Small Mersenne Prime Factors (page 2409/5025)

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
100402499	200804999	9	~1993
100402931	200805863	9	~1993
100406219	200812439	9	~1993
100409611	1004096111	10	~1995
100410263	200820527	9	~1993
100411211	200822423	9	~1993
100416971	200833943	9	~1993
100417607	1807516927	10	~1996
100425023	200850047	9	~1993
100425719	200851439	9	~1993
100429019	200858039	9	~1993
100430761	2209476743	10	~1996
100433941	602603647	9	~1995
100435103	200870207	9	~1993
100438823	200877647	9	~1993
100440143	200880287	9	~1993
100440239	200880479	9	~1993
100444607	803556857	9	~1995
100446743	200893487	9	~1993
100447643	200895287	9	~1993
100447799	803582393	9	~1995
100448923	2410774153	10	~1996
100449179	200898359	9	~1993
100450351	6629723167	10	~1997
100450379	200900759	9	~1993

Exponent	Prime Factor	Digits	Year
100451303	200902607	9	~1993
100455119	200910239	9	~1993
100457603	200915207	9	~1993
100458671	2611925447	10	~1996
100462451	200924903	9	~1993
100464443	3214862177	10	~1996
100471991	200943983	9	~1993
100474877	5626593113	10	~1997
100476479	200952959	9	~1993
100477099	12057251881	11	~1998
100477261	602863567	9	~1995
100477319	200954639	9	~1993
100477589	803820713	9	~1995
100479941	602879647	9	~1995
100480283	200960567	9	~1993
100482131	200964263	9	~1993
100485719	200971439	9	~1993
100486559	200973119	9	~1993
100486651	1607786417	10	~1996
100486663	1004866631	10	~1995
100486811	200973623	9	~1993
100487423	200974847	9	~1993
100488383	200976767	9	~1993
100488749	803909993	9	~1995
100488841	602933047	9	~1995

Exponent	Prime Factor	Digits	Year
100490171	200980343	9	~1993
100490471	200980943	9	~1993
100492571	200985143	9	~1993
100492883	200985767	9	~1993
100493663	200987327	9	~1993
100495781	803966249	9	~1995
100499281	2210984183	10	~1996
100505291	201010583	9	~1993
100508311	1005083111	10	~1995
100512193	24725999479	11	~1999
100513597	1608217553	10	~1996
100513823	201027647	9	~1993
100514429	3819548303	10	~1997
100514891	201029783	9	~1993
100521719	201043439	9	~1993
100522703	201045407	9	~1993
100524899	201049799	9	~1993
100526759	201053519	9	~1993
100527083	201054167	9	~1993
100529651	201059303	9	~1993
100531283	201062567	9	~1993
100531703	201063407	9	~1993
100534877	804279017	9	~1995
100535003	201070007	9	~1993
100535159	201070319	9	~1993

Exponent	Prime Factor	Digits	Year
100535173	603211039	9	~1995
100535531	201071063	9	~1993
100541123	201082247	9	~1993
100542713	603256279	9	~1995
100545383	201090767	9	~1993
100550341	603302047	9	~1995
100553591	201107183	9	~1993
100556413	603338479	9	~1995
100556831	201113663	9	~1993
100558571	201117143	9	~1993
100562017	603372103	9	~1995
100564391	201128783	9	~1993
100567717	603406303	9	~1995
100568771	201137543	9	~1993
100569431	201138863	9	~1993
100571171	201142343	9	~1993
100571699	201143399	9	~1993
100571741	804573929	9	~1995
100575539	804604313	9	~1995
100575809	1408061327	10	~1996
100576439	201152879	9	~1993
100579643	5028982151	10	~1997
100584041	804672329	9	~1995
100586023	1005860231	10	~1995
100586483	201172967	9	~1993

4.724.182 digits

25-04-13