Sorry, about that. attached remaining @ n 2500.

[QUOTE=firejuggler;382944]S348 completed @ 10k
remaining @ 2500 899, 299 prime found between n=2500 and 10000
file attached[/QUOTE]

Two problems:
1. k=26523 is the conjecture so it is not remaining. (Run the script with max-k set at conjecture - 1.)
2. There are 346 (vs. 299) k's found prime for n=2.5K-10K.

Corrected counts:
898 k's remaining at n=2500
346 k's found prime for n=2500-10K
552 k's remaining at n=10K

Reserving S292 to 2500 for now.

[QUOTE=firejuggler;383539]Reserving S292 to 2500 for now.[/QUOTE]

It won't be shown as reserved anywhere unless it is first reserved to n=10K. If you reserve it to n=10K, please forward all files at one time when you have tested it to n=10K.

Ok, consider it reserved to 10k.
FYI : 226 seq remaining @ k=9220; meaning about 900 left when i'm done with n=2500, right?

R383 is complete to n=200K and released.

Results is going to be sent together with S383 results as the testing of S383 completes to n=200K around 6 weeks from now. In case anyone is wondering why R383 is complete whilst S383 isn't, it is because I used the One k per instance function :smile:

S292 done
986 sequences left @ n=2500
411 primes found between 2501 and 10k
575 seq left

S270
 

Reserving new base S270 to n=10k

Conjectured k = 62060[LIST][*]got covering.exe from [URL]http://www.mersenneforum.org/showthread.php?p=134389#post134389[/URL][*]and confirmed conjectured k with parameters 144,270,1,100000,100000[/LIST]Covering set is {7,37,151,271}[LIST][*]confirmed 62060*270^n+1 repeats 7,37,271,7,271,151 up to n=50 using [URL]http://www.alpertron.com.ar/ECM.HTM[/URL][/LIST]Trivial Factors = k == 268 mod 269[LIST][*]Sierp base 270[*]270-1=269[*]prime factors of 269 = 269 (269 is prime)[*]k==(268 mod 269)[/LIST]
Planning on using PFGW version 3.7.7 dated July 22, 2013 with new-bases-4.3.txt script up to n=2500[LIST][*]>pfgw.exe new-bases-4.3.txt -f100 -l[*]will send pl_MOB, pl_prime, and pl_remain script output files when complete[/LIST]I chose S270 as its the lowest base not started with ck<1e5

R336
 

Reserving R336 as new to n=10K

Reserving the new base R445 to n=25k

R336
 

Riesel Base = 336
Conjectured k = 63018
Covering Set = 17, 29, 337
Trivial Factors = k == 1 mod 5(5) and k == 1 mod 67(67)
Found Primes: 49160k's
21904 proven composite by partial algebraic factors
Remaining: 416k's - Tested to n=2.5K
Trivial Factor Eliminations: 13356k's
MOB Eliminations: 84k's
PFGW used = 3.4.3 dated 2010/11/04
k's in balance @ n=2500

227 primes found n=2500-10K
189 remain @ n=10K

Results emailed - Base released

TheCount has completed S270 to n=10K; 524 primes were found for n=2.5K-10K; 621 k's remain; base released.

R277
 

Reserving R277 to n=50K

R328/S328 completed to n=500000 and continuing. I will probably take a break at n=600000.

Reserving R336 and S336 to n=25K.

R477
 

R477 tested n=25K-50K
9 primes found - 39 remain
Results emailed - base released

Here are the residues for R328/S328 for n<400000. I'll upload the residues for n<600000 (which are running on a different server) when that part of the range is complete.

R351
 

Reserving R351 to n=50K
I'm also going to re-test 19K-25K. It doesn't look right abruptly stopping like that.

R277
 

R277 tested n=25K-50K

11 primes found - 29 remain

Results emailed - Base released

Reserving the new base R396 to n=10k

R336 is complete to n=25K; 62 primes were found for n=10K-25K shown below; 127 k's remain; base released.


Primes:
[code]
52868*336^10146-1
47055*336^10225-1
46389*336^10330-1
56567*336^10368-1
45570*336^10412-1
20002*336^10438-1
54463*336^10450-1
41479*336^10549-1
43894*336^10626-1
8322*336^10636-1
9772*336^10680-1
48219*336^10881-1
5954*336^11104-1
39602*336^11172-1
51125*336^11318-1
46494*336^11429-1
42492*336^11437-1
15899*336^11614-1
59074*336^11687-1
19132*336^11827-1
44655*336^12264-1
22793*336^12272-1
31849*336^12584-1
20647*336^12820-1
21860*336^13121-1
23424*336^13315-1
54838*336^13501-1
42725*336^14162-1
53330*336^14277-1
44300*336^14289-1
58969*336^14542-1
41539*336^14647-1
29610*336^15241-1
36889*336^15407-1
12899*336^15798-1
32400*336^16079-1
57560*336^16390-1
12313*336^16508-1
11670*336^16896-1
49285*336^16928-1
38725*336^17249-1
54469*336^18445-1
60354*336^18512-1
24109*336^19030-1
54155*336^19470-1
53220*336^19485-1
39430*336^19487-1
31862*336^19663-1
28900*336^19787-1
5150*336^19845-1
595*336^20046-1
8453*336^20200-1
9553*336^20275-1
23005*336^20536-1
38888*336^20820-1
23942*336^21213-1
14217*336^22770-1
8670*336^22789-1
21419*336^23700-1
10859*336^23945-1
21823*336^24211-1
58998*336^24856-1
[/code]

Here are the residues for R328/S328 to n=600000. I would like to hold onto this range, but it will likely be a couple of months before I return to it.

R396 tested to n=10K

214 primes found - 255 remain

Results emailed - Base released

S442
 

Reserving S442 to n=10K

R323
 

Reserving R323 to n=10K

S442
 

Sierp Base = 442
Conjectured k = 36768
Covering Set = 5, 41, 443
Trivial Factors = k == 1 mod 3(3) k == 6 mod 7(7)

Found Primes: 20666k's
Remaining: 313k's - Tested to n=2.5K
Trivial Factor Eliminations: 15758k's
MOB Eliminations: 28k's
GFN's: 2k's
PFGW used = 3.4.3 dated 2010/11/04
k's in balance @ n=2500

165 primes found n=2.5K-10K
148k's remain at n=10K
Results emailed - Base released

R351
 

R351 tested n=19K-50K (partial retest)
8 primes found - 25 remain
Results emailed - Base released

Reserving the new base R442 to n=10k

Odi

S340
 

Reserving S311 and S340 to n=300k.

210*340^104298+1 is prime! (264031 decimal digits)
76*311^135562+1 is prime! (337926 decimal digits)


Note: This makes both bases 1kers. MyDog

Reserving a bunch:
R233, R234, R236, S252, R258, S259, R275, R326, R337 to n=300k.

Well, and 35 · 326^174298 - 1 is prime (makes a 1ker for this one, too).

S336 is complete to n=25K; 92 primes were found for n=10K-25K shown below; 202 k's remain; base released.


Primes:
[code]
39708*336^10064+1
17392*336^10116+1
13501*336^10170+1
70991*336^10243+1
84780*336^10497+1
49007*336^10507+1
11630*336^10640+1
34092*336^10684+1
69361*336^10696+1
90390*336^10704+1
65105*336^10716+1
50315*336^10853+1
79245*336^10971+1
37166*336^11070+1
40791*336^11107+1
41785*336^11118+1
91716*336^11144+1
83840*336^11176+1
35292*336^11650+1
18947*336^11804+1
68615*336^12007+1
43813*336^12049+1
36962*336^12085+1
82672*336^12109+1
53687*336^12160+1
46380*336^12181+1
58105*336^12235+1
41736*336^12348+1
11947*336^12363+1
4987*336^12401+1
19835*336^12403+1
18835*336^12427+1
32437*336^12513+1
28321*336^12735+1
87840*336^12805+1
55540*336^13181+1
65876*336^13196+1
33576*336^13360+1
33725*336^13465+1
27143*336^13671+1
25297*336^14084+1
67936*336^14174+1
41382*336^14273+1
17103*336^14823+1
35845*336^14831+1
63986*336^15288+1
42591*336^15383+1
13653*336^15407+1
70563*336^15436+1
15233*336^15575+1
57391*336^15782+1
63610*336^15804+1
46791*336^15811+1
65186*336^15850+1
86798*336^15939+1
3032*336^16011+1
56491*336^16118+1
34938*336^16162+1
41556*336^16422+1
81955*336^16445+1
66933*336^16460+1
48826*336^16547+1
82318*336^16752+1
24456*336^16916+1
30375*336^16920+1
60457*336^17432+1
74091*336^17468+1
57102*336^17699+1
82466*336^17918+1
8195*336^18248+1
84715*336^18612+1
86303*336^19159+1
16361*336^19161+1
16283*336^19407+1
52242*336^19704+1
76348*336^20305+1
68096*336^20622+1
45560*336^21700+1
61845*336^22019+1
21612*336^22030+1
66877*336^22082+1
53053*336^22504+1
68135*336^22717+1
70940*336^22921+1
912*336^22984+1
81652*336^23075+1
74901*336^23134+1
5192*336^23312+1
53642*336^24129+1
27212*336^24340+1
77635*336^24470+1
48795*336^24498+1
[/code]

R323
 

Riesel Base = 323
Conjectured k = 93896
Covering Set = 3, 5, 10433
Trivial Factors = k == 1 mod 2(2) k == 1 mod 7(7) k == 1 mod 23(23)
Found Primes: 35197k's
Remaining: 3207k's - Tested to n=2.5K
Trivial Factor Eliminations: 8456k's
MOB Eliminations: 87k's

k's in balance @ n=2500
PFGW used = 3.4.3 dated 2010/11/04

947primes found n=2.5K-10K
2260 remaining @ n=10K

Results emailed - Base released

[QUOTE=MyDogBuster;388649]Riesel Base = 323
Conjectured k = 93896
Covering Set = 3, 5, 13, 37, 457
Trivial Factors = k == 1 mod 2(2) k == 1 mod 7(7) k == 1 mod 23(23)
Found Primes: 35197k's
Remaining: 3207k's - Tested to n=2.5K
Trivial Factor Eliminations: 8456k's
MOB Eliminations: 87k's

k's in balance @ n=2500
PFGW used = 3.4.3 dated 2010/11/04

947primes found n=2.5K-10K
2260 remaining @ n=10K

Results emailed - Base released[/QUOTE]

I suggest taking 3.7.8 for a spin. You can compare the results then choose if you want to upgrade. 3.7.8 might be much faster than 3.4.3.

R442 tested to n=10K

196 primes found - 207 remain

Results emailed - Base released

Odi

R490
 

Reserving R490 to n=10K

Reserving S335 to n=500k.

Reserving S395 to n=450k.

R490
 

Riesel Base = 490
Conjectured k = 48051
Covering Set = 13, 31, 199
Trivial Factors = k == 1 mod 3(3) k == 1 mod 163(163)

Found Primes: 31408k's
Remaining: 396k's - Tested to n=2.5K
Trivial Factor Eliminations: 16213k's
MOB Eliminations: 33k's
PFGW used = 3.4.3 dated 2010/11/04
k's in balance @ n=2500

188 primes found 2.5K-10K
208 remain @ n=10K

Results emailed - Base released

Reserving R343 and S343 to n=200k. (They sieve nicely together; two times six k's)

R343 is already upped to n=100k.
Two eliminations:
516*343^68693-1 is prime! (174160 decimal digits)
646*343^108636+1 is prime! (275428 decimal digits)

S383 and R383 is complete to n=200K and released.

Results has been e-mailed, aswell with a previously unreported prime for k=740 for S383 :smile:

Now on with my R3 reservation.

Take care.

S442
 

Reserving S442 to n=25K

R292, R445
 

R292 is complete to n=50k (265k's remain) and R445 is complete to n=25k (142 k's remain).
All results emailed to Gary and both bases now released.

Reserving S394 to n=200K for BOINC
Reserving S396 to n=100K for BOINC

S262
 

Reserving S262 to n=10K

S396 tested to n=100K

5 primes found - 11 remain

2126*396^65889+1
823*396^51639+1
398*396^86708+1
1713*396^73752+1
4155*396^92698+1

Results emailed - Base released

S394 tested to n=200K

nothing found

Results emailed - Base released

S262
 

Sierp Base = 262
Conjectured k = 110724
Covering Set = 5, 7, 13, 103, 263
Trivial Factors = k == 2 mod 3(3) k == 28 mod 29(29)

Found Primes: 69007k's
Remaining: 2071k's - Tested to n=2.5K
Trivial Factor Eliminations: 39454k's
MOB Eliminations: 188k's
GFN Eliminations: 3k's

k's in balance @ n=2500
PFGW used = 3.4.3 dated 2010/11/04

910 primes found n=2.5K-10K
1161 remain @ n=10K

Results emailed - Base released

[COLOR=Red]Reserving S130 to n=10K[/COLOR]

S442
 

S442 tested n=10K-25K

54 primes found - 94 remain

Results emailed - Base released

[COLOR=Red]Reserving R591 to n=25K[/COLOR]

Reserving S446 to n=100K for BOINC

S446 tested to n=100K

2 primes found, 7 remain

70*446^89454+1 is prime!
143*446^55765+1 is prime!

Results emailed - Base released

Reserving S493 to n=100K for BOINC

Reserving R446 to n=100K for BOINC

S493 tested to n=100K

nothing found

Results emailed - Base released

R446 tested to n=100K

1 prime found, 5 remain

34*446^50995-1 is prime!

Results emailed - Base released

I'm continuing on S328/R328. It will be a long time before I post results, barring finding a prime.

Reserving R256 to n=250K.

S297
 

Reserving S297 to n=10K

R460
 

Reserving R460 to n=10K

R256 at n=250K, going further.

S297
 

Sierp Base = 297
Conjectured k = 133654
Covering Set = 5, 7, 13, 19, 149
Trivial Factors = k == 2 mod 3(3)

Found Primes: 63185k's
Remaining: 1685k's - Tested to n=2.5K
Trivial Factor Eliminations: 1806k's
MOB Eliminations: 150k's
k's in balance @ n=2500
PFGW used = 3.4.3 dated 2010/11/04
722 primes found n=2.5K-10K
963 remain @ n=10K

Results emailed - Base released

R460
 

Riesel Base = 460
Conjectured k = 56243
Covering Set = 13, 41, 461
Trivial Factors = k == 1 mod 3(3) and k == 1 mod 17(17)

Found Primes: 34733k's
Remaining: 510k's - Tested to n=2.5K
Trivial Factor Eliminations: 20954k's
MOB Eliminations: 44k's
k's in balance @ n=2500
PFGW used = 3.4.3 dated 2010/11/04

250 primes found n=2.5K-10K
260k's remain @ n=10K

Results emailed - Base released

S351 S366
 

Reserving S351 and S366 to n=10K

Reserving S392 to n=100K.

Reserving S443 to n=100K.

S392 is complete to n=100K, 2 primes were found for n=50K-100K shown below, 4 k's remain, base released.

Primes:
92*392^57111+1
61*392^68204+1

S443 is complete to n=100K, 1 prime was found for n=50K-100K shown below, 4 k's remain, base released.

Prime:
136*443^57948+1

Reserving S410 to n=100K.

S410 is complete to n=100K, no primes were found for n=50K-100K, 6 k's still remain, base released.

Status update.
R333 @ 750K, search continues.

Reserving R327 to n=200K (100-200k) for BOINC

Reserving S368 to n=200K (100-200k) for BOINC

R327 tested to n=200K

nothing found

Results emailed - Base released

R442
 

Reserving R442 to n=25K (on recommended list)

S351
 

Sierp Base = 351
Conjectured k = 115752
Covering Set = 11, 29, 269
Trivial Factors = k == 1 mod 2(2) k == 4 mod 5(5) k == 6 mod 7(7)

Found Primes: 39135k's
Remaining: 481k's - Tested to n=2.5K
Trivial Factor Eliminations: 18189k's
MOB Eliminations: 70k's

k's in balance @ n=2500
PFGW used = 3.4.3 dated 2010/11/04
221 primes found n=2.5K-10K
260k's remain @ n=10K

Results emailed - Base released

S366
 

Sierp Base = 366
Conjectured k = 79231
Covering Set = 7, 31, 619
Trivial Factors = k == 4 mod 5(5) k == 72 mod 73(73)

Found Primes: 61020k's
Remaining: 1384k's - Tested to n=2.5K
Trivial Factor Eliminations: 16714k's
MOB Eliminations: 110k's
GFN Eliminations: 2k's

k's in balance @ n=2500
PFGW used = 3.4.3 dated 2010/11/04
590 primes found n=2.5K-10K
794k's remain @ n=10K

Results emailed - Base released

S368 tested to n=200K

nothing found

Results emailed - Base released

R442
 

R442 tested n=10K-25K

82 primes found - 125 remain

Results emailed - Base released

[COLOR=Red]R396 reserved to n=25K (recommended list)[/COLOR]

S315 S326
 

Reserving S315 & S326 to n=200K

R396
 

R396 tested n=10K-25K

69 primes found - 186 remain

Results emailed - Base released

Reserving R319 and R497 to n=100K.

R366 tested n=800k to 900k, no prime. Continuing to n=1M.

R319 and R497 are complete to n=100K; 3 primes were found for n=50K-100K; primes and k's remaining shown below; bases released.

R319; 2 primes, 4 k's remaining
R497; 1 prime, 4 k's remaining

Primes:
1244*319^51654-1
1266*319^85179-1
28*497^61627-1

Reserving S458 to n=400K

Reserving S353 to n<=330k; S401, S409, S426 to n<=320k; and S797 to n<=290k.

S353, S401, S409, S426, and S797 are done. Results emailed. Bases released.

Note that S426 sieve file still contained n==0 (mod 3), even though these are sums of cubes, ergo composite.
Remove them from the remainder of the sieve file. srsieve [B]does not[/B] remove them.
When reserving a base with k=8, 27, 64, etc (you get the idea, cubes) - check the sieve files for n==0 (mod 3) for these k's.

When reserving a Sierp base with k=4, 64, 324, 1024, 2500, etc, - check the sieve files for n==0 (mod 4). Frequently these are luckily removed by a small factor, but not always.

One note about the algebraic n's: Quite a few of the sieve files on the project were done with versions of srsieve that did not remove algebraic n's so this is not necessarily a "bug" in srsieve so to speak. Newer versions of srsieve may correctly remove the n==(0 mod 3) on algebraic n's where k*b^n+1 simplifies to q^3+1. I have not checked this.

Reserving S499 to n=100K (25-100k) for BOINC

Reserving S450 to n=400K (200-400k) for BOINC

R460
 

R460 tested n=10K-25K

75 primes found - 185 remain

Results emailed - Base released

[COLOR=Red]R490 reserved to n=25K[/COLOR]

S499 tested to n=100K (25-100k)

7 primes found, 23k remain

754*499^29709+1
1158*499^30143+1
1714*499^39275+1
1636*499^46992+1
1984*499^70797+1
1494*499^78183+1
246*499^81050+1

Results emailed - Base released

R490
 

R490 tested n=10K-25K

63 primes found - 145 remain

Results emailed - Base released

Reserving S338 to n=100K (50-100k) for BOINC

Reserving S342 to n=100K (50-100k) for BOINC

Reserving R487 to n=100K (50-100k) for BOINC

S338 tested to n=100K (50-100k)

nothing found

Results emailed - Base released

S342 tested to n=100K (50-100k)

1 prime found, 7k remain

71*342^57384+1

Results emailed - Base released

R658 - R750
 

R658 tested n=10K-25K

67 primes found - 158 remain

Results emailed - Base released
[COLOR=Red]
R750 reserved n=10K-25K[/COLOR]

R487 tested to n=100K (50-100k)

2 primes found, 11 remain

72*487^87924-1
1046*487^98506-1

Results emailed - Base released