367 (another Prime Pages' Curiosity)
 Curios: Curios Search:   Participate: GIMPS has discovered a new largest known prime number: 282589933-1 (24,862,048 digits) The Pythagorean Proposition, by early 20th century professor Elisha Scott Loomis, is a collection of 367 proofs of the Pythagorean Theorem. At least 367 people have to be gathered together in order to ensure that two of them share a common birthday--but far fewer usually suffices. [Beedassy] The largest number whose square (134689) has strictly increasing digits. [Beedassy] (367, 373) is the only pair of 3-digit primes p, q, such that p#+q and p#-q are simultaneously primes, for p, q consecutive primes. [Loungrides] The smallest prime whose digits form a scalene triangle. [Loungrides] If A = 2, B = 3, C = 5, D = 7, ... , Z = 101 then 'CHEN JINGRUN' is prime. Note that 367 is the 73rd prime number and 73 is part of a Chen prime pair. [Homewood] 367 = 19084/52 is a pandigital expression. [Gaydos] (There are 2 curios for this number that have not yet been approved by an editor.) Prime Curios! © 2000-2019 (all rights reserved)  privacy statement   (This page was generated in 0.0294 seconds.)