Small Mersenne Prime Factors (page 2870/5235)

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
211196053	1267176319	10	~1997
211205441	8025806759	10	~1999
211206731	422413463	9	~1996
211206893	1267241359	10	~1997
211216079	422432159	9	~1996
211226651	422453303	9	~1996
211226663	422453327	9	~1996
211228631	422457263	9	~1996
211232459	422464919	9	~1996
211236161	1267416967	10	~1997
211236563	422473127	9	~1996
211240741	1267444447	10	~1997
211248413	6337452391	10	~1999
211250159	422500319	9	~1996
211253143	2112531431	10	~1998
211255127	5070123049	10	~1999
211256711	422513423	9	~1996
211259621	1267557727	10	~1997
211261079	422522159	9	~1996
211262171	422524343	9	~1996
211262503	7182925103	10	~1999
211280099	422560199	9	~1996
211285559	422571119	9	~1996
211302779	422605559	9	~1996
211307471	422614943	9	~1996

Exponent	Prime Factor	Digits	Year
211309741	1267858447	10	~1997
211313471	422626943	9	~1996
211315073	1267890439	10	~1997
211320581	1267923487	10	~1997
211320773	6762264737	10	~1999
211324013	1267944079	10	~1997
211324979	422649959	9	~1996
211332761	1267996567	10	~1997
211338623	422677247	9	~1996
211346129	1690769033	10	~1997
211350539	422701079	9	~1996
211352591	422705183	9	~1996
211361429	6763565729	10	~1999
211364423	422728847	9	~1996
211364903	422729807	9	~1996
211369451	422738903	9	~1996
211374503	422749007	9	~1996
211375001	1691000009	10	~1997
211377157	1268262943	10	~1997
211387073	1268322439	10	~1997
211389851	422779703	9	~1996
211403999	422807999	9	~1996
211409531	422819063	9	~1996
211423931	422847863	9	~1996
211429417	54125930753	11	~2001

Exponent	Prime Factor	Digits	Year
211445401	1268672407	10	~1997
211455311	422910623	9	~1996
211456321	1268737927	10	~1997
211458983	422917967	9	~1996
211463579	1691708633	10	~1997
211468343	422936687	9	~1996
211473973	1268843839	10	~1997
211475219	422950439	9	~1996
211481663	422963327	9	~1996
211491227	1691929817	10	~1997
211493603	422987207	9	~1996
211493837	1268963023	10	~1997
211494743	422989487	9	~1996
211500083	423000167	9	~1996
211508827	2115088271	10	~1998
211526123	423052247	9	~1996
211528931	423057863	9	~1996
211531037	1692248297	10	~1997
211533911	423067823	9	~1996
211537351	35538274969	11	~2001
211546091	423092183	9	~1996
211547183	423094367	9	~1996
211548331	2115483311	10	~1998
211557179	423114359	9	~1996
211559063	423118127	9	~1996

Exponent	Prime Factor	Digits	Year
211559111	1692472889	10	~1997
211581179	423162359	9	~1996
211582691	423165383	9	~1996
211583453	1269500719	10	~1997
211584311	423168623	9	~1996
211587851	423175703	9	~1996
211589221	1269535327	10	~1997
211595399	423190799	9	~1996
211597871	423195743	9	~1996
211601063	423202127	9	~1996
211605593	5078534233	10	~1999
211616711	423233423	9	~1996
211616903	423233807	9	~1996
211618513	6348555391	10	~1999
211620191	423240383	9	~1996
211624163	423248327	9	~1996
211624613	1269747679	10	~1997
211634771	423269543	9	~1996
211637339	1693098713	10	~1997
211637999	423275999	9	~1996
211641863	423283727	9	~1996
211649539	2116495391	10	~1998
211651619	423303239	9	~1996
211659011	423318023	9	~1996
211661771	423323543	9	~1996

4.933.056 digits

25-07-20