Why the Kirnberger Kernel Is So Small
Popular Physics
2009-07-31 v1
Abstract
Defining the musical interval of the Kirnberger kernel, or Kirn-kern, to be one-twelfth the atom of Kirnberger, or the difference between a grad and a schisma, its natural logarithm, k = (161/12)\ln{2}-7\ln{3}-\ln{5}, is extremely small, k ~ 0.000000739401. Here an explanation of this coincidence is given by showing that k = (1/6)(11\tanh^{-1}[(3/23)/11] - 21\tanh^{-1}[(3/23)/21]) ~ (2^5 5)/(3 7^2 11^2 23^3) ~ 0.000000739322.
Cite
@article{arxiv.0907.5249,
title = {Why the Kirnberger Kernel Is So Small},
author = {Don N. Page},
journal= {arXiv preprint arXiv:0907.5249},
year = {2009}
}
Comments
10 pages, LaTeX