[1][1^^2] = prime! first delayed prime record nr 1

[2][1^^1] = prime!

[3][1^^3] = prime! a new delayed prime record nr 2

[4][1^^12] = prime! a new delayed prime record nr 3

[5][1^^1] = prime!

[6][1^^21] = prime! a new delayed prime record nr 4

[7][1^^2] = prime!

[8][1^^2] = prime!

[9][1^^1] = prime!

[10][1^^6] = prime!

[11][1^^1] = prime!

[12][1^^1] = prime!

[13][1^^314] = prime! a new delayed prime record nr 5

[14][1^^1] = prime!

[15][1^^3] = prime!

[16][1^^2] = prime!

[17][1^^1] = prime!

[18][1^^139] = prime!

[19][1^^20] = prime!

[20][1^^2] = prime!

[21][1^^n] = always composite set of four divisors (13, 3, 5, 3) that appear periodically

[22][1^^4] = prime!

[23][1^^2] = prime!

[24][1^^1] = prime!

[25][1^^2] = prime!

[26][1^^5] = prime!

[27][1^^17] = prime!

[28][1^^2] = prime!

[29][1^^1] = prime!

[30][1^^1] = prime!

[31][1^^2] = prime!

[32][1^^1] = prime!

[33][1^^11] = prime!

[34][1^^n] = possible candidate! n > 60000 a new delayed prime record nr 6

[35][1^^1] = prime!

[36][1^^5] = prime!

[37][1^^2] = prime!

[38][1^^2] = prime!

[39][1^^1] = prime!

[40][1^^6] = prime!

[41][1^^2] = prime!

[42][1^^1] = prime!

[43][1^^4] = prime!

[44][1^^1] = prime!

[45][1^^21] = prime!

[46][1^^2] = prime!

[47][1^^3] = prime!

[48][1^^7] = prime!

[49][1^^20] = prime!

[50][1^^1] = prime!

[51][1^^1] = prime!

[52][1^^6] = prime!

[53][1^^12] = prime!

[54][1^^1] = prime!

[55][1^^2] = prime!

[56][1^^1] = prime!

[57][1^^1] = prime!

[58][1^^10] = prime!

[59][1^^5] = prime!

[60][1^^23] = prime!

[61][1^^4] = prime!

[62][1^^3] = prime!

[63][1^^11] = prime!

[64][1^^32] = prime!

[65][1^^1] = prime!

[66][1^^5] = prime!

[67][1^^2] = prime!

[68][1^^14] = prime!

[69][1^^3] = prime!

[70][1^^22] = prime!

[71][1^^1] = prime!

[72][1^^1] = prime!

[73][1^^n] = always composite difference of two cubes

[74][1^^1] = prime!

[75][1^^1] = prime!

[76][1^^4] = prime!

[77][1^^1] = prime!

[78][1^^3] = prime!

[79][1^^280] = prime!

[80][1^^1] = prime!

[81][1^^5] = prime!

[82][1^^6] = prime!

[83][1^^3] = prime!

[84][1^^1] = prime!

[85][1^^2] = prime!

[86][1^^4] = prime!

[87][1^^3] = prime!

[88][1^^2] = prime!

[89][1^^3] = prime!

[90][1^^3] = prime!

[91][1^^10] = prime!

[92][1^^2] = prime!

[93][1^^27] = prime!

[94][1^^8] = prime!

[95][1^^1] = prime!

[96][1^^1] = prime!

[97][1^^2] = prime!

[98][1^^4] = prime!

[99][1^^11] = prime!

[100][1^^n] = always composite set of four divisors (3, 13, 3, 5) that appear periodically

[101][1^^1] = prime!

[102][1^^21] = prime!

[103][1^^6] = prime!

[104][1^^n] = always composite difference of two cubes

[105][1^^313] = prime!

[106][1^^2] = prime!

[107][1^^1] = prime!

[108][1^^n] = possible candidate! n > 25000

[109][1^^8] = prime!

[110][1^^1] = prime!

[111][1^^73] = prime!

[112][1^^2] = prime!

[113][1^^4] = prime!

[114][1^^3] = prime!

[115][1^^2] = prime!

[116][1^^1] = prime!

[117][1^^1] = prime!

[118][1^^2] = prime!

[119][1^^1] = prime!

[120][1^^17] = prime!

[121][1^^2] = prime!

[122][1^^1] = prime!

[123][1^^15] = prime!

[124][1^^4] = prime!

[125][1^^2] = prime!

[126][1^^1] = prime!

[127][1^^8] = prime!

[128][1^^3] = prime!

[129][1^^1] = prime!

[130][1^^2] = prime!

[131][1^^1] = prime!

[132][1^^7] = prime!

[133][1^^2] = prime!

[134][1^^4] = prime!

[135][1^^3] = prime!

[136][1^^2] = prime!

[137][1^^1] = prime!

[138][1^^3] = prime!

[139][1^^52] = prime!

[140][1^^2] = prime!

[141][1^^1] = prime!

[142][1^^66] = prime!

[143][1^^2] = prime!

[144][1^^1] = prime!

[145][1^^138] = prime!

[146][1^^49] = prime!

[147][1^^3] = prime!

[148][1^^30] = prime!

[149][1^^1] = prime!

[150][1^^1] = prime!

[151][1^^28] = prime!

[152][1^^1] = prime!

[153][1^^19] = prime!

[154][1^^8] = prime!

[155][1^^2] = prime!

[156][1^^1] = prime!

[157][1^^16] = prime!

[158][1^^4] = prime!

[159][1^^5] = prime!

[160][1^^6] = prime!

[161][1^^1] = prime!

[162][1^^1] = prime!

[163][1^^44] = prime!

[164][1^^7] = prime!

[165][1^^1] = prime!

[166][1^^6] = prime!

[167][1^^3] = prime!

[168][1^^n] = possible candidate! n > 10000

[169][1^^n] = always composite set of four divisors (3, 5, 3, 13) that appear periodically

[170][1^^1] = prime!

[171][1^^9] = prime!

[172][1^^4] = prime!

[173][1^^8] = prime!

[174][1^^5] = prime!

[175][1^^6] = prime!

[176][1^^1] = prime!

[177][1^^3] = prime!

[178][1^^108] = prime!

[179][1^^1] = prime!

[180][1^^3] = prime!

[181][1^^2] = prime!

[182][1^^2] = prime!

[183][1^^n] = always composite set of four divisors (5, 3, 13, 3) that appear periodically

[184][1^^4] = prime!

[185][1^^1] = prime!

[186][1^^1] = prime!

[187][1^^6] = prime!

[188][1^^2] = prime!

[189][1^^15] = prime!

[190][1^^n] = always composite difference of two cubes

[191][1^^4] = prime!

[192][1^^3] = prime!

[193][1^^6] = prime!

[194][1^^1] = prime!

[195][1^^5] = prime!

[196][1^^2] = prime!

[197][1^^3] = prime!

[198][1^^3] = prime!

[199][1^^56] = prime!

[200][1^^1] = prime!

[201][1^^1] = prime!

[202][1^^6] = prime!

[203][1^^2] = prime!

[204][1^^37] = prime!

[205][1^^30] = prime!

[206][1^^5] = prime!

[207][1^^1] = prime!

[208][1^^270] = prime!

[209][1^^4] = prime!

[210][1^^31] = prime!

[211][1^^2] = prime!

[212][1^^1] = prime!

[213][1^^107] = prime!

[214][1^^280] = prime!

[215][1^^1] = prime!

[216][1^^n] = always composite set of four divisors (13, 3, 5, 3) that appear periodically

[217][1^^16] = prime!

[218][1^^7] = prime!

[219][1^^1] = prime!

[220][1^^6] = prime!

[221][1^^2] = prime!

[222][1^^1] = prime!

[223][1^^2] = prime!

[224][1^^3] = prime!

[225][1^^1] = prime!

[226][1^^30] = prime!

[227][1^^2] = prime!

[228][1^^n] = possible candidate! n > 10000

[229][1^^4] = prime!

[230][1^^3] = prime!

[231][1^^401] = prime!

[232][1^^12] = prime!

[233][1^^10] = prime!

[234][1^^1] = prime!

[235][1^^174] = prime!

[236][1^^1] = prime!

[237][1^^7] = prime!

[238][1^^2] = prime!

[239][1^^1] = prime!

[240][1^^3] = prime!

[241][1^^6] = prime!

[242][1^^2] = prime!

[243][1^^3] = prime!

[244][1^^28] = prime!

[245][1^^6] = prime!

[246][1^^33] = prime!

[247][1^^2] = prime!

[248][1^^2] = prime!

[249][1^^1] = prime!

[250][1^^354] = prime!

[251][1^^2] = prime!

[252][1^^1] = prime!

[253][1^^4] = prime!

[254][1^^3] = prime!

[255][1^^3] = prime!

[256][1^^12] = prime!

[257][1^^4] = prime!

[258][1^^3] = prime!

[259][1^^20] = prime!

[260][1^^1] = prime!

[261][1^^1] = prime!

[262][1^^112] = prime!

[263][1^^6] = prime!

[264][1^^1] = prime!

[265][1^^10] = prime!

[266][1^^1] = prime!

[267][1^^1] = prime!

[268][1^^4] = prime!

[269][1^^1] = prime!

[270][1^^1] = prime!

[271][1^^12] = prime!

[272][1^^2] = prime!

[273][1^^n] = possible candidate! n > 60000 see [34][1^^n]

[274][1^^256] = prime!

[275][1^^2] = prime!

[276][1^^5] = prime!

[277][1^^2] = prime!

[278][1^^4] = prime!

[279][1^^19] = prime!

[280][1^^2] = prime!

[281][1^^36] = prime!

[282][1^^43] = prime!

[283][1^^2] = prime!

[284][1^^1] = prime!

[285][1^^1] = prime!

[286][1^^2] = prime!

[287][1^^1] = prime!

[288][1^^7] = prime!

[289][1^^4] = prime!

[290][1^^6] = prime!

[291][1^^n] = possible candidate! n > 10000

[292][1^^14] = prime!

[293][1^^3] = prime!

[294][1^^1611] = prime!

[295][1^^n] = always composite set of four divisors (3, 13, 3, 5) that appear periodically

[296][1^^13] = prime!

[297][1^^1] = prime!

[298][1^^2] = prime!

[299][1^^1] = prime!

[300][1^^13] = prime!

[301][1^^2] = prime!

[302][1^^1] = prime!

[303][1^^3] = prime!

[304][1^^40] = prime!

[305][1^^1] = prime!

[306][1^^5] = prime!

[307][1^^6] = prime!

[308][1^^3] = prime!

[309][1^^1] = prime!

[310][1^^514] = prime!

[311][1^^2] = prime!

[312][1^^9] = prime!

[313][1^^186] = prime!

[314][1^^3] = prime!

[315][1^^1] = prime!

[316][1^^2] = prime!

[317][1^^2] = prime!

[318][1^^3] = prime!

[319][1^^4] = prime!

[320][1^^7] = prime!

[321][1^^5] = prime!

[322][1^^8] = prime!

[323][1^^2] = prime!

[324][1^^1] = prime!

[325][1^^2] = prime!

[326][1^^1] = prime!

[327][1^^1] = prime!

[328][1^^2] = prime!

[329][1^^1] = prime!

[330][1^^225] = prime!

[331][1^^2] = prime!

[332][1^^1] = prime!

[333][1^^11] = prime!

[334][1^^8] = prime!

[335][1^^6] = prime!

[336][1^^1] = prime!

[337][1^^2] = prime!

[338][1^^22] = prime!

[339][1^^1] = prime!

[340][1^^14] = prime!

[341][1^^1] = prime!

[342][1^^37] = prime!

[343][1^^2] = prime!

[344][1^^1] = prime!

[345][1^^3] = prime!

[346][1^^2] = prime!

[347][1^^1] = prime!

[348][1^^3] = prime!

[349][1^^4] = prime!

[350][1^^1] = prime!

[351][1^^5] = prime!

[352][1^^4] = prime!

[353][1^^10] = prime!

[354][1^^1] = prime!

[355][1^^14] = prime!

[356][1^^10] = prime!

[357][1^^1] = prime!

[358][1^^2] = prime!

[359][1^^3] = prime!

[360][1^^9] = prime!

[361][1^^20] = prime!

[362][1^^1] = prime!

[363][1^^87] = prime!

[364][1^^n] = always composite set of four divisors (3, 5, 3, 13) that appear periodically

[365][1^^2] = prime!

[366][1^^13] = prime!

[367][1^^2] = prime!

[368][1^^2] = prime!

[369][1^^1] = prime!

[370][1^^2] = prime!

[371][1^^1] = prime!

[372][1^^3] = prime!

[373][1^^8] = prime!

[374][1^^3] = prime!

[375][1^^1] = prime!

[376][1^^4] = prime!

[377][1^^2] = prime!

[378][1^^n] = always composite set of four divisors (5, 3, 13, 3) that appear periodically

[379][1^^12] = prime!

[380][1^^1] = prime!

[381][1^^1] = prime!

[382][1^^54] = prime!

[383][1^^3] = prime!

[384][1^^3] = prime!

[385][1^^6] = prime!

[386][1^^1] = prime!

[387][1^^59] = prime!

[388][1^^2] = prime!

[389][1^^29] = prime!

[390][1^^1] = prime!

[391][1^^2] = prime!

[392][1^^1] = prime!

[393][1^^19] = prime!

[394][1^^4] = prime!

[395][1^^5] = prime!

[396][1^^1] = prime!

[397][1^^8] = prime!

[398][1^^32] = prime!

[399][1^^3] = prime!

[400][1^^2] = prime!

[401][1^^1] = prime!

[402][1^^1] = prime!

[403][1^^2] = prime!

[404][1^^68] = prime!

[405][1^^3] = prime!

[406][1^^8] = prime!

[407][1^^1] = prime!

[408][1^^7] = prime!

[409][1^^12] = prime!

[410][1^^2] = prime!