Small Mersenne Prime Factors (page 2868/5040)

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
251701199	2013609593	10	~1998
251711123	503422247	9	~1997
251717363	503434727	9	~1997
251718539	503437079	9	~1997
251725703	503451407	9	~1997
251730659	503461319	9	~1997
251742719	503485439	9	~1997
251756903	503513807	9	~1997
251767091	503534183	9	~1997
251772863	503545727	9	~1997
251775773	7553273191	10	~1999
251775911	503551823	9	~1997
251783663	503567327	9	~1997
251789341	1510736047	10	~1998
251793071	503586143	9	~1997
251796731	503593463	9	~1997
251801843	503603687	9	~1997
251811779	503623559	9	~1997
251816423	503632847	9	~1997
251824283	503648567	9	~1997
251834969	2014679753	10	~1998
251835247	8562398399	10	~2000
251843429	2014747433	10	~1998
251844371	503688743	9	~1997
251846669	3525853367	10	~1999

Exponent	Prime Factor	Digits	Year
251858891	503717783	9	~1997
251859431	503718863	9	~1997
251865671	503731343	9	~1997
251866799	503733599	9	~1997
251876459	503752919	9	~1997
251878691	503757383	9	~1997
251884481	1511306887	10	~1998
251888783	503777567	9	~1997
251902271	2015218169	10	~1998
251909303	503818607	9	~1997
251911403	503822807	9	~1997
251928707	2015429657	10	~1998
251929523	503859047	9	~1997
251929943	503859887	9	~1997
251930333	1511581999	10	~1998
251942699	503885399	9	~1997
251944391	503888783	9	~1997
251947823	503895647	9	~1997
251951471	503902943	9	~1997
251957819	503915639	9	~1997
251963839	6047132137	10	~1999
251987663	503975327	9	~1997
251992883	503985767	9	~1997
252013259	504026519	9	~1997
252024701	2016197609	10	~1998

Exponent	Prime Factor	Digits	Year
252040021	1512240127	10	~1998
252040991	504081983	9	~1997
252046757	2016374057	10	~1998
252050699	504101399	9	~1997
252052903	4032846449	10	~1999
252055343	504110687	9	~1997
252062687	2016501497	10	~1998
252076247	2016609977	10	~1998
252079843	2520798431	10	~1998
252086903	504173807	9	~1997
252090623	504181247	9	~1997
252100763	504201527	9	~1997
252102131	504204263	9	~1997
252102923	504205847	9	~1997
252105251	504210503	9	~1997
252107549	7563226471	10	~1999
252117863	504235727	9	~1997
252120881	1512725287	10	~1998
252131303	504262607	9	~1997
252133379	504266759	9	~1997
252133691	504267383	9	~1997
252137279	504274559	9	~1997
252137519	8068400609	10	~2000
252138083	504276167	9	~1997
252139691	504279383	9	~1997

Exponent	Prime Factor	Digits	Year
252147839	504295679	9	~1997
252150131	504300263	9	~1997
252154631	504309263	9	~1997
252155131	4538792359	10	~1999
252164303	504328607	9	~1997
252168443	504336887	9	~1997
252171383	504342767	9	~1997
252173267	36817296983	11	~2001
252176707	2521767071	10	~1998
252176893	1513061359	10	~1998
252195659	504391319	9	~1997
252197339	504394679	9	~1997
252200171	504400343	9	~1997
252200393	1513202359	10	~1998
252203639	504407279	9	~1997
252204311	504408623	9	~1997
252208091	504416183	9	~1997
252211343	504422687	9	~1997
252212711	504425423	9	~1997
252220217	6053285209	10	~1999
252232679	504465359	9	~1997
252239051	504478103	9	~1997
252250703	504501407	9	~1997
252251957	1513511743	10	~1998
252260483	504520967	9	~1997

4.739.325 digits

25-04-20