deletions | additions       diff --git a/We_expect_the_transmission_data__.tex b/We_expect_the_transmission_data__.tex  index 0af79aa..57aa66b 100644  --- a/We_expect_the_transmission_data__.tex  +++ b/We_expect_the_transmission_data__.tex 
...
\end{equation}  Where the normal equation for a Lorentzian is,  \begin{equation}\label{eq2}  T(\omega)=(\frac{\Gamma}{2}^{2})*(\frac{A}{(\omega-\omega_{0})^{2}+\frac{\Gamma}{2}^{2}}) T(\omega)=\left( \frac{\Gamma}{2}\right )^{2}*(\frac{A}{(\omega-\omega_{0})^{2}+\frac{\Gamma}{2}^{2}})  \end{equation}  Thus the transition frequency of the different peaks should theoretically be given by, $\omega_{1},\cdots,\omega_{6}$. The offset accounts for the background Gaussian distribution, which the Lorentzian functions are superimposed onto.