Small Mersenne Prime Factors (page 3731/5205)

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
1503987011	3007974023	10	~2003
1503988427	72191444497	11	~2006
1503991871	3007983743	10	~2003
1504029119	3008058239	10	~2003
1504065551	3008131103	10	~2003
1504151393	9024908359	10	~2004
1504173119	3008346239	10	~2003
1504177523	3008355047	10	~2003
1504189943	3008379887	10	~2003
1504253417	9025520503	10	~2004
1504254977	12034039817	11	~2004
1504315223	3008630447	10	~2003
1504328767	24069260273	11	~2005
1504336927	27078064687	11	~2005
1504343063	3008686127	10	~2003
1504349279	3008698559	10	~2003
1504673879	48149564129	11	~2006
1504760459	3009520919	10	~2003
1504770467	12038163737	11	~2004
1504801973	9028811839	10	~2004
1504808243	3009616487	10	~2003
1504832941	9028997647	10	~2004
1504833923	3009667847	10	~2003
1504838591	3009677183	10	~2003
1504944733	9029668399	10	~2004

Exponent	Prime Factor	Digits	Year
1504963871	3009927743	10	~2003
1505002199	3010004399	10	~2003
1505044631	3010089263	10	~2003
1505080901	12040647209	11	~2004
1505084291	3010168583	10	~2003
1505084351	3010168703	10	~2003
1505199791	3010399583	10	~2003
1505201039	3010402079	10	~2003
1505299223	3010598447	10	~2003
1505391323	3010782647	10	~2003
1505415479	3010830959	10	~2003
1505480591	3010961183	10	~2003
1505481143	3010962287	10	~2003
1505483579	3010967159	10	~2003
1505495471	3010990943	10	~2003
1505501219	3011002439	10	~2003
1505518633	9033111799	10	~2004
1505521403	3011042807	10	~2003
1505566511	3011133023	10	~2003
1505577611	3011155223	10	~2003
1505600737	9033604423	10	~2004
1505653481	12045227849	11	~2004
1505737451	3011474903	10	~2003
1505783033	9034698199	10	~2004
1505793323	3011586647	10	~2003

Exponent	Prime Factor	Digits	Year
1505837779	15058377791	11	~2004
1505895043	24094320689	11	~2005
1505903603	3011807207	10	~2003
1505936953	180712434361	12	~2007
1505953703	3011907407	10	~2003
1505959493	9035756959	10	~2004
1505973263	3011946527	10	~2003
1505990957	12047927657	11	~2004
1505995703	3011991407	10	~2003
1506030847	51205048799	11	~2006
1506038783	3012077567	10	~2003
1506046981	144580510177	12	~2007
1506105149	12048841193	11	~2004
1506127523	3012255047	10	~2003
1506278723	3012557447	10	~2003
1506295799	3012591599	10	~2003
1506317339	3012634679	10	~2003
1506323639	3012647279	10	~2003
1506326411	3012652823	10	~2003
1506338843	3012677687	10	~2003
1506435067	241029610721	12	~2007
1506647843	3013295687	10	~2003
1506680951	3013361903	10	~2003
1507003703	3014007407	10	~2003
1507038191	3014076383	10	~2003

Exponent	Prime Factor	Digits	Year
1507202591	3014405183	10	~2003
1507216751	3014433503	10	~2003
1507217629	33158787839	11	~2005
1507217801	9043306807	10	~2004
1507266791	3014533583	10	~2003
1507301513	9043809079	10	~2004
1507327541	9043965247	10	~2004
1507420751	3014841503	10	~2003
1507453091	3014906183	10	~2003
1507477177	9044863063	10	~2004
1507584223	15075842231	11	~2004
1507612567	24121801073	11	~2005
1507647191	3015294383	10	~2003
1507668551	3015337103	10	~2003
1507706413	9046238479	10	~2004
1507723213	9046339279	10	~2004
1507782203	3015564407	10	~2003
1507805303	3015610607	10	~2003
1507894331	3015788663	10	~2003
1508016431	3016032863	10	~2003
1508064179	3016128359	10	~2003
1508084111	3016168223	10	~2003
1508086763	36194082313	11	~2005
1508180711	3016361423	10	~2003
1508187251	3016374503	10	~2003

4.903.097 digits

25-07-08