Small Mersenne Prime Factors (page 4568/5190)

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
19623449291	39246898583	11	~2011
19624178891	39248357783	11	~2011
19624365161	117746190967	12	~2013
19624443131	39248886263	11	~2011
19625103493	117750620959	12	~2013
19625265313	117751591879	12	~2013
19625742863	39251485727	11	~2011
19625838767	510271807943	12	~2014
19626148991	39252297983	11	~2011
19628230691	39256461383	11	~2011
19628426099	39256852199	11	~2011
19629084551	39258169103	11	~2011
19631929679	39263859359	11	~2011
19631992333	117791953999	12	~2013
19634032163	39268064327	11	~2011
19634505899	39269011799	11	~2011
19634808731	39269617463	11	~2011
19638147059	39276294119	11	~2011
19638354193	117830125159	12	~2013
19638559379	39277118759	11	~2011
19639016219	39278032439	11	~2011
19639329973	117835979839	12	~2013
19639402103	39278804207	11	~2011
19639446611	39278893223	11	~2011
19639665893	274955322503	12	~2013

Exponent	Prime Factor	Dig.	Year
19639927691	39279855383	11	~2011
19639982903	39279965807	11	~2011
19640107631	39280215263	11	~2011
19640813183	39281626367	11	~2011
19640830189	471379924537	12	~2014
19642014383	39284028767	11	~2011
19643788091	39287576183	11	~2011
19643816243	39287632487	11	~2011
19645854793	117875128759	12	~2013
19646195713	117877174279	12	~2013
19646605633	117879633799	12	~2013
19646623211	39293246423	11	~2011
19646901779	39293803559	11	~2011
19648981151	39297962303	11	~2011
19650440483	39300880967	11	~2011
19650638537	117903831223	12	~2013
19651521661	117909129967	12	~2013
19652213363	39304426727	11	~2011
19654376939	39308753879	11	~2011
19654690703	39309381407	11	~2011
19656683999	39313367999	11	~2011
19657022351	39314044703	11	~2011
19657387031	39314774063	11	~2011
19658061743	39316123487	11	~2011
19658079179	39316158359	11	~2011

Exponent	Prime Factor	Dig.	Year
19658387939	39316775879	11	~2011
19659115409	157272923273	12	~2013
19659234251	39318468503	11	~2011
19659785363	39319570727	11	~2011
19659897371	39319794743	11	~2011
19662647759	39325295519	11	~2011
19662840779	39325681559	11	~2011
19662926183	39325852367	11	~2011
19663496519	39326993039	11	~2011
19664965223	39329930447	11	~2011
19665178079	39330356159	11	~2011
19666886537	157335092297	12	~2013
19666977923	39333955847	11	~2011
19668802343	39337604687	11	~2011
19670641031	39341282063	11	~2011
19672025123	39344050247	11	~2011
19672688653	118036131919	12	~2013
19673800151	157390401209	12	~2013
19673864471	39347728943	11	~2011
19675797191	39351594383	11	~2011
19677526793	275485375103	12	~2013
19679351651	39358703303	11	~2011
19679696831	39359393663	11	~2011
19680102059	39360204119	11	~2011
19682050499	39364100999	11	~2011

Exponent	Prime Factor	Dig.	Year
19682627963	39365255927	11	~2011
19683640421	157469123369	12	~2013
19684008551	39368017103	11	~2011
19684572503	39369145007	11	~2011
19684590911	39369181823	11	~2011
19684841051	39369682103	11	~2011
19685040757	118110244543	12	~2013
19685310371	39370620743	11	~2011
19686052079	157488416633	12	~2013
19687972393	118127834359	12	~2013
19688998753	118133992519	12	~2013
19689043259	39378086519	11	~2011
19691284859	39382569719	11	~2011
19691792759	157534342073	12	~2013
19692006683	39384013367	11	~2011
19692351083	39384702167	11	~2011
19694336411	39388672823	11	~2011
19694383211	39388766423	11	~2011
19694838941	157558711529	12	~2013
19694913373	118169480239	12	~2013
19695326663	39390653327	11	~2011
19697088371	39394176743	11	~2011
19699326377	118195958263	12	~2013
19699546631	39399093263	11	~2011
19699646003	39399292007	11	~2011

4.888.230 digits

25-06-29