C4[ 320, 153 ] graph forms

Graph forms for C4 [ 320, 153 ] = SDD({4,4}_[10,4])

On this page are computer-accessible forms for the graph C4[ 320, 153 ] = SDD({4,4}_[10,4]).

(I) Following is a form readable by MAGMA:

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

(II) A more general form is to represent the graph as the orbit of {130, 191} under the group generated by the following permutations:

a: (19, 83)
b: (10, 14)
c: (21, 89)
d: (140, 144)
e: (9, 42)
f: (126, 157)
g: (55, 143)
h: (75, 125)
m: (97, 158)
n1: (117, 133)
a1: (6, 64)
b1: (50, 123)
c1: (8, 24)
d1: (71, 111)
e1: (110, 153)
f1: (62, 113)
g1: (104, 129)
h1: (30, 72)
m1: (56, 114)
n2: (51, 131)
a2: (147, 150)
b2: (16, 26)
c2: (100, 145)
d2: (11, 31)
e2: (54, 107)
f2: (22, 130)
g2: (33, 82)
h2: (20, 34)
m2: (17, 86)
n3: (93, 121)
a3: (79, 98)
b3: (25, 60)
c3: (58, 68)
d3: (47, 132)
e3: (115, 149)
f3: (57, 124)
g3: (134, 142)
h3: (37, 49)
m3: (73, 101)
n4: (3, 59)
a4: (99, 103)
b4: (2, 5)(3, 9)(4, 12)(6, 18)(7, 21)(10, 28)(13, 36)(14, 38)(16, 43)(17, 40)(19, 50)(22, 57)(25, 63)(26, 65)(27, 41)(29, 69)(32, 45)(33, 35)(37, 73)(39, 84)(42, 59)(44, 93)(46, 86)(48, 99)(49, 101)(53, 67)(55, 95)(56, 61)(58, 71)(60, 90)(64, 118)(66, 121)(68, 111)(74, 76)(77, 105)(78, 82)(79, 104)(81, 89)(83, 123)(87, 135)(91, 136)(92, 117)(96, 138)(97, 134)(98, 129)(103, 128)(108, 126)(109, 114)(115, 148)(116, 139)(119, 151)(120, 133)(124, 130)(127, 143)(141, 147)(142, 158)(149, 160)(150, 154)(152, 155)(157, 159)(161, 163)(162, 166)(164, 172)(165, 175)(167, 181)(168, 184)(169, 188)(170, 190)(171, 187)(173, 195)(174, 198)(176, 203)(177, 206)(178, 189)(179, 210)(180, 186)(182, 214)(183, 216)(185, 219)(191, 227)(192, 200)(193, 232)(194, 233)(196, 235)(197, 238)(199, 243)(201, 218)(202, 244)(204, 242)(205, 250)(207, 252)(208, 223)(209, 241)(211, 239)(212, 224)(213, 258)(215, 237)(217, 262)(220, 236)(221, 267)(222, 270)(225, 274)(226, 268)(228, 278)(229, 251)(230, 266)(231, 269)(234, 284)(240, 261)(245, 292)(246, 286)(247, 294)(248, 295)(249, 297)(253, 288)(254, 273)(255, 271)(256, 265)(257, 272)(259, 279)(260, 263)(264, 285)(275, 312)(276, 303)(277, 315)(280, 314)(281, 316)(282, 306)(283, 291)(287, 313)(289, 317)(290, 301)(293, 310)(296, 320)(298, 307)(299, 308)(300, 309)(302, 311)(304, 319)(305, 318)
c4: (4, 53)
d4: (63, 90)
e4: (148, 160)
f4: (48, 128)
g4: (32, 74)
h4: (2, 12)(3, 21)(4, 5)(6, 43)(7, 9)(8, 15)(10, 28)(11, 30)(13, 33)(14, 38)(16, 18)(17, 32)(19, 73)(20, 52)(22, 95)(23, 24)(25, 56)(26, 118)(27, 53)(29, 71)(31, 72)(34, 80)(35, 36)(37, 50)(39, 111)(40, 45)(41, 67)(42, 81)(44, 136)(46, 76)(47, 62)(48, 104)(49, 123)(51, 94)(54, 106)(55, 57)(58, 69)(59, 89)(60, 114)(61, 63)(64, 65)(66, 151)(68, 84)(74, 86)(75, 112)(77, 78)(79, 99)(82, 105)(83, 101)(87, 92)(90, 109)(91, 93)(96, 120)(97, 108)(98, 103)(100, 140)(102, 131)(107, 146)(113, 132)(115, 148)(116, 141)(117, 135)(119, 121)(122, 125)(124, 143)(126, 134)(127, 130)(128, 129)(133, 138)(139, 147)(142, 157)(144, 145)(149, 160)(150, 155)(152, 154)(158, 159)(161, 166)(162, 163)(164, 190)(165, 198)(167, 210)(168, 216)(169, 180)(170, 172)(171, 200)(173, 214)(174, 175)(176, 218)(177, 250)(178, 223)(179, 181)(182, 195)(183, 184)(185, 258)(186, 188)(187, 192)(189, 208)(191, 274)(193, 266)(194, 252)(196, 278)(197, 215)(199, 204)(201, 203)(202, 286)(205, 206)(207, 233)(209, 288)(211, 229)(212, 272)(213, 219)(217, 240)(220, 260)(221, 256)(222, 226)(224, 257)(225, 227)(228, 235)(230, 232)(231, 294)(234, 315)(236, 263)(237, 238)(239, 251)(241, 253)(242, 243)(244, 246)(245, 301)(247, 269)(248, 254)(249, 285)(255, 307)(259, 313)(261, 262)(264, 297)(265, 267)(268, 270)(271, 298)(273, 295)(275, 293)(276, 308)(277, 284)(279, 287)(280, 282)(281, 309)(283, 317)(289, 291)(290, 292)(296, 305)(299, 303)(300, 316)(302, 319)(304, 311)(306, 314)(310, 312)(318, 320)
m4: (5, 27)
n5: (135, 138)
a5: (69, 84)
b5: (92, 120)
c5: (91, 119)
d5: (36, 77)
e5: (139, 155)
f5: (70, 85)
g5: (108, 159)
h5: (136, 151)
m5: (40, 46)
n6: (13, 105)
a6: (7, 81)
b6: (45, 76)
c6: (112, 122)
d6: (35, 78)
e6: (94, 102)
f6: (1, 2)(3, 8)(4, 11)(5, 10)(6, 17)(7, 20)(9, 16)(12, 33)(13, 21)(14, 27)(15, 40)(18, 48)(19, 28)(22, 56)(23, 46)(24, 59)(25, 62)(26, 42)(29, 43)(30, 71)(31, 53)(32, 75)(34, 81)(35, 37)(36, 58)(38, 83)(39, 65)(41, 88)(44, 92)(45, 95)(47, 97)(49, 78)(50, 70)(51, 99)(52, 73)(54, 61)(55, 79)(57, 91)(60, 113)(63, 117)(64, 86)(66, 120)(67, 82)(68, 77)(69, 94)(72, 111)(74, 125)(76, 127)(80, 101)(84, 102)(85, 123)(87, 134)(89, 105)(90, 133)(93, 140)(96, 142)(98, 143)(100, 116)(103, 131)(104, 106)(107, 109)(108, 148)(110, 147)(112, 136)(114, 130)(115, 141)(118, 128)(119, 124)(121, 144)(122, 151)(126, 137)(129, 146)(132, 158)(135, 139)(138, 155)(145, 152)(149, 154)(150, 153)(156, 157)(159, 160)(162, 165)(163, 168)(164, 171)(166, 177)(167, 180)(169, 187)(170, 189)(172, 194)(173, 184)(174, 197)(175, 183)(176, 202)(178, 186)(179, 209)(181, 213)(182, 206)(185, 218)(188, 201)(190, 217)(191, 226)(192, 229)(193, 231)(195, 220)(196, 233)(198, 240)(199, 223)(200, 244)(203, 248)(204, 216)(205, 238)(207, 251)(208, 241)(210, 250)(211, 256)(212, 230)(214, 253)(215, 258)(219, 264)(221, 266)(222, 269)(224, 268)(225, 273)(227, 277)(228, 262)(232, 283)(234, 282)(235, 285)(237, 278)(239, 287)(242, 263)(243, 261)(245, 291)(246, 274)(247, 293)(249, 295)(252, 298)(254, 272)(255, 265)(257, 271)(259, 301)(260, 288)(267, 290)(270, 306)(275, 311)(276, 314)(279, 315)(280, 304)(281, 296)(284, 305)(286, 313)(289, 310)(292, 318)(294, 319)(297, 307)(299, 300)(302, 309)(303, 320)(316, 317)
g6: (87, 96)
h6: (2, 41)
m6: (43, 65)
n7: (95, 127)
a7: (106, 146)
b7: (44, 66)
c7: (61, 109)
d7: (18, 118)
e7: (29, 39)
f7: (15, 23)
g7: (52, 80)
h7: (12, 67)
m7: (137, 156)
n8: (28, 38)
a8: (141, 154)

(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[ 320, 153 ]
320
-1 166 161 162 163
-2 165 177 168 161
-3 167 178 169 164
-4 183 205 162 174
-5 184 206 163 175
-6 176 185 207 164
-7 179 170 186 208
-8 187 180 171 186
-9 188 189 181 172
-10 168 182 183 173
-11 165 238 175 197
-12 198 166 216 250
-13 199 167 217 250
-14 168 182 183 173
-15 188 200 169 192
-16 201 213 170 194
-17 202 171 218 251
-18 203 172 219 252
-19 220 253 204 173
-20 209 178 189 241
-21 210 190 223 180
-22 221 254 211 191
-23 188 200 169 192
-24 187 180 171 186
-25 221 222 212 193
-26 201 213 170 194
-27 184 206 163 175
-28 214 216 184 195
-29 215 217 185 196
-30 198 215 237 174
-31 165 238 175 197
-32 176 286 200 239
-33 177 210 204 240
-34 209 178 189 241
-35 242 179 206 261
-36 243 181 205 262
-37 209 243 182 263
-38 214 216 184 195
-39 215 217 185 196
-40 187 244 201 229
-41 165 177 168 161
-42 188 189 181 172
-43 233 190 258 218
-44 234 245 191 259
-45 211 246 192 203
-46 187 244 201 229
-47 232 247 193 294
-48 264 298 248 194
-49 209 243 182 263
-50 242 288 236 195
-51 297 235 249 196
-52 253 288 223 208
-53 183 205 162 174
-54 255 212 224 271
-55 265 225 251 295
-56 266 256 226 272
-57 267 227 239 273
-58 213 238 228 261
-59 167 178 169 164
-60 221 222 212 193
-61 265 257 268 230
-62 231 266 269 230
-63 232 267 224 270
-64 176 185 207 164
-65 233 190 258 218
-66 234 245 191 259
-67 198 166 216 250
-68 213 238 228 261
-69 235 237 262 219
-70 220 236 260 263
-71 278 258 240 197
-72 198 215 237 174
-73 199 214 260 241
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-75 287 244 202 313
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-103 233 295 285 307
-104 297 254 271 252
-105 199 167 217 250
-106 298 257 272 307
-107 255 212 224 271
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-109 265 257 268 230
-110 308 276 299 303
-111 278 258 240 197
-112 286 246 279 259
-113 231 266 269 230
-114 266 256 226 272
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-124 267 227 239 273
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-129 297 254 271 252
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-131 297 235 249 196
-132 232 247 193 294
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-134 310 269 291 304
-135 270 292 314 317
-136 301 313 315 274
-137 275 310 312 293
-138 270 292 314 317
-139 276 316 306 318
-140 277 315 305 318
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-142 310 269 291 304
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-146 298 257 272 307
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-152 281 303 282 305
-153 308 276 299 303
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-156 275 310 312 293
-157 289 311 312 247
-158 231 319 293 283
-159 275 302 294 317
-160 319 309 311 316
-161 88 1 2 41
-162 88 1 4 53
-163 88 1 5 27
-164 3 59 6 64
-165 11 2 41 31
-166 88 1 12 67
-167 13 3 59 105
-168 2 14 41 10
-169 23 3 15 59
-170 26 81 16 7
-171 24 17 8 86
-172 18 118 9 42
-173 14 83 19 10
-174 4 72 30 53
-175 11 5 27 31
-176 6 74 64 32
-177 33 2 82 41
-178 34 3 59 20
-179 78 35 81 7
-180 89 24 8 21
-181 77 36 9 42
-182 14 37 49 10
-183 14 4 53 10
-184 5 27 38 28
-185 6 39 29 64
-186 24 81 7 8
-187 24 46 40 8
-188 23 15 9 42
-189 34 9 20 42
-190 89 21 43 65
-191 22 44 66 130
-192 23 45 15 76
-193 132 25 47 60
-194 26 48 16 128
-195 123 38 28 50
-196 39 29 51 131
-197 11 111 71 31
-198 12 67 72 30
-199 13 101 105 73
-200 23 15 74 32
-201 46 26 16 40
-202 125 17 75 86
-203 45 18 118 76
-204 33 82 83 19
-205 77 36 4 53
-206 78 35 5 27
-207 79 6 64 98
-208 80 81 7 52
-209 34 37 49 20
-210 33 89 82 21
-211 22 45 130 76
-212 25 60 107 54
-213 68 58 26 16
-214 101 38 28 73
-215 39 72 29 30
-216 12 67 38 28
-217 13 39 105 29
-218 17 86 43 65
-219 69 18 84 118
-220 70 83 19 85
-221 22 25 60 130
-222 25 60 96 87
-223 89 80 52 21
-224 90 63 107 54
-225 55 143 91 119
-226 56 92 114 120
-227 121 57 124 93
-228 68 58 102 94
-229 46 127 40 95
-230 113 61 62 109
-231 113 158 62 97
-232 132 90 47 63
-233 99 103 43 65
-234 44 66 100 145
-235 69 51 84 131
-236 123 70 50 85
-237 69 72 84 30
-238 11 68 58 31
-239 57 124 74 32
-240 33 111 71 82
-241 34 101 73 20
-242 78 35 123 50
-243 77 36 37 49
-244 46 125 40 75
-245 44 66 96 87
-246 45 122 112 76
-247 132 47 157 126
-248 48 127 95 128
-249 79 51 98 131
-250 12 67 13 105
-251 55 143 17 86
-252 104 18 118 129
-253 80 83 19 52
-254 22 104 129 130
-255 79 107 54 98
-256 56 114 127 95
-257 146 61 106 109
-258 111 71 43 65
-259 44 66 122 112
-260 101 70 73 85
-261 78 35 68 58
-262 77 36 69 84
-263 37 70 49 85
-264 102 48 94 128
-265 55 143 61 109
-266 56 113 114 62
-267 57 90 124 63
-268 133 61 117 109
-269 134 113 62 142
-270 90 135 138 63
-271 104 107 129 54
-272 56 146 114 106
-273 57 79 124 98
-274 136 127 95 151
-275 156 137 159 108
-276 110 155 139 153
-277 144 91 140 119
-278 111 102 71 94
-279 121 122 112 93
-280 154 96 141 87
-281 115 116 149 152
-282 92 116 152 120
-283 133 158 117 97
-284 121 100 145 93
-285 99 102 103 94
-286 122 112 74 32
-287 91 125 75 119
-288 123 80 50 52
-289 157 126 96 87
-290 133 91 117 119
-291 134 92 120 142
-292 121 135 93 138
-293 156 158 137 97
-294 132 47 159 108
-295 55 99 143 103
-296 154 100 145 141
-297 104 51 129 131
-298 146 48 106 128
-299 110 154 141 153
-300 147 115 149 150
-301 92 136 151 120
-302 115 159 149 108
-303 110 116 152 153
-304 134 115 149 142
-305 144 116 140 152
-306 133 155 117 139
-307 99 146 103 106
-308 110 147 150 153
-309 154 148 160 141
-310 134 156 137 142
-311 157 126 148 160
-312 156 157 126 137
-313 125 136 151 75
-314 135 147 138 150
-315 144 136 140 151
-316 155 148 160 139
-317 135 159 138 108
-318 144 155 139 140
-319 158 148 160 97
-320 100 145 147 150
0

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