Small Mersenne Prime Factors (page 4334/5775)

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
2745194891	5490389783	10	~2005
2745235211	5490470423	10	~2005
2745255323	5490510647	10	~2005
2745319981	16471919887	11	~2006
2745371831	5490743663	10	~2005
2745426617	16472559703	11	~2006
2745567641	21964541129	11	~2006
2745653231	5491306463	10	~2005
2745674797	16474048783	11	~2006
2746109987	21968879897	11	~2006
2746427819	21971422553	11	~2006
2746432391	21971459129	11	~2006
2746600751	5493201503	10	~2005
2746659131	5493318263	10	~2005
2746677023	5493354047	10	~2005
2746707791	5493415583	10	~2005
2746794623	5493589247	10	~2005
2746827971	5493655943	10	~2005
2746860211	27468602111	11	~2006
2746997531	5493995063	10	~2005
2747009003	5494018007	10	~2005
2747187563	5494375127	10	~2005
2747279351	5494558703	10	~2005
2747333651	5494667303	10	~2005
2747456051	131877890449	12	~2008

Exponent	Prime Factor	Digits	Year
2747504183	5495008367	10	~2005
2747516279	5495032559	10	~2005
2747638511	5495277023	10	~2005
2747641763	5495283527	10	~2005
2747642879	5495285759	10	~2005
2747645639	5495291279	10	~2005
2747838011	5495676023	10	~2005
2747933471	247314012391	12	~2009
2747934239	5495868479	10	~2005
2748124391	5496248783	10	~2005
2748224939	5496449879	10	~2005
2748336011	21986688089	11	~2006
2748398099	5496796199	10	~2005
2748483301	126430231847	12	~2008
2748517571	5497035143	10	~2005
2748558899	5497117799	10	~2005
2748579341	16491476047	11	~2006
2748651959	5497303919	10	~2005
2748729383	5497458767	10	~2005
2748749483	5497498967	10	~2005
2748781883	5497563767	10	~2005
2748886271	5497772543	10	~2005
2748922283	5497844567	10	~2005
2749003223	5498006447	10	~2005
2749008719	5498017439	10	~2005

Exponent	Prime Factor	Digits	Year
2749043827	27490438271	11	~2006
2749127159	5498254319	10	~2005
2749157171	5498314343	10	~2005
2749410437	16496462623	11	~2006
2749472879	5498945759	10	~2005
2749517237	21996137897	11	~2006
2749538063	5499076127	10	~2005
2749591931	5499183863	10	~2005
2749729691	21997837529	11	~2006
2749935239	5499870479	10	~2005
2750073983	5500147967	10	~2005
2750221151	5500442303	10	~2005
2750222483	5500444967	10	~2005
2750327663	5500655327	10	~2005
2750336587	110013463481	12	~2008
2750372363	5500744727	10	~2005
2750399651	5500799303	10	~2005
2750630339	5501260679	10	~2005
2750631959	5501263919	10	~2005
2750785721	154044000377	12	~2008
2750919407	71523904583	11	~2007
2751237431	5502474863	10	~2005
2751250763	5502501527	10	~2005
2751449401	44023190417	11	~2007
2751449411	5502898823	10	~2005

Exponent	Prime Factor	Digits	Year
2751450959	5502901919	10	~2005
2751467417	16508804503	11	~2006
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
2752877051	5505754103	10	~2005
2752896431	22023171449	11	~2006
2752899119	5505798239	10	~2005
2752953299	5505906599	10	~2005
2752958783	5505917567	10	~2005
2752967699	5505935399	10	~2005

5.471.290 digits

26-03-29