C4[ 360, 153 ] graph forms

Graph forms for C4 [ 360, 153 ] = XI(Rmap(180,165){12,30|4}_15)

On this page are computer-accessible forms for the graph C4[ 360, 153 ] = XI(Rmap(180,165){12,30|4}_15).

(I) Following is a form readable by MAGMA:

g:=Graph<360|{ {83, 211}, {69, 196}, {106, 235}, {101, 230}, {57, 189}, {82, 214}, {70, 195}, {96, 229}, {95, 215}, {118, 254}, {64, 202}, {66, 200}, {116, 255}, {56, 181}, {87, 217}, {56, 183}, {116, 251}, {37, 181}, {66, 210}, {79, 222}, {74, 216}, {46, 189}, {88, 203}, {97, 242}, {46, 184}, {69, 220}, {64, 218}, {66, 216}, {87, 205}, {118, 236}, {70, 219}, {103, 250}, {37, 186}, {38, 185}, {96, 255}, {23, 182}, {29, 188}, {95, 253}, {27, 191}, {26, 191}, {30, 187}, {84, 241}, {94, 248}, {76, 228}, {23, 190}, {16, 186}, {77, 231}, {66, 232}, {95, 245}, {68, 239}, {74, 225}, {26, 183}, {67, 238}, {88, 246}, {69, 234}, {80, 255}, {106, 218}, {75, 250}, {9, 187}, {76, 254}, {65, 243}, {4, 183}, {75, 248}, {12, 191}, {8, 187}, {83, 224}, {1, 181}, {10, 190}, {8, 188}, {3, 182}, {11, 190}, {9, 188}, {88, 237}, {1, 183}, {72, 254}, {64, 246}, {14, 184}, {78, 248}, {1, 182}, {76, 251}, {71, 240}, {10, 189}, {2, 181}, {78, 249}, {1, 185}, {4, 188}, {3, 187}, {2, 186}, {87, 239}, {72, 241}, {74, 243}, {77, 244}, {2, 184}, {70, 252}, {64, 250}, {77, 247}, {83, 233}, {4, 191}, {76, 247}, {73, 242}, {78, 245}, {83, 232}, {3, 190}, {75, 246}, {7, 186}, {5, 184}, {95, 226}, {74, 244}, {75, 245}, {82, 236}, {2, 189}, {6, 185}, {79, 240}, {3, 195}, {35, 227}, {4, 196}, {7, 198}, {9, 200}, {11, 201}, {22, 212}, {20, 214}, {6, 197}, {5, 193}, {39, 227}, {11, 207}, {10, 206}, {5, 192}, {56, 253}, {32, 229}, {10, 207}, {7, 194}, {12, 202}, {58, 252}, {19, 213}, {18, 212}, {6, 193}, {48, 247}, {33, 230}, {45, 229}, {53, 253}, {49, 248}, {51, 250}, {6, 204}, {21, 223}, {20, 222}, {7, 205}, {16, 219}, {50, 249}, {48, 251}, {27, 208}, {17, 221}, {45, 225}, {13, 192}, {17, 220}, {15, 194}, {5, 203}, {60, 242}, {19, 221}, {8, 199}, {52, 251}, {30, 209}, {15, 192}, {14, 193}, {13, 194}, {61, 237}, {63, 239}, {62, 238}, {9, 216}, {56, 233}, {55, 230}, {37, 244}, {34, 243}, {32, 241}, {31, 206}, {28, 205}, {26, 203}, {25, 200}, {24, 201}, {11, 217}, {54, 228}, {46, 252}, {28, 206}, {21, 199}, {20, 198}, {16, 195}, {63, 236}, {54, 229}, {38, 245}, {33, 242}, {25, 202}, {18, 193}, {17, 197}, {17, 196}, {62, 235}, {55, 226}, {12, 218}, {59, 237}, {54, 224}, {53, 227}, {19, 197}, {16, 198}, {27, 204}, {61, 234}, {54, 225}, {29, 196}, {59, 226}, {35, 249}, {58, 224}, {42, 241}, {12, 208}, {55, 235}, {53, 233}, {50, 238}, {22, 202}, {21, 201}, {15, 211}, {14, 210}, {13, 209}, {30, 195}, {59, 230}, {41, 244}, {18, 204}, {58, 228}, {57, 231}, {41, 247}, {40, 246}, {22, 200}, {8, 215}, {32, 255}, {24, 199}, {45, 205}, {31, 254}, {60, 221}, {55, 213}, {38, 197}, {25, 253}, {47, 203}, {29, 249}, {42, 207}, {14, 232}, {15, 233}, {47, 199}, {21, 252}, {13, 231}, {53, 223}, {52, 222}, {24, 243}, {48, 219}, {28, 240}, {60, 208}, {42, 198}, {36, 201}, {49, 220}, {51, 221}, {31, 240}, {47, 192}, {45, 194}, {32, 207}, {43, 219}, {44, 220}, {33, 208}, {46, 223}, {38, 215}, {35, 210}, {36, 214}, {43, 217}, {28, 239}, {39, 212}, {34, 209}, {42, 222}, {27, 238}, {34, 212}, {44, 218}, {39, 209}, {35, 213}, {23, 224}, {65, 182}, {57, 206}, {36, 211}, {26, 237}, {18, 234}, {65, 185}, {47, 215}, {39, 223}, {20, 236}, {19, 235}, {24, 225}, {30, 231}, {40, 210}, {41, 211}, {25, 226}, {31, 228}, {22, 234}, {36, 217}, {40, 213}, {37, 216}, {29, 227}, {50, 204}, {23, 232}, {41, 214}, {33, 256}, {51, 272}, {34, 263}, {52, 273}, {43, 259}, {44, 260}, {63, 278}, {43, 257}, {62, 277}, {63, 276}, {62, 275}, {44, 258}, {40, 263}, {61, 274}, {57, 264}, {59, 266}, {52, 262}, {48, 259}, {58, 265}, {117, 321}, {49, 260}, {51, 261}, {61, 266}, {124, 324}, {60, 261}, {127, 326}, {122, 323}, {120, 322}, {127, 325}, {124, 320}, {50, 271}, {49, 270}, {92, 284}, {125, 317}, {102, 294}, {121, 313}, {78, 271}, {90, 283}, {112, 305}, {104, 298}, {107, 297}, {119, 309}, {107, 296}, {73, 269}, {89, 285}, {97, 293}, {114, 310}, {119, 307}, {122, 318}, {123, 319}, {77, 264}, {89, 284}, {120, 317}, {123, 318}, {65, 263}, {104, 303}, {111, 296}, {84, 284}, {113, 313}, {114, 314}, {115, 315}, {67, 266}, {126, 311}, {79, 262}, {117, 316}, {125, 308}, {100, 302}, {105, 291}, {71, 268}, {85, 286}, {113, 314}, {84, 280}, {86, 282}, {99, 303}, {108, 289}, {67, 269}, {99, 301}, {102, 296}, {68, 267}, {70, 265}, {115, 316}, {124, 307}, {71, 279}, {126, 302}, {73, 281}, {72, 280}, {94, 270}, {80, 257}, {81, 256}, {93, 268}, {115, 290}, {68, 278}, {89, 267}, {81, 258}, {94, 269}, {114, 289}, {115, 288}, {122, 297}, {85, 257}, {127, 299}, {86, 258}, {93, 265}, {94, 266}, {100, 304}, {119, 291}, {91, 270}, {127, 298}, {93, 264}, {116, 289}, {120, 301}, {121, 300}, {67, 277}, {87, 257}, {93, 267}, {69, 274}, {72, 287}, {84, 259}, {111, 312}, {112, 295}, {117, 290}, {79, 279}, {68, 285}, {71, 286}, {85, 268}, {105, 304}, {125, 292}, {89, 259}, {92, 262}, {108, 310}, {109, 311}, {117, 303}, {82, 265}, {111, 308}, {124, 295}, {105, 309}, {110, 306}, {120, 292}, {108, 305}, {110, 307}, {123, 294}, {82, 268}, {90, 260}, {91, 261}, {123, 293}, {88, 263}, {109, 306}, {122, 293}, {118, 276}, {102, 261}, {126, 285}, {125, 281}, {97, 260}, {101, 256}, {116, 273}, {121, 284}, {112, 278}, {121, 286}, {96, 264}, {106, 258}, {73, 288}, {118, 287}, {101, 271}, {96, 267}, {98, 271}, {114, 287}, {113, 287}, {113, 286}, {126, 273}, {119, 280}, {90, 298}, {91, 299}, {92, 300}, {98, 274}, {99, 275}, {100, 276}, {109, 285}, {80, 289}, {107, 282}, {86, 292}, {80, 291}, {81, 290}, {99, 272}, {102, 277}, {104, 283}, {81, 292}, {100, 273}, {103, 274}, {85, 291}, {110, 280}, {111, 281}, {112, 262}, {103, 272}, {97, 281}, {98, 282}, {98, 283}, {106, 275}, {110, 279}, {108, 278}, {109, 279}, {92, 295}, {104, 275}, {91, 294}, {103, 282}, {105, 276}, {101, 283}, {107, 277}, {86, 297}, {90, 293}, {132, 256}, {132, 270}, {130, 269}, {130, 272}, {161, 312}, {147, 307}, {159, 319}, {149, 309}, {130, 288}, {133, 294}, {152, 316}, {140, 297}, {155, 318}, {147, 310}, {132, 290}, {144, 312}, {150, 318}, {148, 317}, {133, 303}, {145, 315}, {128, 299}, {150, 317}, {144, 315}, {139, 295}, {152, 308}, {140, 288}, {128, 301}, {135, 298}, {131, 302}, {129, 300}, {146, 316}, {129, 302}, {135, 296}, {132, 299}, {130, 301}, {138, 319}, {143, 314}, {134, 304}, {140, 315}, {142, 313}, {137, 305}, {131, 314}, {149, 300}, {142, 311}, {136, 305}, {133, 319}, {141, 311}, {137, 306}, {141, 310}, {139, 304}, {136, 309}, {143, 306}, {138, 308}, {134, 313}, {135, 312}, {142, 334}, {162, 354}, {154, 346}, {150, 342}, {150, 343}, {162, 355}, {128, 322}, {165, 359}, {160, 354}, {159, 349}, {155, 345}, {148, 342}, {147, 337}, {143, 333}, {139, 329}, {137, 331}, {136, 330}, {135, 325}, {137, 330}, {167, 356}, {166, 357}, {163, 352}, {156, 351}, {144, 339}, {133, 321}, {172, 360}, {167, 355}, {154, 350}, {153, 349}, {144, 340}, {143, 331}, {145, 340}, {164, 353}, {128, 326}, {160, 358}, {138, 332}, {129, 327}, {136, 335}, {153, 350}, {146, 341}, {134, 334}, {171, 355}, {146, 346}, {145, 345}, {129, 328}, {131, 328}, {173, 358}, {151, 348}, {139, 320}, {155, 343}, {175, 355}, {174, 354}, {152, 341}, {165, 360}, {131, 333}, {172, 354}, {171, 357}, {170, 356}, {169, 359}, {166, 360}, {134, 329}, {174, 353}, {159, 336}, {158, 337}, {157, 338}, {151, 344}, {148, 347}, {140, 323}, {149, 327}, {178, 353}, {179, 352}, {152, 332}, {179, 359}, {177, 357}, {148, 321}, {158, 328}, {178, 356}, {176, 358}, {145, 326}, {177, 358}, {176, 359}, {151, 320}, {147, 324}, {146, 325}, {156, 324}, {154, 323}, {138, 336}, {157, 327}, {153, 323}, {149, 335}, {153, 322}, {156, 327}, {141, 337}, {180, 360}, {151, 331}, {142, 338}, {155, 326}, {159, 322}, {141, 338}, {154, 325}, {161, 321}, {173, 333}, {169, 331}, {175, 332}, {164, 320}, {180, 336}, {179, 343}, {178, 342}, {169, 334}, {162, 330}, {160, 329}, {179, 346}, {173, 324}, {166, 335}, {165, 335}, {177, 347}, {176, 346}, {162, 329}, {180, 351}, {176, 347}, {165, 334}, {164, 328}, {178, 350}, {177, 349}, {160, 333}, {180, 345}, {167, 330}, {163, 332}, {161, 339}, {173, 351}, {163, 343}, {170, 350}, {168, 348}, {167, 338}, {172, 345}, {169, 348}, {170, 348}, {171, 349}, {166, 337}, {175, 344}, {168, 351}, {168, 336}, {174, 342}, {157, 356}, {172, 341}, {170, 339}, {161, 347}, {158, 357}, {175, 340}, {174, 341}, {168, 339}, {163, 344}, {156, 352}, {164, 344}, {157, 352}, {158, 353}, {171, 340} }>;

(II) A more general form is to represent the graph as the orbit of {83, 211} under the group generated by the following permutations:

a: (1, 2)(3, 5)(4, 7)(6, 10)(8, 13)(9, 15)(11, 18)(12, 20)(14, 23)(16, 26)(17, 28)(19, 31)(21, 34)(22, 36)(24, 39)(25, 41)(27, 42)(29, 45)(30, 47)(32, 50)(33, 52)(35, 54)(37, 56)(38, 57)(40, 58)(43, 61)(44, 63)(46, 65)(48, 59)(49, 68)(51, 71)(53, 74)(55, 76)(60, 79)(62, 72)(64, 82)(66, 83)(67, 84)(69, 87)(70, 88)(73, 92)(75, 93)(77, 95)(78, 96)(80, 98)(81, 100)(85, 103)(86, 105)(89, 94)(90, 108)(91, 109)(97, 112)(99, 113)(101, 116)(102, 110)(104, 114)(106, 118)(107, 119)(111, 124)(115, 129)(117, 131)(120, 134)(121, 130)(122, 136)(123, 137)(125, 139)(126, 132)(127, 141)(128, 142)(133, 143)(135, 147)(138, 151)(140, 149)(144, 156)(145, 157)(146, 158)(148, 160)(150, 162)(152, 164)(153, 165)(154, 166)(155, 167)(159, 169)(161, 173)(163, 175)(170, 180)(171, 179)(172, 178)(176, 177)(182, 184)(183, 186)(185, 189)(187, 192)(188, 194)(190, 193)(191, 198)(195, 203)(196, 205)(197, 206)(199, 209)(200, 211)(201, 212)(202, 214)(204, 207)(208, 222)(210, 224)(213, 228)(215, 231)(216, 233)(217, 234)(218, 236)(219, 237)(220, 239)(221, 240)(223, 243)(225, 227)(226, 247)(229, 249)(230, 251)(235, 254)(238, 241)(242, 262)(244, 253)(245, 264)(246, 265)(248, 267)(250, 268)(252, 263)(255, 271)(256, 273)(257, 274)(258, 276)(259, 266)(260, 278)(261, 279)(269, 284)(270, 285)(272, 286)(275, 287)(277, 280)(281, 295)(282, 291)(283, 289)(288, 300)(290, 302)(292, 304)(293, 305)(294, 306)(296, 307)(297, 309)(298, 310)(299, 311)(301, 313)(303, 314)(308, 320)(312, 324)(315, 327)(316, 328)(317, 329)(318, 330)(319, 331)(321, 333)(322, 334)(323, 335)(325, 337)(326, 338)(332, 344)(336, 348)(339, 351)(340, 352)(341, 353)(342, 354)(343, 355)(345, 356)(346, 357)(347, 358)(349, 359)(350, 360)
b: (2, 4)(3, 6)(5, 9)(7, 12)(8, 14)(10, 17)(11, 19)(13, 22)(15, 25)(16, 27)(18, 30)(20, 33)(21, 35)(23, 38)(24, 40)(26, 37)(28, 44)(29, 46)(31, 49)(32, 51)(36, 55)(41, 59)(42, 60)(43, 62)(45, 64)(47, 66)(48, 67)(50, 70)(52, 73)(54, 75)(57, 69)(58, 78)(61, 77)(63, 81)(68, 86)(71, 90)(72, 91)(74, 88)(76, 94)(79, 97)(80, 99)(82, 101)(83, 95)(84, 102)(85, 104)(87, 106)(89, 107)(92, 111)(93, 98)(96, 103)(100, 115)(105, 117)(108, 120)(109, 122)(110, 123)(112, 125)(113, 127)(114, 128)(116, 130)(118, 132)(119, 133)(121, 135)(124, 138)(126, 140)(129, 144)(131, 145)(134, 146)(136, 148)(137, 150)(139, 152)(141, 153)(142, 154)(143, 155)(147, 159)(149, 161)(151, 163)(156, 168)(157, 170)(158, 171)(160, 172)(162, 174)(164, 175)(165, 176)(166, 177)(167, 178)(169, 179)(173, 180)(181, 183)(182, 185)(184, 188)(186, 191)(187, 193)(189, 196)(190, 197)(192, 200)(194, 202)(195, 204)(198, 208)(199, 210)(201, 213)(203, 216)(205, 218)(206, 220)(207, 221)(209, 212)(211, 226)(214, 230)(215, 232)(217, 235)(219, 238)(222, 242)(223, 227)(224, 245)(225, 246)(228, 248)(229, 250)(231, 234)(233, 253)(236, 256)(237, 244)(239, 258)(240, 260)(241, 261)(243, 263)(247, 266)(249, 252)(251, 269)(254, 270)(255, 272)(257, 275)(259, 277)(262, 281)(264, 274)(265, 271)(267, 282)(268, 283)(273, 288)(276, 290)(278, 292)(279, 293)(280, 294)(284, 296)(285, 297)(286, 298)(287, 299)(289, 301)(291, 303)(295, 308)(300, 312)(302, 315)(304, 316)(305, 317)(306, 318)(307, 319)(309, 321)(310, 322)(311, 323)(313, 325)(314, 326)(320, 332)(324, 336)(327, 339)(328, 340)(329, 341)(330, 342)(331, 343)(333, 345)(334, 346)(335, 347)(337, 349)(338, 350)(348, 352)(353, 355)(358, 360)
c: (2, 3)(4, 6)(5, 8)(7, 11)(9, 14)(10, 16)(12, 19)(13, 21)(15, 24)(17, 27)(18, 29)(20, 32)(22, 35)(23, 37)(25, 40)(26, 38)(28, 43)(30, 46)(31, 48)(33, 51)(34, 53)(36, 45)(41, 54)(44, 62)(49, 67)(50, 69)(52, 72)(55, 64)(56, 65)(57, 70)(58, 77)(59, 75)(61, 78)(63, 80)(68, 85)(71, 89)(73, 91)(74, 83)(79, 84)(81, 99)(82, 96)(86, 104)(88, 95)(90, 107)(92, 110)(97, 102)(100, 114)(101, 103)(105, 108)(109, 121)(111, 123)(112, 119)(113, 126)(115, 128)(116, 118)(117, 120)(122, 135)(125, 133)(127, 140)(129, 143)(130, 132)(134, 141)(137, 149)(139, 147)(144, 155)(146, 153)(150, 161)(151, 156)(152, 159)(157, 169)(158, 160)(162, 166)(163, 168)(164, 173)(165, 167)(170, 179)(171, 172)(174, 177)(175, 180)(176, 178)(181, 182)(183, 185)(184, 187)(186, 190)(188, 193)(189, 195)(191, 197)(192, 199)(194, 201)(196, 204)(198, 207)(200, 210)(202, 213)(203, 215)(205, 217)(206, 219)(208, 221)(209, 223)(211, 225)(212, 227)(214, 229)(216, 232)(218, 235)(220, 238)(222, 241)(224, 244)(226, 246)(228, 247)(230, 250)(231, 252)(233, 243)(234, 249)(236, 255)(237, 245)(239, 257)(240, 259)(242, 261)(248, 266)(251, 254)(253, 263)(256, 272)(258, 275)(260, 277)(262, 280)(264, 265)(267, 268)(269, 270)(271, 274)(273, 287)(276, 289)(278, 291)(279, 284)(281, 294)(282, 283)(285, 286)(288, 299)(290, 301)(292, 303)(293, 296)(295, 307)(297, 298)(300, 306)(302, 314)(304, 310)(305, 309)(308, 319)(311, 313)(312, 318)(315, 326)(316, 322)(317, 321)(320, 324)(323, 325)(327, 331)(328, 333)(329, 337)(330, 335)(332, 336)(334, 338)(339, 343)(340, 345)(341, 349)(342, 347)(344, 351)(346, 350)(348, 352)(353, 358)(354, 357)(355, 360)(356, 359)

(III) Last is Groups&Graphs. Copy everything between (not including) the lines of asterisks into a plain text file and save it as "graph.txt". Then launch G&G (Groups&Graphs) and select Read Text from the File menu.

**************

&Graph
C4[ 360, 153 ]
360
-1 181 182 183 185
-2 189 181 184 186
-3 187 190 182 195
-4 188 191 183 196
-5 192 203 193 184
-6 193 204 185 197
-7 198 194 205 186
-8 187 188 199 215
-9 187 188 200 216
-10 189 190 206 207
-11 190 201 217 207
-12 191 202 218 208
-13 209 231 192 194
-14 210 232 193 184
-15 211 233 192 194
-16 198 195 186 219
-17 220 221 196 197
-18 212 234 193 204
-19 221 213 235 197
-20 198 222 214 236
-21 199 201 223 252
-22 200 212 234 202
-23 232 190 224 182
-24 199 243 201 225
-25 253 200 202 226
-26 191 203 237 183
-27 191 204 238 208
-28 205 206 239 240
-29 188 227 249 196
-30 187 209 231 195
-31 254 206 228 240
-32 255 207 229 241
-33 242 256 208 230
-34 209 243 212 263
-35 210 213 227 249
-36 211 201 214 217
-37 244 181 216 186
-38 245 215 185 197
-39 209 212 223 227
-40 210 213 246 263
-41 211 244 214 247
-42 198 222 207 241
-43 257 259 217 219
-44 220 258 260 218
-45 225 194 205 229
-46 189 223 184 252
-47 199 192 203 215
-48 247 259 251 219
-49 220 248 270 260
-50 204 238 249 271
-51 221 250 261 272
-52 222 251 262 273
-53 253 233 223 227
-54 224 225 228 229
-55 213 235 226 230
-56 253 233 181 183
-57 231 264 189 206
-58 265 224 228 252
-59 266 226 237 230
-60 242 221 261 208
-61 266 234 237 274
-62 275 277 235 238
-63 276 278 236 239
-64 202 246 250 218
-65 243 182 185 263
-66 210 232 200 216
-67 266 277 269 238
-68 267 278 239 285
-69 220 234 196 274
-70 265 195 219 252
-71 286 268 279 240
-72 254 287 280 241
-73 242 288 269 281
-74 243 244 225 216
-75 245 246 248 250
-76 254 247 228 251
-77 231 264 244 247
-78 245 248 249 271
-79 222 279 240 262
-80 255 289 257 291
-81 256 290 258 292
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-83 232 211 233 224
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-89 267 259 284 285
-90 298 260 293 283
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-92 300 262 284 295
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-95 253 245 215 226
-96 264 255 267 229
-97 242 281 260 293
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-100 276 302 304 273
-101 256 271 283 230
-102 277 261 294 296
-103 282 250 272 274
-104 275 298 303 283
-105 276 309 291 304
-106 275 235 258 218
-107 297 277 282 296
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-110 279 280 306 307
-111 308 312 281 296
-112 278 305 262 295
-113 286 287 313 314
-114 287 310 289 314
-115 288 290 315 316
-116 255 289 251 273
-117 321 290 303 316
-118 254 276 287 236
-119 309 280 291 307
-120 322 301 292 317
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-131 333 302 314 328
-132 299 256 290 270
-133 319 321 303 294
-134 334 313 304 329
-135 298 312 325 296
-136 330 309 335 305
-137 330 331 305 306
-138 308 319 332 336
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-140 297 288 323 315
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-163 352 332 343 344
-164 320 353 344 328
-165 334 335 359 360
-166 335 357 337 360
-167 330 355 356 338
-168 336 348 339 351
-169 331 334 348 359
-170 356 348 339 350
-171 355 357 349 340
-172 341 354 345 360
-173 333 324 358 351
-174 341 342 353 354
-175 332 344 355 340
-176 346 347 358 359
-177 357 347 358 349
-178 342 353 356 350
-179 352 343 346 359
-180 345 336 360 351
-181 1 56 2 37
-182 1 23 3 65
-183 1 56 4 26
-184 2 46 14 5
-185 1 38 6 65
-186 2 37 16 7
-187 3 8 30 9
-188 4 29 8 9
-189 2 46 57 10
-190 11 23 3 10
-191 12 4 26 27
-192 13 47 15 5
-193 14 5 6 18
-194 45 13 15 7
-195 3 70 16 30
-196 69 4 17 29
-197 38 6 17 19
-198 16 7 20 42
-199 24 47 8 21
-200 22 66 25 9
-201 11 24 36 21
-202 22 12 25 64
-203 88 47 26 5
-204 27 6 50 18
-205 45 28 7 87
-206 57 28 31 10
-207 11 42 10 32
-208 33 12 27 60
-209 34 13 39 30
-210 66 35 14 40
-211 36 15 83 41
-212 22 34 39 18
-213 55 35 40 19
-214 36 82 41 20
-215 47 38 95 8
-216 66 37 74 9
-217 11 36 43 87
-218 44 12 106 64
-219 48 70 16 43
-220 44 69 49 17
-221 60 17 51 19
-222 79 52 20 42
-223 46 39 53 21
-224 23 58 83 54
-225 45 24 74 54
-226 55 25 59 95
-227 35 39 29 53
-228 58 31 54 76
-229 45 96 32 54
-230 33 55 101 59
-231 77 13 57 30
-232 66 23 14 83
-233 56 15 83 53
-234 22 69 61 18
-235 55 62 106 19
-236 82 63 118 20
-237 88 26 59 61
-238 67 27 50 62
-239 68 28 63 87
-240 79 71 28 31
-241 72 84 42 32
-242 33 60 73 97
-243 34 24 74 65
-244 77 37 41 74
-245 78 38 95 75
-246 88 40 64 75
-247 77 48 41 76
-248 78 49 94 75
-249 78 35 50 29
-250 103 51 64 75
-251 48 116 52 76
-252 46 58 70 21
-253 56 25 95 53
-254 72 118 31 76
-255 80 116 96 32
-256 33 132 101 81
-257 80 85 43 87
-258 44 81 106 86
-259 89 48 84 43
-260 44 90 49 97
-261 91 102 60 51
-262 79 112 92 52
-263 88 34 40 65
-264 77 57 93 96
-265 58 70 82 93
-266 67 59 61 94
-267 89 68 93 96
-268 71 82 93 85
-269 67 94 73 130
-270 132 91 49 94
-271 78 101 50 98
-272 99 103 51 130
-273 100 126 116 52
-274 69 103 61 98
-275 99 104 62 106
-276 100 105 63 118
-277 67 102 62 107
-278 68 112 63 108
-279 110 79 71 109
-280 110 72 84 119
-281 111 125 73 97
-282 103 107 86 98
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0

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