The relationship of the large deviation rate, $\psi^\ast(a)$, of the mean of independent and identically distributed random variables to their cumulant generating function, $\psi(\lambda)$, is well known. This paper studies how the behavior of the sign changes of $\psi_1^\ast(a) - \psi_2^\ast(a)$ is related to that of $\psi_1(\lambda) - \psi_2(\lambda)$ for cumulant generating functions $\psi_1$ and $\psi_2$ with rates $\psi_1^\ast$ and $\psi_2^\ast$, respectively. Use is made of the fact that the rate $\psi^\ast$ is nothing more than the conjugate convex function of $\psi$. Results concerning the relationship of the behavior of the difference of convex functions to that of the difference of their conjugates are first proven and then applied to determine the relationship of the behavior of the sign changes of $\psi_1^\ast - \psi_2^\ast$ to that of $\psi_1 - \psi_2$. Results are also given relating this behavior to that of $F_1 - F_2$ and $f_1 - f_2$, where $F_i$ and $f_i(i = 1$ and 2) are the distribution function and the density function, respectively, corresponding to $\psi_i$.