Small Mersenne Prime Factors (page 4260/5025)

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	Dig.	Year
10437877511	20875755023	11	~2009
10438018991	20876037983	11	~2009
10438209851	20876419703	11	~2009
10438554779	20877109559	11	~2009
10438978229	83511825833	11	~2011
10439145403	417565816121	12	~2012
10440785477	62644712863	11	~2010
10440796319	20881592639	11	~2009
10441099271	20882198543	11	~2009
10441504823	20883009647	11	~2009
10441635923	20883271847	11	~2009
10441950371	20883900743	11	~2009
10442141209	229727106599	12	~2012
10442409599	20884819199	11	~2009
10442824559	20885649119	11	~2009
10442947811	20885895623	11	~2009
10443393161	83547145289	11	~2011
10443785249	83550281993	11	~2011
10444846757	62669080543	11	~2010
10445431247	772961912279	12	~2013
10445447399	20890894799	11	~2009
10446624119	20893248239	11	~2009
10446624371	20893248743	11	~2009
10446634031	20893268063	11	~2009
10447188131	20894376263	11	~2009

Exponent	Prime Factor	Dig.	Year
10447312907	83578503257	11	~2011
10447965431	20895930863	11	~2009
10448013659	20896027319	11	~2009
10448027873	62688167239	11	~2010
10448593871	20897187743	11	~2009
10449188219	20898376439	11	~2009
10449355151	20898710303	11	~2009
10449680651	20899361303	11	~2009
10449915923	20899831847	11	~2009
10450179799	104501797991	12	~2011
10450627867	104506278671	12	~2011
10450650659	20901301319	11	~2009
10451141279	20902282559	11	~2009
10451214359	20902428719	11	~2009
10451406071	83611248569	11	~2011
10451630963	20903261927	11	~2009
10452207431	20904414863	11	~2009
10452226079	20904452159	11	~2009
10452275857	62713655143	11	~2010
10452630143	20905260287	11	~2009
10452815161	62716890967	11	~2010
10453154339	20906308679	11	~2009
10454210099	20908420199	11	~2009
10454644943	20909289887	11	~2009
10455673703	20911347407	11	~2009

Exponent	Prime Factor	Dig.	Year
10457025179	20914050359	11	~2009
10457062081	62742372487	11	~2010
10457101859	20914203719	11	~2009
10458108971	20916217943	11	~2009
10458146339	20916292679	11	~2009
10458206543	20916413087	11	~2009
10458281437	62749688623	11	~2010
10458330203	20916660407	11	~2009
10459506119	20919012239	11	~2009
10459955003	20919910007	11	~2009
10460188001	83681504009	11	~2011
10460349191	83682793529	11	~2011
10460374471	3332...064607	14	2024
10460532611	20921065223	11	~2009
10460808977	62764853863	11	~2010
10460895479	20921790959	11	~2009
10461369071	20922738143	11	~2009
10461530531	20923061063	11	~2009
10461628811	20923257623	11	~2009
10461845363	20923690727	11	~2009
10462419839	20924839679	11	~2009
10462578671	188326416079	12	~2012
10463150723	20926301447	11	~2009
10464087749	146497228487	12	~2011
10464828001	62788968007	11	~2010

Exponent	Prime Factor	Dig.	Year
10464919043	20929838087	11	~2009
10464941533	62789649199	11	~2010
10465230421	62791382527	11	~2010
10465322963	20930645927	11	~2009
10465537151	20931074303	11	~2009
10466898371	20933796743	11	~2009
10467327131	20934654263	11	~2009
10467522953	62805137719	11	~2010
10467542077	167480673233	12	~2011
10467552923	20935105847	11	~2009
10468580519	20937161039	11	~2009
10468921583	20937843167	11	~2009
10469130779	20938261559	11	~2009
10469473571	20938947143	11	~2009
10469683751	20939367503	11	~2009
10469877073	62819262439	11	~2010
10469894777	62819368663	11	~2010
10469940839	20939881679	11	~2009
10470356483	20940712967	11	~2009
10470436271	20940872543	11	~2009
10470533039	20941066079	11	~2009
10470682097	83765456777	11	~2011
10470824159	20941648319	11	~2009
10470835171	104708351711	12	~2011
10471092431	20942184863	11	~2009

4.724.182 digits

25-04-13