Small Mersenne Prime Factors (page 4877/5235)

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
56851189007	454809512057	12	~2016
56851435723	568514357231	12	~2017
56851503089	454812024713	12	~2016
56851566731	113703133463	12	~2015
56852198237	341113189423	12	~2016
56854921223	113709842447	12	~2015
56871560099	113743120199	12	~2015
56871780071	113743560143	12	~2015
56873323883	113746647767	12	~2015
56874959159	113749918319	12	~2015
56876659319	113753318639	12	~2015
56876765027	455014120217	12	~2016
56880062339	113760124679	12	~2015
56881355123	113762710247	12	~2015
56881571843	113763143687	12	~2015
56882663953	341295983719	12	~2016
56887312511	113774625023	12	~2015
56889004573	341334027439	12	~2016
56889093623	113778187247	12	~2015
56893222079	113786444159	12	~2015
56893399841	455147198729	12	~2016
56897131331	113794262663	12	~2015
56898040679	113796081359	12	~2015
56899668659	113799337319	12	~2015
56900314739	113800629479	12	~2015

Exponent	Prime Factor	Dig.	Year
56903546179	3744...385783	14	2023
56909367239	113818734479	12	~2015
56914049039	455312392313	12	~2016
56920163857	341520983143	12	~2016
56920584181	341523505087	12	~2016
56921097011	113842194023	12	~2015
56926309571	113852619143	12	~2015
56931778817	341590672903	12	~2016
56936930411	113873860823	12	~2015
56941575143	113883150287	12	~2015
56943949567	569439495671	12	~2017
56945107811	113890215623	12	~2015
56945343781	341672062687	12	~2016
56948099891	113896199783	12	~2015
56952236137	341713416823	12	~2016
56952472103	113904944207	12	~2015
56953132763	113906265527	12	~2015
56958517211	113917034423	12	~2015
56962499543	113924999087	12	~2015
56969867377	341819204263	12	~2016
56970128129	455761025033	12	~2016
56973520211	113947040423	12	~2015
56975299523	113950599047	12	~2015
56975770931	113951541863	12	~2015
56980150679	113960301359	12	~2015

Exponent	Prime Factor	Dig.	Year
56989990907	455919927257	12	~2016
56991963911	113983927823	12	~2015
56992862819	113985725639	12	~2015
56998053923	113996107847	12	~2015
57001101203	114002202407	12	~2015
57002531639	3146...464729	14	2023
57003363353	2542...055439	14	2024
57004034291	114008068583	12	~2015
57007194071	114014388143	12	~2015
57008171579	114016343159	12	~2015
57010033271	114020066543	12	~2015
57012025379	114024050759	12	~2015
57012362339	114024724679	12	~2015
57014596139	114029192279	12	~2015
57015233963	114030467927	12	~2015
57016807391	456134459129	12	~2016
57019617659	114039235319	12	~2015
57020764277	798290699879	12	~2017
57021702851	114043405703	12	~2015
57023275451	114046550903	12	~2015
57023506409	456188051273	12	~2016
57027659483	114055318967	12	~2015
57030062879	114060125759	12	~2015
57037786343	114075572687	12	~2015
57038194211	114076388423	12	~2015

Exponent	Prime Factor	Dig.	Year
57049834571	114099669143	12	~2015
57050980043	114101960087	12	~2015
57051426893	1551...114897	14	2023
57051443783	114102887567	12	~2015
57053088803	114106177607	12	~2015
57053140979	114106281959	12	~2015
57054381431	114108762863	12	~2015
57056425859	114112851719	12	~2015
57058969091	114117938183	12	~2015
57065767043	114131534087	12	~2015
57069383699	114138767399	12	~2015
57069698579	114139397159	12	~2015
57069921431	114139842863	12	~2015
57070994111	114141988223	12	~2015
57072824279	114145648559	12	~2015
57073663463	114147326927	12	~2015
57075996839	114151993679	12	~2015
57076173971	114152347943	12	~2015
57079744837	342478469023	12	~2016
57081559883	114163119767	12	~2015
57083434931	114166869863	12	~2015
57084458111	114168916223	12	~2015
57086576999	114173153999	12	~2015
57086581511	114173163023	12	~2015
57086838239	114173676479	12	~2015

4.933.056 digits

25-07-20