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[QUOTE=gd_barnes;234533]An amazing amount of work Mark. :-) Could you Email me the results file(s)? Thanks.[/QUOTE]
Can you be more specific? Are you looking for the residues? |
[QUOTE=rogue;234534]Can you be more specific? Are you looking for the residues?[/QUOTE]
yes he is |
[QUOTE=Mini-Geek;233949]I'll take this to 100K. It's starting now, I was finishing up my individual k work for NPLB. Should only take a few days.[/QUOTE]
S588 is complete with no primes through n=93689 and paused to participate in the NPLB rally. I will finish it to 100K when that's done. Estimated ~1 more day of work, to complete Nov. 4. |
[QUOTE=rogue;234534]Can you be more specific? Are you looking for the residues?[/QUOTE]
Results are what PFGW (pfgw.out) or LLR (lresults.txt) write out if you were running them stand-alone without a server. So yes, what henryzz said is correct; more than anything I just need residues. |
The following 9 & 10kers are complete to n=25K and released:
R501; 7 k's remaining; highest prime 752*501^16358-1 R518; 9 k's remaining; highest prime 71*518^7430-1 R767; 7 k's remaining; highest prime 38*767^21544-1 R806; k=27, 74, 125, 152, & 214 remain; highest prime 140*806^21738-1 R942; k=48, 70, 85, 114, & 163 remain; highest prime 49*942^22137-1 R978; k=12, 94, 131, & 164 remain; highest prime 137*978^16482-1 S770; k=8, 11, 182, 191, & 205 remain; highest prime 140*770^14355+1 S864; k=15, 53, 64, 74, & 136 remain; highest prime 41*864^18064+1 S958; 6 k's remaining; highest prime 316*958^8124+1 S978; 8 k's remaining; highest prime 142*978^6649+1 This finishes up all of the 9kers. 5 more 10kers are still being worked on. |
Reservations
I'm reserving the remainder of 1ker's not already reserved or tested to n=25K
R741 R773 R832 R868 R916 R951 R967 S696 S701 S731 S778 S802 S844 S845 S850 S867 S941 S1016 S1029 |
Sierp 501
Sierp 501, the last k, tested n=25K-100K. Nothing found.
Results emailed. Base released |
Sierp 516
Sierp 516, the last k, tested n=50K-100K. Nothing found.
Results emailed. Base released |
[QUOTE=gd_barnes;233660]Serge, have you sent the Email on these results? I haven't gotten it. Thanks.[/QUOTE]
[QUOTE=Batalov;233669]I will have to email them a bit later - I sent the graph.card for the warranty repairs (and couldn't find any temp.repacement). So the comp is down at the moment. RMA takes 1-2 weeks they said.[/QUOTE] Serge, Do you have the results available for these bases yet? I'm attempting to get all of the 1k bases shored up as Ian closes in on completing them all to n=100K. Thanks. Gary |
Yep, I got the card back (got a 2008 card instead of the original 2007; they are too lazy to repair the fan!). Will email tonight.
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Updates:
R580 is at /97.4K/ and continuing to 100K R736 is at 25K and released S676 /124.5K/ and continuing to 150K S706 100K and released S798 100K and released S816 /87.4K/ and continuing to 100K S834 112K and released S905 25K and released |
Sierp 550
Sierp 550, the last k, tested n=25K-100K. Nothing found.
Results emailed. Base released |
Sierp 622
43*622^57946+1 is prime
Conjecture proven - Results emailed |
Reservations
Reserving the following 2ker's.
R504 R505 R516 |
Sierp 649
Sierp 649, the last k, tested n=25K-100K - Nothing found
Results emailed - Base released |
1 Attachment(s)
S588 is complete to 100K with no primes, releasing it. Results attached, along with factors above 1e6 and sieve file so full verification is possible. :smile:
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1 Attachment(s)
R580 is done to 100K, no primes. Base released.
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S837
S837 reserved as new to n=25K
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Riesel 688
Riesel 688, the last k, tested n=25K-100K - Nothing found
Results emailed - Base released |
The following 10kers are complete to n=25K and released:
R532; 8 k's remaining; highest prime 347*532^15956-1 S792; 7 k's remaining; highest prime 71*792^9185+1 S926; 8 k's remaining; highest prime 121*926^10886+1 S984; 7 k's remaining; highest prime 178*984^19420+1 Only one more 10ker to finish up. |
Riesel 731
Riesel 731, the last k, tested n=25K-100K - Nothing found
Results emailed - Base released |
Riesel 622
Riesel 622, the last k, tested n=25K-100K - Nothing found
Results emailed - Base released |
Reservations
Reserving as new to n=25K - R733 S565
|
1 Attachment(s)
S816 is done to 100K. Base released.
|
Sierp 837
Sierp Base 837
Conjectured k = 1032 Covering Set = 7, 97, 1033 Trivial Factors k == 1 mod 2(2) and k == 10 mod 11(11) and k == 18 mod 19(19) Found Primes: 431k's - File emailed Remaining: 12k's - Tested to n=25K - File emailed Trivial Factor Eliminations: 72k's Base Released |
S942 is complete to n=25K; 7 k's remaining; highest prime 20*942^17720+1; base released
That completes all of the 10kers. |
Riesel 514
Riesel 514, the last k, tested n=50K-100K - Nothing found
Results emailed - Base released |
Riesel 741
Riesel 741, the last k, tested n=25K-100K - Nothing found
Results emailed - Base released |
Risel 733
Riesel Base 733
Conjectured k = 4038 Covering Set = 5, 13, 367 Trivial Factors k == 1 mod 2(2) and k == 1 mod 3(3) and k == 1 mod 61(61) Found Primes: 1290k's - File emailed Remaining: 32k's - Tested to n=25K - File emailed Trivial Factor Eliminations: 695k's MOB Eliminations: 1k - File emailed 1466 Base Released |
Reserving all remaining 11kers (at n=5K) to n=25K:
R648 R953 R977 S536 S654 Reserving a couple of (not all) 12kers to n=25K: R766 S514 Also reserving S991 to n=25K. S991 is a true heavy weight for such a large base. It is the only remaining base with a CK < 10K that has < 1 k remaining at n=5K for every 200 k's in the conjecture. (CK=5262; 26 k's remain at n=5K) To give an idea of how heavy weight it is, there are only about a handful of remaining bases with a CK < 10K that have < 1 k remaining at n=5K for every [B][I]100[/I][/B] k's in the conjecture. :smile: Time to get busy... |
R625 is done to 15K. Base released.
There are 106 k's remaining, but 12 of them are common with R25 (and some with R5, -- see R25). Resdiues are emailed. |
Riesel 773
Riesel 773, the last k, tested n=25K-100K - Nothing found
Results emailed - Base released |
Sierp 565
Sierp Base 565
Conjectured k = 8472 Covering Set = 7, 13, 37, 67, 229 Trivial Factors k == 1 mod 2(2) and k == 2 mod 3(3) and k == 46 mod 47(47) Found Primes: 2738k's - File emailed Remaining: 24k's - Tested to n=25K - File emailed Trivial Factor Eliminations: 1472k's MOB Eliminations: 1k - File emailed 2260 Base Released |
1k base R533 has been released. Rincewind's friend sieved n=25K-1M to P=200G and released it without testing. A link to the file is on the reservations page. I'm sure it needs more sieving.
Ian, if you want it, here is one more 1k for you to take to n=100K. |
[QUOTE]Ian, if you want it, here is one more 1k for you to take to n=100K.[/QUOTE]I'll take it to n=100K. What's one more. LOL
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Riesel 832
Riesel 832, the last k, tested n=25K-100K - Nothing found
Results emailed - Base released |
Sierp 696
135*696^35285+1 is prime - Conjecture proven
Results emailed |
Sierp 701
Sierp 701, the last k, tested n=25K-100K - Nothing found
Results emailed - Base released |
S823
S823 reserved as new to n=25K
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Sierp 928
Sierpinski 928 is complete to n=17K. 8 primes were found (check out the cluster near the end!)
[CODE]4933*928^16010+1 24438*928^16188+1 18394*928^16370+1 14074*928^16377+1 22998*928^16555+1 20688*928^16920+1 12687*928^16933+1 9112*928^16985+1[/CODE] Email sent, continuing. (Edit: Well, it felt like a cluster! After 8 days without a PRP, to get those last three in quick succession....) |
Sierp 731
Sierp 731, the last k, tested n=25K-100K - Nothing found
Results emailed - Base released |
Sierp 778
Sierp 778, the last k, tested n=25K-100K - Nothing found
Results emailed - Base released |
Reservations
Reserving the following 2ker's to n=100K
R523 R551 R564 R588 R615 S510 S520 S533 S542 |
Sierp 844
Sierp 844, the last k, tested n=25K-100K - Nothing found
Results emailed - Base released |
Sierp 850
Sierp 850, the last k, tested n=25K-100K - Nothing found
Results emailed - Base released |
S867 and R868
A 2 bagger
50*867^63774+1 is prime (makes a 4 bagger with S868, S869 & S870) 54*868^35296-1 is prime Both conjectures proven Results emailed |
Sierp 802
Sierp 802, the last k, tested n=25K-100K - Nothing found
Results emailed - Base released |
Riesel 533
Riesel 533, the last k, tested n=25K-100K - Nothing found
Results emailed - Base released |
Riesel 504
116*504^36571-1 is prime
94*504^n-1 changes into a 1ker - weight = 1197 Results emailed |
The following 11 & 12kers are complete to n=25K and released:
11kers: R648; 2 primes found for n=5K-25K; 9 k's remaining R953; 4 primes found for n=5K-25K; 7 k's remaining R977; 4 primes found for n=5K-25K; 7 k's remaining S536; 3 primes found for n=5K-25K; 8 k's remaining S654; 5 primes found for n=5K-25K; 6 k's remaining 12kers: R766; 5 primes found for n=5K-25K; 7 k's remaining S514; 3 primes found for n=5K-25K; 9 k's remaining That completes all of the 11kers to n=25K. |
S648 & S698
Reserving S648 and S698 as new to n=25K
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Reserving all remaining 12, 13, & 14kers (at n=5K) to n=25K:
R536 R558 R770 R802 S553 S904 S950 S994 |
Status update:
R610 @ 158K, will go to 160K S676 @ 147K, will go to 150K |
Reservations
Reserving S744 and S1021 as new to n=25K
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Sierp 698
Sierp Base 698
Conjectured k = 232 Covering Set = 3, 233 Trivial Factors k == 16 mod 17(17) and k == 40 mod 41(41) Found Primes: 198k's - File emailed Remaining: 14k's - Tested to n=25K - File emailed Trivial Factor Eliminations: 18k's Base Released |
Riesel 916
Riesel 916, the last k, tested n=25K-100K - Nothing found
Results emailed - Base released |
Reservations
Reserving S628 and S694 as new to n=25K
|
S676, the last k, tested up to n<=150K - Nothing found
Results emailed - Base released. |
Sierp 941
Sierp 941, the last k, tested n=25K-100K - Nothing found
Results emailed - Base released |
Reservations
Reserving R542 and R718 as new to n=25K
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Sierp 744
Sierp Base 744
Conjectured k = 299 Covering Set = 5, 149 Trivial Factors k == 742 mod 743(743) Found Primes: 279k's - File emailed Remaining: 18k's - Tested to n=25K - File emailed Base Released k = 1 is a GFN with no known prime. |
Reservations
Reserving S894 and S954 as new to n=25K
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Sierp 648
Sierp Base 648
Conjectured k = 296 Covering Set = 11, 59 Trivial Factors k == 646 mod 647(647) Found Primes: 285k's - File emailed Remaining: 9k's - Tested to n=25K - File emailed Base Released |
Riesel 516
Riesel 516, a 2ker, tested n=25K-100K. Nothing found
Base released - Results emailed |
Riesel 951
Riesel 951, the last k, tested n=25K-100K - Nothing found
Results emailed - Base released |
Sierp 694
Sierp Base 694
Conjectured k = 1111 Covering Set = 5, 139 Trivial Factors k == 2 mod 3(3) and k == 6 mod 7(7) and k == 10 mod 11(11) Found Primes: 560k's - File emailed Remaining: 14k's - Tested to n=25K - File emailed Trivial Factor Eliminations: 534k's GFN's: 1k - File emailed 694 Base Released |
Reservations
Reserving R583 and S639 as new to n=25K
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Riesel 967
Riesel 967, the last k, tested n=25K-100K - Nothing found
Results emailed - Base released |
Reservations
Reserving R792 and S973 as new to n=25K
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Sierp 1029
Sierp 1029, the last k, tested n=25K-100K - Nothing found
Results emailed - Base released |
Sierp 510
Sierp 510, a 2ker, tested n=25K-100K. Nothing found
Base released - Results emailed |
Riesel 792
Riesel Base 792
Conjectured k = 1158 Covering Set = 13, 61 Trivial Factors k == 1 mod 7(7) and k == 1 mod 113(113) Found Primes: 959k's - File emailed Remaining: 16k's - Tested to n=25K - File emailed Trivial Factor Eliminations: 174k's Base Released k=25, 121, 324, 352, 441, 550 & 961 proven composite by partial algebraic factors |
S991 is complete to n=25K; 9 primes found for n=5K-25K; 17 k's remaining; base released.
Not too bad for CK=5262 for such a high base. :-) |
All remaining 12, 13, & 14kers bases are complete to n=25K and released as follows:
R536; 4 primes found for n=5K-25K; 10 k's remaining R558; 1 prime found for n=5K-25K; 13 k's remaining R770; 3 primes found for n=5K-25K; 9 k's remaining R802; 2 primes found for n=5K-25K; 10 k's remaining S553; 5 primes found for n=5K-25K; 8 k's remaining S904; 3 primes found for n=5K-25K; 10 k's remaining S950; 8 primes found for n=5K-25K; 6 k's remaining S994; 6 primes found for n=5K-25K; 8 k's remaining All bases with < 15 k's remaining at n=5K are now complete to n=25K. |
R625 has finally been added to the pages. This is one that Serge completed to n=15K a month ago that needed detailed research on related R5 and R25 primes and test limits. I found 3 such primes; 1 of which was the huge k=158750 prime for base 5 that was found a little over a month ago. It knocked out the same k for base 25 and k=6350 for base 625.
There are 103 k's remaining, which includes 6 k's that are reserved and being searched by base 5 and 6 k's that are the same as base 25 but are not currently reserved. |
Sierp 520
Sierp 520, a 2ker, tested n=25K-100K. Nothing found
Base released - Results emailed |
Reservations
Reserving the following 2ker's to n=100K
R617 R634 R635 R680 R694 S567 S579 S593 S620 S638 |
Sierp 533
Sierp 533, a 2ker, tested n=25K-100K. Nothing found
Base released - Results emailed |
Riesel 615
Riesel 615, a 2ker, tested n=25K-100K. Nothing found
Base released - Results emailed |
Riesel 583
Riesel Base 583
Conjectured k = 2846 Covering Set = 5, 7, 13, 31, 73 Trivial Factors k == 1 mod 2(2) and 1 mod 3(3) and k == 1 mod 97(97) Found Primes: 921k's - File emailed Remaining: 16k's - Tested to n=25K - File emailed Trivial Factor Eliminations: 484k's MOB Eliminations: 1k - File emailed 1166 Base Released |
Sierp 542
Sierp 542, a 2ker, tested n=25K-100K. Nothing found
Base released - Results emailed |
Sierp 628
Sierp Base 628
Conjectured k = 1072 Covering Set = 17, 37 Trivial Factors k == 2 mod 3(3) and k == 10 mod 11(11) and k == 18 mod 19(19) Found Primes: 603k's - File emailed Remaining: 10k's - Tested to n=25K - File emailed Trivial Factor Eliminations: 456k's GFN: 1k - File emailed 628 Base Released |
Riesel base 1019
Releasing the remaining k=2 at n=150k.
Sieve file for n=150k-200k (p=3T) with ~1900 pairs left available. |
Sierp 823
Sierp Base 823
Conjectured k = 9166 Covering Set = 7, 13, 43, 103 Trivial Factors k == 1 mod 2(2) and k == 2 mod 3(3) and k == 136 mod 137(137) Found Primes: 2934k's - File emailed Remaining: 96k's - Tested to n=25K - File emailed Trivial Factor Eliminations: 1550k's MOB Eliminations: 2k's - File emailed 3292 4938 Base Released |
Riesel 523
R523 tested n=25K-100K
120*523^43047-1 is prime 126*523^n-1 is now a 1'ker with a weight of 1900 Results emailed - Base released |
R551
R551 tested n=25K-100K
14*551^60134-1 is prime 10*551^n-1 is now a 1'ker with a weight of 1123 Results emailed - Base released |
Status reported by Serge in an Email on Dec. 22nd:
R610 is at n=186.4K; continuing to n=200K |
R718
Riesel Base 718
Conjectured k = 1023 Covering Set = 7, 13, 61 Trivial Factors k == 1 mod 3(3) and k == 1 mod 239(239) Found Primes: 647k's - File emailed Remaining: 31k's - Tested to n=25K - File emailed Trivial Factor Eliminations: 343k's Base Released |
Strange
A pretty strange 1 minute and 43 seconds:
I was testing S973, a new base I'm working on, and I got the following 3 primes in the aforementioned time. The first 2 are for the same k, and that occured because I have my caches at 5, so 2 machines found a prime for the same k during the same cycle. The 2nd and 3rd are for the same n, 8 seconds apart. I guess the second prime doesn't want to be lonely. It's related to both the 1st and 3rd primes. 3240*973^11520+1 I7#8 12/26/10 04:36:41 34426 3240*973^11531+1 Ginger#1 12/26/10 04:38:16 34459 8248*973^11531+1 Ginger#3 12/26/10 04:38:24 34459 |
Riesel 564
Riesel 564, a 2ker, tested n=25K-100K. Nothing found
Base released - Results emailed |
Sierp 639
Sierp Base 639
Conjectured k = 1664 Covering Set = 5, 17, 19, 37 Trivial Factors k == 1 mod 2(2) and k == 10 mod 11(11) and k == 28 mod 29(29) Found Primes: 713k's - File emailed Remaining: 16k's - Tested to n=25K - File emailed Trivial Factor Eliminations: 102k's Base Released |
reserving riesel 992
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Riesel 588
Riesel 588, a 2ker, tested n=25K-100K. Nothing found
Base released - Results emailed |
S572 and S590 are now reserved.
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Sierp 973
Sierp Base 973
Conjectured k = 9252 Covering Set = 5, 17, 487 Trivial Factors k == 1 mod 2(2) and k == 2 mod 3(3) Found Primes: 3035k's - File emailed Remaining: 47k's - Tested to n=25K - File emailed Trivial Factor Eliminations: 1542k's MOB Eliminations: 1k - File emailed 3892 Base Released |
R841
R841 is done to 25K and released.
CK [B]240[I]9[/I]0[/B], and it has only [B]27[/B] k's remaining! Results emailed. |
Sierp 1021
Sierp Base 1021
Conjectured k = 2262 Covering Set = 7, 73 Trivial Factors k == 1 mod 2(2) and k == 2 mod 3(3) and k == 4 mod 5(5) and k == 16 mod 17(17) Found Primes: 553k's - File emailed Remaining: 13k's - Tested to n=25K - File emailed Trivial Factor Eliminations: 564k's Base Released |
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