Small Mersenne Prime Factors (page 4594/5340)

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
14297454239	28594908479	11	~2010
14297945471	28595890943	11	~2010
14298142583	28596285167	11	~2010
14298190513	85789143079	11	~2011
14298797459	28597594919	11	~2010
14298808871	28597617743	11	~2010
14299437143	28598874287	11	~2010
14299703111	28599406223	11	~2010
14300080199	28600160399	11	~2010
14300167523	28600335047	11	~2010
14300291903	28600583807	11	~2010
14300328689	343207888537	12	~2013
14300569553	85803417319	11	~2011
14300981347	572039253881	12	~2014
14301076511	28602153023	11	~2010
14301827783	28603655567	11	~2010
14301947519	28603895039	11	~2010
14302603151	28605206303	11	~2010
14302917059	28605834119	11	~2010
14303017271	28606034543	11	~2010
14303373719	28606747439	11	~2010
14303422559	28606845119	11	~2010
14303975557	85823853343	11	~2011
14304537743	28609075487	11	~2010
14304657533	85827945199	11	~2011

Exponent	Prime Factor	Dig.	Year
14304786607	228876585713	12	~2013
14304791783	371924586359	12	~2013
14305200863	28610401727	11	~2010
14306102159	28612204319	11	~2010
14306387441	85838324647	11	~2011
14307350831	28614701663	11	~2010
14307914233	228926627729	12	~2013
14308301411	28616602823	11	~2010
14308938431	28617876863	11	~2010
14310214511	28620429023	11	~2010
14310779663	28621559327	11	~2010
14311341503	28622683007	11	~2010
14312015831	28624031663	11	~2010
14312136911	28624273823	11	~2010
14312336903	28624673807	11	~2010
14312957623	143129576231	12	~2012
14313122207	257636199727	12	~2013
14313314663	28626629327	11	~2010
14313447017	114507576137	12	~2012
14313809437	85882856623	11	~2012
14314727353	85888364119	11	~2012
14315227079	28630454159	11	~2010
14315320931	28630641863	11	~2010
14315326163	28630652327	11	~2010
14315788709	114526309673	12	~2012

Exponent	Prime Factor	Dig.	Year
14316522359	28633044719	11	~2010
14316614843	28633229687	11	~2010
14316829981	85900979887	11	~2012
14318639183	28637278367	11	~2010
14319202259	28638404519	11	~2010
14319320959	143193209591	12	~2012
14319591719	28639183439	11	~2010
14320692251	28641384503	11	~2010
14320814099	28641628199	11	~2010
14320910111	28641820223	11	~2010
14321378891	28642757783	11	~2010
14321627471	28643254943	11	~2010
14321803283	28643606567	11	~2010
14322266159	114578129273	12	~2012
14322999371	28645998743	11	~2010
14323393943	28646787887	11	~2010
14323800191	28647600383	11	~2010
14324049643	143240496431	12	~2012
14324576039	28649152079	11	~2010
14324793551	28649587103	11	~2010
14325635033	85953810199	11	~2012
14325758687	114606069497	12	~2012
14326343831	28652687663	11	~2010
14327395697	85964374183	11	~2012
14327733599	28655467199	11	~2010

Exponent	Prime Factor	Dig.	Year
14327879431	143278794311	12	~2012
14327955431	28655910863	11	~2010
14328826751	28657653503	11	~2010
14329744571	28659489143	11	~2010
14329821791	28659643583	11	~2010
14330470571	28660941143	11	~2010
14331448151	28662896303	11	~2010
14331995801	85991974807	11	~2012
14332875611	28665751223	11	~2010
14333025071	28666050143	11	~2010
14333186723	28666373447	11	~2010
14333417123	28666834247	11	~2010
14333900033	86003400199	11	~2012
14334449399	28668898799	11	~2010
14334711323	28669422647	11	~2010
14335547977	86013287863	11	~2012
14335670339	28671340679	11	~2010
14335923373	86015540239	11	~2012
14336815211	28673630423	11	~2010
14337156373	229394501969	12	~2013
14337499201	86024995207	11	~2012
14338100411	28676200823	11	~2010
14340071243	28680142487	11	~2010
14343175811	28686351623	11	~2010
14343418093	86060508559	11	~2012

5.037.460 digits

25-09-07