Small Mersenne Prime Factors (page 2842/5025)

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	Digits	Year
241434241	1448605447	10	~1998
241437793	1448626759	10	~1998
241439489	3380152847	10	~1999
241459499	482918999	9	~1996
241467557	1448805343	10	~1998
241468151	482936303	9	~1996
241476971	482953943	9	~1996
241482443	482964887	9	~1996
241485239	482970479	9	~1996
241485539	482971079	9	~1996
241489739	482979479	9	~1996
241489991	482979983	9	~1996
241491839	482983679	9	~1996
241492319	482984639	9	~1996
241493827	2414938271	10	~1998
241494719	482989439	9	~1996
241495979	482991959	9	~1996
241497023	482994047	9	~1996
241497479	482994959	9	~1996
241499381	1448996287	10	~1998
241499939	482999879	9	~1996
241511761	3864188177	10	~1999
241515331	2415153311	10	~1998
241519199	483038399	9	~1996
241523047	2415230471	10	~1998

Exponent	Prime Factor	Digits	Year
241525523	483051047	9	~1996
241527719	483055439	9	~1996
241529789	7728953249	10	~1999
241531931	483063863	9	~1996
241532171	483064343	9	~1996
241541939	483083879	9	~1996
241543391	483086783	9	~1996
241549331	483098663	9	~1996
241549751	483099503	9	~1996
241564139	483128279	9	~1996
241570523	483141047	9	~1996
241573919	483147839	9	~1996
241587959	483175919	9	~1996
241596431	483192863	9	~1996
241600643	483201287	9	~1996
241603619	483207239	9	~1996
241604653	5315302367	10	~1999
241604711	483209423	9	~1996
241614179	483228359	9	~1996
241616723	483233447	9	~1996
241619303	483238607	9	~1996
241619663	483239327	9	~1996
241619849	1932958793	10	~1998
241621931	483243863	9	~1996
241622261	1449733567	10	~1998

Exponent	Prime Factor	Digits	Year
241627181	1449763087	10	~1998
241643821	1449862927	10	~1998
241647863	6282844439	10	~1999
241654463	483308927	9	~1996
241660613	1449963679	10	~1998
241661531	483323063	9	~1996
241667039	483334079	9	~1996
241667171	483334343	9	~1996
241667423	483334847	9	~1996
241677239	483354479	9	~1996
241677671	483355343	9	~1996
241683899	483367799	9	~1996
241686983	483373967	9	~1996
241688171	483376343	9	~1996
241693799	483387599	9	~1996
241697627	1933581017	10	~1998
241702091	483404183	9	~1996
241702943	483405887	9	~1996
241705391	483410783	9	~1996
241715543	483431087	9	~1996
241718027	1933744217	10	~1998
241726769	1933814153	10	~1998
241730039	483460079	9	~1996
241731263	483462527	9	~1996
241736959	4351265263	10	~1999

Exponent	Prime Factor	Digits	Year
241742951	483485903	9	~1996
241743263	483486527	9	~1996
241747739	483495479	9	~1996
241760243	483520487	9	~1996
241764059	483528119	9	~1996
241765679	483531359	9	~1996
241771091	483542183	9	~1996
241774619	483549239	9	~1996
241776179	483552359	9	~1996
241782971	1934263769	10	~1998
241783793	3384973103	10	~1999
241787951	10155093943	11	~2000
241788791	483577583	9	~1996
241803613	1450821679	10	~1998
241811543	483623087	9	~1996
241817483	483634967	9	~1996
241820141	1450920847	10	~1998
241821521	1450929127	10	~1998
241824623	483649247	9	~1996
241827479	483654959	9	~1996
241832873	1450997239	10	~1998
241837943	483675887	9	~1996
241839179	483678359	9	~1996
241844579	483689159	9	~1996
241844579	11608539793	11

4.724.182 digits

25-04-13