Small Mersenne Prime Factors (page 2990/5040)

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
327423737	12442102007	11	~2001
327425837	2619406697	10	~1999
327425963	654851927	9	~1997
327441011	654882023	9	~1997
327442331	654884663	9	~1997
327451213	7858829113	10	~2000
327459563	654919127	9	~1997
327463091	654926183	9	~1997
327463343	654926687	9	~1997
327475283	654950567	9	~1997
327487297	5239796753	10	~2000
327493643	654987287	9	~1997
327496343	654992687	9	~1997
327516011	2620128089	10	~1999
327521197	1965127183	10	~1999
327528563	655057127	9	~1997
327530519	655061039	9	~1997
327535979	655071959	9	~1997
327542359	5895762463	10	~2000
327547691	655095383	9	~1997
327556387	5240902193	10	~2000
327558589	9826757671	10	~2000
327563347	15723040657	11	~2001
327566699	655133399	9	~1997
327568169	4585954367	10	~2000

Exponent	Prime Factor	Digits	Year
327589357	7862144569	10	~2000
327589571	655179143	9	~1997
327605891	655211783	9	~1997
327606263	655212527	9	~1997
327611041	1965666247	10	~1999
327616621	1965699727	10	~1999
327641317	1965847903	10	~1999
327641849	2621134793	10	~1999
327653303	655306607	9	~1997
327670367	2621362937	10	~1999
327694621	1966167727	10	~1999
327701771	655403543	9	~1997
327730493	1966382959	10	~1999
327732563	655465127	9	~1997
327743963	655487927	9	~1997
327746843	655493687	9	~1997
327760247	2622081977	10	~1999
327766337	2622130697	10	~1999
327767621	1966605727	10	~1999
327768017	2622144137	10	~1999
327807427	11145452519	11	~2001
327810611	655621223	9	~1997
327816179	655632359	9	~1997
327838079	655676159	9	~1997
327838859	655677719	9	~1997

Exponent	Prime Factor	Digits	Year
327843491	2622747929	10	~1999
327852263	655704527	9	~1997
327857591	655715183	9	~1997
327858551	655717103	9	~1997
327869303	655738607	9	~1997
327875123	655750247	9	~1997
327880991	655761983	9	~1997
327882701	1967296207	10	~1999
327886343	655772687	9	~1997
327905791	3279057911	10	~1999
327907511	655815023	9	~1997
327908891	655817783	9	~1997
327909371	655818743	9	~1997
327916343	655832687	9	~1997
327917357	2623338857	10	~1999
327934979	655869959	9	~1997
327941807	2623534457	10	~1999
327951527	2623612217	10	~1999
327953669	2623629353	10	~1999
327957359	655914719	9	~1997
327966559	3279665591	10	~1999
327987119	655974239	9	~1997
328005659	656011319	9	~1997
328019231	656038463	9	~1997
328023119	656046239	9	~1997

Exponent	Prime Factor	Digits	Year
328024693	1968148159	10	~1999
328028033	1968168199	10	~1999
328035479	656070959	9	~1997
328045799	656091599	9	~1997
328047491	656094983	9	~1997
328050119	656100239	9	~1997
328057991	656115983	9	~1997
328060771	5905093879	10	~2000
328062571	320189069297	12	~2004
328067491	3280674911	10	~1999
328073051	656146103	9	~1997
328082411	656164823	9	~1997
328088251	23622354073	11	~2001
328091723	656183447	9	~1997
328093391	32153152319	11	~2002
328098923	656197847	9	~1997
328127099	656254199	9	~1997
328133627	2625069017	10	~1999
328134083	656268167	9	~1997
328134431	656268863	9	~1997
328137311	656274623	9	~1997
328141883	656283767	9	~1997
328142057	1968852343	10	~1999
328142567	2625140537	10	~1999
328143133	1968858799	10	~1999

4.739.325 digits

25-04-20