Small Mersenne Prime Factors (page 3198/5025)

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
532427921	17037693473	11	~2002
532431659	9583769863	10	~2001
532448783	1064897567	10	~1999
532449959	1064899919	10	~1999
532451651	1064903303	10	~1999
532452467	4259619737	10	~2001
532471081	3194826487	10	~2000
532477943	1064955887	10	~1999
532480891	5324808911	10	~2001
532487003	1064974007	10	~1999
532499699	1064999399	10	~1999
532507919	1065015839	10	~1999
532526999	25561295953	11	~2003
532543877	3195263263	10	~2000
532543883	1065087767	10	~1999
532566971	1065133943	10	~1999
532570799	1065141599	10	~1999
532578229	15977346871	11	~2002
532590011	1065180023	10	~1999
532593203	1065186407	10	~1999
532609211	1065218423	10	~1999
532628483	1065256967	10	~1999
532641443	1065282887	10	~1999
532641607	35154346063	11	~2003
532663259	1065326519	10	~1999

Exponent	Prime Factor	Digits	Year
532667167	5326671671	10	~2001
532671541	3196029247	10	~2000
532686431	1065372863	10	~1999
532690397	7457665559	10	~2001
532692551	1065385103	10	~1999
532706957	3196241743	10	~2000
532714811	1065429623	10	~1999
532719983	1065439967	10	~1999
532724981	4261799849	10	~2001
532727399	1065454799	10	~1999
532729511	1065459023	10	~1999
532730843	1065461687	10	~1999
532748831	1065497663	10	~1999
532776479	1065552959	10	~1999
532788779	1065577559	10	~1999
532793939	1065587879	10	~1999
532797113	3196782679	10	~2000
532818059	1065636119	10	~1999
532825031	1065650063	10	~1999
532831543	5328315431	10	~2001
532853201	3197119207	10	~2000
532863323	1065726647	10	~1999
532864511	1065729023	10	~1999
532865699	1065731399	10	~1999
532873163	1065746327	10	~1999

Exponent	Prime Factor	Digits	Year
532873277	3197239663	10	~2000
532895963	1065791927	10	~1999
532928771	1065857543	10	~1999
532929961	8526879377	10	~2001
532937057	3197622343	10	~2000
532959881	3197759287	10	~2000
532984811	9593726599	10	~2001
532989137	4263913097	10	~2001
532989251	1065978503	10	~1999
532990873	3197945239	10	~2000
532994101	3197964607	10	~2000
533004683	1066009367	10	~1999
533007539	1066015079	10	~1999
533008561	8528136977	10	~2001
533014477	3198086863	10	~2000
533014661	3198087967	10	~2000
533024699	1066049399	10	~1999
533073059	1066146119	10	~1999
533087279	1066174559	10	~1999
533147729	340148251103	12	~2005
533149511	1066299023	10	~1999
533154103	5331541031	10	~2001
533162879	1066325759	10	~1999
533168353	3199010119	10	~2000
533205443	1066410887	10	~1999

Exponent	Prime Factor	Digits	Year
533226311	1066452623	10	~1999
533230921	59721863153	11	~2003
533239043	1066478087	10	~1999
533270351	1066540703	10	~1999
533270999	1066541999	10	~1999
533303833	3199822999	10	~2000
533330183	1066660367	10	~1999
533336579	1066673159	10	~1999
533340191	1066680383	10	~1999
533348279	1066696559	10	~1999
533357771	1066715543	10	~1999
533385239	1066770479	10	~1999
533410763	1066821527	10	~1999
533428433	3200570599	10	~2000
533430769	37340153831	11	~2003
533448743	1066897487	10	~1999
533448983	1066897967	10	~1999
533461739	1066923479	10	~1999
533488223	1066976447	10	~1999
533498051	1066996103	10	~1999
533506763	1067013527	10	~1999
533510903	1067021807	10	~1999
533526083	1067052167	10	~1999
533530859	1067061719	10	~1999
533534957	3201209743	10	~2000

4.724.182 digits

25-04-13