S606
 

Now ALL ks are at n=30k. Here are the primes for n<=30k:

[CODE]
7266*606^26541+1
39143*606^25831+1
7348*606^27192+1
43376*606^28758+1
5836*606^27870+1
11166*606^27078+1
6585*606^28449+1
20983*606^26763+1
23945*606^26795+1
23672*606^26831+1
19718*606^27467+1
27340*606^27123+1
29125*606^27173+1
15076*606^28244+1
36727*606^27726+1
27551*606^28006+1
11413*606^29646+1
3356*606^28876+1
37881*606^28975+1
13163*606^29985+1
38293*606^29167+1
31575*606^29738+1
[/CODE]

Reserving R516 to n=300k (100-300k) for BOINC

Reserving S847 to n=25K for Ian and me.

Reserving S711 to n=100k (25-100k) for BOINC

S847 is complete to n=10K; 517 primes found for n=2500-10K; 753 k's remain; continuing to n=25K.

S520
 

S520 is finally completed to n=700k. I've attached the residue file here. Please note that there may be some missing residues due to an early mixup on my part when using PFGW (and forgetting the appropriate flag). I'll go ahead and prepare a sieve file for n=700k-1M, k=369 and post it up when it's finished.

No primes were found for the single remaining k -- k=369.

Ian and I have completed R856 to n=25K; 231 primes were found for n=10K-25K shown below; 527 k's remain; base released.

[code]
54609*856^10023-1
14463*856^10042-1
86732*856^10059-1
52988*856^10084-1
73679*856^10182-1
107195*856^10200-1
11288*856^10224-1
17483*856^10239-1
38564*856^10258-1
84965*856^10314-1
95580*856^10332-1
68270*856^10385-1
68828*856^10433-1
41304*856^10437-1
101409*856^10464-1
92130*856^10534-1
74027*856^10539-1
91128*856^10555-1
53442*856^10611-1
82125*856^10645-1
27959*856^10681-1
100158*856^10698-1
8498*856^10737-1
71432*856^10763-1
82695*856^10802-1
53475*856^10857-1
63120*856^10939-1
50814*856^10942-1
56414*856^10964-1
33413*856^11016-1
59900*856^11057-1
24194*856^11109-1
62465*856^11175-1
87894*856^11224-1
60608*856^11277-1
26657*856^11297-1
1152*856^11342-1
74958*856^11346-1
47408*856^11381-1
21312*856^11414-1
94100*856^11474-1
78290*856^11503-1
40833*856^11517-1
80169*856^11533-1
49092*856^11561-1
88202*856^11569-1
91932*856^11623-1
67307*856^11662-1
17525*856^11663-1
92628*856^11670-1
30437*856^11740-1
45369*856^11749-1
17513*856^11797-1
49539*856^11806-1
50163*856^11869-1
2529*856^11883-1
69147*856^11891-1
69525*856^11918-1
64257*856^12015-1
33377*856^12038-1
8033*856^12089-1
46580*856^12103-1
75378*856^12210-1
73347*856^12218-1
27624*856^12220-1
63219*856^12288-1
83519*856^12378-1
66662*856^12415-1
68117*856^12483-1
93335*856^12494-1
98802*856^12501-1
102129*856^12524-1
98465*856^12554-1
44384*856^12596-1
106472*856^12609-1
58932*856^12638-1
795*856^12654-1
62567*856^12658-1
57443*856^12728-1
23708*856^12775-1
98984*856^12827-1
50862*856^12920-1
99038*856^12985-1
89585*856^13011-1
95565*856^13100-1
12867*856^13127-1
86720*856^13143-1
81860*856^13188-1
41045*856^13221-1
77018*856^13272-1
52583*856^13305-1
46062*856^13347-1
74558*856^13402-1
43698*856^13403-1
88568*856^13449-1
75822*856^13471-1
37157*856^13487-1
106163*856^13576-1
61518*856^13648-1
159*856^13730-1
67610*856^13737-1
26097*856^13750-1
33474*856^13771-1
100838*856^13774-1
88767*856^14066-1
90653*856^14105-1
2720*856^14115-1
97695*856^14167-1
25610*856^14184-1
102173*856^14210-1
1425*856^14234-1
67058*856^14265-1
18623*856^14271-1
40517*856^14294-1
93692*856^14408-1
85485*856^14492-1
96644*856^14623-1
105980*856^14683-1
21447*856^14700-1
32817*856^14776-1
65150*856^14854-1
79938*856^14913-1
104492*856^14950-1
83367*856^15041-1
55778*856^15106-1
21894*856^15124-1
97868*856^15161-1
67523*856^15170-1
87200*856^15200-1
50430*856^15241-1
41780*856^15269-1
17648*856^15526-1
48042*856^15653-1
27542*856^15680-1
79907*856^15681-1
72993*856^15750-1
80424*856^15928-1
45327*856^15934-1
20003*856^16104-1
95715*856^16206-1
68574*856^16215-1
64950*856^16230-1
10767*856^16241-1
105473*856^16337-1
101033*856^16386-1
74429*856^16411-1
389*856^16490-1
61697*856^16490-1
54539*856^16492-1
50103*856^16511-1
93624*856^16634-1
82020*856^16651-1
25523*856^16700-1
7554*856^16843-1
37082*856^16874-1
72230*856^16956-1
86399*856^17037-1
14700*856^17281-1
40272*856^17377-1
1395*856^17416-1
21704*856^17457-1
78320*856^17565-1
59655*856^17858-1
3695*856^17859-1
66854*856^17864-1
100787*856^17872-1
12135*856^17906-1
101039*856^17911-1
69542*856^18156-1
30902*856^18363-1
984*856^18368-1
5552*856^18463-1
62940*856^18621-1
53664*856^18691-1
61322*856^18823-1
73658*856^18852-1
44900*856^19095-1
87777*856^19134-1
83115*856^19172-1
858*856^19395-1
1688*856^19420-1
108350*856^19535-1
85922*856^19592-1
85320*856^19646-1
14513*856^19687-1
97133*856^19751-1
40800*856^19799-1
82914*856^19854-1
21270*856^19959-1
95292*856^20018-1
23909*856^20072-1
37125*856^20075-1
52419*856^20159-1
97197*856^20223-1
42242*856^20856-1
29838*856^20979-1
15128*856^21343-1
21477*856^21347-1
52427*856^21401-1
31509*856^21429-1
81608*856^21567-1
21893*856^21579-1
92324*856^21728-1
21449*856^21797-1
107189*856^21894-1
53813*856^21923-1
6687*856^21970-1
31233*856^22052-1
23762*856^22329-1
40287*856^22783-1
40364*856^22810-1
21954*856^22840-1
73307*856^22868-1
68517*856^23086-1
77148*856^23168-1
68568*856^23255-1
29262*856^23292-1
34577*856^23372-1
29178*856^23433-1
49302*856^23536-1
24042*856^23558-1
27702*856^23676-1
6000*856^23729-1
74610*856^23757-1
3389*856^23831-1
61889*856^23916-1
52025*856^23951-1
53768*856^24151-1
47312*856^24579-1
94517*856^24668-1
83987*856^24713-1
[/code]

[QUOTE=LaurV;477325]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.
[/QUOTE]
R967 at 450k, no prime. Log below.

[ATTACH]18227[/ATTACH]

(edit after 13 hours :smile: super-red name comes with privileges, hehe - we forgot to say that we are continuing the work towards 500k, if it was not clear)

Reserving R526 to n=300k (100-300k) for BOINC

Reserving R775 to n=25K for Ian and me.

S711 tested to n=100k (25-100k)

100 primes found, 201 remain

Results emailed - Base released