Small Mersenne Prime Factors (page 2713/5040)

Small Mersenne Prime Factors
Prime numbers of the form M_p= 2^p − 1 are called Mersenne primes. For M_p to be prime, p must also be prime.
Any factor q of a Mersenne number 2^p − 1 must be of the form 2kp + 1, where integer k ≥ 0. Furthermore, q must be 1 or 7 mod 8.

Exponent	Prime Factor	Digits	Year
182493797	1459950377	10	~1997
182502839	365005679	9	~1995
182504411	365008823	9	~1995
182513459	365026919	9	~1996
182515049	1460120393	10	~1997
182515271	365030543	9	~1996
182516963	365033927	9	~1996
182518631	365037263	9	~1996
182521819	3285392743	10	~1998
182525963	365051927	9	~1996
182526563	365053127	9	~1996
182529283	55488902033	11	~2001
182530643	365061287	9	~1996
182531579	365063159	9	~1996
182539223	365078447	9	~1996
182547737	2555668319	10	~1998
182554343	365108687	9	~1996
182554583	365109167	9	~1996
182559551	365119103	9	~1996
182562277	1095373663	10	~1997
182562323	365124647	9	~1996
182563103	365126207	9	~1996
182568983	365137967	9	~1996
182574911	1460599289	10	~1997
182575697	1095454183	10	~1997

Exponent	Prime Factor	Digits	Year
182579879	365159759	9	~1996
182582633	1095495799	10	~1997
182595131	365190263	9	~1996
182597537	1095585223	10	~1997
182604671	1460837369	10	~1997
182607671	365215343	9	~1996
182614589	1460916713	10	~1997
182621171	365242343	9	~1996
182623433	5843949857	10	~1998
182623873	1095743239	10	~1997
182624501	1095747007	10	~1997
182626211	365252423	9	~1996
182626991	365253983	9	~1996
182635223	365270447	9	~1996
182635763	365271527	9	~1996
182636281	1095817687	10	~1997
182642171	365284343	9	~1996
182645891	365291783	9	~1996
182656163	365312327	9	~1996
182659187	4383820489	10	~1998
182662283	365324567	9	~1996
182662919	365325839	9	~1996
182664721	13151859913	11	~1999
182667623	365335247	9	~1996
182672159	365344319	9	~1996

Exponent	Prime Factor	Digits	Year
182673251	365346503	9	~1996
182673671	365347343	9	~1996
182686499	365372999	9	~1996
182687119	3288368143	10	~1998
182690579	1461524633	10	~1997
182691611	365383223	9	~1996
182699347	1826993471	10	~1997
182705059	1827050591	10	~1997
182707027	4384968649	10	~1998
182709203	365418407	9	~1996
182710259	365420519	9	~1996
182712377	2557973279	10	~1998
182717827	2923485233	10	~1998
182718121	1096308727	10	~1997
182720651	365441303	9	~1996
182721611	365443223	9	~1996
182722283	365444567	9	~1996
182722679	365445359	9	~1996
182726039	365452079	9	~1996
182726231	365452463	9	~1996
182729171	365458343	9	~1996
182731259	365462519	9	~1996
182734679	365469359	9	~1996
182734763	365469527	9	~1996
182736019	1827360191	10	~1997

Exponent	Prime Factor	Digits	Year
182741137	2923858193	10	~1998
182746633	1096479799	10	~1997
182746871	365493743	9	~1996
182751083	5848034657	10	~1998
182752259	365504519	9	~1996
182754419	365508839	9	~1996
182760023	365520047	9	~1996
182760827	1462086617	10	~1997
182778671	365557343	9	~1996
182783717	1462269737	10	~1997
182785391	365570783	9	~1996
182787131	365574263	9	~1996
182790571	2924649137	10	~1998
182811263	365622527	9	~1996
182811359	22302985799	11	~2000
182812379	365624759	9	~1996
182813537	1096881223	10	~1997
182814839	365629679	9	~1996
182817863	365635727	9	~1996
182822663	365645327	9	~1996
182824703	365649407	9	~1996
182827439	365654879	9	~1996
182829877	1096979263	10	~1997
182831483	365662967	9	~1996
182832659	365665319	9	~1996

4.739.325 digits

25-04-20