Small Mersenne Prime Factors (page 4433/5025)

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	Dig.	Year
19437864779	38875729559	11	~2011
19439171113	116635026679	12	~2013
19440058633	116640351799	12	~2013
19440725543	38881451087	11	~2011
19441933019	38883866039	11	~2011
19442471891	349964494039	12	~2014
19442479633	116654877799	12	~2013
19443096671	38886193343	11	~2011
19444392563	38888785127	11	~2011
19444690361	583340710831	12	~2014
19446071497	116676428983	12	~2013
19446830699	38893661399	11	~2011
19448548739	38897097479	11	~2011
19448661299	38897322599	11	~2011
19449745499	38899490999	11	~2011
19450696679	38901393359	11	~2011
19451650357	778066014281	12	~2015
19452537311	155620298489	12	~2013
19452864553	4446...368159	14	2024
19452998701	116717992207	12	~2013
19453193411	38906386823	11	~2011
19454436923	38908873847	11	~2011
19455362279	155642898233	12	~2013
19455551183	38911102367	11	~2011
19455752843	38911505687	11	~2011

Exponent	Prime Factor	Dig.	Year
19456374653	116738247919	12	~2013
19457205023	38914410047	11	~2011
19458409349	155667274793	12	~2013
19459966271	38919932543	11	~2011
19462441253	116774647519	12	~2013
19462743791	38925487583	11	~2011
19465030391	350370547039	12	~2014
19465421819	38930843639	11	~2011
19465891559	38931783119	11	~2011
19466093657	116796561943	12	~2013
19466339177	116798035063	12	~2013
19466638643	467199327433	12	~2014
19467132397	467211177529	12	~2014
19467756541	116806539247	12	~2013
19468720919	38937441839	11	~2011
19469914571	38939829143	11	~2011
19470370253	116822221519	12	~2013
19470752243	38941504487	11	~2011
19471444763	38942889527	11	~2011
19472357711	38944715423	11	~2011
19473911279	38947822559	11	~2011
19473964871	38947929743	11	~2011
19474347383	38948694767	11	~2011
19474607701	116847646207	12	~2013
19475278219	779011128761	12	~2015

Exponent	Prime Factor	Dig.	Year
19476370211	38952740423	11	~2011
19477022699	38954045399	11	~2011
19477896563	38955793127	11	~2011
19477979231	38955958463	11	~2011
19479223079	38958446159	11	~2011
19479240281	116875441687	12	~2013
19479518291	38959036583	11	~2011
19481318629	428589009839	12	~2014
19481534399	38963068799	11	~2011
19481772203	38963544407	11	~2011
19483007309	155864058473	12	~2013
19485348497	272794878959	12	~2013
19487900933	116927405599	12	~2013
19489170341	116935022047	12	~2013
19489828097	155918624777	12	~2013
19490567111	38981134223	11	~2011
19492790939	38985581879	11	~2011
19494533833	116967202999	12	~2013
19495507379	38991014759	11	~2011
19496090423	38992180847	11	~2011
19496125757	155969006057	12	~2013
19497907211	38995814423	11	~2011
19501157519	39002315039	11	~2011
19502805737	117016834423	12	~2013
19505198291	39010396583	11	~2011

Exponent	Prime Factor	Dig.	Year
19505210281	117031261687	12	~2013
19508165639	39016331279	11	~2011
19508837591	39017675183	11	~2011
19509979799	39019959599	11	~2011
19510952171	39021904343	11	~2011
19511245991	39022491983	11	~2011
19511336219	39022672439	11	~2011
19511470691	39022941383	11	~2011
19511518979	39023037959	11	~2011
19514443799	468346651177	12	~2014
19516255151	39032510303	11	~2011
19517227337	117103364023	12	~2013
19517994719	39035989439	11	~2011
19519825763	39039651527	11	~2011
19520313779	39040627559	11	~2011
19520692627	351372467287	12	~2014
19522339541	117134037247	12	~2013
19523493971	39046987943	11	~2011
19524385823	39048771647	11	~2011
19524423059	39048846119	11	~2011
19524456521	156195652169	12	~2013
19525957859	39051915719	11	~2011
19526128571	39052257143	11	~2011
19526440751	39052881503	11	~2011
19527549599	39055099199	11	~2011

4.724.182 digits

25-04-13