Feed: Dr. Myron Evans
Posted on: Sunday, June 09, 2013 11:48 PM
Author: metric345
Subject: Final Version of Note 243(5)
| This is the final version of note 243(5) checked by co author Horst Eckardt as usual. The capacity of mean curvature has the S.I. units of inverse metres squared per Kelvin, and is given in Eq. (11). In eqs. (14) to (17) there is a pi squared in the denominator. As shown in my third year undergraduate notes ESR and NMR course, the mean square width of ESR and NMR is a distribution of type (2). These results are given by the new R theory of particle interactions, now well studied worldwide. To double check, the capacity of mean curvature is:
C sub V (R) = 3N h bar omega cubed / (k T squared c squared) (x / (1 – x) squared) where x = h bar omega / (k T) This is dimensionally correct because the reduced Planck constant has the units of J s, the Boltzmann constant has the units of J / K and omega has the units of inverse seconds.
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