Commit d06e16b1 authored by Turnhout, M.C. van's avatar Turnhout, M.C. van
Browse files

typos

parent 42a5e505
......@@ -158,7 +158,7 @@ Finally note that we introduced $\col{\hat{A}}$ to distinguish this approximated
You cannot just derive the (normalized) absorption vector $\hat{k}$ for your dye(s) in RGB from first principles. You may be able to find values on the internet \cite{Landini2020} or presets in the ImageJ plugin \cite{Landini2004}, but these values also once had to be derived from `raw' RGB values.\\
\noindent You first need to record the RGB values in an image with `pure dye'. This can be a specifically prepared sample or a region in your image where you are yo that you are only looking at that single dye \cite{Landini2004,Landini2020}. From this column with RGB values of the dye, you can calculate the dyes (approximated) absorbance column:
\noindent You first need to record the RGB values in an image with `pure dye'. This can be a specifically prepared sample or a region in your image where you are only looking at that single dye \cite{Landini2004,Landini2020}. From this column with RGB values of the dye, you can calculate the dyes (approximated) absorbance column:
\begin{equation}
\col{\hat{A}}_d = -\ln \left(\frac{\col{I}_d + 1}{I_\mathrm{max}+1} \right) \label{Apixeld}
\end{equation}
......
......@@ -122,4 +122,4 @@ Thus
\begin{equation}
I_n = I_0\cdot \mathrm{e}^{x(1-a)\ln (1-a)} = I_0\cdot \mathrm{e}^{cx}
\end{equation}
With $c = (1-a)\ln (1-a)$ a constant that depends on the `strength' of absorption $a$.
\ No newline at end of file
With $c = (1-a)\ln (1-a)$ a constant that depends (only) on the `strength' of absorption $a$.
\ No newline at end of file
Markdown is supported
0% or .
You are about to add 0 people to the discussion. Proceed with caution.
Finish editing this message first!
Please register or to comment