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