[QUOTE=rebirther;436163]Reserving S660 to n=10k as a new base (maybe for BOINC), planned the following steps,

1. using newpgen to n=5k (ini file from KEPs collection, modified to n=5k instead to 25k)
2. using srbsieve to n=5k
3. sieving 5-10k range for BOINC
4. llr in BOINC

Its taking too long to run it on a single computer and want to take the power of BOINC. If the time is what I have in my mind I will do this with other bases in the future to decrease the rest of the unreserved bases.[/QUOTE]

n=5k-10k will be very fast tests. Are you sure you want that for BOINC? If so, great! :smile:

If you decide to have BOINC do more new bases, consider checking out the recommended bases thread [URL="http://mersenneforum.org/showthread.php?t=13196"]here[/URL]. There is a section for new bases with the lowest conjectures remaining that have already been tested to n=2500 and have the k's remaining attached. That would save you steps 1 and 2. What you could do is use that k's remaining file to sieve n=2500-10k, test n=2500-5k yourself, remove the primed k's, and have BOINC do n=5k-10k (or n=5k-25k if the number of k's remaining is small enough). Many of those bases will be smaller efforts than your S660 here.

[QUOTE=gd_barnes;436179]n=5k-10k will be very fast tests. Are you sure you want that for BOINC? If so, great! :smile:

If you decide to have BOINC do more new bases, consider checking out the recommended bases thread [URL="http://mersenneforum.org/showthread.php?t=13196"]here[/URL]. There is a section for new bases with the lowest conjectures remaining that have already been tested to n=2500 and have the k's remaining attached. That would save you steps 1 and 2. What you could do is use that k's remaining file to sieve n=2500-10k, test n=2500-5k yourself, remove the primed k's, and have BOINC do n=5k-10k (or n=5k-25k if the number of k's remaining is small enough). Many of those bases will be smaller efforts than your S660 here.[/QUOTE]

ok, I will check this after my run.

S660 tested to n=10k (1-10k)

840 remain

Results emailed - Base released

Reserving S858 to n=10k (2.5-10k) for BOINC

R745 Update
 

Just a quick status update on R745.

We went past the reservation of n=150k a while ago (been busy sorting the PhD thesis!), and we're now about to pass n=160k. I'll extend the reservation up to n=200k for now, which should be completed in the next couple of months.

Reserving S633 to n=100k (25-100k) for BOINC

S858 tested to n=10k (2.5-10k)

499 primes found, 792 remain

Results emailed - Base released

[QUOTE=rob147147;436707]Just a quick status update on R745.

We went past the reservation of n=150k a while ago (been busy sorting the PhD thesis!), and we're now about to pass n=160k. I'll extend the reservation up to n=200k for now, which should be completed in the next couple of months.[/QUOTE]

Great. Can you provide a list of primes that you have found so far? I just have the one top-5000 prime that you reported recently.

5 primes found from n=100k

10218*745^101464-1
30930*745^103887-1
17772*745^115942-1
19338*745^141683-1
20588*745^158967-1

24 k's remaining

I just set up one more computer. To celebrate it I would like to reserve (in addition to the already reserved S/R28) a smallish range:
S993 to 150k

S633 tested to n=100k (25-100k)

20 primes found, 58 remain

5746*633^25055+1
3574*633^26222+1
1586*633^28188+1
2986*633^29412+1
2308*633^30630+1
2690*633^33950+1
820*633^35968+1
5708*633^37302+1
5626*633^37437+1
5714*633^40038+1
1996*633^48227+1
1824*633^53353+1
3548*633^54160+1
5280*633^55260+1
3098*633^61636+1
1378*633^73772+1
5028*633^75128+1
5802*633^77188+1
1798*633^80284+1
1374*633^87542+1

Results emailed - Base released

Reserving S663 to n=100k (25-100k) for BOINC

Reserving R602 to n=200K for my "cluster"

[QUOTE=MisterBitcoin;437727]Reserving R602 to n=200K for my "cluster"[/QUOTE]

That's a good base to start with. Welcome to the project! :smile:

Reserving R575 to n=10k (2.5-10k) for BOINC

Reserving S1027 to n=100k (50-100k) for BOINC

Reserving R640 to n=100K for my tower and friends server.

S1023 is complete to n=25K

Result is as follows:

MOB: 184
Trivial: 48889
Prime: 264626
Remain: 2531

Total: 316230

Base released and results e-mailed.

S663 tested to n=100k (25-100k)

29 primes found, 44 remain

3988*663^25768+1
7296*663^27048+1
8550*663^27914+1
5006*663^28999+1
1974*663^30757+1
8684*663^30797+1
2980*663^31041+1
5598*663^33202+1
7786*663^35184+1
5682*663^38400+1
9378*663^40795+1
8538*663^42687+1
4208*663^42943+1
3308*663^49947+1
5254*663^54534+1
3504*663^55883+1
8370*663^55931+1
9308*663^59919+1
2268*663^60210+1
3196*663^64185+1
7494*663^66258+1
7144*663^70989+1
2320*663^77203+1
6112*663^77784+1
4542*663^88084+1
7552*663^96289+1
2738*663^96607+1
7466*663^98501+1
2724*663^99737+1

Results emailed - Base released

R575 tested to n=10k (2.5-10k)

691 primes found, 1262 remain

Results emailed - Base released

Reserving R696 to n=200k (100-200k) for BOINC

R696 tested to n=200k (100-200k)

nothing found, 2 remain

Results emailed - Base released

S1027 tested to n=100k (50-100k)

68 primes found, 278 remain

Results emailed - Base released

Reserving S616 to n=100k (25-100k) for BOINC

Reserving S832 to n=200k (100-200k) for BOINC

Reserving R940 to n=25K.

Reserving R625 to n=100k (25-100k) for BOINC

R672
 

Hi,

unfortunately I have some difficult situations in my family so I'd like to unreserve R672.

I'm below n = 10.000 but if some of my files are uesful just write me a pm.

Sorry.
Christian

Sorry to hear about family problems :sad: Noone like to hear neither have family problems!

I can take R672 to 10k for you. I was looking for some easy task to test a new silly laptop, and this is not much work (compared to R66, which I am also taking it to 10k).

How far you are? If you only sieved it, and are in the first 2k or so, then you can forget it, I can sieve it faster than we could transfer files (including the time to agree how to transfer them). If you have gone as far as 5k or more, then this is what you have to do: Send the remaining k file and the primes file to Gary. He will update the crus page (where R672 appears as unreserved/not started ?!?). Send the remaining k to me (or I can take them directly from the crus page when updated by Gary).

I released R672 and won't show any work done on the pages until it reaches n=10K. You guys can coordinate between you. LaurV let me know if you are making an official reservation.

[QUOTE=gd_barnes;440314]I released R672 and won't show any work done on the pages until it reaches n=10K. You guys can coordinate between you. LaurV let me know if you are making an official reservation.[/QUOTE]
Reserving it. Ran a srbsieve on it and there are only about 1000k remaining at n=2k, in less than one hour, so I will take it to 25k or how much it will reach over the weekend. No need save files from Christian, and thanks him that he came back to unreserve it. Other guys would just go MIA and abandon, and we would never knew...

[QUOTE=LaurV;440342]Reserving it. Ran a srbsieve on it and there are only about 1000k remaining at n=2k, in less than one hour, so I will take it to 25k or how much it will reach over the weekend. No need save files from Christian, and thanks him that he came back to unreserve it. Other guys would just go MIA and abandon, and we would never knew...[/QUOTE]

This base is in the recommended bases thread and had already been searched to n=2500. A list of k's remaining at n=2500 is attached to the first post in that thread. But if you are already at n=2000 then you may as well continue with what you are doing.

I predict you will not get to n=25K over the weekend. lol I'll reserve it to n=10K for you for the time being.

[QUOTE=gd_barnes;440343]I predict you will not get to n=25K over the weekend. lol I'll reserve it to n=10K for you for the time being.[/QUOTE]
Your prediction was right, the weekend is almost over and I am close to n=6k only. My "estimation" of the speed was off by an order of magnitude, because I forgot the fact that, comparing with R66 on which my experience is based, this one grows 10 times faster with every N, so therefore testing for primality becomes much slower much earlier. I will however continue to at least n=10k. This was a single core job up to now. I am going to split it in 2 or maybe 3 cores.

I have a problem here... Huston? Help!

What is with 3364*672^n-1?

This 3364 is 2^2*29^2, and all the even powers are algebraically factorable (as x^2-1) and are correctly eliminated by the srsieve (not by newpgen, however, and that was where my investigation started, I wondered why the difference).

But on the other hand, all odd powers should be divisible with 673, because if I add and subtract 3364, I get 3364*672+3364-3364-1=3364*673-3365=3364*673-5*673, etc.

Did I just jumped ahead in proving R672 by finding a smaller Riesel number? :razz:

[QUOTE=LaurV;440430]I have a problem here... Huston? Help!

What is with 3364*672^n-1?

This 3364 is 2^2*29^2, and all the even powers are algebraically factorable (as x^2-1) and are correctly eliminated by the srsieve (not by newpgen, however, and that was where my investigation started, I wondered why the difference).

But on the other hand, all odd powers should be divisible with 673, because if I add and subtract 3364, I get 3364*672+3364-3364-1=3364*673-3365=3364*673-5*673, etc.

Did I just jumped ahead in proving R672 by finding a smaller Riesel number? :razz:[/QUOTE]
Look at exclusion 2 on the following page:
[URL]http://www.noprimeleftbehind.net/crus/Riesel-conjectures.htm[/URL]

Base 12 has a similar issue.

Ok, this brings a lot of light! Thanks.
I guess that the right action for me now is to [U]manually[/U] remove the tricky k from the list, and don't waste time with sieving and LLR-ing/pfgw-ing it. Actually only sieving it, because it never survives the sieving.

Lots of bases have k's that have algebraic factorization to remove some n's and where a trivial factor removes all remaining n's to effectly remove the k from the conjecture. I do my best to pick those out on the pages when a base is reserved. You'll notice on the main Riesel page that I show the statement: "k = 3364 proven composite by partial algebraic factors." Fortunately there are relatively common patterns that we have come up with to determine such k ahead of time on most bases.

You are right. The correct action is to manually remove the k from your search.

S832 tested to n=200k (100-200k)

nothing found, 2 remain

Results emailed - Base released

Reserving R783 to n=200k (100-200k) for BOINC

Reserving S625 to n=100k (25-100k) for BOINC

You can save some CPU time if you reformat the sieve file before sending it to compute nodes.
Compare (note: this is the same job):
[CODE]/home/serge/NumTheory/S625> llr -d t1
Base prime factor(s) taken : 5
Starting N-1 prime test of 3068*5^100021+1
Using all-complex FMA3 [COLOR="SeaGreen"]FFT length 18K[/COLOR], Pass1=384, Pass2=48, a = 3
3068*5^100021+1 is not prime. RES64: 24E72669D12B7D16. OLD64: 6EB5733D7382773F
[COLOR="SeaGreen"]Time : 14.867 sec.[/COLOR]
/home/serge/NumTheory/S625> llr -d t2
Base prime factor(s) taken : 5
Starting N-1 prime test of 15340*625^25005+1
Using zero-padded FMA3 [COLOR="Red"]FFT length 35K[/COLOR], Pass1=448, Pass2=80, a = 3
15340*625^25005+1 is not prime. RES64: 24E72669D12B7D16. OLD64: 6EB5733D7382773F
[COLOR="Red"]Time : 28.478 sec.[/COLOR]
[/CODE]

Here is the script:
[CODE]echo '15000000000000:P:1:5:257' > sieve-S625-25K-100K.txt
awk 'NF>1{k=$1;n=$2*4;while(k%5==0){k/=5;n++} print k, n}' sieve-sierp-base625-25K-100K.txt >> sieve-S625-25K-100K.txt
[/CODE]
Looks simple, right? ...Works wonders.

[QUOTE=Batalov;441219]You can save some CPU time if you reformat the sieve file before sending it to compute nodes.
[/QUOTE]

I dont understand the script. What do you mean with reformat?

[QUOTE=rebirther;441223]I dont understand the script. What do you mean with reformat?[/QUOTE]

He is saying that test the number as a base 5 number, not a base 625 number because the PRP test is faster even though it is the same number of bits.

625 = 5[SUP]4[/SUP], so:[LIST][*]when k is not divisible by 5, k*625[SUP]n[/SUP]+1 = k*5[SUP]4n[/SUP]+1, and[*]when k is divisible by 5 (k=5m) k*625[SUP]n[/SUP]+1 = m*5[SUP]4n+1[/SUP]+1[/LIST]

Taking S927. Have sieved for n<10k, will complete that range, then sieve the rest to 25k without any k's found up to that point.

Progress update
 

K 4 S 803 at 405 K

R783 tested to n=200k (100-200k)

1 prime found, 1 remain

258*783^118544-1

Results emailed - Base released

Reserving R872 to n=200k (100-200k) for BOINC

Reserving R1024 to n=1M (780k-1M) for BOINC

R625 tested to n=100k (25-100k)

28 primes found, 62 remain

8898*625^25361-1
852*625^26932-1
13160*625^28680-1
19092*625^30382-1
22038*625^34288-1
2984*625^36084-1
5798*625^37039-1
16608*625^38315-1
10572*625^40042-1
20244*625^40487-1
14378*625^42773-1
14958*625^44503-1
23474*625^44770-1
13392*625^49049-1
9642*625^49871-1
3882*625^51002-1
21638*625^52591-1
8660*625^52925-1
18512*625^55899-1
20124*625^55902-1
14582*625^65552-1
15656*625^65783-1
6374*625^75537-1
7362*625^77994-1
22254*625^86101-1
25958*625^90420-1
13214*625^95471-1
20430*625^96560-1

Results emailed - Base released

Reserving S513 to n=25K.

R672 status update: 560k remaining at n=10k, all files sent.
74 primes found from n=10k to n=15k, 486 k's remaining.
Primes sent to Gary.
Continuing to n=25k
There are about other 25 PRPs up to now, on the way to n=25k, but those I won't know if they are primes, until the task to 25k finishes.
There might be like 2-3 weeks to go.

Reserving S678 to n=500k (200-500k) for BOINC

Reserving R872 to n=400k (100-400k) for BOINC

reserved before 100-200k

S625 tested to n=100k (25-100k)

25 primes found, 28 remain

3216*625^25106+1
7384*625^28124+1
16530*625^29198+1
12850*625^31657+1
16540*625^32285+1
3268*625^32332+1
6222*625^32566+1
12562*625^33022+1
14604*625^33207+1
3874*625^33971+1
6214*625^41407+1
10942*625^45709+1
4314*625^51152+1
8244*625^51942+1
5946*625^52103+1
9418*625^53936+1
3022*625^60876+1
5130*625^63115+1
10216*625^69509+1
9798*625^69739+1
7752*625^73983+1
426*625^78769+1
10384*625^86321+1
7348*625^95080+1
11682*625^98866+1

Results emailed - Base released

Reserving R565 to n=100k (25-100k) for BOINC

R967 status update:

We are currently testing the last 5 n's who survived deep sieving, below 334960 (which is the 1M digits limit of R972). These are 334740, 334786, 334876, 334888, 334912.

The next (i.e. the first over the limit) is 334962 (we sieved to 500k, but we don't know if we will be able and patient enough to go so high, this task is already older than a year).

Each test takes about 3-4 hours, so if these turn out composite (we will know by tomorrow morning, here is midnight now) and [U][B]IF[/B][/U] we find a prime after that, that prime will have over 1 million digits.

Who is "we". Do you have an entourage of people searching for you? :smile:

[QUOTE=gd_barnes;443863]Who is "we". Do you have an entourage of people searching for you? :smile:[/QUOTE]
We is us. Well... errrmm.. and our computers, but they don't count... (pun not intended).
We learned the use of the royal we from this very forum...
From the Xyzzies, their posts taught us.... :razz:

R940 is complete to n=25K. 140 primes were found for n=10K-25K shown below. 375 k's remain. Base released.

Primes:
[code]
360*940^10093-1
15038*940^10188-1
4583*940^10198-1
18957*940^10213-1
36738*940^10315-1
33119*940^10342-1
17060*940^10382-1
33734*940^10388-1
19952*940^10395-1
20855*940^10443-1
27857*940^10578-1
34311*940^10592-1
28478*940^10602-1
17574*940^10731-1
34539*940^10733-1
16142*940^10841-1
6135*940^10894-1
21137*940^10950-1
5513*940^11036-1
20381*940^11060-1
25575*940^11072-1
14382*940^11102-1
27675*940^11115-1
1164*940^11224-1
8472*940^11275-1
29114*940^11671-1
13259*940^11770-1
17054*940^11863-1
30240*940^12041-1
8699*940^12112-1
3644*940^12116-1
8021*940^12126-1
13560*940^12187-1
15086*940^12205-1
21900*940^12245-1
24257*940^12259-1
24392*940^12276-1
29286*940^12315-1
17588*940^12410-1
32408*940^12494-1
4673*940^12650-1
29457*940^12730-1
29429*940^12820-1
14361*940^12833-1
6014*940^12866-1
8366*940^12877-1
8537*940^12912-1
291*940^12951-1
11111*940^13014-1
7100*940^13113-1
19310*940^13115-1
25316*940^13131-1
9863*940^13248-1
6575*940^13278-1
13337*940^13300-1
19968*940^13332-1
24672*940^13380-1
13677*940^13551-1
21050*940^13607-1
35120*940^13738-1
22388*940^13747-1
6420*940^13774-1
26855*940^13845-1
27647*940^13905-1
35816*940^13925-1
12863*940^14103-1
22872*940^14224-1
32474*940^14515-1
1236*940^14673-1
30804*940^14759-1
22898*940^15082-1
27143*940^15089-1
11273*940^15105-1
15524*940^15175-1
14310*940^15190-1
13934*940^15240-1
26354*940^15277-1
9468*940^15338-1
23543*940^15421-1
6671*940^15582-1
8178*940^15691-1
13260*940^15762-1
33692*940^16021-1
15201*940^16202-1
9657*940^16572-1
20388*940^16593-1
1316*940^16668-1
20819*940^16715-1
28508*940^16866-1
18726*940^16921-1
2405*940^16973-1
5132*940^16991-1
22961*940^17138-1
31329*940^17309-1
7016*940^17538-1
3215*940^17782-1
13703*940^17787-1
2417*940^17922-1
19497*940^17997-1
20469*940^18118-1
36222*940^18158-1
9381*940^18212-1
25869*940^18473-1
30570*940^18907-1
16065*940^18957-1
23831*940^19057-1
24627*940^19343-1
1628*940^19520-1
7596*940^19772-1
16256*940^19840-1
18269*940^20012-1
30111*940^20246-1
19034*940^20258-1
11907*940^20531-1
10875*940^20757-1
32838*940^20776-1
30878*940^20972-1
1797*940^21096-1
29360*940^21169-1
28040*940^21384-1
27801*940^21510-1
26231*940^21597-1
15959*940^21657-1
7131*940^21746-1
24053*940^21902-1
30711*940^22186-1
24474*940^22546-1
6876*940^22684-1
30248*940^22862-1
5273*940^23271-1
510*940^23396-1
36416*940^23544-1
11841*940^23858-1
36549*940^24054-1
27821*940^24347-1
6561*940^24471-1
4337*940^24780-1
25697*940^24797-1
10236*940^24805-1
18677*940^24929-1
[/code]

R565 tested to n=100k (25-100k)

30 primes found, 42 remain

17084*565^25069-1
5354*565^25452-1
6966*565^26359-1
4412*565^27647-1
13362*565^27814-1
19364*565^28475-1
17838*565^29496-1
16892*565^31485-1
1982*565^31941-1
18956*565^33027-1
3702*565^33126-1
3948*565^34230-1
18644*565^37348-1
12224*565^39483-1
15566*565^40161-1
19056*565^42016-1
13886*565^43060-1
20160*565^48935-1
11508*565^58643-1
14582*565^60079-1
3722*565^67328-1
16472*565^73297-1
5288*565^77273-1
642*565^77550-1
11048*565^78100-1
12326*565^81786-1
17252*565^84246-1
7640*565^88432-1
16512*565^92938-1
11114*565^97207-1

Results emailed - Base released

R598 has been started and completed up to n=25k. 366 k remain. Base released and results emailed.

S616 tested to n=100k (25-100k)

42 primes found, 50 remain

46641*616^25292+1
25771*616^25859+1
26745*616^26951+1
46717*616^27373+1
33562*616^28198+1
27448*616^28530+1
43323*616^30742+1
25620*616^31133+1
19605*616^31484+1
24426*616^31537+1
8646*616^32016+1
24513*616^32450+1
31468*616^33336+1
3345*616^33920+1
51220*616^33973+1
15777*616^34313+1
36036*616^39265+1
17523*616^39410+1
15267*616^39684+1
45118*616^39894+1
12076*616^39926+1
46536*616^47877+1
34098*616^48225+1
36177*616^51431+1
50058*616^54297+1
33622*616^55126+1
39711*616^57761+1
12780*616^58665+1
43876*616^59153+1
4798*616^61208+1
48565*616^61234+1
36777*616^61741+1
51633*616^62524+1
4948*616^64121+1
4212*616^70740+1
26196*616^71883+1
36262*616^72284+1
23778*616^78240+1
29695*616^80413+1
25765*616^85583+1
18747*616^93948+1
10323*616^98019+1

Results emailed - Base released

Reserving R903 to n=100k (25-100k) for BOINC

The "more than one month long" weekend ended :razz:
R672 completed to 25k, another 79 primes found from 15k up, there are 407 remaining k's.

Primes are here, base released.
[CODE]39759 15240
35447 15333
1307 16690
31495 16822
7203 18106
17143 18507
33831 19803
34059 19856
1543 20268
38627 20552
40147 22166
39448 22606
6111 23062
36343 23407
26679 23669
23139 24384
14023 24418
17886 15531
27310 15810
9766 16322
34154 16649
4586 16731
12462 16778
5786 16879
39022 17145
10574 17196
17614 18139
15306 18393
32326 19122
35090 19290
39930 19356
15486 20165
9178 20467
38474 20876
674 20955
17930 21816
6974 21887
3402 21970
6826 22510
21538 22590
6578 24250
3802 24252
39924 15133
21321 15173
4561 15950
40852 15997
21401 16074
27225 16623
37937 16917
1337 19189
30601 19425
39313 20011
39781 20290
15473 20376
38541 21094
40524 21585
23489 22235
12853 22383
17761 24315
35917 24981
25376 15599
19956 15607
5084 15725
37472 16025
29644 16111
21496 16153
7744 16257
10504 16543
8752 17525
16052 18646
15036 18753
32152 19344
19072 19982
17192 21556
6664 21653
1600 21787
38756 22841
8524 23125
20944 24536
[/CODE]

R903 tested to n=100k (25-100k)

36 primes found, 39 remain

14888*903^25117-1
18508*903^25733-1
16012*903^27102-1
11638*903^27966-1
12972*903^29999-1
11326*903^30058-1
24294*903^30916-1
2484*903^31733-1
4068*903^34140-1
404*903^34532-1
15706*903^34622-1
7868*903^38444-1
17274*903^38867-1
11312*903^39572-1
20772*903^39988-1
20244*903^42228-1
2112*903^43170-1
17516*903^44189-1
3504*903^45171-1
14384*903^45676-1
14582*903^46859-1
2284*903^47303-1
13902*903^48380-1
5310*903^50996-1
5084*903^52148-1
2624*903^52319-1
10966*903^60177-1
23982*903^60614-1
7846*903^61171-1
16554*903^64471-1
20066*903^71126-1
17222*903^81175-1
19166*903^87334-1
18872*903^89267-1
14702*903^97862-1
6972*903^99786-1

Results emailed - Base released

Reserving R636 to n=1M (200k-1M) for BOINC

S513 is complete to n=25K. 160 primes were found for n=10K-25K shown below. 446 k's remain. Base released.

Primes:
[code]
28942*513^10012+1
11312*513^10064+1
30120*513^10088+1
31378*513^10156+1
13432*513^10160+1
41466*513^10203+1
19988*513^10232+1
15882*513^10352+1
18114*513^10357+1
7074*513^10483+1
35866*513^10485+1
24316*513^10509+1
22426*513^10528+1
13884*513^10581+1
21262*513^10653+1
25646*513^10675+1
14178*513^10712+1
804*513^10729+1
5456*513^10733+1
4638*513^10759+1
35346*513^10964+1
14046*513^10967+1
27186*513^10992+1
44910*513^11130+1
502*513^11176+1
7748*513^11183+1
24094*513^11183+1
38692*513^11258+1
44222*513^11286+1
18246*513^11323+1
13698*513^11399+1
28790*513^11459+1
5494*513^11506+1
16320*513^11562+1
44886*513^11565+1
38388*513^11579+1
17978*513^11675+1
23698*513^11684+1
38652*513^11709+1
43728*513^11723+1
21974*513^11886+1
8766*513^11897+1
6782*513^11921+1
32878*513^11998+1
15460*513^11999+1
6954*513^12077+1
36938*513^12155+1
10468*513^12210+1
37574*513^12241+1
31316*513^12484+1
36104*513^12543+1
14614*513^12619+1
11352*513^12784+1
27506*513^12884+1
5108*513^13111+1
27468*513^13130+1
6684*513^13142+1
38086*513^13216+1
43916*513^13243+1
45624*513^13249+1
37390*513^13256+1
26826*513^13375+1
24366*513^13423+1
1056*513^14012+1
10218*513^14154+1
3912*513^14168+1
25478*513^14194+1
31226*513^14228+1
28978*513^14287+1
20022*513^14481+1
25108*513^14564+1
44504*513^14665+1
10424*513^14686+1
7836*513^14835+1
3824*513^15057+1
12456*513^15084+1
5052*513^15148+1
25714*513^15182+1
32724*513^15347+1
43746*513^15371+1
43988*513^15583+1
26432*513^15606+1
41354*513^15681+1
8878*513^15843+1
44002*513^15933+1
16628*513^15975+1
11976*513^15997+1
42726*513^15997+1
35396*513^16039+1
38336*513^16043+1
44610*513^16240+1
38758*513^16282+1
886*513^16287+1
42040*513^16414+1
10492*513^16513+1
27194*513^16546+1
19828*513^16602+1
18336*513^16683+1
28038*513^16695+1
14794*513^16823+1
1234*513^16833+1
6498*513^16842+1
1798*513^16955+1
11520*513^17032+1
45040*513^17066+1
43378*513^17072+1
16180*513^17087+1
45496*513^17169+1
42984*513^17233+1
41282*513^17285+1
35286*513^17311+1
4770*513^17379+1
27670*513^17470+1
21244*513^17566+1
1858*513^17996+1
37458*513^18006+1
20348*513^18092+1
3682*513^18104+1
27674*513^18254+1
14528*513^18315+1
15958*513^18559+1
2372*513^18670+1
8*513^19075+1
37988*513^19324+1
37096*513^19545+1
24342*513^19617+1
19174*513^19933+1
28972*513^20126+1
31708*513^20139+1
30484*513^20143+1
34186*513^20161+1
40734*513^20201+1
20874*513^20247+1
42048*513^20446+1
23448*513^20530+1
26986*513^20576+1
31094*513^20601+1
42136*513^20724+1
10148*513^20830+1
35122*513^20852+1
20596*513^21011+1
18206*513^21164+1
14072*513^21229+1
45258*513^21282+1
35958*513^21496+1
21572*513^21882+1
22622*513^22536+1
19034*513^22730+1
20506*513^22829+1
17576*513^23672+1
25774*513^23737+1
33596*513^23907+1
28188*513^24035+1
23210*513^24148+1
4974*513^24455+1
42804*513^24470+1
40424*513^24629+1
2298*513^24767+1
6774*513^24793+1
14474*513^24795+1
[/code]

S927 is being released due to lack of activity and response. I will reserve this base to n=25K.

[QUOTE=gd_barnes;445149]S927 is being released due to lack of activity and response. I will reserve this base to n=25K.[/QUOTE]
But maybe no?

My apologies, I typically browse the forums w/o being signed on, so I did not realize there was any question until you posted this.

[QUOTE=c10ck3r;445218]But maybe no?

My apologies, I typically browse the forums w/o being signed on, so I did not realize there was any question until you posted this.[/QUOTE]

Sorry about that. If you'd like, you can still send me your primes and it will act as a double check on my efforts.

R708 has been completed to n=25,000. 405 k's remain. All the appropriate pl files have been emailed to Gary.

I am going to continue this base to n=50,000.

Reserving S697 to n=100k (25-100k) for BOINC

Progress update
 

S 803 at 425K - continuing....

Reserving R703 to n=200k (100-200k) for BOINC

Reserving R553 to n=100k (25-100k) for BOINC

S927 is complete to n=25K. 126 primes were found for n=10K-25K shown below. 454 k's remain. Base released.

Primes:
[code]
18436*927^10016+1
14062*927^10023+1
22554*927^10149+1
8822*927^10236+1
19324*927^10278+1
8438*927^10337+1
12602*927^10368+1
23788*927^10481+1
310*927^10512+1
718*927^10722+1
4582*927^11024+1
22824*927^11034+1
5072*927^11050+1
22508*927^11124+1
18184*927^11130+1
11272*927^11136+1
9778*927^11146+1
26476*927^11181+1
5722*927^11251+1
13582*927^11468+1
22282*927^11539+1
26452*927^11551+1
9512*927^11638+1
23216*927^11679+1
7948*927^11694+1
6868*927^11746+1
5412*927^11760+1
7988*927^11845+1
15992*927^11886+1
24232*927^11892+1
21456*927^11960+1
10760*927^12422+1
16090*927^12428+1
18064*927^12567+1
25268*927^12578+1
11912*927^12611+1
8962*927^12698+1
10992*927^12800+1
28596*927^12823+1
6806*927^12836+1
10006*927^12960+1
26998*927^12985+1
18952*927^13242+1
5814*927^13278+1
26144*927^13378+1
22262*927^13492+1
26086*927^13668+1
11104*927^13726+1
10424*927^13745+1
23838*927^13768+1
4320*927^13787+1
8632*927^13963+1
2406*927^14221+1
22206*927^14416+1
27462*927^14651+1
27554*927^14657+1
23304*927^14698+1
26564*927^14849+1
8004*927^14902+1
21082*927^15135+1
18970*927^15194+1
27266*927^15251+1
11204*927^15790+1
15862*927^15959+1
23808*927^16165+1
6140*927^16420+1
19466*927^16445+1
20374*927^16562+1
17372*927^16746+1
4672*927^16932+1
18468*927^16974+1
9806*927^17043+1
14934*927^17105+1
11734*927^17315+1
26336*927^17327+1
304*927^17375+1
21870*927^17412+1
9764*927^17518+1
11716*927^17552+1
19016*927^17577+1
12982*927^17592+1
22318*927^17658+1
19502*927^17671+1
20344*927^17738+1
19800*927^17782+1
13282*927^17895+1
13344*927^17997+1
19448*927^18132+1
3038*927^18290+1
14332*927^18358+1
19728*927^18449+1
14094*927^18533+1
11862*927^18668+1
27134*927^18735+1
14296*927^18753+1
18182*927^18799+1
6004*927^18918+1
17118*927^19209+1
6292*927^19523+1
26130*927^19616+1
24968*927^19741+1
9924*927^20165+1
15746*927^20309+1
12108*927^20418+1
3916*927^20572+1
1596*927^20588+1
13952*927^20724+1
494*927^20802+1
18476*927^21515+1
23578*927^21630+1
13402*927^21694+1
27442*927^22012+1
458*927^22212+1
24406*927^22321+1
12820*927^22362+1
402*927^22403+1
21682*927^22799+1
20270*927^23111+1
15874*927^23329+1
28188*927^23344+1
12288*927^23758+1
13948*927^23773+1
5476*927^23793+1
16356*927^24223+1
7570*927^24550+1
1206*927^24612+1
[/code]

S697 tested to n=100k (25-100k)

33 primes found, 58 remain

4644*697^28075+1
7246*697^28912+1
13072*697^29172+1
8412*697^30188+1
4464*697^30429+1
11926*697^30840+1
4434*697^32347+1
9126*697^32996+1
4248*697^37130+1
12232*697^38047+1
3336*697^39000+1
13026*697^39689+1
13642*697^40664+1
1002*697^41052+1
6774*697^41507+1
12648*697^49586+1
4506*697^52383+1
486*697^53109+1
5598*697^53936+1
12726*697^54513+1
9138*697^55038+1
11838*697^56426+1
10852*697^56779+1
11268*697^57036+1
12696*697^58259+1
9136*697^58401+1
1788*697^63922+1
2728*697^66701+1
14194*697^69618+1
10282*697^77855+1
1042*697^82910+1
3132*697^85543+1
9924*697^96581+1

Results emailed - Base released

Reserving S957 to n=100k (25-100k) for BOINC

Reserving S773 to n=200K.

R553 tested to n=100k (25-100k)

35 primes found, 50 remain

10068*553^25141-1
7104*553^25331-1
18512*553^27358-1
17492*553^27814-1
11474*553^28333-1
22026*553^28527-1
6224*553^29092-1
3228*553^29433-1
11394*553^32236-1
13484*553^32777-1
10746*553^32843-1
3002*553^35055-1
22818*553^36777-1
22436*553^37906-1
10994*553^38301-1
29732*553^39971-1
20892*553^39982-1
31244*553^42192-1
14234*553^42415-1
15014*553^48684-1
5726*553^48699-1
8696*553^51131-1
2630*553^55684-1
31574*553^57719-1
6458*553^61614-1
20640*553^65054-1
7698*553^65661-1
27188*553^77884-1
18126*553^78841-1
20466*553^82546-1
15866*553^83923-1
1512*553^91126-1
12182*553^93023-1
1148*553^93737-1
25356*553^96266-1

Results emailed - Base released

Progress update
 

K4 S803 - 450K

S957 tested to n=100k (25-100k)

57 primes found, 143 remain

Results emailed - Base released

Reserving S943 to n=100k (25-100k) for BOINC

Reserving S882 to n=100k (25-100k) for BOINC

R640 tested to n=100k (25-100k)

32 primes found, 35 remain

2499*640^25182-1
6242*640^26170-1
222*640^26764-1
8511*640^27260-1
9290*640^27506-1
4769*640^27575-1
4226*640^28433-1
10065*640^30652-1
6938*640^31575-1
4590*640^33274-1
5339*640^35402-1
1671*640^40762-1
9387*640^42797-1
7302*640^45329-1
7593*640^48860-1
4454*640^48972-1
3771*640^49433-1
699*640^49986-1
1838*640^50783-1
2133*640^59716-1
8409*640^62229-1
2172*640^63613-1
7326*640^64822-1
2219*640^68460-1
2876*640^71982-1
8891*640^77217-1
2642*640^80145-1
875*640^80166-1
7290*640^81358-1
4091*640^96387-1
3446*640^98234-1
2565*640^98637-1

Results emailed - Base released

Note: overtaken from MisterBitcoin

S943 tested to n=100k (25-100k)

45 primes found, 53 remain

4624*943^25299+1
13684*943^25441+1
5022*943^25998+1
184*943^26042+1
5566*943^27944+1
8256*943^29971+1
3262*943^30786+1
9736*943^31232+1
10848*943^31287+1
1366*943^34189+1
8964*943^37938+1
7836*943^38319+1
7194*943^39130+1
9498*943^39735+1
9654*943^39818+1
8764*943^39913+1
13330*943^39916+1
5244*943^40558+1
3294*943^40785+1
13294*943^42690+1
15558*943^44088+1
12522*943^45004+1
11554*943^45527+1
12370*943^47224+1
6316*943^47421+1
10212*943^47674+1
1828*943^47923+1
10584*943^48150+1
3022*943^48382+1
8958*943^51796+1
8752*943^53824+1
14458*943^55052+1
5094*943^55539+1
13686*943^58237+1
13548*943^59678+1
13744*943^60702+1
424*943^63363+1
6588*943^63467+1
58*943^63523+1
3582*943^73510+1
13630*943^75336+1
780*943^77473+1
10068*943^80828+1
15304*943^85197+1
1306*943^93200+1

Results emailed - Base released

Reserving S858 to n=25K.

S678 tested to n=500k (200-500k)

nothing found, 1 remain

Results emailed - Base released

MisterBitcoin is releasing k=66 for R602. Therefore I will reserve it to n=200K. We now have a split reservation on the base. He has k=58 to n=200K and I have k=66 to n=200K.

S882 tested to n=100k (25-100k)

30 primes found, 46 remain

2204*882^25279+1
2186*882^25328+1
2116*882^25875+1
2274*882^25899+1
3376*882^26327+1
4594*882^30142+1
928*882^30761+1
3533*882^31630+1
2724*882^34059+1
232*882^39058+1
513*882^42197+1
4231*882^44160+1
4157*882^47448+1
998*882^48510+1
1926*882^51164+1
1312*882^52118+1
3184*882^52645+1
1158*882^53425+1
1502*882^55183+1
706*882^58472+1
3350*882^62647+1
3029*882^69511+1
3452*882^82495+1
64*882^84322+1
445*882^85369+1
5232*882^85756+1
623*882^89706+1
2874*882^95905+1
1057*882^96951+1
68*882^98958+1

Results emailed - Base released

hi,
reserving S770 from n=115k to 200k

Reserving R502 to n=100k (25-100k) for BOINC

Reserving R798 to n=200k (100-200k) for BOINC

Reserving R533 to n=400k (200-400k) for BOINC

Reserving S880 to n=100k (25-100k) for BOINC

S773 is complete to n=200K. No primes were found for n=100K-200K. 5 k's still remain. Base released.

Reserving S856 to n=100k (25-100k) for BOINC

Reserving R548 to n=400k (200-400k) for BOINC