|
[QUOTE=MyDogBuster;382952]Reserving S232 as new to n=10K[/QUOTE]
Just checking if you have the base correct. This one has a conjecture of 447592. |
[QUOTE]Just checking if you have the base correct. This one has a conjecture of 447592. [/QUOTE]
Yup. That's the one. |
R226
Reserving R226 as new to n=10K
|
S232
Sierp Base = 232
Conjectured k = 447592 Covering Set = 5, 233, 2153 Trivial Factors = k == 2 mod 3(3) k == 6 mod 7(7) k == 10 mod 11(11) Found Primes: 229291k's Remaining: 2557k's - Tested to n=2.5K Trivial Factor Eliminations: 215077k's MOB Eliminations: 663k's GFN Eliminations: 3ks's all k's accounted for @ n=2500 PFGW used = 3.4.3 dated 2010/11/04 1324 primes found n=2.5K-10K 1233 remain at n=10k Results emailed - base released |
R226
Riesel Base = 226
Conjectured k = 158447 Covering Set = 7, 11, 211, 227, 241 Trivial Factors = k == 1 mod 3(3) k == 1 mod 5(5) Found Primes: 82878k's Remaining: 1384k's - Tested to n=2.5K Trivial Factor Eliminations: 73942k's MOB Eliminations: 242k's k's in balance @ n=2500 PFGW used = 3.4.3 dated 2010/11/04 638 primes found n=2.5K-10K 746 remain at n=10K Results emailed - Base released |
Reserving S231 to n=25K.
|
R232
Reserving R232 to n=10K
|
Reserving R225 and S225 to n=25K.
|
S231 is complete to n=25K; 99 primes were found for n=10K-25K shown below; 171 k's remain; base released.
Not bad for CK=251748. :-) Primes: [code] 14130*231^10007+1 204148*231^10115+1 112762*231^10229+1 33238*231^10294+1 156050*231^10318+1 130182*231^10330+1 5480*231^10393+1 62530*231^10416+1 59190*231^10536+1 4258*231^10542+1 134202*231^10574+1 178072*231^10699+1 116146*231^10704+1 158658*231^10809+1 237472*231^10889+1 165676*231^10941+1 205820*231^11084+1 122990*231^11328+1 150050*231^11331+1 237886*231^11609+1 237266*231^11689+1 207902*231^11696+1 37440*231^11732+1 221932*231^11921+1 115566*231^11978+1 193112*231^12016+1 16386*231^12176+1 129986*231^12211+1 67900*231^12305+1 112026*231^12349+1 214166*231^12404+1 223526*231^12408+1 147812*231^12425+1 148160*231^12429+1 136908*231^12549+1 100776*231^12616+1 46140*231^12626+1 62378*231^12697+1 42228*231^13068+1 48862*231^13139+1 81808*231^13151+1 208542*231^13247+1 156976*231^13465+1 70456*231^13948+1 21200*231^14416+1 184876*231^14434+1 13116*231^14495+1 92828*231^14519+1 109940*231^14950+1 176060*231^15440+1 72122*231^15487+1 147928*231^15679+1 236740*231^15753+1 79722*231^15756+1 112202*231^16018+1 213706*231^16093+1 85042*231^16180+1 222392*231^16259+1 15668*231^16689+1 200568*231^16821+1 164412*231^16919+1 49910*231^16922+1 225708*231^17154+1 77418*231^17211+1 245488*231^17420+1 176000*231^17465+1 74010*231^17503+1 6176*231^17629+1 165500*231^17669+1 112828*231^17910+1 85000*231^18184+1 217812*231^18249+1 241180*231^18353+1 150712*231^18603+1 185398*231^18720+1 136386*231^18765+1 180640*231^18855+1 6758*231^18922+1 85422*231^18993+1 202216*231^19013+1 193190*231^19509+1 48400*231^19823+1 181600*231^20457+1 216766*231^20490+1 168676*231^20534+1 43690*231^20549+1 204420*231^20829+1 165966*231^21211+1 208668*231^22221+1 176582*231^22312+1 119452*231^23102+1 74848*231^23515+1 132448*231^23565+1 181802*231^23574+1 206626*231^23762+1 177826*231^24113+1 161966*231^24250+1 158310*231^24407+1 245092*231^24566+1 [/code] |
S225 is complete to n=25K; 81 primes were found for n=10K-25K shown below; 139 k's remain; base released.
Primes: [code] 116938*225^10001+1 96766*225^10068+1 88656*225^10125+1 101494*225^10527+1 75934*225^10684+1 83568*225^10888+1 25588*225^11100+1 13160*225^11467+1 82626*225^11587+1 109484*225^11876+1 15250*225^11879+1 20830*225^11969+1 29040*225^12011+1 27524*225^12023+1 58790*225^12046+1 80542*225^12113+1 41918*225^12222+1 39820*225^12413+1 66206*225^12452+1 6816*225^12535+1 62728*225^12740+1 24974*225^12972+1 36044*225^12996+1 30208*225^13087+1 24770*225^13184+1 44074*225^13371+1 101778*225^13427+1 35568*225^13795+1 95212*225^13988+1 102302*225^13992+1 79772*225^14355+1 32704*225^14588+1 114696*225^14612+1 41020*225^14726+1 110538*225^14923+1 23762*225^14930+1 23592*225^15045+1 54742*225^15100+1 68812*225^15101+1 27218*225^15224+1 50674*225^15522+1 44412*225^15658+1 17846*225^15870+1 10592*225^15921+1 115458*225^16005+1 108592*225^16257+1 103138*225^16279+1 92088*225^16383+1 22708*225^16704+1 88098*225^16962+1 50684*225^17041+1 9468*225^17049+1 92044*225^17451+1 41846*225^17464+1 106326*225^17637+1 45644*225^17639+1 12890*225^17830+1 37744*225^18518+1 98700*225^18520+1 74468*225^18856+1 74656*225^19596+1 29104*225^19825+1 58156*225^20322+1 85094*225^20391+1 93968*225^20673+1 48216*225^20839+1 51930*225^21223+1 115950*225^21293+1 100406*225^21296+1 68598*225^21545+1 6134*225^21693+1 51072*225^22363+1 110176*225^22402+1 42280*225^22679+1 117246*225^22849+1 89982*225^22928+1 112898*225^23025+1 84606*225^23104+1 93870*225^23430+1 18138*225^24431+1 98114*225^24602+1 [/code] |
R225 is complete to n=25K; 104 primes were found for n=10K-25K shown below; 239 k's remain; base released.
Primes: [code] 143724*225^10037-1 73720*225^10095-1 163256*225^10128-1 32126*225^10136-1 92082*225^10178-1 49696*225^10418-1 574*225^10620-1 69186*225^10631-1 151792*225^10760-1 75568*225^10819-1 156792*225^10830-1 26360*225^10835-1 98712*225^10905-1 87850*225^10915-1 157654*225^11207-1 44522*225^11297-1 161584*225^11395-1 101446*225^11464-1 142960*225^11556-1 144528*225^11651-1 2648*225^11746-1 104176*225^11773-1 39086*225^11820-1 134848*225^11873-1 24838*225^11958-1 135210*225^11964-1 52994*225^12027-1 74128*225^12045-1 60876*225^12112-1 9278*225^12148-1 44026*225^12168-1 145028*225^12535-1 19122*225^12630-1 143980*225^12668-1 15372*225^12700-1 165938*225^12751-1 77994*225^12788-1 143628*225^12847-1 132944*225^12928-1 113598*225^12938-1 149322*225^12948-1 115906*225^13066-1 124778*225^13076-1 128950*225^13124-1 43944*225^13320-1 89730*225^13340-1 160824*225^13394-1 135938*225^13498-1 15508*225^13750-1 59346*225^13799-1 47074*225^13853-1 157512*225^13956-1 33562*225^13973-1 139554*225^14142-1 102854*225^14590-1 492*225^14824-1 85440*225^14895-1 151532*225^15104-1 128254*225^15208-1 143372*225^15250-1 117556*225^15479-1 160538*225^15593-1 39594*225^15682-1 71980*225^15964-1 115824*225^15966-1 72484*225^16122-1 118702*225^16249-1 155930*225^16265-1 53634*225^16288-1 78306*225^16342-1 61796*225^16513-1 75974*225^16557-1 112264*225^17059-1 72368*225^17175-1 151512*225^17304-1 138424*225^17570-1 78692*225^17815-1 49146*225^18032-1 51698*225^18342-1 11972*225^18520-1 102736*225^18520-1 159714*225^18757-1 154226*225^18813-1 149918*225^18895-1 78808*225^19259-1 137828*225^19347-1 84418*225^19455-1 62230*225^19560-1 115958*225^20271-1 64094*225^20444-1 31568*225^20637-1 83516*225^21195-1 73336*225^21734-1 134874*225^22087-1 131448*225^22760-1 52544*225^22808-1 28950*225^22939-1 113182*225^23232-1 62964*225^23535-1 156664*225^23548-1 157436*225^23695-1 119084*225^23787-1 116420*225^23901-1 56560*225^24935-1 [/code] |
| All times are UTC. The time now is 22:40. |
Powered by vBulletin® Version 3.8.11
Copyright ©2000 - 2021, Jelsoft Enterprises Ltd.