[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=MiniGeek;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 standalone 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*501^163581 R518; 9 k's remaining; highest prime 71*518^74301 R767; 7 k's remaining; highest prime 38*767^215441 R806; k=27, 74, 125, 152, & 214 remain; highest prime 140*806^217381 R942; k=48, 70, 85, 114, & 163 remain; highest prime 49*942^221371 R978; k=12, 94, 131, & 164 remain; highest prime 137*978^164821 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=25K100K. Nothing found.
Results emailed. Base released 
Sierp 516
Sierp 516, the last k, tested n=50K100K. 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 12 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.

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=25K100K. 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=25K100K  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:

1 Attachment(s)
R580 is done to 100K, no primes. Base released.

S837
S837 reserved as new to n=25K

Riesel 688
Riesel 688, the last k, tested n=25K100K  Nothing found
Results emailed  Base released 
The following 10kers are complete to n=25K and released:
R532; 8 k's remaining; highest prime 347*532^159561 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=25K100K  Nothing found
Results emailed  Base released 
Riesel 622
Riesel 622, the last k, tested n=25K100K  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=50K100K  Nothing found
Results emailed  Base released 
Riesel 741
Riesel 741, the last k, tested n=25K100K  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=25K100K  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=25K1M 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

Riesel 832
Riesel 832, the last k, tested n=25K100K  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=25K100K  Nothing found
Results emailed  Base released 
S823
S823 reserved as new to n=25K

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=25K100K  Nothing found
Results emailed  Base released 
Sierp 778
Sierp 778, the last k, tested n=25K100K  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=25K100K  Nothing found
Results emailed  Base released 
Sierp 850
Sierp 850, the last k, tested n=25K100K  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*868^352961 is prime Both conjectures proven Results emailed 
Sierp 802
Sierp 802, the last k, tested n=25K100K  Nothing found
Results emailed  Base released 
Riesel 533
Riesel 533, the last k, tested n=25K100K  Nothing found
Results emailed  Base released 
Riesel 504
116*504^365711 is prime
94*504^n1 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=5K25K; 9 k's remaining R953; 4 primes found for n=5K25K; 7 k's remaining R977; 4 primes found for n=5K25K; 7 k's remaining S536; 3 primes found for n=5K25K; 8 k's remaining S654; 5 primes found for n=5K25K; 6 k's remaining 12kers: R766; 5 primes found for n=5K25K; 7 k's remaining S514; 3 primes found for n=5K25K; 9 k's remaining That completes all of the 11kers to n=25K. 
S648 & S698
Reserving S648 and S698 as new to n=25K

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

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=25K100K  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=25K100K  Nothing found
Results emailed  Base released 
Reservations
Reserving R542 and R718 as new to n=25K

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

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=25K100K. Nothing found
Base released  Results emailed 
Riesel 951
Riesel 951, the last k, tested n=25K100K  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

Riesel 967
Riesel 967, the last k, tested n=25K100K  Nothing found
Results emailed  Base released 
Reservations
Reserving R792 and S973 as new to n=25K

Sierp 1029
Sierp 1029, the last k, tested n=25K100K  Nothing found
Results emailed  Base released 
Sierp 510
Sierp 510, a 2ker, tested n=25K100K. 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=5K25K; 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=5K25K; 10 k's remaining R558; 1 prime found for n=5K25K; 13 k's remaining R770; 3 primes found for n=5K25K; 9 k's remaining R802; 2 primes found for n=5K25K; 10 k's remaining S553; 5 primes found for n=5K25K; 8 k's remaining S904; 3 primes found for n=5K25K; 10 k's remaining S950; 8 primes found for n=5K25K; 6 k's remaining S994; 6 primes found for n=5K25K; 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=25K100K. 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=25K100K. Nothing found
Base released  Results emailed 
Riesel 615
Riesel 615, a 2ker, tested n=25K100K. 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=25K100K. 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=150k200k (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=25K100K
120*523^430471 is prime 126*523^n1 is now a 1'ker with a weight of 1900 Results emailed  Base released 
R551
R551 tested n=25K100K
14*551^601341 is prime 10*551^n1 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=25K100K. 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

Riesel 588
Riesel 588, a 2ker, tested n=25K100K. Nothing found
Base released  Results emailed 
S572 and S590 are now reserved.

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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