R667 tested to n=250k (100-250k)

nothing found, 2 remain

Results emailed - Base released

Reserving S1027 to n=200k (100-200k) for BOINC

Reserving R606 and R840 to n=10K.
These are the last two Riesel bases unstarted with ck<100.000.
I hope I can finish them before the end of 2017.

[QUOTE=MisterBitcoin;472374]Reserving R606 and R840 to n=10K.
These are the last two Riesel bases unstarted with ck<100.000.
I hope I can finish them before the end of 2017.[/QUOTE]

For R840, note on the pages the 20 k's that can be removed as a result of partial algebraic factors.

S592 tested to n=100k (25-100k)

123 primes found, 247 remain

Results emailed - Base released

Reserving S768 and S732 to n=10K.

R576 is complete to n=100K; 33 primes were found for n=25K-100K (not counting R24 primes) shown below; 71 k's remain; base released.

Primes:
[code]
1923*576^25914-1
13722*576^26670-1
10348*576^27138-1
13733*576^27142-1
9447*576^27483-1
15508*576^29203-1
15705*576^30278-1
7067*576^30579-1
17572*576^31594-1
12807*576^32813-1
17010*576^33847-1
6442*576^34158-1
10982*576^34342-1
6672*576^35885-1
12142*576^41199-1
6617*576^42312-1
7130*576^43493-1
17453*576^43875-1
113*576^45895-1
7718*576^49029-1
8150*576^51246-1
10117*576^53625-1
5737*576^53918-1
7107*576^56083-1
10215*576^58665-1
9998*576^59569-1
7680*576^74612-1
5555*576^74739-1
12063*576^75846-1
15950*576^79124-1
14877*576^79200-1
12665*576^79945-1
13757*576^86784-1
[/code]

R1017 tested to n=250k (100-250k)

3 primes found, 6 remain

542*1017^137766-1
508*1017^199220-1
842*1017^230634-1

Results emailed - Base released

R810 tested to n=100k (25-100k)

154 primes found, 223 remain

Results emailed - Base released

Reserving S618 to n=200k (100-200k) for BOINC

R807 tested to n=100k (25-100k)

112 primes found, 198 remain

Results emailed - Base released

R606 reached n=10K.

Tested up to n=6183 with srbsieve and than using cllr.
Attached are: the results from srbsieve, the primes found from cllr and a list with k´s remain produced with srfile.
604 k´s remain.

R648 tested to n=500k (200-500k)

nothing found, 3 remain

Results emailed - Base released

Reserving R858 to n=100k (25-100k) for BOINC

S768 reached n=10K, 1150 k´s remain, releasing base.
R840 reached n=10K, 1018 k´s remain, releasing base.

Notice: There is no pl_prime file in the R280 .zip bcs I forgot to delete the pl_prime from the S3 range before, so this file is now 12,7 GB huge. (I´m pretty sure I deleted this file, but...yeah doesn´t looks like it)
I´m not able to get these primes out of this file...if you need the file I´ll restart the process from scratch.

[QUOTE=MisterBitcoin;474746]S768 reached n=10K, 1150 k´s remain, releasing base.
R840 reached n=10K, 1018 k´s remain, releasing base.

Notice: There is no pl_prime file in the[B] R280[/B] .zip bcs I forgot to delete the pl_prime from the S3 range before, so this file is now 12,7 GB huge. (I´m pretty sure I deleted this file, but...yeah doesn´t looks like it)
I´m not able to get these primes out of this file...if you need the file I´ll restart the process from scratch.[/QUOTE]

I assume you mean R840 not R280.

I cannot show the range complete without the primes. Sorry. I must have the primes.

[QUOTE=gd_barnes;474761]I assume you mean R840 not R280.

I cannot show the range complete without the primes. Sorry. I must have the primes.[/QUOTE]

Primes are attached.
I have more luck than average today. Found a programm called "file splitter". :smile:

Reserving R1027 to n=250k (100-250k) for BOINC

R745
 

R745 complete to n=225k. 21 k values remain.
1 prime (already reported) in the range n=200k-225k :
21290*745^203998-1

Continuing to n=250k.

S520 is still in progress. I'll provide a specific update on probably Tuesday once I can get to the computer running it.


Edit: Reserving S550 (k=94) for n=200k-500k. I'll use the sieve file that's already present.

S520 is currently at n=644244 and will be completed to n=700k.

Please keep R967 with k=242 reserved for me. I am still working it, albeit not so active currently.

[QUOTE=LaurV;476147]Please keep R967 with k=242 reserved for me. I am still working it, albeit not so active currently.[/QUOTE]

There had been no status in ~9 months: April 8th when you were at n=380K. In order to re-reserve it, we will need a status update. What is your current search depth?

S732 reached n=10K, 1875 k´s remain.
Releasing this base.

Once again, one part with srbsieve and one other part done with cllr.
Primes found with cllr double-checked.

Reserving S1017 to n=250k (100-250k) for BOINC

Reserving R751 to n=100k (25-100k) for BOINC

[QUOTE=gd_barnes;476154]There had been no status in ~9 months: April 8th when you were at n=380K. In order to re-reserve it, we will need a status update. What is your current search depth?[/QUOTE]
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.

[ATTACH]17530[/ATTACH]

S955 tested to n=75k (50-75k)

347 primes found, 2322 remain

Results emailed - Base released

S618 tested to n=200k (100-200k)

18 primes found, 49 remain

535*618^100280+1
3563*618^105612+1
2778*618^108068+1
2478*618^109606+1
2792*618^114842+1
852*618^116404+1
3629*618^131187+1
3424*618^138042+1
3863*618^140056+1
1248*618^142002+1
2558*618^142259+1
2441*618^144343+1
68*618^146688+1
1649*618^161163+1
2369*618^180975+1
111*618^187244+1
1223*618^193431+1
3161*618^199877+1

Results emailed - Base released

Reserving R682 to n=100k (25-100k) for BOINC

R858 tested to n=100k (25-100k)

150 primes found, 249 remain

Results emailed - Base released

Reserving S842 to n=200k (100-200k) for BOINC

Reserving S1005 up to n=25K.

Reserving R615 to n=250k (100-250k) for BOINC

S1017 tested to n=250k (100-250k)

2 primes found, 15 remain

732*1017^115542+1
40*1017^215605+1

Results emailed - Base released

S1027 tested to n=200k (100-200k)

56 primes found, 222 remain

Results emailed - Base released

R1027 tested to n=250k (100-250k)

16 primes found, 32 remain

19904*1027^111549-1
6294*1027^115969-1
5754*1027^117597-1
16692*1027^122312-1
10278*1027^122790-1
10412*1027^127313-1
9638*1027^129787-1
4304*1027^149224-1
19512*1027^150245-1
15876*1027^155415-1
14172*1027^179381-1
11726*1027^185913-1
17702*1027^193732-1
5678*1027^202018-1
19062*1027^206877-1
12362*1027^240890-1

Results emailed - Base released

S842 tested to n=200k (100-200k)

2 primes found, 3 remain

61*842^100660+1
17*842^104679+1

Results emailed

[B]Reserving S842 to n=400k (200-400k) for BOINC[/B]

Reserving R643 to n=250k (100-250k) for BOINC

[QUOTE=rebirther;478924]S842 tested to n=200k (100-200k)

2 primes found, 3 remain

61*842^100660+1
17*842^104679+1

Results emailed

[B]Reserving S842 to n=400k (200-400k) for BOINC[/B][/QUOTE]

A new 3 k´er on S-Side. :smile:
That makes 38 now.

R751 tested to n=100k (25-100k)

125 primes found, 233 remain

Results emailed - Base released

Reserving R555 to n=100k (25-100k) for BOINC

S842 tested to n=400k (200-400k)

nothing found, 3 remain

Results emailed - Base released

S522 reached n=25K, 249 primes found in that range. Releasing this base.
Results and primes send via Mail.
This also finished our yearly goal #7!

R643 tested to n=250k (100-250k)

1 prime found, 2 remain

174*643^192540-1

Results emailed - Base released

S875 tested to n=1M (600k-1M)

nothing found, 1 remain

Results emailed - Base released

R615 tested to n=250k (100k-250k)

1 prime found, 1 remain

22*615^203539-1

Results emailed - Base released

R682 tested to n=100k (25-100k)

150 primes found, 209 remain

Results emailed - Base released

Reserving R662 to n=500k (200-500k) for BOINC

Reserving R675 to n=100k (25-100k) for BOINC

Reserving S606 to n=25K.

R555 tested to n=100k (25-100k)

128 primes found, 236 remain

Results emailed - Base released

Reserving R936 to n=25K.

R675 tested to n=100k (25-100k)

87 primes found, 185 remain

Results emailed - Base released

Reserving S936 to n=25K.

R936 is complete to n=10K; 327 primes were found for n=2500-10K; 290 k's remain; continuing to n=25K.

Removing over half of k's for n=2500-10K for a base > 900. Not bad. :-)

[QUOTE=gd_barnes;480692]R936 is complete to n=10K; 327 primes were found for n=2500-10K; 290 k's remain; continuing to n=25K.

Removing over half of k's for n=2500-10K for a base > 900. Not bad. :-)[/QUOTE]

Woot, 290 k´s remain.
I´m surprised. :smile:

S606 is complete to n=25K; 129 primes were found for n=10K-25K shown below; 286 k's remain; base released.

[code]
2380*606^10017+1
20786*606^10050+1
8732*606^10161+1
3468*606^10251+1
43305*606^10389+1
48901*606^10520+1
49993*606^10564+1
24786*606^10568+1
11553*606^10606+1
26977*606^10621+1
36085*606^10637+1
46302*606^10652+1
7008*606^10659+1
36490*606^10763+1
43473*606^10783+1
42430*606^10869+1
48368*606^10938+1
39430*606^11000+1
36483*606^11170+1
29805*606^11179+1
38105*606^11183+1
30463*606^11221+1
42986*606^11438+1
27666*606^11558+1
39206*606^11702+1
34681*606^11763+1
13921*606^11811+1
12136*606^11871+1
19696*606^11895+1
31728*606^11940+1
9322*606^12125+1
5703*606^12288+1
39415*606^12609+1
39471*606^12861+1
47528*606^12906+1
32522*606^12929+1
22018*606^12991+1
18277*606^12999+1
17118*606^13027+1
1321*606^13056+1
26372*606^13080+1
20912*606^13092+1
24523*606^13138+1
21388*606^13170+1
6586*606^13423+1
34822*606^13447+1
38008*606^13451+1
42453*606^13484+1
38867*606^13486+1
26967*606^13492+1
20121*606^13543+1
12910*606^13773+1
28712*606^13799+1
47575*606^13822+1
19976*606^13884+1
38408*606^13906+1
37312*606^13932+1
38512*606^14006+1
12246*606^14007+1
37877*606^14018+1
9700*606^14159+1
1750*606^14163+1
27823*606^14174+1
16740*606^14313+1
12311*606^14375+1
18211*606^14524+1
49978*606^14742+1
43895*606^14949+1
8988*606^15106+1
37302*606^15302+1
35157*606^15309+1
46350*606^15493+1
46486*606^15784+1
49023*606^15870+1
28437*606^16131+1
21143*606^16537+1
5858*606^16832+1
36798*606^16918+1
27702*606^16963+1
34162*606^17134+1
2751*606^17191+1
27676*606^17387+1
14528*606^17547+1
36172*606^17778+1
46422*606^18191+1
242*606^18214+1
25975*606^18249+1
3308*606^18779+1
13473*606^18981+1
9082*606^19051+1
42040*606^19094+1
29278*606^19292+1
24191*606^19483+1
19003*606^19505+1
49997*606^19542+1
48893*606^19637+1
2157*606^19681+1
38351*606^19800+1
43965*606^19814+1
34800*606^19914+1
10772*606^20306+1
19242*606^20474+1
47988*606^20500+1
16126*606^20624+1
10122*606^20759+1
42440*606^20780+1
26291*606^20966+1
29587*606^20982+1
34416*606^21028+1
24550*606^21040+1
17792*606^21116+1
26517*606^21157+1
34263*606^21600+1
46610*606^21802+1
4665*606^21868+1
21257*606^21966+1
6417*606^22107+1
21290*606^22354+1
39716*606^22497+1
15107*606^22555+1
42167*606^23279+1
29840*606^23488+1
2855*606^23674+1
14351*606^23693+1
35731*606^23983+1
35087*606^23988+1
7390*606^24071+1
46175*606^24154+1
25843*606^24446+1
[/code]

S936 is complete to n=10K; 362 primes were found for n=2500-10K; 301 k's remain.

Nearly as good as R936 for the same conjecture.

I'm turning my reservation over to Ian for n=10K-25K.

Reserving R606 to n=25K.

Reserving S810 to n=100k (50-100k) for BOINC

[QUOTE=MisterBitcoin;477972]Reserving S1005 up to n=25K.[/QUOTE]

I had to stop two of my linux server due to less work. One of them was payed until 03/03/2018 and the other one up to 31/11/2018.
It looks like something went wrong and they (the server hoster) deleted the datas from the longer payed server instead of the shorter one.
Anyway all results from S1005 were gone.
I´m releasing that base. Sieve file is also gone, will make a new one.

Reserving S576 to n=100k (25-100k) for BOINC

R936 is complete to n=25K; 106 primes were found for n=10K-25K shown below; 184 k's remain; base released.

[code]
90463*936^10035-1
94764*936^10129-1
73693*936^10260-1
71975*936^10281-1
52237*936^10414-1
90833*936^10437-1
60854*936^10593-1
18400*936^10657-1
51249*936^10678-1
100015*936^10937-1
1527*936^11179-1
82273*936^11315-1
78560*936^11478-1
5505*936^11603-1
2249*936^11625-1
47915*936^11631-1
88454*936^11673-1
2878*936^11674-1
95183*936^11690-1
40175*936^11843-1
98218*936^11873-1
69484*936^11884-1
24228*936^11968-1
54189*936^12103-1
26340*936^12140-1
10727*936^12304-1
69893*936^12528-1
53948*936^12649-1
52050*936^12652-1
38032*936^12675-1
93154*936^12716-1
75309*936^12892-1
12468*936^13036-1
91278*936^13063-1
79087*936^13083-1
8675*936^13198-1
67323*936^13235-1
22938*936^13351-1
18617*936^13518-1
30102*936^13529-1
44989*936^13928-1
30674*936^13963-1
85249*936^14024-1
73755*936^14040-1
97873*936^14336-1
26784*936^14340-1
15419*936^14724-1
25647*936^14874-1
13393*936^14933-1
35917*936^15014-1
45240*936^15196-1
69325*936^15393-1
12784*936^15771-1
10573*936^15832-1
90185*936^16118-1
98323*936^16263-1
52793*936^16604-1
64750*936^16653-1
64535*936^16758-1
81019*936^16828-1
40088*936^16904-1
45784*936^17138-1
25995*936^17388-1
71073*936^17497-1
88702*936^17528-1
33169*936^17792-1
42713*936^17918-1
66849*936^18065-1
64199*936^18229-1
79005*936^18291-1
328*936^18403-1
49074*936^18680-1
72943*936^18857-1
5745*936^18864-1
28184*936^18972-1
75403*936^19075-1
94408*936^19156-1
66959*936^19416-1
82092*936^19518-1
91452*936^19735-1
42645*936^19748-1
90310*936^19767-1
47938*936^19786-1
53624*936^19899-1
62284*936^20019-1
54127*936^20265-1
77578*936^20267-1
69744*936^20681-1
20497*936^21050-1
16894*936^21107-1
11002*936^21410-1
39752*936^21488-1
91779*936^21849-1
9917*936^21903-1
58809*936^21951-1
24649*936^22509-1
69903*936^22679-1
73508*936^22689-1
988*936^22749-1
73104*936^22756-1
54610*936^22943-1
75370*936^23341-1
86283*936^23366-1
12283*936^23768-1
96110*936^23956-1
69632*936^24096-1
[/code]

Reserving S646 to n=100k (25-100k) for BOINC

Reserving S1005 to n=25K.

S810 tested to n=100k (50-100k)

50 primes found, 165 remain

Results emailed - Base released

S576 tested to n=100k (25-100k)

64 primes found, 155 remain

Results emailed - Base released

Reserving R877 to n=25K.

I will turn the work over to Ian.

R606 is complete to n=25K; 185 primes were found for n=10K-25K shown below; 419 k's remain; base released.

[code]
39544*606^10036-1
2480*606^10050-1
52257*606^10059-1
18243*606^10150-1
7372*606^10253-1
26317*606^10267-1
51727*606^10285-1
41814*606^10318-1
65920*606^10370-1
67417*606^10537-1
14858*606^10729-1
25335*606^10853-1
71982*606^10901-1
72045*606^10993-1
27010*606^11145-1
67287*606^11155-1
33834*606^11162-1
52299*606^11177-1
24779*606^11193-1
61317*606^11236-1
21893*606^11283-1
46593*606^11318-1
69094*606^11332-1
48164*606^11368-1
58270*606^11384-1
36075*606^11457-1
59502*606^11501-1
40522*606^11539-1
39863*606^11616-1
68429*606^11617-1
33553*606^11658-1
18713*606^11766-1
68658*606^11786-1
43233*606^11992-1
66635*606^11994-1
802*606^11998-1
19023*606^12297-1
69142*606^12308-1
20518*606^12334-1
18342*606^12509-1
68874*606^12509-1
43499*606^12571-1
45985*606^12578-1
61702*606^12603-1
54618*606^12676-1
39778*606^12690-1
26723*606^12694-1
12797*606^12700-1
5195*606^12701-1
26905*606^12724-1
30792*606^12761-1
9199*606^12844-1
56858*606^12930-1
29234*606^12951-1
70475*606^13015-1
68489*606^13067-1
38817*606^13104-1
33882*606^13164-1
49713*606^13171-1
38949*606^13183-1
50558*606^13273-1
28543*606^13305-1
18988*606^13318-1
56777*606^13328-1
31035*606^13378-1
53052*606^13469-1
37678*606^13483-1
58410*606^13523-1
32727*606^13563-1
65108*606^13709-1
59613*606^13817-1
49757*606^13829-1
10152*606^13832-1
64849*606^13838-1
23615*606^13839-1
13609*606^13856-1
42105*606^13885-1
35625*606^13898-1
18175*606^13901-1
38467*606^14063-1
4468*606^14103-1
24887*606^14195-1
30704*606^14261-1
10389*606^14267-1
65333*606^14336-1
23880*606^14380-1
34897*606^14414-1
14793*606^14624-1
63890*606^14753-1
8982*606^15059-1
67932*606^15102-1
45245*606^15300-1
28478*606^15393-1
43207*606^15420-1
19898*606^15537-1
45319*606^15563-1
63673*606^15584-1
71219*606^15622-1
6547*606^15626-1
44678*606^15636-1
52133*606^15643-1
61303*606^15892-1
21669*606^15936-1
26364*606^15965-1
18020*606^16047-1
1587*606^16138-1
15250*606^16158-1
73672*606^16203-1
32358*606^16282-1
35569*606^16305-1
27147*606^16313-1
29369*606^16540-1
27188*606^16547-1
59284*606^16744-1
66808*606^17006-1
28109*606^17170-1
20404*606^17280-1
71995*606^17285-1
23997*606^17380-1
9144*606^17571-1
10668*606^17685-1
33164*606^17707-1
29345*606^17789-1
50544*606^17904-1
69113*606^18027-1
63254*606^18036-1
55119*606^18155-1
49015*606^18244-1
8220*606^18356-1
31180*606^18393-1
10169*606^18433-1
36054*606^18508-1
6069*606^18590-1
62672*606^18625-1
47930*606^18679-1
69610*606^18681-1
65573*606^18706-1
44259*606^18742-1
73180*606^18750-1
35288*606^18880-1
58699*606^19153-1
44913*606^19180-1
32830*606^19242-1
71618*606^19366-1
14457*606^19401-1
68644*606^19503-1
58915*606^19505-1
44702*606^19892-1
57513*606^19930-1
63142*606^19950-1
13682*606^19986-1
52153*606^20125-1
42433*606^20305-1
65998*606^20345-1
35254*606^20378-1
45098*606^20595-1
3138*606^20736-1
58240*606^20781-1
26007*606^20948-1
14865*606^21087-1
43828*606^21128-1
48472*606^21136-1
63387*606^21747-1
36425*606^21777-1
19230*606^21869-1
59717*606^22022-1
3550*606^22027-1
19489*606^22265-1
59662*606^22375-1
15835*606^22466-1
61245*606^22742-1
24007*606^23425-1
55843*606^23482-1
56529*606^23535-1
34029*606^23540-1
34960*606^23853-1
6674*606^24174-1
13439*606^24480-1
25212*606^24486-1
37398*606^24507-1
53155*606^24561-1
68987*606^24582-1
39574*606^24596-1
30230*606^24607-1
44349*606^24621-1
[/code]

Reserving S918 to n=100k (25-100k) for BOINC

Ian has completed S936 to n=25K; 128 primes were found for n=10K-25K shown below; 173 k's remain; base released.

[code]
42573*936^10049+1
51318*936^10072+1
21942*936^10156+1
78751*936^10183+1
9537*936^10248+1
40491*936^10257+1
5875*936^10348+1
37175*936^10470+1
26941*936^10543+1
32122*936^10594+1
72375*936^10648+1
35780*936^10717+1
47713*936^10858+1
92862*936^10965+1
4097*936^11025+1
91021*936^11052+1
50326*936^11055+1
9642*936^11077+1
57942*936^11123+1
75421*936^11157+1
92536*936^11306+1
10186*936^11332+1
13017*936^11364+1
29983*936^11409+1
80581*936^11499+1
22872*936^11587+1
31933*936^11609+1
32496*936^11661+1
64391*936^11717+1
51801*936^11749+1
21428*936^11753+1
16957*936^11761+1
58965*936^11783+1
32210*936^11795+1
32043*936^11854+1
76313*936^11887+1
36492*936^12014+1
10287*936^12074+1
43983*936^12080+1
20485*936^12085+1
59603*936^12100+1
30560*936^12285+1
86462*936^12341+1
62676*936^12384+1
97951*936^12407+1
82255*936^12421+1
26925*936^12422+1
98822*936^12438+1
97463*936^12523+1
80377*936^12549+1
72993*936^12724+1
99801*936^12924+1
79318*936^13082+1
97841*936^13228+1
29288*936^13242+1
64402*936^13531+1
4722*936^13706+1
40673*936^13892+1
85423*936^14046+1
18388*936^14169+1
73316*936^14344+1
68801*936^14376+1
4837*936^14448+1
15936*936^14679+1
66273*936^14855+1
98041*936^14891+1
44776*936^14993+1
38792*936^15052+1
63627*936^15117+1
73502*936^15148+1
33003*936^15325+1
23716*936^15401+1
46742*936^15483+1
40812*936^15739+1
26095*936^15815+1
21038*936^15852+1
87663*936^15891+1
19547*936^16092+1
25762*936^16532+1
54826*936^16540+1
100073*936^16865+1
8622*936^16915+1
28721*936^17336+1
82982*936^17337+1
72948*936^17417+1
97057*936^17443+1
49047*936^17591+1
21017*936^17609+1
79565*936^17739+1
80027*936^17795+1
70796*936^17937+1
8115*936^17983+1
94023*936^17989+1
47850*936^18574+1
59468*936^18687+1
44490*936^18706+1
17840*936^18786+1
90676*936^18889+1
82640*936^19119+1
31550*936^19140+1
84436*936^19572+1
79741*936^19695+1
74602*936^19916+1
20225*936^19956+1
4533*936^20207+1
22132*936^20239+1
31192*936^20255+1
59127*936^20605+1
3220*936^20952+1
63603*936^21326+1
40118*936^21510+1
64916*936^21562+1
79467*936^22159+1
56411*936^22305+1
27021*936^22355+1
54451*936^22381+1
78171*936^22508+1
73781*936^22930+1
32642*936^22957+1
30416*936^23254+1
95966*936^23429+1
65325*936^23477+1
86577*936^23509+1
8432*936^23621+1
42722*936^23918+1
55981*936^24012+1
70726*936^24573+1
88303*936^24807+1
[/code]

This is a hell of a base. > 40% of k's were primed for n=10K-25K leaving < 175 k's remaining for a CK > 100K and a base > 900. It's now on the recommended list for n=25K-100K and sieving is in progress. :-)

R662 tested to n=500k (200-500k)

nothing found, 1 remain

Results emailed - Base released

Reserving S807 to n=25K.

S1005 is complete to n=25K; 144 primes were found for n=10K-25K shown below; 386 k's remain; base released.

[code]
35578*1005^10017+1
31670*1005^10038+1
14118*1005^10205+1
1666*1005^10213+1
39912*1005^10239+1
29578*1005^10282+1
8652*1005^10332+1
49654*1005^10372+1
5186*1005^10432+1
32256*1005^10445+1
14394*1005^10491+1
20478*1005^10650+1
25296*1005^10722+1
25756*1005^10728+1
48754*1005^10769+1
48058*1005^10813+1
48684*1005^10961+1
1874*1005^10997+1
25336*1005^11014+1
26424*1005^11023+1
47606*1005^11179+1
19204*1005^11196+1
11896*1005^11197+1
45910*1005^11332+1
28472*1005^11592+1
30168*1005^11630+1
7696*1005^11686+1
47640*1005^11699+1
8632*1005^11759+1
53402*1005^11774+1
53248*1005^11900+1
43364*1005^11914+1
47914*1005^11947+1
38394*1005^11965+1
25724*1005^11981+1
51574*1005^12000+1
32276*1005^12041+1
40178*1005^12146+1
21766*1005^12292+1
594*1005^12295+1
22424*1005^12457+1
2698*1005^12472+1
27134*1005^12578+1
19438*1005^12616+1
17302*1005^12719+1
12960*1005^12820+1
47904*1005^12897+1
41324*1005^12907+1
34078*1005^12969+1
17552*1005^12982+1
9602*1005^13067+1
26792*1005^13075+1
20296*1005^13164+1
23308*1005^13238+1
28108*1005^13243+1
10480*1005^13274+1
9324*1005^13301+1
46596*1005^13332+1
33250*1005^13434+1
54408*1005^13464+1
9588*1005^13560+1
18366*1005^13586+1
15536*1005^13723+1
40010*1005^13782+1
32616*1005^14005+1
25702*1005^14210+1
9952*1005^14243+1
6698*1005^14432+1
18992*1005^14531+1
3522*1005^14938+1
12284*1005^15097+1
24174*1005^15237+1
12766*1005^15255+1
25466*1005^15340+1
19722*1005^15373+1
33718*1005^15488+1
45272*1005^15577+1
22580*1005^15749+1
8028*1005^15758+1
8152*1005^15922+1
32922*1005^16016+1
23376*1005^16195+1
29114*1005^16229+1
34336*1005^16416+1
25310*1005^16439+1
18520*1005^16772+1
29042*1005^16819+1
30434*1005^17099+1
48698*1005^17183+1
30740*1005^17254+1
54576*1005^17263+1
37504*1005^17301+1
4828*1005^17703+1
40202*1005^17774+1
15110*1005^17836+1
10440*1005^17934+1
46244*1005^17936+1
41114*1005^17940+1
24828*1005^18055+1
36916*1005^18156+1
42228*1005^18493+1
4586*1005^18512+1
31162*1005^18713+1
2340*1005^18928+1
13256*1005^18930+1
49474*1005^19281+1
26564*1005^19496+1
4072*1005^19614+1
13018*1005^20013+1
14706*1005^20072+1
552*1005^20099+1
38604*1005^20102+1
38356*1005^20142+1
16826*1005^20225+1
8294*1005^20402+1
31268*1005^20411+1
15986*1005^20580+1
7586*1005^20717+1
25236*1005^20966+1
28190*1005^21125+1
53500*1005^21182+1
4000*1005^21670+1
51134*1005^21709+1
12184*1005^21723+1
9344*1005^21800+1
43370*1005^21890+1
32080*1005^22304+1
6646*1005^22540+1
36900*1005^22792+1
31316*1005^23309+1
2636*1005^23345+1
2224*1005^23393+1
26166*1005^23525+1
14658*1005^23734+1
31664*1005^23776+1
27772*1005^23814+1
35012*1005^23814+1
49110*1005^23862+1
28432*1005^24119+1
46686*1005^24184+1
29564*1005^24447+1
34788*1005^24621+1
7020*1005^24734+1
47784*1005^24987+1
[/code]

This is the final base that will have < 400 k's remaining at n=25K.

S550
 

S550 is completed to n=400,000 with no primes found. I'm releasing this one. I'm attaching both the results and the sieve file with the tested candidates removed (the sieve file goes up to n=1M).

[QUOTE=wombatman;483851]S550 is completed to n=400,000 with no primes found. I'm releasing this one. I'm attaching both the results and the sieve file with the tested candidates removed (the sieve file goes up to n=1M).[/QUOTE]

Results are missing for 15 tests for n=250107 to 251043. Do you have those or can you confirm that you tested them?

How strange. Although I'm pretty sure I did, I can't say with absolute certainty. If you can provide the numbers, I'd be happy to test them. Each one was only taking about 30 minutes, so I could easily finish it overnight.

[QUOTE=wombatman;483903]How strange. Although I'm pretty sure I did, I can't say with absolute certainty. If you can provide the numbers, I'd be happy to test them. Each one was only taking about 30 minutes, so I could easily finish it overnight.[/QUOTE]

Here ya go:

750000000000000:P:1:550:257
94 250107
94 250113
94 250203
94 250347
94 250389
94 250407
94 250449
94 250467
94 250617
94 250701
94 250731
94 250839
94 250971
94 251037
94 251043

Ian has completed R877 to n=25K; 165 primes were found for n=10K-25K shown below; 471 k's remain; base released.

[code]
21510*877^10098-1
2564*877^10116-1
19724*877^10116-1
14922*877^10160-1
28848*877^10174-1
14366*877^10302-1
22596*877^10314-1
45642*877^10366-1
8202*877^10409-1
48078*877^10423-1
900*877^10433-1
31326*877^10477-1
9518*877^10480-1
8324*877^10576-1
14156*877^10591-1
34598*877^10616-1
23564*877^10620-1
10808*877^10696-1
28614*877^10721-1
13902*877^10800-1
19406*877^10845-1
20906*877^10925-1
28676*877^10934-1
17880*877^11023-1
38514*877^11151-1
11558*877^11263-1
40128*877^11303-1
7206*877^11331-1
8066*877^11389-1
15602*877^11458-1
36722*877^11609-1
39038*877^11619-1
49064*877^11632-1
44492*877^11650-1
36788*877^11795-1
11094*877^11844-1
34140*877^12037-1
14400*877^12061-1
18510*877^12132-1
37766*877^12226-1
9158*877^12271-1
3966*877^12309-1
17126*877^12347-1
22254*877^12823-1
1626*877^12843-1
11736*877^12909-1
44760*877^13249-1
42566*877^13302-1
8684*877^13308-1
35592*877^13328-1
30440*877^13362-1
1214*877^13379-1
6794*877^13433-1
3678*877^13480-1
14394*877^13759-1
37512*877^13838-1
12308*877^13896-1
28806*877^13913-1
19716*877^14007-1
26336*877^14158-1
32328*877^14220-1
890*877^14248-1
27834*877^14307-1
4248*877^14575-1
10382*877^14626-1
2732*877^14802-1
19278*877^14819-1
42486*877^14990-1
45282*877^15000-1
44270*877^15112-1
5114*877^15140-1
17078*877^15178-1
18732*877^15269-1
21704*877^15347-1
5498*877^15359-1
16778*877^15366-1
8198*877^15368-1
41724*877^15423-1
24186*877^15535-1
6096*877^15547-1
44864*877^15560-1
41172*877^15729-1
602*877^15834-1
48854*877^15887-1
27624*877^16015-1
17558*877^16059-1
2930*877^16218-1
21368*877^16415-1
43424*877^16420-1
10214*877^16456-1
47094*877^16489-1
3504*877^16491-1
11988*877^16506-1
18588*877^16546-1
31488*877^16612-1
30714*877^16659-1
36890*877^16705-1
36666*877^16922-1
22674*877^17033-1
36078*877^17142-1
23976*877^17357-1
46730*877^17358-1
48864*877^17447-1
12272*877^17477-1
23262*877^17482-1
18644*877^17552-1
46292*877^17630-1
1856*877^17683-1
24276*877^17701-1
7796*877^17745-1
42386*877^17923-1
40842*877^17973-1
29516*877^18005-1
25502*877^18385-1
20610*877^18442-1
45438*877^18455-1
5576*877^18717-1
6920*877^18845-1
8864*877^18952-1
38426*877^18983-1
16172*877^19057-1
30290*877^19132-1
5048*877^19220-1
6684*877^19316-1
6420*877^19778-1
9060*877^19798-1
33458*877^19908-1
21656*877^20421-1
12378*877^20559-1
14094*877^20565-1
22388*877^20610-1
8556*877^20739-1
38268*877^20778-1
39456*877^20837-1
43752*877^20860-1
4470*877^20891-1
13080*877^20912-1
8474*877^20921-1
2864*877^20983-1
45504*877^20996-1
35838*877^21012-1
2648*877^21030-1
7506*877^21163-1
11378*877^21344-1
16494*877^21411-1
32010*877^21589-1
28158*877^21632-1
18536*877^21679-1
3768*877^22359-1
23216*877^23085-1
29906*877^23091-1
11570*877^23115-1
14414*877^23267-1
3896*877^23759-1
47162*877^23993-1
26352*877^24066-1
38222*877^24070-1
18818*877^24288-1
28886*877^24483-1
29576*877^24527-1
8934*877^24589-1
29066*877^24810-1
17658*877^24918-1
10908*877^24942-1
42228*877^24959-1
[/code]

[QUOTE=gd_barnes;483909]Here ya go:

750000000000000:P:1:550:257
94 250107
94 250113
94 250203
94 250347
94 250389
94 250407
94 250449
94 250467
94 250617
94 250701
94 250731
94 250839
94 250971
94 251037
94 251043[/QUOTE]

Got 'em, and they're running. I'll let you know if it somehow turns up a prime.

The missing numbers are now completed, and no primes popped up. Sorry about the issue. :smile:

S646 tested to n=100k (25-100k)

88 primes found, 133 remain

Results emailed - Base released

Reserving R996 to n=25K.

Reserving R888.

Reserving R708 to n=100k (50-100k) for BOINC

Ian and I have completed S807 to n=25K; 143 primes were found for n=10K-25K shown below; 508 k's remain; base released.

[code]
14456*807^10033+1
1912*807^10126+1
43690*807^10163+1
19990*807^10327+1
11728*807^10340+1
18752*807^10387+1
9166*807^10440+1
24356*807^10481+1
37210*807^10557+1
18622*807^10583+1
20926*807^10629+1
38642*807^10638+1
40596*807^10641+1
21708*807^10809+1
33208*807^10926+1
44782*807^10976+1
9336*807^11004+1
34060*807^11083+1
18636*807^11144+1
18328*807^11218+1
18042*807^11300+1
22048*807^11425+1
17376*807^11631+1
11742*807^11732+1
43456*807^11801+1
24758*807^11860+1
45542*807^11924+1
28012*807^12027+1
14214*807^12158+1
45762*807^12164+1
23534*807^12166+1
35234*807^12221+1
32352*807^12339+1
39822*807^12416+1
27492*807^12428+1
39016*807^12447+1
29206*807^12501+1
20126*807^12705+1
8346*807^12717+1
6936*807^12931+1
1482*807^12994+1
22020*807^13147+1
43966*807^13267+1
35900*807^13297+1
41802*807^13524+1
36420*807^13678+1
6494*807^13695+1
49038*807^13697+1
22874*807^13882+1
38992*807^13972+1
52702*807^14014+1
17930*807^14721+1
35852*807^15082+1
17538*807^15102+1
9908*807^15168+1
39490*807^15173+1
27294*807^15174+1
21394*807^15254+1
6082*807^15359+1
53142*807^15375+1
47588*807^15380+1
20758*807^15534+1
3978*807^15545+1
22278*807^15572+1
21892*807^15644+1
52764*807^15783+1
38482*807^15914+1
528*807^16014+1
5456*807^16116+1
41856*807^16253+1
458*807^16262+1
19082*807^16362+1
43126*807^16441+1
45370*807^16461+1
11186*807^16704+1
53374*807^16859+1
43438*807^16896+1
39420*807^16907+1
18482*807^16943+1
15658*807^17170+1
52146*807^17181+1
41608*807^17289+1
25130*807^17305+1
10066*807^17317+1
51168*807^17448+1
29452*807^17498+1
32896*807^17547+1
3636*807^17624+1
2322*807^17635+1
1686*807^17732+1
39884*807^17926+1
34438*807^17965+1
40344*807^18005+1
45622*807^18011+1
33662*807^18080+1
28272*807^18106+1
32584*807^18163+1
49556*807^18221+1
26078*807^18237+1
5320*807^18326+1
5960*807^18348+1
30532*807^18402+1
9946*807^18569+1
4546*807^18780+1
27396*807^18837+1
10548*807^19304+1
14948*807^19401+1
42906*807^20172+1
5078*807^20217+1
20212*807^20250+1
38614*807^20282+1
48856*807^20316+1
26754*807^20533+1
16798*807^20898+1
28572*807^20904+1
10966*807^21003+1
7564*807^21083+1
40444*807^21247+1
15956*807^21347+1
8994*807^21427+1
32138*807^21465+1
16986*807^21780+1
28908*807^21898+1
35752*807^21963+1
49738*807^22116+1
12164*807^22153+1
38104*807^22331+1
49092*807^22843+1
41786*807^22928+1
46290*807^23035+1
19844*807^23122+1
34612*807^23352+1
7612*807^23588+1
5582*807^23660+1
5946*807^23856+1
23096*807^23952+1
36926*807^24012+1
9068*807^24069+1
7244*807^24322+1
28972*807^24443+1
21174*807^24478+1
14794*807^24537+1
16554*807^24661+1
[/code]

Reserving R936 to n=100k (25-100k) for BOINC

Reservation
 

I reserved S606 to n=100k on another thread, but I'm putting it here too just to be safe.

[QUOTE=germanNinja;485354]I reserved S606 to n=100k on another thread, but I'm putting it here too just to be safe.[/QUOTE]

Welcome to the project! Can you introduce yourself and tell us about your experience in prime searching and your resources? This is a tremendous amount of work. Keep in mind that n=100k tests take 16 times as long as n=25k tests. A single modern quad-core machine running 24x7 can take up to a year to complete this effort.

[QUOTE=gd_barnes;485358]Welcome to the project! Can you introduce yourself and tell us about your experience in prime searching and your resources? This is a tremendous amount of work. Keep in mind that n=100k tests take 16 times as long as n=25k tests. A single modern quad-core machine running 24x7 can take up to a year to complete this effort.[/QUOTE]

I'm been searching heavily on Primegrid for almost a year now. I just joined srbase a few days ago. Right now I have my laptop, an i5-4200U, working on this reservation. I also have a i7-7700K at my disposal. I was unaware that it could take a YEAR to do this, but I promise I'll work on it. With that amount of time in mind, is there an easy way to split up work across multiple computers? I was planning on just using my laptop, but clearly it's not ideal. Should I just cut and paste all of a few k values and move them to another sieve file on another computer? Is there a better way to do this?

[QUOTE=germanNinja;485366]I'm been searching heavily on Primegrid for almost a year now. I just joined srbase a few days ago. Right now I have my laptop, an i5-4200U, working on this reservation. I also have a i7-7700K at my disposal. I was unaware that it could take a YEAR to do this, but I promise I'll work on it. With that amount of time in mind, is there an easy way to split up work across multiple computers? I was planning on just using my laptop, but clearly it's not ideal. Should I just cut and paste all of a few k values and move them to another sieve file on another computer? Is there a better way to do this?[/QUOTE]
Why , for start you dont take base with smaller number of candidates ,and with finished sieva file? When you finish that, that move on next, (larger) task?

I'm not too sure what you mean. S606 had a finished sieve file. I picked it because of that and it was on the "Recommended Bases and Efforts" list. Was there something I didn't get?

[QUOTE=germanNinja;485382]I'm not too sure what you mean. S606 had a finished sieve file. I picked it because of that and it was on the "Recommended Bases and Efforts" list. Was there something I didn't get?[/QUOTE]

Its better to take a 100-300k range and use the -t command.

Oh well, live and learn. I'll stick with this for now and experiment.

May we kindly make a suggestion: Reserve a much smaller amount of work first and work your way up to the larger reservations to see if you will maintain interest for a very long period of time on one effort.

For example look in the recommended thread and consider the following:

1. Reserve one of the bases (that has a sieve file) from the 2nd category that have bases with 2 or 3 k's remaining. You can test that for either n=100K-200K or n=100K-300K. (Perhaps will take 2-5 weeks on a modern quad running 24x7 depending on whether you search to n=200K or 300K.)

2. If you find #1 interesting move on up to the the 3rd category, which has bases with one k remaining. You can test a base for n=200K-400K or n=200K-500K. This will likely take about twice as long as #1. (Possibly 1-2 months on a modern quad.)

3. If you can still maintain interest in the above for up to 2 months on a single effort while running your cores continuously (many people have to have more variety) then you could consider larger reservations such as the 1st category. Consider this: SRBase with many large users running BOINC generally takes 2-4 weeks to complete one of these n=25K-100K ranges. These 1st category bases are huge efforts!

We are reluctant to reserve such a large effort for you until you have done something smaller first. Try the above and work your way up. Most bases take quite a long time at this point on the project. That is why many people choose to search at SRBase using BOINC.


Gary

I am confident I will maintain interest. Right after I made my first post yesterday, I downloaded everything I needed, researched how to split the workload across computers, and started crunching on two of my three computers. My plan for this morning was to split it up to my third computer as well. I am no stranger to long tasks -- I have done a small amount of GIMPS crunching. While I have not done anything that takes around a year, I have done GIMPS tasks that take well over a month.

If you will not reserve S606 for me, that's fine -- I'll look into your suggestions, more GIMPS work, or other BOINC projects. However, I ask that you allow me to reserve it. I'll send you progress reports as often as you want as proof that I'm sticking with it. One if my flaws is being stubborn :)

Why must many new people, mainly young students, insist on reserving such large pieces of work? It is very frustrating. It's so much easier to reserve something small. We've seen many people come and then quickly go away this way.

It is already obvious that you will not be running your computer(s) 24 hours a day.

I'll reserve it for you for two weeks. Please report a status in two weeks and every two weeks thereafter for the first two months. We will then discuss your progress. Have you done any calculation how long it will take you to complete the entire reservation? That should have been the first thing that you did.

This base in our 2018 project goals, as are all other bases on the recommended list, meaning that we expect that it will be done by the end of this year.