Small Mersenne Prime Factors (page 3061/5070)

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
370418183	740836367	9	~1998
370433279	740866559	9	~1998
370435649	2963485193	10	~1999
370440481	2222642887	10	~1999
370448531	740897063	9	~1998
370449011	740898023	9	~1998
370451899	6668134183	10	~2000
370452487	3704524871	10	~2000
370453691	740907383	9	~1998
370454377	2222726263	10	~1999
370458749	5186422487	10	~2000
370459721	2222758327	10	~1999
370461779	740923559	9	~1998
370467011	740934023	9	~1998
370469833	5927517329	10	~2000
370473731	740947463	9	~1998
370474679	740949359	9	~1998
370474997	2963799977	10	~1999
370480751	2963846009	10	~1999
370484843	740969687	9	~1998
370486199	740972399	9	~1998
370487363	740974727	9	~1998
370497047	2963976377	10	~1999
370498033	2222988199	10	~1999
370501931	741003863	9	~1998

Exponent	Prime Factor	Digits	Year
370503851	741007703	9	~1998
370504091	741008183	9	~1998
370530557	5187427799	10	~2000
370535303	741070607	9	~1998
370538411	741076823	9	~1998
370547279	741094559	9	~1998
370549643	741099287	9	~1998
370555151	9634433927	10	~2001
370557119	741114239	9	~1998
370564559	741129119	9	~1998
370571879	741143759	9	~1998
370571951	741143903	9	~1998
370578119	741156239	9	~1998
370592221	2223553327	10	~1999
370594361	2223566167	10	~1999
370613611	3706136111	10	~2000
370617839	2964942713	10	~1999
370622579	741245159	9	~1998
370635851	741271703	9	~1998
370649231	741298463	9	~1998
370654331	741308663	9	~1998
370663421	2965307369	10	~1999
370678541	2965428329	10	~1999
370685723	741371447	9	~1998
370697303	741394607	9	~1998

Exponent	Prime Factor	Digits	Year
370706723	741413447	9	~1998
370708391	741416783	9	~1998
370708841	2224253047	10	~1999
370709219	741418439	9	~1998
370714499	741428999	9	~1998
370726211	741452423	9	~1998
370729379	741458759	9	~1998
370734839	741469679	9	~1998
370742483	741484967	9	~1998
370748849	2965990793	10	~1999
370752391	5932038257	10	~2000
370760843	741521687	9	~1998
370761119	741522239	9	~1998
370761431	741522863	9	~1998
370771259	741542519	9	~1998
370777163	741554327	9	~1998
370791779	741583559	9	~1998
370794607	3707946071	10	~2000
370809503	741619007	9	~1998
370810469	8899451257	10	~2001
370810571	741621143	9	~1998
370820063	741640127	9	~1998
370829603	741659207	9	~1998
370850353	2225102119	10	~1999
370861583	741723167	9	~1998

Exponent	Prime Factor	Digits	Year
370885421	2967083369	10	~1999
370889531	741779063	9	~1998
370891379	741782759	9	~1998
370895153	2225370919	10	~1999
370901171	741802343	9	~1998
370940879	741881759	9	~1998
370945711	3709457111	10	~2000
370954079	741908159	9	~1998
370954117	2225724703	10	~1999
370954447	8902906729	10	~2001
370978319	741956639	9	~1998
370983667	3709836671	10	~2000
370999663	5935994609	10	~2000
371003573	2226021439	10	~1999
371007781	2226046687	10	~1999
371028611	742057223	9	~1998
371033911	3710339111	10	~2000
371041849	8905004377	10	~2001
371043637	2226261823	10	~1999
371051459	742102919	9	~1998
371060363	742120727	9	~1998
371074871	742149743	9	~1998
371076437	5195070119	10	~2000
371093423	742186847	9	~1998
371101333	8164229327	10	~2000

4.768.925 digits

25-05-04