R862 is complete to n=25K; 78 primes were found for n=10K-25K shown below; 243 k's remain; base released.

Primes:
[code]
5054*862^10031-1
12078*862^10047-1
8426*862^10167-1
17013*862^10288-1
3419*862^10304-1
24318*862^10323-1
3771*862^10441-1
11378*862^10571-1
8418*862^10652-1
16364*862^10731-1
15764*862^10797-1
13943*862^10860-1
6612*862^10989-1
17070*862^11219-1
16365*862^11224-1
11993*862^11300-1
8181*862^11306-1
15867*862^11814-1
5472*862^11996-1
3600*862^12079-1
4248*862^12152-1
24726*862^12189-1
12266*862^12234-1
11393*862^12288-1
24615*862^12529-1
18945*862^12769-1
10323*862^12796-1
22320*862^12817-1
25212*862^12906-1
10337*862^13382-1
2123*862^13480-1
18309*862^13627-1
18372*862^13728-1
9561*862^13963-1
11633*862^14164-1
26316*862^14383-1
23729*862^15019-1
257*862^15458-1
19989*862^15496-1
7068*862^15754-1
10211*862^15863-1
10157*862^15912-1
25100*862^15944-1
7569*862^16107-1
1556*862^16131-1
3579*862^16332-1
18416*862^16461-1
5466*862^16917-1
22161*862^16989-1
4874*862^17088-1
7107*862^17413-1
15018*862^17454-1
9573*862^17484-1
16065*862^17681-1
23513*862^18262-1
23079*862^18344-1
8628*862^18583-1
17748*862^18704-1
11573*862^18771-1
12156*862^18809-1
26127*862^19360-1
1787*862^19552-1
15486*862^19679-1
14618*862^20139-1
23757*862^20400-1
16827*862^20488-1
3741*862^20782-1
22067*862^20921-1
26394*862^21181-1
11688*862^21335-1
2555*862^22909-1
14664*862^23123-1
20790*862^23131-1
12414*862^23736-1
21597*862^23910-1
18942*862^24032-1
24308*862^24664-1
12345*862^24837-1
[/code]

S797 is completed to n=400k. No primes found. Residues for n=290k-400k are attached. I'm also sieving the next range (up to n=1M, I believe, and currently approaching p=20e12), though I am releasing the base.

S708 is complete to n=25K; 25 primes were found for n=20K-25K shown below; 295 k's remain; base released.

Primes:
[code]
19226*708^20009+1
11943*708^20079+1
9513*708^20091+1
28291*708^20119+1
13125*708^20140+1
24166*708^20319+1
11728*708^21235+1
13907*708^21358+1
11090*708^21831+1
12880*708^22294+1
17911*708^22349+1
15157*708^22374+1
12930*708^22669+1
19563*708^22714+1
22646*708^23352+1
16460*708^23525+1
20686*708^23556+1
19007*708^23648+1
17091*708^23667+1
25576*708^23696+1
12516*708^23969+1
18999*708^24126+1
18026*708^24520+1
3137*708^24590+1
19021*708^24851+1
[/code]

Reserving R800 to n=1M (800k-1M) for BOINC

R708 tested to n=10K (1-10k)

1073 remain

Results emailed - Base released

[QUOTE=rebirther;413986]R708 tested to n=10K (1-10k)

1073 remain

Results emailed - Base released[/QUOTE]

There are 1073 k's remaining at n=2500. With 446 primes found for n=2500-10K, there are 627 k's remaining at n=10K.

Edit: As shown on the pages, k=9216 is proven composite by partial algebraic factors so there are 626 k's remaining.

R717
 

Reserving R717 to n=25K

[QUOTE=MyDogBuster;414118]Reserving R717 to n=25K[/QUOTE]

I had already begun to sieve this for n=10K-25K and have reached P=50G. Last night I just started a sieve to P=230G (~fully sieved) that would be done by ~Nov. 3rd. Are you interested in the P=50G file or in me continuing to sieve it?

I did not plan to test this. I was only going to post a sieve file on the pages. I'm also sieving R807 for n=10K-25K.

[QUOTE] Are you interested in the P=50G file or in me continuing to sieve it?[/QUOTE]

My sieve file is also at 50G and I have already begun testing. I'm also sieving R226, R323, R810, R858, R882 and S262
all to n=25K.

[QUOTE=MyDogBuster;414152]My sieve file is also at 50G and I have already begun testing. I'm also sieving R226, R323, R810, R858, R882 and S262
all to n=25K.[/QUOTE]

OK I will stop mine. I will start sieving R807 P=50G-230G.

Here is the sieve file for S797, sieved to p=50e12 up to n=1000000. It likely needs a bit more, but I didn't want to hold back any potential progress.