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Digits	Prime Rank¹	App Types		Sub-Project	Available Tasks A² / B³			UTC time	2020-12-05 15:31:07
5 010 221	21	CPU ^{F MT}		321 Prime Search (LLR)	1005	/	1000	User Count	351 396
6 028 433	16	CPU ^{F MT}		Cullen Prime Search (LLR)	760	/	1000	Host Count	622 328
4 616 203	22	CPU ^{F MT}		Extended Sierpinski Problem (LLR)	749	/	3696	Hosts Per User	1.77
2 293 763	77	CPU ^{F MT}		Fermat Divisor Search (LLR)	1788	/	792K	Tasks in Progress	184 222
4 319 253	24	CPU ^{F MT}		Generalized Cullen/Woodall Prime Search (LLR)	777	/	1000	Primes Discovered	82 799
7 021 082	13	CPU ^{F MT}		Prime Sierpinski Problem (LLR)	772	/	2255	Primes Reported⁴ at T5K	29 856
874 719	1025	CPU ^{F MT}		Proth Prime Search (LLR)	1555	/	249K	Mega Primes Discovered	565
485 047	3931	CPU ^MT		Proth Prime Search Extended (LLR)	3986	/	1108K	TeraFLOPS	2 736.630
1 005 882	658	CPU ^{F MT}		Proth Mega Prime Search (LLR)	4005	/	63K	PrimeGrid's 2020 Challenge Series Magellan 500th Anniversary Challenge Nov 18 18:00:00 to Nov 28 17:59:59 (UTC) Time until Great Conjunction challenge: Days Hours Min Sec Standings Magellan 500th Anniversary Challenge (CUL-LLR, WOO-LLR): Individuals \| Teams
10 165 878	8	CPU ^{F MT}		Seventeen or Bust (LLR)	402	/	2367
2 267 511	77	CPU ^{F MT}		Sierpinski / Riesel Base 5 Problem (LLR)	1528	/	34K
388 342	5K+	CPU ^MT		Sophie Germain Prime Search (LLR)	7477	/	566K
3 405 247	44	CPU ^{F MT}		The Riesel Problem (LLR)	1007	/	2000
6 138 719	16	CPU ^{F MT}		Woodall Prime Search (LLR)	764	/	2325
		CPU	GPU	Proth Prime Search (Sieve)	2448	/	∞
272 494	5K+		GPU	Generalized Fermat Prime Search (n=15)	974	/	150K
524 160	2807	CPU	GPU	Generalized Fermat Prime Search (n=16)	1498	/	332K
962 006	845	CPU	GPU	Generalized Fermat Prime Search (n=17 low)	2001	/	18K
1 036 593	436	CPU	GPU	Generalized Fermat Prime Search (n=17 mega)	993	/	63K
1 852 325	121	CPU	GPU	Generalized Fermat Prime Search (n=18)	1001	/	54K
3 465 152	38	CPU	GPU	Generalized Fermat Prime Search (n=19)	999	/	4564
6 486 328	13	CPU	GPU	Generalized Fermat Prime Search (n=20)	1002	/	2249
12 182 290	7	CPU ^MT-A	GPU	Generalized Fermat Prime Search (n=21)	403	/	10K
22 108 158	4		GPU	Generalized Fermat Prime Search (n=22)	200	/	2594
25 019 412	> 1 <		GPU	Do You Feel Lucky?	202	/	405
		CPU ^MT	GPU	AP27 Search	1153	/	∞
		CPU ^MT	GPU	Wieferich and Wall-Sun-Sun Prime Search	980	/	∞
¹ "Prime Rank" is where the leading edge candidate, if prime, would appear in the Top 5000 Primes list. "5K+" means the primes are too small to make the list. ² First "Available Tasks" number (A) is the number of tasks immediately available to send. ³ Second "Available Tasks" number (B) is additional prime candidates that have not yet been turned into workunits. Underlined work is loaded manually. If the first number (A) is 0, something is broken. If both numbers are 0, we've run out of work. Two tasks (A) are generated automatically from each prime candidate (B) when needed, so the total number of tasks available without manual intervention is A+2B. If the B number is not* underlined, new candidates (B) are also automatically created from sieve files, which typically contain millions of candidates. If B is infinite (∞), there's essentially an unlimited amount of work available. ⁴ Includes all primes ever reported by PrimeGrid to Top 5000 Primes list. Many of these are no longer in the top 5000. ^F Uses fast proof tasks so no double check is necessary. Everyone is "first". ^MT Multithreading via web-based preferences is available. ^MT-A Multithreading via app_config.xml is available.

About

PrimeGrid's primary goal is to advance mathematics by enabling everyday computer users to contribute their system's processing power towards prime finding. By simply downloading and installing BOINC and attaching to the PrimeGrid project, participants can choose from a variety of prime forms to search. With a little patience, you may find a large or even record breaking prime and enter into Chris Caldwell's The Largest Known Primes Database with a multi-million digit prime!

PrimeGrid's secondary goal is to provide relevant educational materials about primes. Additionally, we wish to contribute to the field of mathematics.

Lastly, primes play a central role in the cryptographic systems which are used for computer security. Through the study of prime numbers it can be shown how much processing is required to crack an encryption code and thus to determine whether current security schemes are sufficiently secure.

PrimeGrid is currently running several sub-projects:

321 Prime Search: searching for mega primes of the form 3·2ⁿ±1.
Cullen-Woodall Search: searching for mega primes of forms n·2ⁿ+1 and n·2ⁿ−1.
Generalized Cullen-Woodall Search: searching for mega primes of forms n·bⁿ+1 and n·bⁿ−1 where n + 2 > b.
Extended Sierpinski Problem: helping solve the Extended Sierpinski Problem.
Generalized Fermat Prime Search: searching for megaprimes of the form b^2ⁿ+1.
Prime Sierpinski Project: helping the Prime Sierpinski Project solve the Prime Sierpinski Problem.
Proth Prime Search: searching for primes of the form k·2ⁿ+1.
Fermat Divisor Search: a subset of the Proth Prime Search specificically searching for divisors of Fermat numbers.
Seventeen or Bust: helping to solve the Sierpinski Problem.
Sierpinski/Riesel Base 5: helping to solve the Sierpinski/Riesel Base 5 Problem.
Sophie Germain Prime Search: searching for primes p and 2p+1.
The Riesel problem: helping to solve the Riesel Problem.
AP27 Search: searching for record length arithmetic progressions of primes.

You can choose the projects you would like to run by going to the project preferences page.

Recent Significant Primes

On 12 November 2020, 06:43:56 UTC, PrimeGrid's Fermat Divisor Search found the Mega Prime:

45·2^7513661+1

The prime is 2,261,839 digits long and enters Chris Caldwell's The Largest Known Primes Database ranked 73^rd overall.

The discovery was made by Hiroyuki Okazaki (zunewantan) of Japan using an Intel(R) Xeon(R) CPU E5-2670 0 @ 2.60GHz with 32GB RAM, running Linux. This computer took about 2 hours, 6 minutes to complete the primality test using LLR2. Hiroyuki Okazaki is a member of the Aggie The Pew team.

For more information, please see the Official Announcement.

On 27 October 2020, 22:38:04 UTC, PrimeGrid's Fermat Divisor Search found the Mega Prime:

29·2^7374577+1

The prime is 2,219,971 digits long and enters Chris Caldwell's The Largest Known Primes Database ranked 73^rd overall.

The discovery was made by Pavel Atnashev (Pavel Atnashev) of Russia using an Intel(R) Xeon(R) E5-2660 v2 CPU @ 2.20GHz with 4GB RAM, running Linux. This computer took about 1 hour, 49 minutes to complete the primality test using LLR2. Pavel Atnashev is a member of the Ural Federal University team.

For more information, please see the Official Announcement.

On 25 October 2020, 11:30:07 UTC, PrimeGrid's 321 Prime Search found the Mega Prime:

3·2^16408818+1

The prime is 4,939,547 digits long and enters Chris Caldwell's The Largest Known Primes Database ranked 21^st overall.

The discovery was made by Scott Brown (Scott Brown) of the United States using an Intel(R) Core(TM) i7-4770S CPU @ 3.10GHz with 8GB RAM, running Microsoft Windows 10 Enterprise x64 Edition. This computer took about 6 hours, 6 minutes to complete the primality test using LLR2. Scott Brown is a member of the Aggie The Pew team.

For more information, please see the Official Announcement.

On 25 October 2020, 00:52:15 UTC, PrimeGrid's Fermat Divisor Search found the Mega Prime:

15·2^7300254+1

The prime is 2,197,597 digits long and enters Chris Caldwell's The Largest Known Primes Database ranked 75^th overall.

The discovery was made by Robert Gelhar (Gelly) of the United States using an Intel(R) Xeon(R) Gold 6140 CPU @ 2.30GHz with 1GB RAM, running Linux Ubuntu. This computer took about 3 hours, 24 minutes to complete the primality test using LLR2. Robert Gelhar is a member of the Antarctic Crunchers team.

For more information, please see the Official Announcement.

On 24 October 2020, 22:53:39 UTC, PrimeGrid's Fermat Divisor Search found the Mega Prime:

19·2^6833086+1

The prime is 2,056,966 digits long and enters Chris Caldwell's The Largest Known Primes Database ranked 94^th overall.

The discovery was made by Jiri Jaros (Venec) of the Czech Republic using an Intel(R) Xeon(R) CPU E5-2620 v3 @ 2.40GHz with 8GB RAM, running Linux Ubuntu. This computer took about 7 hours, 27 minutes to complete the primality test using LLR2. Jiri Jaros is a member of the Czech National Team.

For more information, please see the Official Announcement.

On 20 October 2020, 19:06:13 UTC, PrimeGrid's Fermat Divisor Search found the Mega Prime:

39·2^6684941+1

The prime is 2,012,370 digits long and enters Chris Caldwell's The Largest Known Primes Database ranked 97^th overall.

The discovery was made by Mike Thümmler (fnord) of Germany using an AMD Ryzen 5 1600X Six-Core Processor with 16GB RAM, running Microsoft Windows 10 Professional x64 Edition. This computer took about 4 hours to complete the primality test using LLR2. Mike Thümmler is a member of the SETI.Germany team.

For more information, please see the Official Announcement.

On 20 October 2020, 13:22:13 UTC, PrimeGrid's Fermat Divisor Search found the Mega Prime:

39·2^6648997+1

The prime is 2,001,550 digits long and enters Chris Caldwell's The Largest Known Primes Database ranked 99^th overall.

The discovery was made by Tom Greer (tng) of the United States using an Intel(R) Xeon(R) Gold 6140 CPU @ 2.30GHz with 1GB RAM, running Linux Ubuntu. This computer took about 2 hours, 38 minutes to complete the primality test using LLR2. Tom Greer is a member of the Antarctic Crunchers team.

For more information, please see the Official Announcement.

Other significant primes

3·2^16408818+1 (321): official announcement | 321

3·2^11895718-1 (321): official announcement | 321

3·2^11731850-1 (321): official announcement | 321

3·2^11484018-1 (321): official announcement | 321

3·2^10829346+1 (321): official announcement | 321

27·2^7046834+1 (27121): official announcement | 27121

27·2^5213635+1 (27121): official announcement | 27121

27·2^4583717-1 (27121): official announcement | 27121

27·2^4542344-1 (27121): official announcement | 27121

121·2^4553899-1 (27121): official announcement | 27121

224584605939537911+81292139*23#*n for n=0..26 (AP27): official announcement

48277590120607451+37835074*23#*n for n=0..25 (AP26): official announcement

142099325379199423+16549135*23#*n for n=0..25 (AP26): official announcement

149836681069944461+7725290*23#*n for n=0..25 (AP26): official announcement

43142746595714191+23681770*23#*n for n=0..25 (AP26): official announcement

6679881·2^6679881+1 (CUL): official announcement | Cullen

6328548·2^6328548+1 (CUL): official announcement | Cullen

99739·2^14019102+1 (ESP): official announcement | k=99739 eliminated

193997·2^11452891+1 (ESP): official announcement | k=193997 eliminated

161041·2^7107964+1 (ESP): official announcement | k=161041 eliminated

147855!-1 (FPS): official announcement | Factorial

110059!+1 (FPS): official announcement | Factorial

103040!-1 (FPS): official announcement | Factorial

94550!-1 (FPS): official announcement | Factorial

13·2^5523860+1 (PPS-DIV): official announcement | Fermat Divisor

193·2^3329782+1 (PPS-Mega): official announcement | Fermat Divisor

57·2^2747499+1 (PPS): official announcement | Fermat Divisor

267·2^2662090+1 (PPS): official announcement | Fermat Divisor

9·2^2543551+1 (PPS): official announcement | Fermat Divisor

2805222·25^2805222+1 (GC): official announcement | Generalized Cullen

1806676·41^1806676+1 (GC): official announcement | Generalized Cullen

1323365·116^1323365+1 (GC): official announcement | Generalized Cullen

1341174·53^1341174+1 (GC): official announcement | Generalized Cullen

682156·79⁶⁸²¹⁵⁶+1 (GC): official announcement | Generalized Cullen

1059094^1048576+1 (GFN): official announcement | Generalized Fermat Prime

919444^1048576+1 (GFN): official announcement | Generalized Fermat Prime

3638450⁵²⁴²⁸⁸+1 (GFN): official announcement | Generalized Fermat Prime

3214654⁵²⁴²⁸⁸+1 (GFN): official announcement | Generalized Fermat Prime

2985036⁵²⁴²⁸⁸+1 (GFN): official announcement | Generalized Fermat Prime

563528·13⁵⁶³⁵²⁸-1 (GW): official announcement | Generalized Woodall

404882·43⁴⁰⁴⁸⁸²-1 (GW): official announcement | Generalized Woodall

1098133#-1 (PRS): official announcement | Primorial

843301#-1 (PRS): official announcement | Primorial

45·2^7513661+1 (PPS-DIV): official announcement | Top 100 Prime

29·2^7374577+1 (PPS-DIV): official announcement | Top 100 Prime

15·2^7300254+1 (PPS-DIV): official announcement | Top 100 Prime

19·2^6833086+1 (PPS-DIV): official announcement | Top 100 Prime

39·2^6684941+1 (PPS-DIV): official announcement | Top 100 Prime

168451·2^19375200+1 (PSP): official announcement | k=168451 eliminated

10223·2^31172165+1 (SoB): official announcement | k=10223 eliminated

2996863034895·2^1290000±1 (SGS): official announcement | Twin

2618163402417·2^1290000-1 (SGS), 2618163402417·2^1290001-1 (2p+1): official announcement | Sophie Germain

18543637900515·2⁶⁶⁶⁶⁶⁷-1 (SGS), 18543637900515·2⁶⁶⁶⁶⁶⁸-1 (2p+1): official announcement | Sophie Germain

3756801695685·2⁶⁶⁶⁶⁶⁹±1 (SGS): official announcement | Twin

65516468355·2³³³³³³±1 (TPS): official announcement | Twin

109838·5^3168862-1 (SR5): official announcement | k=109838 eliminated

118568·5^3112069+1 (SR5): official announcement | k=118568 eliminated

207494·5^3017502-1 (SR5): official announcement | k=207494 eliminated

238694·5^2979422-1 (SR5): official announcement | k=238694 eliminated

146264·5^2953282-1 (SR5): official announcement | k=146264 eliminated

273809·2^8932416-1 (TRP): official announcement | k=273809 eliminated

502573·2^7181987-1 (TRP): official announcement | k=502573 eliminated

402539·2^7173024-1 (TRP): official announcement | k=402539 eliminated

40597·2^6808509-1 (TRP): official announcement | k=40597 eliminated

304207·2^6643565-1 (TRP): official announcement | k=304207 eliminated

17016602·2^17016602-1 (WOO): official announcement | Woodall

3752948·2^3752948-1 (WOO): official announcement | Woodall

2367906·2^2367906-1 (WOO): official announcement | Woodall

2013992·2^2013992-1 (WOO): official announcement | Woodall

News

Changes to GFN Apps
I just installed the new Windows and Linux (but not Mac) CPU versions for the following GFN projects:

GFN-16 Yes, you can run GFN16 on CPUs again!
GFN-17-LOW
GFN-17-MEGA Yes, you can run GFN-17-MEGA on CPUs again!
GFN-18
GFN-19
GFN-20

Genefer 3.3.5 provides substantial speed boosts for CPU on those projects.

This applies only to the CPU apps. GPU apps are not affected.

GFN-21 has not been updated because it's still capable of running the FP64 transforms, which are the fastest.

I have removed the CPU GFN-22 app. It was a mistake.

Mac versions of the new app will be made available when testing is completed, but this has been delayed by a lack of Mac testers.

If you want to help out testing the Mac version, head over to the 3.3.5 testing thread.

Discussion about the new release can be found in the Genefer 3.3.5 release thread. 4 Dec 2020 | 15:53:57 UTC · Comment

New Subproject!
For the first time in a while, we have a new subproject: the Wieferich and Wall-Sun-Sun Prime Search!

To participate, edit your project preferences. The app is available for GPU and CPU.

Note: there may be severe screen lag on the GPU Mac version. We are aware and a fix will be out soon.

See this forum thread for more information about the search. 28 Nov 2020 | 23:20:08 UTC · Comment

TRP Mega Prime!
On 16 November 2020, 23:17:01 UTC, PrimeGrid’s The Riesel Problem project eliminated k=146561 by finding the mega prime:

146561*2^11280802-1

The prime is 3,395,865 digits long and will enter Chris Caldwell's The Largest Known Primes Database ranked 42nd overall. This is PrimeGrid's 16th elimination. 48 k's now remain.

The discovery was made by Pavel Atnashev (Pavel Atnashev) of Russia using an Intel(R) Xeon(TM) E5-2680 v4 CPU @ 2.40GHz with 4GB RAM, running Linux. This computer took about 3 hours, 18 minutes to complete the primality test using LLR2. Pavel Atnashev is a member of the Ural Federal University team.

For more details, please see the official announcement.

25 Nov 2020 | 14:19:31 UTC · Comment

DIV Mega Prime!
On 12 November 2020, 06:43:56 UTC, PrimeGrid's Fermat Divisor Search found the Mega Prime:

45*2^7513661+1

The prime is 2,261,839 digits long and enters Chris Caldwell's “The Largest Known Primes Database” ranked 73rd overall.

The discovery was made by Hiroyuki Okazaki (zunewantan) of Japan using an Intel(R) Xeon(R) CPU E5-2670 0 @ 2.60GHz with 32GB RAM, running Linux 4.4.0-21-generic. This computer took about 2 hours, 6 minutes to complete the primality test using LLR. Hiroyuki Okazaki is a member of the Aggie The Pew team.

For more details, please see the official announcement.

18 Nov 2020 | 19:00:30 UTC · Comment

Magellan 500th Anniversary Challenge starts 18 November
The eighth challenge of the 2020 Series will be a 10-day challenge commemorating the (approximate) 500th Anniversary of the extraordinary expedition of Portuguese explorer Ferdinand Magellan. The challenge will be offered on the CUL-LLR and WOO-LLR subprojects, beginning 18 November 18:00 UTC and ending 28 November 18:00 UTC.

To participate in the Challenge, please select only the Cullen Prime Search LLR (CUL) and/or Woodall Prime Search LLR (WOO) projects in your PrimeGrid preferences section. Work units which are downloaded and completed during the challenge will count towards your challenge score.

Note: This will be our second challenge using LLR2, which eliminates the need for a full doublecheck task on each workunit, but replaces it with a short verification task. Expect to receive a few tasks about 1% of normal length.

Comments? Concerns? Conundrums? Confusions? Think we'll break the decade-long drought of Cullen primes? Tell us in the forum thread for this challenge. Best of luck! 16 Nov 2020 | 2:46:34 UTC · Comment

... more

News is available as an RSS feed RSS

Newly reported primes

(Mega-primes are in bold.)

5763641398377*2^1290000-1 (YuW3-810); 206897602^32768+1 (Philipp Schulz); 206879364^32768+1 (Renix); 5762479998957*2^1290000-1 (Todderbert); 99458608^65536+1 (ruditapper); 4839*2^3341309+1 (Merimac Strongbottom); 99443134^65536+1 (CGB); 5754564148947*2^1290000-1 (Yegor001); 206706230^32768+1 (Penguin); 99416780^65536+1 (CGB); 5759526752457*2^1290000-1 (Brent); 5753907416535*2^1290000-1 (RoKro); 206519972^32768+1 (Penguin); 5757912668097*2^1290000-1 (reiner); 5745717894525*2^1290000-1 (288larsson); 206482186^32768+1 (Penguin); 5409*2^1611070+1 (pudge94); 5752227750087*2^1290000-1 (Penguin); 206355000^32768+1 (Christoph); 206346962^32768+1 (Juergen)

Top Crunchers:

Top participants by RAC

Syracuse University	100930506.4
Science United	43269324.22
tng	17554454.08
Ryan Dark	10438182.11
Miklos M.	9576373.93
Jesmar	9427195.7
Grzegorz Roman Granowski	9291251.41
DeleteNull	6496251.96
Scott Brown	5333616.87
Pavel Atnashev	5260666.58

Top teams by RAC

Antarctic Crunchers	31609120.84
SETI.Germany	22159069.86
Aggie The Pew	18889752.39
The Scottish Boinc Team	18319057.4
Team 2ch	14561417.12
Czech National Team	12407582.86
Sicituradastra.	10669288.74
GoEngineer Inc.	10437989.09
Storm	9940505.38
SETI.USA	8566319.1

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