*K.1+2*K.1^2+K.1^4+3*K.1^-4,1+4*K.1^4+4*K.1^-4,1-4*K.1+4*K.1^2-4*K.1^4,1+4*K.1-4*K.1^2-4*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,-24,0,0,0,0,24,24,-12,-12,0,0,0,0,0,-6,6,0,0,0,0,0,0,0,0,0,0,0,12,-12+16*K.1-16*K.1^2-4*K.1^4-20*K.1^-4,-12-20*K.1+20*K.1^2-16*K.1^4+4*K.1^-4,-12+4*K.1-4*K.1^2+20*K.1^4+16*K.1^-4,-12-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-12+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-12+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,12,-6+4*K.1-4*K.1^2-10*K.1^4-14*K.1^-4,-6-14*K.1+14*K.1^2-4*K.1^4+10*K.1^-4,-6+10*K.1-10*K.1^2+14*K.1^4+4*K.1^-4,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,-12+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-12-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-12+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,15,-3,6+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,6-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,6-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,6+4*K.1-4*K.1^2-7*K.1^4-11*K.1^-4,6-11*K.1+11*K.1^2-4*K.1^4+7*K.1^-4,6+7*K.1-7*K.1^2+11*K.1^4+4*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,4*K.1-4*K.1^2+5*K.1^4+K.1^-4,K.1-K.1^2-4*K.1^4-5*K.1^-4,-3-6*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2+6*K.1^-4,-3+6*K.1-6*K.1^2+6*K.1^4,-6+4*K.1-4*K.1^2-10*K.1^4-14*K.1^-4,-6-14*K.1+14*K.1^2-4*K.1^4+10*K.1^-4,-6+10*K.1-10*K.1^2+14*K.1^4+4*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,3,3,-3,3,15,-3+6*K.1-6*K.1^2+6*K.1^4,-3-6*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2+6*K.1^-4,K.1-K.1^2-4*K.1^4-5*K.1^-4,-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,4*K.1-4*K.1^2+5*K.1^4+K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,0,0,0,0,0,0,0,0,0,0,4-8*K.1+8*K.1^2+8*K.1^-4,4-8*K.1^4-8*K.1^-4,4+8*K.1-8*K.1^2+8*K.1^4,6-3*K.1+3*K.1^2-3*K.1^4,6+3*K.1-3*K.1^2-3*K.1^-4,6+3*K.1^4+3*K.1^-4,2+2*K.1-2*K.1^2-2*K.1^-4,2+2*K.1^4+2*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,-2-2*K.1+2*K.1^2+2*K.1^-4,-2-2*K.1^4-2*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,-4-4*K.1+4*K.1^2-6*K.1^4-2*K.1^-4,-4+6*K.1-6*K.1^2+2*K.1^4-4*K.1^-4,-4-2*K.1+2*K.1^2+4*K.1^4+6*K.1^-4,-2-2*K.1+2*K.1^2+2*K.1^-4,-2-2*K.1^4-2*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,2-2*K.1+2*K.1^2-2*K.1^4,2+2*K.1-2*K.1^2-2*K.1^-4,2+2*K.1^4+2*K.1^-4,-3,-3,-4+2*K.1-2*K.1^2-2*K.1^-4,-4+2*K.1^4+2*K.1^-4,-4-2*K.1+2*K.1^2-2*K.1^4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,2-K.1+K.1^2-3*K.1^4-2*K.1^-4,2+3*K.1-3*K.1^2+2*K.1^4-K.1^-4,2-2*K.1+2*K.1^2+K.1^4+3*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,2+3*K.1-3*K.1^2+2*K.1^4-K.1^-4,2-2*K.1+2*K.1^2+K.1^4+3*K.1^-4,2-K.1+K.1^2-3*K.1^4-2*K.1^-4,1-4*K.1+4*K.1^2-4*K.1^4,1+4*K.1-4*K.1^2-4*K.1^-4,1+4*K.1^4+4*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,-24,0,0,0,0,24,24,-12,-12,0,0,0,0,0,-6,6,0,0,0,0,0,0,0,0,0,0,0,12,-12-20*K.1+20*K.1^2-4*K.1^4+16*K.1^-4,-12+16*K.1-16*K.1^2+20*K.1^4+4*K.1^-4,-12+4*K.1-4*K.1^2-16*K.1^4-20*K.1^-4,15-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,15+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,15+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,12,-6+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-6-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,15+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,15-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,15+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-12,-3,6+4*K.1-4*K.1^2-7*K.1^4-11*K.1^-4,6-11*K.1+11*K.1^2-4*K.1^4+7*K.1^-4,6+7*K.1-7*K.1^2+11*K.1^4+4*K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,6+4*K.1-4*K.1^2+11*K.1^4+7*K.1^-4,6+7*K.1-7*K.1^2-4*K.1^4-11*K.1^-4,6-11*K.1+11*K.1^2-7*K.1^4+4*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-3-6*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2+6*K.1^-4,-3+6*K.1-6*K.1^2+6*K.1^4,-6+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-6-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,3,3,-3,3,-12,-3+6*K.1-6*K.1^2+6*K.1^4,-3-6*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2+6*K.1^-4,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,0,0,0,0,0,0,0,0,0,0,4+4*K.1-4*K.1^2-4*K.1^-4,4+4*K.1^4+4*K.1^-4,4-4*K.1+4*K.1^2-4*K.1^4,-3-3*K.1+3*K.1^2-3*K.1^4,-3+3*K.1-3*K.1^2-3*K.1^-4,-3+3*K.1^4+3*K.1^-4,-4+2*K.1-2*K.1^2-2*K.1^-4,-4+2*K.1^4+2*K.1^-4,-4-2*K.1+2*K.1^2-2*K.1^4,-2+4*K.1-4*K.1^2+6*K.1^4+2*K.1^-4,-2-6*K.1+6*K.1^2-2*K.1^4+4*K.1^-4,-2+2*K.1-2*K.1^2-4*K.1^4-6*K.1^-4,2+2*K.1-2*K.1^2-2*K.1^-4,2+2*K.1^4+2*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,-2-2*K.1+2*K.1^2-6*K.1^4-4*K.1^-4,-2+6*K.1-6*K.1^2+4*K.1^4-2*K.1^-4,-2-4*K.1+4*K.1^2+2*K.1^4+6*K.1^-4,2-2*K.1+2*K.1^2+4*K.1^4+6*K.1^-4,2-4*K.1+4*K.1^2-6*K.1^4-2*K.1^-4,2+6*K.1-6*K.1^2+2*K.1^4-4*K.1^-4,6,-3,2-K.1+K.1^2-3*K.1^4-2*K.1^-4,2+3*K.1-3*K.1^2+2*K.1^4-K.1^-4,2-2*K.1+2*K.1^2+K.1^4+3*K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-4-K.1+K.1^2-3*K.1^4-2*K.1^-4,-4+3*K.1-3*K.1^2+2*K.1^4-K.1^-4,-4-2*K.1+2*K.1^2+K.1^4+3*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,2+2*K.1^4+2*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,2+2*K.1-2*K.1^2-2*K.1^-4,1+2*K.1-2*K.1^2+2*K.1^4,1-2*K.1+2*K.1^2+2*K.1^-4,1-2*K.1^4-2*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,-24,0,0,0,0,24,24,-12,-12,0,0,0,0,0,-6,6,0,0,0,0,0,0,0,0,0,0,0,12,-12+16*K.1-16*K.1^2+20*K.1^4+4*K.1^-4,-12+4*K.1-4*K.1^2-16*K.1^4-20*K.1^-4,-12-20*K.1+20*K.1^2-4*K.1^4+16*K.1^-4,15+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,15+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,15-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,12,-6+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-6-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,15-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,15+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,15+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-12,-3,6-11*K.1+11*K.1^2-4*K.1^4+7*K.1^-4,6+7*K.1-7*K.1^2+11*K.1^4+4*K.1^-4,6+4*K.1-4*K.1^2-7*K.1^4-11*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,6+7*K.1-7*K.1^2-4*K.1^4-11*K.1^-4,6-11*K.1+11*K.1^2-7*K.1^4+4*K.1^-4,6+4*K.1-4*K.1^2+11*K.1^4+7*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-3-6*K.1+6*K.1^2+6*K.1^-4,-3+6*K.1-6*K.1^2+6*K.1^4,-3-6*K.1^4-6*K.1^-4,-6+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-6-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,3,3,-3,3,-12,-3-6*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2+6*K.1^-4,-3+6*K.1-6*K.1^2+6*K.1^4,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,0,0,0,0,0,0,0,0,0,0,4-4*K.1+4*K.1^2-4*K.1^4,4+4*K.1-4*K.1^2-4*K.1^-4,4+4*K.1^4+4*K.1^-4,-3+3*K.1^4+3*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,-3+3*K.1-3*K.1^2-3*K.1^-4,-4-2*K.1+2*K.1^2-2*K.1^4,-4+2*K.1-2*K.1^2-2*K.1^-4,-4+2*K.1^4+2*K.1^-4,-2+2*K.1-2*K.1^2-4*K.1^4-6*K.1^-4,-2+4*K.1-4*K.1^2+6*K.1^4+2*K.1^-4,-2-6*K.1+6*K.1^2-2*K.1^4+4*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,2+2*K.1-2*K.1^2-2*K.1^-4,2+2*K.1^4+2*K.1^-4,-2-4*K.1+4*K.1^2+2*K.1^4+6*K.1^-4,-2-2*K.1+2*K.1^2-6*K.1^4-4*K.1^-4,-2+6*K.1-6*K.1^2+4*K.1^4-2*K.1^-4,2+6*K.1-6*K.1^2+2*K.1^4-4*K.1^-4,2-2*K.1+2*K.1^2+4*K.1^4+6*K.1^-4,2-4*K.1+4*K.1^2-6*K.1^4-2*K.1^-4,6,-3,2-2*K.1+2*K.1^2+K.1^4+3*K.1^-4,2-K.1+K.1^2-3*K.1^4-2*K.1^-4,2+3*K.1-3*K.1^2+2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,-4-2*K.1+2*K.1^2+K.1^4+3*K.1^-4,-4-K.1+K.1^2-3*K.1^4-2*K.1^-4,-4+3*K.1-3*K.1^2+2*K.1^4-K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,2+2*K.1-2*K.1^2-2*K.1^-4,2+2*K.1^4+2*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,1-2*K.1^4-2*K.1^-4,1+2*K.1-2*K.1^2+2*K.1^4,1-2*K.1+2*K.1^2+2*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,-24,0,0,0,0,24,24,-12,-12,0,0,0,0,0,-6,6,0,0,0,0,0,0,0,0,0,0,0,12,-12+4*K.1-4*K.1^2-16*K.1^4-20*K.1^-4,-12-20*K.1+20*K.1^2-4*K.1^4+16*K.1^-4,-12+16*K.1-16*K.1^2+20*K.1^4+4*K.1^-4,15+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,15-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,15+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,12,-6-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,15+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,15+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,15-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-12,-3,6+7*K.1-7*K.1^2+11*K.1^4+4*K.1^-4,6+4*K.1-4*K.1^2-7*K.1^4-11*K.1^-4,6-11*K.1+11*K.1^2-4*K.1^4+7*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,6-11*K.1+11*K.1^2-7*K.1^4+4*K.1^-4,6+4*K.1-4*K.1^2+11*K.1^4+7*K.1^-4,6+7*K.1-7*K.1^2-4*K.1^4-11*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-3+6*K.1-6*K.1^2+6*K.1^4,-3-6*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2+6*K.1^-4,-6-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,3,3,-3,3,-12,-3-6*K.1+6*K.1^2+6*K.1^-4,-3+6*K.1-6*K.1^2+6*K.1^4,-3-6*K.1^4-6*K.1^-4,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,0,0,0,0,0,0,0,0,0,0,4+4*K.1^4+4*K.1^-4,4-4*K.1+4*K.1^2-4*K.1^4,4+4*K.1-4*K.1^2-4*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^-4,-3+3*K.1^4+3*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,-4+2*K.1^4+2*K.1^-4,-4-2*K.1+2*K.1^2-2*K.1^4,-4+2*K.1-2*K.1^2-2*K.1^-4,-2-6*K.1+6*K.1^2-2*K.1^4+4*K.1^-4,-2+2*K.1-2*K.1^2-4*K.1^4-6*K.1^-4,-2+4*K.1-4*K.1^2+6*K.1^4+2*K.1^-4,2+2*K.1^4+2*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,2+2*K.1-2*K.1^2-2*K.1^-4,-2+6*K.1-6*K.1^2+4*K.1^4-2*K.1^-4,-2-4*K.1+4*K.1^2+2*K.1^4+6*K.1^-4,-2-2*K.1+2*K.1^2-6*K.1^4-4*K.1^-4,2-4*K.1+4*K.1^2-6*K.1^4-2*K.1^-4,2+6*K.1-6*K.1^2+2*K.1^4-4*K.1^-4,2-2*K.1+2*K.1^2+4*K.1^4+6*K.1^-4,6,-3,2+3*K.1-3*K.1^2+2*K.1^4-K.1^-4,2-2*K.1+2*K.1^2+K.1^4+3*K.1^-4,2-K.1+K.1^2-3*K.1^4-2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-4+3*K.1-3*K.1^2+2*K.1^4-K.1^-4,-4-2*K.1+2*K.1^2+K.1^4+3*K.1^-4,-4-K.1+K.1^2-3*K.1^4-2*K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,2+2*K.1-2*K.1^2-2*K.1^-4,2+2*K.1^4+2*K.1^-4,1-2*K.1+2*K.1^2+2*K.1^-4,1-2*K.1^4-2*K.1^-4,1+2*K.1-2*K.1^2+2*K.1^4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,-24,0,0,0,0,24,24,-12,-12,0,0,0,0,0,-6,6,0,0,0,0,0,0,0,0,0,0,0,12,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-3+3*K.1-3*K.1^2-12*K.1^4-15*K.1^-4,-3-15*K.1+15*K.1^2-3*K.1^4+12*K.1^-4,-3+12*K.1-12*K.1^2+15*K.1^4+3*K.1^-4,-24,-12-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,-12-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-12+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-12*K.1-12*K.1^-1,-12*K.1^2-12*K.1^-2,-12*K.1^4-12*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3,6,K.1-K.1^2-4*K.1^4-5*K.1^-4,-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,4*K.1-4*K.1^2+5*K.1^4+K.1^-4,3*K.1-3*K.1^2-6*K.1^4-9*K.1^-4,-9*K.1+9*K.1^2-3*K.1^4+6*K.1^-4,6*K.1-6*K.1^2+9*K.1^4+3*K.1^-4,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,12+4*K.1-4*K.1^2-K.1^4-5*K.1^-4,12-5*K.1+5*K.1^2-4*K.1^4+K.1^-4,12+K.1-K.1^2+5*K.1^4+4*K.1^-4,-3+12*K.1-12*K.1^2-12*K.1^-4,-3-12*K.1+12*K.1^2-12*K.1^4,-3+12*K.1^4+12*K.1^-4,6-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,6-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,6+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,-6,3,6,-6,-3,6-6*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2+6*K.1^-4,6+6*K.1-6*K.1^2+6*K.1^4,-6+K.1-K.1^2+5*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2-K.1^4-5*K.1^-4,-6-5*K.1+5*K.1^2-4*K.1^4+K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,0,0,0,0,0,0,0,4-4*K.1+4*K.1^2-4*K.1^4,4+4*K.1-4*K.1^2-4*K.1^-4,4+4*K.1^4+4*K.1^-4,-3+3*K.1^4+3*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,-3+3*K.1-3*K.1^2-3*K.1^-4,2-2*K.1+2*K.1^2+4*K.1^4+6*K.1^-4,2-4*K.1+4*K.1^2-6*K.1^4-2*K.1^-4,2+6*K.1-6*K.1^2+2*K.1^4-4*K.1^-4,-2-4*K.1+4*K.1^2+2*K.1^4+6*K.1^-4,-2-2*K.1+2*K.1^2-6*K.1^4-4*K.1^-4,-2+6*K.1-6*K.1^2+4*K.1^4-2*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,2+2*K.1-2*K.1^2-2*K.1^-4,2+2*K.1^4+2*K.1^-4,-2+2*K.1-2*K.1^2-4*K.1^4-6*K.1^-4,-2+4*K.1-4*K.1^2+6*K.1^4+2*K.1^-4,-2-6*K.1+6*K.1^2-2*K.1^4+4*K.1^-4,-4+2*K.1^4+2*K.1^-4,-4-2*K.1+2*K.1^2-2*K.1^4,-4+2*K.1-2*K.1^2-2*K.1^-4,-3,6,2-2*K.1+2*K.1^2+K.1^4+3*K.1^-4,2-K.1+K.1^2-3*K.1^4-2*K.1^-4,2+3*K.1-3*K.1^2+2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,2+2*K.1-2*K.1^2-2*K.1^-4,2+2*K.1^4+2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,-4-K.1+K.1^2-3*K.1^4-2*K.1^-4,-4+3*K.1-3*K.1^2+2*K.1^4-K.1^-4,-4-2*K.1+2*K.1^2+K.1^4+3*K.1^-4,1-2*K.1^4-2*K.1^-4,1+2*K.1-2*K.1^2+2*K.1^4,1-2*K.1+2*K.1^2+2*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,-24,0,0,0,0,24,24,-12,-12,0,0,0,0,0,-6,6,0,0,0,0,0,0,0,0,0,0,0,12,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-3+12*K.1-12*K.1^2+15*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-12*K.1^4-15*K.1^-4,-3-15*K.1+15*K.1^2-3*K.1^4+12*K.1^-4,-24,-12+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-12-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,-12-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-12*K.1^4-12*K.1^-4,-12*K.1-12*K.1^-1,-12*K.1^2-12*K.1^-2,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3,6,4*K.1-4*K.1^2+5*K.1^4+K.1^-4,K.1-K.1^2-4*K.1^4-5*K.1^-4,-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,6*K.1-6*K.1^2+9*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-6*K.1^4-9*K.1^-4,-9*K.1+9*K.1^2-3*K.1^4+6*K.1^-4,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,12+K.1-K.1^2+5*K.1^4+4*K.1^-4,12+4*K.1-4*K.1^2-K.1^4-5*K.1^-4,12-5*K.1+5*K.1^2-4*K.1^4+K.1^-4,-3+12*K.1^4+12*K.1^-4,-3+12*K.1-12*K.1^2-12*K.1^-4,-3-12*K.1+12*K.1^2-12*K.1^4,6+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,6-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,6-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,-6,3,6,-6,-3,6+6*K.1-6*K.1^2+6*K.1^4,6-6*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2+6*K.1^-4,-6-5*K.1+5*K.1^2-4*K.1^4+K.1^-4,-6+K.1-K.1^2+5*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2-K.1^4-5*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,0,0,0,0,0,0,0,4+4*K.1-4*K.1^2-4*K.1^-4,4+4*K.1^4+4*K.1^-4,4-4*K.1+4*K.1^2-4*K.1^4,-3-3*K.1+3*K.1^2-3*K.1^4,-3+3*K.1-3*K.1^2-3*K.1^-4,-3+3*K.1^4+3*K.1^-4,2-4*K.1+4*K.1^2-6*K.1^4-2*K.1^-4,2+6*K.1-6*K.1^2+2*K.1^4-4*K.1^-4,2-2*K.1+2*K.1^2+4*K.1^4+6*K.1^-4,-2-2*K.1+2*K.1^2-6*K.1^4-4*K.1^-4,-2+6*K.1-6*K.1^2+4*K.1^4-2*K.1^-4,-2-4*K.1+4*K.1^2+2*K.1^4+6*K.1^-4,2+2*K.1-2*K.1^2-2*K.1^-4,2+2*K.1^4+2*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,-2+4*K.1-4*K.1^2+6*K.1^4+2*K.1^-4,-2-6*K.1+6*K.1^2-2*K.1^4+4*K.1^-4,-2+2*K.1-2*K.1^2-4*K.1^4-6*K.1^-4,-4-2*K.1+2*K.1^2-2*K.1^4,-4+2*K.1-2*K.1^2-2*K.1^-4,-4+2*K.1^4+2*K.1^-4,-3,6,2-K.1+K.1^2-3*K.1^4-2*K.1^-4,2+3*K.1-3*K.1^2+2*K.1^4-K.1^-4,2-2*K.1+2*K.1^2+K.1^4+3*K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,2+2*K.1-2*K.1^2-2*K.1^-4,2+2*K.1^4+2*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-4+3*K.1-3*K.1^2+2*K.1^4-K.1^-4,-4-2*K.1+2*K.1^2+K.1^4+3*K.1^-4,-4-K.1+K.1^2-3*K.1^4-2*K.1^-4,1+2*K.1-2*K.1^2+2*K.1^4,1-2*K.1+2*K.1^2+2*K.1^-4,1-2*K.1^4-2*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,-24,0,0,0,0,24,24,-12,-12,0,0,0,0,0,-6,6,0,0,0,0,0,0,0,0,0,0,0,12,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-3-15*K.1+15*K.1^2-3*K.1^4+12*K.1^-4,-3+12*K.1-12*K.1^2+15*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-12*K.1^4-15*K.1^-4,-24,-12-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-12+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-12-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,-12*K.1^2-12*K.1^-2,-12*K.1^4-12*K.1^-4,-12*K.1-12*K.1^-1,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3,6,-5*K.1+5*K.1^2-K.1^4+4*K.1^-4,4*K.1-4*K.1^2+5*K.1^4+K.1^-4,K.1-K.1^2-4*K.1^4-5*K.1^-4,-9*K.1+9*K.1^2-3*K.1^4+6*K.1^-4,6*K.1-6*K.1^2+9*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-6*K.1^4-9*K.1^-4,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,12-5*K.1+5*K.1^2-4*K.1^4+K.1^-4,12+K.1-K.1^2+5*K.1^4+4*K.1^-4,12+4*K.1-4*K.1^2-K.1^4-5*K.1^-4,-3-12*K.1+12*K.1^2-12*K.1^4,-3+12*K.1^4+12*K.1^-4,-3+12*K.1-12*K.1^2-12*K.1^-4,6-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,6+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,6-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,-6,3,6,-6,-3,6-6*K.1+6*K.1^2+6*K.1^-4,6+6*K.1-6*K.1^2+6*K.1^4,6-6*K.1^4-6*K.1^-4,-6+4*K.1-4*K.1^2-K.1^4-5*K.1^-4,-6-5*K.1+5*K.1^2-4*K.1^4+K.1^-4,-6+K.1-K.1^2+5*K.1^4+4*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,0,0,0,0,0,0,0,4+4*K.1^4+4*K.1^-4,4-4*K.1+4*K.1^2-4*K.1^4,4+4*K.1-4*K.1^2-4*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^-4,-3+3*K.1^4+3*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,2+6*K.1-6*K.1^2+2*K.1^4-4*K.1^-4,2-2*K.1+2*K.1^2+4*K.1^4+6*K.1^-4,2-4*K.1+4*K.1^2-6*K.1^4-2*K.1^-4,-2+6*K.1-6*K.1^2+4*K.1^4-2*K.1^-4,-2-4*K.1+4*K.1^2+2*K.1^4+6*K.1^-4,-2-2*K.1+2*K.1^2-6*K.1^4-4*K.1^-4,2+2*K.1^4+2*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,2+2*K.1-2*K.1^2-2*K.1^-4,-2-6*K.1+6*K.1^2-2*K.1^4+4*K.1^-4,-2+2*K.1-2*K.1^2-4*K.1^4-6*K.1^-4,-2+4*K.1-4*K.1^2+6*K.1^4+2*K.1^-4,-4+2*K.1-2*K.1^2-2*K.1^-4,-4+2*K.1^4+2*K.1^-4,-4-2*K.1+2*K.1^2-2*K.1^4,-3,6,2+3*K.1-3*K.1^2+2*K.1^4-K.1^-4,2-2*K.1+2*K.1^2+K.1^4+3*K.1^-4,2-K.1+K.1^2-3*K.1^4-2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,2+2*K.1^4+2*K.1^-4,2-2*K.1+2*K.1^2-2*K.1^4,2+2*K.1-2*K.1^2-2*K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,-4-2*K.1+2*K.1^2+K.1^4+3*K.1^-4,-4-K.1+K.1^2-3*K.1^4-2*K.1^-4,-4+3*K.1-3*K.1^2+2*K.1^4-K.1^-4,1-2*K.1+2*K.1^2+2*K.1^-4,1-2*K.1^4-2*K.1^-4,1+2*K.1-2*K.1^2+2*K.1^4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,-24,0,0,0,0,60,-48,24,-12,0,0,0,0,-12,12,0,0,0,0,0,0,0,0,0,0,0,0,0,-12+12*K.1^4+12*K.1^-4,-12+12*K.1-12*K.1^2-12*K.1^-4,-12-12*K.1+12*K.1^2-12*K.1^4,6+9*K.1-9*K.1^2-9*K.1^-4,6-9*K.1+9*K.1^2-9*K.1^4,6+9*K.1^4+9*K.1^-4,0,-12+6*K.1-6*K.1^2+6*K.1^4,-12-6*K.1^4-6*K.1^-4,-12-6*K.1+6*K.1^2+6*K.1^-4,0,0,0,-3-9*K.1+9*K.1^2-9*K.1^4,-3+9*K.1^4+9*K.1^-4,-3+9*K.1-9*K.1^2-9*K.1^-4,6,6,-3+6*K.1-6*K.1^2+6*K.1^4,-3-6*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2+6*K.1^-4,6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3+6*K.1-6*K.1^2+6*K.1^4,-3-6*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2+6*K.1^-4,6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3+12*K.1-12*K.1^2-12*K.1^-4,-3-12*K.1+12*K.1^2-12*K.1^4,-3+12*K.1^4+12*K.1^-4,0,0,0,6-12*K.1+12*K.1^2-12*K.1^4,6+12*K.1^4+12*K.1^-4,6+12*K.1-12*K.1^2-12*K.1^-4,0,0,0,0,0,-3,0,-3,0,0,0,6-6*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2+6*K.1^-4,6+6*K.1-6*K.1^2+6*K.1^4,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,0,0,0,0,0,0,0,8-4*K.1^4-4*K.1^-4,8+4*K.1-4*K.1^2+4*K.1^4,8-4*K.1+4*K.1^2+4*K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1-3*K.1^-1,-2-2*K.1+2*K.1^2+2*K.1^-4,-2-2*K.1^4-2*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,2-4*K.1^4-4*K.1^-4,2+4*K.1-4*K.1^2+4*K.1^4,2-4*K.1+4*K.1^2+4*K.1^-4,-2+4*K.1-4*K.1^2-4*K.1^-4,-2+4*K.1^4+4*K.1^-4,-2-4*K.1+4*K.1^2-4*K.1^4,2-4*K.1^4-4*K.1^-4,2+4*K.1-4*K.1^2+4*K.1^4,2-4*K.1+4*K.1^2+4*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,-2-2*K.1+2*K.1^2+2*K.1^-4,-2-2*K.1^4-2*K.1^-4,0,0,1+4*K.1-4*K.1^2-4*K.1^-4,1+4*K.1^4+4*K.1^-4,1-4*K.1+4*K.1^2-4*K.1^4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,1-2*K.1+2*K.1^2+2*K.1^-4,1-2*K.1^4-2*K.1^-4,1+2*K.1-2*K.1^2+2*K.1^4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,1-2*K.1^4-2*K.1^-4,1+2*K.1-2*K.1^2+2*K.1^4,1-2*K.1+2*K.1^2+2*K.1^-4,-4-4*K.1+4*K.1^2+4*K.1^-4,-4-4*K.1^4-4*K.1^-4,-4+4*K.1-4*K.1^2+4*K.1^4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,-24,0,0,0,0,60,-48,24,-12,0,0,0,0,-12,12,0,0,0,0,0,0,0,0,0,0,0,0,0,-12-12*K.1+12*K.1^2-12*K.1^4,-12+12*K.1^4+12*K.1^-4,-12+12*K.1-12*K.1^2-12*K.1^-4,6+9*K.1^4+9*K.1^-4,6+9*K.1-9*K.1^2-9*K.1^-4,6-9*K.1+9*K.1^2-9*K.1^4,0,-12-6*K.1+6*K.1^2+6*K.1^-4,-12+6*K.1-6*K.1^2+6*K.1^4,-12-6*K.1^4-6*K.1^-4,0,0,0,-3+9*K.1-9*K.1^2-9*K.1^-4,-3-9*K.1+9*K.1^2-9*K.1^4,-3+9*K.1^4+9*K.1^-4,6,6,-3-6*K.1+6*K.1^2+6*K.1^-4,-3+6*K.1-6*K.1^2+6*K.1^4,-3-6*K.1^4-6*K.1^-4,6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3-6*K.1+6*K.1^2+6*K.1^-4,-3+6*K.1-6*K.1^2+6*K.1^4,-3-6*K.1^4-6*K.1^-4,6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3+12*K.1^4+12*K.1^-4,-3+12*K.1-12*K.1^2-12*K.1^-4,-3-12*K.1+12*K.1^2-12*K.1^4,0,0,0,6+12*K.1-12*K.1^2-12*K.1^-4,6-12*K.1+12*K.1^2-12*K.1^4,6+12*K.1^4+12*K.1^-4,0,0,0,0,0,-3,0,-3,0,0,0,6+6*K.1-6*K.1^2+6*K.1^4,6-6*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2+6*K.1^-4,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,0,0,0,0,0,0,0,8+4*K.1-4*K.1^2+4*K.1^4,8-4*K.1+4*K.1^2+4*K.1^-4,8-4*K.1^4-4*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1-3*K.1^-1,-3*K.1^4-3*K.1^-4,-2-2*K.1^4-2*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,-2-2*K.1+2*K.1^2+2*K.1^-4,2+4*K.1-4*K.1^2+4*K.1^4,2-4*K.1+4*K.1^2+4*K.1^-4,2-4*K.1^4-4*K.1^-4,-2+4*K.1^4+4*K.1^-4,-2-4*K.1+4*K.1^2-4*K.1^4,-2+4*K.1-4*K.1^2-4*K.1^-4,2+4*K.1-4*K.1^2+4*K.1^4,2-4*K.1+4*K.1^2+4*K.1^-4,2-4*K.1^4-4*K.1^-4,-2-2*K.1+2*K.1^2+2*K.1^-4,-2-2*K.1^4-2*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,0,0,1+4*K.1^4+4*K.1^-4,1-4*K.1+4*K.1^2-4*K.1^4,1+4*K.1-4*K.1^2-4*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,1-2*K.1^4-2*K.1^-4,1+2*K.1-2*K.1^2+2*K.1^4,1-2*K.1+2*K.1^2+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,1+2*K.1-2*K.1^2+2*K.1^4,1-2*K.1+2*K.1^2+2*K.1^-4,1-2*K.1^4-2*K.1^-4,-4-4*K.1^4-4*K.1^-4,-4+4*K.1-4*K.1^2+4*K.1^4,-4-4*K.1+4*K.1^2+4*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,-24,0,0,0,0,60,-48,24,-12,0,0,0,0,-12,12,0,0,0,0,0,0,0,0,0,0,0,0,0,-12+12*K.1-12*K.1^2-12*K.1^-4,-12-12*K.1+12*K.1^2-12*K.1^4,-12+12*K.1^4+12*K.1^-4,6-9*K.1+9*K.1^2-9*K.1^4,6+9*K.1^4+9*K.1^-4,6+9*K.1-9*K.1^2-9*K.1^-4,0,-12-6*K.1^4-6*K.1^-4,-12-6*K.1+6*K.1^2+6*K.1^-4,-12+6*K.1-6*K.1^2+6*K.1^4,0,0,0,-3+9*K.1^4+9*K.1^-4,-3+9*K.1-9*K.1^2-9*K.1^-4,-3-9*K.1+9*K.1^2-9*K.1^4,6,6,-3-6*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2+6*K.1^-4,-3+6*K.1-6*K.1^2+6*K.1^4,6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3-6*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2+6*K.1^-4,-3+6*K.1-6*K.1^2+6*K.1^4,6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3-12*K.1+12*K.1^2-12*K.1^4,-3+12*K.1^4+12*K.1^-4,-3+12*K.1-12*K.1^2-12*K.1^-4,0,0,0,6+12*K.1^4+12*K.1^-4,6+12*K.1-12*K.1^2-12*K.1^-4,6-12*K.1+12*K.1^2-12*K.1^4,0,0,0,0,0,-3,0,-3,0,0,0,6-6*K.1+6*K.1^2+6*K.1^-4,6+6*K.1-6*K.1^2+6*K.1^4,6-6*K.1^4-6*K.1^-4,-3+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,0,0,0,0,0,0,0,8-4*K.1+4*K.1^2+4*K.1^-4,8-4*K.1^4-4*K.1^-4,8+4*K.1-4*K.1^2+4*K.1^4,-3*K.1-3*K.1^-1,-3*K.1^4-3*K.1^-4,-3*K.1^2-3*K.1^-2,-2+2*K.1-2*K.1^2+2*K.1^4,-2-2*K.1+2*K.1^2+2*K.1^-4,-2-2*K.1^4-2*K.1^-4,2-4*K.1+4*K.1^2+4*K.1^-4,2-4*K.1^4-4*K.1^-4,2+4*K.1-4*K.1^2+4*K.1^4,-2-4*K.1+4*K.1^2-4*K.1^4,-2+4*K.1-4*K.1^2-4*K.1^-4,-2+4*K.1^4+4*K.1^-4,2-4*K.1+4*K.1^2+4*K.1^-4,2-4*K.1^4-4*K.1^-4,2+4*K.1-4*K.1^2+4*K.1^4,-2-2*K.1^4-2*K.1^-4,-2+2*K.1-2*K.1^2+2*K.1^4,-2-2*K.1+2*K.1^2+2*K.1^-4,0,0,1-4*K.1+4*K.1^2-4*K.1^4,1+4*K.1-4*K.1^2-4*K.1^-4,1+4*K.1^4+4*K.1^-4,-2*K.1+2*K.1^2-K.1^4+K.1^-4,K.1-K.1^2-K.1^4-2*K.1^-4,K.1-K.1^2+2*K.1^4+K.1^-4,1+2*K.1-2*K.1^2+2*K.1^4,1-2*K.1+2*K.1^2+2*K.1^-4,1-2*K.1^4-2*K.1^-4,2*K.1-2*K.1^2+K.1^4-K.1^-4,-1*K.1+K.1^2+K.1^4+2*K.1^-4,-1*K.1+K.1^2-2*K.1^4-K.1^-4,1-2*K.1+2*K.1^2+2*K.1^-4,1-2*K.1^4-2*K.1^-4,1+2*K.1-2*K.1^2+2*K.1^4,-4+4*K.1-4*K.1^2+4*K.1^4,-4-4*K.1+4*K.1^2+4*K.1^-4,-4-4*K.1^4-4*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,0,0,-8,0,0,-48,6,24,-12,0,0,0,0,0,0,0,0,0,4,-2,0,0,0,0,0,0,0,0,-12*K.1-12*K.1^-1,-12*K.1^2-12*K.1^-2,-12*K.1^4-12*K.1^-4,6+18*K.1-18*K.1^2-18*K.1^-4,6-18*K.1+18*K.1^2-18*K.1^4,6+18*K.1^4+18*K.1^-4,18,-12*K.1^4-12*K.1^-4,-12*K.1-12*K.1^-1,-12*K.1^2-12*K.1^-2,0,0,0,-3+9*K.1-9*K.1^2+9*K.1^4,-3-9*K.1^4-9*K.1^-4,-3-9*K.1+9*K.1^2+9*K.1^-4,6,6,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,6-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,6+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,-12+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,-12+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,-12-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,0,0,0,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,9,9,9,-9,0,-3,-9,-3,0,0,0,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,2+2*K.1-2*K.1^2+2*K.1^4,2-2*K.1+2*K.1^2+2*K.1^-4,2-2*K.1^4-2*K.1^-4,0,0,0,0,0,0,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,-1-2*K.1^4-2*K.1^-4,-1+2*K.1-2*K.1^2+2*K.1^4,-1-2*K.1+2*K.1^2+2*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,0,0,-8,0,0,-48,6,24,-12,0,0,0,0,0,0,0,0,0,4,-2,0,0,0,0,0,0,0,0,-12*K.1^2-12*K.1^-2,-12*K.1^4-12*K.1^-4,-12*K.1-12*K.1^-1,6-18*K.1+18*K.1^2-18*K.1^4,6+18*K.1^4+18*K.1^-4,6+18*K.1-18*K.1^2-18*K.1^-4,18,-12*K.1-12*K.1^-1,-12*K.1^2-12*K.1^-2,-12*K.1^4-12*K.1^-4,0,0,0,-3-9*K.1^4-9*K.1^-4,-3-9*K.1+9*K.1^2+9*K.1^-4,-3+9*K.1-9*K.1^2+9*K.1^4,6,6,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,6+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,-12+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,-12-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,-12+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,0,0,0,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,9,9,9,-9,0,-3,-9,-3,0,0,0,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,2-2*K.1^4-2*K.1^-4,2+2*K.1-2*K.1^2+2*K.1^4,2-2*K.1+2*K.1^2+2*K.1^-4,0,0,0,0,0,0,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1-2*K.1+2*K.1^2+2*K.1^-4,-1-2*K.1^4-2*K.1^-4,-1+2*K.1-2*K.1^2+2*K.1^4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,0,0,-8,0,0,-48,6,24,-12,0,0,0,0,0,0,0,0,0,4,-2,0,0,0,0,0,0,0,0,-12*K.1^4-12*K.1^-4,-12*K.1-12*K.1^-1,-12*K.1^2-12*K.1^-2,6+18*K.1^4+18*K.1^-4,6+18*K.1-18*K.1^2-18*K.1^-4,6-18*K.1+18*K.1^2-18*K.1^4,18,-12*K.1^2-12*K.1^-2,-12*K.1^4-12*K.1^-4,-12*K.1-12*K.1^-1,0,0,0,-3-9*K.1+9*K.1^2+9*K.1^-4,-3+9*K.1-9*K.1^2+9*K.1^4,-3-9*K.1^4-9*K.1^-4,6,6,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,6-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,6+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,-12-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,-12+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,-12+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,0,0,0,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,9,9,9,-9,0,-3,-9,-3,0,0,0,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,2-2*K.1+2*K.1^2+2*K.1^-4,2-2*K.1^4-2*K.1^-4,2+2*K.1-2*K.1^2+2*K.1^4,0,0,0,0,0,0,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,-1+2*K.1-2*K.1^2+2*K.1^4,-1-2*K.1+2*K.1^2+2*K.1^-4,-1-2*K.1^4-2*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,0,0,-8,0,0,24,24,-12,-12,0,0,0,0,0,0,0,0,0,-2,4,0,0,0,0,0,0,0,-24,12+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,12+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,12-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,6+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,12,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-12*K.1^2-12*K.1^-2,-12*K.1^4-12*K.1^-4,-12*K.1-12*K.1^-1,6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,6,-12,-6+10*K.1-10*K.1^2+14*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2-10*K.1^4-14*K.1^-4,-6-14*K.1+14*K.1^2-4*K.1^4+10*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,-6-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,0,0,0,6-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,6-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,6+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,6-12*K.1+12*K.1^2-12*K.1^4,6+12*K.1^4+12*K.1^-4,6+12*K.1-12*K.1^2-12*K.1^-4,9+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,9+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,9-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,3,-6,-12,3,6,-3+3*K.1-3*K.1^2-3*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,-3+3*K.1^4+3*K.1^-4,-3+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-3-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,-3-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,0,0,0,0,0,0,2-2*K.1+2*K.1^2+2*K.1^-4,2-2*K.1^4-2*K.1^-4,2+2*K.1-2*K.1^2+2*K.1^4,-1+2*K.1-2*K.1^2+2*K.1^4,-1-2*K.1+2*K.1^2+2*K.1^-4,-1-2*K.1^4-2*K.1^-4,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,0,0,-8,0,0,24,24,-12,-12,0,0,0,0,0,0,0,0,0,-2,4,0,0,0,0,0,0,0,-24,12-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,12+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,12+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,6-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,6+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,12,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-12*K.1-12*K.1^-1,-12*K.1^2-12*K.1^-2,-12*K.1^4-12*K.1^-4,6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,6,-12,-6-14*K.1+14*K.1^2-4*K.1^4+10*K.1^-4,-6+10*K.1-10*K.1^2+14*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2-10*K.1^4-14*K.1^-4,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,6*K.1^2+6*K.1^-2,-6+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-6-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,0,0,0,6+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,6-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,6-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,6+12*K.1-12*K.1^2-12*K.1^-4,6-12*K.1+12*K.1^2-12*K.1^4,6+12*K.1^4+12*K.1^-4,9-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,9+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,9+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,3,-6,-12,3,6,-3+3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^-4,-3-3*K.1+3*K.1^2-3*K.1^4,-3-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-3+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-3-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,2*K.1^4+2*K.1^-4,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,0,0,0,0,0,0,2-2*K.1^4-2*K.1^-4,2+2*K.1-2*K.1^2+2*K.1^4,2-2*K.1+2*K.1^2+2*K.1^-4,-1-2*K.1+2*K.1^2+2*K.1^-4,-1-2*K.1^4-2*K.1^-4,-1+2*K.1-2*K.1^2+2*K.1^4,-1*K.1-K.1^-1,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |96,0,0,-8,0,0,24,24,-12,-12,0,0,0,0,0,0,0,0,0,-2,4,0,0,0,0,0,0,0,-24,12+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,12-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,12+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,6-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,6-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,6+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,12,4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-12*K.1^4-12*K.1^-4,-12*K.1-12*K.1^-1,-12*K.1^2-12*K.1^-2,6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,6,-12,-6+4*K.1-4*K.1^2-10*K.1^4-14*K.1^-4,-6-14*K.1+14*K.1^2-4*K.1^4+10*K.1^-4,-6+10*K.1-10*K.1^2+14*K.1^4+4*K.1^-4,6*K.1^2+6*K.1^-2,6*K.1^4+6*K.1^-4,6*K.1+6*K.1^-1,-6+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-6+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,-6-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,0,0,0,6-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,6+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,6-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,6+12*K.1^4+12*K.1^-4,6+12*K.1-12*K.1^2-12*K.1^-4,6-12*K.1+12*K.1^2-12*K.1^4,9+4*K.1-4*K.1^2-4*K.1^4-8*K.1^-4,9-8*K.1+8*K.1^2-4*K.1^4+4*K.1^-4,9+4*K.1-4*K.1^2+8*K.1^4+4*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1^4-3*K.1^-4,3,-6,-12,3,6,-3-3*K.1+3*K.1^2-3*K.1^4,-3+3*K.1^4+3*K.1^-4,-3+3*K.1-3*K.1^2-3*K.1^-4,-3-2*K.1+2*K.1^2-4*K.1^4-2*K.1^-4,-3-2*K.1+2*K.1^2+2*K.1^4+4*K.1^-4,-3+4*K.1-4*K.1^2+2*K.1^4-2*K.1^-4,-3*K.1^4-3*K.1^-4,-3*K.1-3*K.1^-1,-3*K.1^2-3*K.1^-2,-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,2*K.1^2+2*K.1^-2,2*K.1+2*K.1^-1,2*K.1^4+2*K.1^-4,0,0,0,0,0,0,2+2*K.1-2*K.1^2+2*K.1^4,2-2*K.1+2*K.1^2+2*K.1^-4,2-2*K.1^4-2*K.1^-4,-1-2*K.1^4-2*K.1^-4,-1+2*K.1-2*K.1^2+2*K.1^4,-1-2*K.1+2*K.1^2+2*K.1^-4,-1*K.1^4-K.1^-4,-1*K.1^2-K.1^-2,-1*K.1-K.1^-1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; x := CR!\[192, 0, 0, 0, 0, 0, -96, 12, 48, -24, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 24, 24, 24, -24, -24, -24, -36, -12, -12, -12, 0, 0, 0, 12, 12, 12, -24, -24, 6, 6, 6, 30, 30, 30, 6, 6, 6, -6, -6, -6, -12, -12, -12, 0, 0, 0, 6, 6, 6, -18, -18, -18, 18, 0, 12, 18, 12, 0, 0, 0, -3, -3, -3, -15, -15, -15, 3, 3, 3, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0]; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; x := CR!\[192, 0, 0, 0, 0, 0, -96, 12, 48, -24, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 24, 24, 24, 30, 30, 30, -36, -12, -12, -12, 0, 0, 0, -15, -15, -15, 30, 30, 6, 6, 6, -24, -24, -24, 6, 6, 6, -6, -6, -6, -12, -12, -12, 0, 0, 0, 6, 6, 6, -18, -18, -18, 18, 0, -15, 18, -15, 0, 0, 0, -3, -3, -3, 12, 12, 12, 3, 3, 3, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0]; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; x := CR!\[192, 0, 0, 0, 0, 0, -24, -24, -24, 30, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, -24, -24, -24, -24, -42, -42, -42, 12, 12, 12, 12, 12, 12, 12, 12, 12, 12, 12, 12, 30, 30, 30, -6, -6, -6, -24, -24, -24, 12, 12, 12, -6, -6, -6, -6, -6, -6, 12, 12, 12, -6, -6, -6, -15, 3, -15, 12, -15, 3, 3, 3, -6, -6, -6, -6, -6, -6, 12, 12, 12, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0]; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; x := CR!\[192, 0, 0, 0, 0, 0, -24, -24, -24, 30, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, -24, 48, 48, 48, 12, 12, 12, 12, -24, -24, -24, 12, 12, 12, -15, -15, -15, 12, -42, -6, -6, -6, -6, -6, -6, -6, -6, -6, 12, 12, 12, 12, 12, 12, -6, -6, -6, -24, -24, -24, -6, -6, -6, -15, 3, 12, 12, -15, 3, 3, 3, 12, 12, 12, -6, -6, -6, 12, 12, 12, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0]; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; x := CR!\[192, 0, 0, 0, 0, 0, 120, -96, 48, -24, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, -72, 24, 24, 24, -6, -6, -6, 0, 24, 24, 24, -36, -36, -36, 3, 3, 3, -6, -6, 6, 6, 6, -6, -6, -6, 6, 6, 6, -6, -6, -6, 6, 6, 6, 0, 0, 0, -12, -12, -12, 0, 0, 0, 0, 36, 3, 0, 3, 0, 0, 0, -12, -12, -12, 3, 3, 3, 3, 3, 3, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0]; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |192,0,0,0,0,0,-96,12,48,-24,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-24+24*K.1^4+24*K.1^-4,-24+24*K.1-24*K.1^2-24*K.1^-4,-24-24*K.1+24*K.1^2-24*K.1^4,-6+18*K.1^4+18*K.1^-4,-6+18*K.1-18*K.1^2-18*K.1^-4,-6-18*K.1+18*K.1^2-18*K.1^4,0,12-24*K.1+24*K.1^2-24*K.1^4,12+24*K.1^4+24*K.1^-4,12+24*K.1-24*K.1^2-24*K.1^-4,0,0,0,3-9*K.1+9*K.1^2+9*K.1^-4,3+9*K.1-9*K.1^2+9*K.1^4,3-9*K.1^4-9*K.1^-4,-6,-6,-6+12*K.1-12*K.1^2+12*K.1^4,-6-12*K.1^4-12*K.1^-4,-6-12*K.1+12*K.1^2+12*K.1^-4,-6-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,-6-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,-6+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,-6+12*K.1-12*K.1^2+12*K.1^4,-6-12*K.1^4-12*K.1^-4,-6-12*K.1+12*K.1^2+12*K.1^-4,12-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,12+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,12+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,12-12*K.1+12*K.1^2+12*K.1^-4,12+12*K.1-12*K.1^2+12*K.1^4,12-12*K.1^4-12*K.1^-4,0,0,0,-6-6*K.1+6*K.1^2-6*K.1^4,-6+6*K.1^4+6*K.1^-4,-6+6*K.1-6*K.1^2-6*K.1^-4,0,0,0,0,0,3,0,3,0,0,0,3+6*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2-6*K.1^-4,3-6*K.1+6*K.1^2-6*K.1^4,3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |192,0,0,0,0,0,-96,12,48,-24,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-24-24*K.1+24*K.1^2-24*K.1^4,-24+24*K.1^4+24*K.1^-4,-24+24*K.1-24*K.1^2-24*K.1^-4,-6-18*K.1+18*K.1^2-18*K.1^4,-6+18*K.1^4+18*K.1^-4,-6+18*K.1-18*K.1^2-18*K.1^-4,0,12+24*K.1-24*K.1^2-24*K.1^-4,12-24*K.1+24*K.1^2-24*K.1^4,12+24*K.1^4+24*K.1^-4,0,0,0,3-9*K.1^4-9*K.1^-4,3-9*K.1+9*K.1^2+9*K.1^-4,3+9*K.1-9*K.1^2+9*K.1^4,-6,-6,-6-12*K.1+12*K.1^2+12*K.1^-4,-6+12*K.1-12*K.1^2+12*K.1^4,-6-12*K.1^4-12*K.1^-4,-6+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,-6-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,-6-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,-6-12*K.1+12*K.1^2+12*K.1^-4,-6+12*K.1-12*K.1^2+12*K.1^4,-6-12*K.1^4-12*K.1^-4,12+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,12-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,12+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,12-12*K.1^4-12*K.1^-4,12-12*K.1+12*K.1^2+12*K.1^-4,12+12*K.1-12*K.1^2+12*K.1^4,0,0,0,-6+6*K.1-6*K.1^2-6*K.1^-4,-6-6*K.1+6*K.1^2-6*K.1^4,-6+6*K.1^4+6*K.1^-4,0,0,0,0,0,3,0,3,0,0,0,3-6*K.1+6*K.1^2-6*K.1^4,3+6*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2-6*K.1^-4,3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |192,0,0,0,0,0,-96,12,48,-24,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-24+24*K.1-24*K.1^2-24*K.1^-4,-24-24*K.1+24*K.1^2-24*K.1^4,-24+24*K.1^4+24*K.1^-4,-6+18*K.1-18*K.1^2-18*K.1^-4,-6-18*K.1+18*K.1^2-18*K.1^4,-6+18*K.1^4+18*K.1^-4,0,12+24*K.1^4+24*K.1^-4,12+24*K.1-24*K.1^2-24*K.1^-4,12-24*K.1+24*K.1^2-24*K.1^4,0,0,0,3+9*K.1-9*K.1^2+9*K.1^4,3-9*K.1^4-9*K.1^-4,3-9*K.1+9*K.1^2+9*K.1^-4,-6,-6,-6-12*K.1^4-12*K.1^-4,-6-12*K.1+12*K.1^2+12*K.1^-4,-6+12*K.1-12*K.1^2+12*K.1^4,-6-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,-6+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,-6-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,-6-12*K.1^4-12*K.1^-4,-6-12*K.1+12*K.1^2+12*K.1^-4,-6+12*K.1-12*K.1^2+12*K.1^4,12+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,12+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,12-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,12+12*K.1-12*K.1^2+12*K.1^4,12-12*K.1^4-12*K.1^-4,12-12*K.1+12*K.1^2+12*K.1^-4,0,0,0,-6+6*K.1^4+6*K.1^-4,-6+6*K.1-6*K.1^2-6*K.1^-4,-6-6*K.1+6*K.1^2-6*K.1^4,0,0,0,0,0,3,0,3,0,0,0,3+6*K.1-6*K.1^2-6*K.1^-4,3-6*K.1+6*K.1^2-6*K.1^4,3+6*K.1^4+6*K.1^-4,3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |192,0,0,0,0,0,-24,-24,-24,30,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-24,-24*K.1-24*K.1^-1,-24*K.1^2-24*K.1^-2,-24*K.1^4-24*K.1^-4,-6,-6,-6,12,12*K.1^2+12*K.1^-2,12*K.1^4+12*K.1^-4,12*K.1+12*K.1^-1,12-12*K.1+12*K.1^2+12*K.1^4+24*K.1^-4,12+24*K.1-24*K.1^2+12*K.1^4-12*K.1^-4,12-12*K.1+12*K.1^2-24*K.1^4-12*K.1^-4,-6-9*K.1+9*K.1^2-18*K.1^4-9*K.1^-4,-6-9*K.1+9*K.1^2+9*K.1^4+18*K.1^-4,-6+18*K.1-18*K.1^2+9*K.1^4-9*K.1^-4,-6,-6,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,12-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,12+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,12-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-6-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,-6+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,-6-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-6-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,-6+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,-6-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-6+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,-6+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,-6-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,12,3,-6,-15,-6,3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,6*K.1-6*K.1^2-3*K.1^4-9*K.1^-4,-9*K.1+9*K.1^2-6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+9*K.1^4+6*K.1^-4,12+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,12-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,12+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |192,0,0,0,0,0,-24,-24,-24,30,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-24,-24*K.1^2-24*K.1^-2,-24*K.1^4-24*K.1^-4,-24*K.1-24*K.1^-1,-6,-6,-6,12,12*K.1^4+12*K.1^-4,12*K.1+12*K.1^-1,12*K.1^2+12*K.1^-2,12+24*K.1-24*K.1^2+12*K.1^4-12*K.1^-4,12-12*K.1+12*K.1^2-24*K.1^4-12*K.1^-4,12-12*K.1+12*K.1^2+12*K.1^4+24*K.1^-4,-6-9*K.1+9*K.1^2+9*K.1^4+18*K.1^-4,-6+18*K.1-18*K.1^2+9*K.1^4-9*K.1^-4,-6-9*K.1+9*K.1^2-18*K.1^4-9*K.1^-4,-6,-6,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,12+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,12-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,12-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-6+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,-6-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,-6-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-6+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,-6-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,-6-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-6+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,-6-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,-6+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,12,3,-6,-15,-6,3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-9*K.1+9*K.1^2-6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+9*K.1^4+6*K.1^-4,6*K.1-6*K.1^2-3*K.1^4-9*K.1^-4,12-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,12+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,12+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |192,0,0,0,0,0,-24,-24,-24,30,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-24,-24*K.1^4-24*K.1^-4,-24*K.1-24*K.1^-1,-24*K.1^2-24*K.1^-2,-6,-6,-6,12,12*K.1+12*K.1^-1,12*K.1^2+12*K.1^-2,12*K.1^4+12*K.1^-4,12-12*K.1+12*K.1^2-24*K.1^4-12*K.1^-4,12-12*K.1+12*K.1^2+12*K.1^4+24*K.1^-4,12+24*K.1-24*K.1^2+12*K.1^4-12*K.1^-4,-6+18*K.1-18*K.1^2+9*K.1^4-9*K.1^-4,-6-9*K.1+9*K.1^2-18*K.1^4-9*K.1^-4,-6-9*K.1+9*K.1^2+9*K.1^4+18*K.1^-4,-6,-6,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,12-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,12-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,12+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-6-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,-6-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,-6+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-6-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,-6-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,-6+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-6-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,-6+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,-6+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,12,3,-6,-15,-6,3+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,3+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,3-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+9*K.1^4+6*K.1^-4,6*K.1-6*K.1^2-3*K.1^4-9*K.1^-4,-9*K.1+9*K.1^2-6*K.1^4+3*K.1^-4,12+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,12+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,12-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |192,0,0,0,0,0,-24,-24,-24,30,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-24,0,0,0,12-18*K.1+18*K.1^2+18*K.1^-4,12+18*K.1-18*K.1^2+18*K.1^4,12-18*K.1^4-18*K.1^-4,-24,-24*K.1+24*K.1^2-12*K.1^4+12*K.1^-4,12*K.1-12*K.1^2+24*K.1^4+12*K.1^-4,12*K.1-12*K.1^2-12*K.1^4-24*K.1^-4,12-24*K.1+24*K.1^2-12*K.1^4+12*K.1^-4,12+12*K.1-12*K.1^2+24*K.1^4+12*K.1^-4,12+12*K.1-12*K.1^2-12*K.1^4-24*K.1^-4,12+9*K.1^4+9*K.1^-4,12+9*K.1-9*K.1^2-9*K.1^-4,12-9*K.1+9*K.1^2-9*K.1^4,12,12,0,0,0,-6+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,-6-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,-6-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,0,0,0,-6,-6,-6,6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,-6-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,-6+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,-6+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,12-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,12-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,12+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,3,3,12,3,12,-6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-6-9*K.1+9*K.1^2+9*K.1^-4,-6+9*K.1-9*K.1^2+9*K.1^4,-6-9*K.1^4-9*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |192,0,0,0,0,0,-24,-24,-24,30,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-24,0,0,0,12+18*K.1-18*K.1^2+18*K.1^4,12-18*K.1^4-18*K.1^-4,12-18*K.1+18*K.1^2+18*K.1^-4,-24,12*K.1-12*K.1^2+24*K.1^4+12*K.1^-4,12*K.1-12*K.1^2-12*K.1^4-24*K.1^-4,-24*K.1+24*K.1^2-12*K.1^4+12*K.1^-4,12+12*K.1-12*K.1^2+24*K.1^4+12*K.1^-4,12+12*K.1-12*K.1^2-12*K.1^4-24*K.1^-4,12-24*K.1+24*K.1^2-12*K.1^4+12*K.1^-4,12+9*K.1-9*K.1^2-9*K.1^-4,12-9*K.1+9*K.1^2-9*K.1^4,12+9*K.1^4+9*K.1^-4,12,12,0,0,0,-6-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,-6-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,-6+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,0,0,0,-6,-6,-6,-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,-6+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,-6+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,-6-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,12-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,12+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,12-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,3,3,12,3,12,-6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-6+9*K.1-9*K.1^2+9*K.1^4,-6-9*K.1^4-9*K.1^-4,-6-9*K.1+9*K.1^2+9*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |192,0,0,0,0,0,-24,-24,-24,30,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-24,0,0,0,12-18*K.1^4-18*K.1^-4,12-18*K.1+18*K.1^2+18*K.1^-4,12+18*K.1-18*K.1^2+18*K.1^4,-24,12*K.1-12*K.1^2-12*K.1^4-24*K.1^-4,-24*K.1+24*K.1^2-12*K.1^4+12*K.1^-4,12*K.1-12*K.1^2+24*K.1^4+12*K.1^-4,12+12*K.1-12*K.1^2-12*K.1^4-24*K.1^-4,12-24*K.1+24*K.1^2-12*K.1^4+12*K.1^-4,12+12*K.1-12*K.1^2+24*K.1^4+12*K.1^-4,12-9*K.1+9*K.1^2-9*K.1^4,12+9*K.1^4+9*K.1^-4,12+9*K.1-9*K.1^2-9*K.1^-4,12,12,0,0,0,-6-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,-6+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,-6-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,0,0,0,-6,-6,-6,6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,-6+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,-6-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,-6+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,12+12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,12-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,12-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,3,3,12,3,12,-6-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-6-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-6+6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,-6-6*K.1+6*K.1^2-3*K.1^4+3*K.1^-4,-6+3*K.1-3*K.1^2+6*K.1^4+3*K.1^-4,-6+3*K.1-3*K.1^2-3*K.1^4-6*K.1^-4,-6-9*K.1^4-9*K.1^-4,-6-9*K.1+9*K.1^2+9*K.1^-4,-6+9*K.1-9*K.1^2+9*K.1^4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |192,0,0,0,0,0,48,48,-24,-24,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-48,8*K.1-8*K.1^2+16*K.1^4+8*K.1^-4,8*K.1-8*K.1^2-8*K.1^4-16*K.1^-4,-16*K.1+16*K.1^2-8*K.1^4+8*K.1^-4,-6-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,-6+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,-6+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,-12,12-4*K.1+4*K.1^2-8*K.1^4-4*K.1^-4,12-4*K.1+4*K.1^2+4*K.1^4+8*K.1^-4,12+8*K.1-8*K.1^2+4*K.1^4-4*K.1^-4,12*K.1+12*K.1^-1,12*K.1^2+12*K.1^-2,12*K.1^4+12*K.1^-4,-6+15*K.1-15*K.1^2+12*K.1^4-3*K.1^-4,-6-3*K.1+3*K.1^2-15*K.1^4-12*K.1^-4,-6-12*K.1+12*K.1^2+3*K.1^4+15*K.1^-4,-6,12,2*K.1-2*K.1^2-8*K.1^4-10*K.1^-4,-10*K.1+10*K.1^2-2*K.1^4+8*K.1^-4,8*K.1-8*K.1^2+10*K.1^4+2*K.1^-4,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-16*K.1+16*K.1^2-8*K.1^4+8*K.1^-4,8*K.1-8*K.1^2+16*K.1^4+8*K.1^-4,8*K.1-8*K.1^2-8*K.1^4-16*K.1^-4,-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,-12+8*K.1-8*K.1^2-2*K.1^4-10*K.1^-4,-12-10*K.1+10*K.1^2-8*K.1^4+2*K.1^-4,-12+2*K.1-2*K.1^2+10*K.1^4+8*K.1^-4,12-12*K.1+12*K.1^2+12*K.1^-4,12+12*K.1-12*K.1^2+12*K.1^4,12-12*K.1^4-12*K.1^-4,-6-4*K.1+4*K.1^2-8*K.1^4-4*K.1^-4,-6-4*K.1+4*K.1^2+4*K.1^4+8*K.1^-4,-6+8*K.1-8*K.1^2+4*K.1^4-4*K.1^-4,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-6*K.1-6*K.1^-1,-3,-12,12,-3,-6,3+6*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2-6*K.1^-4,3-6*K.1+6*K.1^2-6*K.1^4,6+2*K.1-2*K.1^2+10*K.1^4+8*K.1^-4,6+8*K.1-8*K.1^2-2*K.1^4-10*K.1^-4,6-10*K.1+10*K.1^2-8*K.1^4+2*K.1^-4,-9*K.1+9*K.1^2-6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+9*K.1^4+6*K.1^-4,6*K.1-6*K.1^2-3*K.1^4-9*K.1^-4,6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K |192,0,0,0,0,0,48,48,-24,-24,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,-48,-16*K.1+16*K.1^2-8*K.1^4+8*K.1^-4,8*K.1-8*K.1^2+16*K.1^4+8*K.1^-4,8*K.1-8*K.1^2-8*K.1^4-16*K.1^-4,-6+6*K.1-6*K.1^2-6*K.1^4-12*K.1^-4,-6-12*K.1+12*K.1^2-6*K.1^4+6*K.1^-4,-6+6*K.1-6*K.1^2+12*K.1^4+6*K.1^-4,-12,12+8*K.1-8*K.1^2+4*K.1^4-4*K.1^-4,12-4*K.1+4*K.1^2-8*K.1^4-4*K.1^-4,12-4*K.1+4*K.1^2+4*K.1^4+8*K.1^-4,12*K.1^4+12*K.1^-4,12*K.1+12*K.1^-1,12*K.1^2+12*K.1^-2,-6-12*K.1+12*K.1^2+3*K.1^4+15*K.1^-4,-6+15*K.1-15*K.1^2+12*K.1^4-3*K.1^-4,-6-3*K.1+3*K.1^2-15*K.1^4-12*K.1^-4,-6,12,8*K.1-8*K.1^2+10*K.1^4+2*K.1^-4,2*K.1-2*K.1^2-8*K.1^4-10*K.1^-4,-10*K.1+10*K.1^2-2*K.1^4+8*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,8*K.1-8*K.1^2-8*K.1^4-16*K.1^-4,-16*K.1+16*K.1^2-8*K.1^4+8*K.1^-4,8*K.1-8*K.1^2+16*K.1^4+8*K.1^-4,-6*K.1+6*K.1^2-12*K.1^4-6*K.1^-4,-6*K.1+6*K.1^2+6*K.1^4+12*K.1^-4,12*K.1-12*K.1^2+6*K.1^4-6*K.1^-4,-12+2*K.1-2*K.1^2+10*K.1^4+8*K.1^-4,-12+8*K.1-8*K.1^2-2*K.1^4-10*K.1^-4,-12-10*K.1+10*K.1^2-8*K.1^4+2*K.1^-4,12-12*K.1^4-12*K.1^-4,12-12*K.1+12*K.1^2+12*K.1^-4,12+12*K.1-12*K.1^2+12*K.1^4,-6+8*K.1-8*K.1^2+4*K.1^4-4*K.1^-4,-6-4*K.1+4*K.1^2-8*K.1^4-4*K.1^-4,-6-4*K.1+4*K.1^2+4*K.1^4+8*K.1^-4,-6*K.1-6*K.1^-1,-6*K.1^2-6*K.1^-2,-6*K.1^4-6*K.1^-4,-3,-12,12,-3,-6,3-6*K.1+6*K.1^2-6*K.1^4,3+6*K.1^4+6*K.1^-4,3+6*K.1-6*K.1^2-6*K.1^-4,6-10*K.1+10*K.1^2-8*K.1^4+2*K.1^-4,6+2*K.1-2*K.1^2+10*K.1^4+8*K.1^-4,6+8*K.1-8*K.1^2-2*K.1^4-10*K.1^-4,6*K.1-6*K.1^2-3*K.1^4-9*K.1^-4,-9*K.1+9*K.1^2-6*K.1^4+3*K.1^-4,3*K.1-3*K.1^2+9*K.1^4+6*K.1^-4,-3*K.1+3*K.1^2+3*K.1^4+6*K.1^-4,6*K.1-6*K.1^2+3*K.1^4-3*K.1^-4,-3*K.1+3*K.1^2-6*K.1^4-3*K.1^-4,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0]; x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; K := CyclotomicField(9: Sparse := true); S := [ K 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x := CR!S; x`IsCharacter := true; x`Schur := 1; x`IsIrreducible := true; _ := CharacterTable(G : Check := 0); chartbl_1259712_jq:= KnownIrreducibles(CR);