Small Mersenne Prime Factors (page 3841/5025)

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
2751518519	5503037039	10	~2005
2751558203	5503116407	10	~2005
2751795131	5503590263	10	~2005
2751849493	66044387833	11	~2007
2751857261	16511143567	11	~2006
2751915563	5503831127	10	~2005
2751951053	148605356863	12	~2008
2752043527	159618524567	12	~2008
2752200719	5504401439	10	~2005
2752203131	5504406263	10	~2005
2752366979	5504733959	10	~2005
2752433291	5504866583	10	~2005
2752452539	22019620313	11	~2006
2752521553	60555474167	11	~2007
2752612619	5505225239	10	~2005
2752818791	5505637583	10	~2005
2752848971	5505697943	10	~2005
2752896431	22023171449	11	~2006
2752953299	5505906599	10	~2005
2752958783	5505917567	10	~2005
2752967699	5505935399	10	~2005
2753085869	22024686953	11	~2006
2753135999	5506271999	10	~2005
2753352659	5506705319	10	~2005
2753520113	66084482713	11	~2007

Exponent	Prime Factor	Digits	Year
2753596931	5507193863	10	~2005
2753652659	5507305319	10	~2005
2753723377	192760636391	12	~2009
2753829131	5507658263	10	~2005
2753851043	5507702087	10	~2005
2753869991	5507739983	10	~2005
2753907677	16523446063	11	~2006
2753911859	5507823719	10	~2005
2754060473	66097451353	11	~2007
2754110351	5508220703	10	~2005
2754175163	5508350327	10	~2005
2754212537	66101100889	11	~2007
2754213551	5508427103	10	~2005
2754240803	5508481607	10	~2005
2754306083	5508612167	10	~2005
2754331889	38560646447	11	~2007
2754355679	5508711359	10	~2005
2754362057	16526172343	11	~2006
2754385661	16526313967	11	~2006
2754466933	44071470929	11	~2007
2754596723	5509193447	10	~2005
2754667991	5509335983	10	~2005
2754734039	22037872313	11	~2006
2754762863	5509525727	10	~2005
2754765239	5509530479	10	~2005

Exponent	Prime Factor	Digits	Year
2754885779	5509771559	10	~2005
2754886679	5509773359	10	~2005
2754899711	5509799423	10	~2005
2754984131	5509968263	10	~2005
2755047983	5510095967	10	~2005
2755102319	5510204639	10	~2005
2755125479	5510250959	10	~2005
2755129859	5510259719	10	~2005
2755272259	27552722591	11	~2006
2755348433	16532090599	11	~2006
2755357991	5510715983	10	~2005
2755607539	66134580937	11	~2007
2755683481	16534100887	11	~2006
2755859947	44093759153	11	~2007
2755904363	5511808727	10	~2005
2756004281	22048034249	11	~2006
2756142211	27561422111	11	~2006
2756156303	5512312607	10	~2005
2756208683	5512417367	10	~2005
2756298773	16537792639	11	~2006
2756411363	5512822727	10	~2005
2756443883	5512887767	10	~2005
2756717921	16540307527	11	~2006
2756752597	16540515583	11	~2006
2756800583	5513601167	10	~2005

Exponent	Prime Factor	Digits	Year
2756861147	66164667529	11	~2007
2756880029	22055040233	11	~2006
2756900483	5513800967	10	~2005
2756961479	5513922959	10	~2005
2756974237	66167381689	11	~2007
2757181391	5514362783	10	~2005
2757348059	5514696119	10	~2005
2757384599	5514769199	10	~2005
2757415211	5514830423	10	~2005
2757506341	16545038047	11	~2006
2757530159	5515060319	10	~2005
2757642119	5515284239	10	~2005
2757675491	5515350983	10	~2005
2757679097	16546074583	11	~2006
2757873269	82736198071	11	~2008
2757888457	16547330743	11	~2006
2757983411	5515966823	10	~2005
2758056443	5516112887	10	~2005
2758057859	5516115719	10	~2005
2758081559	49645468063	11	~2007
2758194863	5516389727	10	~2005
2758276253	16549657519	11	~2006
2758383899	5516767799	10	~2005
2758416623	5516833247	10	~2005
2758437491	5516874983	10	~2005

4.724.182 digits

25-04-13