[QUOTE=rebirther;413986]R708 tested to n=10K (1-10k)

1073 remain

Results emailed - Base released[/QUOTE]

There are 1073 k's remaining at n=2500. With 446 primes found for n=2500-10K, there are 627 k's remaining at n=10K.

Edit: As shown on the pages, k=9216 is proven composite by partial algebraic factors so there are 626 k's remaining.

R717
 

Reserving R717 to n=25K

[QUOTE=MyDogBuster;414118]Reserving R717 to n=25K[/QUOTE]

I had already begun to sieve this for n=10K-25K and have reached P=50G. Last night I just started a sieve to P=230G (~fully sieved) that would be done by ~Nov. 3rd. Are you interested in the P=50G file or in me continuing to sieve it?

I did not plan to test this. I was only going to post a sieve file on the pages. I'm also sieving R807 for n=10K-25K.

[QUOTE] Are you interested in the P=50G file or in me continuing to sieve it?[/QUOTE]

My sieve file is also at 50G and I have already begun testing. I'm also sieving R226, R323, R810, R858, R882 and S262
all to n=25K.

[QUOTE=MyDogBuster;414152]My sieve file is also at 50G and I have already begun testing. I'm also sieving R226, R323, R810, R858, R882 and S262
all to n=25K.[/QUOTE]

OK I will stop mine. I will start sieving R807 P=50G-230G.

Here is the sieve file for S797, sieved to p=50e12 up to n=1000000. It likely needs a bit more, but I didn't want to hold back any potential progress.

Reserving R534 to n=200k (100-200k) for BOINC

Reserving R588 to n=200k (100-200k) for BOINC

Reserving R807 to n=25K.

R534 tested to n=200K (100-200k)

nothing found, 2 remain

Results emailed - Base released

Reserving R542 to n=100k (50-100k) for BOINC

R542 tested to n=100K (50-100k)

4 primes found, 14 remain

104*542^56400-1
28*542^66555-1
13*542^70447-1
133*542^83867-1

Results emailed - Base released

Reserving R639 to n=100k (50-100k) for BOINC

R588 tested to n=200K (100-200k)

nothing found, 2 remain

Results emailed - Base released

Reserving R828 to n=200k (100-200k) for BOINC

R639 tested to n=100K (50-100k)

4 primes found, 17 remain

1866*639^54741-1
1196*639^54973-1
382*639^59408-1
1334*639^86774-1

Results emailed - Base released

S843
 

Reserving S843 to n=25K

S808
 

S808 tested n=2.5K-25K

426 primes found - 388 remain

Results emailed - Base released

S616
 

Reserving S616 New to n=25K

R717
 

R717 tested n=10K-25K

124 primes found - 316 remain

Results emailed - Base released

R828 tested n=200k (100-200k)

nothing found, 2 remain

Results emailed - Base released

Reserving R998 to n=200k (100-200k) for BOINC

R998 tested n=200k (100-200k)

nothing found, 4 remain

Results emailed - Base released

S955 tested n=50k (25-50k)

813 primes found, 2669 remain

Results emailed - Base released

Reserving S952 to n=100k (25-100k) for BOINC

Reserving S667 to n=100k (50-100k) for BOINC

R810
 

Reserving R810 to n=25K

Reserving S621 to n=100k (50-100k) for BOINC

S952 tested n=100k (25-100k)

21 primes found, 25 remain

3618*952^25305+1
3117*952^26571+1
3033*952^26741+1
3411*952^30640+1
2574*952^30870+1
4956*952^33480+1
4996*952^37949+1
1926*952^39003+1
4737*952^40247+1
2035*952^43521+1
1468*952^52234+1
706*952^58148+1
5323*952^61302+1
196*952^65649+1
2793*952^69268+1
3195*952^71184+1
4944*952^76370+1
1108*952^77720+1
1111*952^86803+1
207*952^95930+1
5413*952^99768+1

Results emailed - Base released

R810
 

R810 tested n=10K-25K

157 primes found - 377 remain

Results emailed - Base released

R858 reserved to n=25K

Reserving S542 to n=200K.

R807 is complete to n=25K; 95 primes were found for n=10K-25K shown below; 310 k's remain; base released.

Primes:
[code]
6158*807^10263-1
32650*807^10269-1
15404*807^10425-1
5706*807^10483-1
24308*807^10659-1
4146*807^10695-1
29278*807^10944-1
28466*807^10958-1
8592*807^11013-1
18000*807^11126-1
20772*807^11198-1
5150*807^11362-1
21358*807^11498-1
23392*807^11556-1
2722*807^11577-1
27234*807^11601-1
8584*807^11680-1
19452*807^11702-1
27304*807^11811-1
910*807^11905-1
3958*807^11988-1
24002*807^12422-1
17474*807^12459-1
2280*807^12563-1
13418*807^12571-1
28456*807^12650-1
2836*807^12821-1
4498*807^12851-1
11126*807^12925-1
4398*807^12966-1
31452*807^13160-1
22386*807^13174-1
11236*807^13195-1
28704*807^13236-1
7402*807^13240-1
22236*807^13589-1
31424*807^13595-1
23314*807^13647-1
18638*807^14063-1
11190*807^14249-1
3494*807^14513-1
36*807^14587-1
20806*807^14637-1
7148*807^14638-1
6336*807^14809-1
16262*807^15077-1
18306*807^15166-1
32256*807^15190-1
29192*807^15828-1
2088*807^15879-1
1992*807^15996-1
29738*807^16080-1
9564*807^16149-1
3462*807^16289-1
31124*807^16671-1
10088*807^16726-1
5728*807^16738-1
11614*807^16868-1
16268*807^17299-1
17742*807^17310-1
30842*807^17398-1
3448*807^17712-1
970*807^18228-1
24256*807^18239-1
25022*807^18242-1
18698*807^18478-1
14166*807^18661-1
566*807^18857-1
11386*807^19157-1
11274*807^19389-1
11664*807^19443-1
25054*807^19447-1
24070*807^19535-1
3818*807^19566-1
18484*807^19577-1
14144*807^19704-1
23016*807^19810-1
24666*807^19873-1
14774*807^19964-1
10058*807^20248-1
9912*807^20409-1
348*807^20742-1
21960*807^20866-1
14924*807^21389-1
22524*807^21565-1
25870*807^22011-1
28988*807^22123-1
32126*807^22375-1
22494*807^22724-1
29054*807^22955-1
22584*807^23221-1
10614*807^23349-1
5212*807^23436-1
3322*807^24218-1
5756*807^24342-1
[/code]

S667 tested n=100k (50-100k)

30 primes found, 117 remain

10680*667^91855+1
10918*667^61276+1
11112*667^60030+1
11142*667^82207+1
1186*667^81221+1
12358*667^90014+1
13038*667^65493+1
13068*667^90029+1
14196*667^75984+1
15486*667^94695+1
15756*667^74072+1
18514*667^57313+1
1972*667^55746+1
20082*667^90103+1
20458*667^54180+1
20968*667^55133+1
21916*667^77377+1
22900*667^89541+1
24156*667^86761+1
24498*667^66109+1
25128*667^50242+1
25626*667^61280+1
25776*667^93668+1
26026*667^96907+1
5302*667^64488+1
6238*667^77541+1
6592*667^74632+1
6660*667^86088+1
7096*667^76831+1
7884*667^54238+1

Results emailed - Base released

S621 tested n=100k (25-100k)

23 primes found, 36 remain

9070*621^26640+1
16476*621^26910+1
14572*621^27562+1
5792*621^27588+1
15102*621^29028+1
18970*621^31807+1
18376*621^32005+1
16286*621^33402+1
612*621^38089+1
1132*621^38173+1
14658*621^40736+1
5286*621^46703+1
18170*621^47578+1
1392*621^49966+1
970*621^54232+1
11508*621^56084+1
4010*621^64906+1
6442*621^72626+1
14066*621^86829+1
9482*621^93215+1
11380*621^93327+1
11602*621^93867+1
12168*621^95200+1

Results emailed - Base released

Reserving S543 to n=100k (25-100k) for BOINC

R858
 

R858 tested n=10K-25K

134 primes found - 399 remain

Results emailed - Base released

[COLOR=Red]Reserving R882 to n=25K[/COLOR]

S542 is complete to n=200K. No primes were found for n=100K-200K. 2 k's still remain. Base released.

Reserving R610 to n=400k (200-400k) for BOINC

S843
 

S843 tested n=2500-25K

413 primes found - 380 remain

Results emailed - Base released

[COLOR=Red]Reserving S918 to n=25K[/COLOR]

S543 tested n=100k (25-100k)

34 primes found, 96 remain

4686*543^25815+1
5866*543^25824+1
3894*543^25886+1
2228*543^26090+1
5274*543^28126+1
390*543^28989+1
3434*543^29371+1
3086*543^32155+1
5372*543^34669+1
1642*543^36804+1
2206*543^38241+1
5392*543^40109+1
2568*543^41348+1
6334*543^44317+1
1912*543^45554+1
908*543^46271+1
3526*543^48176+1
1062*543^49016+1
178*543^49380+1
160*543^49627+1
5932*543^51381+1
5694*543^56593+1
6446*543^57755+1
2708*543^59915+1
4274*543^62891+1
3792*543^63578+1
6240*543^67126+1
3160*543^69334+1
3660*543^77360+1
5616*543^81047+1
3280*543^81575+1
4514*543^83623+1
4350*543^95038+1
798*543^96135+1

Results emailed - Base released

Reserving S820 to n=100k (25-100k) for BOINC

R610 tested n=400k (200-400k)

nothing found, 1 remain

Results emailed - Base released

S616
 

S616 tested n=2.5K-25K

161 primes found - 92 remain

Results emailed - Base released

Progress update
 

K4 ( S 737) at 255706 ( reserved to 400K)
K4 ( s 803) at 329814 ( reserved to 400k)

S820 tested n=100k (25-100k)

14 primes found, 21 remain

30375*820^26512+1
22135*820^29457+1
4441*820^31023+1
16656*820^31862+1
10507*820^46471+1
24636*820^58914+1
16069*820^64070+1
3204*820^64442+1
20637*820^69366+1
4462*820^70305+1
24901*820^80512+1
21058*820^83174+1
13318*820^84759+1
14038*820^95797+1

Results emailed - Base released

Reserving S591 to n=100k (25-100k) for BOINC

Reserving S931 to n=100k (25-100k) for BOINC

R967 status report: we hit the 300k mark few days ago, but missed the moment.
If we would find a prime now, it would be the highest we ever found by ourselves, and just a breadcrumb under a million digits...

So: 242*967^n-1 tested to n=300k+, nothing found, continuing.

Reserving S530 and S534 to n=200K.

S591 tested n=100k (25-100k)

17 primes found, 33 remain

7142*591^26632+1
7858*591^27280+1
6252*591^27515+1
3442*591^29774+1
3956*591^32304+1
3836*591^35716+1
14038*591^39483+1
9066*591^42186+1
13652*591^49721+1
3110*591^49851+1
14096*591^55289+1
15856*591^66210+1
2478*591^72995+1
9510*591^74086+1
5232*591^80302+1
6390*591^81466+1
7442*591^99283+1

Results emailed - Base released

S931 tested n=100k (25-100k)

22 primes found, 26 remain

25518*931^26849+1
34488*931^29838+1
15718*931^30168+1
30922*931^30222+1
8380*931^31930+1
25516*931^33693+1
28972*931^35440+1
26602*931^44273+1
19410*931^46891+1
7258*931^49071+1
2362*931^53462+1
24162*931^54591+1
4992*931^61245+1
8832*931^61468+1
35118*931^68086+1
23256*931^69463+1
24790*931^70090+1
37660*931^74618+1
1696*931^91296+1
36568*931^97445+1
29638*931^98833+1
28870*931^99192+1

Results emailed - Base released

S530 is complete to n=200K. No primes were found for n=100K-200K. 2 k's still remain. Base released.

R882 tested n=10K-25K

111 primes found - 415 remain

Results emailed - Base released

[COLOR=Red]Reserving R772 to n-25K[/COLOR]

S534 is complete to n=200K. 1 prime was found for n=100K-200K shown below. 1k still remains. Base released.

Prime:
34*534^117941+1

Happy to make another 1ker. :smile:

R800 tested to n=1M (800k-1M)

nothing found, 1 remain

Results emailed - Base released

Reserving S940 to n=100k (25-100k) for BOINC

S 737 is proven !
[B]4 *737^269302+1 is prime :smile:
[/B]Result sent
Base released

[QUOTE=pepi37;425131]S 737 is proven !
[B]4 *737^269302+1 is prime :smile:
[/B][/QUOTE]

Yay! Congrats!

Reserving S834 to n=400k (200-400k) for BOINC

S940 tested n=100k (25-100k)

16 primes found, 45 remain

1734*940^29371+1
5286*940^30222+1
2910*940^30508+1
4891*940^31806+1
4000*940^32094+1
5547*940^36056+1
3076*940^39990+1
2089*940^43616+1
3142*940^46024+1
4710*940^50218+1
2712*940^62213+1
2785*940^63569+1
5260*940^70077+1
241*940^81773+1
4291*940^88651+1
4525*940^96497+1

Results emailed - Base released

S918 R786
 

S918 tested n=2.5K-25K

367 primes found - 253 remain

Results emailed - Base released

[COLOR=red]Reserving R786 to n=25K[/COLOR]

S834 tested to n=400k (200-400k)

nothing found, 1 remain

Results emailed - Base released

R772 R880
 

R772 tested n=10K-25K

178 primes found - 587 remain

Results emailed - Base released

[COLOR=Red]Reserving R880 to n=25K[/COLOR]

Reserving S821 to n=200k (100-200k) for BOINC

R672
 

Hi, reserving/starting R672.

(This will take a while, if someone really, really want's this one you can contact me.)

K4 S803 at 382K

Status Update
 

S520 at n=437,895, testing up to n=700,000
R598 currently testing from n=13001-15000 (438 k remaining, not inclusive of the current n range)
R708 currently testing from n=15001-20000 (502 k remaining, again not inclusive of the current n range)

R1025 at n=1075474, testing up to n=3M (sieving done up to as much as 700e12)

S618 at k=1116 (going by k here)
Primes found for S618:
[CODE]3693*618^80879+1
73*618^46256+1
3976*618^73036+1
3967*618^25972+1
3958*618^54116+1
286*618^63764+1
337*618^50932+1
292*618^87160+1
383*618^75931+1
729*618^49922+1
999*618^27873+1
[/CODE]

[QUOTE=wombatman;428458]<snip>
S618 at k=1116 (going by k here)
Primes found for S618:
[CODE]3693*618^80879+1
73*618^46256+1
3976*618^73036+1
3967*618^25972+1
3958*618^54116+1
286*618^63764+1
337*618^50932+1
292*618^87160+1
383*618^75931+1
729*618^49922+1
999*618^27873+1
[/CODE][/QUOTE]

I don't know how you could be testing S618 by k-value and are only at k=1116. You have already found four primes for k>1116! I can't really show anything on the pages for this without more specifically knowing what k-range or n-range that you have tested.

Apologies. I have tested the following k's from n=25k to 100k as provided in the sieved file I downloaded:

52, 68, 73, 83, 94, 111, 159, 213, 221, 286, 292, 337, 383, 419, 489, 531, 535, 633, 729, 752, 852, 859, 929, 999, 1109, 3693, 3912, 3937, 3958, 3967, and 3976

I have the results/log file for each of these.

Reserving S576 to at least 25K

[QUOTE=pepi37;428545]Reserving S576 to at least 25K[/QUOTE]
S 576 now is at 15.5K will be done to 25 K and then I will make sieve file for Boinc from 25-50K.

Reserving R803 to n=200k (100-200k) for BOINC

S821 tested to n=200k (100-200k)

1 prime found, 1 remain

82*821^139686+1 (already reported)

Results emailed - Base released

S 576 done
 

S 576
242 remain
23 MOB
23187 primes
7196 trivial
1 GFN

R803 tested to n=200k (100-200k)

nothing found, 2 remain

Results emailed - Base released

Reserving R510 to n=200k (100-200k) for BOINC

R880
 

R880 tested n=2.5K-25K

400 primes found - 309 remain

Results emailed - Base released

S711
 

Reserving S711 to n=25K

R510 tested to n=200k (100-200k)

nothing found, 2 remain

Results emailed - Base released

Reserving S638 to n=400k (200-400k) for BOINC

Reserving S640 to n=100k (25-100k) for BOINC

S638 tested to n=400k (200-400k)

nothing found, 1 remain

Results emailed - Base released

Reserving S785 to n=400k (200-400k) for BOINC

S640 tested to n=100k (25-100k)

29 primes found, 39 remain

11080*640^26769+1
10228*640^27151+1
9853*640^27250+1
8614*640^27590+1
6276*640^27700+1
4795*640^30431+1
11361*640^31466+1
9915*640^31738+1
11188*640^32042+1
3156*640^35919+1
6283*640^36852+1
6135*640^37121+1
1942*640^37192+1
10890*640^37278+1
1674*640^38272+1
9594*640^41415+1
9970*640^41572+1
6750*640^45089+1
2881*640^49206+1
4339*640^50427+1
11886*640^50825+1
1167*640^59827+1
3264*640^62967+1
595*640^71001+1
3946*640^79149+1
11920*640^83947+1
11353*640^86613+1
11463*640^91507+1
7513*640^97535+1

Results emailed - Base released

R786
 

R786 tested n=2.5K-25K

569 primes found - 472 remain

Results emailed - Base released

[COLOR=Red]Reserving S522 to n=25K[/COLOR]

S785 tested to n=400k (200-400k)

nothing found, 1 remain

Results emailed - Base released

S711
 

S711 tested n=2.5K-25K

304 primes found - 301 remain

Results emailed - Base released

[COLOR=Red]Reserving S513 to n=25K[/COLOR]

Reserving R694 to n=200k (100-200k) for BOINC

S513 & S522
 

Unreserving S513 & S522 to n=25K

Reserving S866 to n=400k (200-400k) for BOINC

R694 tested to n=200k (100-200k)

nothing found, 2 remain

Results emailed - Base released

Status update: R675 and S576: testing to n=25K.

One computer crash, and a move at work, means that I'm going to have to restart these. I can't guarantee that my log files are accurate.

Status is: starting.

[QUOTE=paleseptember;434159]Status update: R675 and S576: testing to n=25K.

One computer crash, and a move at work, means that I'm going to have to restart these. I can't guarantee that my log files are accurate.

Status is: starting.[/QUOTE]

Both bases were released after I could not get ahold of you on the old reservations.

S576 is already completed to n=25K but R675 has not been worked on. I will re-reserve R675 for you.

[QUOTE=gd_barnes;434164]Both bases were released after I could not get ahold of you on the old reservations.

S576 is already completed to n=25K but R675 has not been worked on. I will re-reserve R675 for you.[/QUOTE]

Thanks, appreciated. Sorry for going AWOL :no:

S866 tested to n=400k (200-400k)

nothing found, 1 remain

Results emailed - Base released

Progress update
 

K4 S803 at 395K

[QUOTE=paleseptember;434263]Thanks, appreciated. Sorry for going AWOL :no:[/QUOTE]

R675 has been sieved to 4e11 (factors just over 30 seconds, which seemed long enough.)

Onto running pfgw.

Reserving S660 to n=10k as a new base (maybe for BOINC), planned the following steps,

1. using newpgen to n=5k (ini file from KEPs collection, modified to n=5k instead to 25k)
2. using srbsieve to n=5k
3. sieving 5-10k range for BOINC
4. llr in BOINC

Its taking too long to run it on a single computer and want to take the power of BOINC. If the time is what I have in my mind I will do this with other bases in the future to decrease the rest of the unreserved bases.