PrimeGrid

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Digits	Prime Rank¹	App Types		Sub-Project	Available Tasks A² / B³			UTC time	2020-01-18 04:31:49
4 682 579	20	CPU		321 Prime Search (LLR)	1000	/	999	User Count	349 329
5 371 402	17	CPU		Cullen Prime Search (LLR)	750	/	1000	Host Count	577 433
4 242 658	20	CPU		Extended Sierpinski Problem (LLR)	751	/	2492	Hosts Per User	1.65
1 653 346	115	CPU		Fermat Divisor Search (LLR)	3997	/	1991K	Tasks in Progress	88 419
4 033 818	25	CPU		Generalized Cullen/Woodall Prime Search (LLR)	1001	/	1000	Primes Discovered	80 644
6 664 863	13	CPU		Prime Sierpinski Problem (LLR)	750	/	519	Primes Reported⁴ at T5K	28 910
853 471	812	CPU		Proth Prime Search (LLR)	3996	/	191K	Mega Primes Discovered	410
467 856	3567	CPU		Proth Prime Search Extended (LLR)	3997	/	740K	TeraFLOPS	2 510.467
1 001 553	547	CPU		Proth Mega Prime Search (LLR)	3987	/	357K	PrimeGrid's 2020 Challenge Series International Education Day Challenge Jan 24 00:00:00 to Jan 24 23:59:59 (UTC) Time until International Education Day challenge: Days Hours Min Sec Standings Aussie, Aussie, Aussie! Oi! Oi! Oi! Summer Solstice Challenge (GFN-21, GFN-22, GFN-DYFL): Individuals \| Teams
9 771 623	9	CPU		Seventeen or Bust (LLR)	401	/	5928
2 017 571	72	CPU		Sierpinski / Riesel Base 5 Problem (LLR)	2000	/	8406
388 342	5K+	CPU		Sophie Germain Prime Search (LLR)	7489	/	594K
3 012 610	43	CPU		The Riesel Problem (LLR)	1000	/	2000
5 564 350	17	CPU		Woodall Prime Search (LLR)	750	/	1000
		CPU		321 Prime Search (Sieve)	7482	/	∞
		CPU	GPU	Proth Prime Search (Sieve)	3959	/	∞
268 335	5K+		GPU	Generalized Fermat Prime Search (n=15)	985	/	254K
514 986	2531	CPU	GPU	Generalized Fermat Prime Search (n=16)	3995	/	389K
949 104	642	CPU	GPU	Generalized Fermat Prime Search (n=17 low)	1997	/	75K
1 025 661	389		GPU	Generalized Fermat Prime Search (n=17 mega)	1000	/	83K
1 828 242	84	CPU	GPU	Generalized Fermat Prime Search (n=18)	1001	/	88K
3 416 959	31	CPU	GPU	Generalized Fermat Prime Search (n=19)	1000	/	16K
6 411 271	13	CPU	GPU	Generalized Fermat Prime Search (n=20)	1001	/	7982
12 020 368	7	CPU	GPU	Generalized Fermat Prime Search (n=21)	501	/	11K
21 902 342	4		GPU	Generalized Fermat Prime Search (n=22)	201	/	6556
24 956 136	> 1 <		GPU	Do You Feel Lucky?	200	/	3699
		CPU	GPU	AP27 Search	1973	/	∞
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. ²First "Available Tasks" number (A) is the number of tasks immediately available to send. ³Second "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. ⁴Includes all primes ever reported by PrimeGrid to Top 5000 Primes list. Many of these are no longer in the top 5000.

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 as a Titan!

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.
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 Prime Sierpinski Project solve the Prime Sierpinski Problem.
Proth Prime Search: searching for primes of the form k·2ⁿ+1.
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.

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

Recent Significant Primes

On 24 December 2019, 08:20:15 UTC, PrimeGrid's Generalized Fermat Prime Search found the Generalized Fermat mega prime:

3214654⁵²⁴²⁸⁸+1

The prime is 3,411,613 digits long and enters Chris Caldwell's The Largest Known Primes Database ranked 3^rd for Generalized Fermat primes and 30^th overall.

The discovery was made by Alen Kecic (Freezing) of Germany using an NVIDIA GeForce GTX 1660 Ti in an Intel(R) Core(TM) i7-7820X CPU @ 3.60GHz with 32GB RAM, running Microsoft Windows 10 Professional x64 Edition. This computer took about 51 minutes to probable prime (PRP) test with GeneferOCL3. Alen is a member of the SETI.Germany team.

The PRP was confirmed prime by an Intel(R) Core(TM) i7-7700K CPU @ 4.20GHz with 32GB RAM, running Windows 10 Professional x64 Edition. This computer took about 1 day, 1 hour and 45 minutes to complete the primality test using multithreaded LLR.

For more information, please see the Official Announcement.

On 24 December 2019, 01:28:13 UTC, PrimeGrid's Extended Sierpinski Problem found the Mega prime:

99739·2^14019102+1

The prime is 4,220,176 digits long and enters Chris Caldwell's The Largest Known Primes Database ranked 20^th overall. This find eliminates k=99739; 9 k's remain in the Extended Sierpinski Problem.

The discovery was made by Brian D. Niegocki (Penguin) 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 14 hours and 14 minutes to complete the primality test using multithreaded LLR. Brian is a member of the Antarctic Crunchers team. For more information, please see the Official Announcement.

On 5 December 2019, 08:39:29 UTC, PrimeGrid's Generalized Fermat Prime Search found the Generalized Fermat mega prime:

9125820²⁶²¹⁴⁴+1

The prime is 1,824,594 digits long and enters Chris Caldwell's The Largest Known Primes Database ranked 14^th for Generalized Fermat primes and 82^nd overall.

The discovery was made by Yoshimitsu Kato (yoshi) of Japan using an NVIDIA GeForce GTX 1660 Ti in an Intel(R) Core(TM) i7-6700 CPU @ 3.40GHz with 16GB RAM, running Microsoft Windows 10. This computer took about 22 minutes to probable prime (PRP) test with Genefer OCL2. Yoshimitsu Kato is a member of Team JPN.

The PRP was confirmed prime by an Intel(R) Core(TM) i7-6700 CPU @ 3.40GHz with 16GB RAM, running Microsoft Windows 10 Professional x64 Edition. This computer took about 16 hours, 30 minutes to complete the primality test using multithreaded LLR.

For more information, please see the Official Announcement.

On 6 November 2019, 11:59:08 UTC, PrimeGrid's Generalized Fermat Prime Search found the Generalized Fermat mega prime:

8883864²⁶²¹⁴⁴+1

The prime is 1,821,535 digits long and enters Chris Caldwell's The Largest Known Primes Database ranked 14^th for Generalized Fermat primes and 80^th overall.

The discovery was made by Rod Skinner (rjs5) of the United States using an NVIDIA GeForce RTX 2080 Ti in an Intel(R) Core(TM) i9-9980XE CPU @ 3.00GHz with 63GB RAM, running Linux Fedora. This computer took about 8 minutes to probable prime (PRP) test with Genefer OCL2. Rod is a member of the Intel Corporation team.

The PRP was confirmed prime by an Intel(R) Xeon(R) CPU E3-1240 v6 @ 3.70GHz with 32GB RAM, running Debian Linux. This computer took about 17 hours and 30 minutes to complete the primality test using multithreaded LLR.

For more information, please see the Official Announcement.

On 23 September 2019, 06:25:41 UTC, PrimeGrid's AP27 (Arithmetic Progression of 27 primes) Search found the first ever AP27:

224584605939537911+81292139*23#*n for n=0..26

In addition to being the first know AP27, it is also the largest known AP24, AP25 and AP26 (smaller start but larger end than old record).

The discovery was made by Rob Gahan (Robish) of Ireland using an NVIDIA GeForce GTX 1660 Ti GPU on an Intel(R) Core(TM) i5-9400 CPU @ 2.90GHz running Microsoft Windows 10 Professional x64 Edition. This computer took about 22 minutes to process this task. Rob is a member of the Storm team.

For more information, please see the Official Announcement.

On 18 September 2019, 11:52:32 UTC, PrimeGrid's Generalized Fermat Prime Search found the Generalized Fermat mega prime:

2985036⁵²⁴²⁸⁸+1

The prime is 3,394,739 digits long and enters Chris Caldwell's The Largest Known Primes Database ranked 3^rd for Generalized Fermat primes and 28^th overall.

The discovery was made by Peter Harvey (eXaPower) of the United States using an NVIDIA GeForce GTX 1070 in an Intel(R) Core(TM) i5-4440S CPU @ 2.80GHz CPU with 8GB RAM, running Windows 8.1. This computer took about 1 hour and 49 minutes to probable prime (PRP) test with GeneferOCL3.

The PRP was confirmed prime by an Intel(R) Core(TM) i7-7700K CPU @ 4.20GHz with 16GB RAM, running Windows 10 Professional. This computer took about 23 hours and 48 minutes to complete the primality test using multithreaded LLR.

For more information, please see the Official Announcement.

On 9 September 2019, 18:15:29 UTC, PrimeGrid's Generalized Fermat Prime Search found the Generalized Fermat mega prime:

8521794²⁶²¹⁴⁴+1

The prime is 1,816,798 digits long and enters Chris Caldwell's The Largest Known Primes Database ranked 13^th for Generalized Fermat primes and 76^th overall.

The discovery was made by Ken Ito (jpldcon4) of Japan using an NVIDIA GeForce GTX 980 Ti in an Intel(R) Xeon(R) CPU E5-2687W v3 @ 3.10GHz with 64GB RAM, running Microsoft Windows Server 2016. This computer took about 27 minutes to probable prime (PRP) test with GeneferOCL2. Ken is a member of Team 2ch.

The PRP was confirmed prime by an Intel(R) Xeon(R) CPU E3-1240 v6 @ 3.70GHz with 32GB RAM, running Debian Linux. This computer took about 17 hours and30 minutes to complete the primality test using multithreaded LLR.

For more information, please see the Official Announcement.

On 2 September 2019, 03:39:59 UTC, PrimeGrid's Generalized Cullen/Woodall Prime Search found the largest known Generalized Cullen prime:

2805222·25^2805222+1

The prime is 3,921,539 digits long and enters Chris Caldwell's The Largest Known Primes Database ranked 1^st for Generalized Cullen primes and 21^st overall.

The discovery was made by Tom Greer of the United States using an Intel(R) Core(TM) i9-9900X CPU @ 3.50GHz with 32GB RAM, running Microsoft Windows 10 Professional x64 Edition. This computer took about 3 hours and 23 minutes to complete the primality test using multithreaded LLR. Tom is a member of the Sicituradastra team. For more information, please see the Official Announcement.

Other significant primes

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

3·2^7033641+1 (321): official announcement | 321

3·2^6090515-1 (321): official announcement | 321

3·2^5082306+1 (321): official announcement | 321

3·2^4235414-1 (321): official announcement | 321

3·2^2291610+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

27·2^3855094-1 (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

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

427194·113⁴²⁷¹⁹⁴+1 (GC): official announcement | Generalized Cullen

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

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

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

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

2877652⁵²⁴²⁸⁸+1 (GFN): official announcement | Generalized Fermat Prime

2788032⁵²⁴²⁸⁸+1 (GFN): official announcement | Generalized Fermat Prime

2733014⁵²⁴²⁸⁸+1 (GFN): official announcement | Generalized Fermat Prime

2312092⁵²⁴²⁸⁸+1 (GFN): official announcement | Generalized Fermat Prime

2061748⁵²⁴²⁸⁸+1 (GFN): official announcement | Generalized Fermat Prime

1880370⁵²⁴²⁸⁸+1 (GFN): official announcement | Generalized Fermat Prime

475856⁵²⁴²⁸⁸+1 (GFN): official announcement | Generalized Fermat Prime

356926⁵²⁴²⁸⁸+1 (GFN): official announcement | Generalized Fermat Prime

341112⁵²⁴²⁸⁸+1 (GFN): official announcement | Generalized Fermat Prime

75898⁵²⁴²⁸⁸+1 (GFN): official announcement | Generalized Fermat Prime

9125820²⁶²¹⁴⁴+1 (GFN): official announcement | Generalized Fermat Prime

8883864²⁶²¹⁴⁴+1 (GFN): official announcement | Generalized Fermat Prime

8521794²⁶²¹⁴⁴+1 (GFN): official announcement | Generalized Fermat Prime

6291332²⁶²¹⁴⁴+1 (GFN): official announcement | Generalized Fermat Prime

6287774²⁶²¹⁴⁴+1 (GFN): official announcement | Generalized Fermat Prime

5828034²⁶²¹⁴⁴+1 (GFN): official announcement | Generalized Fermat Prime

5205422²⁶²¹⁴⁴+1 (GFN): official announcement | Generalized Fermat Prime

5152128²⁶²¹⁴⁴+1 (GFN): official announcement | Generalized Fermat Prime

4489246²⁶²¹⁴⁴+1 (GFN): official announcement | Generalized Fermat Prime

4246258²⁶²¹⁴⁴+1 (GFN): official announcement | Generalized Fermat Prime

3933508²⁶²¹⁴⁴+1 (GFN): official announcement | Generalized Fermat Prime

3853792²⁶²¹⁴⁴+1 (GFN): official announcement | Generalized Fermat Prime

3673932²⁶²¹⁴⁴+1 (GFN): official announcement | Generalized Fermat Prime

3596074²⁶²¹⁴⁴+1 (GFN): official announcement | Generalized Fermat Prime

3547726²⁶²¹⁴⁴+1 (GFN): official announcement | Generalized Fermat Prime

3060772²⁶²¹⁴⁴+1 (GFN): official announcement | Generalized Fermat Prime

2676404²⁶²¹⁴⁴+1 (GFN): official announcement | Generalized Fermat Prime

2611204²⁶²¹⁴⁴+1 (GFN): official announcement | Generalized Fermat Prime

2514168²⁶²¹⁴⁴+1 (GFN): official announcement | Generalized Fermat Prime

2042774²⁶²¹⁴⁴+1 (GFN): official announcement | Generalized Fermat Prime

1828858²⁶²¹⁴⁴+1 (GFN): official announcement | Generalized Fermat Prime

1615588²⁶²¹⁴⁴+1 (GFN): official announcement | Generalized Fermat Prime

1488256²⁶²¹⁴⁴+1 (GFN): official announcement | Generalized Fermat Prime

1415198²⁶²¹⁴⁴+1 (GFN): official announcement | Generalized Fermat Prime

773620²⁶²¹⁴⁴+1 (GFN): official announcement | Generalized Fermat Prime

676754²⁶²¹⁴⁴+1 (GFN): official announcement | Generalized Fermat Prime

525094²⁶²¹⁴⁴+1 (GFN): official announcement | Generalized Fermat Prime

361658²⁶²¹⁴⁴+1 (GFN): official announcement | Generalized Fermat Prime

145310²⁶²¹⁴⁴+1 (GFN): official announcement | Generalized Fermat Prime

40734²⁶²¹⁴⁴+1 (GFN): official announcement | Generalized Fermat Prime

47179704¹³¹⁰⁷²+1 (GFN): official announcement | Generalized Fermat Prime

47090246¹³¹⁰⁷²+1 (GFN): official announcement | Generalized Fermat Prime

46776558¹³¹⁰⁷²+1 (GFN): official announcement | Generalized Fermat Prime

46736070¹³¹⁰⁷²+1 (GFN): official announcement | Generalized Fermat Prime

46730280¹³¹⁰⁷²+1 (GFN): official announcement | Generalized Fermat Prime

46413358¹³¹⁰⁷²+1 (GFN): official announcement | Generalized Fermat Prime

46385310¹³¹⁰⁷²+1 (GFN): official announcement | Generalized Fermat Prime

46371508¹³¹⁰⁷²+1 (GFN): official announcement | Generalized Fermat Prime

46077492¹³¹⁰⁷²+1 (GFN): official announcement | Generalized Fermat Prime

45570624¹³¹⁰⁷²+1 (GFN): official announcement | Generalized Fermat Prime

45315256¹³¹⁰⁷²+1 (GFN): official announcement | Generalized Fermat Prime

44919410¹³¹⁰⁷²+1 (GFN): official announcement | Generalized Fermat Prime

44438760¹³¹⁰⁷²+1 (GFN): official announcement | Generalized Fermat Prime

44330870¹³¹⁰⁷²+1 (GFN): official announcement | Generalized Fermat Prime

44085096¹³¹⁰⁷²+1 (GFN): official announcement | Generalized Fermat Prime

44049878¹³¹⁰⁷²+1 (GFN): official announcement | Generalized Fermat Prime

43165206¹³¹⁰⁷²+1 (GFN): official announcement | Generalized Fermat Prime

43163894¹³¹⁰⁷²+1 (GFN): official announcement | Generalized Fermat Prime

42654182¹³¹⁰⁷²+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

373·2^3404702+1 (MEGA): official announcement | Mega Prime

303·2^3391977+1 (MEGA): official announcement | Mega Prime

369·2^3365614+1 (MEGA): official announcement | Mega Prime

393·2^3349525+1 (MEGA): official announcement | Mega Prime

113·2^3437145+1 (MEGA): official announcement | Mega Prime

159·2^3425766+1 (MEGA): official announcement | Mega Prime

245·2^3411973+1 (MEGA): official announcement | Mega Prime

177·2^3411847+1 (MEGA): official announcement | Mega Prime

35·2^3587843+1 (MEGA): official announcement | Mega Prime

35·2^3570777+1 (MEGA): official announcement | Mega Prime

33·2^3570132+1 (MEGA): official announcement | Mega Prime

93·2^3544744+1 (MEGA): official announcement | Mega Prime

87·2^3496188+1 (MEGA): official announcement | Mega Prime

51·2^3490971+1 (MEGA): official announcement | Mega Prime

81·2^3352924+1 (MEGA): official announcement | Mega Prime

1155·2^3455254+1 (PPS-Mega): official announcement | Mega Prime

1065·2^3447906+1 (PPS-Mega): official announcement | Mega Prime

1155·2^3446253+1 (PPS-Mega): official announcement | Mega Prime

943·2^3442990+1 (PPS-Mega): official announcement | Mega Prime

943·2^3440196+1 (PPS-Mega): official announcement | Mega Prime

543·2^3438810+1 (PPS-Mega): official announcement | Mega Prime

625·2^3438572+1 (PPS-Mega): official announcement | Mega Prime

1147·2^3435970+1 (PPS-Mega): official announcement | Mega Prime

911·2^3432643+1 (PPS-Mega): official announcement | Mega Prime

1127·2^3427219+1 (PPS-Mega): official announcement | Mega Prime

1119·2^3422189+1 (PPS-Mega): official announcement | Mega Prime

1005·2^3420846+1 (PPS-Mega): official announcement | Mega Prime

975·2^3419230+1 (PPS-Mega): official announcement | Mega Prime

999·2^3418885+1 (PPS-Mega): official announcement | Mega Prime

907·2^3417890+1 (PPS-Mega): official announcement | Mega Prime

953·2^3405729+1 (PPS-Mega): official announcement | Mega Prime

833·2^3403765+1 (PPS-Mega): official announcement | Mega Prime

1167·2^3399748+1 (PPS-Mega): official announcement | Mega Prime

611·2^3398273+1 (PPS-Mega): official announcement | Mega Prime

609·2^3392301+1 (PPS-Mega): official announcement | Mega Prime

1049·2^3395647+1 (PPS-Mega): official announcement | Mega Prime

555·2^3393389+1 (PPS-Mega): official announcement | Mega Prime

805·2^3391818+1 (PPS-Mega): official announcement | Mega Prime

663·2^3390469+1 (PPS-Mega): official announcement | Mega Prime

621·2^3378148+1 (PPS-Mega): official announcement | Mega Prime

1093·2^3378000+1 (PPS-Mega): official announcement | Mega Prime

861·2^3377601+1 (PPS-Mega): official announcement | Mega Prime

677·2^3369115+1 (PPS-Mega): official announcement | Mega Prime

715·2^3368210+1 (PPS-Mega): official announcement | Mega Prime

617·2^3368119+1 (PPS-Mega): official announcement | Mega Prime

777·2^3367372+1 (PPS-Mega): official announcement | Mega Prime

533·2^3362857+1 (PPS-Mega): official announcement | Mega Prime

619·2^3362814+1 (PPS-Mega): official announcement | Mega Prime

1183·2^3353058+1 (PPS-Mega): official announcement | Mega Prime

543·2^3351686+1 (PPS-Mega): official announcement | Mega Prime

733·2^3340464+1 (PPS-Mega): official announcement | Mega Prime

651·2^3337101+1 (PPS-Mega): official announcement | Mega Prime

849·2^3335669+1 (PPS-Mega): official announcement | Mega Prime

611·2^3334875+1 (PPS-Mega): official announcement | Mega Prime

673·2^3330436+1 (PPS-Mega): official announcement | Mega Prime

655·2^3327518+1 (PPS-Mega): official announcement | Mega Prime

659·2^3327371+1 (PPS-Mega): official announcement | Mega Prime

821·2^3327003+1 (PPS-Mega): official announcement | Mega Prime

555·2^3325925+1 (PPS-Mega): official announcement | Mega Prime

791·2^3323995+1 (PPS-Mega): official announcement | Mega Prime

597·2^3322871+1 (PPS-Mega): official announcement | Mega Prime

415·2^3559614+1 (PPS-Mega): official announcement | Mega Prime

465·2^3536871+1 (PPS-Mega): official announcement | Mega Prime

447·2^3533656+1 (PPS-Mega): official announcement | Mega Prime

495·2^3484656+1 (PPS-Mega): official announcement | Mega Prime

491·2^3473837+1 (PPS-Mega): official announcement | Mega Prime

453·2^3461688+1 (PPS-Mega): official announcement | Mega Prime

479·2^3411975+1 (PPS-Mega): official announcement | Mega Prime

453·2^3387048+1 (PPS-Mega): official announcement | Mega Prime

403·2^3334410+1 (PPS-Mega): official announcement | Mega Prime

309·2^3577339+1 (PPS-Mega): official announcement | Mega Prime

381·2^3563676+1 (PPS-Mega): official announcement | Mega Prime

351·2^3545752+1 (PPS-Mega): official announcement | Mega Prime

345·2^3532957+1 (PPS-Mega): official announcement | Mega Prime

329·2^3518451+1 (PPS-Mega): official announcement | Mega Prime

323·2^3482789+1 (PPS-Mega): official announcement | Mega Prime

189·2^3596375+1 (PPS-Mega): official announcement | Mega Prime

387·2^3322763+1 (PPS-Mega): official announcement | Mega Prime

275·2^3585539+1 (PPS-Mega): official announcement | Mega Prime

251·2^3574535+1 (PPS-Mega): official announcement | Mega Prime

191·2^3548117+1 (PPS-Mega): official announcement | Mega Prime

141·2^3529287+1 (PPS-Mega): official announcement | Mega Prime

135·2^3518338+1 (PPS-Mega): official announcement | Mega Prime

249·2^3486411+1 (PPS-Mega): official announcement | Mega Prime

195·2^3486379+1 (PPS-Mega): official announcement | Mega Prime

197·2^3477399+1 (PPS-Mega): official announcement | Mega Prime

255·2^3395661+1 (PPS-Mega): official announcement | Mega Prime

179·2^3371145+1 (PPS-Mega): official announcement | Mega Prime

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

129·2^3328805+1 (PPS-Mega): official announcement | Mega Prime

7·2^5775996+1 (PPS): official announcement | Mega Prime

9·2^3497442+1 (PPS): official announcement | Mega Prime

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

25·2^2141884+1 (PPS): official announcement | Fermat Divisor

183·2^1747660+1 (PPS): official announcement | Fermat Divisor

131·2^1494099+1 (PPS): official announcement | Fermat Divisor

329·2^1246017+1 (PPS): official announcement | Fermat Divisor

2145·2^1099064+1 (PPS): official announcement | Fermat Divisor

1705·2⁹⁰⁶¹¹⁰+1 (PPS): official announcement | Fermat Divisor

659·2⁶¹⁷⁸¹⁵+1 (PPS): official announcement | Fermat Divisor

519·2⁵⁶⁷²³⁵+1 (PPS): official announcement | Fermat Divisor

651·2⁴⁷⁶⁶³²+1 (PPS): official announcement | Fermat Divisor

7905·2³⁵²²⁸¹+1 (PPS): official announcement | Fermat Divisor

4479·2²²⁶⁶¹⁸+1 (PPS): official announcement | Fermat Divisor

3771·2²²¹⁶⁷⁶+1 (PPS): official announcement | Fermat Divisor

7333·2¹³⁸⁵⁶⁰+1 (PPS): official announcement | Fermat Divisor

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 | SGS

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

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

322498·5^2800819-1 (SR5): official announcement | k=322498 eliminated

88444·5^2799269-1 (SR5): official announcement | k=88444 eliminated

138514·5^2771922+1 (SR5): official announcement | k=138514 eliminated

194368·5^2638045-1 (SR5): official announcement | k=194368 eliminated

66916·5^2628609-1 (SR5): official announcement | k=66916 eliminated

81556·5^2539960+1 (SR5): official announcement | k=81556 eliminated

327926·5^2542838-1 (SR5): official announcement | k=327926 eliminated

301562·5^2408646-1 (SR5): official announcement | k=301562 eliminated

171362·5^2400996-1 (SR5): official announcement | k=171362 eliminated

180062·5^2249192-1 (SR5): official announcement | k=180062 eliminated

53546·5^2216664-1 (SR5): official announcement | k=53546 eliminated

296024·5^2185270-1 (SR5): official announcement | k=296024 eliminated

92158·5^2145024+1 (SR5): official announcement | k=92158 eliminated

77072·5^2139921+1 (SR5): official announcement | k=77072 eliminated

306398·5^2112410-1 (SR5): official announcement | k=306398 eliminated

154222·5^2091432+1 (SR5): official announcement | k=154222 eliminated

100186·5^2079747-1 (SR5): official announcement | k=100186 eliminated

144052·5^2018290+1 (SR5): official announcement | k=144052 eliminated

109208·5^1816285+1 (SR5): official announcement | k=109208 eliminated

325918·5^1803339+1 (SR5): official announcement | k=325918 eliminated

133778·5^1785689+1 (SR5): official announcement | k=133778 eliminated

24032·5^1768249+1 (SR5): official announcement | k=24032 eliminated

138172·5^1714207-1 (SR5): official announcement | k=138172 eliminated

22478·5^1675150-1 (SR5): official announcement | k=22478 eliminated

326834·5^1634978-1 (SR5): official announcement | k=326834 eliminated

207394·5^1612573-1 (SR5): official announcement | k=207394 eliminated

104944·5^1610735-1 (SR5): official announcement | k=104944 eliminated

330286·5^1584399-1 (SR5): official announcement | k=330286 eliminated

22934·5^1536762-1 (SR5): official announcement | k=22934 eliminated

178658·5^1525224-1 (SR5): official announcement | k=178658 eliminated

59912·5^1500861+1 (SR5): official announcement | k=59912 eliminated

37292·5^1487989+1 (SR5): official announcement | k=37292 eliminated

173198·5^1457792-1 (SR5): official announcement | k=173198 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

398023·2^6418059-1 (TRP): official announcement | k=398023 eliminated

252191·2^5497878-1 (TRP): official announcement | k=252191 eliminated

353159·2^4331116-1 (TRP): official announcement | k=353159 eliminated

141941·2^4299438-1 (TRP): official announcement | k=141941 eliminated

415267·2^3771929-1 (TRP): official announcement | k=415267 eliminated

123547·2^3804809-1 (TRP): official announcement | k=123547 eliminated

65531·2^3629342-1 (TRP): official announcement | k=65531 eliminated

428639·2^3506452-1 (TRP): official announcement | k=428639 eliminated

191249·2^3417696-1 (TRP): official announcement | k=191249 eliminated

162941·2⁹⁹³⁷¹⁸-1 (TRP): official announcement | k=162941 eliminated

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

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

GFN-524288 Mega Prime!
On 24 December 2019, 08:20:15 UTC, PrimeGrid's Generalized Fermat Prime Search found the Mega Prime:

3214654^524288+1

The prime is 3,411,613 digits long and enters Chris Caldwell's The Largest Known Primes Database ranked 3rd for Generalized Fermat primes and 30th overall.

The discovery was made by Alen Kecic (Freezing)of Germany using a GeForce GTX 1660 Ti in an Intel(R) Core(TM) i7-7820X CPU @ 3.60GHz with 32GB RAM, running Microsoft Windows 10 Professional x64 Edition. This GPU took about 51 minutes to complete the probable prime (PRP) test using GeneferOCL5. Alen is a member of the SETI.Germany Team.

The PRP was verified on 24 December 2019, 10:12:18 UTC by John Holmes (John J. Holmes) of the United States using a GeForce GTX 970 in an Intel(R) Core(TM) i7-4790 CPU @ 3.60GHz with 16GB RAM, running Microsoft Windows 10 Professional x64 Edition. This computer took about 2 hours, 4 minutes to complete the probable prime (PRP) test using GeneferOCL3.

The PRP was confirmed prime by an Intel(R) Core(TM) i7-7700K CPU @ 4.20GHz with 32GB RAM, running Microsoft Windows 10 Professional x64 Edition. This computer took about 1 day, 1 hour, 45 minutes to complete the primality test using multithreaded LLR.

For more details, please see the official announcement.

13 Jan 2020 | 16:29:44 UTC · Comment

ESP Mega Prime!
On 24 December 2019, 01:28:13 UTC, PrimeGrid's Extended Sierpinski Problem found the Mega Prime:

99739*2^14019102+1

The prime is 4,220,176 digits long and will enter Chris Caldwell's The Largest Known Primes Database ranked 20th overall. This find eliminates k=99739; 9 k's remain in the Extended Sierpinski Problem.

The discovery was made by Brian D. Niegocki (Penguin) 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 14 hours, 14 minutes to complete the primality test using LLR. Brian is a member of the Antarctic Crunchers team.

The prime was verified on 24 December 2019, 04:37:31 UTC by Pavel Atnashev (Pavel Atnashev) of Russia using an Intel(R) Xeon(R) E5-2680 v2 @ 2.80GHz with 8GB RAM, running Linux. This computer took about 4 hours, 6 minutes to complete the primality test using LLR. Pavel is a member of the Ural Federal University team.

For more details, please see the official announcement. 13 Jan 2020 | 12:50:37 UTC · Comment

And Another GFN-262144 Find!!
On 5 December 2019, 08:39:29 UTC, PrimeGrid's Generalized Fermat Prime Search found the Mega Prime:

9125820^262144+1

The prime is 1,824,594 digits long and enters Chris Caldwell's The Largest Known Primes Database ranked 14th for Generalized Fermat primes and 82nd overall.

The discovery was made by Yoshimitsu Kato (yoshi) of Japan using a GeForce GTX 1660 Ti in an Intel(R) Core(TM) i7-6700 CPU @ 3.40GHz with 16GB RAM, running Microsoft Windows 10. This GPU took about 22 minutes to complete the probable prime (PRP) test using Genefer OCL2. Yoshimitsu Kato is a member of Team JPN.

The prime was verified on 5 December 2019, 08:41:59 UTC by Igor Keller (IKI) of France using a GeForce GTX 1080 in an Intel(R) Core(TM) i5-4460 CPU @ 3.20GHz with 16GB RAM, running Microsoft Windows 8.1. This GPU took about 26 minutes to complete the probable prime (PRP) test using Genefer OCL2. Igor Keller is a member of the Gridcoin team.

The PRP was confirmed prime by an Intel(R) Core(TM) i7-6700 CPU @ 3.40GHz with 16GB RAM, running Microsoft Windows 10 Professional x64 Edition. This computer took about 16 hours, 30 minutes to complete the primality test using multithreaded LLR.

For more details, please see the official announcement.

24 Dec 2019 | 16:36:57 UTC · Comment

GFN-262144 Find!
On 6 November 2019, 11:59:08 UTC, PrimeGrid's Generalized Fermat Prime Search found the Mega Prime:

8883864^262144+1

The prime is 1,821,535 digits long and enters Chris Caldwell's The Largest Known Primes Database ranked 14th for Generalized Fermat primes and 80th overall.

The discovery was made by Rod Skinner (rjs5) of the United States using a GeForce RTX 2080 Ti in an Intel(R) Core(TM) i9-9980XE CPU @ 3.00GHz with 63GB RAM, running Linux Fedora. This GPU took about 8 minutes to complete the probable prime (PRP) test using Genefer OCL2. Rod Skinner is a member of Intel Corporation team.

The prime was verified on 6 November 2019, 14:33:32 UTC by Tom Greer (tng*) of the United States using a GeForce RTX 2070 SUPER in an Intel(R) Core(TM) i9-9900X CPU @ 3.50GHz with 32GB RAM, running Microsoft Windows 10. This GPU took about 13 minutes to complete the probable prime (PRP) test using Genefer OCL2. Tom Greer is a member of the Sicituradastra. team.

The PRP was confirmed prime by an Intel(R) Xeon(R) E3-1240 v6 CPU @ 3.70GHz with 32 GB RAM, running Debian Linux. This computer took about 17 hours 30 minutes to complete the primality test using LLR.

For more details, please see the official announcement. 24 Dec 2019 | 16:21:30 UTC · Comment

First Ever AP27 Discovered!
The search is over!

After a three year effort, the first ever AP27 (Arithmetic Progression of 27 primes) has been found:

224584605939537911+81292139*23#*n for n=0..26

The AP27 was found by Rob Gahan (Robish) of Ireland. The discovery was made on an NVIDIA GeForce GTX 1660 Ti GPU on an Intel(R) Core(TM) i5-9400 CPU @ 2.90GHz running Microsoft Windows 10 Professional x64 Edition. It took about 22 minutes and 34 seconds to process the task. Rob is a member of the Storm team.

Congratulations to everyone who participated in the AP27 search! It has been a very challenging and rewarding project.

For more information, please see the official announcement or our AP27 forums. 30 Sep 2019 | 20:41:09 UTC · Comment

... more

News is available as an RSS feed RSS

Newly reported primes

(Mega-primes are in bold.)

3591*2^1554003+1 (Darryl); 154427752^32768+1 (Walleye24); 4856365372257*2^1290000-1 (A1ex01); 7649*2^1553995+1 (Homefarm); 4857991827297*2^1290000-1 (Krzysiak_PL_GDA); 2435*2^3326969+1 (Randall J. Scalise); 4857905919975*2^1290000-1 (Honza); 154283086^32768+1 (SEARCHER); 4663*2^1553932+1 (Anthony Ayiomamitis); 9921*2^1553952+1 (composite); 154226532^32768+1 (Johny); 1749*2^1553890+1 (Homefarm); 595*2^2833406+1 (spnorton); 3959*2^1553833+1 (Anthony Ayiomamitis); 154114000^32768+1 (SEARCHER); 4852191577917*2^1290000-1 (bparsonnet); 4851101962005*2^1290000-1 (Honza); 154013032^32768+1 (Johny); 153972200^32768+1 (Johny); 71830642^65536+1 (SlangNRox)

Top Crunchers:

Top participants by RAC

tng*	30125452.8
walli	12224488.17
yank	11534296.71
Viktor Svantner	11011836.69
vanos0512	9061666.9
Grzegorz Roman Granowski	8330108.47
Nick	7013354.23
[AF>Amis des Lapins] Jean-Luc	6789196.69
Miklos M.	6699654.08
Kellen	6687368.81

Top teams by RAC

Sicituradastra.	43362666.7
Aggie The Pew	34551263
SETI.Germany	26807993.64
Czech National Team	24085887.44
Storm	20846558.47
Antarctic Crunchers	17577649.15
The Scottish Boinc Team	17317635.08
L'Alliance Francophone	14640418.91
BOINC@Taiwan	11120251.48
Team 2ch	9512855.41

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