Reserving S878 up to n=125K. Last prime was on n=972, it is time for the next one. :smile:

Ian and I have completed R996 to n=25K; 222 primes were found for n=10K-25K shown below; 668 k's remain; base released.

[code]
21144*996^10028-1
24924*996^10032-1
30725*996^10125-1
17763*996^10134-1
14667*996^10216-1
10623*996^10259-1
14240*996^10327-1
5867*996^10340-1
35729*996^10355-1
23347*996^10435-1
33825*996^10435-1
7639*996^10557-1
32468*996^10560-1
38650*996^10573-1
42888*996^10629-1
6269*996^10640-1
31175*996^10643-1
23263*996^10674-1
47708*996^10684-1
49592*996^10791-1
21748*996^10821-1
8843*996^10828-1
45403*996^10838-1
50604*996^10969-1
47779*996^10998-1
44245*996^11005-1
12424*996^11008-1
16654*996^11021-1
1985*996^11067-1
49422*996^11118-1
12933*996^11198-1
18347*996^11224-1
25539*996^11232-1
32310*996^11250-1
17337*996^11265-1
26037*996^11324-1
44907*996^11326-1
38525*996^11352-1
11008*996^11492-1
15614*996^11519-1
16384*996^11567-1
11323*996^11588-1
25334*996^11618-1
8175*996^11677-1
35662*996^12044-1
607*996^12083-1
39559*996^12103-1
36480*996^12168-1
31748*996^12185-1
1409*996^12196-1
45405*996^12314-1
28725*996^12350-1
10669*996^12542-1
30032*996^12558-1
8697*996^12572-1
15613*996^12590-1
18090*996^12600-1
45300*996^12608-1
15215*996^12615-1
4570*996^12647-1
3957*996^12715-1
13738*996^12752-1
40583*996^12758-1
16050*996^12826-1
40672*996^12838-1
27539*996^12844-1
40702*996^12999-1
33418*996^13005-1
40884*996^13011-1
21695*996^13102-1
19727*996^13268-1
26105*996^13294-1
3660*996^13416-1
39694*996^13562-1
52448*996^13634-1
47028*996^13669-1
49597*996^13681-1
11040*996^13766-1
10418*996^13776-1
36458*996^13893-1
16483*996^13908-1
26693*996^14068-1
31648*996^14098-1
31483*996^14108-1
50848*996^14175-1
36412*996^14185-1
17084*996^14211-1
2188*996^14252-1
1033*996^14312-1
13568*996^14352-1
31305*996^14362-1
47253*996^14379-1
15492*996^14396-1
28984*996^14403-1
47370*996^14504-1
34302*996^14521-1
43695*996^14696-1
16405*996^14781-1
2970*996^14803-1
4027*996^14824-1
30942*996^14922-1
9900*996^14944-1
47624*996^15058-1
3462*996^15078-1
40679*996^15139-1
42970*996^15228-1
49354*996^15231-1
36354*996^15350-1
26678*996^15371-1
39649*996^15380-1
37047*996^15406-1
25479*996^15423-1
50012*996^15558-1
34133*996^15569-1
52187*996^15627-1
3975*996^15715-1
37423*996^15746-1
20794*996^15924-1
26798*996^15940-1
28062*996^15984-1
21817*996^16013-1
8304*996^16108-1
6312*996^16123-1
27139*996^16224-1
50864*996^16276-1
16059*996^16342-1
41474*996^16344-1
34505*996^16381-1
2899*996^16445-1
9185*996^16507-1
30542*996^16516-1
47083*996^16610-1
30864*996^16664-1
27703*996^16893-1
10179*996^16970-1
45323*996^16983-1
25143*996^17029-1
22058*996^17047-1
99*996^17102-1
28785*996^17143-1
5387*996^17171-1
19674*996^17183-1
21683*996^17184-1
51020*996^17240-1
26538*996^17290-1
20008*996^17461-1
17658*996^17475-1
48472*996^17594-1
27235*996^17626-1
273*996^17715-1
48302*996^17751-1
51232*996^17895-1
11068*996^17906-1
12399*996^17959-1
2164*996^18052-1
40968*996^18084-1
788*996^18122-1
45995*996^18126-1
10572*996^18154-1
5800*996^18164-1
51479*996^18184-1
29180*996^18269-1
35683*996^18279-1
46334*996^18382-1
11365*996^18407-1
23662*996^18468-1
27784*996^18607-1
35940*996^18697-1
42719*996^18938-1
7218*996^18956-1
7569*996^18961-1
48225*996^19006-1
21745*996^19087-1
33955*996^19141-1
26434*996^19162-1
37057*996^19314-1
11812*996^19612-1
13339*996^19659-1
4662*996^19704-1
36503*996^19859-1
40247*996^19955-1
10802*996^20147-1
32078*996^20160-1
2573*996^20364-1
34117*996^20500-1
40079*996^20702-1
47298*996^20767-1
38070*996^20840-1
16420*996^21202-1
4565*996^21295-1
8769*996^21374-1
27924*996^21382-1
9998*996^21474-1
2524*996^21549-1
23837*996^21592-1
15817*996^21654-1
50374*996^21727-1
24287*996^21744-1
24560*996^21962-1
43817*996^22185-1
39220*996^22207-1
28549*996^22221-1
37452*996^22252-1
34059*996^22289-1
22863*996^22367-1
50978*996^22418-1
40770*996^22461-1
4874*996^22953-1
6883*996^23044-1
36235*996^23076-1
14845*996^23184-1
46545*996^23307-1
50712*996^23457-1
1278*996^23568-1
16503*996^23946-1
11029*996^24351-1
26943*996^24483-1
9767*996^24583-1
14670*996^24721-1
13662*996^24929-1
52742*996^24929-1
47489*996^24992-1
[/code]

I passed n=30k on S606 a few days ago, but I was too busy to post them at the time. Here they are:

[CODE]7266*606^26541+1 (mentioned in the last post)
39143*606^25831+1
7348*606^27192+1
43376*606^28758+1
5836*606^27870+1
11166*606^27078+1
8516*606^33180+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
4021*606^32095+1
9726*606^36568+1
15076*606^28244+1
5560*606^31038+1
36727*606^27726+1
27551*606^28006+1
45687*606^34248+1[/CODE]Overall, 21 ks eliminated. 265 ks remain.

[QUOTE=germanNinja;486224]I passed n=30k on S606 a few days ago, but I was too busy to post them at the time. Here they are:
<snip>
Overall, 21 ks eliminated. 265 ks remain.[/QUOTE]


That's a lot of primes for n>30K. Are all k's at n>=30K ?

In addition to the primes, please keep all results (residues) files and post (or Email) them to me when you are done with your reservation.

Not all ks are at n=30k yet. I thought I mentioned the [B]average[/B] was n=30k, but apparently not. The average k is above n=30k, but I did not split up the work very evenly.

I am saving all the results files. I will email them to you Monday, the two week point we agreed on.

[QUOTE=germanNinja;486299]Not all ks are at n=30k yet. I thought I mentioned the [B]average[/B] was n=30k, but apparently not. The average k is above n=30k, but I did not split up the work very evenly.

I am saving all the results files. I will email them to you Monday, the two week point we agreed on.[/QUOTE]

I cannot easily reflect this on the pages. Please report again when all k's have reached n=30K.

What I need with each status is all of the primes for a specific n-range for all k's. No more and no less. So what I would like to see here is only all of the primes for n=25K-30K. You can hold onto the primes for n>30K until all k's have reached n=35K or n=40K.

[QUOTE=MisterBitcoin;485875]Reserving S878 up to n=125K. Last prime was on n=972, it is time for the next one. :smile:[/QUOTE]

Passed n=125K, no prime. Extending up to n=150K.

R708 tested to n=100k (50-100k)

78 primes found, 236 remain

Results emailed - Base released

S918 tested to n=100k (25-100k)

97 primes found, 156 remain

Results emailed - Base released

R936 tested to n=100k (25-100k)

93 primes found, 91 remain

Results emailed - Base released

S936 tested to n=100k (25-100k)

81 primes found, 92 remain

Results emailed - Base released