Difference between revisions of "M37"

Latest revision as of 11:04, 18 February 2019

M37
Prime class :
Type :	Mersenne prime
Formula :	M_n = 2ⁿ - 1
Prime data :
Rank :	37
n-value :	3,021,377
Number :	127411683030...973024694271
Digits :	909,526
Perfect number :	2^3,021,376 • (2^3,021,377-1)
Digits :	1,819,050
Discovery data :
Date of Discovery :	1998-01-27
Discoverer :	Roland Clarkson
Found with :	Lucas-Lehmer test / Prime95 on 200 MHz Pentium PC
Credits :	George Woltman et. al. GIMPS

M37 is the short hand used to refer to the 37th Mersenne prime. Specifically it is 2^3,021,377-1. This number was discovered to be prime on 1988-01-27 by Roland Clarkson, using Prime95 written by George Woltman. The number is 909,526 decimal digits long.

This prime number was the third record prime found by the GIMPS project.

@@ Line 1: / Line 1: @@
-'''M37''' is the short hand used to refer to the 37th [[Mersenne prime]]. Specifically it is <math>2^{3\,021\,377}-1</math>. This number was discovered to be [[prime]] on 1988-01-27 by [[Roland Clarkson]], using [[Prime95]] written by [[George Woltman]]. The number is [http://www.mersenneforum.org/txt/37.txt 909 526 decimal digits] long.
+{{InfoboxMersennePrime
+| title=M37
+| rank=37
+| nvalue=3021377
+| top5000id=3
+| digits=909526
+| number=127411683030...973024694271
+| pdigits=1819050
+| discovery=1998-01-27
+| discoverer=[[Roland Clarkson]]
+| foundwith=[[Lucas-Lehmer test]] / [[Prime95]] on 200 MHz Pentium [[Personal computer|PC]]
+| credits=[[George Woltman]] et. al.;[[GIMPS]]
+}}
+'''M37''' is the short hand used to refer to the 37th [[Mersenne prime]]. Specifically it is 2<sup>{{Num|3021377}}</sup>-1. This number was discovered to be [[prime]] on 1988-01-27 by [[Roland Clarkson]], using [[Prime95]] written by [[George Woltman]]. The number is [http://www.mersenneforum.org/txt/37.txt {{Num|909526}} decimal digits] long.
 This prime number was the third record prime found by the [[GIMPS]] project.