Commit d06e16b1 by Turnhout, M.C. van

### 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: \col{\hat{A}}_d = -\ln \left(\frac{\col{I}_d + 1}{I_\mathrm{max}+1} \right) \label{Apixeld} ... ...
 ... ... @@ -122,4 +122,4 @@ Thus I_n = I_0\cdot \mathrm{e}^{x(1-a)\ln (1-a)} = I_0\cdot \mathrm{e}^{cx} 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
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