Small Mersenne Prime Factors (page 4089/5025)

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
5903419103	11806838207	11	~2007
5903595563	11807191127	11	~2007
5903782403	11807564807	11	~2007
5903822663	11807645327	11	~2007
5904434411	11808868823	11	~2007
5904441091	59044410911	11	~2009
5904694739	11809389479	11	~2007
5904813637	35428881823	11	~2008
5904876119	11809752239	11	~2007
5904887921	47239103369	11	~2009
5905234403	11810468807	11	~2007
5905387133	35432322799	11	~2008
5905403639	11810807279	11	~2007
5905702031	11811404063	11	~2007
5906290919	11812581839	11	~2007
5906391077	82689475079	11	~2009
5906692397	35440154383	11	~2008
5906857091	47254856729	11	~2009
5906865337	744265032463	12	~2012
5906950297	35441701783	11	~2008
5907057853	35442347119	11	~2008
5907146291	11814292583	11	~2007
5907177959	11814355919	11	~2007
5907359831	11814719663	11	~2007
5907415931	11814831863	11	~2007

Exponent	Prime Factor	Dig.	Year
5907929519	11815859039	11	~2007
5908218443	11816436887	11	~2007
5908383059	11816766119	11	~2007
5908554551	11817109103	11	~2007
5908567739	47268541913	11	~2009
5908605491	11817210983	11	~2007
5908651943	11817303887	11	~2007
5908925831	11817851663	11	~2007
5909217851	11818435703	11	~2007
5909401919	11818803839	11	~2007
5909695861	35458175167	11	~2008
5909946437	35459678623	11	~2008
5910439201	35462635207	11	~2008
5910673991	11821347983	11	~2007
5910702167	106392639007	12	~2010
5910841031	11821682063	11	~2007
5911094963	11822189927	11	~2007
5911126211	11822252423	11	~2007
5911317623	11822635247	11	~2007
5911660043	11823320087	11	~2007
5911802573	35470815439	11	~2008
5911809779	11823619559	11	~2007
5912232311	11824464623	11	~2007
5912233511	11824467023	11	~2007
5912248697	35473492183	11	~2008

Exponent	Prime Factor	Dig.	Year
5913399851	11826799703	11	~2007
5914129271	11828258543	11	~2007
5914226183	11828452367	11	~2007
5914374577	35486247463	11	~2008
5914495271	11828990543	11	~2007
5914736819	11829473639	11	~2007
5914755281	47318042249	11	~2009
5914814459	11829628919	11	~2007
5915115743	11830231487	11	~2007
5915119211	11830238423	11	~2007
5915120171	11830240343	11	~2007
5915239783	59152397831	11	~2009
5915312723	11830625447	11	~2007
5915386979	11830773959	11	~2007
5915597903	11831195807	11	~2007
5915669003	11831338007	11	~2007
5915839799	11831679599	11	~2007
5915844043	390445706839	12	~2011
5916722261	35500333567	11	~2008
5916853259	11833706519	11	~2007
5916905051	11833810103	11	~2007
5917012397	35502074383	11	~2008
5917495511	11834991023	11	~2007
5917786631	11835573263	11	~2007
5918262313	94692197009	11	~2010

Exponent	Prime Factor	Dig.	Year
5918297243	11836594487	11	~2007
5918642819	47349142553	11	~2009
5918674343	11837348687	11	~2007
5918684111	47349472889	11	~2009
5918816759	11837633519	11	~2007
5919218351	11838436703	11	~2007
5919683039	47357464313	11	~2009
5919741491	11839482983	11	~2007
5919772073	35518632439	11	~2008
5919925559	11839851119	11	~2007
5920048573	35520291439	11	~2008
5920080149	47360641193	11	~2009
5920336403	11840672807	11	~2007
5920853231	11841706463	11	~2007
5921765123	11843530247	11	~2007
5921883983	11843767967	11	~2007
5922225779	11844451559	11	~2007
5922397199	11844794399	11	~2007
5922524819	11845049639	11	~2007
5922634391	11845268783	11	~2007
5923194971	11846389943	11	~2007
5923301999	11846603999	11	~2007
5923309961	35539859767	11	~2008
5923325579	47386604633	11	~2009
5923572827	47388582617	11	~2009

4.724.182 digits

25-04-13