Small Mersenne Prime Factors (page 4030/5025)

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
4892003771	9784007543	10	~2007
4892035237	29352211423	11	~2008
4892162183	9784324367	10	~2007
4892422091	9784844183	10	~2007
4892888783	9785777567	10	~2007
4892971463	9785942927	10	~2007
4892973469	264220567327	12	~2010
4892975831	9785951663	10	~2007
4893169709	39145357673	11	~2008
4893326159	9786652319	10	~2007
4894099139	9788198279	10	~2007
4894161403	48941614031	11	~2008
4894341563	9788683127	10	~2007
4894405753	29366434519	11	~2008
4894634861	39157078889	11	~2008
4894754339	9789508679	10	~2007
4894815647	127265206823	12	~2009
4895009677	29370058063	11	~2008
4895073311	9790146623	10	~2007
4895464163	9790928327	10	~2007
4895541943	78328671089	11	~2009
4895801591	9791603183	10	~2007
4895809573	29374857439	11	~2008
4895812511	39166500089	11	~2008
4895898863	9791797727	10	~2007

Exponent	Prime Factor	Digits	Year
4896330839	9792661679	10	~2007
4896587471	9793174943	10	~2007
4896671957	29380031743	11	~2008
4896902663	9793805327	10	~2007
4897002191	9794004383	10	~2007
4897271303	9794542607	10	~2007
4897450541	39179604329	11	~2008
4897583543	9795167087	10	~2007
4897682819	9795365639	10	~2007
4897890479	9795780959	10	~2007
4898102263	48981022631	11	~2008
4898373059	9796746119	10	~2007
4898510159	9797020319	10	~2007
4898527133	29391162799	11	~2008
4898553251	9797106503	10	~2007
4898755943	9797511887	10	~2007
4898847461	29393084767	11	~2008
4898904743	9797809487	10	~2007
4899175091	9798350183	10	~2007
4899309671	9798619343	10	~2007
4899633131	9799266263	10	~2007
4899810089	264589744807	12	~2010
4899811883	9799623767	10	~2007
4900044839	9800089679	10	~2007
4900069319	9800138639	10	~2007

Exponent	Prime Factor	Digits	Year
4900494491	9800988983	10	~2007
4900610171	9801220343	10	~2007
4900643471	88211582479	11	~2009
4900970077	29405820463	11	~2008
4901238677	29407432063	11	~2008
4901337851	9802675703	10	~2007
4901363897	39210911177	11	~2008
4901411279	9802822559	10	~2007
4901517581	29409105487	11	~2008
4901796527	39214372217	11	~2008
4902043859	9804087719	10	~2007
4902410783	9804821567	10	~2007
4902541463	9805082927	10	~2007
4902878581	29417271487	11	~2008
4902896879	9805793759	10	~2007
4902938231	9805876463	10	~2007
4902941653	107864716367	12	~2009
4903179191	9806358383	10	~2007
4903216597	29419299583	11	~2008
4903288697	147098660911	12	~2010
4903315931	274585692137	12	~2010
4903406657	29420439943	11	~2008
4903564931	9807129863	10	~2007
4904439377	68662151279	11	~2009
4904804603	9809609207	10	~2007

Exponent	Prime Factor	Digits	Year
4904985131	9809970263	10	~2007
4905046141	29430276847	11	~2008
4905192023	9810384047	10	~2007
4905219551	9810439103	10	~2007
4905290171	9810580343	10	~2007
4905358561	29432151367	11	~2008
4905461279	9810922559	10	~2007
4905482831	9810965663	10	~2007
4905744317	68680420439	11	~2009
4905986339	9811972679	10	~2007
4906118291	9812236583	10	~2007
4906307099	9812614199	10	~2007
4906322107	78501153713	11	~2009
4906604711	9813209423	10	~2007
4906734023	9813468047	10	~2007
4906973339	9813946679	10	~2007
4907187443	9814374887	10	~2007
4907435783	9814871567	10	~2007
4907514481	78520231697	11	~2009
4907791331	9815582663	10	~2007
4907995223	9815990447	10	~2007
4908073139	9816146279	10	~2007
4908141443	9816282887	10	~2007
4908336683	9816673367	10	~2007
4908484811	9816969623	10	~2007

4.724.182 digits

25-04-13