Small Mersenne Prime Factors (page 3243/5775)

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
272494511	544989023	9	~1997
272496011	544992023	9	~1997
272499611	544999223	9	~1997
272500721	2180005769	10	~1998
272505983	545011967	9	~1997
272513951	4905251119	10	~1999
272518331	545036663	9	~1997
272523143	545046287	9	~1997
272530103	545060207	9	~1997
272532131	545064263	9	~1997
272533259	545066519	9	~1997
272535589	25618345367	11	~2001
272555903	545111807	9	~1997
272566883	545133767	9	~1997
272570099	545140199	9	~1997
272588159	545176319	9	~1997
272588819	545177639	9	~1997
272590751	545181503	9	~1997
272592959	31075597327	11	~2001
272612023	2726120231	10	~1999
272614753	1635688519	10	~1998
272620433	19628671177	11	~2001
272621171	2180969369	10	~1998
272629739	6543113737	10	~2000
272635631	545271263	9	~1997

Exponent	Prime Factor	Digits	Year
272635841	1635815047	10	~1998
272637971	545275943	9	~1997
272650043	545300087	9	~1997
272657783	545315567	9	~1997
272658761	1635952567	10	~1998
272659763	545319527	9	~1997
272664299	545328599	9	~1997
272672663	545345327	9	~1997
272683343	545366687	9	~1997
272684443	2726844431	10	~1999
272693717	1636162303	10	~1998
272705243	545410487	9	~1997
272710871	545421743	9	~1997
272715181	1636291087	10	~1998
272731639	13091118673	11	~2000
272736179	545472359	9	~1997
272737463	545474927	9	~1997
272738783	545477567	9	~1997
272760547	2727605471	10	~1999
272762183	545524367	9	~1997
272765483	545530967	9	~1997
272769851	545539703	9	~1997
272771459	545542919	9	~1997
272776337	3818868719	10	~1999
272777137	1636662823	10	~1998

Exponent	Prime Factor	Digits	Year
272778007	2727780071	10	~1999
272783039	545566079	9	~1997
272786159	545572319	9	~1997
272802851	545605703	9	~1997
272804879	545609759	9	~1997
272810591	545621183	9	~1997
272815079	545630159	9	~1997
272821943	545643887	9	~1997
272822107	2728221071	10	~1999
272845691	545691383	9	~1997
272851031	545702063	9	~1997
272859599	545719199	9	~1997
272872021	1637232127	10	~1998
272884211	2183073689	10	~1998
272885051	545770103	9	~1997
272887031	545774063	9	~1997
272908511	2183268089	10	~1998
272911811	545823623	9	~1997
272912363	7095721439	10	~2000
272926259	545852519	9	~1997
272929681	1637578087	10	~1998
272945093	8188352791	10	~2000
272945831	545891663	9	~1997
272947091	545894183	9	~1997
272948303	545896607	9	~1997

Exponent	Prime Factor	Digits	Year
272954257	1637725543	10	~1998
272955971	545911943	9	~1997
272959499	545918999	9	~1997
272960453	1637762719	10	~1998
272962451	545924903	9	~1997
272963903	545927807	9	~1997
272971117	1637826703	10	~1998
272987399	545974799	9	~1997
272994311	545988623	9	~1997
272998391	545996783	9	~1997
273016883	546033767	9	~1997
273032803	2730328031	10	~1999
273036503	546073007	9	~1997
273040007	2184320057	10	~1998
273046799	546093599	9	~1997
273048361	1638290167	10	~1998
273049229	2184393833	10	~1998
273055883	546111767	9	~1997
273059543	546119087	9	~1997
273061741	12560840087	11	~2000
273068179	2730681791	10	~1999
273073103	546146207	9	~1997
273075083	546150167	9	~1997
273083849	2184670793	10	~1998
273087007	4369392113	10	~1999

5.471.290 digits

26-03-29