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.