Small Mersenne Prime Factors (page 3886/5460)

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
1502073869	12016590953	11	~2004
1502100373	9012602239	10	~2004
1502101343	3004202687	10	~2003
1502121119	3004242239	10	~2003
1502122859	3004245719	10	~2003
1502131361	9012788167	10	~2004
1502174759	3004349519	10	~2003
1502182259	12017458073	11	~2004
1502233319	3004466639	10	~2003
1502258561	9013551367	10	~2004
1502344223	3004688447	10	~2003
1502379899	3004759799	10	~2003
1502383451	3004766903	10	~2003
1502453377	9014720263	10	~2004
1502479523	3004959047	10	~2003
1502528099	3005056199	10	~2003
1502623253	45078697591	11	~2006
1502630159	3005260319	10	~2003
1502630351	3005260703	10	~2003
1502678579	12021428633	11	~2004
1502699591	3005399183	10	~2003
1502733119	3005466239	10	~2003
1502758781	9016552687	10	~2004
1502787983	3005575967	10	~2003
1502817593	21039446303	11	~2005

Exponent	Prime Factor	Digits	Year
1502846539	15028465391	11	~2004
1502859737	12022877897	11	~2004
1502936999	48093983969	11	~2006
1503006299	3006012599	10	~2003
1503119699	3006239399	10	~2003
1503127679	3006255359	10	~2003
1503160811	3006321623	10	~2003
1503164051	3006328103	10	~2003
1503166823	3006333647	10	~2003
1503168851	3006337703	10	~2003
1503190079	3006380159	10	~2003
1503205103	3006410207	10	~2003
1503222239	3006444479	10	~2003
1503225583	36077413993	11	~2005
1503229381	9019376287	10	~2004
1503269533	9019617199	10	~2004
1503371951	3006743903	10	~2003
1503386051	3006772103	10	~2003
1503405023	3006810047	10	~2003
1503418733	36082049593	11	~2005
1503480239	3006960479	10	~2003
1503485233	24055763729	11	~2005
1503495803	3006991607	10	~2003
1503511859	12028094873	11	~2004
1503582551	3007165103	10	~2003

Exponent	Prime Factor	Digits	Year
1503652049	21051128687	11	~2005
1503653363	3007306727	10	~2003
1503660299	3007320599	10	~2003
1503684053	9022104319	10	~2004
1503694949	12029559593	11	~2004
1503739499	12029915993	11	~2004
1503783599	12030268793	11	~2004
1503823103	3007646207	10	~2003
1503877079	3007754159	10	~2003
1503907543	15039075431	11	~2004
1503908963	3007817927	10	~2003
1503931811	3007863623	10	~2003
1503987011	3007974023	10	~2003
1503988427	72191444497	11	~2006
1503991871	3007983743	10	~2003
1504029119	3008058239	10	~2003
1504065551	3008131103	10	~2003
1504151393	9024908359	10	~2004
1504173119	3008346239	10	~2003
1504177523	3008355047	10	~2003
1504189943	3008379887	10	~2003
1504253417	9025520503	10	~2004
1504254977	12034039817	11	~2004
1504315223	3008630447	10	~2003
1504328767	24069260273	11	~2005

Exponent	Prime Factor	Digits	Year
1504336927	27078064687	11	~2005
1504343063	3008686127	10	~2003
1504349279	3008698559	10	~2003
1504504019	3009008039	10	~2003
1504673879	48149564129	11	~2006
1504760459	3009520919	10	~2003
1504770467	12038163737	11	~2004
1504801973	9028811839	10	~2004
1504808243	3009616487	10	~2003
1504832941	9028997647	10	~2004
1504833923	3009667847	10	~2003
1504838591	3009677183	10	~2003
1504940483	3009880967	10	~2003
1504944733	9029668399	10	~2004
1504963871	3009927743	10	~2003
1505002199	3010004399	10	~2003
1505044631	3010089263	10	~2003
1505080901	12040647209	11	~2004
1505084291	3010168583	10	~2003
1505084351	3010168703	10	~2003
1505199791	3010399583	10	~2003
1505201039	3010402079	10	~2003
1505299223	3010598447	10	~2003
1505391323	3010782647	10	~2003
1505415479	3010830959	10	~2003

5.157.210 digits

25-11-02