Small Mersenne Prime Factors (page 2806/5025)

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
224135111	448270223	9	~1996
224137013	1344822079	10	~1997
224147039	448294079	9	~1996
224151743	448303487	9	~1996
224152261	1344913567	10	~1997
224159291	448318583	9	~1996
224163503	448327007	9	~1996
224164727	1793317817	10	~1998
224173991	448347983	9	~1996
224178403	14347417793	11	~2000
224188031	448376063	9	~1996
224193283	3587092529	10	~1998
224194571	448389143	9	~1996
224195819	448391639	9	~1996
224209703	448419407	9	~1996
224211131	448422263	9	~1996
224212819	2242128191	10	~1998
224213351	448426703	9	~1996
224216711	448433423	9	~1996
224218931	448437863	9	~1996
224224601	1345347607	10	~1997
224226377	1793811017	10	~1998
224227859	448455719	9	~1996
224233403	448466807	9	~1996
224235971	448471943	9	~1996

Exponent	Prime Factor	Digits	Year
224243443	2242434431	10	~1998
224246723	448493447	9	~1996
224248217	1345489303	10	~1997
224252123	448504247	9	~1996
224265857	1794126857	10	~1998
224272991	448545983	9	~1996
224277299	448554599	9	~1996
224280599	448561199	9	~1996
224280887	1794247097	10	~1998
224286187	3588578993	10	~1998
224290463	448580927	9	~1996
224292997	1345757983	10	~1997
224303623	2243036231	10	~1998
224311621	1345869727	10	~1997
224315183	448630367	9	~1996
224319059	448638119	9	~1996
224320753	1345924519	10	~1997
224320823	448641647	9	~1996
224320931	448641863	9	~1996
224321711	448643423	9	~1996
224328491	448656983	9	~1996
224335753	1346014519	10	~1997
224339543	448679087	9	~1996
224344259	448688519	9	~1996
224345777	1346074663	10	~1997

Exponent	Prime Factor	Digits	Year
224347381	1346084287	10	~1997
224347499	448694999	9	~1996
224348951	448697903	9	~1996
224350883	97368283223	11	~2002
224352959	5384471017	10	~1999
224358383	448716767	9	~1996
224364451	2243644511	10	~1998
224364611	448729223	9	~1996
224380763	448761527	9	~1996
224383031	448766063	9	~1996
224384591	448769183	9	~1996
224396911	4039144399	10	~1999
224405507	1795244057	10	~1998
224409491	448818983	9	~1996
224417381	1346504287	10	~1997
224418119	448836239	9	~1996
224422811	448845623	9	~1996
224425991	448851983	9	~1996
224426359	2244263591	10	~1998
224427023	448854047	9	~1996
224427779	448855559	9	~1996
224428511	448857023	9	~1996
224428777	3590860433	10	~1998
224435177	1795481417	10	~1998
224438579	448877159	9	~1996

Exponent	Prime Factor	Digits	Year
224439739	4039915303	10	~1999
224443679	448887359	9	~1996
224445541	1346673247	10	~1997
224455163	448910327	9	~1996
224458211	448916423	9	~1996
224458691	448917383	9	~1996
224468771	448937543	9	~1996
224476519	2244765191	10	~1998
224476663	9428019847	10	~1999
224481641	1346889847	10	~1997
224486497	1346918983	10	~1997
224489543	448979087	9	~1996
224493679	2244936791	10	~1998
224496317	1795970537	10	~1998
224501639	449003279	9	~1996
224501951	449003903	9	~1996
224503991	449007983	9	~1996
224507351	449014703	9	~1996
224508679	2245086791	10	~1998
224509079	449018159	9	~1996
224521079	449042159	9	~1996
224523023	449046047	9	~1996
224530811	21554957857	11	~2000
224539631	449079263	9	~1996
224543309	1796346473	10	~1998

4.724.182 digits

25-04-13