Small Mersenne Prime Factors (page 3687/5145)

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
1476534071	2953068143	10	~2003
1476544577	8859267463	10	~2004
1476626003	2953252007	10	~2003
1476666293	8859997759	10	~2004
1476713453	20673988343	11	~2005
1476798853	8860793119	10	~2004
1476909383	2953818767	10	~2003
1476929963	2953859927	10	~2003
1476947831	2953895663	10	~2003
1477003217	20678045039	11	~2005
1477022791	14770227911	11	~2004
1477038743	2954077487	10	~2003
1477110683	2954221367	10	~2003
1477112531	2954225063	10	~2003
1477160831	2954321663	10	~2003
1477189079	2954378159	10	~2003
1477201871	2954403743	10	~2003
1477208483	2954416967	10	~2003
1477242103	35453810473	11	~2005
1477250303	2954500607	10	~2003
1477268543	2954537087	10	~2003
1477276951	26590985119	11	~2005
1477285079	2954570159	10	~2003
1477352711	2954705423	10	~2003
1477436111	2954872223	10	~2003

Exponent	Prime Factor	Digits	Year
1477438451	97510937767	11	~2006
1477441523	2954883047	10	~2003
1477456439	11819651513	11	~2004
1477512251	2955024503	10	~2003
1477512863	2955025727	10	~2003
1477518923	2955037847	10	~2003
1477692179	2955384359	10	~2003
1477830863	2955661727	10	~2003
1477858103	2955716207	10	~2003
1477866451	59114658041	11	~2006
1477914803	2955829607	10	~2003
1477925063	2955850127	10	~2003
1478015237	35472365689	11	~2005
1478018903	2956037807	10	~2003
1478065763	2956131527	10	~2003
1478088167	11824705337	11	~2004
1478102819	2956205639	10	~2003
1478107643	2956215287	10	~2003
1478183471	2956366943	10	~2003
1478207639	2956415279	10	~2003
1478224261	8869345567	10	~2004
1478231399	2956462799	10	~2003
1478260331	2956520663	10	~2003
1478312219	2956624439	10	~2003
1478323559	2956647119	10	~2003

Exponent	Prime Factor	Digits	Year
1478457371	2956914743	10	~2003
1478485031	2956970063	10	~2003
1478489891	2956979783	10	~2003
1478541667	14785416671	11	~2004
1478598983	2957197967	10	~2003
1478651123	2957302247	10	~2003
1478760119	2957520239	10	~2003
1478765063	2957530127	10	~2003
1478775601	8872653607	10	~2004
1478778479	11830227833	11	~2004
1478779307	11830234457	11	~2004
1478792951	2957585903	10	~2003
1478805719	2957611439	10	~2003
1478845391	2957690783	10	~2003
1478864111	2957728223	10	~2003
1478880443	2957760887	10	~2003
1479025817	8874154903	10	~2004
1479033863	2958067727	10	~2003
1479052103	2958104207	10	~2003
1479060119	2958120239	10	~2003
1479063671	2958127343	10	~2003
1479116183	2958232367	10	~2003
1479133157	8874798943	10	~2004
1479152639	2958305279	10	~2003
1479244619	2958489239	10	~2003

Exponent	Prime Factor	Digits	Year
1479250867	14792508671	11	~2004
1479291643	23668666289	11	~2005
1479309899	2958619799	10	~2003
1479329639	2958659279	10	~2003
1479348779	2958697559	10	~2003
1479352691	2958705383	10	~2003
1479436433	8876618599	10	~2004
1479484717	8876908303	10	~2004
1479511829	20713165607	11	~2005
1479520799	2959041599	10	~2003
1479540971	2959081943	10	~2003
1479550517	8877303103	10	~2004
1479556283	2959112567	10	~2003
1479595841	11836766729	11	~2004
1479622019	2959244039	10	~2003
1479669011	2959338023	10	~2003
1479687659	2959375319	10	~2003
1479789431	2959578863	10	~2003
1479823451	2959646903	10	~2003
1479903251	2959806503	10	~2003
1479955523	2959911047	10	~2003
1479992903	2959985807	10	~2003
1479996443	2959992887	10	~2003
1480031831	2960063663	10	~2003
1480032199	121362640319	12	~2007

4.843.404 digits

25-06-08