As of October 22, 2009, two awards have been given.
Presently, the largest known prime number is the over-twelve-million-digit prime 243112609-1, a.k.a. M(43112609) or the 47th known Mersenne prime. This prime was discovered by Edson Smith, using software written by George Woltman and the distributed computing technology and services of Scott Kurowski's company, Entropia.com, Inc., via GIMPS - a cooperative computing group, officially known as the Great Internet Mersenne Prime Search.
Selected pre-award timeline
- 26 Dec 1998
According to the GIMPS status page, all Mersenne numbers with less than 1,000,000 decimal digits have been tested once. Only 37 Mersenne primes have been discovered throughout history. Most, but not all of sub-million digit Mersenne numbers have been double tested. There is a slight chance that a sub-million digit Mersenne prime was missed.
- 27 Jan 1998
Clarkson, Woltman, Kurowski & GIMPS discover the 909526 digit prime M3021377 (23021377-1) using a collection of computers across the Internet.
- 1 Apr 1992
The first 100,000+ digit prime: M756839 (2756839-1) is discovered by Slowinski and Gage.
- 4 Apr 1979
The first 10,000+ digit prime M44497 (244497-1) is discovered by Nelson and Slowinski.
- 11 Mar 1961
The first 1,000+ digit prime M4423 (24423-1) is discovered by Hurwitz and Selfridge.
This record surpassed the 969 digit prime M3217 (23217-1) which was discovered by Riesel in 1957 on the using the BESK computer.
- 30 Jan 1952
The first 100+ digit prime M521 (2521-1) is discovered by Robinson and Lehmerusing the SWAC computer.
This record surpassed the 79 digit prime 180*(M127)2+1 (180 * (2521-1)2 + 1), the first ``largest known prime'' that was discovered on a digital computer (by Miller & Wheeler using the EDSAC1 in 1951).
The first 10+ digit prime M59/179551 (259-1 / 179551) is discovered by Landryusing brute force trial division.
This record surpassed a 10 digit prime M31 (231-1, also proven also using brute force trial division) by Euler in 1772.