Author: bugman Date: Tue Nov 17 11:38:05 2015 New Revision: 28071 URL: http://svn.gna.org/viewcvs/relax?rev=28071&view=rev Log: Fix for the CSA constant equation in the model-free chapter of the manual. This was spotted by Christina Möller and reported on the relax-users mailing list at https://mail-archive.com/relax-users%40gna.org/msg01776.html . Modified: trunk/docs/latex/model-free.tex Modified: trunk/docs/latex/model-free.tex URL: http://svn.gna.org/viewcvs/relax/trunk/docs/latex/model-free.tex?rev=28071&r1=28070&r2=28071&view=diff ============================================================================== --- trunk/docs/latex/model-free.tex (original) +++ trunk/docs/latex/model-free.tex Tue Nov 17 11:38:05 2015 @@ -72,7 +72,7 @@ The dipolar and CSA constants are defined in SI units as \begin{gather} d = \frac{1}{4} \left(\frac{\mu_0}{4\pi}\right)^2 \frac{(\gH \gX \hbar)^2}{\langle r^6 \rangle}, \label{eq: dipolar constant} \\ - c = \frac{(\omega_H \Delta\sigma)^2}{3}, \label{eq: CSA constant} + c = \frac{(\omega_X \Delta\sigma)^2}{3}, \label{eq: CSA constant} \end{gather} \noindent where $\mu_0$ is the permeability of free space, $\gH$ and $\gX$ are the gyromagnetic ratios of the $H$ and $X$ spins respectively, $\hbar$ is Plank's constant divided by $2\pi$, $r$ is the bond length, and $\Delta\sigma$ is the chemical shift anisotropy measured in ppm.