Phi_1(x)=x - 1
Phi_2(x)=x + 1
Phi_3(x)=x^2 + x + 1
Phi_4(x)=x^2 + 1
Phi_5(x)=x^4 + x^3 + x^2 + x + 1
Phi_6(x)=x^2 - x + 1
Phi_7(x)=x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_8(x)=x^4 + 1
Phi_9(x)=x^6 + x^3 + 1
Phi_10(x)=x^4 - x^3 + x^2 - x + 1
Phi_11(x)=x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_12(x)=x^4 - x^2 + 1
Phi_13(x)=x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_14(x)=x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_15(x)=x^8 - x^7 + x^5 - x^4 + x^3 - x + 1
Phi_16(x)=x^8 + 1
Phi_17(x)=x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_18(x)=x^6 - x^3 + 1
Phi_19(x)=x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_20(x)=x^8 - x^6 + x^4 - x^2 + 1
Phi_21(x)=x^12 - x^11 + x^9 - x^8 + x^6 - x^4 + x^3 - x + 1
Phi_22(x)=x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_23(x)=x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_24(x)=x^8 - x^4 + 1
Phi_25(x)=x^20 + x^15 + x^10 + x^5 + 1
Phi_26(x)=x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_27(x)=x^18 + x^9 + 1
Phi_28(x)=x^12 - x^10 + x^8 - x^6 + x^4 - x^2 + 1
Phi_29(x)=x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_30(x)=x^8 + x^7 - x^5 - x^4 - x^3 + x + 1
Phi_31(x)=x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_32(x)=x^16 + 1
Phi_33(x)=x^20 - x^19 + x^17 - x^16 + x^14 - x^13 + x^11 - x^10 + x^9 - x^7 + x^6 - x^4 + x^3 - x + 1
Phi_34(x)=x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_35(x)=x^24 - x^23 + x^19 - x^18 + x^17 - x^16 + x^14 - x^13 + x^12 - x^11 + x^10 - x^8 + x^7 - x^6 + x^5 - x + 1
Phi_36(x)=x^12 - x^6 + 1
Phi_37(x)=x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_38(x)=x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_39(x)=x^24 - x^23 + x^21 - x^20 + x^18 - x^17 + x^15 - x^14 + x^12 - x^10 + x^9 - x^7 + x^6 - x^4 + x^3 - x + 1
Phi_40(x)=x^16 - x^12 + x^8 - x^4 + 1
Phi_41(x)=x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_42(x)=x^12 + x^11 - x^9 - x^8 + x^6 - x^4 - x^3 + x + 1
Phi_43(x)=x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_44(x)=x^20 - x^18 + x^16 - x^14 + x^12 - x^10 + x^8 - x^6 + x^4 - x^2 + 1
Phi_45(x)=x^24 - x^21 + x^15 - x^12 + x^9 - x^3 + 1
Phi_46(x)=x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_47(x)=x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_48(x)=x^16 - x^8 + 1
Phi_49(x)=x^42 + x^35 + x^28 + x^21 + x^14 + x^7 + 1
Phi_50(x)=x^20 - x^15 + x^10 - x^5 + 1
Phi_51(x)=x^32 - x^31 + x^29 - x^28 + x^26 - x^25 + x^23 - x^22 + x^20 - x^19 + x^17 - x^16 + x^15 - x^13 + x^12 - x^10 + x^9 - x^7 + x^6 - x^4 + x^3 - x + 1
Phi_52(x)=x^24 - x^22 + x^20 - x^18 + x^16 - x^14 + x^12 - x^10 + x^8 - x^6 + x^4 - x^2 + 1
Phi_53(x)=x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_54(x)=x^18 - x^9 + 1
Phi_55(x)=x^40 - x^39 + x^35 - x^34 + x^30 - x^28 + x^25 - x^23 + x^20 - x^17 + x^15 - x^12 + x^10 - x^6 + x^5 - x + 1
Phi_56(x)=x^24 - x^20 + x^16 - x^12 + x^8 - x^4 + 1
Phi_57(x)=x^36 - x^35 + x^33 - x^32 + x^30 - x^29 + x^27 - x^26 + x^24 - x^23 + x^21 - x^20 + x^18 - x^16 + x^15 - x^13 + x^12 - x^10 + x^9 - x^7 + x^6 - x^4 + x^3 - x + 1
Phi_58(x)=x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_59(x)=x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_60(x)=x^16 + x^14 - x^10 - x^8 - x^6 + x^2 + 1
Phi_61(x)=x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_62(x)=x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_63(x)=x^36 - x^33 + x^27 - x^24 + x^18 - x^12 + x^9 - x^3 + 1
Phi_64(x)=x^32 + 1
Phi_65(x)=x^48 - x^47 + x^43 - x^42 + x^38 - x^37 + x^35 - x^34 + x^33 - x^32 + x^30 - x^29 + x^28 - x^27 + x^25 - x^24 + x^23 - x^21 + x^20 - x^19 + x^18 - x^16 + x^15 - x^14 + x^13 - x^11 + x^10 - x^6 + x^5 - x + 1
Phi_66(x)=x^20 + x^19 - x^17 - x^16 + x^14 + x^13 - x^11 - x^10 - x^9 + x^7 + x^6 - x^4 - x^3 + x + 1
Phi_67(x)=x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_68(x)=x^32 - x^30 + x^28 - x^26 + x^24 - x^22 + x^20 - x^18 + x^16 - x^14 + x^12 - x^10 + x^8 - x^6 + x^4 - x^2 + 1
Phi_69(x)=x^44 - x^43 + x^41 - x^40 + x^38 - x^37 + x^35 - x^34 + x^32 - x^31 + x^29 - x^28 + x^26 - x^25 + x^23 - x^22 + x^21 - x^19 + x^18 - x^16 + x^15 - x^13 + x^12 - x^10 + x^9 - x^7 + x^6 - x^4 + x^3 - x + 1
Phi_70(x)=x^24 + x^23 - x^19 - x^18 - x^17 - x^16 + x^14 + x^13 + x^12 + x^11 + x^10 - x^8 - x^7 - x^6 - x^5 + x + 1
Phi_71(x)=x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_72(x)=x^24 - x^12 + 1
Phi_73(x)=x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_74(x)=x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_75(x)=x^40 - x^35 + x^25 - x^20 + x^15 - x^5 + 1
Phi_76(x)=x^36 - x^34 + x^32 - x^30 + x^28 - x^26 + x^24 - x^22 + x^20 - x^18 + x^16 - x^14 + x^12 - x^10 + x^8 - x^6 + x^4 - x^2 + 1
Phi_77(x)=x^60 - x^59 + x^53 - x^52 + x^49 - x^48 + x^46 - x^45 + x^42 - x^41 + x^39 - x^37 + x^35 - x^34 + x^32 - x^30 + x^28 - x^26 + x^25 - x^23 + x^21 - x^19 + x^18 - x^15 + x^14 - x^12 + x^11 - x^8 + x^7 - x + 1
Phi_78(x)=x^24 + x^23 - x^21 - x^20 + x^18 + x^17 - x^15 - x^14 + x^12 - x^10 - x^9 + x^7 + x^6 - x^4 - x^3 + x + 1
Phi_79(x)=x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_80(x)=x^32 - x^24 + x^16 - x^8 + 1
Phi_81(x)=x^54 + x^27 + 1
Phi_82(x)=x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_83(x)=x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_84(x)=x^24 + x^22 - x^18 - x^16 + x^12 - x^8 - x^6 + x^2 + 1
Phi_85(x)=x^64 - x^63 + x^59 - x^58 + x^54 - x^53 + x^49 - x^48 + x^47 - x^46 + x^44 - x^43 + x^42 - x^41 + x^39 - x^38 + x^37 - x^36 + x^34 - x^33 + x^32 - x^31 + x^30 - x^28 + x^27 - x^26 + x^25 - x^23 + x^22 - x^21 + x^20 - x^18 + x^17 - x^16 + x^15 - x^11 + x^10 - x^6 + x^5 - x + 1
Phi_86(x)=x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_87(x)=x^56 - x^55 + x^53 - x^52 + x^50 - x^49 + x^47 - x^46 + x^44 - x^43 + x^41 - x^40 + x^38 - x^37 + x^35 - x^34 + x^32 - x^31 + x^29 - x^28 + x^27 - x^25 + x^24 - x^22 + x^21 - x^19 + x^18 - x^16 + x^15 - x^13 + x^12 - x^10 + x^9 - x^7 + x^6 - x^4 + x^3 - x + 1
Phi_88(x)=x^40 - x^36 + x^32 - x^28 + x^24 - x^20 + x^16 - x^12 + x^8 - x^4 + 1
Phi_89(x)=x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_90(x)=x^24 + x^21 - x^15 - x^12 - x^9 + x^3 + 1
Phi_91(x)=x^72 - x^71 + x^65 - x^64 + x^59 - x^57 + x^52 - x^50 + x^46 - x^43 + x^39 - x^36 + x^33 - x^29 + x^26 - x^22 + x^20 - x^15 + x^13 - x^8 + x^7 - x + 1
Phi_92(x)=x^44 - x^42 + x^40 - x^38 + x^36 - x^34 + x^32 - x^30 + x^28 - x^26 + x^24 - x^22 + x^20 - x^18 + x^16 - x^14 + x^12 - x^10 + x^8 - x^6 + x^4 - x^2 + 1
Phi_93(x)=x^60 - x^59 + x^57 - x^56 + x^54 - x^53 + x^51 - x^50 + x^48 - x^47 + x^45 - x^44 + x^42 - x^41 + x^39 - x^38 + x^36 - x^35 + x^33 - x^32 + x^30 - x^28 + x^27 - x^25 + x^24 - x^22 + x^21 - x^19 + x^18 - x^16 + x^15 - x^13 + x^12 - x^10 + x^9 - x^7 + x^6 - x^4 + x^3 - x + 1
Phi_94(x)=x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_95(x)=x^72 - x^71 + x^67 - x^66 + x^62 - x^61 + x^57 - x^56 + x^53 - x^51 + x^48 - x^46 + x^43 - x^41 + x^38 - x^36 + x^34 - x^31 + x^29 - x^26 + x^24 - x^21 + x^19 - x^16 + x^15 - x^11 + x^10 - x^6 + x^5 - x + 1
Phi_96(x)=x^32 - x^16 + 1
Phi_97(x)=x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_98(x)=x^42 - x^35 + x^28 - x^21 + x^14 - x^7 + 1
Phi_99(x)=x^60 - x^57 + x^51 - x^48 + x^42 - x^39 + x^33 - x^30 + x^27 - x^21 + x^18 - x^12 + x^9 - x^3 + 1
Phi_100(x)=x^40 - x^30 + x^20 - x^10 + 1
Phi_101(x)=x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_102(x)=x^32 + x^31 - x^29 - x^28 + x^26 + x^25 - x^23 - x^22 + x^20 + x^19 - x^17 - x^16 - x^15 + x^13 + x^12 - x^10 - x^9 + x^7 + x^6 - x^4 - x^3 + x + 1
Phi_103(x)=x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_104(x)=x^48 - x^44 + x^40 - x^36 + x^32 - x^28 + x^24 - x^20 + x^16 - x^12 + x^8 - x^4 + 1
Phi_105(x)=x^48 + x^47 + x^46 - x^43 - x^42 - 2*x^41 - x^40 - x^39 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 - x^28 - x^26 - x^24 - x^22 - x^20 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 - x^9 - x^8 - 2*x^7 - x^6 - x^5 + x^2 + x + 1
Phi_106(x)=x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_107(x)=x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_108(x)=x^36 - x^18 + 1
Phi_109(x)=x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_110(x)=x^40 + x^39 - x^35 - x^34 + x^30 - x^28 - x^25 + x^23 + x^20 + x^17 - x^15 - x^12 + x^10 - x^6 - x^5 + x + 1
Phi_111(x)=x^72 - x^71 + x^69 - x^68 + x^66 - x^65 + x^63 - x^62 + x^60 - x^59 + x^57 - x^56 + x^54 - x^53 + x^51 - x^50 + x^48 - x^47 + x^45 - x^44 + x^42 - x^41 + x^39 - x^38 + x^36 - x^34 + x^33 - x^31 + x^30 - x^28 + x^27 - x^25 + x^24 - x^22 + x^21 - x^19 + x^18 - x^16 + x^15 - x^13 + x^12 - x^10 + x^9 - x^7 + x^6 - x^4 + x^3 - x + 1
Phi_112(x)=x^48 - x^40 + x^32 - x^24 + x^16 - x^8 + 1
Phi_113(x)=x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_114(x)=x^36 + x^35 - x^33 - x^32 + x^30 + x^29 - x^27 - x^26 + x^24 + x^23 - x^21 - x^20 + x^18 - x^16 - x^15 + x^13 + x^12 - x^10 - x^9 + x^7 + x^6 - x^4 - x^3 + x + 1
Phi_115(x)=x^88 - x^87 + x^83 - x^82 + x^78 - x^77 + x^73 - x^72 + x^68 - x^67 + x^65 - x^64 + x^63 - x^62 + x^60 - x^59 + x^58 - x^57 + x^55 - x^54 + x^53 - x^52 + x^50 - x^49 + x^48 - x^47 + x^45 - x^44 + x^43 - x^41 + x^40 - x^39 + x^38 - x^36 + x^35 - x^34 + x^33 - x^31 + x^30 - x^29 + x^28 - x^26 + x^25 - x^24 + x^23 - x^21 + x^20 - x^16 + x^15 - x^11 + x^10 - x^6 + x^5 - x + 1
Phi_116(x)=x^56 - x^54 + x^52 - x^50 + x^48 - x^46 + x^44 - x^42 + x^40 - x^38 + x^36 - x^34 + x^32 - x^30 + x^28 - x^26 + x^24 - x^22 + x^20 - x^18 + x^16 - x^14 + x^12 - x^10 + x^8 - x^6 + x^4 - x^2 + 1
Phi_117(x)=x^72 - x^69 + x^63 - x^60 + x^54 - x^51 + x^45 - x^42 + x^36 - x^30 + x^27 - x^21 + x^18 - x^12 + x^9 - x^3 + 1
Phi_118(x)=x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_119(x)=x^96 - x^95 + x^89 - x^88 + x^82 - x^81 + x^79 - x^78 + x^75 - x^74 + x^72 - x^71 + x^68 - x^67 + x^65 - x^64 + x^62 - x^60 + x^58 - x^57 + x^55 - x^53 + x^51 - x^50 + x^48 - x^46 + x^45 - x^43 + x^41 - x^39 + x^38 - x^36 + x^34 - x^32 + x^31 - x^29 + x^28 - x^25 + x^24 - x^22 + x^21 - x^18 + x^17 - x^15 + x^14 - x^8 + x^7 - x + 1
Phi_120(x)=x^32 + x^28 - x^20 - x^16 - x^12 + x^4 + 1
Phi_121(x)=x^110 + x^99 + x^88 + x^77 + x^66 + x^55 + x^44 + x^33 + x^22 + x^11 + 1
Phi_122(x)=x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_123(x)=x^80 - x^79 + x^77 - x^76 + x^74 - x^73 + x^71 - x^70 + x^68 - x^67 + x^65 - x^64 + x^62 - x^61 + x^59 - x^58 + x^56 - x^55 + x^53 - x^52 + x^50 - x^49 + x^47 - x^46 + x^44 - x^43 + x^41 - x^40 + x^39 - x^37 + x^36 - x^34 + x^33 - x^31 + x^30 - x^28 + x^27 - x^25 + x^24 - x^22 + x^21 - x^19 + x^18 - x^16 + x^15 - x^13 + x^12 - x^10 + x^9 - x^7 + x^6 - x^4 + x^3 - x + 1
Phi_124(x)=x^60 - x^58 + x^56 - x^54 + x^52 - x^50 + x^48 - x^46 + x^44 - x^42 + x^40 - x^38 + x^36 - x^34 + x^32 - x^30 + x^28 - x^26 + x^24 - x^22 + x^20 - x^18 + x^16 - x^14 + x^12 - x^10 + x^8 - x^6 + x^4 - x^2 + 1
Phi_125(x)=x^100 + x^75 + x^50 + x^25 + 1
Phi_126(x)=x^36 + x^33 - x^27 - x^24 + x^18 - x^12 - x^9 + x^3 + 1
Phi_127(x)=x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_128(x)=x^64 + 1
Phi_129(x)=x^84 - x^83 + x^81 - x^80 + x^78 - x^77 + x^75 - x^74 + x^72 - x^71 + x^69 - x^68 + x^66 - x^65 + x^63 - x^62 + x^60 - x^59 + x^57 - x^56 + x^54 - x^53 + x^51 - x^50 + x^48 - x^47 + x^45 - x^44 + x^42 - x^40 + x^39 - x^37 + x^36 - x^34 + x^33 - x^31 + x^30 - x^28 + x^27 - x^25 + x^24 - x^22 + x^21 - x^19 + x^18 - x^16 + x^15 - x^13 + x^12 - x^10 + x^9 - x^7 + x^6 - x^4 + x^3 - x + 1
Phi_130(x)=x^48 + x^47 - x^43 - x^42 + x^38 + x^37 - x^35 - x^34 - x^33 - x^32 + x^30 + x^29 + x^28 + x^27 - x^25 - x^24 - x^23 + x^21 + x^20 + x^19 + x^18 - x^16 - x^15 - x^14 - x^13 + x^11 + x^10 - x^6 - x^5 + x + 1
Phi_131(x)=x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_132(x)=x^40 + x^38 - x^34 - x^32 + x^28 + x^26 - x^22 - x^20 - x^18 + x^14 + x^12 - x^8 - x^6 + x^2 + 1
Phi_133(x)=x^108 - x^107 + x^101 - x^100 + x^94 - x^93 + x^89 - x^88 + x^87 - x^86 + x^82 - x^81 + x^80 - x^79 + x^75 - x^74 + x^73 - x^72 + x^70 - x^69 + x^68 - x^67 + x^66 - x^65 + x^63 - x^62 + x^61 - x^60 + x^59 - x^58 + x^56 - x^55 + x^54 - x^53 + x^52 - x^50 + x^49 - x^48 + x^47 - x^46 + x^45 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^36 + x^35 - x^34 + x^33 - x^29 + x^28 - x^27 + x^26 - x^22 + x^21 - x^20 + x^19 - x^15 + x^14 - x^8 + x^7 - x + 1
Phi_134(x)=x^66 - x^65 + x^64 - x^63 + x^62 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_135(x)=x^72 - x^63 + x^45 - x^36 + x^27 - x^9 + 1
Phi_136(x)=x^64 - x^60 + x^56 - x^52 + x^48 - x^44 + x^40 - x^36 + x^32 - x^28 + x^24 - x^20 + x^16 - x^12 + x^8 - x^4 + 1
Phi_137(x)=x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_138(x)=x^44 + x^43 - x^41 - x^40 + x^38 + x^37 - x^35 - x^34 + x^32 + x^31 - x^29 - x^28 + x^26 + x^25 - x^23 - x^22 - x^21 + x^19 + x^18 - x^16 - x^15 + x^13 + x^12 - x^10 - x^9 + x^7 + x^6 - x^4 - x^3 + x + 1
Phi_139(x)=x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_140(x)=x^48 + x^46 - x^38 - x^36 - x^34 - x^32 + x^28 + x^26 + x^24 + x^22 + x^20 - x^16 - x^14 - x^12 - x^10 + x^2 + 1
Phi_141(x)=x^92 - x^91 + x^89 - x^88 + x^86 - x^85 + x^83 - x^82 + x^80 - x^79 + x^77 - x^76 + x^74 - x^73 + x^71 - x^70 + x^68 - x^67 + x^65 - x^64 + x^62 - x^61 + x^59 - x^58 + x^56 - x^55 + x^53 - x^52 + x^50 - x^49 + x^47 - x^46 + x^45 - x^43 + x^42 - x^40 + x^39 - x^37 + x^36 - x^34 + x^33 - x^31 + x^30 - x^28 + x^27 - x^25 + x^24 - x^22 + x^21 - x^19 + x^18 - x^16 + x^15 - x^13 + x^12 - x^10 + x^9 - x^7 + x^6 - x^4 + x^3 - x + 1
Phi_142(x)=x^70 - x^69 + x^68 - x^67 + x^66 - x^65 + x^64 - x^63 + x^62 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_143(x)=x^120 - x^119 + x^109 - x^108 + x^107 - x^106 + x^98 - x^97 + x^96 - x^95 + x^94 - x^93 + x^87 - x^86 + x^85 - x^84 + x^83 - x^82 + x^81 - x^80 + x^76 - x^75 + x^74 - x^73 + x^72 - x^71 + x^70 - x^69 + x^68 - x^67 + x^65 - x^64 + x^63 - x^62 + x^61 - x^60 + x^59 - x^58 + x^57 - x^56 + x^55 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^40 + x^39 - x^38 + x^37 - x^36 + x^35 - x^34 + x^33 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^14 + x^13 - x^12 + x^11 - x + 1
Phi_144(x)=x^48 - x^24 + 1
Phi_145(x)=x^112 - x^111 + x^107 - x^106 + x^102 - x^101 + x^97 - x^96 + x^92 - x^91 + x^87 - x^86 + x^83 - x^81 + x^78 - x^76 + x^73 - x^71 + x^68 - x^66 + x^63 - x^61 + x^58 - x^56 + x^54 - x^51 + x^49 - x^46 + x^44 - x^41 + x^39 - x^36 + x^34 - x^31 + x^29 - x^26 + x^25 - x^21 + x^20 - x^16 + x^15 - x^11 + x^10 - x^6 + x^5 - x + 1
Phi_146(x)=x^72 - x^71 + x^70 - x^69 + x^68 - x^67 + x^66 - x^65 + x^64 - x^63 + x^62 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_147(x)=x^84 - x^77 + x^63 - x^56 + x^42 - x^28 + x^21 - x^7 + 1
Phi_148(x)=x^72 - x^70 + x^68 - x^66 + x^64 - x^62 + x^60 - x^58 + x^56 - x^54 + x^52 - x^50 + x^48 - x^46 + x^44 - x^42 + x^40 - x^38 + x^36 - x^34 + x^32 - x^30 + x^28 - x^26 + x^24 - x^22 + x^20 - x^18 + x^16 - x^14 + x^12 - x^10 + x^8 - x^6 + x^4 - x^2 + 1
Phi_149(x)=x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_150(x)=x^40 + x^35 - x^25 - x^20 - x^15 + x^5 + 1
Phi_151(x)=x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_152(x)=x^72 - x^68 + x^64 - x^60 + x^56 - x^52 + x^48 - x^44 + x^40 - x^36 + x^32 - x^28 + x^24 - x^20 + x^16 - x^12 + x^8 - x^4 + 1
Phi_153(x)=x^96 - x^93 + x^87 - x^84 + x^78 - x^75 + x^69 - x^66 + x^60 - x^57 + x^51 - x^48 + x^45 - x^39 + x^36 - x^30 + x^27 - x^21 + x^18 - x^12 + x^9 - x^3 + 1
Phi_154(x)=x^60 + x^59 - x^53 - x^52 - x^49 - x^48 + x^46 + x^45 + x^42 + x^41 - x^39 + x^37 - x^35 - x^34 + x^32 - x^30 + x^28 - x^26 - x^25 + x^23 - x^21 + x^19 + x^18 + x^15 + x^14 - x^12 - x^11 - x^8 - x^7 + x + 1
Phi_155(x)=x^120 - x^119 + x^115 - x^114 + x^110 - x^109 + x^105 - x^104 + x^100 - x^99 + x^95 - x^94 + x^90 - x^88 + x^85 - x^83 + x^80 - x^78 + x^75 - x^73 + x^70 - x^68 + x^65 - x^63 + x^60 - x^57 + x^55 - x^52 + x^50 - x^47 + x^45 - x^42 + x^40 - x^37 + x^35 - x^32 + x^30 - x^26 + x^25 - x^21 + x^20 - x^16 + x^15 - x^11 + x^10 - x^6 + x^5 - x + 1
Phi_156(x)=x^48 + x^46 - x^42 - x^40 + x^36 + x^34 - x^30 - x^28 + x^24 - x^20 - x^18 + x^14 + x^12 - x^8 - x^6 + x^2 + 1
Phi_157(x)=x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_158(x)=x^78 - x^77 + x^76 - x^75 + x^74 - x^73 + x^72 - x^71 + x^70 - x^69 + x^68 - x^67 + x^66 - x^65 + x^64 - x^63 + x^62 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_159(x)=x^104 - x^103 + x^101 - x^100 + x^98 - x^97 + x^95 - x^94 + x^92 - x^91 + x^89 - x^88 + x^86 - x^85 + x^83 - x^82 + x^80 - x^79 + x^77 - x^76 + x^74 - x^73 + x^71 - x^70 + x^68 - x^67 + x^65 - x^64 + x^62 - x^61 + x^59 - x^58 + x^56 - x^55 + x^53 - x^52 + x^51 - x^49 + x^48 - x^46 + x^45 - x^43 + x^42 - x^40 + x^39 - x^37 + x^36 - x^34 + x^33 - x^31 + x^30 - x^28 + x^27 - x^25 + x^24 - x^22 + x^21 - x^19 + x^18 - x^16 + x^15 - x^13 + x^12 - x^10 + x^9 - x^7 + x^6 - x^4 + x^3 - x + 1
Phi_160(x)=x^64 - x^48 + x^32 - x^16 + 1
Phi_161(x)=x^132 - x^131 + x^125 - x^124 + x^118 - x^117 + x^111 - x^110 + x^109 - x^108 + x^104 - x^103 + x^102 - x^101 + x^97 - x^96 + x^95 - x^94 + x^90 - x^89 + x^88 - x^87 + x^86 - x^85 + x^83 - x^82 + x^81 - x^80 + x^79 - x^78 + x^76 - x^75 + x^74 - x^73 + x^72 - x^71 + x^69 - x^68 + x^67 - x^66 + x^65 - x^64 + x^63 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^54 + x^53 - x^52 + x^51 - x^50 + x^49 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^38 + x^37 - x^36 + x^35 - x^31 + x^30 - x^29 + x^28 - x^24 + x^23 - x^22 + x^21 - x^15 + x^14 - x^8 + x^7 - x + 1
Phi_162(x)=x^54 - x^27 + 1
Phi_163(x)=x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_164(x)=x^80 - x^78 + x^76 - x^74 + x^72 - x^70 + x^68 - x^66 + x^64 - x^62 + x^60 - x^58 + x^56 - x^54 + x^52 - x^50 + x^48 - x^46 + x^44 - x^42 + x^40 - x^38 + x^36 - x^34 + x^32 - x^30 + x^28 - x^26 + x^24 - x^22 + x^20 - x^18 + x^16 - x^14 + x^12 - x^10 + x^8 - x^6 + x^4 - x^2 + 1
Phi_165(x)=x^80 + x^79 + x^78 - x^75 - x^74 - x^73 - x^69 - x^68 - x^67 + x^65 + 2*x^64 + 2*x^63 + x^62 - x^60 - x^59 - x^58 - x^54 - x^53 - x^52 + x^50 + 2*x^49 + 2*x^48 + 2*x^47 + x^46 - x^44 - x^43 - x^42 - x^41 - x^40 - x^39 - x^38 - x^37 - x^36 + x^34 + 2*x^33 + 2*x^32 + 2*x^31 + x^30 - x^28 - x^27 - x^26 - x^22 - x^21 - x^20 + x^18 + 2*x^17 + 2*x^16 + x^15 - x^13 - x^12 - x^11 - x^7 - x^6 - x^5 + x^2 + x + 1
Phi_166(x)=x^82 - x^81 + x^80 - x^79 + x^78 - x^77 + x^76 - x^75 + x^74 - x^73 + x^72 - x^71 + x^70 - x^69 + x^68 - x^67 + x^66 - x^65 + x^64 - x^63 + x^62 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_167(x)=x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_168(x)=x^48 + x^44 - x^36 - x^32 + x^24 - x^16 - x^12 + x^4 + 1
Phi_169(x)=x^156 + x^143 + x^130 + x^117 + x^104 + x^91 + x^78 + x^65 + x^52 + x^39 + x^26 + x^13 + 1
Phi_170(x)=x^64 + x^63 - x^59 - x^58 + x^54 + x^53 - x^49 - x^48 - x^47 - x^46 + x^44 + x^43 + x^42 + x^41 - x^39 - x^38 - x^37 - x^36 + x^34 + x^33 + x^32 + x^31 + x^30 - x^28 - x^27 - x^26 - x^25 + x^23 + x^22 + x^21 + x^20 - x^18 - x^17 - x^16 - x^15 + x^11 + x^10 - x^6 - x^5 + x + 1
Phi_171(x)=x^108 - x^105 + x^99 - x^96 + x^90 - x^87 + x^81 - x^78 + x^72 - x^69 + x^63 - x^60 + x^54 - x^48 + x^45 - x^39 + x^36 - x^30 + x^27 - x^21 + x^18 - x^12 + x^9 - x^3 + 1
Phi_172(x)=x^84 - x^82 + x^80 - x^78 + x^76 - x^74 + x^72 - x^70 + x^68 - x^66 + x^64 - x^62 + x^60 - x^58 + x^56 - x^54 + x^52 - x^50 + x^48 - x^46 + x^44 - x^42 + x^40 - x^38 + x^36 - x^34 + x^32 - x^30 + x^28 - x^26 + x^24 - x^22 + x^20 - x^18 + x^16 - x^14 + x^12 - x^10 + x^8 - x^6 + x^4 - x^2 + 1
Phi_173(x)=x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_174(x)=x^56 + x^55 - x^53 - x^52 + x^50 + x^49 - x^47 - x^46 + x^44 + x^43 - x^41 - x^40 + x^38 + x^37 - x^35 - x^34 + x^32 + x^31 - x^29 - x^28 - x^27 + x^25 + x^24 - x^22 - x^21 + x^19 + x^18 - x^16 - x^15 + x^13 + x^12 - x^10 - x^9 + x^7 + x^6 - x^4 - x^3 + x + 1
Phi_175(x)=x^120 - x^115 + x^95 - x^90 + x^85 - x^80 + x^70 - x^65 + x^60 - x^55 + x^50 - x^40 + x^35 - x^30 + x^25 - x^5 + 1
Phi_176(x)=x^80 - x^72 + x^64 - x^56 + x^48 - x^40 + x^32 - x^24 + x^16 - x^8 + 1
Phi_177(x)=x^116 - x^115 + x^113 - x^112 + x^110 - x^109 + x^107 - x^106 + x^104 - x^103 + x^101 - x^100 + x^98 - x^97 + x^95 - x^94 + x^92 - x^91 + x^89 - x^88 + x^86 - x^85 + x^83 - x^82 + x^80 - x^79 + x^77 - x^76 + x^74 - x^73 + x^71 - x^70 + x^68 - x^67 + x^65 - x^64 + x^62 - x^61 + x^59 - x^58 + x^57 - x^55 + x^54 - x^52 + x^51 - x^49 + x^48 - x^46 + x^45 - x^43 + x^42 - x^40 + x^39 - x^37 + x^36 - x^34 + x^33 - x^31 + x^30 - x^28 + x^27 - x^25 + x^24 - x^22 + x^21 - x^19 + x^18 - x^16 + x^15 - x^13 + x^12 - x^10 + x^9 - x^7 + x^6 - x^4 + x^3 - x + 1
Phi_178(x)=x^88 - x^87 + x^86 - x^85 + x^84 - x^83 + x^82 - x^81 + x^80 - x^79 + x^78 - x^77 + x^76 - x^75 + x^74 - x^73 + x^72 - x^71 + x^70 - x^69 + x^68 - x^67 + x^66 - x^65 + x^64 - x^63 + x^62 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_179(x)=x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_180(x)=x^48 + x^42 - x^30 - x^24 - x^18 + x^6 + 1
Phi_181(x)=x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_182(x)=x^72 + x^71 - x^65 - x^64 - x^59 + x^57 + x^52 - x^50 + x^46 + x^43 - x^39 - x^36 - x^33 + x^29 + x^26 - x^22 + x^20 + x^15 - x^13 - x^8 - x^7 + x + 1
Phi_183(x)=x^120 - x^119 + x^117 - x^116 + x^114 - x^113 + x^111 - x^110 + x^108 - x^107 + x^105 - x^104 + x^102 - x^101 + x^99 - x^98 + x^96 - x^95 + x^93 - x^92 + x^90 - x^89 + x^87 - x^86 + x^84 - x^83 + x^81 - x^80 + x^78 - x^77 + x^75 - x^74 + x^72 - x^71 + x^69 - x^68 + x^66 - x^65 + x^63 - x^62 + x^60 - x^58 + x^57 - x^55 + x^54 - x^52 + x^51 - x^49 + x^48 - x^46 + x^45 - x^43 + x^42 - x^40 + x^39 - x^37 + x^36 - x^34 + x^33 - x^31 + x^30 - x^28 + x^27 - x^25 + x^24 - x^22 + x^21 - x^19 + x^18 - x^16 + x^15 - x^13 + x^12 - x^10 + x^9 - x^7 + x^6 - x^4 + x^3 - x + 1
Phi_184(x)=x^88 - x^84 + x^80 - x^76 + x^72 - x^68 + x^64 - x^60 + x^56 - x^52 + x^48 - x^44 + x^40 - x^36 + x^32 - x^28 + x^24 - x^20 + x^16 - x^12 + x^8 - x^4 + 1
Phi_185(x)=x^144 - x^143 + x^139 - x^138 + x^134 - x^133 + x^129 - x^128 + x^124 - x^123 + x^119 - x^118 + x^114 - x^113 + x^109 - x^108 + x^107 - x^106 + x^104 - x^103 + x^102 - x^101 + x^99 - x^98 + x^97 - x^96 + x^94 - x^93 + x^92 - x^91 + x^89 - x^88 + x^87 - x^86 + x^84 - x^83 + x^82 - x^81 + x^79 - x^78 + x^77 - x^76 + x^74 - x^73 + x^72 - x^71 + x^70 - x^68 + x^67 - x^66 + x^65 - x^63 + x^62 - x^61 + x^60 - x^58 + x^57 - x^56 + x^55 - x^53 + x^52 - x^51 + x^50 - x^48 + x^47 - x^46 + x^45 - x^43 + x^42 - x^41 + x^40 - x^38 + x^37 - x^36 + x^35 - x^31 + x^30 - x^26 + x^25 - x^21 + x^20 - x^16 + x^15 - x^11 + x^10 - x^6 + x^5 - x + 1
Phi_186(x)=x^60 + x^59 - x^57 - x^56 + x^54 + x^53 - x^51 - x^50 + x^48 + x^47 - x^45 - x^44 + x^42 + x^41 - x^39 - x^38 + x^36 + x^35 - x^33 - x^32 + x^30 - x^28 - x^27 + x^25 + x^24 - x^22 - x^21 + x^19 + x^18 - x^16 - x^15 + x^13 + x^12 - x^10 - x^9 + x^7 + x^6 - x^4 - x^3 + x + 1
Phi_187(x)=x^160 - x^159 + x^149 - x^148 + x^143 - x^142 + x^138 - x^137 + x^132 - x^131 + x^127 - x^125 + x^121 - x^120 + x^116 - x^114 + x^110 - x^108 + x^105 - x^103 + x^99 - x^97 + x^94 - x^91 + x^88 - x^86 + x^83 - x^80 + x^77 - x^74 + x^72 - x^69 + x^66 - x^63 + x^61 - x^57 + x^55 - x^52 + x^50 - x^46 + x^44 - x^40 + x^39 - x^35 + x^33 - x^29 + x^28 - x^23 + x^22 - x^18 + x^17 - x^12 + x^11 - x + 1
Phi_188(x)=x^92 - x^90 + x^88 - x^86 + x^84 - x^82 + x^80 - x^78 + x^76 - x^74 + x^72 - x^70 + x^68 - x^66 + x^64 - x^62 + x^60 - x^58 + x^56 - x^54 + x^52 - x^50 + x^48 - x^46 + x^44 - x^42 + x^40 - x^38 + x^36 - x^34 + x^32 - x^30 + x^28 - x^26 + x^24 - x^22 + x^20 - x^18 + x^16 - x^14 + x^12 - x^10 + x^8 - x^6 + x^4 - x^2 + 1
Phi_189(x)=x^108 - x^99 + x^81 - x^72 + x^54 - x^36 + x^27 - x^9 + 1
Phi_190(x)=x^72 + x^71 - x^67 - x^66 + x^62 + x^61 - x^57 - x^56 - x^53 + x^51 + x^48 - x^46 - x^43 + x^41 + x^38 - x^36 + x^34 + x^31 - x^29 - x^26 + x^24 + x^21 - x^19 - x^16 - x^15 + x^11 + x^10 - x^6 - x^5 + x + 1
Phi_191(x)=x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_192(x)=x^64 - x^32 + 1
Phi_193(x)=x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_194(x)=x^96 - x^95 + x^94 - x^93 + x^92 - x^91 + x^90 - x^89 + x^88 - x^87 + x^86 - x^85 + x^84 - x^83 + x^82 - x^81 + x^80 - x^79 + x^78 - x^77 + x^76 - x^75 + x^74 - x^73 + x^72 - x^71 + x^70 - x^69 + x^68 - x^67 + x^66 - x^65 + x^64 - x^63 + x^62 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_195(x)=x^96 + x^95 + x^94 - x^91 - x^90 - x^89 - x^83 - x^82 + x^80 + x^79 + x^78 + x^77 - x^75 - x^74 - x^68 - x^67 + x^65 + x^64 + x^63 + x^62 - x^60 - x^59 + x^57 + x^56 + x^55 - x^53 - 2*x^52 - x^51 + x^49 + x^48 + x^47 - x^45 - 2*x^44 - x^43 + x^41 + x^40 + x^39 - x^37 - x^36 + x^34 + x^33 + x^32 + x^31 - x^29 - x^28 - x^22 - x^21 + x^19 + x^18 + x^17 + x^16 - x^14 - x^13 - x^7 - x^6 - x^5 + x^2 + x + 1
Phi_196(x)=x^84 - x^70 + x^56 - x^42 + x^28 - x^14 + 1
Phi_197(x)=x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_198(x)=x^60 + x^57 - x^51 - x^48 + x^42 + x^39 - x^33 - x^30 - x^27 + x^21 + x^18 - x^12 - x^9 + x^3 + 1
Phi_199(x)=x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_200(x)=x^80 - x^60 + x^40 - x^20 + 1
Phi_201(x)=x^132 - x^131 + x^129 - x^128 + x^126 - x^125 + x^123 - x^122 + x^120 - x^119 + x^117 - x^116 + x^114 - x^113 + x^111 - x^110 + x^108 - x^107 + x^105 - x^104 + x^102 - x^101 + x^99 - x^98 + x^96 - x^95 + x^93 - x^92 + x^90 - x^89 + x^87 - x^86 + x^84 - x^83 + x^81 - x^80 + x^78 - x^77 + x^75 - x^74 + x^72 - x^71 + x^69 - x^68 + x^66 - x^64 + x^63 - x^61 + x^60 - x^58 + x^57 - x^55 + x^54 - x^52 + x^51 - x^49 + x^48 - x^46 + x^45 - x^43 + x^42 - x^40 + x^39 - x^37 + x^36 - x^34 + x^33 - x^31 + x^30 - x^28 + x^27 - x^25 + x^24 - x^22 + x^21 - x^19 + x^18 - x^16 + x^15 - x^13 + x^12 - x^10 + x^9 - x^7 + x^6 - x^4 + x^3 - x + 1
Phi_202(x)=x^100 - x^99 + x^98 - x^97 + x^96 - x^95 + x^94 - x^93 + x^92 - x^91 + x^90 - x^89 + x^88 - x^87 + x^86 - x^85 + x^84 - x^83 + x^82 - x^81 + x^80 - x^79 + x^78 - x^77 + x^76 - x^75 + x^74 - x^73 + x^72 - x^71 + x^70 - x^69 + x^68 - x^67 + x^66 - x^65 + x^64 - x^63 + x^62 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_203(x)=x^168 - x^167 + x^161 - x^160 + x^154 - x^153 + x^147 - x^146 + x^140 - x^138 + x^133 - x^131 + x^126 - x^124 + x^119 - x^117 + x^112 - x^109 + x^105 - x^102 + x^98 - x^95 + x^91 - x^88 + x^84 - x^80 + x^77 - x^73 + x^70 - x^66 + x^63 - x^59 + x^56 - x^51 + x^49 - x^44 + x^42 - x^37 + x^35 - x^30 + x^28 - x^22 + x^21 - x^15 + x^14 - x^8 + x^7 - x + 1
Phi_204(x)=x^64 + x^62 - x^58 - x^56 + x^52 + x^50 - x^46 - x^44 + x^40 + x^38 - x^34 - x^32 - x^30 + x^26 + x^24 - x^20 - x^18 + x^14 + x^12 - x^8 - x^6 + x^2 + 1
Phi_205(x)=x^160 - x^159 + x^155 - x^154 + x^150 - x^149 + x^145 - x^144 + x^140 - x^139 + x^135 - x^134 + x^130 - x^129 + x^125 - x^124 + x^120 - x^118 + x^115 - x^113 + x^110 - x^108 + x^105 - x^103 + x^100 - x^98 + x^95 - x^93 + x^90 - x^88 + x^85 - x^83 + x^80 - x^77 + x^75 - x^72 + x^70 - x^67 + x^65 - x^62 + x^60 - x^57 + x^55 - x^52 + x^50 - x^47 + x^45 - x^42 + x^40 - x^36 + x^35 - x^31 + x^30 - x^26 + x^25 - x^21 + x^20 - x^16 + x^15 - x^11 + x^10 - x^6 + x^5 - x + 1
Phi_206(x)=x^102 - x^101 + x^100 - x^99 + x^98 - x^97 + x^96 - x^95 + x^94 - x^93 + x^92 - x^91 + x^90 - x^89 + x^88 - x^87 + x^86 - x^85 + x^84 - x^83 + x^82 - x^81 + x^80 - x^79 + x^78 - x^77 + x^76 - x^75 + x^74 - x^73 + x^72 - x^71 + x^70 - x^69 + x^68 - x^67 + x^66 - x^65 + x^64 - x^63 + x^62 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_207(x)=x^132 - x^129 + x^123 - x^120 + x^114 - x^111 + x^105 - x^102 + x^96 - x^93 + x^87 - x^84 + x^78 - x^75 + x^69 - x^66 + x^63 - x^57 + x^54 - x^48 + x^45 - x^39 + x^36 - x^30 + x^27 - x^21 + x^18 - x^12 + x^9 - x^3 + 1
Phi_208(x)=x^96 - x^88 + x^80 - x^72 + x^64 - x^56 + x^48 - x^40 + x^32 - x^24 + x^16 - x^8 + 1
Phi_209(x)=x^180 - x^179 + x^169 - x^168 + x^161 - x^160 + x^158 - x^157 + x^150 - x^149 + x^147 - x^146 + x^142 - x^141 + x^139 - x^138 + x^136 - x^135 + x^131 - x^130 + x^128 - x^127 + x^125 - x^124 + x^123 - x^122 + x^120 - x^119 + x^117 - x^116 + x^114 - x^113 + x^112 - x^111 + x^109 - x^108 + x^106 - x^105 + x^104 - x^102 + x^101 - x^100 + x^98 - x^97 + x^95 - x^94 + x^93 - x^91 + x^90 - x^89 + x^87 - x^86 + x^85 - x^83 + x^82 - x^80 + x^79 - x^78 + x^76 - x^75 + x^74 - x^72 + x^71 - x^69 + x^68 - x^67 + x^66 - x^64 + x^63 - x^61 + x^60 - x^58 + x^57 - x^56 + x^55 - x^53 + x^52 - x^50 + x^49 - x^45 + x^44 - x^42 + x^41 - x^39 + x^38 - x^34 + x^33 - x^31 + x^30 - x^23 + x^22 - x^20 + x^19 - x^12 + x^11 - x + 1
Phi_210(x)=x^48 - x^47 + x^46 + x^43 - x^42 + 2*x^41 - x^40 + x^39 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 - x^28 - x^26 - x^24 - x^22 - x^20 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 + x^9 - x^8 + 2*x^7 - x^6 + x^5 + x^2 - x + 1
Phi_211(x)=x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_212(x)=x^104 - x^102 + x^100 - x^98 + x^96 - x^94 + x^92 - x^90 + x^88 - x^86 + x^84 - x^82 + x^80 - x^78 + x^76 - x^74 + x^72 - x^70 + x^68 - x^66 + x^64 - x^62 + x^60 - x^58 + x^56 - x^54 + x^52 - x^50 + x^48 - x^46 + x^44 - x^42 + x^40 - x^38 + x^36 - x^34 + x^32 - x^30 + x^28 - x^26 + x^24 - x^22 + x^20 - x^18 + x^16 - x^14 + x^12 - x^10 + x^8 - x^6 + x^4 - x^2 + 1
Phi_213(x)=x^140 - x^139 + x^137 - x^136 + x^134 - x^133 + x^131 - x^130 + x^128 - x^127 + x^125 - x^124 + x^122 - x^121 + x^119 - x^118 + x^116 - x^115 + x^113 - x^112 + x^110 - x^109 + x^107 - x^106 + x^104 - x^103 + x^101 - x^100 + x^98 - x^97 + x^95 - x^94 + x^92 - x^91 + x^89 - x^88 + x^86 - x^85 + x^83 - x^82 + x^80 - x^79 + x^77 - x^76 + x^74 - x^73 + x^71 - x^70 + x^69 - x^67 + x^66 - x^64 + x^63 - x^61 + x^60 - x^58 + x^57 - x^55 + x^54 - x^52 + x^51 - x^49 + x^48 - x^46 + x^45 - x^43 + x^42 - x^40 + x^39 - x^37 + x^36 - x^34 + x^33 - x^31 + x^30 - x^28 + x^27 - x^25 + x^24 - x^22 + x^21 - x^19 + x^18 - x^16 + x^15 - x^13 + x^12 - x^10 + x^9 - x^7 + x^6 - x^4 + x^3 - x + 1
Phi_214(x)=x^106 - x^105 + x^104 - x^103 + x^102 - x^101 + x^100 - x^99 + x^98 - x^97 + x^96 - x^95 + x^94 - x^93 + x^92 - x^91 + x^90 - x^89 + x^88 - x^87 + x^86 - x^85 + x^84 - x^83 + x^82 - x^81 + x^80 - x^79 + x^78 - x^77 + x^76 - x^75 + x^74 - x^73 + x^72 - x^71 + x^70 - x^69 + x^68 - x^67 + x^66 - x^65 + x^64 - x^63 + x^62 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_215(x)=x^168 - x^167 + x^163 - x^162 + x^158 - x^157 + x^153 - x^152 + x^148 - x^147 + x^143 - x^142 + x^138 - x^137 + x^133 - x^132 + x^128 - x^127 + x^125 - x^124 + x^123 - x^122 + x^120 - x^119 + x^118 - x^117 + x^115 - x^114 + x^113 - x^112 + x^110 - x^109 + x^108 - x^107 + x^105 - x^104 + x^103 - x^102 + x^100 - x^99 + x^98 - x^97 + x^95 - x^94 + x^93 - x^92 + x^90 - x^89 + x^88 - x^87 + x^85 - x^84 + x^83 - x^81 + x^80 - x^79 + x^78 - x^76 + x^75 - x^74 + x^73 - x^71 + x^70 - x^69 + x^68 - x^66 + x^65 - x^64 + x^63 - x^61 + x^60 - x^59 + x^58 - x^56 + x^55 - x^54 + x^53 - x^51 + x^50 - x^49 + x^48 - x^46 + x^45 - x^44 + x^43 - x^41 + x^40 - x^36 + x^35 - x^31 + x^30 - x^26 + x^25 - x^21 + x^20 - x^16 + x^15 - x^11 + x^10 - x^6 + x^5 - x + 1
Phi_216(x)=x^72 - x^36 + 1
Phi_217(x)=x^180 - x^179 + x^173 - x^172 + x^166 - x^165 + x^159 - x^158 + x^152 - x^151 + x^149 - x^148 + x^145 - x^144 + x^142 - x^141 + x^138 - x^137 + x^135 - x^134 + x^131 - x^130 + x^128 - x^127 + x^124 - x^123 + x^121 - x^120 + x^118 - x^116 + x^114 - x^113 + x^111 - x^109 + x^107 - x^106 + x^104 - x^102 + x^100 - x^99 + x^97 - x^95 + x^93 - x^92 + x^90 - x^88 + x^87 - x^85 + x^83 - x^81 + x^80 - x^78 + x^76 - x^74 + x^73 - x^71 + x^69 - x^67 + x^66 - x^64 + x^62 - x^60 + x^59 - x^57 + x^56 - x^53 + x^52 - x^50 + x^49 - x^46 + x^45 - x^43 + x^42 - x^39 + x^38 - x^36 + x^35 - x^32 + x^31 - x^29 + x^28 - x^22 + x^21 - x^15 + x^14 - x^8 + x^7 - x + 1
Phi_218(x)=x^108 - x^107 + x^106 - x^105 + x^104 - x^103 + x^102 - x^101 + x^100 - x^99 + x^98 - x^97 + x^96 - x^95 + x^94 - x^93 + x^92 - x^91 + x^90 - x^89 + x^88 - x^87 + x^86 - x^85 + x^84 - x^83 + x^82 - x^81 + x^80 - x^79 + x^78 - x^77 + x^76 - x^75 + x^74 - x^73 + x^72 - x^71 + x^70 - x^69 + x^68 - x^67 + x^66 - x^65 + x^64 - x^63 + x^62 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_219(x)=x^144 - x^143 + x^141 - x^140 + x^138 - x^137 + x^135 - x^134 + x^132 - x^131 + x^129 - x^128 + x^126 - x^125 + x^123 - x^122 + x^120 - x^119 + x^117 - x^116 + x^114 - x^113 + x^111 - x^110 + x^108 - x^107 + x^105 - x^104 + x^102 - x^101 + x^99 - x^98 + x^96 - x^95 + x^93 - x^92 + x^90 - x^89 + x^87 - x^86 + x^84 - x^83 + x^81 - x^80 + x^78 - x^77 + x^75 - x^74 + x^72 - x^70 + x^69 - x^67 + x^66 - x^64 + x^63 - x^61 + x^60 - x^58 + x^57 - x^55 + x^54 - x^52 + x^51 - x^49 + x^48 - x^46 + x^45 - x^43 + x^42 - x^40 + x^39 - x^37 + x^36 - x^34 + x^33 - x^31 + x^30 - x^28 + x^27 - x^25 + x^24 - x^22 + x^21 - x^19 + x^18 - x^16 + x^15 - x^13 + x^12 - x^10 + x^9 - x^7 + x^6 - x^4 + x^3 - x + 1
Phi_220(x)=x^80 + x^78 - x^70 - x^68 + x^60 - x^56 - x^50 + x^46 + x^40 + x^34 - x^30 - x^24 + x^20 - x^12 - x^10 + x^2 + 1
Phi_221(x)=x^192 - x^191 + x^179 - x^178 + x^175 - x^174 + x^166 - x^165 + x^162 - x^161 + x^158 - x^157 + x^153 - x^152 + x^149 - x^148 + x^145 - x^144 + x^141 - x^139 + x^136 - x^135 + x^132 - x^131 + x^128 - x^126 + x^124 - x^122 + x^119 - x^118 + x^115 - x^113 + x^111 - x^109 + x^107 - x^105 + x^102 - x^100 + x^98 - x^96 + x^94 - x^92 + x^90 - x^87 + x^85 - x^83 + x^81 - x^79 + x^77 - x^74 + x^73 - x^70 + x^68 - x^66 + x^64 - x^61 + x^60 - x^57 + x^56 - x^53 + x^51 - x^48 + x^47 - x^44 + x^43 - x^40 + x^39 - x^35 + x^34 - x^31 + x^30 - x^27 + x^26 - x^18 + x^17 - x^14 + x^13 - x + 1
Phi_222(x)=x^72 + x^71 - x^69 - x^68 + x^66 + x^65 - x^63 - x^62 + x^60 + x^59 - x^57 - x^56 + x^54 + x^53 - x^51 - x^50 + x^48 + x^47 - x^45 - x^44 + x^42 + x^41 - x^39 - x^38 + x^36 - x^34 - x^33 + x^31 + x^30 - x^28 - x^27 + x^25 + x^24 - x^22 - x^21 + x^19 + x^18 - x^16 - x^15 + x^13 + x^12 - x^10 - x^9 + x^7 + x^6 - x^4 - x^3 + x + 1
Phi_223(x)=x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_224(x)=x^96 - x^80 + x^64 - x^48 + x^32 - x^16 + 1
Phi_225(x)=x^120 - x^105 + x^75 - x^60 + x^45 - x^15 + 1
Phi_226(x)=x^112 - x^111 + x^110 - x^109 + x^108 - x^107 + x^106 - x^105 + x^104 - x^103 + x^102 - x^101 + x^100 - x^99 + x^98 - x^97 + x^96 - x^95 + x^94 - x^93 + x^92 - x^91 + x^90 - x^89 + x^88 - x^87 + x^86 - x^85 + x^84 - x^83 + x^82 - x^81 + x^80 - x^79 + x^78 - x^77 + x^76 - x^75 + x^74 - x^73 + x^72 - x^71 + x^70 - x^69 + x^68 - x^67 + x^66 - x^65 + x^64 - x^63 + x^62 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_227(x)=x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_228(x)=x^72 + x^70 - x^66 - x^64 + x^60 + x^58 - x^54 - x^52 + x^48 + x^46 - x^42 - x^40 + x^36 - x^32 - x^30 + x^26 + x^24 - x^20 - x^18 + x^14 + x^12 - x^8 - x^6 + x^2 + 1
Phi_229(x)=x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_230(x)=x^88 + x^87 - x^83 - x^82 + x^78 + x^77 - x^73 - x^72 + x^68 + x^67 - x^65 - x^64 - x^63 - x^62 + x^60 + x^59 + x^58 + x^57 - x^55 - x^54 - x^53 - x^52 + x^50 + x^49 + x^48 + x^47 - x^45 - x^44 - x^43 + x^41 + x^40 + x^39 + x^38 - x^36 - x^35 - x^34 - x^33 + x^31 + x^30 + x^29 + x^28 - x^26 - x^25 - x^24 - x^23 + x^21 + x^20 - x^16 - x^15 + x^11 + x^10 - x^6 - x^5 + x + 1
Phi_231(x)=x^120 + x^119 + x^118 - x^113 - x^112 - x^111 - x^109 - x^108 - x^107 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 - x^92 - x^91 - x^90 - x^88 + x^85 + x^81 + x^77 - x^75 - x^74 - x^71 - x^70 + x^68 + x^64 + x^60 + x^56 + x^52 - x^50 - x^49 - x^46 - x^45 + x^43 + x^39 + x^35 - x^32 - x^30 - x^29 - x^28 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 - x^13 - x^12 - x^11 - x^9 - x^8 - x^7 + x^2 + x + 1
Phi_232(x)=x^112 - x^108 + x^104 - x^100 + x^96 - x^92 + x^88 - x^84 + x^80 - x^76 + x^72 - x^68 + x^64 - x^60 + x^56 - x^52 + x^48 - x^44 + x^40 - x^36 + x^32 - x^28 + x^24 - x^20 + x^16 - x^12 + x^8 - x^4 + 1
Phi_233(x)=x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_234(x)=x^72 + x^69 - x^63 - x^60 + x^54 + x^51 - x^45 - x^42 + x^36 - x^30 - x^27 + x^21 + x^18 - x^12 - x^9 + x^3 + 1
Phi_235(x)=x^184 - x^183 + x^179 - x^178 + x^174 - x^173 + x^169 - x^168 + x^164 - x^163 + x^159 - x^158 + x^154 - x^153 + x^149 - x^148 + x^144 - x^143 + x^139 - x^138 + x^137 - x^136 + x^134 - x^133 + x^132 - x^131 + x^129 - x^128 + x^127 - x^126 + x^124 - x^123 + x^122 - x^121 + x^119 - x^118 + x^117 - x^116 + x^114 - x^113 + x^112 - x^111 + x^109 - x^108 + x^107 - x^106 + x^104 - x^103 + x^102 - x^101 + x^99 - x^98 + x^97 - x^96 + x^94 - x^93 + x^92 - x^91 + x^90 - x^88 + x^87 - x^86 + x^85 - x^83 + x^82 - x^81 + x^80 - x^78 + x^77 - x^76 + x^75 - x^73 + x^72 - x^71 + x^70 - x^68 + x^67 - x^66 + x^65 - x^63 + x^62 - x^61 + x^60 - x^58 + x^57 - x^56 + x^55 - x^53 + x^52 - x^51 + x^50 - x^48 + x^47 - x^46 + x^45 - x^41 + x^40 - x^36 + x^35 - x^31 + x^30 - x^26 + x^25 - x^21 + x^20 - x^16 + x^15 - x^11 + x^10 - x^6 + x^5 - x + 1
Phi_236(x)=x^116 - x^114 + x^112 - x^110 + x^108 - x^106 + x^104 - x^102 + x^100 - x^98 + x^96 - x^94 + x^92 - x^90 + x^88 - x^86 + x^84 - x^82 + x^80 - x^78 + x^76 - x^74 + x^72 - x^70 + x^68 - x^66 + x^64 - x^62 + x^60 - x^58 + x^56 - x^54 + x^52 - x^50 + x^48 - x^46 + x^44 - x^42 + x^40 - x^38 + x^36 - x^34 + x^32 - x^30 + x^28 - x^26 + x^24 - x^22 + x^20 - x^18 + x^16 - x^14 + x^12 - x^10 + x^8 - x^6 + x^4 - x^2 + 1
Phi_237(x)=x^156 - x^155 + x^153 - x^152 + x^150 - x^149 + x^147 - x^146 + x^144 - x^143 + x^141 - x^140 + x^138 - x^137 + x^135 - x^134 + x^132 - x^131 + x^129 - x^128 + x^126 - x^125 + x^123 - x^122 + x^120 - x^119 + x^117 - x^116 + x^114 - x^113 + x^111 - x^110 + x^108 - x^107 + x^105 - x^104 + x^102 - x^101 + x^99 - x^98 + x^96 - x^95 + x^93 - x^92 + x^90 - x^89 + x^87 - x^86 + x^84 - x^83 + x^81 - x^80 + x^78 - x^76 + x^75 - x^73 + x^72 - x^70 + x^69 - x^67 + x^66 - x^64 + x^63 - x^61 + x^60 - x^58 + x^57 - x^55 + x^54 - x^52 + x^51 - x^49 + x^48 - x^46 + x^45 - x^43 + x^42 - x^40 + x^39 - x^37 + x^36 - x^34 + x^33 - x^31 + x^30 - x^28 + x^27 - x^25 + x^24 - x^22 + x^21 - x^19 + x^18 - x^16 + x^15 - x^13 + x^12 - x^10 + x^9 - x^7 + x^6 - x^4 + x^3 - x + 1
Phi_238(x)=x^96 + x^95 - x^89 - x^88 + x^82 + x^81 - x^79 - x^78 - x^75 - x^74 + x^72 + x^71 + x^68 + x^67 - x^65 - x^64 + x^62 - x^60 + x^58 + x^57 - x^55 + x^53 - x^51 - x^50 + x^48 - x^46 - x^45 + x^43 - x^41 + x^39 + x^38 - x^36 + x^34 - x^32 - x^31 + x^29 + x^28 + x^25 + x^24 - x^22 - x^21 - x^18 - x^17 + x^15 + x^14 - x^8 - x^7 + x + 1
Phi_239(x)=x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_240(x)=x^64 + x^56 - x^40 - x^32 - x^24 + x^8 + 1
Phi_241(x)=x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_242(x)=x^110 - x^99 + x^88 - x^77 + x^66 - x^55 + x^44 - x^33 + x^22 - x^11 + 1
Phi_243(x)=x^162 + x^81 + 1
Phi_244(x)=x^120 - x^118 + x^116 - x^114 + x^112 - x^110 + x^108 - x^106 + x^104 - x^102 + x^100 - x^98 + x^96 - x^94 + x^92 - x^90 + x^88 - x^86 + x^84 - x^82 + x^80 - x^78 + x^76 - x^74 + x^72 - x^70 + x^68 - x^66 + x^64 - x^62 + x^60 - x^58 + x^56 - x^54 + x^52 - x^50 + x^48 - x^46 + x^44 - x^42 + x^40 - x^38 + x^36 - x^34 + x^32 - x^30 + x^28 - x^26 + x^24 - x^22 + x^20 - x^18 + x^16 - x^14 + x^12 - x^10 + x^8 - x^6 + x^4 - x^2 + 1
Phi_245(x)=x^168 - x^161 + x^133 - x^126 + x^119 - x^112 + x^98 - x^91 + x^84 - x^77 + x^70 - x^56 + x^49 - x^42 + x^35 - x^7 + 1
Phi_246(x)=x^80 + x^79 - x^77 - x^76 + x^74 + x^73 - x^71 - x^70 + x^68 + x^67 - x^65 - x^64 + x^62 + x^61 - x^59 - x^58 + x^56 + x^55 - x^53 - x^52 + x^50 + x^49 - x^47 - x^46 + x^44 + x^43 - x^41 - x^40 - x^39 + x^37 + x^36 - x^34 - x^33 + x^31 + x^30 - x^28 - x^27 + x^25 + x^24 - x^22 - x^21 + x^19 + x^18 - x^16 - x^15 + x^13 + x^12 - x^10 - x^9 + x^7 + x^6 - x^4 - x^3 + x + 1
Phi_247(x)=x^216 - x^215 + x^203 - x^202 + x^197 - x^196 + x^190 - x^189 + x^184 - x^183 + x^178 - x^176 + x^171 - x^170 + x^165 - x^163 + x^159 - x^157 + x^152 - x^150 + x^146 - x^144 + x^140 - x^137 + x^133 - x^131 + x^127 - x^124 + x^121 - x^118 + x^114 - x^111 + x^108 - x^105 + x^102 - x^98 + x^95 - x^92 + x^89 - x^85 + x^83 - x^79 + x^76 - x^72 + x^70 - x^66 + x^64 - x^59 + x^57 - x^53 + x^51 - x^46 + x^45 - x^40 + x^38 - x^33 + x^32 - x^27 + x^26 - x^20 + x^19 - x^14 + x^13 - x + 1
Phi_248(x)=x^120 - x^116 + x^112 - x^108 + x^104 - x^100 + x^96 - x^92 + x^88 - x^84 + x^80 - x^76 + x^72 - x^68 + x^64 - x^60 + x^56 - x^52 + x^48 - x^44 + x^40 - x^36 + x^32 - x^28 + x^24 - x^20 + x^16 - x^12 + x^8 - x^4 + 1
Phi_249(x)=x^164 - x^163 + x^161 - x^160 + x^158 - x^157 + x^155 - x^154 + x^152 - x^151 + x^149 - x^148 + x^146 - x^145 + x^143 - x^142 + x^140 - x^139 + x^137 - x^136 + x^134 - x^133 + x^131 - x^130 + x^128 - x^127 + x^125 - x^124 + x^122 - x^121 + x^119 - x^118 + x^116 - x^115 + x^113 - x^112 + x^110 - x^109 + x^107 - x^106 + x^104 - x^103 + x^101 - x^100 + x^98 - x^97 + x^95 - x^94 + x^92 - x^91 + x^89 - x^88 + x^86 - x^85 + x^83 - x^82 + x^81 - x^79 + x^78 - x^76 + x^75 - x^73 + x^72 - x^70 + x^69 - x^67 + x^66 - x^64 + x^63 - x^61 + x^60 - x^58 + x^57 - x^55 + x^54 - x^52 + x^51 - x^49 + x^48 - x^46 + x^45 - x^43 + x^42 - x^40 + x^39 - x^37 + x^36 - x^34 + x^33 - x^31 + x^30 - x^28 + x^27 - x^25 + x^24 - x^22 + x^21 - x^19 + x^18 - x^16 + x^15 - x^13 + x^12 - x^10 + x^9 - x^7 + x^6 - x^4 + x^3 - x + 1
Phi_250(x)=x^100 - x^75 + x^50 - x^25 + 1
Phi_251(x)=x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_252(x)=x^72 + x^66 - x^54 - x^48 + x^36 - x^24 - x^18 + x^6 + 1
Phi_253(x)=x^220 - x^219 + x^209 - x^208 + x^198 - x^196 + x^187 - x^185 + x^176 - x^173 + x^165 - x^162 + x^154 - x^150 + x^143 - x^139 + x^132 - x^127 + x^121 - x^116 + x^110 - x^104 + x^99 - x^93 + x^88 - x^81 + x^77 - x^70 + x^66 - x^58 + x^55 - x^47 + x^44 - x^35 + x^33 - x^24 + x^22 - x^12 + x^11 - x + 1
Phi_254(x)=x^126 - x^125 + x^124 - x^123 + x^122 - x^121 + x^120 - x^119 + x^118 - x^117 + x^116 - x^115 + x^114 - x^113 + x^112 - x^111 + x^110 - x^109 + x^108 - x^107 + x^106 - x^105 + x^104 - x^103 + x^102 - x^101 + x^100 - x^99 + x^98 - x^97 + x^96 - x^95 + x^94 - x^93 + x^92 - x^91 + x^90 - x^89 + x^88 - x^87 + x^86 - x^85 + x^84 - x^83 + x^82 - x^81 + x^80 - x^79 + x^78 - x^77 + x^76 - x^75 + x^74 - x^73 + x^72 - x^71 + x^70 - x^69 + x^68 - x^67 + x^66 - x^65 + x^64 - x^63 + x^62 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_255(x)=x^128 + x^127 + x^126 - x^123 - x^122 - x^121 + x^113 + x^112 - x^110 - x^109 - x^108 - x^107 + x^105 + x^104 + x^98 + x^97 - x^95 - x^94 - x^93 - x^92 + x^90 + x^89 + x^83 + x^82 - x^80 - x^79 - x^78 + x^76 + 2*x^75 + x^74 - x^72 - x^71 - x^70 + x^68 + x^67 - x^65 - x^64 - x^63 + x^61 + x^60 - x^58 - x^57 - x^56 + x^54 + 2*x^53 + x^52 - x^50 - x^49 - x^48 + x^46 + x^45 + x^39 + x^38 - x^36 - x^35 - x^34 - x^33 + x^31 + x^30 + x^24 + x^23 - x^21 - x^20 - x^19 - x^18 + x^16 + x^15 - x^7 - x^6 - x^5 + x^2 + x + 1
Phi_256(x)=x^128 + 1
Phi_257(x)=x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_258(x)=x^84 + x^83 - x^81 - x^80 + x^78 + x^77 - x^75 - x^74 + x^72 + x^71 - x^69 - x^68 + x^66 + x^65 - x^63 - x^62 + x^60 + x^59 - x^57 - x^56 + x^54 + x^53 - x^51 - x^50 + x^48 + x^47 - x^45 - x^44 + x^42 - x^40 - x^39 + x^37 + x^36 - x^34 - x^33 + x^31 + x^30 - x^28 - x^27 + x^25 + x^24 - x^22 - x^21 + x^19 + x^18 - x^16 - x^15 + x^13 + x^12 - x^10 - x^9 + x^7 + x^6 - x^4 - x^3 + x + 1
Phi_259(x)=x^216 - x^215 + x^209 - x^208 + x^202 - x^201 + x^195 - x^194 + x^188 - x^187 + x^181 - x^180 + x^179 - x^178 + x^174 - x^173 + x^172 - x^171 + x^167 - x^166 + x^165 - x^164 + x^160 - x^159 + x^158 - x^157 + x^153 - x^152 + x^151 - x^150 + x^146 - x^145 + x^144 - x^143 + x^142 - x^141 + x^139 - x^138 + x^137 - x^136 + x^135 - x^134 + x^132 - x^131 + x^130 - x^129 + x^128 - x^127 + x^125 - x^124 + x^123 - x^122 + x^121 - x^120 + x^118 - x^117 + x^116 - x^115 + x^114 - x^113 + x^111 - x^110 + x^109 - x^108 + x^107 - x^106 + x^105 - x^103 + x^102 - x^101 + x^100 - x^99 + x^98 - x^96 + x^95 - x^94 + x^93 - x^92 + x^91 - x^89 + x^88 - x^87 + x^86 - x^85 + x^84 - x^82 + x^81 - x^80 + x^79 - x^78 + x^77 - x^75 + x^74 - x^73 + x^72 - x^71 + x^70 - x^66 + x^65 - x^64 + x^63 - x^59 + x^58 - x^57 + x^56 - x^52 + x^51 - x^50 + x^49 - x^45 + x^44 - x^43 + x^42 - x^38 + x^37 - x^36 + x^35 - x^29 + x^28 - x^22 + x^21 - x^15 + x^14 - x^8 + x^7 - x + 1
Phi_260(x)=x^96 + x^94 - x^86 - x^84 + x^76 + x^74 - x^70 - x^68 - x^66 - x^64 + x^60 + x^58 + x^56 + x^54 - x^50 - x^48 - x^46 + x^42 + x^40 + x^38 + x^36 - x^32 - x^30 - x^28 - x^26 + x^22 + x^20 - x^12 - x^10 + x^2 + 1
Phi_261(x)=x^168 - x^165 + x^159 - x^156 + x^150 - x^147 + x^141 - x^138 + x^132 - x^129 + x^123 - x^120 + x^114 - x^111 + x^105 - x^102 + x^96 - x^93 + x^87 - x^84 + x^81 - x^75 + x^72 - x^66 + x^63 - x^57 + x^54 - x^48 + x^45 - x^39 + x^36 - x^30 + x^27 - x^21 + x^18 - x^12 + x^9 - x^3 + 1
Phi_262(x)=x^130 - x^129 + x^128 - x^127 + x^126 - x^125 + x^124 - x^123 + x^122 - x^121 + x^120 - x^119 + x^118 - x^117 + x^116 - x^115 + x^114 - x^113 + x^112 - x^111 + x^110 - x^109 + x^108 - x^107 + x^106 - x^105 + x^104 - x^103 + x^102 - x^101 + x^100 - x^99 + x^98 - x^97 + x^96 - x^95 + x^94 - x^93 + x^92 - x^91 + x^90 - x^89 + x^88 - x^87 + x^86 - x^85 + x^84 - x^83 + x^82 - x^81 + x^80 - x^79 + x^78 - x^77 + x^76 - x^75 + x^74 - x^73 + x^72 - x^71 + x^70 - x^69 + x^68 - x^67 + x^66 - x^65 + x^64 - x^63 + x^62 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_263(x)=x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_264(x)=x^80 + x^76 - x^68 - x^64 + x^56 + x^52 - x^44 - x^40 - x^36 + x^28 + x^24 - x^16 - x^12 + x^4 + 1
Phi_265(x)=x^208 - x^207 + x^203 - x^202 + x^198 - x^197 + x^193 - x^192 + x^188 - x^187 + x^183 - x^182 + x^178 - x^177 + x^173 - x^172 + x^168 - x^167 + x^163 - x^162 + x^158 - x^157 + x^155 - x^154 + x^153 - x^152 + x^150 - x^149 + x^148 - x^147 + x^145 - x^144 + x^143 - x^142 + x^140 - x^139 + x^138 - x^137 + x^135 - x^134 + x^133 - x^132 + x^130 - x^129 + x^128 - x^127 + x^125 - x^124 + x^123 - x^122 + x^120 - x^119 + x^118 - x^117 + x^115 - x^114 + x^113 - x^112 + x^110 - x^109 + x^108 - x^107 + x^105 - x^104 + x^103 - x^101 + x^100 - x^99 + x^98 - x^96 + x^95 - x^94 + x^93 - x^91 + x^90 - x^89 + x^88 - x^86 + x^85 - x^84 + x^83 - x^81 + x^80 - x^79 + x^78 - x^76 + x^75 - x^74 + x^73 - x^71 + x^70 - x^69 + x^68 - x^66 + x^65 - x^64 + x^63 - x^61 + x^60 - x^59 + x^58 - x^56 + x^55 - x^54 + x^53 - x^51 + x^50 - x^46 + x^45 - x^41 + x^40 - x^36 + x^35 - x^31 + x^30 - x^26 + x^25 - x^21 + x^20 - x^16 + x^15 - x^11 + x^10 - x^6 + x^5 - x + 1
Phi_266(x)=x^108 + x^107 - x^101 - x^100 + x^94 + x^93 - x^89 - x^88 - x^87 - x^86 + x^82 + x^81 + x^80 + x^79 - x^75 - x^74 - x^73 - x^72 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 - x^63 - x^62 - x^61 - x^60 - x^59 - x^58 + x^56 + x^55 + x^54 + x^53 + x^52 - x^50 - x^49 - x^48 - x^47 - x^46 - x^45 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 - x^36 - x^35 - x^34 - x^33 + x^29 + x^28 + x^27 + x^26 - x^22 - x^21 - x^20 - x^19 + x^15 + x^14 - x^8 - x^7 + x + 1
Phi_267(x)=x^176 - x^175 + x^173 - x^172 + x^170 - x^169 + x^167 - x^166 + x^164 - x^163 + x^161 - x^160 + x^158 - x^157 + x^155 - x^154 + x^152 - x^151 + x^149 - x^148 + x^146 - x^145 + x^143 - x^142 + x^140 - x^139 + x^137 - x^136 + x^134 - x^133 + x^131 - x^130 + x^128 - x^127 + x^125 - x^124 + x^122 - x^121 + x^119 - x^118 + x^116 - x^115 + x^113 - x^112 + x^110 - x^109 + x^107 - x^106 + x^104 - x^103 + x^101 - x^100 + x^98 - x^97 + x^95 - x^94 + x^92 - x^91 + x^89 - x^88 + x^87 - x^85 + x^84 - x^82 + x^81 - x^79 + x^78 - x^76 + x^75 - x^73 + x^72 - x^70 + x^69 - x^67 + x^66 - x^64 + x^63 - x^61 + x^60 - x^58 + x^57 - x^55 + x^54 - x^52 + x^51 - x^49 + x^48 - x^46 + x^45 - x^43 + x^42 - x^40 + x^39 - x^37 + x^36 - x^34 + x^33 - x^31 + x^30 - x^28 + x^27 - x^25 + x^24 - x^22 + x^21 - x^19 + x^18 - x^16 + x^15 - x^13 + x^12 - x^10 + x^9 - x^7 + x^6 - x^4 + x^3 - x + 1
Phi_268(x)=x^132 - x^130 + x^128 - x^126 + x^124 - x^122 + x^120 - x^118 + x^116 - x^114 + x^112 - x^110 + x^108 - x^106 + x^104 - x^102 + x^100 - x^98 + x^96 - x^94 + x^92 - x^90 + x^88 - x^86 + x^84 - x^82 + x^80 - x^78 + x^76 - x^74 + x^72 - x^70 + x^68 - x^66 + x^64 - x^62 + x^60 - x^58 + x^56 - x^54 + x^52 - x^50 + x^48 - x^46 + x^44 - x^42 + x^40 - x^38 + x^36 - x^34 + x^32 - x^30 + x^28 - x^26 + x^24 - x^22 + x^20 - x^18 + x^16 - x^14 + x^12 - x^10 + x^8 - x^6 + x^4 - x^2 + 1
Phi_269(x)=x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_270(x)=x^72 + x^63 - x^45 - x^36 - x^27 + x^9 + 1
Phi_271(x)=x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_272(x)=x^128 - x^120 + x^112 - x^104 + x^96 - x^88 + x^80 - x^72 + x^64 - x^56 + x^48 - x^40 + x^32 - x^24 + x^16 - x^8 + 1
Phi_273(x)=x^144 + x^143 + x^142 - x^137 - x^136 - x^135 - x^131 - x^130 - x^129 + x^124 + 2*x^123 + 2*x^122 + x^121 - x^116 - x^115 - x^114 - x^110 - x^109 - x^108 + x^105 + x^104 + 2*x^103 + 2*x^102 + 2*x^101 + x^100 - x^98 - x^97 - x^96 - x^95 - x^94 - x^93 - x^92 - x^91 - x^90 - x^89 - x^88 - x^87 + x^85 + 2*x^84 + 2*x^83 + 2*x^82 + 2*x^81 + 2*x^80 + x^79 - x^77 - x^76 - x^75 - x^74 - x^73 - x^72 - x^71 - x^70 - x^69 - x^68 - x^67 + x^65 + 2*x^64 + 2*x^63 + 2*x^62 + 2*x^61 + 2*x^60 + x^59 - x^57 - x^56 - x^55 - x^54 - x^53 - x^52 - x^51 - x^50 - x^49 - x^48 - x^47 - x^46 + x^44 + 2*x^43 + 2*x^42 + 2*x^41 + x^40 + x^39 - x^36 - x^35 - x^34 - x^30 - x^29 - x^28 + x^23 + 2*x^22 + 2*x^21 + x^20 - x^15 - x^14 - x^13 - x^9 - x^8 - x^7 + x^2 + x + 1
Phi_274(x)=x^136 - x^135 + x^134 - x^133 + x^132 - x^131 + x^130 - x^129 + x^128 - x^127 + x^126 - x^125 + x^124 - x^123 + x^122 - x^121 + x^120 - x^119 + x^118 - x^117 + x^116 - x^115 + x^114 - x^113 + x^112 - x^111 + x^110 - x^109 + x^108 - x^107 + x^106 - x^105 + x^104 - x^103 + x^102 - x^101 + x^100 - x^99 + x^98 - x^97 + x^96 - x^95 + x^94 - x^93 + x^92 - x^91 + x^90 - x^89 + x^88 - x^87 + x^86 - x^85 + x^84 - x^83 + x^82 - x^81 + x^80 - x^79 + x^78 - x^77 + x^76 - x^75 + x^74 - x^73 + x^72 - x^71 + x^70 - x^69 + x^68 - x^67 + x^66 - x^65 + x^64 - x^63 + x^62 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_275(x)=x^200 - x^195 + x^175 - x^170 + x^150 - x^140 + x^125 - x^115 + x^100 - x^85 + x^75 - x^60 + x^50 - x^30 + x^25 - x^5 + 1
Phi_276(x)=x^88 + x^86 - x^82 - x^80 + x^76 + x^74 - x^70 - x^68 + x^64 + x^62 - x^58 - x^56 + x^52 + x^50 - x^46 - x^44 - x^42 + x^38 + x^36 - x^32 - x^30 + x^26 + x^24 - x^20 - x^18 + x^14 + x^12 - x^8 - x^6 + x^2 + 1
Phi_277(x)=x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_278(x)=x^138 - x^137 + x^136 - x^135 + x^134 - x^133 + x^132 - x^131 + x^130 - x^129 + x^128 - x^127 + x^126 - x^125 + x^124 - x^123 + x^122 - x^121 + x^120 - x^119 + x^118 - x^117 + x^116 - x^115 + x^114 - x^113 + x^112 - x^111 + x^110 - x^109 + x^108 - x^107 + x^106 - x^105 + x^104 - x^103 + x^102 - x^101 + x^100 - x^99 + x^98 - x^97 + x^96 - x^95 + x^94 - x^93 + x^92 - x^91 + x^90 - x^89 + x^88 - x^87 + x^86 - x^85 + x^84 - x^83 + x^82 - x^81 + x^80 - x^79 + x^78 - x^77 + x^76 - x^75 + x^74 - x^73 + x^72 - x^71 + x^70 - x^69 + x^68 - x^67 + x^66 - x^65 + x^64 - x^63 + x^62 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_279(x)=x^180 - x^177 + x^171 - x^168 + x^162 - x^159 + x^153 - x^150 + x^144 - x^141 + x^135 - x^132 + x^126 - x^123 + x^117 - x^114 + x^108 - x^105 + x^99 - x^96 + x^90 - x^84 + x^81 - x^75 + x^72 - x^66 + x^63 - x^57 + x^54 - x^48 + x^45 - x^39 + x^36 - x^30 + x^27 - x^21 + x^18 - x^12 + x^9 - x^3 + 1
Phi_280(x)=x^96 + x^92 - x^76 - x^72 - x^68 - x^64 + x^56 + x^52 + x^48 + x^44 + x^40 - x^32 - x^28 - x^24 - x^20 + x^4 + 1
Phi_281(x)=x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_282(x)=x^92 + x^91 - x^89 - x^88 + x^86 + x^85 - x^83 - x^82 + x^80 + x^79 - x^77 - x^76 + x^74 + x^73 - x^71 - x^70 + x^68 + x^67 - x^65 - x^64 + x^62 + x^61 - x^59 - x^58 + x^56 + x^55 - x^53 - x^52 + x^50 + x^49 - x^47 - x^46 - x^45 + x^43 + x^42 - x^40 - x^39 + x^37 + x^36 - x^34 - x^33 + x^31 + x^30 - x^28 - x^27 + x^25 + x^24 - x^22 - x^21 + x^19 + x^18 - x^16 - x^15 + x^13 + x^12 - x^10 - x^9 + x^7 + x^6 - x^4 - x^3 + x + 1
Phi_283(x)=x^282 + x^281 + x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_284(x)=x^140 - x^138 + x^136 - x^134 + x^132 - x^130 + x^128 - x^126 + x^124 - x^122 + x^120 - x^118 + x^116 - x^114 + x^112 - x^110 + x^108 - x^106 + x^104 - x^102 + x^100 - x^98 + x^96 - x^94 + x^92 - x^90 + x^88 - x^86 + x^84 - x^82 + x^80 - x^78 + x^76 - x^74 + x^72 - x^70 + x^68 - x^66 + x^64 - x^62 + x^60 - x^58 + x^56 - x^54 + x^52 - x^50 + x^48 - x^46 + x^44 - x^42 + x^40 - x^38 + x^36 - x^34 + x^32 - x^30 + x^28 - x^26 + x^24 - x^22 + x^20 - x^18 + x^16 - x^14 + x^12 - x^10 + x^8 - x^6 + x^4 - x^2 + 1
Phi_285(x)=x^144 + x^143 + x^142 - x^139 - x^138 - x^137 + x^129 + x^128 + x^127 - x^125 - 2*x^124 - 2*x^123 - x^122 + x^120 + x^119 + x^118 + x^114 + x^113 + x^112 - x^110 - 2*x^109 - 2*x^108 - x^107 + x^105 + x^104 + x^103 + x^99 + x^98 + x^97 - x^95 - 2*x^94 - 2*x^93 - x^92 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 - x^81 - 2*x^80 - 2*x^79 - 2*x^78 - x^77 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 - x^67 - 2*x^66 - 2*x^65 - 2*x^64 - x^63 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 - x^52 - 2*x^51 - 2*x^50 - x^49 + x^47 + x^46 + x^45 + x^41 + x^40 + x^39 - x^37 - 2*x^36 - 2*x^35 - x^34 + x^32 + x^31 + x^30 + x^26 + x^25 + x^24 - x^22 - 2*x^21 - 2*x^20 - x^19 + x^17 + x^16 + x^15 - x^7 - x^6 - x^5 + x^2 + x + 1
Phi_286(x)=x^120 + x^119 - x^109 - x^108 - x^107 - x^106 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 - x^87 - x^86 - x^85 - x^84 - x^83 - x^82 - x^81 - x^80 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 - x^65 - x^64 - x^63 - x^62 - x^61 - x^60 - x^59 - x^58 - x^57 - x^56 - x^55 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 - x^40 - x^39 - x^38 - x^37 - x^36 - x^35 - x^34 - x^33 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 - x^14 - x^13 - x^12 - x^11 + x + 1
Phi_287(x)=x^240 - x^239 + x^233 - x^232 + x^226 - x^225 + x^219 - x^218 + x^212 - x^211 + x^205 - x^204 + x^199 - x^197 + x^192 - x^190 + x^185 - x^183 + x^178 - x^176 + x^171 - x^169 + x^164 - x^162 + x^158 - x^155 + x^151 - x^148 + x^144 - x^141 + x^137 - x^134 + x^130 - x^127 + x^123 - x^120 + x^117 - x^113 + x^110 - x^106 + x^103 - x^99 + x^96 - x^92 + x^89 - x^85 + x^82 - x^78 + x^76 - x^71 + x^69 - x^64 + x^62 - x^57 + x^55 - x^50 + x^48 - x^43 + x^41 - x^36 + x^35 - x^29 + x^28 - x^22 + x^21 - x^15 + x^14 - x^8 + x^7 - x + 1
Phi_288(x)=x^96 - x^48 + 1
Phi_289(x)=x^272 + x^255 + x^238 + x^221 + x^204 + x^187 + x^170 + x^153 + x^136 + x^119 + x^102 + x^85 + x^68 + x^51 + x^34 + x^17 + 1
Phi_290(x)=x^112 + x^111 - x^107 - x^106 + x^102 + x^101 - x^97 - x^96 + x^92 + x^91 - x^87 - x^86 - x^83 + x^81 + x^78 - x^76 - x^73 + x^71 + x^68 - x^66 - x^63 + x^61 + x^58 - x^56 + x^54 + x^51 - x^49 - x^46 + x^44 + x^41 - x^39 - x^36 + x^34 + x^31 - x^29 - x^26 - x^25 + x^21 + x^20 - x^16 - x^15 + x^11 + x^10 - x^6 - x^5 + x + 1
Phi_291(x)=x^192 - x^191 + x^189 - x^188 + x^186 - x^185 + x^183 - x^182 + x^180 - x^179 + x^177 - x^176 + x^174 - x^173 + x^171 - x^170 + x^168 - x^167 + x^165 - x^164 + x^162 - x^161 + x^159 - x^158 + x^156 - x^155 + x^153 - x^152 + x^150 - x^149 + x^147 - x^146 + x^144 - x^143 + x^141 - x^140 + x^138 - x^137 + x^135 - x^134 + x^132 - x^131 + x^129 - x^128 + x^126 - x^125 + x^123 - x^122 + x^120 - x^119 + x^117 - x^116 + x^114 - x^113 + x^111 - x^110 + x^108 - x^107 + x^105 - x^104 + x^102 - x^101 + x^99 - x^98 + x^96 - x^94 + x^93 - x^91 + x^90 - x^88 + x^87 - x^85 + x^84 - x^82 + x^81 - x^79 + x^78 - x^76 + x^75 - x^73 + x^72 - x^70 + x^69 - x^67 + x^66 - x^64 + x^63 - x^61 + x^60 - x^58 + x^57 - x^55 + x^54 - x^52 + x^51 - x^49 + x^48 - x^46 + x^45 - x^43 + x^42 - x^40 + x^39 - x^37 + x^36 - x^34 + x^33 - x^31 + x^30 - x^28 + x^27 - x^25 + x^24 - x^22 + x^21 - x^19 + x^18 - x^16 + x^15 - x^13 + x^12 - x^10 + x^9 - x^7 + x^6 - x^4 + x^3 - x + 1
Phi_292(x)=x^144 - x^142 + x^140 - x^138 + x^136 - x^134 + x^132 - x^130 + x^128 - x^126 + x^124 - x^122 + x^120 - x^118 + x^116 - x^114 + x^112 - x^110 + x^108 - x^106 + x^104 - x^102 + x^100 - x^98 + x^96 - x^94 + x^92 - x^90 + x^88 - x^86 + x^84 - x^82 + x^80 - x^78 + x^76 - x^74 + x^72 - x^70 + x^68 - x^66 + x^64 - x^62 + x^60 - x^58 + x^56 - x^54 + x^52 - x^50 + x^48 - x^46 + x^44 - x^42 + x^40 - x^38 + x^36 - x^34 + x^32 - x^30 + x^28 - x^26 + x^24 - x^22 + x^20 - x^18 + x^16 - x^14 + x^12 - x^10 + x^8 - x^6 + x^4 - x^2 + 1
Phi_293(x)=x^292 + x^291 + x^290 + x^289 + x^288 + x^287 + x^286 + x^285 + x^284 + x^283 + x^282 + x^281 + x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_294(x)=x^84 + x^77 - x^63 - x^56 + x^42 - x^28 - x^21 + x^7 + 1
Phi_295(x)=x^232 - x^231 + x^227 - x^226 + x^222 - x^221 + x^217 - x^216 + x^212 - x^211 + x^207 - x^206 + x^202 - x^201 + x^197 - x^196 + x^192 - x^191 + x^187 - x^186 + x^182 - x^181 + x^177 - x^176 + x^173 - x^171 + x^168 - x^166 + x^163 - x^161 + x^158 - x^156 + x^153 - x^151 + x^148 - x^146 + x^143 - x^141 + x^138 - x^136 + x^133 - x^131 + x^128 - x^126 + x^123 - x^121 + x^118 - x^116 + x^114 - x^111 + x^109 - x^106 + x^104 - x^101 + x^99 - x^96 + x^94 - x^91 + x^89 - x^86 + x^84 - x^81 + x^79 - x^76 + x^74 - x^71 + x^69 - x^66 + x^64 - x^61 + x^59 - x^56 + x^55 - x^51 + x^50 - x^46 + x^45 - x^41 + x^40 - x^36 + x^35 - x^31 + x^30 - x^26 + x^25 - x^21 + x^20 - x^16 + x^15 - x^11 + x^10 - x^6 + x^5 - x + 1
Phi_296(x)=x^144 - x^140 + x^136 - x^132 + x^128 - x^124 + x^120 - x^116 + x^112 - x^108 + x^104 - x^100 + x^96 - x^92 + x^88 - x^84 + x^80 - x^76 + x^72 - x^68 + x^64 - x^60 + x^56 - x^52 + x^48 - x^44 + x^40 - x^36 + x^32 - x^28 + x^24 - x^20 + x^16 - x^12 + x^8 - x^4 + 1
Phi_297(x)=x^180 - x^171 + x^153 - x^144 + x^126 - x^117 + x^99 - x^90 + x^81 - x^63 + x^54 - x^36 + x^27 - x^9 + 1
Phi_298(x)=x^148 - x^147 + x^146 - x^145 + x^144 - x^143 + x^142 - x^141 + x^140 - x^139 + x^138 - x^137 + x^136 - x^135 + x^134 - x^133 + x^132 - x^131 + x^130 - x^129 + x^128 - x^127 + x^126 - x^125 + x^124 - x^123 + x^122 - x^121 + x^120 - x^119 + x^118 - x^117 + x^116 - x^115 + x^114 - x^113 + x^112 - x^111 + x^110 - x^109 + x^108 - x^107 + x^106 - x^105 + x^104 - x^103 + x^102 - x^101 + x^100 - x^99 + x^98 - x^97 + x^96 - x^95 + x^94 - x^93 + x^92 - x^91 + x^90 - x^89 + x^88 - x^87 + x^86 - x^85 + x^84 - x^83 + x^82 - x^81 + x^80 - x^79 + x^78 - x^77 + x^76 - x^75 + x^74 - x^73 + x^72 - x^71 + x^70 - x^69 + x^68 - x^67 + x^66 - x^65 + x^64 - x^63 + x^62 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_299(x)=x^264 - x^263 + x^251 - x^250 + x^241 - x^240 + x^238 - x^237 + x^228 - x^227 + x^225 - x^224 + x^218 - x^217 + x^215 - x^214 + x^212 - x^211 + x^205 - x^204 + x^202 - x^201 + x^199 - x^198 + x^195 - x^194 + x^192 - x^191 + x^189 - x^188 + x^186 - x^185 + x^182 - x^181 + x^179 - x^178 + x^176 - x^175 + x^173 - x^171 + x^169 - x^168 + x^166 - x^165 + x^163 - x^162 + x^160 - x^158 + x^156 - x^155 + x^153 - x^152 + x^150 - x^148 + x^147 - x^145 + x^143 - x^142 + x^140 - x^139 + x^137 - x^135 + x^134 - x^132 + x^130 - x^129 + x^127 - x^125 + x^124 - x^122 + x^121 - x^119 + x^117 - x^116 + x^114 - x^112 + x^111 - x^109 + x^108 - x^106 + x^104 - x^102 + x^101 - x^99 + x^98 - x^96 + x^95 - x^93 + x^91 - x^89 + x^88 - x^86 + x^85 - x^83 + x^82 - x^79 + x^78 - x^76 + x^75 - x^73 + x^72 - x^70 + x^69 - x^66 + x^65 - x^63 + x^62 - x^60 + x^59 - x^53 + x^52 - x^50 + x^49 - x^47 + x^46 - x^40 + x^39 - x^37 + x^36 - x^27 + x^26 - x^24 + x^23 - x^14 + x^13 - x + 1
Phi_300(x)=x^80 + x^70 - x^50 - x^40 - x^30 + x^10 + 1
Phi_301(x)=x^252 - x^251 + x^245 - x^244 + x^238 - x^237 + x^231 - x^230 + x^224 - x^223 + x^217 - x^216 + x^210 - x^208 + x^203 - x^201 + x^196 - x^194 + x^189 - x^187 + x^182 - x^180 + x^175 - x^173 + x^168 - x^165 + x^161 - x^158 + x^154 - x^151 + x^147 - x^144 + x^140 - x^137 + x^133 - x^130 + x^126 - x^122 + x^119 - x^115 + x^112 - x^108 + x^105 - x^101 + x^98 - x^94 + x^91 - x^87 + x^84 - x^79 + x^77 - x^72 + x^70 - x^65 + x^63 - x^58 + x^56 - x^51 + x^49 - x^44 + x^42 - x^36 + x^35 - x^29 + x^28 - x^22 + x^21 - x^15 + x^14 - x^8 + x^7 - x + 1
Phi_302(x)=x^150 - x^149 + x^148 - x^147 + x^146 - x^145 + x^144 - x^143 + x^142 - x^141 + x^140 - x^139 + x^138 - x^137 + x^136 - x^135 + x^134 - x^133 + x^132 - x^131 + x^130 - x^129 + x^128 - x^127 + x^126 - x^125 + x^124 - x^123 + x^122 - x^121 + x^120 - x^119 + x^118 - x^117 + x^116 - x^115 + x^114 - x^113 + x^112 - x^111 + x^110 - x^109 + x^108 - x^107 + x^106 - x^105 + x^104 - x^103 + x^102 - x^101 + x^100 - x^99 + x^98 - x^97 + x^96 - x^95 + x^94 - x^93 + x^92 - x^91 + x^90 - x^89 + x^88 - x^87 + x^86 - x^85 + x^84 - x^83 + x^82 - x^81 + x^80 - x^79 + x^78 - x^77 + x^76 - x^75 + x^74 - x^73 + x^72 - x^71 + x^70 - x^69 + x^68 - x^67 + x^66 - x^65 + x^64 - x^63 + x^62 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_303(x)=x^200 - x^199 + x^197 - x^196 + x^194 - x^193 + x^191 - x^190 + x^188 - x^187 + x^185 - x^184 + x^182 - x^181 + x^179 - x^178 + x^176 - x^175 + x^173 - x^172 + x^170 - x^169 + x^167 - x^166 + x^164 - x^163 + x^161 - x^160 + x^158 - x^157 + x^155 - x^154 + x^152 - x^151 + x^149 - x^148 + x^146 - x^145 + x^143 - x^142 + x^140 - x^139 + x^137 - x^136 + x^134 - x^133 + x^131 - x^130 + x^128 - x^127 + x^125 - x^124 + x^122 - x^121 + x^119 - x^118 + x^116 - x^115 + x^113 - x^112 + x^110 - x^109 + x^107 - x^106 + x^104 - x^103 + x^101 - x^100 + x^99 - x^97 + x^96 - x^94 + x^93 - x^91 + x^90 - x^88 + x^87 - x^85 + x^84 - x^82 + x^81 - x^79 + x^78 - x^76 + x^75 - x^73 + x^72 - x^70 + x^69 - x^67 + x^66 - x^64 + x^63 - x^61 + x^60 - x^58 + x^57 - x^55 + x^54 - x^52 + x^51 - x^49 + x^48 - x^46 + x^45 - x^43 + x^42 - x^40 + x^39 - x^37 + x^36 - x^34 + x^33 - x^31 + x^30 - x^28 + x^27 - x^25 + x^24 - x^22 + x^21 - x^19 + x^18 - x^16 + x^15 - x^13 + x^12 - x^10 + x^9 - x^7 + x^6 - x^4 + x^3 - x + 1
Phi_304(x)=x^144 - x^136 + x^128 - x^120 + x^112 - x^104 + x^96 - x^88 + x^80 - x^72 + x^64 - x^56 + x^48 - x^40 + x^32 - x^24 + x^16 - x^8 + 1
Phi_305(x)=x^240 - x^239 + x^235 - x^234 + x^230 - x^229 + x^225 - x^224 + x^220 - x^219 + x^215 - x^214 + x^210 - x^209 + x^205 - x^204 + x^200 - x^199 + x^195 - x^194 + x^190 - x^189 + x^185 - x^184 + x^180 - x^178 + x^175 - x^173 + x^170 - x^168 + x^165 - x^163 + x^160 - x^158 + x^155 - x^153 + x^150 - x^148 + x^145 - x^143 + x^140 - x^138 + x^135 - x^133 + x^130 - x^128 + x^125 - x^123 + x^120 - x^117 + x^115 - x^112 + x^110 - x^107 + x^105 - x^102 + x^100 - x^97 + x^95 - x^92 + x^90 - x^87 + x^85 - x^82 + x^80 - x^77 + x^75 - x^72 + x^70 - x^67 + x^65 - x^62 + x^60 - x^56 + x^55 - x^51 + x^50 - x^46 + x^45 - x^41 + x^40 - x^36 + x^35 - x^31 + x^30 - x^26 + x^25 - x^21 + x^20 - x^16 + x^15 - x^11 + x^10 - x^6 + x^5 - x + 1
Phi_306(x)=x^96 + x^93 - x^87 - x^84 + x^78 + x^75 - x^69 - x^66 + x^60 + x^57 - x^51 - x^48 - x^45 + x^39 + x^36 - x^30 - x^27 + x^21 + x^18 - x^12 - x^9 + x^3 + 1
Phi_307(x)=x^306 + x^305 + x^304 + x^303 + x^302 + x^301 + x^300 + x^299 + x^298 + x^297 + x^296 + x^295 + x^294 + x^293 + x^292 + x^291 + x^290 + x^289 + x^288 + x^287 + x^286 + x^285 + x^284 + x^283 + x^282 + x^281 + x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_308(x)=x^120 + x^118 - x^106 - x^104 - x^98 - x^96 + x^92 + x^90 + x^84 + x^82 - x^78 + x^74 - x^70 - x^68 + x^64 - x^60 + x^56 - x^52 - x^50 + x^46 - x^42 + x^38 + x^36 + x^30 + x^28 - x^24 - x^22 - x^16 - x^14 + x^2 + 1
Phi_309(x)=x^204 - x^203 + x^201 - x^200 + x^198 - x^197 + x^195 - x^194 + x^192 - x^191 + x^189 - x^188 + x^186 - x^185 + x^183 - x^182 + x^180 - x^179 + x^177 - x^176 + x^174 - x^173 + x^171 - x^170 + x^168 - x^167 + x^165 - x^164 + x^162 - x^161 + x^159 - x^158 + x^156 - x^155 + x^153 - x^152 + x^150 - x^149 + x^147 - x^146 + x^144 - x^143 + x^141 - x^140 + x^138 - x^137 + x^135 - x^134 + x^132 - x^131 + x^129 - x^128 + x^126 - x^125 + x^123 - x^122 + x^120 - x^119 + x^117 - x^116 + x^114 - x^113 + x^111 - x^110 + x^108 - x^107 + x^105 - x^104 + x^102 - x^100 + x^99 - x^97 + x^96 - x^94 + x^93 - x^91 + x^90 - x^88 + x^87 - x^85 + x^84 - x^82 + x^81 - x^79 + x^78 - x^76 + x^75 - x^73 + x^72 - x^70 + x^69 - x^67 + x^66 - x^64 + x^63 - x^61 + x^60 - x^58 + x^57 - x^55 + x^54 - x^52 + x^51 - x^49 + x^48 - x^46 + x^45 - x^43 + x^42 - x^40 + x^39 - x^37 + x^36 - x^34 + x^33 - x^31 + x^30 - x^28 + x^27 - x^25 + x^24 - x^22 + x^21 - x^19 + x^18 - x^16 + x^15 - x^13 + x^12 - x^10 + x^9 - x^7 + x^6 - x^4 + x^3 - x + 1
Phi_310(x)=x^120 + x^119 - x^115 - x^114 + x^110 + x^109 - x^105 - x^104 + x^100 + x^99 - x^95 - x^94 + x^90 - x^88 - x^85 + x^83 + x^80 - x^78 - x^75 + x^73 + x^70 - x^68 - x^65 + x^63 + x^60 + x^57 - x^55 - x^52 + x^50 + x^47 - x^45 - x^42 + x^40 + x^37 - x^35 - x^32 + x^30 - x^26 - x^25 + x^21 + x^20 - x^16 - x^15 + x^11 + x^10 - x^6 - x^5 + x + 1
Phi_311(x)=x^310 + x^309 + x^308 + x^307 + x^306 + x^305 + x^304 + x^303 + x^302 + x^301 + x^300 + x^299 + x^298 + x^297 + x^296 + x^295 + x^294 + x^293 + x^292 + x^291 + x^290 + x^289 + x^288 + x^287 + x^286 + x^285 + x^284 + x^283 + x^282 + x^281 + x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_312(x)=x^96 + x^92 - x^84 - x^80 + x^72 + x^68 - x^60 - x^56 + x^48 - x^40 - x^36 + x^28 + x^24 - x^16 - x^12 + x^4 + 1
Phi_313(x)=x^312 + x^311 + x^310 + x^309 + x^308 + x^307 + x^306 + x^305 + x^304 + x^303 + x^302 + x^301 + x^300 + x^299 + x^298 + x^297 + x^296 + x^295 + x^294 + x^293 + x^292 + x^291 + x^290 + x^289 + x^288 + x^287 + x^286 + x^285 + x^284 + x^283 + x^282 + x^281 + x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_314(x)=x^156 - x^155 + x^154 - x^153 + x^152 - x^151 + x^150 - x^149 + x^148 - x^147 + x^146 - x^145 + x^144 - x^143 + x^142 - x^141 + x^140 - x^139 + x^138 - x^137 + x^136 - x^135 + x^134 - x^133 + x^132 - x^131 + x^130 - x^129 + x^128 - x^127 + x^126 - x^125 + x^124 - x^123 + x^122 - x^121 + x^120 - x^119 + x^118 - x^117 + x^116 - x^115 + x^114 - x^113 + x^112 - x^111 + x^110 - x^109 + x^108 - x^107 + x^106 - x^105 + x^104 - x^103 + x^102 - x^101 + x^100 - x^99 + x^98 - x^97 + x^96 - x^95 + x^94 - x^93 + x^92 - x^91 + x^90 - x^89 + x^88 - x^87 + x^86 - x^85 + x^84 - x^83 + x^82 - x^81 + x^80 - x^79 + x^78 - x^77 + x^76 - x^75 + x^74 - x^73 + x^72 - x^71 + x^70 - x^69 + x^68 - x^67 + x^66 - x^65 + x^64 - x^63 + x^62 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_315(x)=x^144 + x^141 + x^138 - x^129 - x^126 - 2*x^123 - x^120 - x^117 + x^108 + x^105 + x^102 + x^99 + x^96 + x^93 - x^84 - x^78 - x^72 - x^66 - x^60 + x^51 + x^48 + x^45 + x^42 + x^39 + x^36 - x^27 - x^24 - 2*x^21 - x^18 - x^15 + x^6 + x^3 + 1
Phi_316(x)=x^156 - x^154 + x^152 - x^150 + x^148 - x^146 + x^144 - x^142 + x^140 - x^138 + x^136 - x^134 + x^132 - x^130 + x^128 - x^126 + x^124 - x^122 + x^120 - x^118 + x^116 - x^114 + x^112 - x^110 + x^108 - x^106 + x^104 - x^102 + x^100 - x^98 + x^96 - x^94 + x^92 - x^90 + x^88 - x^86 + x^84 - x^82 + x^80 - x^78 + x^76 - x^74 + x^72 - x^70 + x^68 - x^66 + x^64 - x^62 + x^60 - x^58 + x^56 - x^54 + x^52 - x^50 + x^48 - x^46 + x^44 - x^42 + x^40 - x^38 + x^36 - x^34 + x^32 - x^30 + x^28 - x^26 + x^24 - x^22 + x^20 - x^18 + x^16 - x^14 + x^12 - x^10 + x^8 - x^6 + x^4 - x^2 + 1
Phi_317(x)=x^316 + x^315 + x^314 + x^313 + x^312 + x^311 + x^310 + x^309 + x^308 + x^307 + x^306 + x^305 + x^304 + x^303 + x^302 + x^301 + x^300 + x^299 + x^298 + x^297 + x^296 + x^295 + x^294 + x^293 + x^292 + x^291 + x^290 + x^289 + x^288 + x^287 + x^286 + x^285 + x^284 + x^283 + x^282 + x^281 + x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_318(x)=x^104 + x^103 - x^101 - x^100 + x^98 + x^97 - x^95 - x^94 + x^92 + x^91 - x^89 - x^88 + x^86 + x^85 - x^83 - x^82 + x^80 + x^79 - x^77 - x^76 + x^74 + x^73 - x^71 - x^70 + x^68 + x^67 - x^65 - x^64 + x^62 + x^61 - x^59 - x^58 + x^56 + x^55 - x^53 - x^52 - x^51 + x^49 + x^48 - x^46 - x^45 + x^43 + x^42 - x^40 - x^39 + x^37 + x^36 - x^34 - x^33 + x^31 + x^30 - x^28 - x^27 + x^25 + x^24 - x^22 - x^21 + x^19 + x^18 - x^16 - x^15 + x^13 + x^12 - x^10 - x^9 + x^7 + x^6 - x^4 - x^3 + x + 1
Phi_319(x)=x^280 - x^279 + x^269 - x^268 + x^258 - x^257 + x^251 - x^250 + x^247 - x^246 + x^240 - x^239 + x^236 - x^235 + x^229 - x^228 + x^225 - x^224 + x^222 - x^221 + x^218 - x^217 + x^214 - x^213 + x^211 - x^210 + x^207 - x^206 + x^203 - x^202 + x^200 - x^199 + x^196 - x^195 + x^193 - x^191 + x^189 - x^188 + x^185 - x^184 + x^182 - x^180 + x^178 - x^177 + x^174 - x^173 + x^171 - x^169 + x^167 - x^166 + x^164 - x^162 + x^160 - x^158 + x^156 - x^155 + x^153 - x^151 + x^149 - x^147 + x^145 - x^144 + x^142 - x^140 + x^138 - x^136 + x^135 - x^133 + x^131 - x^129 + x^127 - x^125 + x^124 - x^122 + x^120 - x^118 + x^116 - x^114 + x^113 - x^111 + x^109 - x^107 + x^106 - x^103 + x^102 - x^100 + x^98 - x^96 + x^95 - x^92 + x^91 - x^89 + x^87 - x^85 + x^84 - x^81 + x^80 - x^78 + x^77 - x^74 + x^73 - x^70 + x^69 - x^67 + x^66 - x^63 + x^62 - x^59 + x^58 - x^56 + x^55 - x^52 + x^51 - x^45 + x^44 - x^41 + x^40 - x^34 + x^33 - x^30 + x^29 - x^23 + x^22 - x^12 + x^11 - x + 1
Phi_320(x)=x^128 - x^96 + x^64 - x^32 + 1
Phi_321(x)=x^212 - x^211 + x^209 - x^208 + x^206 - x^205 + x^203 - x^202 + x^200 - x^199 + x^197 - x^196 + x^194 - x^193 + x^191 - x^190 + x^188 - x^187 + x^185 - x^184 + x^182 - x^181 + x^179 - x^178 + x^176 - x^175 + x^173 - x^172 + x^170 - x^169 + x^167 - x^166 + x^164 - x^163 + x^161 - x^160 + x^158 - x^157 + x^155 - x^154 + x^152 - x^151 + x^149 - x^148 + x^146 - x^145 + x^143 - x^142 + x^140 - x^139 + x^137 - x^136 + x^134 - x^133 + x^131 - x^130 + x^128 - x^127 + x^125 - x^124 + x^122 - x^121 + x^119 - x^118 + x^116 - x^115 + x^113 - x^112 + x^110 - x^109 + x^107 - x^106 + x^105 - x^103 + x^102 - x^100 + x^99 - x^97 + x^96 - x^94 + x^93 - x^91 + x^90 - x^88 + x^87 - x^85 + x^84 - x^82 + x^81 - x^79 + x^78 - x^76 + x^75 - x^73 + x^72 - x^70 + x^69 - x^67 + x^66 - x^64 + x^63 - x^61 + x^60 - x^58 + x^57 - x^55 + x^54 - x^52 + x^51 - x^49 + x^48 - x^46 + x^45 - x^43 + x^42 - x^40 + x^39 - x^37 + x^36 - x^34 + x^33 - x^31 + x^30 - x^28 + x^27 - x^25 + x^24 - x^22 + x^21 - x^19 + x^18 - x^16 + x^15 - x^13 + x^12 - x^10 + x^9 - x^7 + x^6 - x^4 + x^3 - x + 1
Phi_322(x)=x^132 + x^131 - x^125 - x^124 + x^118 + x^117 - x^111 - x^110 - x^109 - x^108 + x^104 + x^103 + x^102 + x^101 - x^97 - x^96 - x^95 - x^94 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 - x^83 - x^82 - x^81 - x^80 - x^79 - x^78 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 - x^69 - x^68 - x^67 - x^66 - x^65 - x^64 - x^63 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 - x^54 - x^53 - x^52 - x^51 - x^50 - x^49 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 - x^38 - x^37 - x^36 - x^35 + x^31 + x^30 + x^29 + x^28 - x^24 - x^23 - x^22 - x^21 + x^15 + x^14 - x^8 - x^7 + x + 1
Phi_323(x)=x^288 - x^287 + x^271 - x^270 + x^269 - x^268 + x^254 - x^253 + x^252 - x^251 + x^250 - x^249 + x^237 - x^236 + x^235 - x^234 + x^233 - x^232 + x^231 - x^230 + x^220 - x^219 + x^218 - x^217 + x^216 - x^215 + x^214 - x^213 + x^212 - x^211 + x^203 - x^202 + x^201 - x^200 + x^199 - x^198 + x^197 - x^196 + x^195 - x^194 + x^193 - x^192 + x^186 - x^185 + x^184 - x^183 + x^182 - x^181 + x^180 - x^179 + x^178 - x^177 + x^176 - x^175 + x^174 - x^173 + x^169 - x^168 + x^167 - x^166 + x^165 - x^164 + x^163 - x^162 + x^161 - x^160 + x^159 - x^158 + x^157 - x^156 + x^155 - x^154 + x^152 - x^151 + x^150 - x^149 + x^148 - x^147 + x^146 - x^145 + x^144 - x^143 + x^142 - x^141 + x^140 - x^139 + x^138 - x^137 + x^136 - x^134 + x^133 - x^132 + x^131 - x^130 + x^129 - x^128 + x^127 - x^126 + x^125 - x^124 + x^123 - x^122 + x^121 - x^120 + x^119 - x^115 + x^114 - x^113 + x^112 - x^111 + x^110 - x^109 + x^108 - x^107 + x^106 - x^105 + x^104 - x^103 + x^102 - x^96 + x^95 - x^94 + x^93 - x^92 + x^91 - x^90 + x^89 - x^88 + x^87 - x^86 + x^85 - x^77 + x^76 - x^75 + x^74 - x^73 + x^72 - x^71 + x^70 - x^69 + x^68 - x^58 + x^57 - x^56 + x^55 - x^54 + x^53 - x^52 + x^51 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^20 + x^19 - x^18 + x^17 - x + 1
Phi_324(x)=x^108 - x^54 + 1
Phi_325(x)=x^240 - x^235 + x^215 - x^210 + x^190 - x^185 + x^175 - x^170 + x^165 - x^160 + x^150 - x^145 + x^140 - x^135 + x^125 - x^120 + x^115 - x^105 + x^100 - x^95 + x^90 - x^80 + x^75 - x^70 + x^65 - x^55 + x^50 - x^30 + x^25 - x^5 + 1
Phi_326(x)=x^162 - x^161 + x^160 - x^159 + x^158 - x^157 + x^156 - x^155 + x^154 - x^153 + x^152 - x^151 + x^150 - x^149 + x^148 - x^147 + x^146 - x^145 + x^144 - x^143 + x^142 - x^141 + x^140 - x^139 + x^138 - x^137 + x^136 - x^135 + x^134 - x^133 + x^132 - x^131 + x^130 - x^129 + x^128 - x^127 + x^126 - x^125 + x^124 - x^123 + x^122 - x^121 + x^120 - x^119 + x^118 - x^117 + x^116 - x^115 + x^114 - x^113 + x^112 - x^111 + x^110 - x^109 + x^108 - x^107 + x^106 - x^105 + x^104 - x^103 + x^102 - x^101 + x^100 - x^99 + x^98 - x^97 + x^96 - x^95 + x^94 - x^93 + x^92 - x^91 + x^90 - x^89 + x^88 - x^87 + x^86 - x^85 + x^84 - x^83 + x^82 - x^81 + x^80 - x^79 + x^78 - x^77 + x^76 - x^75 + x^74 - x^73 + x^72 - x^71 + x^70 - x^69 + x^68 - x^67 + x^66 - x^65 + x^64 - x^63 + x^62 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_327(x)=x^216 - x^215 + x^213 - x^212 + x^210 - x^209 + x^207 - x^206 + x^204 - x^203 + x^201 - x^200 + x^198 - x^197 + x^195 - x^194 + x^192 - x^191 + x^189 - x^188 + x^186 - x^185 + x^183 - x^182 + x^180 - x^179 + x^177 - x^176 + x^174 - x^173 + x^171 - x^170 + x^168 - x^167 + x^165 - x^164 + x^162 - x^161 + x^159 - x^158 + x^156 - x^155 + x^153 - x^152 + x^150 - x^149 + x^147 - x^146 + x^144 - x^143 + x^141 - x^140 + x^138 - x^137 + x^135 - x^134 + x^132 - x^131 + x^129 - x^128 + x^126 - x^125 + x^123 - x^122 + x^120 - x^119 + x^117 - x^116 + x^114 - x^113 + x^111 - x^110 + x^108 - x^106 + x^105 - x^103 + x^102 - x^100 + x^99 - x^97 + x^96 - x^94 + x^93 - x^91 + x^90 - x^88 + x^87 - x^85 + x^84 - x^82 + x^81 - x^79 + x^78 - x^76 + x^75 - x^73 + x^72 - x^70 + x^69 - x^67 + x^66 - x^64 + x^63 - x^61 + x^60 - x^58 + x^57 - x^55 + x^54 - x^52 + x^51 - x^49 + x^48 - x^46 + x^45 - x^43 + x^42 - x^40 + x^39 - x^37 + x^36 - x^34 + x^33 - x^31 + x^30 - x^28 + x^27 - x^25 + x^24 - x^22 + x^21 - x^19 + x^18 - x^16 + x^15 - x^13 + x^12 - x^10 + x^9 - x^7 + x^6 - x^4 + x^3 - x + 1
Phi_328(x)=x^160 - x^156 + x^152 - x^148 + x^144 - x^140 + x^136 - x^132 + x^128 - x^124 + x^120 - x^116 + x^112 - x^108 + x^104 - x^100 + x^96 - x^92 + x^88 - x^84 + x^80 - x^76 + x^72 - x^68 + x^64 - x^60 + x^56 - x^52 + x^48 - x^44 + x^40 - x^36 + x^32 - x^28 + x^24 - x^20 + x^16 - x^12 + x^8 - x^4 + 1
Phi_329(x)=x^276 - x^275 + x^269 - x^268 + x^262 - x^261 + x^255 - x^254 + x^248 - x^247 + x^241 - x^240 + x^234 - x^233 + x^229 - x^228 + x^227 - x^226 + x^222 - x^221 + x^220 - x^219 + x^215 - x^214 + x^213 - x^212 + x^208 - x^207 + x^206 - x^205 + x^201 - x^200 + x^199 - x^198 + x^194 - x^193 + x^192 - x^191 + x^187 - x^186 + x^185 - x^184 + x^182 - x^181 + x^180 - x^179 + x^178 - x^177 + x^175 - x^174 + x^173 - x^172 + x^171 - x^170 + x^168 - x^167 + x^166 - x^165 + x^164 - x^163 + x^161 - x^160 + x^159 - x^158 + x^157 - x^156 + x^154 - x^153 + x^152 - x^151 + x^150 - x^149 + x^147 - x^146 + x^145 - x^144 + x^143 - x^142 + x^140 - x^139 + x^138 - x^137 + x^136 - x^134 + x^133 - x^132 + x^131 - x^130 + x^129 - x^127 + x^126 - x^125 + x^124 - x^123 + x^122 - x^120 + x^119 - x^118 + x^117 - x^116 + x^115 - x^113 + x^112 - x^111 + x^110 - x^109 + x^108 - x^106 + x^105 - x^104 + x^103 - x^102 + x^101 - x^99 + x^98 - x^97 + x^96 - x^95 + x^94 - x^92 + x^91 - x^90 + x^89 - x^85 + x^84 - x^83 + x^82 - x^78 + x^77 - x^76 + x^75 - x^71 + x^70 - x^69 + x^68 - x^64 + x^63 - x^62 + x^61 - x^57 + x^56 - x^55 + x^54 - x^50 + x^49 - x^48 + x^47 - x^43 + x^42 - x^36 + x^35 - x^29 + x^28 - x^22 + x^21 - x^15 + x^14 - x^8 + x^7 - x + 1
Phi_330(x)=x^80 - x^79 + x^78 + x^75 - x^74 + x^73 + x^69 - x^68 + x^67 - x^65 + 2*x^64 - 2*x^63 + x^62 - x^60 + x^59 - x^58 - x^54 + x^53 - x^52 + x^50 - 2*x^49 + 2*x^48 - 2*x^47 + x^46 - x^44 + x^43 - x^42 + x^41 - x^40 + x^39 - x^38 + x^37 - x^36 + x^34 - 2*x^33 + 2*x^32 - 2*x^31 + x^30 - x^28 + x^27 - x^26 - x^22 + x^21 - x^20 + x^18 - 2*x^17 + 2*x^16 - x^15 + x^13 - x^12 + x^11 + x^7 - x^6 + x^5 + x^2 - x + 1
Phi_331(x)=x^330 + x^329 + x^328 + x^327 + x^326 + x^325 + x^324 + x^323 + x^322 + x^321 + x^320 + x^319 + x^318 + x^317 + x^316 + x^315 + x^314 + x^313 + x^312 + x^311 + x^310 + x^309 + x^308 + x^307 + x^306 + x^305 + x^304 + x^303 + x^302 + x^301 + x^300 + x^299 + x^298 + x^297 + x^296 + x^295 + x^294 + x^293 + x^292 + x^291 + x^290 + x^289 + x^288 + x^287 + x^286 + x^285 + x^284 + x^283 + x^282 + x^281 + x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_332(x)=x^164 - x^162 + x^160 - x^158 + x^156 - x^154 + x^152 - x^150 + x^148 - x^146 + x^144 - x^142 + x^140 - x^138 + x^136 - x^134 + x^132 - x^130 + x^128 - x^126 + x^124 - x^122 + x^120 - x^118 + x^116 - x^114 + x^112 - x^110 + x^108 - x^106 + x^104 - x^102 + x^100 - x^98 + x^96 - x^94 + x^92 - x^90 + x^88 - x^86 + x^84 - x^82 + x^80 - x^78 + x^76 - x^74 + x^72 - x^70 + x^68 - x^66 + x^64 - x^62 + x^60 - x^58 + x^56 - x^54 + x^52 - x^50 + x^48 - x^46 + x^44 - x^42 + x^40 - x^38 + x^36 - x^34 + x^32 - x^30 + x^28 - x^26 + x^24 - x^22 + x^20 - x^18 + x^16 - x^14 + x^12 - x^10 + x^8 - x^6 + x^4 - x^2 + 1
Phi_333(x)=x^216 - x^213 + x^207 - x^204 + x^198 - x^195 + x^189 - x^186 + x^180 - x^177 + x^171 - x^168 + x^162 - x^159 + x^153 - x^150 + x^144 - x^141 + x^135 - x^132 + x^126 - x^123 + x^117 - x^114 + x^108 - x^102 + x^99 - x^93 + x^90 - x^84 + x^81 - x^75 + x^72 - x^66 + x^63 - x^57 + x^54 - x^48 + x^45 - x^39 + x^36 - x^30 + x^27 - x^21 + x^18 - x^12 + x^9 - x^3 + 1
Phi_334(x)=x^166 - x^165 + x^164 - x^163 + x^162 - x^161 + x^160 - x^159 + x^158 - x^157 + x^156 - x^155 + x^154 - x^153 + x^152 - x^151 + x^150 - x^149 + x^148 - x^147 + x^146 - x^145 + x^144 - x^143 + x^142 - x^141 + x^140 - x^139 + x^138 - x^137 + x^136 - x^135 + x^134 - x^133 + x^132 - x^131 + x^130 - x^129 + x^128 - x^127 + x^126 - x^125 + x^124 - x^123 + x^122 - x^121 + x^120 - x^119 + x^118 - x^117 + x^116 - x^115 + x^114 - x^113 + x^112 - x^111 + x^110 - x^109 + x^108 - x^107 + x^106 - x^105 + x^104 - x^103 + x^102 - x^101 + x^100 - x^99 + x^98 - x^97 + x^96 - x^95 + x^94 - x^93 + x^92 - x^91 + x^90 - x^89 + x^88 - x^87 + x^86 - x^85 + x^84 - x^83 + x^82 - x^81 + x^80 - x^79 + x^78 - x^77 + x^76 - x^75 + x^74 - x^73 + x^72 - x^71 + x^70 - x^69 + x^68 - x^67 + x^66 - x^65 + x^64 - x^63 + x^62 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_335(x)=x^264 - x^263 + x^259 - x^258 + x^254 - x^253 + x^249 - x^248 + x^244 - x^243 + x^239 - x^238 + x^234 - x^233 + x^229 - x^228 + x^224 - x^223 + x^219 - x^218 + x^214 - x^213 + x^209 - x^208 + x^204 - x^203 + x^199 - x^198 + x^197 - x^196 + x^194 - x^193 + x^192 - x^191 + x^189 - x^188 + x^187 - x^186 + x^184 - x^183 + x^182 - x^181 + x^179 - x^178 + x^177 - x^176 + x^174 - x^173 + x^172 - x^171 + x^169 - x^168 + x^167 - x^166 + x^164 - x^163 + x^162 - x^161 + x^159 - x^158 + x^157 - x^156 + x^154 - x^153 + x^152 - x^151 + x^149 - x^148 + x^147 - x^146 + x^144 - x^143 + x^142 - x^141 + x^139 - x^138 + x^137 - x^136 + x^134 - x^133 + x^132 - x^131 + x^130 - x^128 + x^127 - x^126 + x^125 - x^123 + x^122 - x^121 + x^120 - x^118 + x^117 - x^116 + x^115 - x^113 + x^112 - x^111 + x^110 - x^108 + x^107 - x^106 + x^105 - x^103 + x^102 - x^101 + x^100 - x^98 + x^97 - x^96 + x^95 - x^93 + x^92 - x^91 + x^90 - x^88 + x^87 - x^86 + x^85 - x^83 + x^82 - x^81 + x^80 - x^78 + x^77 - x^76 + x^75 - x^73 + x^72 - x^71 + x^70 - x^68 + x^67 - x^66 + x^65 - x^61 + x^60 - x^56 + x^55 - x^51 + x^50 - x^46 + x^45 - x^41 + x^40 - x^36 + x^35 - x^31 + x^30 - x^26 + x^25 - x^21 + x^20 - x^16 + x^15 - x^11 + x^10 - x^6 + x^5 - x + 1
Phi_336(x)=x^96 + x^88 - x^72 - x^64 + x^48 - x^32 - x^24 + x^8 + 1
Phi_337(x)=x^336 + x^335 + x^334 + x^333 + x^332 + x^331 + x^330 + x^329 + x^328 + x^327 + x^326 + x^325 + x^324 + x^323 + x^322 + x^321 + x^320 + x^319 + x^318 + x^317 + x^316 + x^315 + x^314 + x^313 + x^312 + x^311 + x^310 + x^309 + x^308 + x^307 + x^306 + x^305 + x^304 + x^303 + x^302 + x^301 + x^300 + x^299 + x^298 + x^297 + x^296 + x^295 + x^294 + x^293 + x^292 + x^291 + x^290 + x^289 + x^288 + x^287 + x^286 + x^285 + x^284 + x^283 + x^282 + x^281 + x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_338(x)=x^156 - x^143 + x^130 - x^117 + x^104 - x^91 + x^78 - x^65 + x^52 - x^39 + x^26 - x^13 + 1
Phi_339(x)=x^224 - x^223 + x^221 - x^220 + x^218 - x^217 + x^215 - x^214 + x^212 - x^211 + x^209 - x^208 + x^206 - x^205 + x^203 - x^202 + x^200 - x^199 + x^197 - x^196 + x^194 - x^193 + x^191 - x^190 + x^188 - x^187 + x^185 - x^184 + x^182 - x^181 + x^179 - x^178 + x^176 - x^175 + x^173 - x^172 + x^170 - x^169 + x^167 - x^166 + x^164 - x^163 + x^161 - x^160 + x^158 - x^157 + x^155 - x^154 + x^152 - x^151 + x^149 - x^148 + x^146 - x^145 + x^143 - x^142 + x^140 - x^139 + x^137 - x^136 + x^134 - x^133 + x^131 - x^130 + x^128 - x^127 + x^125 - x^124 + x^122 - x^121 + x^119 - x^118 + x^116 - x^115 + x^113 - x^112 + x^111 - x^109 + x^108 - x^106 + x^105 - x^103 + x^102 - x^100 + x^99 - x^97 + x^96 - x^94 + x^93 - x^91 + x^90 - x^88 + x^87 - x^85 + x^84 - x^82 + x^81 - x^79 + x^78 - x^76 + x^75 - x^73 + x^72 - x^70 + x^69 - x^67 + x^66 - x^64 + x^63 - x^61 + x^60 - x^58 + x^57 - x^55 + x^54 - x^52 + x^51 - x^49 + x^48 - x^46 + x^45 - x^43 + x^42 - x^40 + x^39 - x^37 + x^36 - x^34 + x^33 - x^31 + x^30 - x^28 + x^27 - x^25 + x^24 - x^22 + x^21 - x^19 + x^18 - x^16 + x^15 - x^13 + x^12 - x^10 + x^9 - x^7 + x^6 - x^4 + x^3 - x + 1
Phi_340(x)=x^128 + x^126 - x^118 - x^116 + x^108 + x^106 - x^98 - x^96 - x^94 - x^92 + x^88 + x^86 + x^84 + x^82 - x^78 - x^76 - x^74 - x^72 + x^68 + x^66 + x^64 + x^62 + x^60 - x^56 - x^54 - x^52 - x^50 + x^46 + x^44 + x^42 + x^40 - x^36 - x^34 - x^32 - x^30 + x^22 + x^20 - x^12 - x^10 + x^2 + 1
Phi_341(x)=x^300 - x^299 + x^289 - x^288 + x^278 - x^277 + x^269 - x^268 + x^267 - x^266 + x^258 - x^257 + x^256 - x^255 + x^247 - x^246 + x^245 - x^244 + x^238 - x^237 + x^236 - x^235 + x^234 - x^233 + x^227 - x^226 + x^225 - x^224 + x^223 - x^222 + x^216 - x^215 + x^214 - x^213 + x^212 - x^211 + x^207 - x^206 + x^205 - x^204 + x^203 - x^202 + x^201 - x^200 + x^196 - x^195 + x^194 - x^193 + x^192 - x^191 + x^190 - x^189 + x^185 - x^184 + x^183 - x^182 + x^181 - x^180 + x^179 - x^178 + x^176 - x^175 + x^174 - x^173 + x^172 - x^171 + x^170 - x^169 + x^168 - x^167 + x^165 - x^164 + x^163 - x^162 + x^161 - x^160 + x^159 - x^158 + x^157 - x^156 + x^154 - x^153 + x^152 - x^151 + x^150 - x^149 + x^148 - x^147 + x^146 - x^144 + x^143 - x^142 + x^141 - x^140 + x^139 - x^138 + x^137 - x^136 + x^135 - x^133 + x^132 - x^131 + x^130 - x^129 + x^128 - x^127 + x^126 - x^125 + x^124 - x^122 + x^121 - x^120 + x^119 - x^118 + x^117 - x^116 + x^115 - x^111 + x^110 - x^109 + x^108 - x^107 + x^106 - x^105 + x^104 - x^100 + x^99 - x^98 + x^97 - x^96 + x^95 - x^94 + x^93 - x^89 + x^88 - x^87 + x^86 - x^85 + x^84 - x^78 + x^77 - x^76 + x^75 - x^74 + x^73 - x^67 + x^66 - x^65 + x^64 - x^63 + x^62 - x^56 + x^55 - x^54 + x^53 - x^45 + x^44 - x^43 + x^42 - x^34 + x^33 - x^32 + x^31 - x^23 + x^22 - x^12 + x^11 - x + 1
Phi_342(x)=x^108 + x^105 - x^99 - x^96 + x^90 + x^87 - x^81 - x^78 + x^72 + x^69 - x^63 - x^60 + x^54 - x^48 - x^45 + x^39 + x^36 - x^30 - x^27 + x^21 + x^18 - x^12 - x^9 + x^3 + 1
Phi_343(x)=x^294 + x^245 + x^196 + x^147 + x^98 + x^49 + 1
Phi_344(x)=x^168 - x^164 + x^160 - x^156 + x^152 - x^148 + x^144 - x^140 + x^136 - x^132 + x^128 - x^124 + x^120 - x^116 + x^112 - x^108 + x^104 - x^100 + x^96 - x^92 + x^88 - x^84 + x^80 - x^76 + x^72 - x^68 + x^64 - x^60 + x^56 - x^52 + x^48 - x^44 + x^40 - x^36 + x^32 - x^28 + x^24 - x^20 + x^16 - x^12 + x^8 - x^4 + 1
Phi_345(x)=x^176 + x^175 + x^174 - x^171 - x^170 - x^169 + x^161 + x^160 + x^159 - x^156 - x^155 - x^154 - x^153 - x^152 - x^151 + x^148 + x^147 + 2*x^146 + x^145 + x^144 - x^141 - x^140 - x^139 - x^138 - x^137 - x^136 + x^133 + x^132 + 2*x^131 + x^130 + x^129 - x^126 - x^125 - x^124 - x^123 - x^122 - x^121 + x^118 + x^117 + 2*x^116 + x^115 + x^114 - x^111 - x^110 - x^109 - x^108 + x^105 + x^103 + x^101 + x^99 - x^96 - x^95 - x^94 - x^93 + x^90 + x^88 + x^86 - x^83 - x^82 - x^81 - x^80 + x^77 + x^75 + x^73 + x^71 - x^68 - x^67 - x^66 - x^65 + x^62 + x^61 + 2*x^60 + x^59 + x^58 - x^55 - x^54 - x^53 - x^52 - x^51 - x^50 + x^47 + x^46 + 2*x^45 + x^44 + x^43 - x^40 - x^39 - x^38 - x^37 - x^36 - x^35 + x^32 + x^31 + 2*x^30 + x^29 + x^28 - x^25 - x^24 - x^23 - x^22 - x^21 - x^20 + x^17 + x^16 + x^15 - x^7 - x^6 - x^5 + x^2 + x + 1
Phi_346(x)=x^172 - x^171 + x^170 - x^169 + x^168 - x^167 + x^166 - x^165 + x^164 - x^163 + x^162 - x^161 + x^160 - x^159 + x^158 - x^157 + x^156 - x^155 + x^154 - x^153 + x^152 - x^151 + x^150 - x^149 + x^148 - x^147 + x^146 - x^145 + x^144 - x^143 + x^142 - x^141 + x^140 - x^139 + x^138 - x^137 + x^136 - x^135 + x^134 - x^133 + x^132 - x^131 + x^130 - x^129 + x^128 - x^127 + x^126 - x^125 + x^124 - x^123 + x^122 - x^121 + x^120 - x^119 + x^118 - x^117 + x^116 - x^115 + x^114 - x^113 + x^112 - x^111 + x^110 - x^109 + x^108 - x^107 + x^106 - x^105 + x^104 - x^103 + x^102 - x^101 + x^100 - x^99 + x^98 - x^97 + x^96 - x^95 + x^94 - x^93 + x^92 - x^91 + x^90 - x^89 + x^88 - x^87 + x^86 - x^85 + x^84 - x^83 + x^82 - x^81 + x^80 - x^79 + x^78 - x^77 + x^76 - x^75 + x^74 - x^73 + x^72 - x^71 + x^70 - x^69 + x^68 - x^67 + x^66 - x^65 + x^64 - x^63 + x^62 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_347(x)=x^346 + x^345 + x^344 + x^343 + x^342 + x^341 + x^340 + x^339 + x^338 + x^337 + x^336 + x^335 + x^334 + x^333 + x^332 + x^331 + x^330 + x^329 + x^328 + x^327 + x^326 + x^325 + x^324 + x^323 + x^322 + x^321 + x^320 + x^319 + x^318 + x^317 + x^316 + x^315 + x^314 + x^313 + x^312 + x^311 + x^310 + x^309 + x^308 + x^307 + x^306 + x^305 + x^304 + x^303 + x^302 + x^301 + x^300 + x^299 + x^298 + x^297 + x^296 + x^295 + x^294 + x^293 + x^292 + x^291 + x^290 + x^289 + x^288 + x^287 + x^286 + x^285 + x^284 + x^283 + x^282 + x^281 + x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_348(x)=x^112 + x^110 - x^106 - x^104 + x^100 + x^98 - x^94 - x^92 + x^88 + x^86 - x^82 - x^80 + x^76 + x^74 - x^70 - x^68 + x^64 + x^62 - x^58 - x^56 - x^54 + x^50 + x^48 - x^44 - x^42 + x^38 + x^36 - x^32 - x^30 + x^26 + x^24 - x^20 - x^18 + x^14 + x^12 - x^8 - x^6 + x^2 + 1
Phi_349(x)=x^348 + x^347 + x^346 + x^345 + x^344 + x^343 + x^342 + x^341 + x^340 + x^339 + x^338 + x^337 + x^336 + x^335 + x^334 + x^333 + x^332 + x^331 + x^330 + x^329 + x^328 + x^327 + x^326 + x^325 + x^324 + x^323 + x^322 + x^321 + x^320 + x^319 + x^318 + x^317 + x^316 + x^315 + x^314 + x^313 + x^312 + x^311 + x^310 + x^309 + x^308 + x^307 + x^306 + x^305 + x^304 + x^303 + x^302 + x^301 + x^300 + x^299 + x^298 + x^297 + x^296 + x^295 + x^294 + x^293 + x^292 + x^291 + x^290 + x^289 + x^288 + x^287 + x^286 + x^285 + x^284 + x^283 + x^282 + x^281 + x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_350(x)=x^120 + x^115 - x^95 - x^90 - x^85 - x^80 + x^70 + x^65 + x^60 + x^55 + x^50 - x^40 - x^35 - x^30 - x^25 + x^5 + 1
Phi_351(x)=x^216 - x^207 + x^189 - x^180 + x^162 - x^153 + x^135 - x^126 + x^108 - x^90 + x^81 - x^63 + x^54 - x^36 + x^27 - x^9 + 1
Phi_352(x)=x^160 - x^144 + x^128 - x^112 + x^96 - x^80 + x^64 - x^48 + x^32 - x^16 + 1
Phi_353(x)=x^352 + x^351 + x^350 + x^349 + x^348 + x^347 + x^346 + x^345 + x^344 + x^343 + x^342 + x^341 + x^340 + x^339 + x^338 + x^337 + x^336 + x^335 + x^334 + x^333 + x^332 + x^331 + x^330 + x^329 + x^328 + x^327 + x^326 + x^325 + x^324 + x^323 + x^322 + x^321 + x^320 + x^319 + x^318 + x^317 + x^316 + x^315 + x^314 + x^313 + x^312 + x^311 + x^310 + x^309 + x^308 + x^307 + x^306 + x^305 + x^304 + x^303 + x^302 + x^301 + x^300 + x^299 + x^298 + x^297 + x^296 + x^295 + x^294 + x^293 + x^292 + x^291 + x^290 + x^289 + x^288 + x^287 + x^286 + x^285 + x^284 + x^283 + x^282 + x^281 + x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_354(x)=x^116 + x^115 - x^113 - x^112 + x^110 + x^109 - x^107 - x^106 + x^104 + x^103 - x^101 - x^100 + x^98 + x^97 - x^95 - x^94 + x^92 + x^91 - x^89 - x^88 + x^86 + x^85 - x^83 - x^82 + x^80 + x^79 - x^77 - x^76 + x^74 + x^73 - x^71 - x^70 + x^68 + x^67 - x^65 - x^64 + x^62 + x^61 - x^59 - x^58 - x^57 + x^55 + x^54 - x^52 - x^51 + x^49 + x^48 - x^46 - x^45 + x^43 + x^42 - x^40 - x^39 + x^37 + x^36 - x^34 - x^33 + x^31 + x^30 - x^28 - x^27 + x^25 + x^24 - x^22 - x^21 + x^19 + x^18 - x^16 - x^15 + x^13 + x^12 - x^10 - x^9 + x^7 + x^6 - x^4 - x^3 + x + 1
Phi_355(x)=x^280 - x^279 + x^275 - x^274 + x^270 - x^269 + x^265 - x^264 + x^260 - x^259 + x^255 - x^254 + x^250 - x^249 + x^245 - x^244 + x^240 - x^239 + x^235 - x^234 + x^230 - x^229 + x^225 - x^224 + x^220 - x^219 + x^215 - x^214 + x^210 - x^208 + x^205 - x^203 + x^200 - x^198 + x^195 - x^193 + x^190 - x^188 + x^185 - x^183 + x^180 - x^178 + x^175 - x^173 + x^170 - x^168 + x^165 - x^163 + x^160 - x^158 + x^155 - x^153 + x^150 - x^148 + x^145 - x^143 + x^140 - x^137 + x^135 - x^132 + x^130 - x^127 + x^125 - x^122 + x^120 - x^117 + x^115 - x^112 + x^110 - x^107 + x^105 - x^102 + x^100 - x^97 + x^95 - x^92 + x^90 - x^87 + x^85 - x^82 + x^80 - x^77 + x^75 - x^72 + x^70 - x^66 + x^65 - x^61 + x^60 - x^56 + x^55 - x^51 + x^50 - x^46 + x^45 - x^41 + x^40 - x^36 + x^35 - x^31 + x^30 - x^26 + x^25 - x^21 + x^20 - x^16 + x^15 - x^11 + x^10 - x^6 + x^5 - x + 1
Phi_356(x)=x^176 - x^174 + x^172 - x^170 + x^168 - x^166 + x^164 - x^162 + x^160 - x^158 + x^156 - x^154 + x^152 - x^150 + x^148 - x^146 + x^144 - x^142 + x^140 - x^138 + x^136 - x^134 + x^132 - x^130 + x^128 - x^126 + x^124 - x^122 + x^120 - x^118 + x^116 - x^114 + x^112 - x^110 + x^108 - x^106 + x^104 - x^102 + x^100 - x^98 + x^96 - x^94 + x^92 - x^90 + x^88 - x^86 + x^84 - x^82 + x^80 - x^78 + x^76 - x^74 + x^72 - x^70 + x^68 - x^66 + x^64 - x^62 + x^60 - x^58 + x^56 - x^54 + x^52 - x^50 + x^48 - x^46 + x^44 - x^42 + x^40 - x^38 + x^36 - x^34 + x^32 - x^30 + x^28 - x^26 + x^24 - x^22 + x^20 - x^18 + x^16 - x^14 + x^12 - x^10 + x^8 - x^6 + x^4 - x^2 + 1
Phi_357(x)=x^192 + x^191 + x^190 - x^185 - x^184 - x^183 - x^175 - x^174 - x^173 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 - x^164 - x^163 - x^162 - x^154 - x^153 - x^152 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 - x^143 - x^142 + x^140 + x^139 - x^134 - 2*x^133 - 2*x^132 - x^131 + x^129 + x^128 + x^127 + x^126 + x^125 - x^123 - 2*x^122 - x^121 + x^119 + x^118 + x^117 + x^116 + x^115 - x^113 - 2*x^112 - 2*x^111 - x^110 + x^108 + x^107 + x^106 + x^105 + x^104 - x^102 - 2*x^101 - x^100 + x^98 + x^97 + x^96 + x^95 + x^94 - x^92 - 2*x^91 - x^90 + x^88 + x^87 + x^86 + x^85 + x^84 - x^82 - 2*x^81 - 2*x^80 - x^79 + x^77 + x^76 + x^75 + x^74 + x^73 - x^71 - 2*x^70 - x^69 + x^67 + x^66 + x^65 + x^64 + x^63 - x^61 - 2*x^60 - 2*x^59 - x^58 + x^53 + x^52 - x^50 - x^49 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 - x^40 - x^39 - x^38 - x^30 - x^29 - x^28 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 - x^19 - x^18 - x^17 - x^9 - x^8 - x^7 + x^2 + x + 1
Phi_358(x)=x^178 - x^177 + x^176 - x^175 + x^174 - x^173 + x^172 - x^171 + x^170 - x^169 + x^168 - x^167 + x^166 - x^165 + x^164 - x^163 + x^162 - x^161 + x^160 - x^159 + x^158 - x^157 + x^156 - x^155 + x^154 - x^153 + x^152 - x^151 + x^150 - x^149 + x^148 - x^147 + x^146 - x^145 + x^144 - x^143 + x^142 - x^141 + x^140 - x^139 + x^138 - x^137 + x^136 - x^135 + x^134 - x^133 + x^132 - x^131 + x^130 - x^129 + x^128 - x^127 + x^126 - x^125 + x^124 - x^123 + x^122 - x^121 + x^120 - x^119 + x^118 - x^117 + x^116 - x^115 + x^114 - x^113 + x^112 - x^111 + x^110 - x^109 + x^108 - x^107 + x^106 - x^105 + x^104 - x^103 + x^102 - x^101 + x^100 - x^99 + x^98 - x^97 + x^96 - x^95 + x^94 - x^93 + x^92 - x^91 + x^90 - x^89 + x^88 - x^87 + x^86 - x^85 + x^84 - x^83 + x^82 - x^81 + x^80 - x^79 + x^78 - x^77 + x^76 - x^75 + x^74 - x^73 + x^72 - x^71 + x^70 - x^69 + x^68 - x^67 + x^66 - x^65 + x^64 - x^63 + x^62 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_359(x)=x^358 + x^357 + x^356 + x^355 + x^354 + x^353 + x^352 + x^351 + x^350 + x^349 + x^348 + x^347 + x^346 + x^345 + x^344 + x^343 + x^342 + x^341 + x^340 + x^339 + x^338 + x^337 + x^336 + x^335 + x^334 + x^333 + x^332 + x^331 + x^330 + x^329 + x^328 + x^327 + x^326 + x^325 + x^324 + x^323 + x^322 + x^321 + x^320 + x^319 + x^318 + x^317 + x^316 + x^315 + x^314 + x^313 + x^312 + x^311 + x^310 + x^309 + x^308 + x^307 + x^306 + x^305 + x^304 + x^303 + x^302 + x^301 + x^300 + x^299 + x^298 + x^297 + x^296 + x^295 + x^294 + x^293 + x^292 + x^291 + x^290 + x^289 + x^288 + x^287 + x^286 + x^285 + x^284 + x^283 + x^282 + x^281 + x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_360(x)=x^96 + x^84 - x^60 - x^48 - x^36 + x^12 + 1
Phi_361(x)=x^342 + x^323 + x^304 + x^285 + x^266 + x^247 + x^228 + x^209 + x^190 + x^171 + x^152 + x^133 + x^114 + x^95 + x^76 + x^57 + x^38 + x^19 + 1
Phi_362(x)=x^180 - x^179 + x^178 - x^177 + x^176 - x^175 + x^174 - x^173 + x^172 - x^171 + x^170 - x^169 + x^168 - x^167 + x^166 - x^165 + x^164 - x^163 + x^162 - x^161 + x^160 - x^159 + x^158 - x^157 + x^156 - x^155 + x^154 - x^153 + x^152 - x^151 + x^150 - x^149 + x^148 - x^147 + x^146 - x^145 + x^144 - x^143 + x^142 - x^141 + x^140 - x^139 + x^138 - x^137 + x^136 - x^135 + x^134 - x^133 + x^132 - x^131 + x^130 - x^129 + x^128 - x^127 + x^126 - x^125 + x^124 - x^123 + x^122 - x^121 + x^120 - x^119 + x^118 - x^117 + x^116 - x^115 + x^114 - x^113 + x^112 - x^111 + x^110 - x^109 + x^108 - x^107 + x^106 - x^105 + x^104 - x^103 + x^102 - x^101 + x^100 - x^99 + x^98 - x^97 + x^96 - x^95 + x^94 - x^93 + x^92 - x^91 + x^90 - x^89 + x^88 - x^87 + x^86 - x^85 + x^84 - x^83 + x^82 - x^81 + x^80 - x^79 + x^78 - x^77 + x^76 - x^75 + x^74 - x^73 + x^72 - x^71 + x^70 - x^69 + x^68 - x^67 + x^66 - x^65 + x^64 - x^63 + x^62 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_363(x)=x^220 - x^209 + x^187 - x^176 + x^154 - x^143 + x^121 - x^110 + x^99 - x^77 + x^66 - x^44 + x^33 - x^11 + 1
Phi_364(x)=x^144 + x^142 - x^130 - x^128 - x^118 + x^114 + x^104 - x^100 + x^92 + x^86 - x^78 - x^72 - x^66 + x^58 + x^52 - x^44 + x^40 + x^30 - x^26 - x^16 - x^14 + x^2 + 1
Phi_365(x)=x^288 - x^287 + x^283 - x^282 + x^278 - x^277 + x^273 - x^272 + x^268 - x^267 + x^263 - x^262 + x^258 - x^257 + x^253 - x^252 + x^248 - x^247 + x^243 - x^242 + x^238 - x^237 + x^233 - x^232 + x^228 - x^227 + x^223 - x^222 + x^218 - x^217 + x^215 - x^214 + x^213 - x^212 + x^210 - x^209 + x^208 - x^207 + x^205 - x^204 + x^203 - x^202 + x^200 - x^199 + x^198 - x^197 + x^195 - x^194 + x^193 - x^192 + x^190 - x^189 + x^188 - x^187 + x^185 - x^184 + x^183 - x^182 + x^180 - x^179 + x^178 - x^177 + x^175 - x^174 + x^173 - x^172 + x^170 - x^169 + x^168 - x^167 + x^165 - x^164 + x^163 - x^162 + x^160 - x^159 + x^158 - x^157 + x^155 - x^154 + x^153 - x^152 + x^150 - x^149 + x^148 - x^147 + x^145 - x^144 + x^143 - x^141 + x^140 - x^139 + x^138 - x^136 + x^135 - x^134 + x^133 - x^131 + x^130 - x^129 + x^128 - x^126 + x^125 - x^124 + x^123 - x^121 + x^120 - x^119 + x^118 - x^116 + x^115 - x^114 + x^113 - x^111 + x^110 - x^109 + x^108 - x^106 + x^105 - x^104 + x^103 - x^101 + x^100 - x^99 + x^98 - x^96 + x^95 - x^94 + x^93 - x^91 + x^90 - x^89 + x^88 - x^86 + x^85 - x^84 + x^83 - x^81 + x^80 - x^79 + x^78 - x^76 + x^75 - x^74 + x^73 - x^71 + x^70 - x^66 + x^65 - x^61 + x^60 - x^56 + x^55 - x^51 + x^50 - x^46 + x^45 - x^41 + x^40 - x^36 + x^35 - x^31 + x^30 - x^26 + x^25 - x^21 + x^20 - x^16 + x^15 - x^11 + x^10 - x^6 + x^5 - x + 1
Phi_366(x)=x^120 + x^119 - x^117 - x^116 + x^114 + x^113 - x^111 - x^110 + x^108 + x^107 - x^105 - x^104 + x^102 + x^101 - x^99 - x^98 + x^96 + x^95 - x^93 - x^92 + x^90 + x^89 - x^87 - x^86 + x^84 + x^83 - x^81 - x^80 + x^78 + x^77 - x^75 - x^74 + x^72 + x^71 - x^69 - x^68 + x^66 + x^65 - x^63 - x^62 + x^60 - x^58 - x^57 + x^55 + x^54 - x^52 - x^51 + x^49 + x^48 - x^46 - x^45 + x^43 + x^42 - x^40 - x^39 + x^37 + x^36 - x^34 - x^33 + x^31 + x^30 - x^28 - x^27 + x^25 + x^24 - x^22 - x^21 + x^19 + x^18 - x^16 - x^15 + x^13 + x^12 - x^10 - x^9 + x^7 + x^6 - x^4 - x^3 + x + 1
Phi_367(x)=x^366 + x^365 + x^364 + x^363 + x^362 + x^361 + x^360 + x^359 + x^358 + x^357 + x^356 + x^355 + x^354 + x^353 + x^352 + x^351 + x^350 + x^349 + x^348 + x^347 + x^346 + x^345 + x^344 + x^343 + x^342 + x^341 + x^340 + x^339 + x^338 + x^337 + x^336 + x^335 + x^334 + x^333 + x^332 + x^331 + x^330 + x^329 + x^328 + x^327 + x^326 + x^325 + x^324 + x^323 + x^322 + x^321 + x^320 + x^319 + x^318 + x^317 + x^316 + x^315 + x^314 + x^313 + x^312 + x^311 + x^310 + x^309 + x^308 + x^307 + x^306 + x^305 + x^304 + x^303 + x^302 + x^301 + x^300 + x^299 + x^298 + x^297 + x^296 + x^295 + x^294 + x^293 + x^292 + x^291 + x^290 + x^289 + x^288 + x^287 + x^286 + x^285 + x^284 + x^283 + x^282 + x^281 + x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_368(x)=x^176 - x^168 + x^160 - x^152 + x^144 - x^136 + x^128 - x^120 + x^112 - x^104 + x^96 - x^88 + x^80 - x^72 + x^64 - x^56 + x^48 - x^40 + x^32 - x^24 + x^16 - x^8 + 1
Phi_369(x)=x^240 - x^237 + x^231 - x^228 + x^222 - x^219 + x^213 - x^210 + x^204 - x^201 + x^195 - x^192 + x^186 - x^183 + x^177 - x^174 + x^168 - x^165 + x^159 - x^156 + x^150 - x^147 + x^141 - x^138 + x^132 - x^129 + x^123 - x^120 + x^117 - x^111 + x^108 - x^102 + x^99 - x^93 + x^90 - x^84 + x^81 - x^75 + x^72 - x^66 + x^63 - x^57 + x^54 - x^48 + x^45 - x^39 + x^36 - x^30 + x^27 - x^21 + x^18 - x^12 + x^9 - x^3 + 1
Phi_370(x)=x^144 + x^143 - x^139 - x^138 + x^134 + x^133 - x^129 - x^128 + x^124 + x^123 - x^119 - x^118 + x^114 + x^113 - x^109 - x^108 - x^107 - x^106 + x^104 + x^103 + x^102 + x^101 - x^99 - x^98 - x^97 - x^96 + x^94 + x^93 + x^92 + x^91 - x^89 - x^88 - x^87 - x^86 + x^84 + x^83 + x^82 + x^81 - x^79 - x^78 - x^77 - x^76 + x^74 + x^73 + x^72 + x^71 + x^70 - x^68 - x^67 - x^66 - x^65 + x^63 + x^62 + x^61 + x^60 - x^58 - x^57 - x^56 - x^55 + x^53 + x^52 + x^51 + x^50 - x^48 - x^47 - x^46 - x^45 + x^43 + x^42 + x^41 + x^40 - x^38 - x^37 - x^36 - x^35 + x^31 + x^30 - x^26 - x^25 + x^21 + x^20 - x^16 - x^15 + x^11 + x^10 - x^6 - x^5 + x + 1
Phi_371(x)=x^312 - x^311 + x^305 - x^304 + x^298 - x^297 + x^291 - x^290 + x^284 - x^283 + x^277 - x^276 + x^270 - x^269 + x^263 - x^262 + x^259 - x^258 + x^256 - x^255 + x^252 - x^251 + x^249 - x^248 + x^245 - x^244 + x^242 - x^241 + x^238 - x^237 + x^235 - x^234 + x^231 - x^230 + x^228 - x^227 + x^224 - x^223 + x^221 - x^220 + x^217 - x^216 + x^214 - x^213 + x^210 - x^209 + x^207 - x^205 + x^203 - x^202 + x^200 - x^198 + x^196 - x^195 + x^193 - x^191 + x^189 - x^188 + x^186 - x^184 + x^182 - x^181 + x^179 - x^177 + x^175 - x^174 + x^172 - x^170 + x^168 - x^167 + x^165 - x^163 + x^161 - x^160 + x^158 - x^156 + x^154 - x^152 + x^151 - x^149 + x^147 - x^145 + x^144 - x^142 + x^140 - x^138 + x^137 - x^135 + x^133 - x^131 + x^130 - x^128 + x^126 - x^124 + x^123 - x^121 + x^119 - x^117 + x^116 - x^114 + x^112 - x^110 + x^109 - x^107 + x^105 - x^103 + x^102 - x^99 + x^98 - x^96 + x^95 - x^92 + x^91 - x^89 + x^88 - x^85 + x^84 - x^82 + x^81 - x^78 + x^77 - x^75 + x^74 - x^71 + x^70 - x^68 + x^67 - x^64 + x^63 - x^61 + x^60 - x^57 + x^56 - x^54 + x^53 - x^50 + x^49 - x^43 + x^42 - x^36 + x^35 - x^29 + x^28 - x^22 + x^21 - x^15 + x^14 - x^8 + x^7 - x + 1
Phi_372(x)=x^120 + x^118 - x^114 - x^112 + x^108 + x^106 - x^102 - x^100 + x^96 + x^94 - x^90 - x^88 + x^84 + x^82 - x^78 - x^76 + x^72 + x^70 - x^66 - x^64 + x^60 - x^56 - x^54 + x^50 + x^48 - x^44 - x^42 + x^38 + x^36 - x^32 - x^30 + x^26 + x^24 - x^20 - x^18 + x^14 + x^12 - x^8 - x^6 + x^2 + 1
Phi_373(x)=x^372 + x^371 + x^370 + x^369 + x^368 + x^367 + x^366 + x^365 + x^364 + x^363 + x^362 + x^361 + x^360 + x^359 + x^358 + x^357 + x^356 + x^355 + x^354 + x^353 + x^352 + x^351 + x^350 + x^349 + x^348 + x^347 + x^346 + x^345 + x^344 + x^343 + x^342 + x^341 + x^340 + x^339 + x^338 + x^337 + x^336 + x^335 + x^334 + x^333 + x^332 + x^331 + x^330 + x^329 + x^328 + x^327 + x^326 + x^325 + x^324 + x^323 + x^322 + x^321 + x^320 + x^319 + x^318 + x^317 + x^316 + x^315 + x^314 + x^313 + x^312 + x^311 + x^310 + x^309 + x^308 + x^307 + x^306 + x^305 + x^304 + x^303 + x^302 + x^301 + x^300 + x^299 + x^298 + x^297 + x^296 + x^295 + x^294 + x^293 + x^292 + x^291 + x^290 + x^289 + x^288 + x^287 + x^286 + x^285 + x^284 + x^283 + x^282 + x^281 + x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_374(x)=x^160 + x^159 - x^149 - x^148 - x^143 - x^142 + x^138 + x^137 + x^132 + x^131 - x^127 + x^125 - x^121 - x^120 + x^116 - x^114 + x^110 - x^108 - x^105 + x^103 - x^99 + x^97 + x^94 + x^91 + x^88 - x^86 - x^83 - x^80 - x^77 - x^74 + x^72 + x^69 + x^66 + x^63 - x^61 + x^57 - x^55 - x^52 + x^50 - x^46 + x^44 - x^40 - x^39 + x^35 - x^33 + x^29 + x^28 + x^23 + x^22 - x^18 - x^17 - x^12 - x^11 + x + 1
Phi_375(x)=x^200 - x^175 + x^125 - x^100 + x^75 - x^25 + 1
Phi_376(x)=x^184 - x^180 + x^176 - x^172 + x^168 - x^164 + x^160 - x^156 + x^152 - x^148 + x^144 - x^140 + x^136 - x^132 + x^128 - x^124 + x^120 - x^116 + x^112 - x^108 + x^104 - x^100 + x^96 - x^92 + x^88 - x^84 + x^80 - x^76 + x^72 - x^68 + x^64 - x^60 + x^56 - x^52 + x^48 - x^44 + x^40 - x^36 + x^32 - x^28 + x^24 - x^20 + x^16 - x^12 + x^8 - x^4 + 1
Phi_377(x)=x^336 - x^335 + x^323 - x^322 + x^310 - x^309 + x^307 - x^306 + x^297 - x^296 + x^294 - x^293 + x^284 - x^283 + x^281 - x^280 + x^278 - x^277 + x^271 - x^270 + x^268 - x^267 + x^265 - x^264 + x^258 - x^257 + x^255 - x^254 + x^252 - x^251 + x^249 - x^248 + x^245 - x^244 + x^242 - x^241 + x^239 - x^238 + x^236 - x^235 + x^232 - x^231 + x^229 - x^228 + x^226 - x^225 + x^223 - x^222 + x^220 - x^218 + x^216 - x^215 + x^213 - x^212 + x^210 - x^209 + x^207 - x^205 + x^203 - x^202 + x^200 - x^199 + x^197 - x^196 + x^194 - x^192 + x^191 - x^189 + x^187 - x^186 + x^184 - x^183 + x^181 - x^179 + x^178 - x^176 + x^174 - x^173 + x^171 - x^170 + x^168 - x^166 + x^165 - x^163 + x^162 - x^160 + x^158 - x^157 + x^155 - x^153 + x^152 - x^150 + x^149 - x^147 + x^145 - x^144 + x^142 - x^140 + x^139 - x^137 + x^136 - x^134 + x^133 - x^131 + x^129 - x^127 + x^126 - x^124 + x^123 - x^121 + x^120 - x^118 + x^116 - x^114 + x^113 - x^111 + x^110 - x^108 + x^107 - x^105 + x^104 - x^101 + x^100 - x^98 + x^97 - x^95 + x^94 - x^92 + x^91 - x^88 + x^87 - x^85 + x^84 - x^82 + x^81 - x^79 + x^78 - x^72 + x^71 - x^69 + x^68 - x^66 + x^65 - x^59 + x^58 - x^56 + x^55 - x^53 + x^52 - x^43 + x^42 - x^40 + x^39 - x^30 + x^29 - x^27 + x^26 - x^14 + x^13 - x + 1
Phi_378(x)=x^108 + x^99 - x^81 - x^72 + x^54 - x^36 - x^27 + x^9 + 1
Phi_379(x)=x^378 + x^377 + x^376 + x^375 + x^374 + x^373 + x^372 + x^371 + x^370 + x^369 + x^368 + x^367 + x^366 + x^365 + x^364 + x^363 + x^362 + x^361 + x^360 + x^359 + x^358 + x^357 + x^356 + x^355 + x^354 + x^353 + x^352 + x^351 + x^350 + x^349 + x^348 + x^347 + x^346 + x^345 + x^344 + x^343 + x^342 + x^341 + x^340 + x^339 + x^338 + x^337 + x^336 + x^335 + x^334 + x^333 + x^332 + x^331 + x^330 + x^329 + x^328 + x^327 + x^326 + x^325 + x^324 + x^323 + x^322 + x^321 + x^320 + x^319 + x^318 + x^317 + x^316 + x^315 + x^314 + x^313 + x^312 + x^311 + x^310 + x^309 + x^308 + x^307 + x^306 + x^305 + x^304 + x^303 + x^302 + x^301 + x^300 + x^299 + x^298 + x^297 + x^296 + x^295 + x^294 + x^293 + x^292 + x^291 + x^290 + x^289 + x^288 + x^287 + x^286 + x^285 + x^284 + x^283 + x^282 + x^281 + x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_380(x)=x^144 + x^142 - x^134 - x^132 + x^124 + x^122 - x^114 - x^112 - x^106 + x^102 + x^96 - x^92 - x^86 + x^82 + x^76 - x^72 + x^68 + x^62 - x^58 - x^52 + x^48 + x^42 - x^38 - x^32 - x^30 + x^22 + x^20 - x^12 - x^10 + x^2 + 1
Phi_381(x)=x^252 - x^251 + x^249 - x^248 + x^246 - x^245 + x^243 - x^242 + x^240 - x^239 + x^237 - x^236 + x^234 - x^233 + x^231 - x^230 + x^228 - x^227 + x^225 - x^224 + x^222 - x^221 + x^219 - x^218 + x^216 - x^215 + x^213 - x^212 + x^210 - x^209 + x^207 - x^206 + x^204 - x^203 + x^201 - x^200 + x^198 - x^197 + x^195 - x^194 + x^192 - x^191 + x^189 - x^188 + x^186 - x^185 + x^183 - x^182 + x^180 - x^179 + x^177 - x^176 + x^174 - x^173 + x^171 - x^170 + x^168 - x^167 + x^165 - x^164 + x^162 - x^161 + x^159 - x^158 + x^156 - x^155 + x^153 - x^152 + x^150 - x^149 + x^147 - x^146 + x^144 - x^143 + x^141 - x^140 + x^138 - x^137 + x^135 - x^134 + x^132 - x^131 + x^129 - x^128 + x^126 - x^124 + x^123 - x^121 + x^120 - x^118 + x^117 - x^115 + x^114 - x^112 + x^111 - x^109 + x^108 - x^106 + x^105 - x^103 + x^102 - x^100 + x^99 - x^97 + x^96 - x^94 + x^93 - x^91 + x^90 - x^88 + x^87 - x^85 + x^84 - x^82 + x^81 - x^79 + x^78 - x^76 + x^75 - x^73 + x^72 - x^70 + x^69 - x^67 + x^66 - x^64 + x^63 - x^61 + x^60 - x^58 + x^57 - x^55 + x^54 - x^52 + x^51 - x^49 + x^48 - x^46 + x^45 - x^43 + x^42 - x^40 + x^39 - x^37 + x^36 - x^34 + x^33 - x^31 + x^30 - x^28 + x^27 - x^25 + x^24 - x^22 + x^21 - x^19 + x^18 - x^16 + x^15 - x^13 + x^12 - x^10 + x^9 - x^7 + x^6 - x^4 + x^3 - x + 1
Phi_382(x)=x^190 - x^189 + x^188 - x^187 + x^186 - x^185 + x^184 - x^183 + x^182 - x^181 + x^180 - x^179 + x^178 - x^177 + x^176 - x^175 + x^174 - x^173 + x^172 - x^171 + x^170 - x^169 + x^168 - x^167 + x^166 - x^165 + x^164 - x^163 + x^162 - x^161 + x^160 - x^159 + x^158 - x^157 + x^156 - x^155 + x^154 - x^153 + x^152 - x^151 + x^150 - x^149 + x^148 - x^147 + x^146 - x^145 + x^144 - x^143 + x^142 - x^141 + x^140 - x^139 + x^138 - x^137 + x^136 - x^135 + x^134 - x^133 + x^132 - x^131 + x^130 - x^129 + x^128 - x^127 + x^126 - x^125 + x^124 - x^123 + x^122 - x^121 + x^120 - x^119 + x^118 - x^117 + x^116 - x^115 + x^114 - x^113 + x^112 - x^111 + x^110 - x^109 + x^108 - x^107 + x^106 - x^105 + x^104 - x^103 + x^102 - x^101 + x^100 - x^99 + x^98 - x^97 + x^96 - x^95 + x^94 - x^93 + x^92 - x^91 + x^90 - x^89 + x^88 - x^87 + x^86 - x^85 + x^84 - x^83 + x^82 - x^81 + x^80 - x^79 + x^78 - x^77 + x^76 - x^75 + x^74 - x^73 + x^72 - x^71 + x^70 - x^69 + x^68 - x^67 + x^66 - x^65 + x^64 - x^63 + x^62 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_383(x)=x^382 + x^381 + x^380 + x^379 + x^378 + x^377 + x^376 + x^375 + x^374 + x^373 + x^372 + x^371 + x^370 + x^369 + x^368 + x^367 + x^366 + x^365 + x^364 + x^363 + x^362 + x^361 + x^360 + x^359 + x^358 + x^357 + x^356 + x^355 + x^354 + x^353 + x^352 + x^351 + x^350 + x^349 + x^348 + x^347 + x^346 + x^345 + x^344 + x^343 + x^342 + x^341 + x^340 + x^339 + x^338 + x^337 + x^336 + x^335 + x^334 + x^333 + x^332 + x^331 + x^330 + x^329 + x^328 + x^327 + x^326 + x^325 + x^324 + x^323 + x^322 + x^321 + x^320 + x^319 + x^318 + x^317 + x^316 + x^315 + x^314 + x^313 + x^312 + x^311 + x^310 + x^309 + x^308 + x^307 + x^306 + x^305 + x^304 + x^303 + x^302 + x^301 + x^300 + x^299 + x^298 + x^297 + x^296 + x^295 + x^294 + x^293 + x^292 + x^291 + x^290 + x^289 + x^288 + x^287 + x^286 + x^285 + x^284 + x^283 + x^282 + x^281 + x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_384(x)=x^128 - x^64 + 1
Phi_385(x)=x^240 + x^239 + x^238 + x^237 + x^236 - x^233 - x^232 - x^231 - x^230 - 2*x^229 - x^228 - x^227 - x^226 - x^225 + x^222 + x^221 + x^220 + x^219 + x^218 + x^205 + x^204 + x^203 + x^202 + x^201 - x^198 - x^197 - x^196 - x^195 - 2*x^194 - x^193 - x^192 - x^191 - x^190 + x^187 + x^186 + 2*x^185 + 2*x^184 + 2*x^183 + x^182 + x^181 - x^178 - x^177 - x^176 - x^175 - 2*x^174 - x^173 - x^172 - x^171 + x^169 + x^168 + 2*x^167 + 2*x^166 + x^165 + x^164 + x^163 - x^159 - x^158 - x^157 - 2*x^156 - 2*x^155 - x^154 - x^153 - x^152 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 - x^140 - 2*x^139 - x^138 - x^137 - x^136 + x^134 + x^133 + 2*x^132 + 2*x^131 + 2*x^130 + 2*x^129 + 2*x^128 + x^127 + x^126 - x^124 - 2*x^123 - 2*x^122 - 3*x^121 - 3*x^120 - 3*x^119 - 2*x^118 - 2*x^117 - x^116 + x^114 + x^113 + 2*x^112 + 2*x^111 + 2*x^110 + 2*x^109 + 2*x^108 + x^107 + x^106 - x^104 - x^103 - x^102 - 2*x^101 - x^100 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 - x^88 - x^87 - x^86 - 2*x^85 - 2*x^84 - x^83 - x^82 - x^81 + x^77 + x^76 + x^75 + 2*x^74 + 2*x^73 + x^72 + x^71 - x^69 - x^68 - x^67 - 2*x^66 - x^65 - x^64 - x^63 - x^62 + x^59 + x^58 + 2*x^57 + 2*x^56 + 2*x^55 + x^54 + x^53 - x^50 - x^49 - x^48 - x^47 - 2*x^46 - x^45 - x^44 - x^43 - x^42 + x^39 + x^38 + x^37 + x^36 + x^35 + x^22 + x^21 + x^20 + x^19 + x^18 - x^15 - x^14 - x^13 - x^12 - 2*x^11 - x^10 - x^9 - x^8 - x^7 + x^4 + x^3 + x^2 + x + 1
Phi_386(x)=x^192 - x^191 + x^190 - x^189 + x^188 - x^187 + x^186 - x^185 + x^184 - x^183 + x^182 - x^181 + x^180 - x^179 + x^178 - x^177 + x^176 - x^175 + x^174 - x^173 + x^172 - x^171 + x^170 - x^169 + x^168 - x^167 + x^166 - x^165 + x^164 - x^163 + x^162 - x^161 + x^160 - x^159 + x^158 - x^157 + x^156 - x^155 + x^154 - x^153 + x^152 - x^151 + x^150 - x^149 + x^148 - x^147 + x^146 - x^145 + x^144 - x^143 + x^142 - x^141 + x^140 - x^139 + x^138 - x^137 + x^136 - x^135 + x^134 - x^133 + x^132 - x^131 + x^130 - x^129 + x^128 - x^127 + x^126 - x^125 + x^124 - x^123 + x^122 - x^121 + x^120 - x^119 + x^118 - x^117 + x^116 - x^115 + x^114 - x^113 + x^112 - x^111 + x^110 - x^109 + x^108 - x^107 + x^106 - x^105 + x^104 - x^103 + x^102 - x^101 + x^100 - x^99 + x^98 - x^97 + x^96 - x^95 + x^94 - x^93 + x^92 - x^91 + x^90 - x^89 + x^88 - x^87 + x^86 - x^85 + x^84 - x^83 + x^82 - x^81 + x^80 - x^79 + x^78 - x^77 + x^76 - x^75 + x^74 - x^73 + x^72 - x^71 + x^70 - x^69 + x^68 - x^67 + x^66 - x^65 + x^64 - x^63 + x^62 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_387(x)=x^252 - x^249 + x^243 - x^240 + x^234 - x^231 + x^225 - x^222 + x^216 - x^213 + x^207 - x^204 + x^198 - x^195 + x^189 - x^186 + x^180 - x^177 + x^171 - x^168 + x^162 - x^159 + x^153 - x^150 + x^144 - x^141 + x^135 - x^132 + x^126 - x^120 + x^117 - x^111 + x^108 - x^102 + x^99 - x^93 + x^90 - x^84 + x^81 - x^75 + x^72 - x^66 + x^63 - x^57 + x^54 - x^48 + x^45 - x^39 + x^36 - x^30 + x^27 - x^21 + x^18 - x^12 + x^9 - x^3 + 1
Phi_388(x)=x^192 - x^190 + x^188 - x^186 + x^184 - x^182 + x^180 - x^178 + x^176 - x^174 + x^172 - x^170 + x^168 - x^166 + x^164 - x^162 + x^160 - x^158 + x^156 - x^154 + x^152 - x^150 + x^148 - x^146 + x^144 - x^142 + x^140 - x^138 + x^136 - x^134 + x^132 - x^130 + x^128 - x^126 + x^124 - x^122 + x^120 - x^118 + x^116 - x^114 + x^112 - x^110 + x^108 - x^106 + x^104 - x^102 + x^100 - x^98 + x^96 - x^94 + x^92 - x^90 + x^88 - x^86 + x^84 - x^82 + x^80 - x^78 + x^76 - x^74 + x^72 - x^70 + x^68 - x^66 + x^64 - x^62 + x^60 - x^58 + x^56 - x^54 + x^52 - x^50 + x^48 - x^46 + x^44 - x^42 + x^40 - x^38 + x^36 - x^34 + x^32 - x^30 + x^28 - x^26 + x^24 - x^22 + x^20 - x^18 + x^16 - x^14 + x^12 - x^10 + x^8 - x^6 + x^4 - x^2 + 1
Phi_389(x)=x^388 + x^387 + x^386 + x^385 + x^384 + x^383 + x^382 + x^381 + x^380 + x^379 + x^378 + x^377 + x^376 + x^375 + x^374 + x^373 + x^372 + x^371 + x^370 + x^369 + x^368 + x^367 + x^366 + x^365 + x^364 + x^363 + x^362 + x^361 + x^360 + x^359 + x^358 + x^357 + x^356 + x^355 + x^354 + x^353 + x^352 + x^351 + x^350 + x^349 + x^348 + x^347 + x^346 + x^345 + x^344 + x^343 + x^342 + x^341 + x^340 + x^339 + x^338 + x^337 + x^336 + x^335 + x^334 + x^333 + x^332 + x^331 + x^330 + x^329 + x^328 + x^327 + x^326 + x^325 + x^324 + x^323 + x^322 + x^321 + x^320 + x^319 + x^318 + x^317 + x^316 + x^315 + x^314 + x^313 + x^312 + x^311 + x^310 + x^309 + x^308 + x^307 + x^306 + x^305 + x^304 + x^303 + x^302 + x^301 + x^300 + x^299 + x^298 + x^297 + x^296 + x^295 + x^294 + x^293 + x^292 + x^291 + x^290 + x^289 + x^288 + x^287 + x^286 + x^285 + x^284 + x^283 + x^282 + x^281 + x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_390(x)=x^96 - x^95 + x^94 + x^91 - x^90 + x^89 + x^83 - x^82 + x^80 - x^79 + x^78 - x^77 + x^75 - x^74 - x^68 + x^67 - x^65 + x^64 - x^63 + x^62 - x^60 + x^59 - x^57 + x^56 - x^55 + x^53 - 2*x^52 + x^51 - x^49 + x^48 - x^47 + x^45 - 2*x^44 + x^43 - x^41 + x^40 - x^39 + x^37 - x^36 + x^34 - x^33 + x^32 - x^31 + x^29 - x^28 - x^22 + x^21 - x^19 + x^18 - x^17 + x^16 - x^14 + x^13 + x^7 - x^6 + x^5 + x^2 - x + 1
Phi_391(x)=x^352 - x^351 + x^335 - x^334 + x^329 - x^328 + x^318 - x^317 + x^312 - x^311 + x^306 - x^305 + x^301 - x^300 + x^295 - x^294 + x^289 - x^288 + x^284 - x^282 + x^278 - x^277 + x^272 - x^271 + x^267 - x^265 + x^261 - x^259 + x^255 - x^254 + x^250 - x^248 + x^244 - x^242 + x^238 - x^236 + x^233 - x^231 + x^227 - x^225 + x^221 - x^219 + x^216 - x^213 + x^210 - x^208 + x^204 - x^202 + x^199 - x^196 + x^193 - x^190 + x^187 - x^185 + x^182 - x^179 + x^176 - x^173 + x^170 - x^167 + x^165 - x^162 + x^159 - x^156 + x^153 - x^150 + x^148 - x^144 + x^142 - x^139 + x^136 - x^133 + x^131 - x^127 + x^125 - x^121 + x^119 - x^116 + x^114 - x^110 + x^108 - x^104 + x^102 - x^98 + x^97 - x^93 + x^91 - x^87 + x^85 - x^81 + x^80 - x^75 + x^74 - x^70 + x^68 - x^64 + x^63 - x^58 + x^57 - x^52 + x^51 - x^47 + x^46 - x^41 + x^40 - x^35 + x^34 - x^24 + x^23 - x^18 + x^17 - x + 1
Phi_392(x)=x^168 - x^140 + x^112 - x^84 + x^56 - x^28 + 1
Phi_393(x)=x^260 - x^259 + x^257 - x^256 + x^254 - x^253 + x^251 - x^250 + x^248 - x^247 + x^245 - x^244 + x^242 - x^241 + x^239 - x^238 + x^236 - x^235 + x^233 - x^232 + x^230 - x^229 + x^227 - x^226 + x^224 - x^223 + x^221 - x^220 + x^218 - x^217 + x^215 - x^214 + x^212 - x^211 + x^209 - x^208 + x^206 - x^205 + x^203 - x^202 + x^200 - x^199 + x^197 - x^196 + x^194 - x^193 + x^191 - x^190 + x^188 - x^187 + x^185 - x^184 + x^182 - x^181 + x^179 - x^178 + x^176 - x^175 + x^173 - x^172 + x^170 - x^169 + x^167 - x^166 + x^164 - x^163 + x^161 - x^160 + x^158 - x^157 + x^155 - x^154 + x^152 - x^151 + x^149 - x^148 + x^146 - x^145 + x^143 - x^142 + x^140 - x^139 + x^137 - x^136 + x^134 - x^133 + x^131 - x^130 + x^129 - x^127 + x^126 - x^124 + x^123 - x^121 + x^120 - x^118 + x^117 - x^115 + x^114 - x^112 + x^111 - x^109 + x^108 - x^106 + x^105 - x^103 + x^102 - x^100 + x^99 - x^97 + x^96 - x^94 + x^93 - x^91 + x^90 - x^88 + x^87 - x^85 + x^84 - x^82 + x^81 - x^79 + x^78 - x^76 + x^75 - x^73 + x^72 - x^70 + x^69 - x^67 + x^66 - x^64 + x^63 - x^61 + x^60 - x^58 + x^57 - x^55 + x^54 - x^52 + x^51 - x^49 + x^48 - x^46 + x^45 - x^43 + x^42 - x^40 + x^39 - x^37 + x^36 - x^34 + x^33 - x^31 + x^30 - x^28 + x^27 - x^25 + x^24 - x^22 + x^21 - x^19 + x^18 - x^16 + x^15 - x^13 + x^12 - x^10 + x^9 - x^7 + x^6 - x^4 + x^3 - x + 1
Phi_394(x)=x^196 - x^195 + x^194 - x^193 + x^192 - x^191 + x^190 - x^189 + x^188 - x^187 + x^186 - x^185 + x^184 - x^183 + x^182 - x^181 + x^180 - x^179 + x^178 - x^177 + x^176 - x^175 + x^174 - x^173 + x^172 - x^171 + x^170 - x^169 + x^168 - x^167 + x^166 - x^165 + x^164 - x^163 + x^162 - x^161 + x^160 - x^159 + x^158 - x^157 + x^156 - x^155 + x^154 - x^153 + x^152 - x^151 + x^150 - x^149 + x^148 - x^147 + x^146 - x^145 + x^144 - x^143 + x^142 - x^141 + x^140 - x^139 + x^138 - x^137 + x^136 - x^135 + x^134 - x^133 + x^132 - x^131 + x^130 - x^129 + x^128 - x^127 + x^126 - x^125 + x^124 - x^123 + x^122 - x^121 + x^120 - x^119 + x^118 - x^117 + x^116 - x^115 + x^114 - x^113 + x^112 - x^111 + x^110 - x^109 + x^108 - x^107 + x^106 - x^105 + x^104 - x^103 + x^102 - x^101 + x^100 - x^99 + x^98 - x^97 + x^96 - x^95 + x^94 - x^93 + x^92 - x^91 + x^90 - x^89 + x^88 - x^87 + x^86 - x^85 + x^84 - x^83 + x^82 - x^81 + x^80 - x^79 + x^78 - x^77 + x^76 - x^75 + x^74 - x^73 + x^72 - x^71 + x^70 - x^69 + x^68 - x^67 + x^66 - x^65 + x^64 - x^63 + x^62 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_395(x)=x^312 - x^311 + x^307 - x^306 + x^302 - x^301 + x^297 - x^296 + x^292 - x^291 + x^287 - x^286 + x^282 - x^281 + x^277 - x^276 + x^272 - x^271 + x^267 - x^266 + x^262 - x^261 + x^257 - x^256 + x^252 - x^251 + x^247 - x^246 + x^242 - x^241 + x^237 - x^236 + x^233 - x^231 + x^228 - x^226 + x^223 - x^221 + x^218 - x^216 + x^213 - x^211 + x^208 - x^206 + x^203 - x^201 + x^198 - x^196 + x^193 - x^191 + x^188 - x^186 + x^183 - x^181 + x^178 - x^176 + x^173 - x^171 + x^168 - x^166 + x^163 - x^161 + x^158 - x^156 + x^154 - x^151 + x^149 - x^146 + x^144 - x^141 + x^139 - x^136 + x^134 - x^131 + x^129 - x^126 + x^124 - x^121 + x^119 - x^116 + x^114 - x^111 + x^109 - x^106 + x^104 - x^101 + x^99 - x^96 + x^94 - x^91 + x^89 - x^86 + x^84 - x^81 + x^79 - x^76 + x^75 - x^71 + x^70 - x^66 + x^65 - x^61 + x^60 - x^56 + x^55 - x^51 + x^50 - x^46 + x^45 - x^41 + x^40 - x^36 + x^35 - x^31 + x^30 - x^26 + x^25 - x^21 + x^20 - x^16 + x^15 - x^11 + x^10 - x^6 + x^5 - x + 1
Phi_396(x)=x^120 + x^114 - x^102 - x^96 + x^84 + x^78 - x^66 - x^60 - x^54 + x^42 + x^36 - x^24 - x^18 + x^6 + 1
Phi_397(x)=x^396 + x^395 + x^394 + x^393 + x^392 + x^391 + x^390 + x^389 + x^388 + x^387 + x^386 + x^385 + x^384 + x^383 + x^382 + x^381 + x^380 + x^379 + x^378 + x^377 + x^376 + x^375 + x^374 + x^373 + x^372 + x^371 + x^370 + x^369 + x^368 + x^367 + x^366 + x^365 + x^364 + x^363 + x^362 + x^361 + x^360 + x^359 + x^358 + x^357 + x^356 + x^355 + x^354 + x^353 + x^352 + x^351 + x^350 + x^349 + x^348 + x^347 + x^346 + x^345 + x^344 + x^343 + x^342 + x^341 + x^340 + x^339 + x^338 + x^337 + x^336 + x^335 + x^334 + x^333 + x^332 + x^331 + x^330 + x^329 + x^328 + x^327 + x^326 + x^325 + x^324 + x^323 + x^322 + x^321 + x^320 + x^319 + x^318 + x^317 + x^316 + x^315 + x^314 + x^313 + x^312 + x^311 + x^310 + x^309 + x^308 + x^307 + x^306 + x^305 + x^304 + x^303 + x^302 + x^301 + x^300 + x^299 + x^298 + x^297 + x^296 + x^295 + x^294 + x^293 + x^292 + x^291 + x^290 + x^289 + x^288 + x^287 + x^286 + x^285 + x^284 + x^283 + x^282 + x^281 + x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_398(x)=x^198 - x^197 + x^196 - x^195 + x^194 - x^193 + x^192 - x^191 + x^190 - x^189 + x^188 - x^187 + x^186 - x^185 + x^184 - x^183 + x^182 - x^181 + x^180 - x^179 + x^178 - x^177 + x^176 - x^175 + x^174 - x^173 + x^172 - x^171 + x^170 - x^169 + x^168 - x^167 + x^166 - x^165 + x^164 - x^163 + x^162 - x^161 + x^160 - x^159 + x^158 - x^157 + x^156 - x^155 + x^154 - x^153 + x^152 - x^151 + x^150 - x^149 + x^148 - x^147 + x^146 - x^145 + x^144 - x^143 + x^142 - x^141 + x^140 - x^139 + x^138 - x^137 + x^136 - x^135 + x^134 - x^133 + x^132 - x^131 + x^130 - x^129 + x^128 - x^127 + x^126 - x^125 + x^124 - x^123 + x^122 - x^121 + x^120 - x^119 + x^118 - x^117 + x^116 - x^115 + x^114 - x^113 + x^112 - x^111 + x^110 - x^109 + x^108 - x^107 + x^106 - x^105 + x^104 - x^103 + x^102 - x^101 + x^100 - x^99 + x^98 - x^97 + x^96 - x^95 + x^94 - x^93 + x^92 - x^91 + x^90 - x^89 + x^88 - x^87 + x^86 - x^85 + x^84 - x^83 + x^82 - x^81 + x^80 - x^79 + x^78 - x^77 + x^76 - x^75 + x^74 - x^73 + x^72 - x^71 + x^70 - x^69 + x^68 - x^67 + x^66 - x^65 + x^64 - x^63 + x^62 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_399(x)=x^216 + x^215 + x^214 - x^209 - x^208 - x^207 - x^197 - x^196 + x^194 + x^193 + x^190 + x^189 - x^187 - x^186 - x^176 - x^175 + x^173 + x^172 + x^169 + x^168 - x^166 - x^165 + x^159 + x^158 + x^157 - x^155 - x^154 - x^150 + x^148 + x^147 - x^145 - x^144 - x^140 - x^139 + x^137 + x^136 - x^134 + x^132 + x^131 - x^129 + x^127 + x^126 - x^124 - x^123 - x^119 - x^118 + x^116 + x^115 - x^113 + x^111 + x^110 - x^108 + x^106 + x^105 - x^103 + x^101 + x^100 - x^98 - x^97 - x^93 - x^92 + x^90 + x^89 - x^87 + x^85 + x^84 - x^82 + x^80 + x^79 - x^77 - x^76 - x^72 - x^71 + x^69 + x^68 - x^66 - x^62 - x^61 + x^59 + x^58 + x^57 - x^51 - x^50 + x^48 + x^47 + x^44 + x^43 - x^41 - x^40 - x^30 - x^29 + x^27 + x^26 + x^23 + x^22 - x^20 - x^19 - x^9 - x^8 - x^7 + x^2 + x + 1
Phi_400(x)=x^160 - x^120 + x^80 - x^40 + 1
Phi_401(x)=x^400 + x^399 + x^398 + x^397 + x^396 + x^395 + x^394 + x^393 + x^392 + x^391 + x^390 + x^389 + x^388 + x^387 + x^386 + x^385 + x^384 + x^383 + x^382 + x^381 + x^380 + x^379 + x^378 + x^377 + x^376 + x^375 + x^374 + x^373 + x^372 + x^371 + x^370 + x^369 + x^368 + x^367 + x^366 + x^365 + x^364 + x^363 + x^362 + x^361 + x^360 + x^359 + x^358 + x^357 + x^356 + x^355 + x^354 + x^353 + x^352 + x^351 + x^350 + x^349 + x^348 + x^347 + x^346 + x^345 + x^344 + x^343 + x^342 + x^341 + x^340 + x^339 + x^338 + x^337 + x^336 + x^335 + x^334 + x^333 + x^332 + x^331 + x^330 + x^329 + x^328 + x^327 + x^326 + x^325 + x^324 + x^323 + x^322 + x^321 + x^320 + x^319 + x^318 + x^317 + x^316 + x^315 + x^314 + x^313 + x^312 + x^311 + x^310 + x^309 + x^308 + x^307 + x^306 + x^305 + x^304 + x^303 + x^302 + x^301 + x^300 + x^299 + x^298 + x^297 + x^296 + x^295 + x^294 + x^293 + x^292 + x^291 + x^290 + x^289 + x^288 + x^287 + x^286 + x^285 + x^284 + x^283 + x^282 + x^281 + x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_402(x)=x^132 + x^131 - x^129 - x^128 + x^126 + x^125 - x^123 - x^122 + x^120 + x^119 - x^117 - x^116 + x^114 + x^113 - x^111 - x^110 + x^108 + x^107 - x^105 - x^104 + x^102 + x^101 - x^99 - x^98 + x^96 + x^95 - x^93 - x^92 + x^90 + x^89 - x^87 - x^86 + x^84 + x^83 - x^81 - x^80 + x^78 + x^77 - x^75 - x^74 + x^72 + x^71 - x^69 - x^68 + x^66 - x^64 - x^63 + x^61 + x^60 - x^58 - x^57 + x^55 + x^54 - x^52 - x^51 + x^49 + x^48 - x^46 - x^45 + x^43 + x^42 - x^40 - x^39 + x^37 + x^36 - x^34 - x^33 + x^31 + x^30 - x^28 - x^27 + x^25 + x^24 - x^22 - x^21 + x^19 + x^18 - x^16 - x^15 + x^13 + x^12 - x^10 - x^9 + x^7 + x^6 - x^4 - x^3 + x + 1
Phi_403(x)=x^360 - x^359 + x^347 - x^346 + x^334 - x^333 + x^329 - x^328 + x^321 - x^320 + x^316 - x^315 + x^308 - x^307 + x^303 - x^302 + x^298 - x^297 + x^295 - x^294 + x^290 - x^289 + x^285 - x^284 + x^282 - x^281 + x^277 - x^276 + x^272 - x^271 + x^269 - x^268 + x^267 - x^266 + x^264 - x^263 + x^259 - x^258 + x^256 - x^255 + x^254 - x^253 + x^251 - x^250 + x^246 - x^245 + x^243 - x^242 + x^241 - x^240 + x^238 - x^237 + x^236 - x^235 + x^233 - x^232 + x^230 - x^229 + x^228 - x^227 + x^225 - x^224 + x^223 - x^222 + x^220 - x^219 + x^217 - x^216 + x^215 - x^214 + x^212 - x^211 + x^210 - x^209 + x^207 - x^206 + x^205 - x^203 + x^202 - x^201 + x^199 - x^198 + x^197 - x^196 + x^194 - x^193 + x^192 - x^190 + x^189 - x^188 + x^186 - x^185 + x^184 - x^183 + x^181 - x^180 + x^179 - x^177 + x^176 - x^175 + x^174 - x^172 + x^171 - x^170 + x^168 - x^167 + x^166 - x^164 + x^163 - x^162 + x^161 - x^159 + x^158 - x^157 + x^155 - x^154 + x^153 - x^151 + x^150 - x^149 + x^148 - x^146 + x^145 - x^144 + x^143 - x^141 + x^140 - x^138 + x^137 - x^136 + x^135 - x^133 + x^132 - x^131 + x^130 - x^128 + x^127 - x^125 + x^124 - x^123 + x^122 - x^120 + x^119 - x^118 + x^117 - x^115 + x^114 - x^110 + x^109 - x^107 + x^106 - x^105 + x^104 - x^102 + x^101 - x^97 + x^96 - x^94 + x^93 - x^92 + x^91 - x^89 + x^88 - x^84 + x^83 - x^79 + x^78 - x^76 + x^75 - x^71 + x^70 - x^66 + x^65 - x^63 + x^62 - x^58 + x^57 - x^53 + x^52 - x^45 + x^44 - x^40 + x^39 - x^32 + x^31 - x^27 + x^26 - x^14 + x^13 - x + 1
Phi_404(x)=x^200 - x^198 + x^196 - x^194 + x^192 - x^190 + x^188 - x^186 + x^184 - x^182 + x^180 - x^178 + x^176 - x^174 + x^172 - x^170 + x^168 - x^166 + x^164 - x^162 + x^160 - x^158 + x^156 - x^154 + x^152 - x^150 + x^148 - x^146 + x^144 - x^142 + x^140 - x^138 + x^136 - x^134 + x^132 - x^130 + x^128 - x^126 + x^124 - x^122 + x^120 - x^118 + x^116 - x^114 + x^112 - x^110 + x^108 - x^106 + x^104 - x^102 + x^100 - x^98 + x^96 - x^94 + x^92 - x^90 + x^88 - x^86 + x^84 - x^82 + x^80 - x^78 + x^76 - x^74 + x^72 - x^70 + x^68 - x^66 + x^64 - x^62 + x^60 - x^58 + x^56 - x^54 + x^52 - x^50 + x^48 - x^46 + x^44 - x^42 + x^40 - x^38 + x^36 - x^34 + x^32 - x^30 + x^28 - x^26 + x^24 - x^22 + x^20 - x^18 + x^16 - x^14 + x^12 - x^10 + x^8 - x^6 + x^4 - x^2 + 1
Phi_405(x)=x^216 - x^189 + x^135 - x^108 + x^81 - x^27 + 1
Phi_406(x)=x^168 + x^167 - x^161 - x^160 + x^154 + x^153 - x^147 - x^146 + x^140 - x^138 - x^133 + x^131 + x^126 - x^124 - x^119 + x^117 + x^112 + x^109 - x^105 - x^102 + x^98 + x^95 - x^91 - x^88 + x^84 - x^80 - x^77 + x^73 + x^70 - x^66 - x^63 + x^59 + x^56 + x^51 - x^49 - x^44 + x^42 + x^37 - x^35 - x^30 + x^28 - x^22 - x^21 + x^15 + x^14 - x^8 - x^7 + x + 1
Phi_407(x)=x^360 - x^359 + x^349 - x^348 + x^338 - x^337 + x^327 - x^326 + x^323 - x^322 + x^316 - x^315 + x^312 - x^311 + x^305 - x^304 + x^301 - x^300 + x^294 - x^293 + x^290 - x^289 + x^286 - x^285 + x^283 - x^282 + x^279 - x^278 + x^275 - x^274 + x^272 - x^271 + x^268 - x^267 + x^264 - x^263 + x^261 - x^260 + x^257 - x^256 + x^253 - x^252 + x^250 - x^248 + x^246 - x^245 + x^242 - x^241 + x^239 - x^237 + x^235 - x^234 + x^231 - x^230 + x^228 - x^226 + x^224 - x^223 + x^220 - x^219 + x^217 - x^215 + x^213 - x^211 + x^209 - x^208 + x^206 - x^204 + x^202 - x^200 + x^198 - x^197 + x^195 - x^193 + x^191 - x^189 + x^187 - x^186 + x^184 - x^182 + x^180 - x^178 + x^176 - x^174 + x^173 - x^171 + x^169 - x^167 + x^165 - x^163 + x^162 - x^160 + x^158 - x^156 + x^154 - x^152 + x^151 - x^149 + x^147 - x^145 + x^143 - x^141 + x^140 - x^137 + x^136 - x^134 + x^132 - x^130 + x^129 - x^126 + x^125 - x^123 + x^121 - x^119 + x^118 - x^115 + x^114 - x^112 + x^110 - x^108 + x^107 - x^104 + x^103 - x^100 + x^99 - x^97 + x^96 - x^93 + x^92 - x^89 + x^88 - x^86 + x^85 - x^82 + x^81 - x^78 + x^77 - x^75 + x^74 - x^71 + x^70 - x^67 + x^66 - x^60 + x^59 - x^56 + x^55 - x^49 + x^48 - x^45 + x^44 - x^38 + x^37 - x^34 + x^33 - x^23 + x^22 - x^12 + x^11 - x + 1
Phi_408(x)=x^128 + x^124 - x^116 - x^112 + x^104 + x^100 - x^92 - x^88 + x^80 + x^76 - x^68 - x^64 - x^60 + x^52 + x^48 - x^40 - x^36 + x^28 + x^24 - x^16 - x^12 + x^4 + 1
Phi_409(x)=x^408 + x^407 + x^406 + x^405 + x^404 + x^403 + x^402 + x^401 + x^400 + x^399 + x^398 + x^397 + x^396 + x^395 + x^394 + x^393 + x^392 + x^391 + x^390 + x^389 + x^388 + x^387 + x^386 + x^385 + x^384 + x^383 + x^382 + x^381 + x^380 + x^379 + x^378 + x^377 + x^376 + x^375 + x^374 + x^373 + x^372 + x^371 + x^370 + x^369 + x^368 + x^367 + x^366 + x^365 + x^364 + x^363 + x^362 + x^361 + x^360 + x^359 + x^358 + x^357 + x^356 + x^355 + x^354 + x^353 + x^352 + x^351 + x^350 + x^349 + x^348 + x^347 + x^346 + x^345 + x^344 + x^343 + x^342 + x^341 + x^340 + x^339 + x^338 + x^337 + x^336 + x^335 + x^334 + x^333 + x^332 + x^331 + x^330 + x^329 + x^328 + x^327 + x^326 + x^325 + x^324 + x^323 + x^322 + x^321 + x^320 + x^319 + x^318 + x^317 + x^316 + x^315 + x^314 + x^313 + x^312 + x^311 + x^310 + x^309 + x^308 + x^307 + x^306 + x^305 + x^304 + x^303 + x^302 + x^301 + x^300 + x^299 + x^298 + x^297 + x^296 + x^295 + x^294 + x^293 + x^292 + x^291 + x^290 + x^289 + x^288 + x^287 + x^286 + x^285 + x^284 + x^283 + x^282 + x^281 + x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_410(x)=x^160 + x^159 - x^155 - x^154 + x^150 + x^149 - x^145 - x^144 + x^140 + x^139 - x^135 - x^134 + x^130 + x^129 - x^125 - x^124 + x^120 - x^118 - x^115 + x^113 + x^110 - x^108 - x^105 + x^103 + x^100 - x^98 - x^95 + x^93 + x^90 - x^88 - x^85 + x^83 + x^80 + x^77 - x^75 - x^72 + x^70 + x^67 - x^65 - x^62 + x^60 + x^57 - x^55 - x^52 + x^50 + x^47 - x^45 - x^42 + x^40 - x^36 - x^35 + x^31 + x^30 - x^26 - x^25 + x^21 + x^20 - x^16 - x^15 + x^11 + x^10 - x^6 - x^5 + x + 1
Phi_411(x)=x^272 - x^271 + x^269 - x^268 + x^266 - x^265 + x^263 - x^262 + x^260 - x^259 + x^257 - x^256 + x^254 - x^253 + x^251 - x^250 + x^248 - x^247 + x^245 - x^244 + x^242 - x^241 + x^239 - x^238 + x^236 - x^235 + x^233 - x^232 + x^230 - x^229 + x^227 - x^226 + x^224 - x^223 + x^221 - x^220 + x^218 - x^217 + x^215 - x^214 + x^212 - x^211 + x^209 - x^208 + x^206 - x^205 + x^203 - x^202 + x^200 - x^199 + x^197 - x^196 + x^194 - x^193 + x^191 - x^190 + x^188 - x^187 + x^185 - x^184 + x^182 - x^181 + x^179 - x^178 + x^176 - x^175 + x^173 - x^172 + x^170 - x^169 + x^167 - x^166 + x^164 - x^163 + x^161 - x^160 + x^158 - x^157 + x^155 - x^154 + x^152 - x^151 + x^149 - x^148 + x^146 - x^145 + x^143 - x^142 + x^140 - x^139 + x^137 - x^136 + x^135 - x^133 + x^132 - x^130 + x^129 - x^127 + x^126 - x^124 + x^123 - x^121 + x^120 - x^118 + x^117 - x^115 + x^114 - x^112 + x^111 - x^109 + x^108 - x^106 + x^105 - x^103 + x^102 - x^100 + x^99 - x^97 + x^96 - x^94 + x^93 - x^91 + x^90 - x^88 + x^87 - x^85 + x^84 - x^82 + x^81 - x^79 + x^78 - x^76 + x^75 - x^73 + x^72 - x^70 + x^69 - x^67 + x^66 - x^64 + x^63 - x^61 + x^60 - x^58 + x^57 - x^55 + x^54 - x^52 + x^51 - x^49 + x^48 - x^46 + x^45 - x^43 + x^42 - x^40 + x^39 - x^37 + x^36 - x^34 + x^33 - x^31 + x^30 - x^28 + x^27 - x^25 + x^24 - x^22 + x^21 - x^19 + x^18 - x^16 + x^15 - x^13 + x^12 - x^10 + x^9 - x^7 + x^6 - x^4 + x^3 - x + 1
Phi_412(x)=x^204 - x^202 + x^200 - x^198 + x^196 - x^194 + x^192 - x^190 + x^188 - x^186 + x^184 - x^182 + x^180 - x^178 + x^176 - x^174 + x^172 - x^170 + x^168 - x^166 + x^164 - x^162 + x^160 - x^158 + x^156 - x^154 + x^152 - x^150 + x^148 - x^146 + x^144 - x^142 + x^140 - x^138 + x^136 - x^134 + x^132 - x^130 + x^128 - x^126 + x^124 - x^122 + x^120 - x^118 + x^116 - x^114 + x^112 - x^110 + x^108 - x^106 + x^104 - x^102 + x^100 - x^98 + x^96 - x^94 + x^92 - x^90 + x^88 - x^86 + x^84 - x^82 + x^80 - x^78 + x^76 - x^74 + x^72 - x^70 + x^68 - x^66 + x^64 - x^62 + x^60 - x^58 + x^56 - x^54 + x^52 - x^50 + x^48 - x^46 + x^44 - x^42 + x^40 - x^38 + x^36 - x^34 + x^32 - x^30 + x^28 - x^26 + x^24 - x^22 + x^20 - x^18 + x^16 - x^14 + x^12 - x^10 + x^8 - x^6 + x^4 - x^2 + 1
Phi_413(x)=x^348 - x^347 + x^341 - x^340 + x^334 - x^333 + x^327 - x^326 + x^320 - x^319 + x^313 - x^312 + x^306 - x^305 + x^299 - x^298 + x^292 - x^291 + x^289 - x^288 + x^285 - x^284 + x^282 - x^281 + x^278 - x^277 + x^275 - x^274 + x^271 - x^270 + x^268 - x^267 + x^264 - x^263 + x^261 - x^260 + x^257 - x^256 + x^254 - x^253 + x^250 - x^249 + x^247 - x^246 + x^243 - x^242 + x^240 - x^239 + x^236 - x^235 + x^233 - x^232 + x^230 - x^228 + x^226 - x^225 + x^223 - x^221 + x^219 - x^218 + x^216 - x^214 + x^212 - x^211 + x^209 - x^207 + x^205 - x^204 + x^202 - x^200 + x^198 - x^197 + x^195 - x^193 + x^191 - x^190 + x^188 - x^186 + x^184 - x^183 + x^181 - x^179 + x^177 - x^176 + x^174 - x^172 + x^171 - x^169 + x^167 - x^165 + x^164 - x^162 + x^160 - x^158 + x^157 - x^155 + x^153 - x^151 + x^150 - x^148 + x^146 - x^144 + x^143 - x^141 + x^139 - x^137 + x^136 - x^134 + x^132 - x^130 + x^129 - x^127 + x^125 - x^123 + x^122 - x^120 + x^118 - x^116 + x^115 - x^113 + x^112 - x^109 + x^108 - x^106 + x^105 - x^102 + x^101 - x^99 + x^98 - x^95 + x^94 - x^92 + x^91 - x^88 + x^87 - x^85 + x^84 - x^81 + x^80 - x^78 + x^77 - x^74 + x^73 - x^71 + x^70 - x^67 + x^66 - x^64 + x^63 - x^60 + x^59 - x^57 + x^56 - x^50 + x^49 - x^43 + x^42 - x^36 + x^35 - x^29 + x^28 - x^22 + x^21 - x^15 + x^14 - x^8 + x^7 - x + 1
Phi_414(x)=x^132 + x^129 - x^123 - x^120 + x^114 + x^111 - x^105 - x^102 + x^96 + x^93 - x^87 - x^84 + x^78 + x^75 - x^69 - x^66 - x^63 + x^57 + x^54 - x^48 - x^45 + x^39 + x^36 - x^30 - x^27 + x^21 + x^18 - x^12 - x^9 + x^3 + 1
Phi_415(x)=x^328 - x^327 + x^323 - x^322 + x^318 - x^317 + x^313 - x^312 + x^308 - x^307 + x^303 - x^302 + x^298 - x^297 + x^293 - x^292 + x^288 - x^287 + x^283 - x^282 + x^278 - x^277 + x^273 - x^272 + x^268 - x^267 + x^263 - x^262 + x^258 - x^257 + x^253 - x^252 + x^248 - x^247 + x^245 - x^244 + x^243 - x^242 + x^240 - x^239 + x^238 - x^237 + x^235 - x^234 + x^233 - x^232 + x^230 - x^229 + x^228 - x^227 + x^225 - x^224 + x^223 - x^222 + x^220 - x^219 + x^218 - x^217 + x^215 - x^214 + x^213 - x^212 + x^210 - x^209 + x^208 - x^207 + x^205 - x^204 + x^203 - x^202 + x^200 - x^199 + x^198 - x^197 + x^195 - x^194 + x^193 - x^192 + x^190 - x^189 + x^188 - x^187 + x^185 - x^184 + x^183 - x^182 + x^180 - x^179 + x^178 - x^177 + x^175 - x^174 + x^173 - x^172 + x^170 - x^169 + x^168 - x^167 + x^165 - x^164 + x^163 - x^161 + x^160 - x^159 + x^158 - x^156 + x^155 - x^154 + x^153 - x^151 + x^150 - x^149 + x^148 - x^146 + x^145 - x^144 + x^143 - x^141 + x^140 - x^139 + x^138 - x^136 + x^135 - x^134 + x^133 - x^131 + x^130 - x^129 + x^128 - x^126 + x^125 - x^124 + x^123 - x^121 + x^120 - x^119 + x^118 - x^116 + x^115 - x^114 + x^113 - x^111 + x^110 - x^109 + x^108 - x^106 + x^105 - x^104 + x^103 - x^101 + x^100 - x^99 + x^98 - x^96 + x^95 - x^94 + x^93 - x^91 + x^90 - x^89 + x^88 - x^86 + x^85 - x^84 + x^83 - x^81 + x^80 - x^76 + x^75 - x^71 + x^70 - x^66 + x^65 - x^61 + x^60 - x^56 + x^55 - x^51 + x^50 - x^46 + x^45 - x^41 + x^40 - x^36 + x^35 - x^31 + x^30 - x^26 + x^25 - x^21 + x^20 - x^16 + x^15 - x^11 + x^10 - x^6 + x^5 - x + 1
Phi_416(x)=x^192 - x^176 + x^160 - x^144 + x^128 - x^112 + x^96 - x^80 + x^64 - x^48 + x^32 - x^16 + 1
Phi_417(x)=x^276 - x^275 + x^273 - x^272 + x^270 - x^269 + x^267 - x^266 + x^264 - x^263 + x^261 - x^260 + x^258 - x^257 + x^255 - x^254 + x^252 - x^251 + x^249 - x^248 + x^246 - x^245 + x^243 - x^242 + x^240 - x^239 + x^237 - x^236 + x^234 - x^233 + x^231 - x^230 + x^228 - x^227 + x^225 - x^224 + x^222 - x^221 + x^219 - x^218 + x^216 - x^215 + x^213 - x^212 + x^210 - x^209 + x^207 - x^206 + x^204 - x^203 + x^201 - x^200 + x^198 - x^197 + x^195 - x^194 + x^192 - x^191 + x^189 - x^188 + x^186 - x^185 + x^183 - x^182 + x^180 - x^179 + x^177 - x^176 + x^174 - x^173 + x^171 - x^170 + x^168 - x^167 + x^165 - x^164 + x^162 - x^161 + x^159 - x^158 + x^156 - x^155 + x^153 - x^152 + x^150 - x^149 + x^147 - x^146 + x^144 - x^143 + x^141 - x^140 + x^138 - x^136 + x^135 - x^133 + x^132 - x^130 + x^129 - x^127 + x^126 - x^124 + x^123 - x^121 + x^120 - x^118 + x^117 - x^115 + x^114 - x^112 + x^111 - x^109 + x^108 - x^106 + x^105 - x^103 + x^102 - x^100 + x^99 - x^97 + x^96 - x^94 + x^93 - x^91 + x^90 - x^88 + x^87 - x^85 + x^84 - x^82 + x^81 - x^79 + x^78 - x^76 + x^75 - x^73 + x^72 - x^70 + x^69 - x^67 + x^66 - x^64 + x^63 - x^61 + x^60 - x^58 + x^57 - x^55 + x^54 - x^52 + x^51 - x^49 + x^48 - x^46 + x^45 - x^43 + x^42 - x^40 + x^39 - x^37 + x^36 - x^34 + x^33 - x^31 + x^30 - x^28 + x^27 - x^25 + x^24 - x^22 + x^21 - x^19 + x^18 - x^16 + x^15 - x^13 + x^12 - x^10 + x^9 - x^7 + x^6 - x^4 + x^3 - x + 1
Phi_418(x)=x^180 + x^179 - x^169 - x^168 - x^161 - x^160 + x^158 + x^157 + x^150 + x^149 - x^147 - x^146 + x^142 + x^141 - x^139 - x^138 + x^136 + x^135 - x^131 - x^130 + x^128 + x^127 - x^125 - x^124 - x^123 - x^122 + x^120 + x^119 - x^117 - x^116 + x^114 + x^113 + x^112 + x^111 - x^109 - x^108 + x^106 + x^105 + x^104 - x^102 - x^101 - x^100 + x^98 + x^97 - x^95 - x^94 - x^93 + x^91 + x^90 + x^89 - x^87 - x^86 - x^85 + x^83 + x^82 - x^80 - x^79 - x^78 + x^76 + x^75 + x^74 - x^72 - x^71 + x^69 + x^68 + x^67 + x^66 - x^64 - x^63 + x^61 + x^60 - x^58 - x^57 - x^56 - x^55 + x^53 + x^52 - x^50 - x^49 + x^45 + x^44 - x^42 - x^41 + x^39 + x^38 - x^34 - x^33 + x^31 + x^30 + x^23 + x^22 - x^20 - x^19 - x^12 - x^11 + x + 1
Phi_419(x)=x^418 + x^417 + x^416 + x^415 + x^414 + x^413 + x^412 + x^411 + x^410 + x^409 + x^408 + x^407 + x^406 + x^405 + x^404 + x^403 + x^402 + x^401 + x^400 + x^399 + x^398 + x^397 + x^396 + x^395 + x^394 + x^393 + x^392 + x^391 + x^390 + x^389 + x^388 + x^387 + x^386 + x^385 + x^384 + x^383 + x^382 + x^381 + x^380 + x^379 + x^378 + x^377 + x^376 + x^375 + x^374 + x^373 + x^372 + x^371 + x^370 + x^369 + x^368 + x^367 + x^366 + x^365 + x^364 + x^363 + x^362 + x^361 + x^360 + x^359 + x^358 + x^357 + x^356 + x^355 + x^354 + x^353 + x^352 + x^351 + x^350 + x^349 + x^348 + x^347 + x^346 + x^345 + x^344 + x^343 + x^342 + x^341 + x^340 + x^339 + x^338 + x^337 + x^336 + x^335 + x^334 + x^333 + x^332 + x^331 + x^330 + x^329 + x^328 + x^327 + x^326 + x^325 + x^324 + x^323 + x^322 + x^321 + x^320 + x^319 + x^318 + x^317 + x^316 + x^315 + x^314 + x^313 + x^312 + x^311 + x^310 + x^309 + x^308 + x^307 + x^306 + x^305 + x^304 + x^303 + x^302 + x^301 + x^300 + x^299 + x^298 + x^297 + x^296 + x^295 + x^294 + x^293 + x^292 + x^291 + x^290 + x^289 + x^288 + x^287 + x^286 + x^285 + x^284 + x^283 + x^282 + x^281 + x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_420(x)=x^96 - x^94 + x^92 + x^86 - x^84 + 2*x^82 - x^80 + x^78 + x^72 - x^70 + x^68 - x^66 + x^64 - x^62 - x^56 - x^52 - x^48 - x^44 - x^40 - x^34 + x^32 - x^30 + x^28 - x^26 + x^24 + x^18 - x^16 + 2*x^14 - x^12 + x^10 + x^4 - x^2 + 1
Phi_421(x)=x^420 + x^419 + x^418 + x^417 + x^416 + x^415 + x^414 + x^413 + x^412 + x^411 + x^410 + x^409 + x^408 + x^407 + x^406 + x^405 + x^404 + x^403 + x^402 + x^401 + x^400 + x^399 + x^398 + x^397 + x^396 + x^395 + x^394 + x^393 + x^392 + x^391 + x^390 + x^389 + x^388 + x^387 + x^386 + x^385 + x^384 + x^383 + x^382 + x^381 + x^380 + x^379 + x^378 + x^377 + x^376 + x^375 + x^374 + x^373 + x^372 + x^371 + x^370 + x^369 + x^368 + x^367 + x^366 + x^365 + x^364 + x^363 + x^362 + x^361 + x^360 + x^359 + x^358 + x^357 + x^356 + x^355 + x^354 + x^353 + x^352 + x^351 + x^350 + x^349 + x^348 + x^347 + x^346 + x^345 + x^344 + x^343 + x^342 + x^341 + x^340 + x^339 + x^338 + x^337 + x^336 + x^335 + x^334 + x^333 + x^332 + x^331 + x^330 + x^329 + x^328 + x^327 + x^326 + x^325 + x^324 + x^323 + x^322 + x^321 + x^320 + x^319 + x^318 + x^317 + x^316 + x^315 + x^314 + x^313 + x^312 + x^311 + x^310 + x^309 + x^308 + x^307 + x^306 + x^305 + x^304 + x^303 + x^302 + x^301 + x^300 + x^299 + x^298 + x^297 + x^296 + x^295 + x^294 + x^293 + x^292 + x^291 + x^290 + x^289 + x^288 + x^287 + x^286 + x^285 + x^284 + x^283 + x^282 + x^281 + x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_422(x)=x^210 - x^209 + x^208 - x^207 + x^206 - x^205 + x^204 - x^203 + x^202 - x^201 + x^200 - x^199 + x^198 - x^197 + x^196 - x^195 + x^194 - x^193 + x^192 - x^191 + x^190 - x^189 + x^188 - x^187 + x^186 - x^185 + x^184 - x^183 + x^182 - x^181 + x^180 - x^179 + x^178 - x^177 + x^176 - x^175 + x^174 - x^173 + x^172 - x^171 + x^170 - x^169 + x^168 - x^167 + x^166 - x^165 + x^164 - x^163 + x^162 - x^161 + x^160 - x^159 + x^158 - x^157 + x^156 - x^155 + x^154 - x^153 + x^152 - x^151 + x^150 - x^149 + x^148 - x^147 + x^146 - x^145 + x^144 - x^143 + x^142 - x^141 + x^140 - x^139 + x^138 - x^137 + x^136 - x^135 + x^134 - x^133 + x^132 - x^131 + x^130 - x^129 + x^128 - x^127 + x^126 - x^125 + x^124 - x^123 + x^122 - x^121 + x^120 - x^119 + x^118 - x^117 + x^116 - x^115 + x^114 - x^113 + x^112 - x^111 + x^110 - x^109 + x^108 - x^107 + x^106 - x^105 + x^104 - x^103 + x^102 - x^101 + x^100 - x^99 + x^98 - x^97 + x^96 - x^95 + x^94 - x^93 + x^92 - x^91 + x^90 - x^89 + x^88 - x^87 + x^86 - x^85 + x^84 - x^83 + x^82 - x^81 + x^80 - x^79 + x^78 - x^77 + x^76 - x^75 + x^74 - x^73 + x^72 - x^71 + x^70 - x^69 + x^68 - x^67 + x^66 - x^65 + x^64 - x^63 + x^62 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_423(x)=x^276 - x^273 + x^267 - x^264 + x^258 - x^255 + x^249 - x^246 + x^240 - x^237 + x^231 - x^228 + x^222 - x^219 + x^213 - x^210 + x^204 - x^201 + x^195 - x^192 + x^186 - x^183 + x^177 - x^174 + x^168 - x^165 + x^159 - x^156 + x^150 - x^147 + x^141 - x^138 + x^135 - x^129 + x^126 - x^120 + x^117 - x^111 + x^108 - x^102 + x^99 - x^93 + x^90 - x^84 + x^81 - x^75 + x^72 - x^66 + x^63 - x^57 + x^54 - x^48 + x^45 - x^39 + x^36 - x^30 + x^27 - x^21 + x^18 - x^12 + x^9 - x^3 + 1
Phi_424(x)=x^208 - x^204 + x^200 - x^196 + x^192 - x^188 + x^184 - x^180 + x^176 - x^172 + x^168 - x^164 + x^160 - x^156 + x^152 - x^148 + x^144 - x^140 + x^136 - x^132 + x^128 - x^124 + x^120 - x^116 + x^112 - x^108 + x^104 - x^100 + x^96 - x^92 + x^88 - x^84 + x^80 - x^76 + x^72 - x^68 + x^64 - x^60 + x^56 - x^52 + x^48 - x^44 + x^40 - x^36 + x^32 - x^28 + x^24 - x^20 + x^16 - x^12 + x^8 - x^4 + 1
Phi_425(x)=x^320 - x^315 + x^295 - x^290 + x^270 - x^265 + x^245 - x^240 + x^235 - x^230 + x^220 - x^215 + x^210 - x^205 + x^195 - x^190 + x^185 - x^180 + x^170 - x^165 + x^160 - x^155 + x^150 - x^140 + x^135 - x^130 + x^125 - x^115 + x^110 - x^105 + x^100 - x^90 + x^85 - x^80 + x^75 - x^55 + x^50 - x^30 + x^25 - x^5 + 1
Phi_426(x)=x^140 + x^139 - x^137 - x^136 + x^134 + x^133 - x^131 - x^130 + x^128 + x^127 - x^125 - x^124 + x^122 + x^121 - x^119 - x^118 + x^116 + x^115 - x^113 - x^112 + x^110 + x^109 - x^107 - x^106 + x^104 + x^103 - x^101 - x^100 + x^98 + x^97 - x^95 - x^94 + x^92 + x^91 - x^89 - x^88 + x^86 + x^85 - x^83 - x^82 + x^80 + x^79 - x^77 - x^76 + x^74 + x^73 - x^71 - x^70 - x^69 + x^67 + x^66 - x^64 - x^63 + x^61 + x^60 - x^58 - x^57 + x^55 + x^54 - x^52 - x^51 + x^49 + x^48 - x^46 - x^45 + x^43 + x^42 - x^40 - x^39 + x^37 + x^36 - x^34 - x^33 + x^31 + x^30 - x^28 - x^27 + x^25 + x^24 - x^22 - x^21 + x^19 + x^18 - x^16 - x^15 + x^13 + x^12 - x^10 - x^9 + x^7 + x^6 - x^4 - x^3 + x + 1
Phi_427(x)=x^360 - x^359 + x^353 - x^352 + x^346 - x^345 + x^339 - x^338 + x^332 - x^331 + x^325 - x^324 + x^318 - x^317 + x^311 - x^310 + x^304 - x^303 + x^299 - x^298 + x^297 - x^296 + x^292 - x^291 + x^290 - x^289 + x^285 - x^284 + x^283 - x^282 + x^278 - x^277 + x^276 - x^275 + x^271 - x^270 + x^269 - x^268 + x^264 - x^263 + x^262 - x^261 + x^257 - x^256 + x^255 - x^254 + x^250 - x^249 + x^248 - x^247 + x^243 - x^242 + x^241 - x^240 + x^238 - x^237 + x^236 - x^235 + x^234 - x^233 + x^231 - x^230 + x^229 - x^228 + x^227 - x^226 + x^224 - x^223 + x^222 - x^221 + x^220 - x^219 + x^217 - x^216 + x^215 - x^214 + x^213 - x^212 + x^210 - x^209 + x^208 - x^207 + x^206 - x^205 + x^203 - x^202 + x^201 - x^200 + x^199 - x^198 + x^196 - x^195 + x^194 - x^193 + x^192 - x^191 + x^189 - x^188 + x^187 - x^186 + x^185 - x^184 + x^182 - x^181 + x^180 - x^179 + x^178 - x^176 + x^175 - x^174 + x^173 - x^172 + x^171 - x^169 + x^168 - x^167 + x^166 - x^165 + x^164 - x^162 + x^161 - x^160 + x^159 - x^158 + x^157 - x^155 + x^154 - x^153 + x^152 - x^151 + x^150 - x^148 + x^147 - x^146 + x^145 - x^144 + x^143 - x^141 + x^140 - x^139 + x^138 - x^137 + x^136 - x^134 + x^133 - x^132 + x^131 - x^130 + x^129 - x^127 + x^126 - x^125 + x^124 - x^123 + x^122 - x^120 + x^119 - x^118 + x^117 - x^113 + x^112 - x^111 + x^110 - x^106 + x^105 - x^104 + x^103 - x^99 + x^98 - x^97 + x^96 - x^92 + x^91 - x^90 + x^89 - x^85 + x^84 - x^83 + x^82 - x^78 + x^77 - x^76 + x^75 - x^71 + x^70 - x^69 + x^68 - x^64 + x^63 - x^62 + x^61 - x^57 + x^56 - x^50 + x^49 - x^43 + x^42 - x^36 + x^35 - x^29 + x^28 - x^22 + x^21 - x^15 + x^14 - x^8 + x^7 - x + 1
Phi_428(x)=x^212 - x^210 + x^208 - x^206 + x^204 - x^202 + x^200 - x^198 + x^196 - x^194 + x^192 - x^190 + x^188 - x^186 + x^184 - x^182 + x^180 - x^178 + x^176 - x^174 + x^172 - x^170 + x^168 - x^166 + x^164 - x^162 + x^160 - x^158 + x^156 - x^154 + x^152 - x^150 + x^148 - x^146 + x^144 - x^142 + x^140 - x^138 + x^136 - x^134 + x^132 - x^130 + x^128 - x^126 + x^124 - x^122 + x^120 - x^118 + x^116 - x^114 + x^112 - x^110 + x^108 - x^106 + x^104 - x^102 + x^100 - x^98 + x^96 - x^94 + x^92 - x^90 + x^88 - x^86 + x^84 - x^82 + x^80 - x^78 + x^76 - x^74 + x^72 - x^70 + x^68 - x^66 + x^64 - x^62 + x^60 - x^58 + x^56 - x^54 + x^52 - x^50 + x^48 - x^46 + x^44 - x^42 + x^40 - x^38 + x^36 - x^34 + x^32 - x^30 + x^28 - x^26 + x^24 - x^22 + x^20 - x^18 + x^16 - x^14 + x^12 - x^10 + x^8 - x^6 + x^4 - x^2 + 1
Phi_429(x)=x^240 + x^239 + x^238 - x^229 - x^228 - 2*x^227 - x^226 - x^225 + x^216 + x^215 + x^214 + x^207 + x^206 + x^205 + x^201 + x^200 + x^199 - x^196 - x^195 - 2*x^194 - x^193 - x^192 - x^190 - x^189 - 2*x^188 - x^187 - x^186 + x^183 + x^182 + x^181 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^168 + x^167 + x^166 - x^163 - x^161 - x^159 - x^157 - x^156 - 2*x^155 - x^154 - x^153 - x^151 - x^149 - x^147 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 - x^130 - x^128 - x^126 - x^124 - x^122 - x^120 - x^118 - x^116 - x^114 - x^112 - x^110 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 - x^93 - x^91 - x^89 - x^87 - x^86 - 2*x^85 - x^84 - x^83 - x^81 - x^79 - x^77 + x^74 + x^73 + x^72 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^59 + x^58 + x^57 - x^54 - x^53 - 2*x^52 - x^51 - x^50 - x^48 - x^47 - 2*x^46 - x^45 - x^44 + x^41 + x^40 + x^39 + x^35 + x^34 + x^33 + x^26 + x^25 + x^24 - x^15 - x^14 - 2*x^13 - x^12 - x^11 + x^2 + x + 1
Phi_430(x)=x^168 + x^167 - x^163 - x^162 + x^158 + x^157 - x^153 - x^152 + x^148 + x^147 - x^143 - x^142 + x^138 + x^137 - x^133 - x^132 + x^128 + x^127 - x^125 - x^124 - x^123 - x^122 + x^120 + x^119 + x^118 + x^117 - x^115 - x^114 - x^113 - x^112 + x^110 + x^109 + x^108 + x^107 - x^105 - x^104 - x^103 - x^102 + x^100 + x^99 + x^98 + x^97 - x^95 - x^94 - x^93 - x^92 + x^90 + x^89 + x^88 + x^87 - x^85 - x^84 - x^83 + x^81 + x^80 + x^79 + x^78 - x^76 - x^75 - x^74 - x^73 + x^71 + x^70 + x^69 + x^68 - x^66 - x^65 - x^64 - x^63 + x^61 + x^60 + x^59 + x^58 - x^56 - x^55 - x^54 - x^53 + x^51 + x^50 + x^49 + x^48 - x^46 - x^45 - x^44 - x^43 + x^41 + x^40 - x^36 - x^35 + x^31 + x^30 - x^26 - x^25 + x^21 + x^20 - x^16 - x^15 + x^11 + x^10 - x^6 - x^5 + x + 1
Phi_431(x)=x^430 + x^429 + x^428 + x^427 + x^426 + x^425 + x^424 + x^423 + x^422 + x^421 + x^420 + x^419 + x^418 + x^417 + x^416 + x^415 + x^414 + x^413 + x^412 + x^411 + x^410 + x^409 + x^408 + x^407 + x^406 + x^405 + x^404 + x^403 + x^402 + x^401 + x^400 + x^399 + x^398 + x^397 + x^396 + x^395 + x^394 + x^393 + x^392 + x^391 + x^390 + x^389 + x^388 + x^387 + x^386 + x^385 + x^384 + x^383 + x^382 + x^381 + x^380 + x^379 + x^378 + x^377 + x^376 + x^375 + x^374 + x^373 + x^372 + x^371 + x^370 + x^369 + x^368 + x^367 + x^366 + x^365 + x^364 + x^363 + x^362 + x^361 + x^360 + x^359 + x^358 + x^357 + x^356 + x^355 + x^354 + x^353 + x^352 + x^351 + x^350 + x^349 + x^348 + x^347 + x^346 + x^345 + x^344 + x^343 + x^342 + x^341 + x^340 + x^339 + x^338 + x^337 + x^336 + x^335 + x^334 + x^333 + x^332 + x^331 + x^330 + x^329 + x^328 + x^327 + x^326 + x^325 + x^324 + x^323 + x^322 + x^321 + x^320 + x^319 + x^318 + x^317 + x^316 + x^315 + x^314 + x^313 + x^312 + x^311 + x^310 + x^309 + x^308 + x^307 + x^306 + x^305 + x^304 + x^303 + x^302 + x^301 + x^300 + x^299 + x^298 + x^297 + x^296 + x^295 + x^294 + x^293 + x^292 + x^291 + x^290 + x^289 + x^288 + x^287 + x^286 + x^285 + x^284 + x^283 + x^282 + x^281 + x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_432(x)=x^144 - x^72 + 1
Phi_433(x)=x^432 + x^431 + x^430 + x^429 + x^428 + x^427 + x^426 + x^425 + x^424 + x^423 + x^422 + x^421 + x^420 + x^419 + x^418 + x^417 + x^416 + x^415 + x^414 + x^413 + x^412 + x^411 + x^410 + x^409 + x^408 + x^407 + x^406 + x^405 + x^404 + x^403 + x^402 + x^401 + x^400 + x^399 + x^398 + x^397 + x^396 + x^395 + x^394 + x^393 + x^392 + x^391 + x^390 + x^389 + x^388 + x^387 + x^386 + x^385 + x^384 + x^383 + x^382 + x^381 + x^380 + x^379 + x^378 + x^377 + x^376 + x^375 + x^374 + x^373 + x^372 + x^371 + x^370 + x^369 + x^368 + x^367 + x^366 + x^365 + x^364 + x^363 + x^362 + x^361 + x^360 + x^359 + x^358 + x^357 + x^356 + x^355 + x^354 + x^353 + x^352 + x^351 + x^350 + x^349 + x^348 + x^347 + x^346 + x^345 + x^344 + x^343 + x^342 + x^341 + x^340 + x^339 + x^338 + x^337 + x^336 + x^335 + x^334 + x^333 + x^332 + x^331 + x^330 + x^329 + x^328 + x^327 + x^326 + x^325 + x^324 + x^323 + x^322 + x^321 + x^320 + x^319 + x^318 + x^317 + x^316 + x^315 + x^314 + x^313 + x^312 + x^311 + x^310 + x^309 + x^308 + x^307 + x^306 + x^305 + x^304 + x^303 + x^302 + x^301 + x^300 + x^299 + x^298 + x^297 + x^296 + x^295 + x^294 + x^293 + x^292 + x^291 + x^290 + x^289 + x^288 + x^287 + x^286 + x^285 + x^284 + x^283 + x^282 + x^281 + x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_434(x)=x^180 + x^179 - x^173 - x^172 + x^166 + x^165 - x^159 - x^158 + x^152 + x^151 - x^149 - x^148 - x^145 - x^144 + x^142 + x^141 + x^138 + x^137 - x^135 - x^134 - x^131 - x^130 + x^128 + x^127 + x^124 + x^123 - x^121 - x^120 + x^118 - x^116 + x^114 + x^113 - x^111 + x^109 - x^107 - x^106 + x^104 - x^102 + x^100 + x^99 - x^97 + x^95 - x^93 - x^92 + x^90 - x^88 - x^87 + x^85 - x^83 + x^81 + x^80 - x^78 + x^76 - x^74 - x^73 + x^71 - x^69 + x^67 + x^66 - x^64 + x^62 - x^60 - x^59 + x^57 + x^56 + x^53 + x^52 - x^50 - x^49 - x^46 - x^45 + x^43 + x^42 + x^39 + x^38 - x^36 - x^35 - x^32 - x^31 + x^29 + x^28 - x^22 - x^21 + x^15 + x^14 - x^8 - x^7 + x + 1
Phi_435(x)=x^224 + x^223 + x^222 - x^219 - x^218 - x^217 + x^209 + x^208 + x^207 - x^204 - x^203 - x^202 - x^195 + x^192 + x^190 - x^187 - x^180 + x^177 + x^175 - x^172 - x^165 + x^162 + x^160 - x^157 - x^150 + x^147 + x^145 - x^142 + x^137 + x^136 - x^131 - x^127 + x^122 + x^121 - x^116 - x^112 - x^108 + x^103 + x^102 - x^97 - x^93 + x^88 + x^87 - x^82 + x^79 + x^77 - x^74 - x^67 + x^64 + x^62 - x^59 - x^52 + x^49 + x^47 - x^44 - x^37 + x^34 + x^32 - x^29 - x^22 - x^21 - x^20 + x^17 + x^16 + x^15 - x^7 - x^6 - x^5 + x^2 + x + 1
Phi_436(x)=x^216 - x^214 + x^212 - x^210 + x^208 - x^206 + x^204 - x^202 + x^200 - x^198 + x^196 - x^194 + x^192 - x^190 + x^188 - x^186 + x^184 - x^182 + x^180 - x^178 + x^176 - x^174 + x^172 - x^170 + x^168 - x^166 + x^164 - x^162 + x^160 - x^158 + x^156 - x^154 + x^152 - x^150 + x^148 - x^146 + x^144 - x^142 + x^140 - x^138 + x^136 - x^134 + x^132 - x^130 + x^128 - x^126 + x^124 - x^122 + x^120 - x^118 + x^116 - x^114 + x^112 - x^110 + x^108 - x^106 + x^104 - x^102 + x^100 - x^98 + x^96 - x^94 + x^92 - x^90 + x^88 - x^86 + x^84 - x^82 + x^80 - x^78 + x^76 - x^74 + x^72 - x^70 + x^68 - x^66 + x^64 - x^62 + x^60 - x^58 + x^56 - x^54 + x^52 - x^50 + x^48 - x^46 + x^44 - x^42 + x^40 - x^38 + x^36 - x^34 + x^32 - x^30 + x^28 - x^26 + x^24 - x^22 + x^20 - x^18 + x^16 - x^14 + x^12 - x^10 + x^8 - x^6 + x^4 - x^2 + 1
Phi_437(x)=x^396 - x^395 + x^377 - x^376 + x^373 - x^372 + x^358 - x^357 + x^354 - x^353 + x^350 - x^349 + x^339 - x^338 + x^335 - x^334 + x^331 - x^330 + x^327 - x^326 + x^320 - x^319 + x^316 - x^315 + x^312 - x^311 + x^308 - x^307 + x^304 - x^303 + x^301 - x^300 + x^297 - x^296 + x^293 - x^292 + x^289 - x^288 + x^285 - x^284 + x^282 - x^280 + x^278 - x^277 + x^274 - x^273 + x^270 - x^269 + x^266 - x^265 + x^263 - x^261 + x^259 - x^257 + x^255 - x^254 + x^251 - x^250 + x^247 - x^246 + x^244 - x^242 + x^240 - x^238 + x^236 - x^234 + x^232 - x^231 + x^228 - x^227 + x^225 - x^223 + x^221 - x^219 + x^217 - x^215 + x^213 - x^211 + x^209 - x^208 + x^206 - x^204 + x^202 - x^200 + x^198 - x^196 + x^194 - x^192 + x^190 - x^188 + x^187 - x^185 + x^183 - x^181 + x^179 - x^177 + x^175 - x^173 + x^171 - x^169 + x^168 - x^165 + x^164 - x^162 + x^160 - x^158 + x^156 - x^154 + x^152 - x^150 + x^149 - x^146 + x^145 - x^142 + x^141 - x^139 + x^137 - x^135 + x^133 - x^131 + x^130 - x^127 + x^126 - x^123 + x^122 - x^119 + x^118 - x^116 + x^114 - x^112 + x^111 - x^108 + x^107 - x^104 + x^103 - x^100 + x^99 - x^96 + x^95 - x^93 + x^92 - x^89 + x^88 - x^85 + x^84 - x^81 + x^80 - x^77 + x^76 - x^70 + x^69 - x^66 + x^65 - x^62 + x^61 - x^58 + x^57 - x^47 + x^46 - x^43 + x^42 - x^39 + x^38 - x^24 + x^23 - x^20 + x^19 - x + 1
Phi_438(x)=x^144 + x^143 - x^141 - x^140 + x^138 + x^137 - x^135 - x^134 + x^132 + x^131 - x^129 - x^128 + x^126 + x^125 - x^123 - x^122 + x^120 + x^119 - x^117 - x^116 + x^114 + x^113 - x^111 - x^110 + x^108 + x^107 - x^105 - x^104 + x^102 + x^101 - x^99 - x^98 + x^96 + x^95 - x^93 - x^92 + x^90 + x^89 - x^87 - x^86 + x^84 + x^83 - x^81 - x^80 + x^78 + x^77 - x^75 - x^74 + x^72 - x^70 - x^69 + x^67 + x^66 - x^64 - x^63 + x^61 + x^60 - x^58 - x^57 + x^55 + x^54 - x^52 - x^51 + x^49 + x^48 - x^46 - x^45 + x^43 + x^42 - x^40 - x^39 + x^37 + x^36 - x^34 - x^33 + x^31 + x^30 - x^28 - x^27 + x^25 + x^24 - x^22 - x^21 + x^19 + x^18 - x^16 - x^15 + x^13 + x^12 - x^10 - x^9 + x^7 + x^6 - x^4 - x^3 + x + 1
Phi_439(x)=x^438 + x^437 + x^436 + x^435 + x^434 + x^433 + x^432 + x^431 + x^430 + x^429 + x^428 + x^427 + x^426 + x^425 + x^424 + x^423 + x^422 + x^421 + x^420 + x^419 + x^418 + x^417 + x^416 + x^415 + x^414 + x^413 + x^412 + x^411 + x^410 + x^409 + x^408 + x^407 + x^406 + x^405 + x^404 + x^403 + x^402 + x^401 + x^400 + x^399 + x^398 + x^397 + x^396 + x^395 + x^394 + x^393 + x^392 + x^391 + x^390 + x^389 + x^388 + x^387 + x^386 + x^385 + x^384 + x^383 + x^382 + x^381 + x^380 + x^379 + x^378 + x^377 + x^376 + x^375 + x^374 + x^373 + x^372 + x^371 + x^370 + x^369 + x^368 + x^367 + x^366 + x^365 + x^364 + x^363 + x^362 + x^361 + x^360 + x^359 + x^358 + x^357 + x^356 + x^355 + x^354 + x^353 + x^352 + x^351 + x^350 + x^349 + x^348 + x^347 + x^346 + x^345 + x^344 + x^343 + x^342 + x^341 + x^340 + x^339 + x^338 + x^337 + x^336 + x^335 + x^334 + x^333 + x^332 + x^331 + x^330 + x^329 + x^328 + x^327 + x^326 + x^325 + x^324 + x^323 + x^322 + x^321 + x^320 + x^319 + x^318 + x^317 + x^316 + x^315 + x^314 + x^313 + x^312 + x^311 + x^310 + x^309 + x^308 + x^307 + x^306 + x^305 + x^304 + x^303 + x^302 + x^301 + x^300 + x^299 + x^298 + x^297 + x^296 + x^295 + x^294 + x^293 + x^292 + x^291 + x^290 + x^289 + x^288 + x^287 + x^286 + x^285 + x^284 + x^283 + x^282 + x^281 + x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_440(x)=x^160 + x^156 - x^140 - x^136 + x^120 - x^112 - x^100 + x^92 + x^80 + x^68 - x^60 - x^48 + x^40 - x^24 - x^20 + x^4 + 1
Phi_441(x)=x^252 - x^231 + x^189 - x^168 + x^126 - x^84 + x^63 - x^21 + 1
Phi_442(x)=x^192 + x^191 - x^179 - x^178 - x^175 - x^174 + x^166 + x^165 + x^162 + x^161 + x^158 + x^157 - x^153 - x^152 - x^149 - x^148 - x^145 - x^144 - x^141 + x^139 + x^136 + x^135 + x^132 + x^131 + x^128 - x^126 + x^124 - x^122 - x^119 - x^118 - x^115 + x^113 - x^111 + x^109 - x^107 + x^105 + x^102 - x^100 + x^98 - x^96 + x^94 - x^92 + x^90 + x^87 - x^85 + x^83 - x^81 + x^79 - x^77 - x^74 - x^73 - x^70 + x^68 - x^66 + x^64 + x^61 + x^60 + x^57 + x^56 + x^53 - x^51 - x^48 - x^47 - x^44 - x^43 - x^40 - x^39 + x^35 + x^34 + x^31 + x^30 + x^27 + x^26 - x^18 - x^17 - x^14 - x^13 + x + 1
Phi_443(x)=x^442 + x^441 + x^440 + x^439 + x^438 + x^437 + x^436 + x^435 + x^434 + x^433 + x^432 + x^431 + x^430 + x^429 + x^428 + x^427 + x^426 + x^425 + x^424 + x^423 + x^422 + x^421 + x^420 + x^419 + x^418 + x^417 + x^416 + x^415 + x^414 + x^413 + x^412 + x^411 + x^410 + x^409 + x^408 + x^407 + x^406 + x^405 + x^404 + x^403 + x^402 + x^401 + x^400 + x^399 + x^398 + x^397 + x^396 + x^395 + x^394 + x^393 + x^392 + x^391 + x^390 + x^389 + x^388 + x^387 + x^386 + x^385 + x^384 + x^383 + x^382 + x^381 + x^380 + x^379 + x^378 + x^377 + x^376 + x^375 + x^374 + x^373 + x^372 + x^371 + x^370 + x^369 + x^368 + x^367 + x^366 + x^365 + x^364 + x^363 + x^362 + x^361 + x^360 + x^359 + x^358 + x^357 + x^356 + x^355 + x^354 + x^353 + x^352 + x^351 + x^350 + x^349 + x^348 + x^347 + x^346 + x^345 + x^344 + x^343 + x^342 + x^341 + x^340 + x^339 + x^338 + x^337 + x^336 + x^335 + x^334 + x^333 + x^332 + x^331 + x^330 + x^329 + x^328 + x^327 + x^326 + x^325 + x^324 + x^323 + x^322 + x^321 + x^320 + x^319 + x^318 + x^317 + x^316 + x^315 + x^314 + x^313 + x^312 + x^311 + x^310 + x^309 + x^308 + x^307 + x^306 + x^305 + x^304 + x^303 + x^302 + x^301 + x^300 + x^299 + x^298 + x^297 + x^296 + x^295 + x^294 + x^293 + x^292 + x^291 + x^290 + x^289 + x^288 + x^287 + x^286 + x^285 + x^284 + x^283 + x^282 + x^281 + x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_444(x)=x^144 + x^142 - x^138 - x^136 + x^132 + x^130 - x^126 - x^124 + x^120 + x^118 - x^114 - x^112 + x^108 + x^106 - x^102 - x^100 + x^96 + x^94 - x^90 - x^88 + x^84 + x^82 - x^78 - x^76 + x^72 - x^68 - x^66 + x^62 + x^60 - x^56 - x^54 + x^50 + x^48 - x^44 - x^42 + x^38 + x^36 - x^32 - x^30 + x^26 + x^24 - x^20 - x^18 + x^14 + x^12 - x^8 - x^6 + x^2 + 1
Phi_445(x)=x^352 - x^351 + x^347 - x^346 + x^342 - x^341 + x^337 - x^336 + x^332 - x^331 + x^327 - x^326 + x^322 - x^321 + x^317 - x^316 + x^312 - x^311 + x^307 - x^306 + x^302 - x^301 + x^297 - x^296 + x^292 - x^291 + x^287 - x^286 + x^282 - x^281 + x^277 - x^276 + x^272 - x^271 + x^267 - x^266 + x^263 - x^261 + x^258 - x^256 + x^253 - x^251 + x^248 - x^246 + x^243 - x^241 + x^238 - x^236 + x^233 - x^231 + x^228 - x^226 + x^223 - x^221 + x^218 - x^216 + x^213 - x^211 + x^208 - x^206 + x^203 - x^201 + x^198 - x^196 + x^193 - x^191 + x^188 - x^186 + x^183 - x^181 + x^178 - x^176 + x^174 - x^171 + x^169 - x^166 + x^164 - x^161 + x^159 - x^156 + x^154 - x^151 + x^149 - x^146 + x^144 - x^141 + x^139 - x^136 + x^134 - x^131 + x^129 - x^126 + x^124 - x^121 + x^119 - x^116 + x^114 - x^111 + x^109 - x^106 + x^104 - x^101 + x^99 - x^96 + x^94 - x^91 + x^89 - x^86 + x^85 - x^81 + x^80 - x^76 + x^75 - x^71 + x^70 - x^66 + x^65 - x^61 + x^60 - x^56 + x^55 - x^51 + x^50 - x^46 + x^45 - x^41 + x^40 - x^36 + x^35 - x^31 + x^30 - x^26 + x^25 - x^21 + x^20 - x^16 + x^15 - x^11 + x^10 - x^6 + x^5 - x + 1
Phi_446(x)=x^222 - x^221 + x^220 - x^219 + x^218 - x^217 + x^216 - x^215 + x^214 - x^213 + x^212 - x^211 + x^210 - x^209 + x^208 - x^207 + x^206 - x^205 + x^204 - x^203 + x^202 - x^201 + x^200 - x^199 + x^198 - x^197 + x^196 - x^195 + x^194 - x^193 + x^192 - x^191 + x^190 - x^189 + x^188 - x^187 + x^186 - x^185 + x^184 - x^183 + x^182 - x^181 + x^180 - x^179 + x^178 - x^177 + x^176 - x^175 + x^174 - x^173 + x^172 - x^171 + x^170 - x^169 + x^168 - x^167 + x^166 - x^165 + x^164 - x^163 + x^162 - x^161 + x^160 - x^159 + x^158 - x^157 + x^156 - x^155 + x^154 - x^153 + x^152 - x^151 + x^150 - x^149 + x^148 - x^147 + x^146 - x^145 + x^144 - x^143 + x^142 - x^141 + x^140 - x^139 + x^138 - x^137 + x^136 - x^135 + x^134 - x^133 + x^132 - x^131 + x^130 - x^129 + x^128 - x^127 + x^126 - x^125 + x^124 - x^123 + x^122 - x^121 + x^120 - x^119 + x^118 - x^117 + x^116 - x^115 + x^114 - x^113 + x^112 - x^111 + x^110 - x^109 + x^108 - x^107 + x^106 - x^105 + x^104 - x^103 + x^102 - x^101 + x^100 - x^99 + x^98 - x^97 + x^96 - x^95 + x^94 - x^93 + x^92 - x^91 + x^90 - x^89 + x^88 - x^87 + x^86 - x^85 + x^84 - x^83 + x^82 - x^81 + x^80 - x^79 + x^78 - x^77 + x^76 - x^75 + x^74 - x^73 + x^72 - x^71 + x^70 - x^69 + x^68 - x^67 + x^66 - x^65 + x^64 - x^63 + x^62 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_447(x)=x^296 - x^295 + x^293 - x^292 + x^290 - x^289 + x^287 - x^286 + x^284 - x^283 + x^281 - x^280 + x^278 - x^277 + x^275 - x^274 + x^272 - x^271 + x^269 - x^268 + x^266 - x^265 + x^263 - x^262 + x^260 - x^259 + x^257 - x^256 + x^254 - x^253 + x^251 - x^250 + x^248 - x^247 + x^245 - x^244 + x^242 - x^241 + x^239 - x^238 + x^236 - x^235 + x^233 - x^232 + x^230 - x^229 + x^227 - x^226 + x^224 - x^223 + x^221 - x^220 + x^218 - x^217 + x^215 - x^214 + x^212 - x^211 + x^209 - x^208 + x^206 - x^205 + x^203 - x^202 + x^200 - x^199 + x^197 - x^196 + x^194 - x^193 + x^191 - x^190 + x^188 - x^187 + x^185 - x^184 + x^182 - x^181 + x^179 - x^178 + x^176 - x^175 + x^173 - x^172 + x^170 - x^169 + x^167 - x^166 + x^164 - x^163 + x^161 - x^160 + x^158 - x^157 + x^155 - x^154 + x^152 - x^151 + x^149 - x^148 + x^147 - x^145 + x^144 - x^142 + x^141 - x^139 + x^138 - x^136 + x^135 - x^133 + x^132 - x^130 + x^129 - x^127 + x^126 - x^124 + x^123 - x^121 + x^120 - x^118 + x^117 - x^115 + x^114 - x^112 + x^111 - x^109 + x^108 - x^106 + x^105 - x^103 + x^102 - x^100 + x^99 - x^97 + x^96 - x^94 + x^93 - x^91 + x^90 - x^88 + x^87 - x^85 + x^84 - x^82 + x^81 - x^79 + x^78 - x^76 + x^75 - x^73 + x^72 - x^70 + x^69 - x^67 + x^66 - x^64 + x^63 - x^61 + x^60 - x^58 + x^57 - x^55 + x^54 - x^52 + x^51 - x^49 + x^48 - x^46 + x^45 - x^43 + x^42 - x^40 + x^39 - x^37 + x^36 - x^34 + x^33 - x^31 + x^30 - x^28 + x^27 - x^25 + x^24 - x^22 + x^21 - x^19 + x^18 - x^16 + x^15 - x^13 + x^12 - x^10 + x^9 - x^7 + x^6 - x^4 + x^3 - x + 1
Phi_448(x)=x^192 - x^160 + x^128 - x^96 + x^64 - x^32 + 1
Phi_449(x)=x^448 + x^447 + x^446 + x^445 + x^444 + x^443 + x^442 + x^441 + x^440 + x^439 + x^438 + x^437 + x^436 + x^435 + x^434 + x^433 + x^432 + x^431 + x^430 + x^429 + x^428 + x^427 + x^426 + x^425 + x^424 + x^423 + x^422 + x^421 + x^420 + x^419 + x^418 + x^417 + x^416 + x^415 + x^414 + x^413 + x^412 + x^411 + x^410 + x^409 + x^408 + x^407 + x^406 + x^405 + x^404 + x^403 + x^402 + x^401 + x^400 + x^399 + x^398 + x^397 + x^396 + x^395 + x^394 + x^393 + x^392 + x^391 + x^390 + x^389 + x^388 + x^387 + x^386 + x^385 + x^384 + x^383 + x^382 + x^381 + x^380 + x^379 + x^378 + x^377 + x^376 + x^375 + x^374 + x^373 + x^372 + x^371 + x^370 + x^369 + x^368 + x^367 + x^366 + x^365 + x^364 + x^363 + x^362 + x^361 + x^360 + x^359 + x^358 + x^357 + x^356 + x^355 + x^354 + x^353 + x^352 + x^351 + x^350 + x^349 + x^348 + x^347 + x^346 + x^345 + x^344 + x^343 + x^342 + x^341 + x^340 + x^339 + x^338 + x^337 + x^336 + x^335 + x^334 + x^333 + x^332 + x^331 + x^330 + x^329 + x^328 + x^327 + x^326 + x^325 + x^324 + x^323 + x^322 + x^321 + x^320 + x^319 + x^318 + x^317 + x^316 + x^315 + x^314 + x^313 + x^312 + x^311 + x^310 + x^309 + x^308 + x^307 + x^306 + x^305 + x^304 + x^303 + x^302 + x^301 + x^300 + x^299 + x^298 + x^297 + x^296 + x^295 + x^294 + x^293 + x^292 + x^291 + x^290 + x^289 + x^288 + x^287 + x^286 + x^285 + x^284 + x^283 + x^282 + x^281 + x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_450(x)=x^120 + x^105 - x^75 - x^60 - x^45 + x^15 + 1
Phi_451(x)=x^400 - x^399 + x^389 - x^388 + x^378 - x^377 + x^367 - x^366 + x^359 - x^358 + x^356 - x^355 + x^348 - x^347 + x^345 - x^344 + x^337 - x^336 + x^334 - x^333 + x^326 - x^325 + x^323 - x^322 + x^318 - x^317 + x^315 - x^314 + x^312 - x^311 + x^307 - x^306 + x^304 - x^303 + x^301 - x^300 + x^296 - x^295 + x^293 - x^292 + x^290 - x^289 + x^285 - x^284 + x^282 - x^281 + x^279 - x^278 + x^277 - x^276 + x^274 - x^273 + x^271 - x^270 + x^268 - x^267 + x^266 - x^265 + x^263 - x^262 + x^260 - x^259 + x^257 - x^256 + x^255 - x^254 + x^252 - x^251 + x^249 - x^248 + x^246 - x^245 + x^244 - x^243 + x^241 - x^240 + x^238 - x^237 + x^236 - x^234 + x^233 - x^232 + x^230 - x^229 + x^227 - x^226 + x^225 - x^223 + x^222 - x^221 + x^219 - x^218 + x^216 - x^215 + x^214 - x^212 + x^211 - x^210 + x^208 - x^207 + x^205 - x^204 + x^203 - x^201 + x^200 - x^199 + x^197 - x^196 + x^195 - x^193 + x^192 - x^190 + x^189 - x^188 + x^186 - x^185 + x^184 - x^182 + x^181 - x^179 + x^178 - x^177 + x^175 - x^174 + x^173 - x^171 + x^170 - x^168 + x^167 - x^166 + x^164 - x^163 + x^162 - x^160 + x^159 - x^157 + x^156 - x^155 + x^154 - x^152 + x^151 - x^149 + x^148 - x^146 + x^145 - x^144 + x^143 - x^141 + x^140 - x^138 + x^137 - x^135 + x^134 - x^133 + x^132 - x^130 + x^129 - x^127 + x^126 - x^124 + x^123 - x^122 + x^121 - x^119 + x^118 - x^116 + x^115 - x^111 + x^110 - x^108 + x^107 - x^105 + x^104 - x^100 + x^99 - x^97 + x^96 - x^94 + x^93 - x^89 + x^88 - x^86 + x^85 - x^83 + x^82 - x^78 + x^77 - x^75 + x^74 - x^67 + x^66 - x^64 + x^63 - x^56 + x^55 - x^53 + x^52 - x^45 + x^44 - x^42 + x^41 - x^34 + x^33 - x^23 + x^22 - x^12 + x^11 - x + 1
Phi_452(x)=x^224 - x^222 + x^220 - x^218 + x^216 - x^214 + x^212 - x^210 + x^208 - x^206 + x^204 - x^202 + x^200 - x^198 + x^196 - x^194 + x^192 - x^190 + x^188 - x^186 + x^184 - x^182 + x^180 - x^178 + x^176 - x^174 + x^172 - x^170 + x^168 - x^166 + x^164 - x^162 + x^160 - x^158 + x^156 - x^154 + x^152 - x^150 + x^148 - x^146 + x^144 - x^142 + x^140 - x^138 + x^136 - x^134 + x^132 - x^130 + x^128 - x^126 + x^124 - x^122 + x^120 - x^118 + x^116 - x^114 + x^112 - x^110 + x^108 - x^106 + x^104 - x^102 + x^100 - x^98 + x^96 - x^94 + x^92 - x^90 + x^88 - x^86 + x^84 - x^82 + x^80 - x^78 + x^76 - x^74 + x^72 - x^70 + x^68 - x^66 + x^64 - x^62 + x^60 - x^58 + x^56 - x^54 + x^52 - x^50 + x^48 - x^46 + x^44 - x^42 + x^40 - x^38 + x^36 - x^34 + x^32 - x^30 + x^28 - x^26 + x^24 - x^22 + x^20 - x^18 + x^16 - x^14 + x^12 - x^10 + x^8 - x^6 + x^4 - x^2 + 1
Phi_453(x)=x^300 - x^299 + x^297 - x^296 + x^294 - x^293 + x^291 - x^290 + x^288 - x^287 + x^285 - x^284 + x^282 - x^281 + x^279 - x^278 + x^276 - x^275 + x^273 - x^272 + x^270 - x^269 + x^267 - x^266 + x^264 - x^263 + x^261 - x^260 + x^258 - x^257 + x^255 - x^254 + x^252 - x^251 + x^249 - x^248 + x^246 - x^245 + x^243 - x^242 + x^240 - x^239 + x^237 - x^236 + x^234 - x^233 + x^231 - x^230 + x^228 - x^227 + x^225 - x^224 + x^222 - x^221 + x^219 - x^218 + x^216 - x^215 + x^213 - x^212 + x^210 - x^209 + x^207 - x^206 + x^204 - x^203 + x^201 - x^200 + x^198 - x^197 + x^195 - x^194 + x^192 - x^191 + x^189 - x^188 + x^186 - x^185 + x^183 - x^182 + x^180 - x^179 + x^177 - x^176 + x^174 - x^173 + x^171 - x^170 + x^168 - x^167 + x^165 - x^164 + x^162 - x^161 + x^159 - x^158 + x^156 - x^155 + x^153 - x^152 + x^150 - x^148 + x^147 - x^145 + x^144 - x^142 + x^141 - x^139 + x^138 - x^136 + x^135 - x^133 + x^132 - x^130 + x^129 - x^127 + x^126 - x^124 + x^123 - x^121 + x^120 - x^118 + x^117 - x^115 + x^114 - x^112 + x^111 - x^109 + x^108 - x^106 + x^105 - x^103 + x^102 - x^100 + x^99 - x^97 + x^96 - x^94 + x^93 - x^91 + x^90 - x^88 + x^87 - x^85 + x^84 - x^82 + x^81 - x^79 + x^78 - x^76 + x^75 - x^73 + x^72 - x^70 + x^69 - x^67 + x^66 - x^64 + x^63 - x^61 + x^60 - x^58 + x^57 - x^55 + x^54 - x^52 + x^51 - x^49 + x^48 - x^46 + x^45 - x^43 + x^42 - x^40 + x^39 - x^37 + x^36 - x^34 + x^33 - x^31 + x^30 - x^28 + x^27 - x^25 + x^24 - x^22 + x^21 - x^19 + x^18 - x^16 + x^15 - x^13 + x^12 - x^10 + x^9 - x^7 + x^6 - x^4 + x^3 - x + 1
Phi_454(x)=x^226 - x^225 + x^224 - x^223 + x^222 - x^221 + x^220 - x^219 + x^218 - x^217 + x^216 - x^215 + x^214 - x^213 + x^212 - x^211 + x^210 - x^209 + x^208 - x^207 + x^206 - x^205 + x^204 - x^203 + x^202 - x^201 + x^200 - x^199 + x^198 - x^197 + x^196 - x^195 + x^194 - x^193 + x^192 - x^191 + x^190 - x^189 + x^188 - x^187 + x^186 - x^185 + x^184 - x^183 + x^182 - x^181 + x^180 - x^179 + x^178 - x^177 + x^176 - x^175 + x^174 - x^173 + x^172 - x^171 + x^170 - x^169 + x^168 - x^167 + x^166 - x^165 + x^164 - x^163 + x^162 - x^161 + x^160 - x^159 + x^158 - x^157 + x^156 - x^155 + x^154 - x^153 + x^152 - x^151 + x^150 - x^149 + x^148 - x^147 + x^146 - x^145 + x^144 - x^143 + x^142 - x^141 + x^140 - x^139 + x^138 - x^137 + x^136 - x^135 + x^134 - x^133 + x^132 - x^131 + x^130 - x^129 + x^128 - x^127 + x^126 - x^125 + x^124 - x^123 + x^122 - x^121 + x^120 - x^119 + x^118 - x^117 + x^116 - x^115 + x^114 - x^113 + x^112 - x^111 + x^110 - x^109 + x^108 - x^107 + x^106 - x^105 + x^104 - x^103 + x^102 - x^101 + x^100 - x^99 + x^98 - x^97 + x^96 - x^95 + x^94 - x^93 + x^92 - x^91 + x^90 - x^89 + x^88 - x^87 + x^86 - x^85 + x^84 - x^83 + x^82 - x^81 + x^80 - x^79 + x^78 - x^77 + x^76 - x^75 + x^74 - x^73 + x^72 - x^71 + x^70 - x^69 + x^68 - x^67 + x^66 - x^65 + x^64 - x^63 + x^62 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_455(x)=x^288 + x^287 + x^286 + x^285 + x^284 - x^281 - x^280 - x^279 - x^278 - x^277 - x^275 - x^274 - x^273 - x^272 - x^271 + x^268 + x^267 + x^266 + x^265 + x^264 + x^253 + x^252 + x^251 + x^250 + x^249 - x^246 - x^245 - x^244 - x^243 - x^242 - x^240 - x^239 - x^238 - x^237 - x^236 + x^233 + x^232 + x^231 + x^230 + x^229 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 - x^213 - x^212 - x^211 - 2*x^210 - 2*x^209 - 2*x^208 - 2*x^207 - x^206 - x^205 - x^204 + x^200 + x^199 + x^198 + 2*x^197 + 2*x^196 + 2*x^195 + 2*x^194 + x^193 - x^190 - x^189 + x^185 - x^181 - x^180 - x^178 - x^175 - x^174 - x^173 - 2*x^172 - x^171 - x^170 - x^169 + x^165 + x^164 + x^163 + 2*x^162 + 2*x^161 + 2*x^160 + 2*x^159 + 2*x^158 + x^157 + x^156 - x^151 - x^149 - x^148 - x^147 - x^146 - 2*x^145 - x^144 - 2*x^143 - x^142 - x^141 - x^140 - x^139 - x^137 + x^132 + x^131 + 2*x^130 + 2*x^129 + 2*x^128 + 2*x^127 + 2*x^126 + x^125 + x^124 + x^123 - x^119 - x^118 - x^117 - 2*x^116 - x^115 - x^114 - x^113 - x^110 - x^108 - x^107 + x^103 - x^99 - x^98 + x^95 + 2*x^94 + 2*x^93 + 2*x^92 + 2*x^91 + x^90 + x^89 + x^88 - x^84 - x^83 - x^82 - 2*x^81 - 2*x^80 - 2*x^79 - 2*x^78 - x^77 - x^76 - x^75 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^59 + x^58 + x^57 + x^56 + x^55 - x^52 - x^51 - x^50 - x^49 - x^48 - x^46 - x^45 - x^44 - x^43 - x^42 + x^39 + x^38 + x^37 + x^36 + x^35 + x^24 + x^23 + x^22 + x^21 + x^20 - x^17 - x^16 - x^15 - x^14 - x^13 - x^11 - x^10 - x^9 - x^8 - x^7 + x^4 + x^3 + x^2 + x + 1
Phi_456(x)=x^144 + x^140 - x^132 - x^128 + x^120 + x^116 - x^108 - x^104 + x^96 + x^92 - x^84 - x^80 + x^72 - x^64 - x^60 + x^52 + x^48 - x^40 - x^36 + x^28 + x^24 - x^16 - x^12 + x^4 + 1
Phi_457(x)=x^456 + x^455 + x^454 + x^453 + x^452 + x^451 + x^450 + x^449 + x^448 + x^447 + x^446 + x^445 + x^444 + x^443 + x^442 + x^441 + x^440 + x^439 + x^438 + x^437 + x^436 + x^435 + x^434 + x^433 + x^432 + x^431 + x^430 + x^429 + x^428 + x^427 + x^426 + x^425 + x^424 + x^423 + x^422 + x^421 + x^420 + x^419 + x^418 + x^417 + x^416 + x^415 + x^414 + x^413 + x^412 + x^411 + x^410 + x^409 + x^408 + x^407 + x^406 + x^405 + x^404 + x^403 + x^402 + x^401 + x^400 + x^399 + x^398 + x^397 + x^396 + x^395 + x^394 + x^393 + x^392 + x^391 + x^390 + x^389 + x^388 + x^387 + x^386 + x^385 + x^384 + x^383 + x^382 + x^381 + x^380 + x^379 + x^378 + x^377 + x^376 + x^375 + x^374 + x^373 + x^372 + x^371 + x^370 + x^369 + x^368 + x^367 + x^366 + x^365 + x^364 + x^363 + x^362 + x^361 + x^360 + x^359 + x^358 + x^357 + x^356 + x^355 + x^354 + x^353 + x^352 + x^351 + x^350 + x^349 + x^348 + x^347 + x^346 + x^345 + x^344 + x^343 + x^342 + x^341 + x^340 + x^339 + x^338 + x^337 + x^336 + x^335 + x^334 + x^333 + x^332 + x^331 + x^330 + x^329 + x^328 + x^327 + x^326 + x^325 + x^324 + x^323 + x^322 + x^321 + x^320 + x^319 + x^318 + x^317 + x^316 + x^315 + x^314 + x^313 + x^312 + x^311 + x^310 + x^309 + x^308 + x^307 + x^306 + x^305 + x^304 + x^303 + x^302 + x^301 + x^300 + x^299 + x^298 + x^297 + x^296 + x^295 + x^294 + x^293 + x^292 + x^291 + x^290 + x^289 + x^288 + x^287 + x^286 + x^285 + x^284 + x^283 + x^282 + x^281 + x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_458(x)=x^228 - x^227 + x^226 - x^225 + x^224 - x^223 + x^222 - x^221 + x^220 - x^219 + x^218 - x^217 + x^216 - x^215 + x^214 - x^213 + x^212 - x^211 + x^210 - x^209 + x^208 - x^207 + x^206 - x^205 + x^204 - x^203 + x^202 - x^201 + x^200 - x^199 + x^198 - x^197 + x^196 - x^195 + x^194 - x^193 + x^192 - x^191 + x^190 - x^189 + x^188 - x^187 + x^186 - x^185 + x^184 - x^183 + x^182 - x^181 + x^180 - x^179 + x^178 - x^177 + x^176 - x^175 + x^174 - x^173 + x^172 - x^171 + x^170 - x^169 + x^168 - x^167 + x^166 - x^165 + x^164 - x^163 + x^162 - x^161 + x^160 - x^159 + x^158 - x^157 + x^156 - x^155 + x^154 - x^153 + x^152 - x^151 + x^150 - x^149 + x^148 - x^147 + x^146 - x^145 + x^144 - x^143 + x^142 - x^141 + x^140 - x^139 + x^138 - x^137 + x^136 - x^135 + x^134 - x^133 + x^132 - x^131 + x^130 - x^129 + x^128 - x^127 + x^126 - x^125 + x^124 - x^123 + x^122 - x^121 + x^120 - x^119 + x^118 - x^117 + x^116 - x^115 + x^114 - x^113 + x^112 - x^111 + x^110 - x^109 + x^108 - x^107 + x^106 - x^105 + x^104 - x^103 + x^102 - x^101 + x^100 - x^99 + x^98 - x^97 + x^96 - x^95 + x^94 - x^93 + x^92 - x^91 + x^90 - x^89 + x^88 - x^87 + x^86 - x^85 + x^84 - x^83 + x^82 - x^81 + x^80 - x^79 + x^78 - x^77 + x^76 - x^75 + x^74 - x^73 + x^72 - x^71 + x^70 - x^69 + x^68 - x^67 + x^66 - x^65 + x^64 - x^63 + x^62 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_459(x)=x^288 - x^279 + x^261 - x^252 + x^234 - x^225 + x^207 - x^198 + x^180 - x^171 + x^153 - x^144 + x^135 - x^117 + x^108 - x^90 + x^81 - x^63 + x^54 - x^36 + x^27 - x^9 + 1
Phi_460(x)=x^176 + x^174 - x^166 - x^164 + x^156 + x^154 - x^146 - x^144 + x^136 + x^134 - x^130 - x^128 - x^126 - x^124 + x^120 + x^118 + x^116 + x^114 - x^110 - x^108 - x^106 - x^104 + x^100 + x^98 + x^96 + x^94 - x^90 - x^88 - x^86 + x^82 + x^80 + x^78 + x^76 - x^72 - x^70 - x^68 - x^66 + x^62 + x^60 + x^58 + x^56 - x^52 - x^50 - x^48 - x^46 + x^42 + x^40 - x^32 - x^30 + x^22 + x^20 - x^12 - x^10 + x^2 + 1
Phi_461(x)=x^460 + x^459 + x^458 + x^457 + x^456 + x^455 + x^454 + x^453 + x^452 + x^451 + x^450 + x^449 + x^448 + x^447 + x^446 + x^445 + x^444 + x^443 + x^442 + x^441 + x^440 + x^439 + x^438 + x^437 + x^436 + x^435 + x^434 + x^433 + x^432 + x^431 + x^430 + x^429 + x^428 + x^427 + x^426 + x^425 + x^424 + x^423 + x^422 + x^421 + x^420 + x^419 + x^418 + x^417 + x^416 + x^415 + x^414 + x^413 + x^412 + x^411 + x^410 + x^409 + x^408 + x^407 + x^406 + x^405 + x^404 + x^403 + x^402 + x^401 + x^400 + x^399 + x^398 + x^397 + x^396 + x^395 + x^394 + x^393 + x^392 + x^391 + x^390 + x^389 + x^388 + x^387 + x^386 + x^385 + x^384 + x^383 + x^382 + x^381 + x^380 + x^379 + x^378 + x^377 + x^376 + x^375 + x^374 + x^373 + x^372 + x^371 + x^370 + x^369 + x^368 + x^367 + x^366 + x^365 + x^364 + x^363 + x^362 + x^361 + x^360 + x^359 + x^358 + x^357 + x^356 + x^355 + x^354 + x^353 + x^352 + x^351 + x^350 + x^349 + x^348 + x^347 + x^346 + x^345 + x^344 + x^343 + x^342 + x^341 + x^340 + x^339 + x^338 + x^337 + x^336 + x^335 + x^334 + x^333 + x^332 + x^331 + x^330 + x^329 + x^328 + x^327 + x^326 + x^325 + x^324 + x^323 + x^322 + x^321 + x^320 + x^319 + x^318 + x^317 + x^316 + x^315 + x^314 + x^313 + x^312 + x^311 + x^310 + x^309 + x^308 + x^307 + x^306 + x^305 + x^304 + x^303 + x^302 + x^301 + x^300 + x^299 + x^298 + x^297 + x^296 + x^295 + x^294 + x^293 + x^292 + x^291 + x^290 + x^289 + x^288 + x^287 + x^286 + x^285 + x^284 + x^283 + x^282 + x^281 + x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_462(x)=x^120 - x^119 + x^118 + x^113 - x^112 + x^111 + x^109 - x^108 + x^107 + x^102 - x^101 + x^100 - x^99 + x^98 - x^97 - x^92 + x^91 - x^90 - x^88 - x^85 - x^81 - x^77 + x^75 - x^74 + x^71 - x^70 + x^68 + x^64 + x^60 + x^56 + x^52 - x^50 + x^49 - x^46 + x^45 - x^43 - x^39 - x^35 - x^32 - x^30 + x^29 - x^28 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 + x^13 - x^12 + x^11 + x^9 - x^8 + x^7 + x^2 - x + 1
Phi_463(x)=x^462 + x^461 + x^460 + x^459 + x^458 + x^457 + x^456 + x^455 + x^454 + x^453 + x^452 + x^451 + x^450 + x^449 + x^448 + x^447 + x^446 + x^445 + x^444 + x^443 + x^442 + x^441 + x^440 + x^439 + x^438 + x^437 + x^436 + x^435 + x^434 + x^433 + x^432 + x^431 + x^430 + x^429 + x^428 + x^427 + x^426 + x^425 + x^424 + x^423 + x^422 + x^421 + x^420 + x^419 + x^418 + x^417 + x^416 + x^415 + x^414 + x^413 + x^412 + x^411 + x^410 + x^409 + x^408 + x^407 + x^406 + x^405 + x^404 + x^403 + x^402 + x^401 + x^400 + x^399 + x^398 + x^397 + x^396 + x^395 + x^394 + x^393 + x^392 + x^391 + x^390 + x^389 + x^388 + x^387 + x^386 + x^385 + x^384 + x^383 + x^382 + x^381 + x^380 + x^379 + x^378 + x^377 + x^376 + x^375 + x^374 + x^373 + x^372 + x^371 + x^370 + x^369 + x^368 + x^367 + x^366 + x^365 + x^364 + x^363 + x^362 + x^361 + x^360 + x^359 + x^358 + x^357 + x^356 + x^355 + x^354 + x^353 + x^352 + x^351 + x^350 + x^349 + x^348 + x^347 + x^346 + x^345 + x^344 + x^343 + x^342 + x^341 + x^340 + x^339 + x^338 + x^337 + x^336 + x^335 + x^334 + x^333 + x^332 + x^331 + x^330 + x^329 + x^328 + x^327 + x^326 + x^325 + x^324 + x^323 + x^322 + x^321 + x^320 + x^319 + x^318 + x^317 + x^316 + x^315 + x^314 + x^313 + x^312 + x^311 + x^310 + x^309 + x^308 + x^307 + x^306 + x^305 + x^304 + x^303 + x^302 + x^301 + x^300 + x^299 + x^298 + x^297 + x^296 + x^295 + x^294 + x^293 + x^292 + x^291 + x^290 + x^289 + x^288 + x^287 + x^286 + x^285 + x^284 + x^283 + x^282 + x^281 + x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_464(x)=x^224 - x^216 + x^208 - x^200 + x^192 - x^184 + x^176 - x^168 + x^160 - x^152 + x^144 - x^136 + x^128 - x^120 + x^112 - x^104 + x^96 - x^88 + x^80 - x^72 + x^64 - x^56 + x^48 - x^40 + x^32 - x^24 + x^16 - x^8 + 1
Phi_465(x)=x^240 + x^239 + x^238 - x^235 - x^234 - x^233 + x^225 + x^224 + x^223 - x^220 - x^219 - x^218 + x^210 - x^207 - x^205 + x^202 + x^195 - x^192 - x^190 + x^187 + x^180 - x^177 - x^175 + x^172 + x^165 - x^162 - x^160 + x^157 + x^150 + x^146 - x^141 - x^140 + x^135 + x^131 - x^126 - x^125 + x^120 - x^115 - x^114 + x^109 + x^105 - x^100 - x^99 + x^94 + x^90 + x^83 - x^80 - x^78 + x^75 + x^68 - x^65 - x^63 + x^60 + x^53 - x^50 - x^48 + x^45 + x^38 - x^35 - x^33 + x^30 - x^22 - x^21 - x^20 + x^17 + x^16 + x^15 - x^7 - x^6 - x^5 + x^2 + x + 1
Phi_466(x)=x^232 - x^231 + x^230 - x^229 + x^228 - x^227 + x^226 - x^225 + x^224 - x^223 + x^222 - x^221 + x^220 - x^219 + x^218 - x^217 + x^216 - x^215 + x^214 - x^213 + x^212 - x^211 + x^210 - x^209 + x^208 - x^207 + x^206 - x^205 + x^204 - x^203 + x^202 - x^201 + x^200 - x^199 + x^198 - x^197 + x^196 - x^195 + x^194 - x^193 + x^192 - x^191 + x^190 - x^189 + x^188 - x^187 + x^186 - x^185 + x^184 - x^183 + x^182 - x^181 + x^180 - x^179 + x^178 - x^177 + x^176 - x^175 + x^174 - x^173 + x^172 - x^171 + x^170 - x^169 + x^168 - x^167 + x^166 - x^165 + x^164 - x^163 + x^162 - x^161 + x^160 - x^159 + x^158 - x^157 + x^156 - x^155 + x^154 - x^153 + x^152 - x^151 + x^150 - x^149 + x^148 - x^147 + x^146 - x^145 + x^144 - x^143 + x^142 - x^141 + x^140 - x^139 + x^138 - x^137 + x^136 - x^135 + x^134 - x^133 + x^132 - x^131 + x^130 - x^129 + x^128 - x^127 + x^126 - x^125 + x^124 - x^123 + x^122 - x^121 + x^120 - x^119 + x^118 - x^117 + x^116 - x^115 + x^114 - x^113 + x^112 - x^111 + x^110 - x^109 + x^108 - x^107 + x^106 - x^105 + x^104 - x^103 + x^102 - x^101 + x^100 - x^99 + x^98 - x^97 + x^96 - x^95 + x^94 - x^93 + x^92 - x^91 + x^90 - x^89 + x^88 - x^87 + x^86 - x^85 + x^84 - x^83 + x^82 - x^81 + x^80 - x^79 + x^78 - x^77 + x^76 - x^75 + x^74 - x^73 + x^72 - x^71 + x^70 - x^69 + x^68 - x^67 + x^66 - x^65 + x^64 - x^63 + x^62 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_467(x)=x^466 + x^465 + x^464 + x^463 + x^462 + x^461 + x^460 + x^459 + x^458 + x^457 + x^456 + x^455 + x^454 + x^453 + x^452 + x^451 + x^450 + x^449 + x^448 + x^447 + x^446 + x^445 + x^444 + x^443 + x^442 + x^441 + x^440 + x^439 + x^438 + x^437 + x^436 + x^435 + x^434 + x^433 + x^432 + x^431 + x^430 + x^429 + x^428 + x^427 + x^426 + x^425 + x^424 + x^423 + x^422 + x^421 + x^420 + x^419 + x^418 + x^417 + x^416 + x^415 + x^414 + x^413 + x^412 + x^411 + x^410 + x^409 + x^408 + x^407 + x^406 + x^405 + x^404 + x^403 + x^402 + x^401 + x^400 + x^399 + x^398 + x^397 + x^396 + x^395 + x^394 + x^393 + x^392 + x^391 + x^390 + x^389 + x^388 + x^387 + x^386 + x^385 + x^384 + x^383 + x^382 + x^381 + x^380 + x^379 + x^378 + x^377 + x^376 + x^375 + x^374 + x^373 + x^372 + x^371 + x^370 + x^369 + x^368 + x^367 + x^366 + x^365 + x^364 + x^363 + x^362 + x^361 + x^360 + x^359 + x^358 + x^357 + x^356 + x^355 + x^354 + x^353 + x^352 + x^351 + x^350 + x^349 + x^348 + x^347 + x^346 + x^345 + x^344 + x^343 + x^342 + x^341 + x^340 + x^339 + x^338 + x^337 + x^336 + x^335 + x^334 + x^333 + x^332 + x^331 + x^330 + x^329 + x^328 + x^327 + x^326 + x^325 + x^324 + x^323 + x^322 + x^321 + x^320 + x^319 + x^318 + x^317 + x^316 + x^315 + x^314 + x^313 + x^312 + x^311 + x^310 + x^309 + x^308 + x^307 + x^306 + x^305 + x^304 + x^303 + x^302 + x^301 + x^300 + x^299 + x^298 + x^297 + x^296 + x^295 + x^294 + x^293 + x^292 + x^291 + x^290 + x^289 + x^288 + x^287 + x^286 + x^285 + x^284 + x^283 + x^282 + x^281 + x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_468(x)=x^144 + x^138 - x^126 - x^120 + x^108 + x^102 - x^90 - x^84 + x^72 - x^60 - x^54 + x^42 + x^36 - x^24 - x^18 + x^6 + 1
Phi_469(x)=x^396 - x^395 + x^389 - x^388 + x^382 - x^381 + x^375 - x^374 + x^368 - x^367 + x^361 - x^360 + x^354 - x^353 + x^347 - x^346 + x^340 - x^339 + x^333 - x^332 + x^329 - x^328 + x^326 - x^325 + x^322 - x^321 + x^319 - x^318 + x^315 - x^314 + x^312 - x^311 + x^308 - x^307 + x^305 - x^304 + x^301 - x^300 + x^298 - x^297 + x^294 - x^293 + x^291 - x^290 + x^287 - x^286 + x^284 - x^283 + x^280 - x^279 + x^277 - x^276 + x^273 - x^272 + x^270 - x^269 + x^266 - x^265 + x^263 - x^261 + x^259 - x^258 + x^256 - x^254 + x^252 - x^251 + x^249 - x^247 + x^245 - x^244 + x^242 - x^240 + x^238 - x^237 + x^235 - x^233 + x^231 - x^230 + x^228 - x^226 + x^224 - x^223 + x^221 - x^219 + x^217 - x^216 + x^214 - x^212 + x^210 - x^209 + x^207 - x^205 + x^203 - x^202 + x^200 - x^198 + x^196 - x^194 + x^193 - x^191 + x^189 - x^187 + x^186 - x^184 + x^182 - x^180 + x^179 - x^177 + x^175 - x^173 + x^172 - x^170 + x^168 - x^166 + x^165 - x^163 + x^161 - x^159 + x^158 - x^156 + x^154 - x^152 + x^151 - x^149 + x^147 - x^145 + x^144 - x^142 + x^140 - x^138 + x^137 - x^135 + x^133 - x^131 + x^130 - x^127 + x^126 - x^124 + x^123 - x^120 + x^119 - x^117 + x^116 - x^113 + x^112 - x^110 + x^109 - x^106 + x^105 - x^103 + x^102 - x^99 + x^98 - x^96 + x^95 - x^92 + x^91 - x^89 + x^88 - x^85 + x^84 - x^82 + x^81 - x^78 + x^77 - x^75 + x^74 - x^71 + x^70 - x^68 + x^67 - x^64 + x^63 - x^57 + x^56 - x^50 + x^49 - x^43 + x^42 - x^36 + x^35 - x^29 + x^28 - x^22 + x^21 - x^15 + x^14 - x^8 + x^7 - x + 1
Phi_470(x)=x^184 + x^183 - x^179 - x^178 + x^174 + x^173 - x^169 - x^168 + x^164 + x^163 - x^159 - x^158 + x^154 + x^153 - x^149 - x^148 + x^144 + x^143 - x^139 - x^138 - x^137 - x^136 + x^134 + x^133 + x^132 + x^131 - x^129 - x^128 - x^127 - x^126 + x^124 + x^123 + x^122 + x^121 - x^119 - x^118 - x^117 - x^116 + x^114 + x^113 + x^112 + x^111 - x^109 - x^108 - x^107 - x^106 + x^104 + x^103 + x^102 + x^101 - x^99 - x^98 - x^97 - x^96 + x^94 + x^93 + x^92 + x^91 + x^90 - x^88 - x^87 - x^86 - x^85 + x^83 + x^82 + x^81 + x^80 - x^78 - x^77 - x^76 - x^75 + x^73 + x^72 + x^71 + x^70 - x^68 - x^67 - x^66 - x^65 + x^63 + x^62 + x^61 + x^60 - x^58 - x^57 - x^56 - x^55 + x^53 + x^52 + x^51 + x^50 - x^48 - x^47 - x^46 - x^45 + x^41 + x^40 - x^36 - x^35 + x^31 + x^30 - x^26 - x^25 + x^21 + x^20 - x^16 - x^15 + x^11 + x^10 - x^6 - x^5 + x + 1
Phi_471(x)=x^312 - x^311 + x^309 - x^308 + x^306 - x^305 + x^303 - x^302 + x^300 - x^299 + x^297 - x^296 + x^294 - x^293 + x^291 - x^290 + x^288 - x^287 + x^285 - x^284 + x^282 - x^281 + x^279 - x^278 + x^276 - x^275 + x^273 - x^272 + x^270 - x^269 + x^267 - x^266 + x^264 - x^263 + x^261 - x^260 + x^258 - x^257 + x^255 - x^254 + x^252 - x^251 + x^249 - x^248 + x^246 - x^245 + x^243 - x^242 + x^240 - x^239 + x^237 - x^236 + x^234 - x^233 + x^231 - x^230 + x^228 - x^227 + x^225 - x^224 + x^222 - x^221 + x^219 - x^218 + x^216 - x^215 + x^213 - x^212 + x^210 - x^209 + x^207 - x^206 + x^204 - x^203 + x^201 - x^200 + x^198 - x^197 + x^195 - x^194 + x^192 - x^191 + x^189 - x^188 + x^186 - x^185 + x^183 - x^182 + x^180 - x^179 + x^177 - x^176 + x^174 - x^173 + x^171 - x^170 + x^168 - x^167 + x^165 - x^164 + x^162 - x^161 + x^159 - x^158 + x^156 - x^154 + x^153 - x^151 + x^150 - x^148 + x^147 - x^145 + x^144 - x^142 + x^141 - x^139 + x^138 - x^136 + x^135 - x^133 + x^132 - x^130 + x^129 - x^127 + x^126 - x^124 + x^123 - x^121 + x^120 - x^118 + x^117 - x^115 + x^114 - x^112 + x^111 - x^109 + x^108 - x^106 + x^105 - x^103 + x^102 - x^100 + x^99 - x^97 + x^96 - x^94 + x^93 - x^91 + x^90 - x^88 + x^87 - x^85 + x^84 - x^82 + x^81 - x^79 + x^78 - x^76 + x^75 - x^73 + x^72 - x^70 + x^69 - x^67 + x^66 - x^64 + x^63 - x^61 + x^60 - x^58 + x^57 - x^55 + x^54 - x^52 + x^51 - x^49 + x^48 - x^46 + x^45 - x^43 + x^42 - x^40 + x^39 - x^37 + x^36 - x^34 + x^33 - x^31 + x^30 - x^28 + x^27 - x^25 + x^24 - x^22 + x^21 - x^19 + x^18 - x^16 + x^15 - x^13 + x^12 - x^10 + x^9 - x^7 + x^6 - x^4 + x^3 - x + 1
Phi_472(x)=x^232 - x^228 + x^224 - x^220 + x^216 - x^212 + x^208 - x^204 + x^200 - x^196 + x^192 - x^188 + x^184 - x^180 + x^176 - x^172 + x^168 - x^164 + x^160 - x^156 + x^152 - x^148 + x^144 - x^140 + x^136 - x^132 + x^128 - x^124 + x^120 - x^116 + x^112 - x^108 + x^104 - x^100 + x^96 - x^92 + x^88 - x^84 + x^80 - x^76 + x^72 - x^68 + x^64 - x^60 + x^56 - x^52 + x^48 - x^44 + x^40 - x^36 + x^32 - x^28 + x^24 - x^20 + x^16 - x^12 + x^8 - x^4 + 1
Phi_473(x)=x^420 - x^419 + x^409 - x^408 + x^398 - x^397 + x^387 - x^386 + x^377 - x^375 + x^366 - x^364 + x^355 - x^353 + x^344 - x^342 + x^334 - x^331 + x^323 - x^320 + x^312 - x^309 + x^301 - x^298 + x^291 - x^287 + x^280 - x^276 + x^269 - x^265 + x^258 - x^254 + x^248 - x^243 + x^237 - x^232 + x^226 - x^221 + x^215 - x^210 + x^205 - x^199 + x^194 - x^188 + x^183 - x^177 + x^172 - x^166 + x^162 - x^155 + x^151 - x^144 + x^140 - x^133 + x^129 - x^122 + x^119 - x^111 + x^108 - x^100 + x^97 - x^89 + x^86 - x^78 + x^76 - x^67 + x^65 - x^56 + x^54 - x^45 + x^43 - x^34 + x^33 - x^23 + x^22 - x^12 + x^11 - x + 1
Phi_474(x)=x^156 + x^155 - x^153 - x^152 + x^150 + x^149 - x^147 - x^146 + x^144 + x^143 - x^141 - x^140 + x^138 + x^137 - x^135 - x^134 + x^132 + x^131 - x^129 - x^128 + x^126 + x^125 - x^123 - x^122 + x^120 + x^119 - x^117 - x^116 + x^114 + x^113 - x^111 - x^110 + x^108 + x^107 - x^105 - x^104 + x^102 + x^101 - x^99 - x^98 + x^96 + x^95 - x^93 - x^92 + x^90 + x^89 - x^87 - x^86 + x^84 + x^83 - x^81 - x^80 + x^78 - x^76 - x^75 + x^73 + x^72 - x^70 - x^69 + x^67 + x^66 - x^64 - x^63 + x^61 + x^60 - x^58 - x^57 + x^55 + x^54 - x^52 - x^51 + x^49 + x^48 - x^46 - x^45 + x^43 + x^42 - x^40 - x^39 + x^37 + x^36 - x^34 - x^33 + x^31 + x^30 - x^28 - x^27 + x^25 + x^24 - x^22 - x^21 + x^19 + x^18 - x^16 - x^15 + x^13 + x^12 - x^10 - x^9 + x^7 + x^6 - x^4 - x^3 + x + 1
Phi_475(x)=x^360 - x^355 + x^335 - x^330 + x^310 - x^305 + x^285 - x^280 + x^265 - x^255 + x^240 - x^230 + x^215 - x^205 + x^190 - x^180 + x^170 - x^155 + x^145 - x^130 + x^120 - x^105 + x^95 - x^80 + x^75 - x^55 + x^50 - x^30 + x^25 - x^5 + 1
Phi_476(x)=x^192 + x^190 - x^178 - x^176 + x^164 + x^162 - x^158 - x^156 - x^150 - x^148 + x^144 + x^142 + x^136 + x^134 - x^130 - x^128 + x^124 - x^120 + x^116 + x^114 - x^110 + x^106 - x^102 - x^100 + x^96 - x^92 - x^90 + x^86 - x^82 + x^78 + x^76 - x^72 + x^68 - x^64 - x^62 + x^58 + x^56 + x^50 + x^48 - x^44 - x^42 - x^36 - x^34 + x^30 + x^28 - x^16 - x^14 + x^2 + 1
Phi_477(x)=x^312 - x^309 + x^303 - x^300 + x^294 - x^291 + x^285 - x^282 + x^276 - x^273 + x^267 - x^264 + x^258 - x^255 + x^249 - x^246 + x^240 - x^237 + x^231 - x^228 + x^222 - x^219 + x^213 - x^210 + x^204 - x^201 + x^195 - x^192 + x^186 - x^183 + x^177 - x^174 + x^168 - x^165 + x^159 - x^156 + x^153 - x^147 + x^144 - x^138 + x^135 - x^129 + x^126 - x^120 + x^117 - x^111 + x^108 - x^102 + x^99 - x^93 + x^90 - x^84 + x^81 - x^75 + x^72 - x^66 + x^63 - x^57 + x^54 - x^48 + x^45 - x^39 + x^36 - x^30 + x^27 - x^21 + x^18 - x^12 + x^9 - x^3 + 1
Phi_478(x)=x^238 - x^237 + x^236 - x^235 + x^234 - x^233 + x^232 - x^231 + x^230 - x^229 + x^228 - x^227 + x^226 - x^225 + x^224 - x^223 + x^222 - x^221 + x^220 - x^219 + x^218 - x^217 + x^216 - x^215 + x^214 - x^213 + x^212 - x^211 + x^210 - x^209 + x^208 - x^207 + x^206 - x^205 + x^204 - x^203 + x^202 - x^201 + x^200 - x^199 + x^198 - x^197 + x^196 - x^195 + x^194 - x^193 + x^192 - x^191 + x^190 - x^189 + x^188 - x^187 + x^186 - x^185 + x^184 - x^183 + x^182 - x^181 + x^180 - x^179 + x^178 - x^177 + x^176 - x^175 + x^174 - x^173 + x^172 - x^171 + x^170 - x^169 + x^168 - x^167 + x^166 - x^165 + x^164 - x^163 + x^162 - x^161 + x^160 - x^159 + x^158 - x^157 + x^156 - x^155 + x^154 - x^153 + x^152 - x^151 + x^150 - x^149 + x^148 - x^147 + x^146 - x^145 + x^144 - x^143 + x^142 - x^141 + x^140 - x^139 + x^138 - x^137 + x^136 - x^135 + x^134 - x^133 + x^132 - x^131 + x^130 - x^129 + x^128 - x^127 + x^126 - x^125 + x^124 - x^123 + x^122 - x^121 + x^120 - x^119 + x^118 - x^117 + x^116 - x^115 + x^114 - x^113 + x^112 - x^111 + x^110 - x^109 + x^108 - x^107 + x^106 - x^105 + x^104 - x^103 + x^102 - x^101 + x^100 - x^99 + x^98 - x^97 + x^96 - x^95 + x^94 - x^93 + x^92 - x^91 + x^90 - x^89 + x^88 - x^87 + x^86 - x^85 + x^84 - x^83 + x^82 - x^81 + x^80 - x^79 + x^78 - x^77 + x^76 - x^75 + x^74 - x^73 + x^72 - x^71 + x^70 - x^69 + x^68 - x^67 + x^66 - x^65 + x^64 - x^63 + x^62 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_479(x)=x^478 + x^477 + x^476 + x^475 + x^474 + x^473 + x^472 + x^471 + x^470 + x^469 + x^468 + x^467 + x^466 + x^465 + x^464 + x^463 + x^462 + x^461 + x^460 + x^459 + x^458 + x^457 + x^456 + x^455 + x^454 + x^453 + x^452 + x^451 + x^450 + x^449 + x^448 + x^447 + x^446 + x^445 + x^444 + x^443 + x^442 + x^441 + x^440 + x^439 + x^438 + x^437 + x^436 + x^435 + x^434 + x^433 + x^432 + x^431 + x^430 + x^429 + x^428 + x^427 + x^426 + x^425 + x^424 + x^423 + x^422 + x^421 + x^420 + x^419 + x^418 + x^417 + x^416 + x^415 + x^414 + x^413 + x^412 + x^411 + x^410 + x^409 + x^408 + x^407 + x^406 + x^405 + x^404 + x^403 + x^402 + x^401 + x^400 + x^399 + x^398 + x^397 + x^396 + x^395 + x^394 + x^393 + x^392 + x^391 + x^390 + x^389 + x^388 + x^387 + x^386 + x^385 + x^384 + x^383 + x^382 + x^381 + x^380 + x^379 + x^378 + x^377 + x^376 + x^375 + x^374 + x^373 + x^372 + x^371 + x^370 + x^369 + x^368 + x^367 + x^366 + x^365 + x^364 + x^363 + x^362 + x^361 + x^360 + x^359 + x^358 + x^357 + x^356 + x^355 + x^354 + x^353 + x^352 + x^351 + x^350 + x^349 + x^348 + x^347 + x^346 + x^345 + x^344 + x^343 + x^342 + x^341 + x^340 + x^339 + x^338 + x^337 + x^336 + x^335 + x^334 + x^333 + x^332 + x^331 + x^330 + x^329 + x^328 + x^327 + x^326 + x^325 + x^324 + x^323 + x^322 + x^321 + x^320 + x^319 + x^318 + x^317 + x^316 + x^315 + x^314 + x^313 + x^312 + x^311 + x^310 + x^309 + x^308 + x^307 + x^306 + x^305 + x^304 + x^303 + x^302 + x^301 + x^300 + x^299 + x^298 + x^297 + x^296 + x^295 + x^294 + x^293 + x^292 + x^291 + x^290 + x^289 + x^288 + x^287 + x^286 + x^285 + x^284 + x^283 + x^282 + x^281 + x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_480(x)=x^128 + x^112 - x^80 - x^64 - x^48 + x^16 + 1
Phi_481(x)=x^432 - x^431 + x^419 - x^418 + x^406 - x^405 + x^395 - x^394 + x^393 - x^392 + x^382 - x^381 + x^380 - x^379 + x^369 - x^368 + x^367 - x^366 + x^358 - x^357 + x^356 - x^355 + x^354 - x^353 + x^345 - x^344 + x^343 - x^342 + x^341 - x^340 + x^332 - x^331 + x^330 - x^329 + x^328 - x^327 + x^321 - x^320 + x^319 - x^318 + x^317 - x^316 + x^315 - x^314 + x^308 - x^307 + x^306 - x^305 + x^304 - x^303 + x^302 - x^301 + x^295 - x^294 + x^293 - x^292 + x^291 - x^290 + x^289 - x^288 + x^284 - x^283 + x^282 - x^281 + x^280 - x^279 + x^278 - x^277 + x^276 - x^275 + x^271 - x^270 + x^269 - x^268 + x^267 - x^266 + x^265 - x^264 + x^263 - x^262 + x^258 - x^257 + x^256 - x^255 + x^254 - x^253 + x^252 - x^251 + x^250 - x^249 + x^247 - x^246 + x^245 - x^244 + x^243 - x^242 + x^241 - x^240 + x^239 - x^238 + x^237 - x^236 + x^234 - x^233 + x^232 - x^231 + x^230 - x^229 + x^228 - x^227 + x^226 - x^225 + x^224 - x^223 + x^221 - x^220 + x^219 - x^218 + x^217 - x^216 + x^215 - x^214 + x^213 - x^212 + x^211 - x^209 + x^208 - x^207 + x^206 - x^205 + x^204 - x^203 + x^202 - x^201 + x^200 - x^199 + x^198 - x^196 + x^195 - x^194 + x^193 - x^192 + x^191 - x^190 + x^189 - x^188 + x^187 - x^186 + x^185 - x^183 + x^182 - x^181 + x^180 - x^179 + x^178 - x^177 + x^176 - x^175 + x^174 - x^170 + x^169 - x^168 + x^167 - x^166 + x^165 - x^164 + x^163 - x^162 + x^161 - x^157 + x^156 - x^155 + x^154 - x^153 + x^152 - x^151 + x^150 - x^149 + x^148 - x^144 + x^143 - x^142 + x^141 - x^140 + x^139 - x^138 + x^137 - x^131 + x^130 - x^129 + x^128 - x^127 + x^126 - x^125 + x^124 - x^118 + x^117 - x^116 + x^115 - x^114 + x^113 - x^112 + x^111 - x^105 + x^104 - x^103 + x^102 - x^101 + x^100 - x^92 + x^91 - x^90 + x^89 - x^88 + x^87 - x^79 + x^78 - x^77 + x^76 - x^75 + x^74 - x^66 + x^65 - x^64 + x^63 - x^53 + x^52 - x^51 + x^50 - x^40 + x^39 - x^38 + x^37 - x^27 + x^26 - x^14 + x^13 - x + 1
Phi_482(x)=x^240 - x^239 + x^238 - x^237 + x^236 - x^235 + x^234 - x^233 + x^232 - x^231 + x^230 - x^229 + x^228 - x^227 + x^226 - x^225 + x^224 - x^223 + x^222 - x^221 + x^220 - x^219 + x^218 - x^217 + x^216 - x^215 + x^214 - x^213 + x^212 - x^211 + x^210 - x^209 + x^208 - x^207 + x^206 - x^205 + x^204 - x^203 + x^202 - x^201 + x^200 - x^199 + x^198 - x^197 + x^196 - x^195 + x^194 - x^193 + x^192 - x^191 + x^190 - x^189 + x^188 - x^187 + x^186 - x^185 + x^184 - x^183 + x^182 - x^181 + x^180 - x^179 + x^178 - x^177 + x^176 - x^175 + x^174 - x^173 + x^172 - x^171 + x^170 - x^169 + x^168 - x^167 + x^166 - x^165 + x^164 - x^163 + x^162 - x^161 + x^160 - x^159 + x^158 - x^157 + x^156 - x^155 + x^154 - x^153 + x^152 - x^151 + x^150 - x^149 + x^148 - x^147 + x^146 - x^145 + x^144 - x^143 + x^142 - x^141 + x^140 - x^139 + x^138 - x^137 + x^136 - x^135 + x^134 - x^133 + x^132 - x^131 + x^130 - x^129 + x^128 - x^127 + x^126 - x^125 + x^124 - x^123 + x^122 - x^121 + x^120 - x^119 + x^118 - x^117 + x^116 - x^115 + x^114 - x^113 + x^112 - x^111 + x^110 - x^109 + x^108 - x^107 + x^106 - x^105 + x^104 - x^103 + x^102 - x^101 + x^100 - x^99 + x^98 - x^97 + x^96 - x^95 + x^94 - x^93 + x^92 - x^91 + x^90 - x^89 + x^88 - x^87 + x^86 - x^85 + x^84 - x^83 + x^82 - x^81 + x^80 - x^79 + x^78 - x^77 + x^76 - x^75 + x^74 - x^73 + x^72 - x^71 + x^70 - x^69 + x^68 - x^67 + x^66 - x^65 + x^64 - x^63 + x^62 - x^61 + x^60 - x^59 + x^58 - x^57 + x^56 - x^55 + x^54 - x^53 + x^52 - x^51 + x^50 - x^49 + x^48 - x^47 + x^46 - x^45 + x^44 - x^43 + x^42 - x^41 + x^40 - x^39 + x^38 - x^37 + x^36 - x^35 + x^34 - x^33 + x^32 - x^31 + x^30 - x^29 + x^28 - x^27 + x^26 - x^25 + x^24 - x^23 + x^22 - x^21 + x^20 - x^19 + x^18 - x^17 + x^16 - x^15 + x^14 - x^13 + x^12 - x^11 + x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1
Phi_483(x)=x^264 + x^263 + x^262 - x^257 - x^256 - x^255 + x^243 + x^242 - x^240 - x^239 - x^236 - x^235 + x^233 + x^232 + x^222 + x^221 - x^219 - x^218 - x^215 - x^214 + x^212 + x^211 + x^201 + x^200 - x^198 - x^197 + x^195 + x^191 + x^190 - x^188 - x^187 - x^186 + x^180 + x^179 - x^177 - x^176 + x^174 - x^172 - x^171 + x^169 - x^167 - x^166 + x^164 + x^163 + x^159 + x^158 - x^156 - x^155 + x^153 - x^151 - x^150 + x^148 - x^146 - x^145 + x^143 + x^142 + x^138 + x^137 - x^135 - x^134 + x^132 - x^130 - x^129 + x^127 + x^126 + x^122 + x^121 - x^119 - x^118 + x^116 - x^114 - x^113 + x^111 - x^109 - x^108 + x^106 + x^105 + x^101 + x^100 - x^98 - x^97 + x^95 - x^93 - x^92 + x^90 - x^88 - x^87 + x^85 + x^84 - x^78 - x^77 - x^76 + x^74 + x^73 + x^69 - x^67 - x^66 + x^64 + x^63 + x^53 + x^52 - x^50 - x^49 - x^46 - x^45 + x^43 + x^42 + x^32 + x^31 - x^29 - x^28 - x^25 - x^24 + x^22 + x^21 - x^9 - x^8 - x^7 + x^2 + x + 1
Phi_484(x)=x^220 - x^198 + x^176 - x^154 + x^132 - x^110 + x^88 - x^66 + x^44 - x^22 + 1
Phi_485(x)=x^384 - x^383 + x^379 - x^378 + x^374 - x^373 + x^369 - x^368 + x^364 - x^363 + x^359 - x^358 + x^354 - x^353 + x^349 - x^348 + x^344 - x^343 + x^339 - x^338 + x^334 - x^333 + x^329 - x^328 + x^324 - x^323 + x^319 - x^318 + x^314 - x^313 + x^309 - x^308 + x^304 - x^303 + x^299 - x^298 + x^294 - x^293 + x^289 - x^288 + x^287 - x^286 + x^284 - x^283 + x^282 - x^281 + x^279 - x^278 + x^277 - x^276 + x^274 - x^273 + x^272 - x^271 + x^269 - x^268 + x^267 - x^266 + x^264 - x^263 + x^262 - x^261 + x^259 - x^258 + x^257 - x^256 + x^254 - x^253 + x^252 - x^251 + x^249 - x^248 + x^247 - x^246 + x^244 - x^243 + x^242 - x^241 + x^239 - x^238 + x^237 - x^236 + x^234 - x^233 + x^232 - x^231 + x^229 - x^228 + x^227 - x^226 + x^224 - x^223 + x^222 - x^221 + x^219 - x^218 + x^217 - x^216 + x^214 - x^213 + x^212 - x^211 + x^209 - x^208 + x^207 - x^206 + x^204 - x^203 + x^202 - x^201 + x^199 - x^198 + x^197 - x^196 + x^194 - x^193 + x^192 - x^191 + x^190 - x^188 + x^187 - x^186 + x^185 - x^183 + x^182 - x^181 + x^180 - x^178 + x^177 - x^176 + x^175 - x^173 + x^172 - x^171 + x^170 - x^168 + x^167 - x^166 + x^165 - x^163 + x^162 - x^161 + x^160 - x^158 + x^157 - x^156 + x^155 - x^153 + x^152 - x^151 + x^150 - x^148 + x^147 - x^146 + x^145 - x^143 + x^142 - x^141 + x^140 - x^138 + x^137 - x^136 + x^135 - x^133 + x^132 - x^131 + x^130 - x^128 + x^127 - x^126 + x^125 - x^123 + x^122 - x^121 + x^120 - x^118 + x^117 - x^116 + x^115 - x^113 + x^112 - x^111 + x^110 - x^108 + x^107 - x^106 + x^105 - x^103 + x^102 - x^101 + x^100 - x^98 + x^97 - x^96 + x^95 - x^91 + x^90 - x^86 + x^85 - x^81 + x^80 - x^76 + x^75 - x^71 + x^70 - x^66 + x^65 - x^61 + x^60 - x^56 + x^55 - x^51 + x^50 - x^46 + x^45 - x^41 + x^40 - x^36 + x^35 - x^31 + x^30 - x^26 + x^25 - x^21 + x^20 - x^16 + x^15 - x^11 + x^10 - x^6 + x^5 - x + 1
Phi_486(x)=x^162 - x^81 + 1
Phi_487(x)=x^486 + x^485 + x^484 + x^483 + x^482 + x^481 + x^480 + x^479 + x^478 + x^477 + x^476 + x^475 + x^474 + x^473 + x^472 + x^471 + x^470 + x^469 + x^468 + x^467 + x^466 + x^465 + x^464 + x^463 + x^462 + x^461 + x^460 + x^459 + x^458 + x^457 + x^456 + x^455 + x^454 + x^453 + x^452 + x^451 + x^450 + x^449 + x^448 + x^447 + x^446 + x^445 + x^444 + x^443 + x^442 + x^441 + x^440 + x^439 + x^438 + x^437 + x^436 + x^435 + x^434 + x^433 + x^432 + x^431 + x^430 + x^429 + x^428 + x^427 + x^426 + x^425 + x^424 + x^423 + x^422 + x^421 + x^420 + x^419 + x^418 + x^417 + x^416 + x^415 + x^414 + x^413 + x^412 + x^411 + x^410 + x^409 + x^408 + x^407 + x^406 + x^405 + x^404 + x^403 + x^402 + x^401 + x^400 + x^399 + x^398 + x^397 + x^396 + x^395 + x^394 + x^393 + x^392 + x^391 + x^390 + x^389 + x^388 + x^387 + x^386 + x^385 + x^384 + x^383 + x^382 + x^381 + x^380 + x^379 + x^378 + x^377 + x^376 + x^375 + x^374 + x^373 + x^372 + x^371 + x^370 + x^369 + x^368 + x^367 + x^366 + x^365 + x^364 + x^363 + x^362 + x^361 + x^360 + x^359 + x^358 + x^357 + x^356 + x^355 + x^354 + x^353 + x^352 + x^351 + x^350 + x^349 + x^348 + x^347 + x^346 + x^345 + x^344 + x^343 + x^342 + x^341 + x^340 + x^339 + x^338 + x^337 + x^336 + x^335 + x^334 + x^333 + x^332 + x^331 + x^330 + x^329 + x^328 + x^327 + x^326 + x^325 + x^324 + x^323 + x^322 + x^321 + x^320 + x^319 + x^318 + x^317 + x^316 + x^315 + x^314 + x^313 + x^312 + x^311 + x^310 + x^309 + x^308 + x^307 + x^306 + x^305 + x^304 + x^303 + x^302 + x^301 + x^300 + x^299 + x^298 + x^297 + x^296 + x^295 + x^294 + x^293 + x^292 + x^291 + x^290 + x^289 + x^288 + x^287 + x^286 + x^285 + x^284 + x^283 + x^282 + x^281 + x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_488(x)=x^240 - x^236 + x^232 - x^228 + x^224 - x^220 + x^216 - x^212 + x^208 - x^204 + x^200 - x^196 + x^192 - x^188 + x^184 - x^180 + x^176 - x^172 + x^168 - x^164 + x^160 - x^156 + x^152 - x^148 + x^144 - x^140 + x^136 - x^132 + x^128 - x^124 + x^120 - x^116 + x^112 - x^108 + x^104 - x^100 + x^96 - x^92 + x^88 - x^84 + x^80 - x^76 + x^72 - x^68 + x^64 - x^60 + x^56 - x^52 + x^48 - x^44 + x^40 - x^36 + x^32 - x^28 + x^24 - x^20 + x^16 - x^12 + x^8 - x^4 + 1
Phi_489(x)=x^324 - x^323 + x^321 - x^320 + x^318 - x^317 + x^315 - x^314 + x^312 - x^311 + x^309 - x^308 + x^306 - x^305 + x^303 - x^302 + x^300 - x^299 + x^297 - x^296 + x^294 - x^293 + x^291 - x^290 + x^288 - x^287 + x^285 - x^284 + x^282 - x^281 + x^279 - x^278 + x^276 - x^275 + x^273 - x^272 + x^270 - x^269 + x^267 - x^266 + x^264 - x^263 + x^261 - x^260 + x^258 - x^257 + x^255 - x^254 + x^252 - x^251 + x^249 - x^248 + x^246 - x^245 + x^243 - x^242 + x^240 - x^239 + x^237 - x^236 + x^234 - x^233 + x^231 - x^230 + x^228 - x^227 + x^225 - x^224 + x^222 - x^221 + x^219 - x^218 + x^216 - x^215 + x^213 - x^212 + x^210 - x^209 + x^207 - x^206 + x^204 - x^203 + x^201 - x^200 + x^198 - x^197 + x^195 - x^194 + x^192 - x^191 + x^189 - x^188 + x^186 - x^185 + x^183 - x^182 + x^180 - x^179 + x^177 - x^176 + x^174 - x^173 + x^171 - x^170 + x^168 - x^167 + x^165 - x^164 + x^162 - x^160 + x^159 - x^157 + x^156 - x^154 + x^153 - x^151 + x^150 - x^148 + x^147 - x^145 + x^144 - x^142 + x^141 - x^139 + x^138 - x^136 + x^135 - x^133 + x^132 - x^130 + x^129 - x^127 + x^126 - x^124 + x^123 - x^121 + x^120 - x^118 + x^117 - x^115 + x^114 - x^112 + x^111 - x^109 + x^108 - x^106 + x^105 - x^103 + x^102 - x^100 + x^99 - x^97 + x^96 - x^94 + x^93 - x^91 + x^90 - x^88 + x^87 - x^85 + x^84 - x^82 + x^81 - x^79 + x^78 - x^76 + x^75 - x^73 + x^72 - x^70 + x^69 - x^67 + x^66 - x^64 + x^63 - x^61 + x^60 - x^58 + x^57 - x^55 + x^54 - x^52 + x^51 - x^49 + x^48 - x^46 + x^45 - x^43 + x^42 - x^40 + x^39 - x^37 + x^36 - x^34 + x^33 - x^31 + x^30 - x^28 + x^27 - x^25 + x^24 - x^22 + x^21 - x^19 + x^18 - x^16 + x^15 - x^13 + x^12 - x^10 + x^9 - x^7 + x^6 - x^4 + x^3 - x + 1
Phi_490(x)=x^168 + x^161 - x^133 - x^126 - x^119 - x^112 + x^98 + x^91 + x^84 + x^77 + x^70 - x^56 - x^49 - x^42 - x^35 + x^7 + 1
Phi_491(x)=x^490 + x^489 + x^488 + x^487 + x^486 + x^485 + x^484 + x^483 + x^482 + x^481 + x^480 + x^479 + x^478 + x^477 + x^476 + x^475 + x^474 + x^473 + x^472 + x^471 + x^470 + x^469 + x^468 + x^467 + x^466 + x^465 + x^464 + x^463 + x^462 + x^461 + x^460 + x^459 + x^458 + x^457 + x^456 + x^455 + x^454 + x^453 + x^452 + x^451 + x^450 + x^449 + x^448 + x^447 + x^446 + x^445 + x^444 + x^443 + x^442 + x^441 + x^440 + x^439 + x^438 + x^437 + x^436 + x^435 + x^434 + x^433 + x^432 + x^431 + x^430 + x^429 + x^428 + x^427 + x^426 + x^425 + x^424 + x^423 + x^422 + x^421 + x^420 + x^419 + x^418 + x^417 + x^416 + x^415 + x^414 + x^413 + x^412 + x^411 + x^410 + x^409 + x^408 + x^407 + x^406 + x^405 + x^404 + x^403 + x^402 + x^401 + x^400 + x^399 + x^398 + x^397 + x^396 + x^395 + x^394 + x^393 + x^392 + x^391 + x^390 + x^389 + x^388 + x^387 + x^386 + x^385 + x^384 + x^383 + x^382 + x^381 + x^380 + x^379 + x^378 + x^377 + x^376 + x^375 + x^374 + x^373 + x^372 + x^371 + x^370 + x^369 + x^368 + x^367 + x^366 + x^365 + x^364 + x^363 + x^362 + x^361 + x^360 + x^359 + x^358 + x^357 + x^356 + x^355 + x^354 + x^353 + x^352 + x^351 + x^350 + x^349 + x^348 + x^347 + x^346 + x^345 + x^344 + x^343 + x^342 + x^341 + x^340 + x^339 + x^338 + x^337 + x^336 + x^335 + x^334 + x^333 + x^332 + x^331 + x^330 + x^329 + x^328 + x^327 + x^326 + x^325 + x^324 + x^323 + x^322 + x^321 + x^320 + x^319 + x^318 + x^317 + x^316 + x^315 + x^314 + x^313 + x^312 + x^311 + x^310 + x^309 + x^308 + x^307 + x^306 + x^305 + x^304 + x^303 + x^302 + x^301 + x^300 + x^299 + x^298 + x^297 + x^296 + x^295 + x^294 + x^293 + x^292 + x^291 + x^290 + x^289 + x^288 + x^287 + x^286 + x^285 + x^284 + x^283 + x^282 + x^281 + x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_492(x)=x^160 + x^158 - x^154 - x^152 + x^148 + x^146 - x^142 - x^140 + x^136 + x^134 - x^130 - x^128 + x^124 + x^122 - x^118 - x^116 + x^112 + x^110 - x^106 - x^104 + x^100 + x^98 - x^94 - x^92 + x^88 + x^86 - x^82 - x^80 - x^78 + x^74 + x^72 - x^68 - x^66 + x^62 + x^60 - x^56 - x^54 + x^50 + x^48 - x^44 - x^42 + x^38 + x^36 - x^32 - x^30 + x^26 + x^24 - x^20 - x^18 + x^14 + x^12 - x^8 - x^6 + x^2 + 1
Phi_493(x)=x^448 - x^447 + x^431 - x^430 + x^419 - x^418 + x^414 - x^413 + x^402 - x^401 + x^397 - x^396 + x^390 - x^389 + x^385 - x^384 + x^380 - x^379 + x^373 - x^372 + x^368 - x^367 + x^363 - x^362 + x^361 - x^360 + x^356 - x^355 + x^351 - x^350 + x^346 - x^345 + x^344 - x^343 + x^339 - x^338 + x^334 - x^333 + x^332 - x^331 + x^329 - x^328 + x^327 - x^326 + x^322 - x^321 + x^317 - x^316 + x^315 - x^314 + x^312 - x^311 + x^310 - x^309 + x^305 - x^304 + x^303 - x^302 + x^300 - x^299 + x^298 - x^297 + x^295 - x^294 + x^293 - x^292 + x^288 - x^287 + x^286 - x^285 + x^283 - x^282 + x^281 - x^280 + x^278 - x^277 + x^276 - x^275 + x^274 - x^273 + x^271 - x^270 + x^269 - x^268 + x^266 - x^265 + x^264 - x^263 + x^261 - x^260 + x^259 - x^258 + x^257 - x^256 + x^254 - x^253 + x^252 - x^251 + x^249 - x^248 + x^247 - x^246 + x^245 - x^243 + x^242 - x^241 + x^240 - x^239 + x^237 - x^236 + x^235 - x^234 + x^232 - x^231 + x^230 - x^229 + x^228 - x^226 + x^225 - x^224 + x^223 - x^222 + x^220 - x^219 + x^218 - x^217 + x^216 - x^214 + x^213 - x^212 + x^211 - x^209 + x^208 - x^207 + x^206 - x^205 + x^203 - x^202 + x^201 - x^200 + x^199 - x^197 + x^196 - x^195 + x^194 - x^192 + x^191 - x^190 + x^189 - x^188 + x^187 - x^185 + x^184 - x^183 + x^182 - x^180 + x^179 - x^178 + x^177 - x^175 + x^174 - x^173 + x^172 - x^171 + x^170 - x^168 + x^167 - x^166 + x^165 - x^163 + x^162 - x^161 + x^160 - x^156 + x^155 - x^154 + x^153 - x^151 + x^150 - x^149 + x^148 - x^146 + x^145 - x^144 + x^143 - x^139 + x^138 - x^137 + x^136 - x^134 + x^133 - x^132 + x^131 - x^127 + x^126 - x^122 + x^121 - x^120 + x^119 - x^117 + x^116 - x^115 + x^114 - x^110 + x^109 - x^105 + x^104 - x^103 + x^102 - x^98 + x^97 - x^93 + x^92 - x^88 + x^87 - x^86 + x^85 - x^81 + x^80 - x^76 + x^75 - x^69 + x^68 - x^64 + x^63 - x^59 + x^58 - x^52 + x^51 - x^47 + x^46 - x^35 + x^34 - x^30 + x^29 - x^18 + x^17 - x + 1
Phi_494(x)=x^216 + x^215 - x^203 - x^202 - x^197 - x^196 + x^190 + x^189 + x^184 + x^183 + x^178 - x^176 - x^171 - x^170 - x^165 + x^163 - x^159 + x^157 + x^152 - x^150 + x^146 - x^144 + x^140 + x^137 - x^133 + x^131 - x^127 - x^124 - x^121 - x^118 + x^114 + x^111 + x^108 + x^105 + x^102 - x^98 - x^95 - x^92 - x^89 + x^85 - x^83 + x^79 + x^76 - x^72 + x^70 - x^66 + x^64 + x^59 - x^57 + x^53 - x^51 - x^46 - x^45 - x^40 + x^38 + x^33 + x^32 + x^27 + x^26 - x^20 - x^19 - x^14 - x^13 + x + 1
Phi_495(x)=x^240 + x^237 + x^234 - x^225 - x^222 - x^219 - x^207 - x^204 - x^201 + x^195 + 2*x^192 + 2*x^189 + x^186 - x^180 - x^177 - x^174 - x^162 - x^159 - x^156 + x^150 + 2*x^147 + 2*x^144 + 2*x^141 + x^138 - x^132 - x^129 - x^126 - x^123 - x^120 - x^117 - x^114 - x^111 - x^108 + x^102 + 2*x^99 + 2*x^96 + 2*x^93 + x^90 - x^84 - x^81 - x^78 - x^66 - x^63 - x^60 + x^54 + 2*x^51 + 2*x^48 + x^45 - x^39 - x^36 - x^33 - x^21 - x^18 - x^15 + x^6 + x^3 + 1
Phi_496(x)=x^240 - x^232 + x^224 - x^216 + x^208 - x^200 + x^192 - x^184 + x^176 - x^168 + x^160 - x^152 + x^144 - x^136 + x^128 - x^120 + x^112 - x^104 + x^96 - x^88 + x^80 - x^72 + x^64 - x^56 + x^48 - x^40 + x^32 - x^24 + x^16 - x^8 + 1
Phi_497(x)=x^420 - x^419 + x^413 - x^412 + x^406 - x^405 + x^399 - x^398 + x^392 - x^391 + x^385 - x^384 + x^378 - x^377 + x^371 - x^370 + x^364 - x^363 + x^357 - x^356 + x^350 - x^348 + x^343 - x^341 + x^336 - x^334 + x^329 - x^327 + x^322 - x^320 + x^315 - x^313 + x^308 - x^306 + x^301 - x^299 + x^294 - x^292 + x^287 - x^285 + x^280 - x^277 + x^273 - x^270 + x^266 - x^263 + x^259 - x^256 + x^252 - x^249 + x^245 - x^242 + x^238 - x^235 + x^231 - x^228 + x^224 - x^221 + x^217 - x^214 + x^210 - x^206 + x^203 - x^199 + x^196 - x^192 + x^189 - x^185 + x^182 - x^178 + x^175 - x^171 + x^168 - x^164 + x^161 - x^157 + x^154 - x^150 + x^147 - x^143 + x^140 - x^135 + x^133 - x^128 + x^126 - x^121 + x^119 - x^114 + x^112 - x^107 + x^105 - x^100 + x^98 - x^93 + x^91 - x^86 + x^84 - x^79 + x^77 - x^72 + x^70 - x^64 + x^63 - x^57 + x^56 - x^50 + x^49 - x^43 + x^42 - x^36 + x^35 - x^29 + x^28 - x^22 + x^21 - x^15 + x^14 - x^8 + x^7 - x + 1
Phi_498(x)=x^164 + x^163 - x^161 - x^160 + x^158 + x^157 - x^155 - x^154 + x^152 + x^151 - x^149 - x^148 + x^146 + x^145 - x^143 - x^142 + x^140 + x^139 - x^137 - x^136 + x^134 + x^133 - x^131 - x^130 + x^128 + x^127 - x^125 - x^124 + x^122 + x^121 - x^119 - x^118 + x^116 + x^115 - x^113 - x^112 + x^110 + x^109 - x^107 - x^106 + x^104 + x^103 - x^101 - x^100 + x^98 + x^97 - x^95 - x^94 + x^92 + x^91 - x^89 - x^88 + x^86 + x^85 - x^83 - x^82 - x^81 + x^79 + x^78 - x^76 - x^75 + x^73 + x^72 - x^70 - x^69 + x^67 + x^66 - x^64 - x^63 + x^61 + x^60 - x^58 - x^57 + x^55 + x^54 - x^52 - x^51 + x^49 + x^48 - x^46 - x^45 + x^43 + x^42 - x^40 - x^39 + x^37 + x^36 - x^34 - x^33 + x^31 + x^30 - x^28 - x^27 + x^25 + x^24 - x^22 - x^21 + x^19 + x^18 - x^16 - x^15 + x^13 + x^12 - x^10 - x^9 + x^7 + x^6 - x^4 - x^3 + x + 1
Phi_499(x)=x^498 + x^497 + x^496 + x^495 + x^494 + x^493 + x^492 + x^491 + x^490 + x^489 + x^488 + x^487 + x^486 + x^485 + x^484 + x^483 + x^482 + x^481 + x^480 + x^479 + x^478 + x^477 + x^476 + x^475 + x^474 + x^473 + x^472 + x^471 + x^470 + x^469 + x^468 + x^467 + x^466 + x^465 + x^464 + x^463 + x^462 + x^461 + x^460 + x^459 + x^458 + x^457 + x^456 + x^455 + x^454 + x^453 + x^452 + x^451 + x^450 + x^449 + x^448 + x^447 + x^446 + x^445 + x^444 + x^443 + x^442 + x^441 + x^440 + x^439 + x^438 + x^437 + x^436 + x^435 + x^434 + x^433 + x^432 + x^431 + x^430 + x^429 + x^428 + x^427 + x^426 + x^425 + x^424 + x^423 + x^422 + x^421 + x^420 + x^419 + x^418 + x^417 + x^416 + x^415 + x^414 + x^413 + x^412 + x^411 + x^410 + x^409 + x^408 + x^407 + x^406 + x^405 + x^404 + x^403 + x^402 + x^401 + x^400 + x^399 + x^398 + x^397 + x^396 + x^395 + x^394 + x^393 + x^392 + x^391 + x^390 + x^389 + x^388 + x^387 + x^386 + x^385 + x^384 + x^383 + x^382 + x^381 + x^380 + x^379 + x^378 + x^377 + x^376 + x^375 + x^374 + x^373 + x^372 + x^371 + x^370 + x^369 + x^368 + x^367 + x^366 + x^365 + x^364 + x^363 + x^362 + x^361 + x^360 + x^359 + x^358 + x^357 + x^356 + x^355 + x^354 + x^353 + x^352 + x^351 + x^350 + x^349 + x^348 + x^347 + x^346 + x^345 + x^344 + x^343 + x^342 + x^341 + x^340 + x^339 + x^338 + x^337 + x^336 + x^335 + x^334 + x^333 + x^332 + x^331 + x^330 + x^329 + x^328 + x^327 + x^326 + x^325 + x^324 + x^323 + x^322 + x^321 + x^320 + x^319 + x^318 + x^317 + x^316 + x^315 + x^314 + x^313 + x^312 + x^311 + x^310 + x^309 + x^308 + x^307 + x^306 + x^305 + x^304 + x^303 + x^302 + x^301 + x^300 + x^299 + x^298 + x^297 + x^296 + x^295 + x^294 + x^293 + x^292 + x^291 + x^290 + x^289 + x^288 + x^287 + x^286 + x^285 + x^284 + x^283 + x^282 + x^281 + x^280 + x^279 + x^278 + x^277 + x^276 + x^275 + x^274 + x^273 + x^272 + x^271 + x^270 + x^269 + x^268 + x^267 + x^266 + x^265 + x^264 + x^263 + x^262 + x^261 + x^260 + x^259 + x^258 + x^257 + x^256 + x^255 + x^254 + x^253 + x^252 + x^251 + x^250 + x^249 + x^248 + x^247 + x^246 + x^245 + x^244 + x^243 + x^242 + x^241 + x^240 + x^239 + x^238 + x^237 + x^236 + x^235 + x^234 + x^233 + x^232 + x^231 + x^230 + x^229 + x^228 + x^227 + x^226 + x^225 + x^224 + x^223 + x^222 + x^221 + x^220 + x^219 + x^218 + x^217 + x^216 + x^215 + x^214 + x^213 + x^212 + x^211 + x^210 + x^209 + x^208 + x^207 + x^206 + x^205 + x^204 + x^203 + x^202 + x^201 + x^200 + x^199 + x^198 + x^197 + x^196 + x^195 + x^194 + x^193 + x^192 + x^191 + x^190 + x^189 + x^188 + x^187 + x^186 + x^185 + x^184 + x^183 + x^182 + x^181 + x^180 + x^179 + x^178 + x^177 + x^176 + x^175 + x^174 + x^173 + x^172 + x^171 + x^170 + x^169 + x^168 + x^167 + x^166 + x^165 + x^164 + x^163 + x^162 + x^161 + x^160 + x^159 + x^158 + x^157 + x^156 + x^155 + x^154 + x^153 + x^152 + x^151 + x^150 + x^149 + x^148 + x^147 + x^146 + x^145 + x^144 + x^143 + x^142 + x^141 + x^140 + x^139 + x^138 + x^137 + x^136 + x^135 + x^134 + x^133 + x^132 + x^131 + x^130 + x^129 + x^128 + x^127 + x^126 + x^125 + x^124 + x^123 + x^122 + x^121 + x^120 + x^119 + x^118 + x^117 + x^116 + x^115 + x^114 + x^113 + x^112 + x^111 + x^110 + x^109 + x^108 + x^107 + x^106 + x^105 + x^104 + x^103 + x^102 + x^101 + x^100 + x^99 + x^98 + x^97 + x^96 + x^95 + x^94 + x^93 + x^92 + x^91 + x^90 + x^89 + x^88 + x^87 + x^86 + x^85 + x^84 + x^83 + x^82 + x^81 + x^80 + x^79 + x^78 + x^77 + x^76 + x^75 + x^74 + x^73 + x^72 + x^71 + x^70 + x^69 + x^68 + x^67 + x^66 + x^65 + x^64 + x^63 + x^62 + x^61 + x^60 + x^59 + x^58 + x^57 + x^56 + x^55 + x^54 + x^53 + x^52 + x^51 + x^50 + x^49 + x^48 + x^47 + x^46 + x^45 + x^44 + x^43 + x^42 + x^41 + x^40 + x^39 + x^38 + x^37 + x^36 + x^35 + x^34 + x^33 + x^32 + x^31 + x^30 + x^29 + x^28 + x^27 + x^26 + x^25 + x^24 + x^23 + x^22 + x^21 + x^20 + x^19 + x^18 + x^17 + x^16 + x^15 + x^14 + x^13 + x^12 + x^11 + x^10 + x^9 + x^8 + x^7 + x^6 + x^5 + x^4 + x^3 + x^2 + x + 1
Phi_500(x)=x^200 - x^150 + x^100 - x^50 + 1