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Moved discussion about PRPnet to software/instructions thread at [url]http://mersenneforum.org/showthread.php?t=9742[/url].
|
Reserving R856 to n=25K for Ian and me.
Ian and I are also working together on R996. |
First S606 prime
Found my first prime on S606 sometime last night:
7266*606^26541+1 is prime! (122.7805s+0.0014s) 1 k down, 285 to go. |
[QUOTE]
Found my first prime on S606 sometime last night: 7266*606^26541+1 is prime! (122.7805s+0.0014s) 1 k down, 285 to go[/QUOTE] Congrats. There a people here who have been doing this for over 12 years. I'm one and of course Gary and probable 5 or 6 others. I've also done PG and SRBase but I always come "home". I find this a puzzle inside a riddle wrapped in an enigma. Plenty of work for eons. Your next goal should be to find a Top 5000. Won't happen with this reservation but you'll figure it out. And don't forget the ultimate goal of proving a conjecture. Ian (MyDogBuster) |
[QUOTE=germanNinja;485626]Found my first prime on S606 sometime last night:
7266*606^26541+1 is prime! (122.7805s+0.0014s) 1 k down, 285 to go.[/QUOTE] Congrats! In the future, please wait until you are at a nice round testing limit to report all primes. In this case, wait until you are at n=30K and then report all primes up to that point. This avoids inundating the threads with posts. |
Reserving S936 to n=100k (25-100k) for BOINC
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R856 is complete to n=10K; 541 primes found for n=2500-10K; 758 k's remain; continuing to n=25K.
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Reserving S878 up to n=125K. Last prime was on n=972, it is time for the next one. :smile:
|
Ian and I have completed R996 to n=25K; 222 primes were found for n=10K-25K shown below; 668 k's remain; base released.
[code] 21144*996^10028-1 24924*996^10032-1 30725*996^10125-1 17763*996^10134-1 14667*996^10216-1 10623*996^10259-1 14240*996^10327-1 5867*996^10340-1 35729*996^10355-1 23347*996^10435-1 33825*996^10435-1 7639*996^10557-1 32468*996^10560-1 38650*996^10573-1 42888*996^10629-1 6269*996^10640-1 31175*996^10643-1 23263*996^10674-1 47708*996^10684-1 49592*996^10791-1 21748*996^10821-1 8843*996^10828-1 45403*996^10838-1 50604*996^10969-1 47779*996^10998-1 44245*996^11005-1 12424*996^11008-1 16654*996^11021-1 1985*996^11067-1 49422*996^11118-1 12933*996^11198-1 18347*996^11224-1 25539*996^11232-1 32310*996^11250-1 17337*996^11265-1 26037*996^11324-1 44907*996^11326-1 38525*996^11352-1 11008*996^11492-1 15614*996^11519-1 16384*996^11567-1 11323*996^11588-1 25334*996^11618-1 8175*996^11677-1 35662*996^12044-1 607*996^12083-1 39559*996^12103-1 36480*996^12168-1 31748*996^12185-1 1409*996^12196-1 45405*996^12314-1 28725*996^12350-1 10669*996^12542-1 30032*996^12558-1 8697*996^12572-1 15613*996^12590-1 18090*996^12600-1 45300*996^12608-1 15215*996^12615-1 4570*996^12647-1 3957*996^12715-1 13738*996^12752-1 40583*996^12758-1 16050*996^12826-1 40672*996^12838-1 27539*996^12844-1 40702*996^12999-1 33418*996^13005-1 40884*996^13011-1 21695*996^13102-1 19727*996^13268-1 26105*996^13294-1 3660*996^13416-1 39694*996^13562-1 52448*996^13634-1 47028*996^13669-1 49597*996^13681-1 11040*996^13766-1 10418*996^13776-1 36458*996^13893-1 16483*996^13908-1 26693*996^14068-1 31648*996^14098-1 31483*996^14108-1 50848*996^14175-1 36412*996^14185-1 17084*996^14211-1 2188*996^14252-1 1033*996^14312-1 13568*996^14352-1 31305*996^14362-1 47253*996^14379-1 15492*996^14396-1 28984*996^14403-1 47370*996^14504-1 34302*996^14521-1 43695*996^14696-1 16405*996^14781-1 2970*996^14803-1 4027*996^14824-1 30942*996^14922-1 9900*996^14944-1 47624*996^15058-1 3462*996^15078-1 40679*996^15139-1 42970*996^15228-1 49354*996^15231-1 36354*996^15350-1 26678*996^15371-1 39649*996^15380-1 37047*996^15406-1 25479*996^15423-1 50012*996^15558-1 34133*996^15569-1 52187*996^15627-1 3975*996^15715-1 37423*996^15746-1 20794*996^15924-1 26798*996^15940-1 28062*996^15984-1 21817*996^16013-1 8304*996^16108-1 6312*996^16123-1 27139*996^16224-1 50864*996^16276-1 16059*996^16342-1 41474*996^16344-1 34505*996^16381-1 2899*996^16445-1 9185*996^16507-1 30542*996^16516-1 47083*996^16610-1 30864*996^16664-1 27703*996^16893-1 10179*996^16970-1 45323*996^16983-1 25143*996^17029-1 22058*996^17047-1 99*996^17102-1 28785*996^17143-1 5387*996^17171-1 19674*996^17183-1 21683*996^17184-1 51020*996^17240-1 26538*996^17290-1 20008*996^17461-1 17658*996^17475-1 48472*996^17594-1 27235*996^17626-1 273*996^17715-1 48302*996^17751-1 51232*996^17895-1 11068*996^17906-1 12399*996^17959-1 2164*996^18052-1 40968*996^18084-1 788*996^18122-1 45995*996^18126-1 10572*996^18154-1 5800*996^18164-1 51479*996^18184-1 29180*996^18269-1 35683*996^18279-1 46334*996^18382-1 11365*996^18407-1 23662*996^18468-1 27784*996^18607-1 35940*996^18697-1 42719*996^18938-1 7218*996^18956-1 7569*996^18961-1 48225*996^19006-1 21745*996^19087-1 33955*996^19141-1 26434*996^19162-1 37057*996^19314-1 11812*996^19612-1 13339*996^19659-1 4662*996^19704-1 36503*996^19859-1 40247*996^19955-1 10802*996^20147-1 32078*996^20160-1 2573*996^20364-1 34117*996^20500-1 40079*996^20702-1 47298*996^20767-1 38070*996^20840-1 16420*996^21202-1 4565*996^21295-1 8769*996^21374-1 27924*996^21382-1 9998*996^21474-1 2524*996^21549-1 23837*996^21592-1 15817*996^21654-1 50374*996^21727-1 24287*996^21744-1 24560*996^21962-1 43817*996^22185-1 39220*996^22207-1 28549*996^22221-1 37452*996^22252-1 34059*996^22289-1 22863*996^22367-1 50978*996^22418-1 40770*996^22461-1 4874*996^22953-1 6883*996^23044-1 36235*996^23076-1 14845*996^23184-1 46545*996^23307-1 50712*996^23457-1 1278*996^23568-1 16503*996^23946-1 11029*996^24351-1 26943*996^24483-1 9767*996^24583-1 14670*996^24721-1 13662*996^24929-1 52742*996^24929-1 47489*996^24992-1 [/code] |
I passed n=30k on S606 a few days ago, but I was too busy to post them at the time. Here they are:
[CODE]7266*606^26541+1 (mentioned in the last post) 39143*606^25831+1 7348*606^27192+1 43376*606^28758+1 5836*606^27870+1 11166*606^27078+1 8516*606^33180+1 6585*606^28449+1 20983*606^26763+1 23945*606^26795+1 23672*606^26831+1 19718*606^27467+1 27340*606^27123+1 29125*606^27173+1 4021*606^32095+1 9726*606^36568+1 15076*606^28244+1 5560*606^31038+1 36727*606^27726+1 27551*606^28006+1 45687*606^34248+1[/CODE]Overall, 21 ks eliminated. 265 ks remain. |
[QUOTE=germanNinja;486224]I passed n=30k on S606 a few days ago, but I was too busy to post them at the time. Here they are:
<snip> Overall, 21 ks eliminated. 265 ks remain.[/QUOTE] That's a lot of primes for n>30K. Are all k's at n>=30K ? In addition to the primes, please keep all results (residues) files and post (or Email) them to me when you are done with your reservation. |
Not all ks are at n=30k yet. I thought I mentioned the [B]average[/B] was n=30k, but apparently not. The average k is above n=30k, but I did not split up the work very evenly.
I am saving all the results files. I will email them to you Monday, the two week point we agreed on. |
[QUOTE=germanNinja;486299]Not all ks are at n=30k yet. I thought I mentioned the [B]average[/B] was n=30k, but apparently not. The average k is above n=30k, but I did not split up the work very evenly.
I am saving all the results files. I will email them to you Monday, the two week point we agreed on.[/QUOTE] I cannot easily reflect this on the pages. Please report again when all k's have reached n=30K. What I need with each status is all of the primes for a specific n-range for all k's. No more and no less. So what I would like to see here is only all of the primes for n=25K-30K. You can hold onto the primes for n>30K until all k's have reached n=35K or n=40K. |
[QUOTE=MisterBitcoin;485875]Reserving S878 up to n=125K. Last prime was on n=972, it is time for the next one. :smile:[/QUOTE]
Passed n=125K, no prime. Extending up to n=150K. |
R708 tested to n=100k (50-100k)
78 primes found, 236 remain Results emailed - Base released |
S918 tested to n=100k (25-100k)
97 primes found, 156 remain Results emailed - Base released |
R936 tested to n=100k (25-100k)
93 primes found, 91 remain Results emailed - Base released |
S936 tested to n=100k (25-100k)
81 primes found, 92 remain Results emailed - Base released |
S606
Now ALL ks are at n=30k. Here are the primes for n<=30k:
[CODE] 7266*606^26541+1 39143*606^25831+1 7348*606^27192+1 43376*606^28758+1 5836*606^27870+1 11166*606^27078+1 6585*606^28449+1 20983*606^26763+1 23945*606^26795+1 23672*606^26831+1 19718*606^27467+1 27340*606^27123+1 29125*606^27173+1 15076*606^28244+1 36727*606^27726+1 27551*606^28006+1 11413*606^29646+1 3356*606^28876+1 37881*606^28975+1 13163*606^29985+1 38293*606^29167+1 31575*606^29738+1 [/CODE] |
Reserving R516 to n=300k (100-300k) for BOINC
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Reserving S847 to n=25K for Ian and me.
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Reserving S711 to n=100k (25-100k) for BOINC
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S847 is complete to n=10K; 517 primes found for n=2500-10K; 753 k's remain; continuing to n=25K.
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S520
1 Attachment(s)
S520 is finally completed to n=700k. I've attached the residue file here. Please note that there may be some missing residues due to an early mixup on my part when using PFGW (and forgetting the appropriate flag). I'll go ahead and prepare a sieve file for n=700k-1M, k=369 and post it up when it's finished.
No primes were found for the single remaining k -- k=369. |
Ian and I have completed R856 to n=25K; 231 primes were found for n=10K-25K shown below; 527 k's remain; base released.
[code] 54609*856^10023-1 14463*856^10042-1 86732*856^10059-1 52988*856^10084-1 73679*856^10182-1 107195*856^10200-1 11288*856^10224-1 17483*856^10239-1 38564*856^10258-1 84965*856^10314-1 95580*856^10332-1 68270*856^10385-1 68828*856^10433-1 41304*856^10437-1 101409*856^10464-1 92130*856^10534-1 74027*856^10539-1 91128*856^10555-1 53442*856^10611-1 82125*856^10645-1 27959*856^10681-1 100158*856^10698-1 8498*856^10737-1 71432*856^10763-1 82695*856^10802-1 53475*856^10857-1 63120*856^10939-1 50814*856^10942-1 56414*856^10964-1 33413*856^11016-1 59900*856^11057-1 24194*856^11109-1 62465*856^11175-1 87894*856^11224-1 60608*856^11277-1 26657*856^11297-1 1152*856^11342-1 74958*856^11346-1 47408*856^11381-1 21312*856^11414-1 94100*856^11474-1 78290*856^11503-1 40833*856^11517-1 80169*856^11533-1 49092*856^11561-1 88202*856^11569-1 91932*856^11623-1 67307*856^11662-1 17525*856^11663-1 92628*856^11670-1 30437*856^11740-1 45369*856^11749-1 17513*856^11797-1 49539*856^11806-1 50163*856^11869-1 2529*856^11883-1 69147*856^11891-1 69525*856^11918-1 64257*856^12015-1 33377*856^12038-1 8033*856^12089-1 46580*856^12103-1 75378*856^12210-1 73347*856^12218-1 27624*856^12220-1 63219*856^12288-1 83519*856^12378-1 66662*856^12415-1 68117*856^12483-1 93335*856^12494-1 98802*856^12501-1 102129*856^12524-1 98465*856^12554-1 44384*856^12596-1 106472*856^12609-1 58932*856^12638-1 795*856^12654-1 62567*856^12658-1 57443*856^12728-1 23708*856^12775-1 98984*856^12827-1 50862*856^12920-1 99038*856^12985-1 89585*856^13011-1 95565*856^13100-1 12867*856^13127-1 86720*856^13143-1 81860*856^13188-1 41045*856^13221-1 77018*856^13272-1 52583*856^13305-1 46062*856^13347-1 74558*856^13402-1 43698*856^13403-1 88568*856^13449-1 75822*856^13471-1 37157*856^13487-1 106163*856^13576-1 61518*856^13648-1 159*856^13730-1 67610*856^13737-1 26097*856^13750-1 33474*856^13771-1 100838*856^13774-1 88767*856^14066-1 90653*856^14105-1 2720*856^14115-1 97695*856^14167-1 25610*856^14184-1 102173*856^14210-1 1425*856^14234-1 67058*856^14265-1 18623*856^14271-1 40517*856^14294-1 93692*856^14408-1 85485*856^14492-1 96644*856^14623-1 105980*856^14683-1 21447*856^14700-1 32817*856^14776-1 65150*856^14854-1 79938*856^14913-1 104492*856^14950-1 83367*856^15041-1 55778*856^15106-1 21894*856^15124-1 97868*856^15161-1 67523*856^15170-1 87200*856^15200-1 50430*856^15241-1 41780*856^15269-1 17648*856^15526-1 48042*856^15653-1 27542*856^15680-1 79907*856^15681-1 72993*856^15750-1 80424*856^15928-1 45327*856^15934-1 20003*856^16104-1 95715*856^16206-1 68574*856^16215-1 64950*856^16230-1 10767*856^16241-1 105473*856^16337-1 101033*856^16386-1 74429*856^16411-1 389*856^16490-1 61697*856^16490-1 54539*856^16492-1 50103*856^16511-1 93624*856^16634-1 82020*856^16651-1 25523*856^16700-1 7554*856^16843-1 37082*856^16874-1 72230*856^16956-1 86399*856^17037-1 14700*856^17281-1 40272*856^17377-1 1395*856^17416-1 21704*856^17457-1 78320*856^17565-1 59655*856^17858-1 3695*856^17859-1 66854*856^17864-1 100787*856^17872-1 12135*856^17906-1 101039*856^17911-1 69542*856^18156-1 30902*856^18363-1 984*856^18368-1 5552*856^18463-1 62940*856^18621-1 53664*856^18691-1 61322*856^18823-1 73658*856^18852-1 44900*856^19095-1 87777*856^19134-1 83115*856^19172-1 858*856^19395-1 1688*856^19420-1 108350*856^19535-1 85922*856^19592-1 85320*856^19646-1 14513*856^19687-1 97133*856^19751-1 40800*856^19799-1 82914*856^19854-1 21270*856^19959-1 95292*856^20018-1 23909*856^20072-1 37125*856^20075-1 52419*856^20159-1 97197*856^20223-1 42242*856^20856-1 29838*856^20979-1 15128*856^21343-1 21477*856^21347-1 52427*856^21401-1 31509*856^21429-1 81608*856^21567-1 21893*856^21579-1 92324*856^21728-1 21449*856^21797-1 107189*856^21894-1 53813*856^21923-1 6687*856^21970-1 31233*856^22052-1 23762*856^22329-1 40287*856^22783-1 40364*856^22810-1 21954*856^22840-1 73307*856^22868-1 68517*856^23086-1 77148*856^23168-1 68568*856^23255-1 29262*856^23292-1 34577*856^23372-1 29178*856^23433-1 49302*856^23536-1 24042*856^23558-1 27702*856^23676-1 6000*856^23729-1 74610*856^23757-1 3389*856^23831-1 61889*856^23916-1 52025*856^23951-1 53768*856^24151-1 47312*856^24579-1 94517*856^24668-1 83987*856^24713-1 [/code] |
1 Attachment(s)
[QUOTE=LaurV;477325]Let's say we are now at 400k, here attached log. I am still working it, assuming nobody wants to crunch it faster, keep it reserved for me.
[/QUOTE] R967 at 450k, no prime. Log below. [ATTACH]18227[/ATTACH] (edit after 13 hours :smile: super-red name comes with privileges, hehe - we forgot to say that we are continuing the work towards 500k, if it was not clear) |
Reserving R526 to n=300k (100-300k) for BOINC
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Reserving R775 to n=25K for Ian and me.
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S711 tested to n=100k (25-100k)
100 primes found, 201 remain Results emailed - Base released |
R516 tested to n=300k (100-300k)
1 prime found, 1 remain 78*516^130647-1 Results emailed - Base released |
Reserving R579 to n=300k (100-300k) for BOINC
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R775 is complete to n=10K; 576 primes found for n=2500-10K; 736 k's remain; continuing to n=25K.
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Ian and I have completed S847 to n=25K; 196 primes were found for n=10K-25K shown below; 557 k's remain; base released.
[code] 97330*847^10073+1 55668*847^10089+1 120730*847^10121+1 83992*847^10244+1 41506*847^10245+1 58600*847^10277+1 56038*847^10278+1 108636*847^10284+1 132052*847^10327+1 60462*847^10382+1 95382*847^10478+1 103084*847^10491+1 111882*847^10503+1 115752*847^10516+1 72252*847^10520+1 92244*847^10747+1 27792*847^10894+1 110518*847^10958+1 23602*847^11256+1 7458*847^11277+1 41718*847^11313+1 26254*847^11315+1 138118*847^11398+1 27672*847^11436+1 40198*847^11478+1 106798*847^11621+1 81030*847^11690+1 43878*847^11713+1 7834*847^11795+1 146602*847^11884+1 105994*847^11906+1 16576*847^11920+1 12918*847^11973+1 13156*847^12060+1 70662*847^12134+1 30628*847^12177+1 69894*847^12255+1 17982*847^12267+1 50092*847^12382+1 74548*847^12532+1 12562*847^12548+1 130350*847^12571+1 110134*847^12577+1 57822*847^12591+1 48954*847^12602+1 100732*847^12744+1 95898*847^12785+1 94746*847^12815+1 22174*847^12857+1 123076*847^12999+1 88818*847^13088+1 87604*847^13118+1 101826*847^13199+1 104166*847^13428+1 54894*847^13447+1 69786*847^13456+1 84334*847^13545+1 65716*847^13552+1 96186*847^13612+1 27534*847^13698+1 101358*847^13752+1 148228*847^13826+1 138354*847^13901+1 98812*847^13914+1 72934*847^13979+1 145140*847^14011+1 88774*847^14037+1 84844*847^14127+1 50266*847^14149+1 100426*847^14251+1 19338*847^14256+1 122796*847^14296+1 113448*847^14297+1 108598*847^14344+1 109002*847^14428+1 68830*847^14460+1 16162*847^14495+1 80958*847^14530+1 150466*847^14571+1 11512*847^14636+1 71838*847^14729+1 25176*847^14792+1 114*847^14797+1 110716*847^14889+1 34360*847^14949+1 133188*847^14961+1 134664*847^15201+1 85024*847^15415+1 144634*847^15533+1 91422*847^15535+1 138154*847^15582+1 70342*847^15618+1 69966*847^15672+1 20260*847^15699+1 72034*847^15826+1 106066*847^15843+1 144486*847^15889+1 102112*847^15948+1 20878*847^15952+1 41508*847^15969+1 121228*847^16105+1 143406*847^16227+1 133426*847^16261+1 143116*847^16291+1 132126*847^16657+1 28422*847^16675+1 82426*847^16708+1 16956*847^16897+1 17838*847^16989+1 112492*847^17040+1 6886*847^17104+1 70758*847^17161+1 36306*847^17196+1 22012*847^17211+1 39328*847^17372+1 80442*847^17451+1 93498*847^17473+1 93024*847^17559+1 56392*847^17667+1 119304*847^17710+1 126184*847^17730+1 102784*847^17817+1 53416*847^17845+1 137308*847^17850+1 21292*847^18252+1 109672*847^18327+1 147762*847^18355+1 105148*847^18377+1 70726*847^18679+1 24256*847^18740+1 121836*847^18789+1 148288*847^18813+1 125712*847^18840+1 135768*847^18889+1 128824*847^18921+1 70012*847^18935+1 79542*847^18952+1 141186*847^19001+1 144442*847^19138+1 82366*847^19267+1 91044*847^19459+1 25966*847^19491+1 11596*847^19524+1 77110*847^19524+1 18162*847^19827+1 38808*847^19904+1 119760*847^20018+1 69814*847^20223+1 37818*847^20233+1 145168*847^20394+1 85978*847^20600+1 130014*847^20635+1 29074*847^20686+1 74466*847^20724+1 15636*847^20872+1 86392*847^20902+1 128272*847^20931+1 2818*847^21062+1 76506*847^21392+1 3856*847^21592+1 35752*847^21766+1 90682*847^21791+1 55222*847^22024+1 65986*847^22024+1 141552*847^22086+1 5706*847^22087+1 120934*847^22207+1 25206*847^22232+1 20476*847^22591+1 37138*847^22644+1 115276*847^22812+1 246*847^22855+1 58186*847^22939+1 82896*847^23176+1 33432*847^23271+1 129018*847^23356+1 49686*847^23420+1 26128*847^23629+1 52192*847^23734+1 148176*847^23744+1 10848*847^23789+1 36366*847^23835+1 121644*847^23886+1 107566*847^23984+1 119508*847^24062+1 129408*847^24317+1 12862*847^24383+1 63594*847^24549+1 128418*847^24565+1 18324*847^24682+1 57846*847^24708+1 14262*847^24731+1 55588*847^24778+1 34588*847^24786+1 138384*847^24890+1 32004*847^24895+1 [/code] |
S606 n=35k
Here are the primes for S606 for 30k<n<=35k.
[CODE]8516*606^33180+1 4021*606^32095+1 5560*606^31038+1 45687*606^34248+1 47253*606^34452+1 14005*606^30195+1 47723*606^34830+1 36146*606^30879+1 14747*606^32138+1 10477*606^32807+1 30336*606^31736+1 31911*606^32450+1 29377*606^32709+1 36396*606^33240+1 33662*606^33316+1 28647*606^33970+1 22473*606^34293+1 37578*606^34848+1 26078*606^34384+1 [/CODE] |
Reserving R621 to n=25K for Ian and me.
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Reserving R590 to n=300k (100-300k) for BOINC
Reserving R598 to n=100k (25-100k) for BOINC Reserving R601 to n=300k (100-300k) for BOINC |
R526 tested to n=300k (100-300k)
nothing found, 3 remain Results emailed - Base released |
@Gary:
There is something wrong with the R601 sievefile: [CODE]25000000000000:M:1:601:257 482 299998[/CODE][CODE]21:37:22 (24936): Can't open init data file - running in standalone mode 21:37:22 (24936): wrapper (7.5.26012): starting 21:37:22 (24936): wrapper: running llr.exe (-d -oPgenInputFile=input.prp -oPgenOutputFile=primes.txt -oDiskWriteTime=10 -oOutputIterations=50000 -oResultsFileIterations=99999999 -t6) Base prime factor(s) taken : 601 Starting N-1 prime test of 482*601^299998+1 Using zero-padded AVX FFT length 448K, Pass1=448, Pass2=1K, 6 threads, a = 3 482*601^299998[B]+[/B]1, bit: 50000 / 2769348 [1.80%]. Time per bit: 0.682 ms. 482*601^299998[B]+[/B]1, bit: 100000 / 2769348 [3.61%]. Time per bit: 0.498 ms.[/CODE]Can you pls check? I think the header should be: 25000000000000:M:1:601:258 |
[QUOTE=rebirther;488161]@Gary:
There is something wrong with the R601 sievefile: [CODE]25000000000000:M:1:601:257 482 299998[/CODE][CODE]21:37:22 (24936): Can't open init data file - running in standalone mode 21:37:22 (24936): wrapper (7.5.26012): starting 21:37:22 (24936): wrapper: running llr.exe (-d -oPgenInputFile=input.prp -oPgenOutputFile=primes.txt -oDiskWriteTime=10 -oOutputIterations=50000 -oResultsFileIterations=99999999 -t6) Base prime factor(s) taken : 601 Starting N-1 prime test of 482*601^299998+1 Using zero-padded AVX FFT length 448K, Pass1=448, Pass2=1K, 6 threads, a = 3 482*601^299998[B]+[/B]1, bit: 50000 / 2769348 [1.80%]. Time per bit: 0.682 ms. 482*601^299998[B]+[/B]1, bit: 100000 / 2769348 [3.61%]. Time per bit: 0.498 ms.[/CODE]Can you pls check? I think the header should be: 25000000000000:M:1:601:258[/QUOTE] I think you're right. I will correct it within the next hour. I will also check a batch of sieve files that came in at the same time as that one. Edit: I checked all recent sieve file submissions. That was the only one with that problem. I have corrected it. |
R621 is complete to n=10K; 679 primes found for n=2500-10K; 749 k's remain; continuing to n=25K.
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Ian and I have completed R775 to n=25K; 199 primes were found for n=10K-25K shown below; 537 k's remain; base released.
[code] 108348*775^10008-1 121374*775^10070-1 7272*775^10214-1 121298*775^10246-1 157818*775^10266-1 75564*775^10277-1 33632*775^10281-1 12470*775^10377-1 16862*775^10489-1 143090*775^10524-1 169014*775^10553-1 99302*775^10586-1 24762*775^10593-1 30120*775^10632-1 126584*775^10706-1 142076*775^10799-1 147174*775^10806-1 70904*775^10897-1 114128*775^10962-1 155024*775^10967-1 39756*775^10980-1 41574*775^11017-1 169332*775^11113-1 95280*775^11145-1 159224*775^11161-1 93692*775^11205-1 166098*775^11280-1 137954*775^11281-1 8774*775^11400-1 39746*775^11419-1 68786*775^11427-1 32040*775^11438-1 40734*775^11491-1 168506*775^11518-1 59688*775^11623-1 13182*775^11665-1 66372*775^11737-1 134334*775^11754-1 27428*775^11818-1 35576*775^11845-1 133896*775^11856-1 4074*775^11938-1 142134*775^12122-1 165296*775^12147-1 48750*775^12157-1 89472*775^12253-1 58380*775^12317-1 47406*775^12325-1 103956*775^12454-1 51368*775^12474-1 102282*775^12508-1 78368*775^12596-1 170760*775^12671-1 79734*775^12675-1 158430*775^12732-1 133370*775^12876-1 158514*775^12880-1 27624*775^12975-1 53804*775^13027-1 162542*775^13050-1 20460*775^13093-1 163662*775^13131-1 169592*775^13136-1 26480*775^13292-1 28842*775^13348-1 135854*775^13406-1 33276*775^13502-1 109070*775^13520-1 166314*775^13570-1 68550*775^13598-1 18786*775^13695-1 121434*775^13718-1 95016*775^13729-1 72902*775^13862-1 55614*775^13865-1 80802*775^13885-1 36672*775^13904-1 61562*775^13915-1 97076*775^13923-1 146156*775^13956-1 87794*775^13982-1 83958*775^14052-1 130854*775^14085-1 157412*775^14094-1 86942*775^14107-1 20454*775^14108-1 27500*775^14108-1 168810*775^14130-1 88688*775^14158-1 61682*775^14206-1 158220*775^14219-1 94424*775^14324-1 114020*775^14365-1 46832*775^14405-1 53000*775^14417-1 64320*775^14469-1 16992*775^14638-1 12212*775^14659-1 40454*775^14984-1 21120*775^15022-1 46112*775^15029-1 94160*775^15138-1 17328*775^15140-1 141330*775^15189-1 2484*775^15194-1 99878*775^15208-1 64826*775^15386-1 44370*775^15410-1 26808*775^15602-1 136508*775^15677-1 150846*775^15681-1 22374*775^15687-1 37818*775^15710-1 116910*775^15734-1 86684*775^15740-1 96770*775^15754-1 109056*775^15773-1 113394*775^15773-1 165260*775^15943-1 90186*775^15991-1 34746*775^16080-1 167132*775^16087-1 104274*775^16186-1 28446*775^16200-1 137696*775^16250-1 8052*775^16295-1 64304*775^16305-1 67226*775^16350-1 40688*775^16351-1 31446*775^16357-1 26174*775^16455-1 90264*775^16570-1 36000*775^16679-1 59756*775^16734-1 64728*775^16819-1 15918*775^16943-1 44694*775^16966-1 143978*775^16972-1 7226*775^17023-1 128714*775^17037-1 99426*775^17067-1 65610*775^17072-1 590*775^17254-1 103130*775^17291-1 115916*775^17297-1 145598*775^17395-1 93524*775^17605-1 102056*775^17699-1 16586*775^17762-1 111092*775^17791-1 164486*775^17831-1 73650*775^18076-1 20946*775^18287-1 91358*775^18809-1 163446*775^19121-1 69932*775^19386-1 28154*775^19490-1 116520*775^19507-1 147548*775^19720-1 110592*775^19850-1 121554*775^19855-1 25994*775^20178-1 154610*775^20582-1 96570*775^20692-1 168474*775^20809-1 49548*775^20826-1 136866*775^20850-1 112334*775^21290-1 71490*775^21311-1 117660*775^21350-1 15986*775^21357-1 23886*775^21635-1 3708*775^21904-1 83192*775^22530-1 104844*775^22561-1 37038*775^22633-1 135194*775^22701-1 81762*775^22747-1 21792*775^22767-1 98366*775^22805-1 3774*775^22918-1 8934*775^23068-1 54338*775^23143-1 168752*775^23256-1 101106*775^23282-1 70130*775^23348-1 130122*775^23392-1 107102*775^23458-1 29196*775^23516-1 7544*775^23694-1 85998*775^23733-1 33272*775^23811-1 147464*775^23999-1 31518*775^24242-1 82352*775^24344-1 139470*775^24551-1 101270*775^24590-1 45200*775^24788-1 105374*775^24812-1 [/code] |
R590 tested to n=300k (100-300k)
nothing found, 3 remain Results emailed - Base released |
Reserving R976 to n=25K for Ian and me.
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R579 tested to n=300k (100-300k)
3 primes found, base proven 106*579^112337-1 114*579^162252-1 104*579^222402-1 Results emailed - Base released |
[QUOTE]R579 tested to n=300k (100-300k)
3 primes found, base proven 106*579^112337-1 114*579^162252-1 104*579^222402-1[/QUOTE] Nice job cleaning this up:max::fusion::bow wave: |
[QUOTE=rebirther;488969]R579 tested to n=300k (100-300k)
3 primes found, base proven 106*579^112337-1 114*579^162252-1 104*579^222402-1 Results emailed - Base released[/QUOTE] Excellent! I was hoping that we would get 2-3 proofs out of those 2k-3k bases for n=100k-200k or 300k. One down! :smile: |
R976 is complete to n=10K; 673 primes found for n=2500-10K; 828 k's remain; continuing to n=25K.
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R601 tested to n=300k (100-300k)
nothing found, 3 remain Results emailed - Base released |
Ian and I have completed R621 to n=25K; 233 primes were found for n=10K-25K shown below; 516 k's remain; base released.
[code] 60168*621^10040-1 172670*621^10054-1 74952*621^10067-1 78442*621^10077-1 125558*621^10084-1 4728*621^10118-1 161940*621^10122-1 99278*621^10159-1 110178*621^10246-1 92810*621^10254-1 44210*621^10336-1 53388*621^10340-1 140360*621^10349-1 27650*621^10525-1 88158*621^10529-1 52460*621^10547-1 169030*621^10571-1 19070*621^10576-1 172968*621^10594-1 177580*621^10614-1 145858*621^10644-1 34368*621^10646-1 17988*621^10662-1 126702*621^10666-1 96452*621^10681-1 172558*621^10727-1 14908*621^10864-1 24924*621^10879-1 67638*621^10951-1 14498*621^10978-1 53988*621^10979-1 9062*621^11003-1 130942*621^11018-1 58782*621^11025-1 106968*621^11025-1 174730*621^11031-1 101554*621^11080-1 88388*621^11149-1 42020*621^11267-1 146930*621^11289-1 53788*621^11340-1 71608*621^11340-1 145744*621^11408-1 32410*621^11463-1 8594*621^11467-1 85444*621^11491-1 179338*621^11560-1 159410*621^11609-1 146182*621^11726-1 157840*621^12023-1 184758*621^12063-1 137934*621^12128-1 57418*621^12162-1 157288*621^12175-1 115314*621^12191-1 165218*621^12254-1 18780*621^12262-1 42420*621^12319-1 66070*621^12344-1 90160*621^12395-1 127094*621^12469-1 141828*621^12523-1 131300*621^12550-1 143048*621^12600-1 22012*621^12603-1 32070*621^12623-1 95902*621^12623-1 150264*621^12666-1 44984*621^12690-1 8072*621^12742-1 40672*621^12982-1 139142*621^12994-1 164870*621^13008-1 84282*621^13047-1 94284*621^13064-1 60588*621^13119-1 167010*621^13165-1 121300*621^13196-1 117638*621^13384-1 24390*621^13461-1 189764*621^13531-1 141762*621^13570-1 175354*621^13669-1 108342*621^13702-1 102548*621^13724-1 6088*621^13732-1 121074*621^13839-1 31184*621^13856-1 124244*621^13857-1 48954*621^13913-1 30770*621^13974-1 30438*621^13983-1 190098*621^13993-1 164142*621^13994-1 151218*621^14081-1 161924*621^14088-1 182950*621^14098-1 130992*621^14135-1 32114*621^14196-1 113012*621^14309-1 112862*621^14378-1 48484*621^14418-1 168422*621^14466-1 27922*621^14489-1 38828*621^14554-1 19750*621^14698-1 92832*621^14746-1 86748*621^14762-1 115230*621^14825-1 36388*621^14961-1 145262*621^14995-1 131920*621^15020-1 60822*621^15052-1 6194*621^15074-1 73648*621^15239-1 150208*621^15300-1 149842*621^15401-1 34434*621^15536-1 34004*621^15651-1 44704*621^15717-1 43752*621^15757-1 54860*621^15874-1 1390*621^15900-1 66774*621^16073-1 43052*621^16217-1 133540*621^16217-1 63290*621^16302-1 113884*621^16323-1 144798*621^16330-1 49300*621^16382-1 184404*621^16394-1 175438*621^16427-1 74972*621^16431-1 159342*621^16433-1 39238*621^16467-1 86560*621^16554-1 151584*621^16589-1 42348*621^16684-1 134564*621^16779-1 61392*621^17041-1 13050*621^17081-1 169504*621^17143-1 12550*621^17251-1 126492*621^17421-1 159128*621^17564-1 72464*621^17571-1 38880*621^17622-1 29374*621^17683-1 134542*621^17727-1 118464*621^17783-1 103562*621^17798-1 40472*621^17866-1 28200*621^17868-1 46010*621^17872-1 92128*621^17894-1 145120*621^17895-1 122272*621^17999-1 7594*621^18140-1 173120*621^18148-1 17104*621^18192-1 90352*621^18300-1 68584*621^18363-1 3160*621^18371-1 43524*621^18403-1 183670*621^18589-1 82888*621^18596-1 185860*621^18608-1 158658*621^18628-1 39498*621^18725-1 182350*621^18730-1 150678*621^18812-1 114992*621^18849-1 97574*621^18893-1 136454*621^19004-1 16974*621^19061-1 11994*621^19070-1 45324*621^19250-1 83628*621^19369-1 116378*621^19487-1 86102*621^19613-1 35754*621^19665-1 55670*621^19685-1 78038*621^19759-1 69074*621^19803-1 181562*621^19838-1 173578*621^20060-1 146884*621^20241-1 155684*621^20256-1 120942*621^20374-1 176808*621^20423-1 117844*621^20444-1 127612*621^20484-1 110542*621^20800-1 94604*621^20879-1 104644*621^20949-1 131882*621^20970-1 34732*621^21006-1 72122*621^21253-1 182150*621^21266-1 101372*621^21267-1 101494*621^21355-1 121622*621^21464-1 125674*621^21615-1 31458*621^21775-1 50274*621^21834-1 41932*621^22045-1 58784*621^22414-1 110212*621^22581-1 185524*621^22604-1 68220*621^22609-1 125478*621^22989-1 37960*621^23016-1 182978*621^23050-1 2798*621^23056-1 140232*621^23071-1 69274*621^23149-1 167590*621^23471-1 28582*621^23575-1 59188*621^23579-1 75428*621^23656-1 146338*621^24112-1 143768*621^24153-1 8732*621^24215-1 156222*621^24513-1 51200*621^24544-1 83658*621^24676-1 5052*621^24682-1 168398*621^24695-1 166568*621^24742-1 92658*621^24775-1 115548*621^24814-1 187468*621^24926-1 12134*621^24989-1 [/code] |
R598 tested to n=100k (25-100k)
135 primes found, 231 remain Results emailed - Base released |
Reserving R634 to n=300k (100-300k) for BOINC
Reserving R686 to n=300k (100-300k) for BOINC Reserving R712 to n=300k (100-300k) for BOINC |
Reserving R940 to n=100k (25-100k) for BOINC
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1 Attachment(s)
S520, n=700k-1M, is sieved to P=200e12. There are 9059 surviving candidates for the sole remaining k=369.
File is attached. |
1 Attachment(s)
[QUOTE=MisterBitcoin;486370]Passed n=125K, no prime. Extending up to n=150K.[/QUOTE]
Reached n=150K, no prime found. Releasing this base. Reserving S805 up to n=150K. |
Reserving S1005 to n=100k (25-100k) for BOINC
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R634 tested to n=300k (100-300k)
nothing found, 2 remain Results emailed - Base released |
Reserving R720 to n=300k (100-300k) for BOINC
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1 Attachment(s)
Base S805 is PROVEN!
[CODE] 340*805^125637+1 is prime! (365079 decimal digits) Time : 276.704 sec. 588*805^153593+1 is prime! (446313 decimal digits) Time : 375.179 sec.[/CODE] Reserving S835 up to n=150K. |
[QUOTE=MisterBitcoin;490413]Base S805 is PROVEN!
[CODE] 340*805^125637+1 is prime! (365079 decimal digits) Time : 276.704 sec. 588*805^153593+1 is prime! (446313 decimal digits) Time : 375.179 sec.[/CODE] Reserving S835 up to n=150K.[/QUOTE] Very nice!! Our second proof of 2018! :smile: |
Ian and I have completed R976 to n=25K; 283 primes were found for n=10K-25K shown below; 545 k's remain; base released.
[code] 37728*976^10013-1 108890*976^10025-1 76754*976^10087-1 632*976^10119-1 101975*976^10120-1 107604*976^10120-1 148325*976^10154-1 100245*976^10210-1 124904*976^10222-1 143037*976^10301-1 127200*976^10365-1 27032*976^10386-1 140060*976^10404-1 90077*976^10421-1 138065*976^10457-1 83972*976^10464-1 153654*976^10471-1 15203*976^10528-1 3623*976^10540-1 82452*976^10565-1 121809*976^10605-1 15219*976^10612-1 104777*976^10622-1 87099*976^10646-1 86147*976^10664-1 71147*976^10667-1 143565*976^10699-1 57705*976^10750-1 37247*976^10759-1 82334*976^10759-1 68297*976^10763-1 43587*976^10775-1 30938*976^10793-1 153417*976^10818-1 150408*976^10861-1 94367*976^10890-1 60732*976^10899-1 18080*976^10920-1 47627*976^10927-1 146379*976^11024-1 117738*976^11146-1 94635*976^11168-1 119597*976^11213-1 13878*976^11237-1 71294*976^11272-1 103280*976^11341-1 124730*976^11367-1 148860*976^11392-1 83478*976^11400-1 66315*976^11433-1 126104*976^11444-1 30183*976^11519-1 49863*976^11544-1 152682*976^11590-1 1514*976^11605-1 57543*976^11618-1 59078*976^11637-1 11553*976^11653-1 28169*976^11657-1 73142*976^11672-1 15230*976^11691-1 22464*976^11691-1 15648*976^11696-1 123903*976^11703-1 5274*976^11736-1 137679*976^11739-1 111465*976^11745-1 75780*976^11801-1 58289*976^11808-1 134472*976^11847-1 124343*976^11907-1 18119*976^11916-1 104184*976^11926-1 10958*976^11941-1 66032*976^12013-1 106694*976^12028-1 14634*976^12064-1 147563*976^12082-1 89489*976^12097-1 19343*976^12109-1 120170*976^12112-1 142335*976^12136-1 13100*976^12153-1 4059*976^12158-1 32634*976^12225-1 103289*976^12322-1 16115*976^12368-1 140915*976^12380-1 50492*976^12401-1 120629*976^12402-1 125055*976^12462-1 151374*976^12497-1 48210*976^12523-1 80390*976^12545-1 79922*976^12550-1 7332*976^12559-1 92490*976^12641-1 37437*976^12807-1 137339*976^12853-1 77465*976^12859-1 89183*976^12879-1 17354*976^12993-1 126999*976^12994-1 14430*976^13020-1 107703*976^13070-1 93104*976^13071-1 100733*976^13094-1 106787*976^13110-1 124670*976^13182-1 116363*976^13251-1 100158*976^13346-1 98573*976^13360-1 54713*976^13379-1 152393*976^13399-1 20667*976^13471-1 2895*976^13605-1 52853*976^13645-1 56840*976^13923-1 129380*976^13952-1 23535*976^13994-1 26018*976^14017-1 100548*976^14022-1 122603*976^14106-1 14390*976^14109-1 109523*976^14116-1 80882*976^14147-1 145950*976^14348-1 132114*976^14440-1 70320*976^14462-1 10169*976^14494-1 108242*976^14641-1 19143*976^14748-1 98120*976^14869-1 34733*976^14914-1 2084*976^14921-1 90872*976^14933-1 13725*976^15142-1 32640*976^15169-1 46380*976^15304-1 142763*976^15330-1 41264*976^15376-1 73409*976^15378-1 135635*976^15381-1 72435*976^15643-1 7460*976^15671-1 64178*976^15673-1 87375*976^15700-1 81122*976^15707-1 37227*976^15723-1 60033*976^15790-1 145332*976^15908-1 99228*976^15921-1 99933*976^15944-1 71132*976^15950-1 111543*976^15999-1 74427*976^16046-1 115757*976^16097-1 149588*976^16196-1 41960*976^16221-1 75038*976^16302-1 25068*976^16329-1 81764*976^16332-1 116679*976^16389-1 51314*976^16391-1 147372*976^16444-1 16643*976^16492-1 46925*976^16542-1 41564*976^16665-1 152193*976^16738-1 105033*976^16820-1 68540*976^16908-1 29322*976^16960-1 26088*976^17008-1 24864*976^17077-1 4100*976^17254-1 57153*976^17303-1 87159*976^17340-1 37602*976^17510-1 104255*976^17554-1 104457*976^17563-1 76752*976^17619-1 67113*976^17627-1 132209*976^17710-1 57647*976^17756-1 69167*976^17838-1 87092*976^17956-1 110049*976^17987-1 103703*976^18011-1 23279*976^18046-1 140033*976^18046-1 65684*976^18067-1 43800*976^18094-1 91610*976^18209-1 117693*976^18225-1 54402*976^18238-1 23174*976^18275-1 18365*976^18329-1 134075*976^18453-1 97602*976^18467-1 133334*976^18513-1 31205*976^18594-1 121925*976^18667-1 115893*976^18697-1 9602*976^18766-1 133800*976^18920-1 61094*976^19042-1 137042*976^19112-1 66728*976^19120-1 17189*976^19255-1 132285*976^19374-1 60902*976^19441-1 85104*976^19485-1 77049*976^19580-1 22997*976^19644-1 121818*976^19657-1 103002*976^19740-1 29613*976^19866-1 76047*976^19871-1 52104*976^20035-1 129680*976^20038-1 152184*976^20143-1 83288*976^20153-1 73098*976^20259-1 73478*976^20276-1 143252*976^20309-1 79422*976^20457-1 45113*976^20517-1 126494*976^20679-1 141063*976^20710-1 136697*976^20765-1 116952*976^20769-1 77399*976^20847-1 113532*976^20958-1 125228*976^21119-1 1362*976^21136-1 128945*976^21257-1 72068*976^21289-1 92427*976^21497-1 37899*976^21537-1 89657*976^21575-1 120614*976^21691-1 54930*976^21778-1 87923*976^21824-1 134825*976^21830-1 61007*976^21853-1 83208*976^21979-1 149430*976^22144-1 106527*976^22186-1 63947*976^22191-1 61295*976^22261-1 91004*976^22326-1 92955*976^22477-1 51083*976^22509-1 13022*976^22539-1 58185*976^22579-1 123593*976^22736-1 56309*976^22825-1 125439*976^22942-1 58749*976^22979-1 6300*976^23061-1 137648*976^23070-1 72824*976^23097-1 13212*976^23199-1 22292*976^23268-1 120404*976^23537-1 42269*976^23606-1 62967*976^23633-1 70083*976^23651-1 132555*976^23658-1 34250*976^23722-1 87354*976^23763-1 139775*976^23771-1 94337*976^23873-1 11255*976^23958-1 67917*976^23966-1 9797*976^24082-1 128694*976^24366-1 98298*976^24390-1 124878*976^24390-1 122124*976^24450-1 26970*976^24629-1 144333*976^24947-1 38699*976^24985-1 [/code] |
R686 tested to n=300k (100-300k)
1 prime found, 2 remain 199*686^215171-1 Results emailed - Base released |
Reserving R780 to n=300k (100-300k) for BOINC
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R940 tested to n=100k (25-100k)
133 primes found, 242 remain Results emailed - Base released |
Reserving S735 to n=25K for Ian and me.
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R720 tested to n=300k (100-300k)
nothing found, 3 remain Results emailed - Base released |
Reserving R806 to n=400k (100-400k) for BOINC
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R712 tested to n=300k (100-300k)
2 primes found, 1 remain 114*712^127240-1 51*712^202369-1 Results emailed - Base released |
Reserving R813 to n=300k (100-300k) for BOINC
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S735 is complete to n=10K; 709 primes found for n=2500-10K; 1006 k's remain; continuing to n=25K.
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S835 passed 153K, no prime. Extending up to 200K.
Also reserving R997 as new base, going up to n=10K. |
1 Attachment(s)
[QUOTE=MisterBitcoin;491285]Also reserving R997 as new base, going up to n=10K.[/QUOTE]
I tested this one to n=2500 so attached is the k's remaining file to get you started. :-) |
[QUOTE=gd_barnes;491291]I tested this one to n=2500 so attached is the k's remaining file to get you started. :-)[/QUOTE]
Just passed n=~2147. Generating a sieve file will last longer, even if LLR is faster than pfgw. Thanks anyway, if you have any other file worked up to n=2500 let me know. I should have enough resources to start an other base in 2-3 days. |
1 Attachment(s)
Our R967 base reached 500k, and the prime still eluded us. We will like to unreserve it for now, as we will move our resources towards other goals for a while. Log attached. If anything (between 450k and 453k) appears as doubled with the former report, we DID NOT double check them, it is just that at the time we reported last time (the 450k), some workers were faster than others and they reached into 453k already before the slower finished their 450k range. As we now reported 450k to 500k, some results are doubled, but it was no double check done. If one would find a prime now for this base, them the prime will have about 1.5 million digits, or more.
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Reserving R840 to n=25K for Ian and me.
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Reserving R814 to n=300k (100-300k) for BOINC
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R813 tested to n=300k (100-300k)
2 primes found, 1 remain 76*813^120762-1 34*813^189659-1 Results emailed - Base released |
S1005 tested to n=100k (25-100k)
161 primes found, 225 remain Results emailed - Base released |
Ian and I have completed S735 to n=25K; 285 primes were found for n=10K-25K shown below; 721 k's remain; base released.
[code] 39032*735^10020+1 119526*735^10033+1 12836*735^10036+1 109130*735^10038+1 173212*735^10049+1 70124*735^10058+1 125374*735^10066+1 144194*735^10110+1 117378*735^10128+1 47800*735^10132+1 144396*735^10136+1 28012*735^10150+1 165376*735^10163+1 117998*735^10172+1 84924*735^10198+1 28882*735^10259+1 170358*735^10261+1 103282*735^10341+1 132084*735^10420+1 43524*735^10463+1 7522*735^10500+1 129148*735^10509+1 154170*735^10578+1 102680*735^10605+1 40394*735^10616+1 84860*735^10690+1 29554*735^10705+1 33142*735^10717+1 171176*735^10739+1 104102*735^10776+1 164336*735^10802+1 778*735^10834+1 72762*735^10853+1 17144*735^10933+1 152192*735^10970+1 123688*735^10973+1 3178*735^11002+1 9158*735^11017+1 38942*735^11053+1 3758*735^11160+1 135630*735^11175+1 22240*735^11195+1 23852*735^11196+1 38742*735^11199+1 147184*735^11223+1 38342*735^11226+1 28358*735^11255+1 106376*735^11274+1 109428*735^11305+1 87546*735^11328+1 78290*735^11363+1 166038*735^11370+1 138346*735^11376+1 17272*735^11377+1 73820*735^11398+1 9266*735^11516+1 80856*735^11530+1 123994*735^11536+1 98514*735^11551+1 50210*735^11608+1 12442*735^11677+1 6324*735^11691+1 104998*735^11697+1 81030*735^11746+1 7476*735^11792+1 77296*735^11802+1 130204*735^11820+1 148512*735^11870+1 168752*735^11958+1 14374*735^12005+1 159368*735^12014+1 147014*735^12093+1 52806*735^12103+1 31804*735^12142+1 28360*735^12160+1 15818*735^12167+1 165326*735^12187+1 93220*735^12250+1 162498*735^12258+1 146054*735^12262+1 51134*735^12332+1 61412*735^12454+1 117026*735^12636+1 43182*735^12641+1 160104*735^12706+1 36362*735^12767+1 71416*735^12786+1 139168*735^12805+1 121094*735^12869+1 131812*735^12871+1 35912*735^12915+1 30980*735^12953+1 77348*735^13001+1 27320*735^13100+1 91930*735^13101+1 88850*735^13104+1 73014*735^13251+1 62170*735^13324+1 76320*735^13405+1 82592*735^13411+1 31480*735^13434+1 126982*735^13469+1 82362*735^13495+1 29002*735^13515+1 105464*735^13586+1 45608*735^13631+1 137748*735^13708+1 173698*735^13721+1 167648*735^13758+1 150582*735^13764+1 43862*735^13838+1 32592*735^13868+1 11680*735^13897+1 135068*735^13898+1 61608*735^13961+1 65264*735^13984+1 80948*735^14027+1 48876*735^14144+1 31256*735^14189+1 132638*735^14216+1 74580*735^14223+1 141356*735^14233+1 19068*735^14258+1 130156*735^14303+1 137970*735^14305+1 149478*735^14434+1 148406*735^14480+1 63556*735^14533+1 94040*735^14550+1 99880*735^14669+1 116588*735^14702+1 62630*735^14710+1 54808*735^14743+1 109032*735^14750+1 168610*735^14848+1 4232*735^14918+1 80174*735^14940+1 30948*735^14988+1 161448*735^14995+1 144140*735^15075+1 55628*735^15123+1 138068*735^15307+1 156778*735^15375+1 148240*735^15397+1 70516*735^15430+1 99816*735^15433+1 132888*735^15450+1 162828*735^15500+1 103934*735^15514+1 124582*735^15542+1 10604*735^15610+1 68288*735^15806+1 155634*735^15867+1 33326*735^15889+1 173396*735^15925+1 125742*735^15942+1 139864*735^15972+1 8874*735^16028+1 114424*735^16107+1 112188*735^16199+1 49788*735^16270+1 62032*735^16390+1 5794*735^16441+1 92496*735^16539+1 79868*735^16605+1 122336*735^16627+1 151824*735^16646+1 18628*735^16700+1 27850*735^16740+1 127892*735^16764+1 24568*735^16766+1 170774*735^16767+1 117046*735^16779+1 103716*735^16786+1 31170*735^16806+1 117644*735^16823+1 141050*735^16859+1 30852*735^16886+1 42380*735^16971+1 144442*735^16978+1 92176*735^17030+1 93782*735^17184+1 131214*735^17303+1 135370*735^17305+1 169148*735^17400+1 88020*735^17441+1 16082*735^17487+1 113602*735^17509+1 150658*735^17566+1 129964*735^17579+1 56218*735^17598+1 156194*735^17674+1 78172*735^17804+1 28554*735^17858+1 140414*735^17871+1 63030*735^17884+1 89402*735^17894+1 92958*735^17978+1 39634*735^17979+1 103982*735^18269+1 83012*735^18307+1 117466*735^18370+1 158956*735^18398+1 167470*735^18400+1 95578*735^18459+1 113918*735^18555+1 39894*735^18608+1 55304*735^18644+1 75554*735^18665+1 164012*735^18701+1 165248*735^18745+1 109142*735^18817+1 151062*735^18889+1 80800*735^18890+1 132686*735^18907+1 55084*735^19059+1 35846*735^19148+1 170112*735^19189+1 155580*735^19209+1 118166*735^19230+1 160292*735^19261+1 15386*735^19355+1 120542*735^19371+1 90762*735^19373+1 145096*735^19440+1 133240*735^19444+1 148464*735^19493+1 169074*735^19512+1 47692*735^19520+1 8488*735^19530+1 103386*735^19536+1 86444*735^19569+1 93264*735^19607+1 49964*735^19608+1 32322*735^19708+1 39548*735^19822+1 138712*735^19851+1 129754*735^19928+1 23614*735^20028+1 42244*735^20126+1 102582*735^20171+1 137348*735^20252+1 103708*735^20398+1 41260*735^20424+1 65706*735^20616+1 122062*735^20728+1 69070*735^20770+1 163782*735^20995+1 27420*735^21001+1 116404*735^21190+1 99660*735^21372+1 106422*735^21388+1 69390*735^21417+1 164382*735^21420+1 114448*735^21432+1 13562*735^21489+1 50440*735^21600+1 48936*735^21810+1 56328*735^21826+1 23804*735^21855+1 88624*735^21926+1 172624*735^21958+1 143392*735^22079+1 109456*735^22187+1 32176*735^22203+1 147684*735^22218+1 47450*735^22424+1 21662*735^22655+1 49908*735^22760+1 139532*735^22790+1 142072*735^22812+1 86884*735^22864+1 1968*735^22897+1 38572*735^22898+1 111366*735^22962+1 42324*735^22964+1 146730*735^23051+1 70792*735^23739+1 63180*735^23999+1 156146*735^24033+1 39674*735^24425+1 76016*735^24682+1 22670*735^24773+1 12996*735^24778+1 129978*735^24952+1 [/code] |
Reserving R816 to n=300k (100-300k) for BOINC
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R780 tested to n=300k (100-300k)
1 prime found, 2 remain 221*780^258841-1 Results emailed - Base released |
Ian and I have completed R840 to n=25K; 257 primes were found for n=10K-25K shown below; 760 k's remain; base released.
[code] 29049*840^10028-1 49069*840^10035-1 65272*840^10045-1 76975*840^10057-1 36139*840^10060-1 31697*840^10069-1 7483*840^10293-1 61612*840^10352-1 70975*840^10357-1 48381*840^10452-1 19371*840^10502-1 6785*840^10524-1 30451*840^10559-1 61395*840^10565-1 65164*840^10569-1 30304*840^10582-1 35771*840^10661-1 32653*840^10672-1 42803*840^10688-1 78876*840^10715-1 80994*840^10759-1 21343*840^10778-1 70158*840^10800-1 38830*840^10816-1 61067*840^10832-1 35447*840^10841-1 42958*840^10877-1 34594*840^10886-1 38020*840^10921-1 71432*840^10963-1 27233*840^11002-1 71135*840^11005-1 31794*840^11123-1 12556*840^11162-1 44512*840^11207-1 76124*840^11238-1 1314*840^11245-1 4376*840^11289-1 17136*840^11355-1 14327*840^11381-1 54120*840^11445-1 75089*840^11447-1 30275*840^11478-1 59854*840^11538-1 39412*840^11563-1 19690*840^11642-1 47423*840^11661-1 28334*840^11871-1 15676*840^11902-1 31550*840^11937-1 43932*840^11983-1 80329*840^12178-1 20545*840^12198-1 655*840^12216-1 13443*840^12234-1 53803*840^12269-1 83519*840^12284-1 73870*840^12484-1 31319*840^12512-1 57071*840^12562-1 74372*840^12609-1 8286*840^12612-1 46605*840^12665-1 8236*840^12698-1 63712*840^12780-1 65885*840^12783-1 56816*840^12833-1 13821*840^12846-1 81889*840^12856-1 53838*840^12866-1 59665*840^12912-1 62330*840^12916-1 40934*840^12959-1 54026*840^13052-1 79032*840^13102-1 39033*840^13192-1 57891*840^13266-1 81576*840^13286-1 5393*840^13310-1 70587*840^13323-1 10905*840^13365-1 75428*840^13376-1 52727*840^13395-1 52027*840^13529-1 48491*840^13565-1 49146*840^13590-1 41996*840^13649-1 51241*840^13660-1 39616*840^13672-1 82594*840^13692-1 13083*840^13708-1 23984*840^13721-1 70150*840^13742-1 24013*840^13809-1 3342*840^13841-1 75585*840^13872-1 78067*840^13910-1 45917*840^14029-1 16761*840^14080-1 80521*840^14251-1 73280*840^14319-1 56358*840^14420-1 68732*840^14421-1 79975*840^14487-1 80755*840^14503-1 11665*840^14505-1 27019*840^14518-1 40971*840^14525-1 66552*840^14566-1 50921*840^14592-1 36249*840^14628-1 20116*840^14646-1 74232*840^14652-1 84275*840^14677-1 52783*840^14709-1 2205*840^14765-1 15414*840^14805-1 76770*840^14824-1 73429*840^14855-1 18179*840^14876-1 17047*840^14888-1 82471*840^14897-1 32917*840^14967-1 23587*840^15020-1 41710*840^15043-1 7003*840^15261-1 52506*840^15375-1 46892*840^15438-1 21692*840^15506-1 9880*840^15509-1 20322*840^15725-1 12689*840^15794-1 57552*840^15818-1 59240*840^15856-1 51745*840^15866-1 33199*840^15882-1 58663*840^15927-1 19628*840^15942-1 57158*840^15976-1 44949*840^15992-1 15949*840^15998-1 42349*840^16037-1 16379*840^16097-1 39512*840^16120-1 27646*840^16205-1 38667*840^16275-1 4547*840^16395-1 12472*840^16436-1 37408*840^16438-1 71780*840^16454-1 59964*840^16468-1 80127*840^16500-1 17142*840^16580-1 21877*840^16665-1 29313*840^16816-1 45092*840^16998-1 74446*840^17048-1 36342*840^17094-1 24674*840^17102-1 35365*840^17134-1 5654*840^17144-1 73864*840^17147-1 81299*840^17190-1 25490*840^17260-1 34886*840^17312-1 5656*840^17451-1 77090*840^17620-1 57033*840^17643-1 38370*840^17710-1 31608*840^17942-1 56754*840^18055-1 84072*840^18077-1 65994*840^18196-1 10000*840^18333-1 31205*840^18543-1 12996*840^18591-1 57442*840^18697-1 37380*840^18702-1 11543*840^18801-1 25983*840^18908-1 8933*840^18939-1 23964*840^18944-1 48699*840^19018-1 78170*840^19161-1 17429*840^19170-1 63480*840^19230-1 60319*840^19236-1 30501*840^19256-1 19378*840^19360-1 69338*840^19434-1 5342*840^19444-1 21107*840^19621-1 47003*840^19688-1 37051*840^19743-1 83689*840^19781-1 42574*840^19820-1 33030*840^19872-1 72978*840^19958-1 78834*840^19962-1 9599*840^19967-1 13049*840^20214-1 48545*840^20396-1 4988*840^20401-1 67770*840^20427-1 31062*840^20444-1 18126*840^20511-1 57129*840^20518-1 77895*840^20735-1 23665*840^20747-1 47657*840^20804-1 66815*840^20828-1 21189*840^20929-1 8770*840^20980-1 2124*840^21022-1 32491*840^21189-1 70790*840^21255-1 5732*840^21396-1 74905*840^21419-1 58453*840^21472-1 34312*840^21552-1 22164*840^21560-1 720*840^21582-1 41369*840^21723-1 62435*840^21740-1 17254*840^21872-1 38740*840^21934-1 20968*840^22093-1 9621*840^22102-1 13594*840^22204-1 69166*840^22371-1 47646*840^22534-1 78786*840^22548-1 39944*840^22593-1 78114*840^22732-1 21977*840^22827-1 43948*840^23237-1 24338*840^23288-1 64514*840^23382-1 68423*840^23402-1 72632*840^23533-1 41293*840^23575-1 63439*840^23636-1 38333*840^23666-1 24689*840^23811-1 47068*840^23829-1 25679*840^23870-1 1275*840^23890-1 11496*840^23892-1 57780*840^24045-1 69215*840^24047-1 28886*840^24204-1 58873*840^24331-1 43586*840^24812-1 27087*840^24841-1 74543*840^24911-1 23083*840^24924-1 48951*840^24942-1 [/code] |
R745
R745 is complete to n=250k. No new primes, so 21 k's still remain.
The current plan is to continue up to n=300k, and hope for rather more luck! We have a sieve file for up to n=500k which has been sieved pretty deep. |
R816 tested to n=300k (100-300k)
nothing found, 3 remain Results emailed - Base released |
Reserving R873 to n=400k (100-400k) for BOINC
Reserving R931 to n=400k (100-400k) for BOINC |
Reserving R978 to n=400k (100-400k) for BOINC
|
Reserving S859 to n=300k (100-300k) for BOINC
|
Reserving S606 to n=100k (40-100k) for BOINC
|
Extending S835 up to n=250K.
Passed 205K, no prime found. |
1 Attachment(s)
R997 reached n=10K, 1335k´s remain. Releasing this base.
Reserving R612 up to n=10K. |
R814 tested to n=300k (100-300k)
1 prime found, 2 remain 14*814^197138-1 Results emailed - Base released |
R806 tested to n=400k (100-400k)
1 prime found, 2 remain 152*806^229984-1 Results emailed - Base released |
Reserving S686 to n=300k (100-300k) for BOINC
|
R978 tested to n=400k (100-400k)
1 prime found, 2 remain 164*978^387920-1 Results emailed - Base released |
Reserving R987 to n=300k (100-300k) for BOINC
|
Reserving S873 to n=400k (100-400k) for BOINC
|
S606 tested to n=100k (40-100k)
56 primes found, 171 remain Results emailed - Base released |
R873 tested to n=400k (100-400k)
1 prime found, 2 remain 104*873^344135-1 Results emailed - Base released |
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