Reserving R292 to n=100k (50-100k) for BOINC

R262 tested to n=100k (50-100k)

32 primes found, 118 remain

3986*262^50506-1
11205*262^54286-1
17492*262^55550-1
20078*262^59730-1
16787*262^60032-1
18254*262^60368-1
14975*262^60464-1
26261*262^61089-1
22373*262^62068-1
5921*262^63374-1
1764*262^65661-1
3183*262^66244-1
21917*262^66352-1
20474*262^66935-1
15948*262^68203-1
9579*262^68671-1
2097*262^69988-1
14460*262^72825-1
6048*262^72952-1
15779*262^77152-1
14682*262^77760-1
22352*262^81164-1
21080*262^83670-1
16989*262^86060-1
14906*262^88099-1
4104*262^91956-1
6648*262^91980-1
23246*262^93125-1
12623*262^95954-1
14492*262^98753-1
21951*262^99430-1
9120*262^99664-1

Results emailed - Base released

Reserving R466 to n=100k (25-100k) for BOINC

R292 tested to n=100k (50-100k)

46 primes found, 219 remain

Results emailed - Base released

S287
 

Reserving S287 to n=100k (25-100k)

R466 tested to n=100k (25-100k)

38 primes found, 54 remain

6269*466^25248-1
13595*466^25894-1
13073*466^26596-1
6708*466^27768-1
18659*466^27843-1
16010*466^27952-1
20762*466^28012-1
15510*466^30646-1
12765*466^31825-1
20727*466^33505-1
11372*466^35061-1
3158*466^39146-1
7494*466^40185-1
7739*466^42639-1
7190*466^42991-1
12657*466^44006-1
14009*466^44814-1
7800*466^45396-1
11790*466^45549-1
16943*466^45773-1
1268*466^46409-1
1143*466^47853-1
15030*466^48491-1
20705*466^49779-1
9629*466^52633-1
9944*466^53908-1
2762*466^58327-1
2907*466^58362-1
5384*466^58375-1
12608*466^62926-1
15425*466^63394-1
14585*466^66967-1
17669*466^70400-1
10364*466^76642-1
16175*466^76897-1
17835*466^78877-1
21438*466^79909-1
14220*466^94517-1

Results emailed - Base released

R297 is started and completed to n=25,000. There are 678 k's remaining. Results emailed, and I'm going to continue the base to n=50,000. :smile:

[QUOTE=wombatman;445406]R297 is started and completed to n=25,000. There are 678 k's remaining. Results emailed, and I'm going to continue the base to n=50,000. :smile:[/QUOTE]

I have corrected your k's remaining from 605 to 678. I'm not sure where 605 remaining came from. I have also removed three k's remaining from the file that you sent me that have algebraic factors to make a full covering set. They are k=1936, 64516, and 116964. You can remove those from your testing. This means that your file was reduced from 681 to 678 k's remaining.

To avoid this in the future, check the Riesel-conjectures page shortly after reserving your base after I have updated it to show your reservation. I will show any k's with algebraic factors that make a full covering set that do not need to be tested.

Noted. Thanks!:smile:

Reserving R403 to n=100k (25-100k) for BOINC

Progress update
 

S 467 at 450K - continuing....