Small Mersenne Prime Factors (page 4632/5130)

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
29948034491	239584275929	12	~2014
29949936563	59899873127	11	~2013
29951020871	59902041743	11	~2013
29951228171	59902456343	11	~2013
29951310743	59902621487	11	~2013
29951937019	299519370191	12	~2015
29952726803	59905453607	11	~2013
29954881571	59909763143	11	~2013
29955403031	59910806063	11	~2013
29955576379	299555763791	12	~2015
29961189403	299611894031	12	~2015
29962359247	479397747953	12	~2015
29963166983	59926333967	11	~2013
29963720459	59927440919	11	~2013
29963726879	59927453759	11	~2013
29964453143	59928906287	11	~2013
29964476219	59928952439	11	~2013
29966067959	59932135919	11	~2013
29966836013	2487...890791	14	2023
29967024623	59934049247	11	~2013
29967277751	59934555503	11	~2013
29968770719	59937541439	11	~2013
29970383171	59940766343	11	~2013
29971260911	239770087289	12	~2014
29973180203	59946360407	11	~2013

Exponent	Prime Factor	Dig.	Year
29973973871	59947947743	11	~2013
29974891747	539548051447	12	~2015
29975176741	179851060447	12	~2014
29975324051	59950648103	11	~2013
29975612531	59951225063	11	~2013
29975850263	59951700527	11	~2013
29977478291	59954956583	11	~2013
29979578201	179877469207	12	~2014
29981540279	59963080559	11	~2013
29982735617	179896413703	12	~2014
29984074691	239872597529	12	~2014
29985503081	179913018487	12	~2014
29986995653	179921973919	12	~2014
29987116277	179922697663	12	~2014
29987389589	719697350137	12	~2015
29988058343	719713400233	12	~2015
29993222543	59986445087	11	~2013
29993879711	59987759423	11	~2013
29994410531	59988821063	11	~2013
29994917831	59989835663	11	~2013
29995117331	59990234663	11	~2013
29997535811	59995071623	11	~2013
29998876499	59997752999	11	~2013
30000666079	300006660791	12	~2015
30002964851	60005929703	11	~2013

Exponent	Prime Factor	Dig.	Year
30005216399	60010432799	11	~2013
30006517043	60013034087	11	~2013
30009562991	240076503929	12	~2014
30011005331	60022010663	11	~2013
30011496803	60022993607	11	~2013
30012449069	240099592553	12	~2014
30016642619	60033285239	11	~2013
30017838659	60035677319	11	~2013
30019317071	60038634143	11	~2013
30020684891	60041369783	11	~2013
30020950331	60041900663	11	~2013
30021343211	60042686423	11	~2013
30022207223	60044414447	11	~2013
30022476779	60044953559	11	~2013
30022510379	60045020759	11	~2013
30022989719	60045979439	11	~2013
30024229021	180145374127	12	~2014
30025807043	60051614087	11	~2013
30025896839	60051793679	11	~2013
30027390803	60054781607	11	~2013
30030427439	60060854879	11	~2013
30031774343	60063548687	11	~2013
30032226863	60064453727	11	~2013
30034457759	60068915519	11	~2013
30035904779	60071809559	11	~2013

Exponent	Prime Factor	Dig.	Year
30037633993	180225803959	12	~2014
30038867483	60077734967	11	~2013
30038988503	60077977007	11	~2013
30039885983	60079771967	11	~2013
30040012451	60080024903	11	~2013
30041062211	60082124423	11	~2013
30042077621	180252465727	12	~2014
30042599831	60085199663	11	~2013
30043398023	60086796047	11	~2013
30044266331	60088532663	11	~2013
30045482699	60090965399	11	~2013
30047435843	60094871687	11	~2013
30048061877	240384495017	12	~2014
30048668183	60097336367	11	~2013
30049042411	300490424111	12	~2015
30049432663	300494326631	12	~2015
30049918859	60099837719	11	~2013
30051876839	60103753679	11	~2013
30052067761	480833084177	12	~2015
30054251141	180325506847	12	~2014
30054402397	180326414383	12	~2014
30055119719	60110239439	11	~2013
30056431631	60112863263	11	~2013
30056560139	60113120279	11	~2013
30056714711	60113429423	11	~2013

4.828.532 digits

25-06-01