Largest known prime number


The largest known prime number is, a number which has 24,862,048 digits when written in base 10. It was found via a computer volunteered by Patrick Laroche of the Great Internet Mersenne Prime Search in 2018.
A prime number is a positive integer with no divisors other than 1 and itself, excluding 1. Euclid recorded a proof that there is no largest prime number, and many mathematicians and hobbyists continue to search for large prime numbers.
Many of the largest known primes are Mersenne primes, numbers that are one less than a power of two., the eight largest known primes are Mersenne primes. The last seventeen record primes were Mersenne primes. The binary representation of any Mersenne prime is composed of all 1's, since the binary form of 2k - 1 is simply k 1's.
The fast Fourier transform implementation of the Lucas–Lehmer primality test for Mersenne numbers is fast compared to other known primality tests for other kinds of numbers.

Current record

The record is currently held by with 24,862,048 digits, found by GIMPS in December 2018. Its value is:
The first and last 120 digits are shown above.

Prizes

The Great Internet Mersenne Prime Search currently offers a US$3,000 research discovery award for participants who download and run their free software and whose computer discovers a new Mersenne prime having fewer than 100 million digits.
There are several prizes offered by the Electronic Frontier Foundation for record primes. GIMPS is also coordinating its long-range search efforts for primes of 100 million digits and larger and will split the Electronic Frontier Foundation's US$150,000 prize with a winning participant.
The record passed one million digits in 1999, earning a US$50,000 prize. In 2008, the record passed ten million digits, earning a US$100,000 prize and a Cooperative Computing Award from the Electronic Frontier Foundation. Time called it the 29th top invention of 2008. Both the US$50,000 and the US$100,000 prizes were won by participation in GIMPS. Additional prizes are being offered for the first prime number found with at least one hundred million digits and the first with at least one billion digits.

History of largest known prime numbers

The following table lists the progression of the largest known prime number in ascending order. Here is the Mersenne number with exponent n. The longest record-holder known was, which was the largest known prime for 144 years. No records are known before 1456.
NumberDecimal expansion
DigitsYear foundDiscoverer
M138,19141456Anonymous
M17131,07161588Pietro Cataldi
M19524,28761588Pietro Cataldi
6,700,41771732Leonhard Euler
Euler did not explicitly publish the primality of 6,700,417, but the techniques he had used to factorise 232 + 1 meant that he had already done most of the work needed to prove this, and some experts believe he knew of it.
M312,147,483,647101772Leonhard Euler
67,280,421,310,721141855Thomas Clausen
M127170,141,183,460,469,231,731,687,303,715,884,105,727391876Édouard Lucas
20,988,936,657,440,586,486,151,264,256,610,222,593,863,921441951Aimé Ferrier with a mechanical calculator; the largest record not set by computer.
180×2+15210644015679228794060694325390955853335898483908056458352
183851018372555735221		791951J. C. P. Miller & D. J. Wheeler
Using Cambridge's EDSAC computer
M5216864797660130609714981900799081393217269435300143305409394
4634591855431833976560521225596406614545549772963113914808
58037121987999716643812574028291115057151		1571952
M60753113799281676709868958820655246862732959311772703192319944
4138200403559860852242739162502265229285668889329486246501
01534657933765270723940951997876658735194383127083539321903
1728127		1831952
M127910407932194664399081925240327364085538615262247266704805319
112350403608059673360298012239441732324184842421613954281007
79138356624832346490813990660567732076292412950938922034577
318334966158355047295942054768981121169367714754847886696250
138443826029173234888531116082853841658502825560466622483189
091880184706822220314052102669843548873295802887805086973618
6900714720710555703168729087		3861952
M220314759799152141802350848986227373817363120661453331697751477712
164785702978780789493774073370493892893827485075314964804772
8126483876025919181446336533026954049696120111343015690239609
398909022625932693502528140961498349938822283144859860183431
853623092377264139020949023183644689960821079548296376309423
6630945410832793769905399982457186322944729636418890623372171
723742105636440368218459649632948538696905872650486914434637
4575072804418236768135178520993486608471725794084223166780976
7022401199028017047489448742692474210882353680848507250224051
9452587542875349976558572670229633962575212637477897785501552
646522609988869914013540483809865681250419497686697771007		6641952
M2281446087557183758429571151706402101809886208632412859901111991219963404685792
82047336911254526900398902615324593112431670239575870569367936479090349746
114707106525419335393812497822630794731241079887486904007027932842881031175
484410809487825249486676096958699812898264587759602897917153696250306842
961733170218475032458300917183210491605015762888660637214550170222592512522
40768296054271735739648129952505694124807207384768552936816667128448311908
776206067866638621902401185707368319018864792258104147140789353865624979681
787291276295949244119609613867139462798992750069549171397587960612238033935
373810346664944029510520590479686932553886479304409251041868170096401717641
33172418132836351		6871952
M321725911708601320262777624676792244153094181888755312542730397492316187401926658
63620862012095168004834065506952417331941774416895092388070174103777095975120
423130666240829163535179523111861548622656045476911275958487756105687579311910
17711408826252153849035830401185072116424747461823031471398340229288074545677
907941037288235820705892351068433882986888616658650280927692080339605869308
79050040950370987590211901837199162099400256893511313654882973911265679730324
19865172501164127035097054277734779723498216764434466683831193225400996489940
5179024162405651905448369080961606162574304236172186333941585242643120873726
6591962061753535748892894599629195183082621860853400937932839420261866586142
50325145077309627423537682293864940712770084607712421182308080413929808705750
47138252645714483793711250320818261265666490842516994539518877896136502484057
3937859459944433523118828012366040626246860921215034993758478229223714433962
8858485938215738821232393687046160677362909315071		9691957
M44232855425422282796139015635661021640083261642386447028891992474566022844003906
00653875954571505539843239754513915896150297878399377056071435169747221107988
7911982009884775313392142827720160590099045866862549890848157354224804090223
44297588352526004383890632616124076317387416881148592486188361873904175783145
6960169195743907655982801885990355784485910776836771755204340742877265780062
66759615970759521327828555662781678385691581844436444812511562428136742490459
363212810180276096088111401003377570363545725120924073646921576797146199387619
29656030268026179011813292501232304644443862230887792460937377301248168167242
44936744744885377701557830068808526481615130671448147902883666640622572746652
757871273746492310963750011709018907862633246195787957314256938050730561196775
8033808433338198750090296883193591309526982131114132239335649017848872898228
81562826008138312961436638459454311440437538215428712777456064478585641592133
2844358020642271469491309176271644704168967807009677359042980890961675045292
725800084350034483162829708990272864998199438764723457427626372969484830475
09171741861811306885187927486226122933413689280566343844666463265724761672756
60839105650528975713899320211121495795311427946254553305387067821067601768750
97786610046001460213840844802122505368905479374200309572209673295475072171811
5531871310231057902608580607		1,3321961
M96892,9171963
M99412,9931963
M112133,3761963
M199376,0021971
M217016,5331978
M232096,9871979
M4449713,3951979
M8624325,9621982
M13204939,7511983
M21609165,0501985
391581×2216193−165,0871989A group, "Amdahl Six": John Brown, Landon Curt Noll, B. K. Parady, Gene Ward Smith, Joel F. Smith, Sergio E. Zarantonello.
Largest non-Mersenne prime that was the largest known prime when it was discovered.
M756839227,8321992
M859433258,7161994
M1257787378,6321996
M1398269420,9211996GIMPS, Joel Armengaud
M2976221895,9321997GIMPS, Gordon Spence
M3021377909,5261998GIMPS, Roland Clarkson
M69725932,098,9601999GIMPS, Nayan Hajratwala
M134669174,053,9462001GIMPS, Michael Cameron
M209960116,320,4302003GIMPS, Michael Shafer
M240365837,235,7332004GIMPS, Josh Findley
M259649517,816,2302005GIMPS, Martin Nowak
M304024579,152,0522005GIMPS, University of Central Missouri professors Curtis Cooper and Steven Boone
M325826579,808,3582006GIMPS, Curtis Cooper and Steven Boone
M4311260912,978,1892008GIMPS, Edson Smith
M5788516117,425,1702013GIMPS, Curtis Cooper
M7420728122,338,6182016GIMPS, Curtis Cooper
M7723291723,249,4252017GIMPS, Jonathan Pace
M8258993324,862,0482018GIMPS, Patrick Laroche

GIMPS found the fifteen latest records on ordinary computers operated by participants around the world.

The twenty largest known prime numbers

A list of the 5,000 largest known primes is maintained by Chris K. Caldwell, of which the twenty largest are listed below.
RankNumberDiscoveredDigitsRef
1282589933 − 12018-12-0724,862,048
2277232917 − 12017-12-2623,249,425
3274207281 − 12016-01-0722,338,618
4257885161 − 12013-01-2517,425,170
5243112609 − 12008-08-2312,978,189
6242643801 − 12009-06-0412,837,064
7237156667 − 12008-09-0611,185,272
8232582657 − 12006-09-049,808,358
910223 × 231172165 + 12016-10-319,383,761
10230402457 − 12005-12-159,152,052
11225964951 − 12005-02-187,816,230
12224036583 − 12004-05-157,235,733
13220996011 − 12003-11-176,320,430
1410590941048576 + 12018-10-316,317,602
159194441048576 + 12017-08-296,253,210
16168451 × 219375200 + 12017-09-175,832,522
171234471048576 − 123447524288 + 12017-02-235,338,805
187 × 66772401 + 12019-09-095,269,954
198508301 × 217016603 − 12018-03-215,122,515
206962 × 312863120 − 12020-02-294,269,952