Small Mersenne Prime Factors (page 3884/5460)

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
1494910919	2989821839	10	~2003
1494987541	8969925247	10	~2004
1494993971	2989987943	10	~2003
1495001089	107640078409	12	~2006
1495070191	14950701911	11	~2004
1495081331	2990162663	10	~2003
1495119299	2990238599	10	~2003
1495131083	2990262167	10	~2003
1495142111	2990284223	10	~2003
1495150619	2990301239	10	~2003
1495192739	2990385479	10	~2003
1495226003	2990452007	10	~2003
1495232353	8971394119	10	~2004
1495239923	2990479847	10	~2003
1495311641	11962493129	11	~2004
1495401599	2990803199	10	~2003
1495417811	26917520599	11	~2005
1495462627	35891103049	11	~2005
1495499371	23927989937	11	~2005
1495526183	2991052367	10	~2003
1495598543	2991197087	10	~2003
1495599779	2991199559	10	~2003
1495612381	8973674287	10	~2004
1495640453	8973842719	10	~2004
1495692983	2991385967	10	~2003

Exponent	Prime Factor	Digits	Year
1495772051	2991544103	10	~2003
1495787879	2991575759	10	~2003
1495844579	71800539793	11	~2006
1495908383	2991816767	10	~2003
1495961353	8975768119	10	~2004
1495997609	11967980873	11	~2004
1496016461	8976098767	10	~2004
1496020429	104721430031	12	~2006
1496038991	2992077983	10	~2003
1496071211	2992142423	10	~2003
1496105957	56852026367	11	~2006
1496176553	8977059319	10	~2004
1496191919	2992383839	10	~2003
1496228411	2992456823	10	~2003
1496245097	8977470583	10	~2004
1496343311	2992686623	10	~2003
1496375123	2992750247	10	~2003
1496403983	2992807967	10	~2003
1496410247	11971281977	11	~2004
1496453411	2992906823	10	~2003
1496455199	2992910399	10	~2003
1496455993	212496751007	12	~2007
1496460341	11971682729	11	~2004
1496482913	8978897479	10	~2004
1496540891	2993081783	10	~2003

Exponent	Prime Factor	Digits	Year
1496558939	2993117879	10	~2003
1496563259	2993126519	10	~2003
1496631599	2993263199	10	~2003
1496650283	2993300567	10	~2003
1496711971	14967119711	11	~2004
1496731331	26941163959	11	~2005
1496821043	2993642087	10	~2003
1496893019	2993786039	10	~2003
1497007333	8982043999	10	~2004
1497030023	98803981519	11	~2006
1497069689	20958975647	11	~2005
1497141851	2994283703	10	~2003
1497190031	2994380063	10	~2003
1497193583	2994387167	10	~2003
1497201851	2994403703	10	~2003
1497214217	8983285303	10	~2004
1497258803	2994517607	10	~2003
1497326279	2994652559	10	~2003
1497326339	2994652679	10	~2003
1497405313	35937727513	11	~2005
1497465659	2994931319	10	~2003
1497529343	2995058687	10	~2003
1497567419	2995134839	10	~2003
1497594911	2995189823	10	~2003
1497661523	2995323047	10	~2003

Exponent	Prime Factor	Digits	Year
1497697319	2995394639	10	~2003
1497740771	11981926169	11	~2004
1497742733	8986456399	10	~2004
1497761113	8986566679	10	~2004
1497765011	2995530023	10	~2003
1497767963	2995535927	10	~2003
1497838679	2995677359	10	~2003
1497840307	35948167369	11	~2005
1497858337	8987150023	10	~2004
1497884159	2995768319	10	~2003
1497885217	8987311303	10	~2004
1497899839	26962197103	11	~2005
1497912131	2995824263	10	~2003
1497915623	2995831247	10	~2003
1497916573	8987499439	10	~2004
1497921179	2995842359	10	~2003
1497941891	2995883783	10	~2003
1497968663	2995937327	10	~2003
1497974171	2995948343	10	~2003
1498043759	2996087519	10	~2003
1498051343	2996102687	10	~2003
1498217081	11985736649	11	~2004
1498256183	2996512367	10	~2003
1498318439	2996636879	10	~2003
1498400831	2996801663	10	~2003

5.157.210 digits

25-11-02