Small Mersenne Prime Factors (page 4255/5070)

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
9178993091	18357986183	11	~2009
9179159617	55074957703	11	~2010
9179299621	55075797727	11	~2010
9179852723	18359705447	11	~2009
9180027139	312120922727	12	~2012
9180049163	18360098327	11	~2009
9180307859	18360615719	11	~2009
9181518743	18363037487	11	~2009
9181784921	73454279369	11	~2010
9181983659	18363967319	11	~2009
9182418863	18364837727	11	~2009
9182856181	55097137087	11	~2010
9182887751	18365775503	11	~2009
9182961503	18365923007	11	~2009
9183529991	18367059983	11	~2009
9183595163	18367190327	11	~2009
9183702779	18367405559	11	~2009
9184331483	18368662967	11	~2009
9185065079	18370130159	11	~2009
9185184191	18370368383	11	~2009
9185331193	55111987159	11	~2010
9186278377	55117670263	11	~2010
9186318901	661414960873	12	~2013
9186699023	18373398047	11	~2009
9186740411	18373480823	11	~2009

Exponent	Prime Factor	Dig.	Year
9186916283	18373832567	11	~2009
9187682321	55126093927	11	~2010
9188040187	91880401871	11	~2011
9188299931	18376599863	11	~2009
9188733551	73509868409	11	~2010
9188734811	18377469623	11	~2009
9189546127	91895461271	11	~2011
9189560123	18379120247	11	~2009
9189621283	91896212831	11	~2011
9189667703	18379335407	11	~2009
9189967091	73519736729	11	~2010
9190100897	55140605383	11	~2010
9190109759	18380219519	11	~2009
9190342391	18380684783	11	~2009
9190347359	18380694719	11	~2009
9190472591	18380945183	11	~2009
9191012317	55146073903	11	~2010
9191259359	18382518719	11	~2009
9191433479	18382866959	11	~2009
9191443571	18382887143	11	~2009
9191536847	165447663247	12	~2011
9191711183	18383422367	11	~2009
9192256163	18384512327	11	~2009
9192414911	18384829823	11	~2009
9192498011	18384996023	11	~2009

Exponent	Prime Factor	Dig.	Year
9192542231	18385084463	11	~2009
9192783503	18385567007	11	~2009
9193436951	18386873903	11	~2009
9193453679	18386907359	11	~2009
9193578899	18387157799	11	~2009
9193705799	73549646393	11	~2010
9193777451	18387554903	11	~2009
9193851539	18387703079	11	~2009
9193882199	18387764399	11	~2009
9194235217	55165411303	11	~2010
9194433299	18388866599	11	~2009
9194491561	55166949367	11	~2010
9194988683	18389977367	11	~2009
9194990291	73559922329	11	~2010
9195868079	18391736159	11	~2009
9196316099	18392632199	11	~2009
9197125913	55182755479	11	~2010
9197530019	18395060039	11	~2009
9197962019	18395924039	11	~2009
9198181753	55189090519	11	~2010
9198777277	55192663663	11	~2010
9198816563	18397633127	11	~2009
9198873127	367954925081	12	~2012
9199047083	18398094167	11	~2009
9200134439	18400268879	11	~2009

Exponent	Prime Factor	Dig.	Year
9200401211	18400802423	11	~2009
9201480059	18402960119	11	~2009
9201524471	18403048943	11	~2009
9201743773	55210462639	11	~2010
9201819197	55210915183	11	~2010
9201849803	18403699607	11	~2009
9202628723	18405257447	11	~2009
9202963439	18405926879	11	~2009
9203088407	73624707257	11	~2010
9203149789	220875594937	12	~2011
9203695661	55222173967	11	~2010
9204162263	18408324527	11	~2009
9204463871	18408927743	11	~2009
9204793943	18409587887	11	~2009
9205141277	73641130217	11	~2010
9205246619	18410493239	11	~2009
9205490807	73643926457	11	~2010
9206831951	18413663903	11	~2009
9206864651	18413729303	11	~2009
9206968541	73655748329	11	~2010
9207388753	55244332519	11	~2010
9208391903	18416783807	11	~2009
9208866071	18417732143	11	~2009
9208996991	18417993983	11	~2009
9209296643	18418593287	11	~2009

4.768.925 digits

25-05-04