Small Mersenne Prime Factors (page 5022/5745)

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	Dig.	Year
20393348711	40786697423	11	~2012
20394001931	40788003863	11	~2012
20397021971	40794043943	11	~2012
20397150451	326354407217	12	~2014
20398329779	40796659559	11	~2012
20399172191	40798344383	11	~2012
20399254097	122395524583	12	~2013
20399316011	40798632023	11	~2012
20400038051	40800076103	11	~2012
20400125423	40800250847	11	~2012
20400255503	40800511007	11	~2012
20401241831	40802483663	11	~2012
20401586587	204015865871	12	~2013
20402025131	40804050263	11	~2012
20402882771	1326...801151	14	2023
20404039553	122424237319	12	~2013
20404316497	326469063953	12	~2014
20405231783	40810463567	11	~2012
20405538773	122433232639	12	~2013
20406761099	40813522199	11	~2012
20407173341	163257386729	12	~2013
20408248331	40816496663	11	~2012
20410303619	40820607239	11	~2012
20410789829	163286318633	12	~2013
20410977157	489863451769	12	~2014

Exponent	Prime Factor	Dig.	Year
20411458283	40822916567	11	~2012
20411647433	285763064063	12	~2014
20411684417	285763581839	12	~2014
20412053411	40824106823	11	~2012
20412390353	285773464943	12	~2014
20412992141	122477952847	12	~2013
20413813583	40827627167	11	~2012
20413855271	40827710543	11	~2012
20414502763	326632044209	12	~2014
20416122217	326657955473	12	~2014
20416175771	40832351543	11	~2012
20417232323	40834464647	11	~2012
20418051191	40836102383	11	~2012
20418373337	163346986697	12	~2013
20419479191	40838958383	11	~2012
20419960019	40839920039	11	~2012
20420167643	40840335287	11	~2012
20420390651	163363125209	12	~2013
20422442197	122534653183	12	~2013
20422714859	40845429719	11	~2012
20425019177	122550115063	12	~2013
20425051253	122550307519	12	~2013
20426120699	40852241399	11	~2012
20427285551	40854571103	11	~2012
20429340311	40858680623	11	~2012

Exponent	Prime Factor	Dig.	Year
20430846503	40861693007	11	~2012
20431107143	40862214287	11	~2012
20431393559	3481...624537	14	2023
20431755119	40863510239	11	~2012
20431762031	40863524063	11	~2012
20432601179	163460809433	12	~2013
20434420007	163475360057	12	~2013
20436350939	40872701879	11	~2012
20437716631	204377166311	12	~2013
20441354651	40882709303	11	~2012
20441773279	204417732791	12	~2013
20441906743	327070507889	12	~2014
20444116103	40888232207	11	~2012
20444500597	122667003583	12	~2013
20444932523	40889865047	11	~2012
20445275423	40890550847	11	~2012
20445313463	40890626927	11	~2012
20446322003	40892644007	11	~2012
20447026997	122682161983	12	~2013
20448755389	490770129337	12	~2014
20449073159	40898146319	11	~2012
20449085231	40898170463	11	~2012
20449247711	40898495423	11	~2012
20450465549	163603724393	12	~2013
20451044219	40902088439	11	~2012

Exponent	Prime Factor	Dig.	Year
20451126359	40902252719	11	~2012
20451706259	40903412519	11	~2012
20452663799	40905327599	11	~2012
20452667383	204526673831	12	~2013
20452998539	40905997079	11	~2012
20453174117	122719044703	12	~2013
20453670313	122722021879	12	~2013
20453690759	40907381519	11	~2012
20453819357	122722916143	12	~2013
20454805169	777282596423	12	~2015
20455431853	122732591119	12	~2013
20456326463	40912652927	11	~2012
20456514803	40913029607	11	~2012
20457657743	40915315487	11	~2012
20457722231	40915444463	11	~2012
20457816479	40915632959	11	~2012
20457955631	40915911263	11	~2012
20458428143	40916856287	11	~2012
20461583183	40923166367	11	~2012
20462202863	40924405727	11	~2012
20462405921	122774435527	12	~2013
20462605979	40925211959	11	~2012
20463893789	163711150313	12	~2013
20464190003	40928380007	11	~2012
20464503079	204645030791	12	~2013

5.441.361 digits

26-03-15