Curious formula generating all digits of square root numbers - AnalyticBridge2020-11-24T12:18:41Zhttps://www.analyticbridge.datasciencecentral.com/forum/topics/challenge-of-the-week-square-root-of-two?commentId=2004291%3AComment%3A338272&feed=yes&xn_auth=noMany sequences thought to be…tag:www.analyticbridge.datasciencecentral.com,2015-12-13:2004291:Comment:3382722015-12-13T17:52:15.944ZVincent Granvillehttps://www.analyticbridge.datasciencecentral.com/profile/VincentGranville
<p>Many sequences thought to be random, are not. For instance, the fractional part of log(n), for n = 2, 3, 4 et cetera, is not uniformly distributed on [0, 1], according to a theorem by Kuipers and Niederreiter.</p>
<p>Many sequences thought to be random, are not. For instance, the fractional part of log(n), for n = 2, 3, 4 et cetera, is not uniformly distributed on [0, 1], according to a theorem by Kuipers and Niederreiter.</p> The numbers in column 4p(n)+1…tag:www.analyticbridge.datasciencecentral.com,2014-09-04:2004291:Comment:3070012014-09-04T02:13:39.713ZAnalytic Girlhttps://www.analyticbridge.datasciencecentral.com/profile/AnalyticBridge
<p>The numbers in column 4p(n)+1-2e(n) in Figure 1 don't have many divisors; prime numbers seem over-represented in that column. Quite a few are divisible by 7. Interesting.</p>
<p>The numbers in column 4p(n)+1-2e(n) in Figure 1 don't have many divisors; prime numbers seem over-represented in that column. Quite a few are divisible by 7. Interesting.</p>