\begin_layout Standard
The width
-\begin_inset Formula $W_{g\, n}$
+\begin_inset Formula $W_{g\,n}$
\end_inset
which the user needs to set when
\emph default
columns are spanned can be calculated, so that each column has a total
width of
-\begin_inset Formula $W_{\mathrm{tot\, multicolumn}}/n$
+\begin_inset Formula $W_{\mathrm{tot\,multicolumn}}/n$
\end_inset
:
\begin_inset Formula
\begin{equation}
-W_{g\, n}=(W_{g\,\mathrm{multicolumn}}+(1-n)\cdot(12.4\,\mathrm{pt}))/n\label{eq:Wgn}
+W_{g\,n}=(W_{g\,\mathrm{multicolumn}}+(1-n)\cdot(12.4\,\mathrm{pt}))/n\label{eq:Wgn}
\end{equation}
\end_inset
times the width than the 3 others, the calculation is
\begin_inset Formula
\begin{align}
-\backslash\mbox{columnwidth} & =3\, W_{\mathrm{column}}+2\cdot0.75\, W_{\mathrm{column}}+\backslash\mbox{arrayrulewidth}\nonumber \\
+\backslash\mbox{columnwidth} & =3\,W_{\mathrm{column}}+2\cdot0.75\,W_{\mathrm{column}}+\backslash\mbox{arrayrulewidth}\nonumber \\
& \phantom{=\,}+5\left(2\backslash\mbox{tabcolsep}+\backslash\mbox{arrayrulewidth}\right)\nonumber \\
- & =4.5\, W_{\mathrm{column}}+62.4\,\mathrm{pt}\nonumber \\
+ & =4.5\,W_{\mathrm{column}}+62.4\,\mathrm{pt}\nonumber \\
W_{\mathrm{column}} & =\frac{\backslash\mbox{columnwidth}-62.4\,\mathrm{pt}}{4.5}
\end{align}
\begin_inset Text
\begin_layout Plain Layout
-\begin_inset Formula $\: B_{\mathrm{red}}$
+\begin_inset Formula $\:B_{\mathrm{red}}$
\end_inset
n
\emph default
table cells
-\begin_inset Formula $W_{\mathrm{tot\, n}}$
+\begin_inset Formula $W_{\mathrm{tot\,n}}$
\end_inset
as follows:
\begin_inset Formula
\begin{equation}
-W_{\mathrm{tot}\, n}=n\cdot(W_{g\, n}+2\cdot\backslash\mbox{tabcolsep})+(n+1)\cdot\backslash\mbox{arrayrulewidth}\label{eq:Wtot_n}
+W_{\mathrm{tot}\,n}=n\cdot(W_{g\,n}+2\cdot\backslash\mbox{tabcolsep})+(n+1)\cdot\backslash\mbox{arrayrulewidth}\label{eq:Wtot_n}
\end{equation}
\end_inset
where
-\begin_inset Formula $W_{g\, n}$
+\begin_inset Formula $W_{g\,n}$
\end_inset
is the given width of all cells,
\end_inset
, the total width of a multicolumn
-\begin_inset Formula $W_{\mathrm{tot\, mult}}$
+\begin_inset Formula $W_{\mathrm{tot\,mult}}$
\end_inset
is
\begin_inset Formula
\begin{equation}
-W_{\mathrm{tot\, mult}}=W_{g\,\mathrm{mult}}+2\cdot\backslash\mbox{tabcolsep}+2\cdot\backslash\mbox{arrayrulewidth}\label{eq:Wtot_mult}
+W_{\mathrm{tot\,mult}}=W_{g\,\mathrm{mult}}+2\cdot\backslash\mbox{tabcolsep}+2\cdot\backslash\mbox{arrayrulewidth}\label{eq:Wtot_mult}
\end{equation}
\end_inset
\end_inset
equal we can calculate the needed given width
-\begin_inset Formula $W_{g\, n}$
+\begin_inset Formula $W_{g\,n}$
\end_inset
when
n
\emph default
columns are spanned, so that each column has a total width of
-\begin_inset Formula $W_{\mathrm{tot\, mult}}/n$
+\begin_inset Formula $W_{\mathrm{tot\,mult}}/n$
\end_inset
:
\begin_inset Formula
\begin{equation}
-W_{g\, n}=\frac{W_{g\,\mathrm{mult}}+(1-n)\cdot(2\cdot\backslash\mbox{tabcolsep}+\backslash\mbox{arrayrulewidth})}{n}
+W_{g\,n}=\frac{W_{g\,\mathrm{mult}}+(1-n)\cdot(2\cdot\backslash\mbox{tabcolsep}+\backslash\mbox{arrayrulewidth})}{n}
\end{equation}
\end_inset
\begin_inset CommandInset href
LatexCommand href
name "KOMA-Script"
-target "http://mirror.ctan.org/macros/latex/contrib/koma-script/scrguien.pdf"
+target "http://mirror.ctan.org/macros/latex/contrib/koma-script/doc/scrguien.pdf"
\end_inset
\emph default
Spalten zu einer Mehrfachspalte zusammengefasst werden, errechnet sich
die definierte Breite
-\begin_inset Formula $W_{g\, n}$
+\begin_inset Formula $W_{g\,n}$
\end_inset
einer Spalte, deren totale Breite =
-\begin_inset Formula $W_{\mathrm{tot\, multicolumn}}/n$
+\begin_inset Formula $W_{\mathrm{tot\,multicolumn}}/n$
\end_inset
sein soll, wie folgt:
\begin_inset Formula
\begin{equation}
-W_{g\, n}=(W_{g\,\mathrm{multicolumn}}+(1-n)\cdot(12.4\,\mathrm{pt}))/n\label{eq:Wgn}
+W_{g\,n}=(W_{g\,\mathrm{multicolumn}}+(1-n)\cdot(12.4\,\mathrm{pt}))/n\label{eq:Wgn}
\end{equation}
\end_inset
Spalten haben sollen, ist die Berechnung
\begin_inset Formula
\begin{align}
-\backslash\mbox{columnwidth} & =3\, W_{\mathrm{Spalte}}+2\cdot0,75\, W_{\mathrm{Spalte}}+\backslash\mbox{arrayrulewidth}\nonumber \\
+\backslash\mbox{columnwidth} & =3\,W_{\mathrm{Spalte}}+2\cdot0,75\,W_{\mathrm{Spalte}}+\backslash\mbox{arrayrulewidth}\nonumber \\
& \phantom{=\,}+5\left(2\backslash\mbox{tabcolsep}+\backslash\mbox{arrayrulewidth}\right)\nonumber \\
- & =4,5\, W_{\mathrm{Spalte}}+62,4\,\mathrm{pt}\nonumber \\
+ & =4,5\,W_{\mathrm{Spalte}}+62,4\,\mathrm{pt}\nonumber \\
W_{\mathrm{Spalte}} & =\frac{\backslash\mbox{columnwidth}-62,4\,\mathrm{pt}}{4,5}
\end{align}
\begin_inset Text
\begin_layout Plain Layout
-\begin_inset Formula $\: B_{\mathrm{red}}$
+\begin_inset Formula $\:B_{\mathrm{red}}$
\end_inset
n
\emph default
Tabellenzellen
-\begin_inset Formula $W_{\mathrm{tot\, n}}$
+\begin_inset Formula $W_{\mathrm{tot\,n}}$
\end_inset
kann wie folgt berechnet werden:
\begin_inset Formula
\begin{equation}
-W_{\mathrm{tot}\, n}=n\cdot(W_{g\, n}+2\cdot\backslash\mbox{tabcolsep})+(n+1)\cdot\backslash\mbox{arrayrulewidth}\label{eq:Wtot_n}
+W_{\mathrm{tot}\,n}=n\cdot(W_{g\,n}+2\cdot\backslash\mbox{tabcolsep})+(n+1)\cdot\backslash\mbox{arrayrulewidth}\label{eq:Wtot_n}
\end{equation}
\end_inset
\begin_layout Standard
Dabei ist
-\begin_inset Formula $W_{g\, n}$
+\begin_inset Formula $W_{g\,n}$
\end_inset
die Breite jeder Zelle.
\end_inset
ist die Gesamtbreite einer Mehrfachspalte,
-\begin_inset Formula $W_{\mathrm{tot\, mult}}$
+\begin_inset Formula $W_{\mathrm{tot\,mult}}$
\end_inset
,
\begin_inset Formula
\begin{equation}
-W_{\mathrm{tot\, mult}}=W_{g\,\mathrm{mult}}+2\cdot\backslash\mbox{tabcolsep}+2\cdot\backslash\mbox{arrayrulewidth}\label{eq:Wtot_mult}
+W_{\mathrm{tot\,mult}}=W_{g\,\mathrm{mult}}+2\cdot\backslash\mbox{tabcolsep}+2\cdot\backslash\mbox{arrayrulewidth}\label{eq:Wtot_mult}
\end{equation}
\end_inset
\end_inset
gleich, kann man die benötigte Breite
-\begin_inset Formula $W_{g\, n}$
+\begin_inset Formula $W_{g\,n}$
\end_inset
, wenn
n
\emph default
Spalten überspannt sind, so dass jede Spalte eine Gesamtbreite
-\begin_inset Formula $W_{\mathrm{tot\, mult}}/n$
+\begin_inset Formula $W_{\mathrm{tot\,mult}}/n$
\end_inset
hat, berechnen:
\begin_inset Formula
\begin{equation}
-W_{g\, n}=\frac{W_{g\,\mathrm{mult}}+(1-n)\cdot(2\cdot\backslash\mbox{tabcolsep}+\backslash\mbox{arrayrulewidth})}{n}
+W_{g\,n}=\frac{W_{g\,\mathrm{mult}}+(1-n)\cdot(2\cdot\backslash\mbox{tabcolsep}+\backslash\mbox{arrayrulewidth})}{n}
\end{equation}
\end_inset
\begin_inset CommandInset href
LatexCommand href
name "KOMA-Script"
-target "http://mirror.ctan.org/macros/latex/contrib/koma-script/scrguien.pdf"
+target "http://mirror.ctan.org/macros/latex/contrib/koma-script/doc/scrguien.pdf"
\end_inset
\begin_layout Standard
La anchura dada
-\begin_inset Formula $W_{g\, n}$
+\begin_inset Formula $W_{g\,n}$
\end_inset
necesaria para combinar
\emph default
columnas puede calcularse de manera que cada columna tenga una anchura
total de
-\begin_inset Formula $W_{\mathrm{tot\, multicolumn}}/n$
+\begin_inset Formula $W_{\mathrm{tot\,multicolumn}}/n$
\end_inset
:
\begin_inset Formula
\begin{equation}
-W_{g\, n}=(W_{g\,\mathrm{multicolumn}}+(1-n)\cdot(12.4\,\mathrm{pt}))/n\label{eq:Wgn}
+W_{g\,n}=(W_{g\,\mathrm{multicolumn}}+(1-n)\cdot(12.4\,\mathrm{pt}))/n\label{eq:Wgn}
\end{equation}
\end_inset
veces la anchura de las otras, el cálculo es
\begin_inset Formula
\begin{align}
-\backslash\mbox{columnwidth} & =3\, W_{\mathrm{column}}+2\cdot0.75\, W_{\mathrm{column}}+\backslash\mbox{arrayrulewidth}\nonumber \\
+\backslash\mbox{columnwidth} & =3\,W_{\mathrm{column}}+2\cdot0.75\,W_{\mathrm{column}}+\backslash\mbox{arrayrulewidth}\nonumber \\
& \phantom{=\,}+5\left(2\backslash\mbox{tabcolsep}+\backslash\mbox{arrayrulewidth}\right)\nonumber \\
- & =4.5\, W_{\mathrm{column}}+62.4\,\mathrm{pt}\nonumber \\
+ & =4.5\,W_{\mathrm{column}}+62.4\,\mathrm{pt}\nonumber \\
W_{\mathrm{column}} & =\frac{\backslash\mbox{columnwidth}-62.4\,\mathrm{pt}}{4.5}
\end{align}
\begin_inset Text
\begin_layout Plain Layout
-\begin_inset Formula $\: B_{\mathrm{red}}$
+\begin_inset Formula $\:B_{\mathrm{red}}$
\end_inset
n
\emph default
celdas de un cuadro
-\begin_inset Formula $W_{\mathrm{tot\, n}}$
+\begin_inset Formula $W_{\mathrm{tot\,n}}$
\end_inset
puede calcularse con
\begin_inset Formula
\begin{equation}
-W_{\mathrm{tot}\, n}=n\cdot(W_{g\, n}+2\cdot\backslash\mbox{tabcolsep})+(n+1)\cdot\backslash\mbox{arrayrulewidth}\label{eq:Wtot_n}
+W_{\mathrm{tot}\,n}=n\cdot(W_{g\,n}+2\cdot\backslash\mbox{tabcolsep})+(n+1)\cdot\backslash\mbox{arrayrulewidth}\label{eq:Wtot_n}
\end{equation}
\end_inset
\begin_layout Standard
donde
-\begin_inset Formula $W_{g\, n}$
+\begin_inset Formula $W_{g\,n}$
\end_inset
es el ancho dado de todas las celdas.
\end_inset
, el ancho total de una multicolumna,
-\begin_inset Formula $W_{\mathrm{tot\, mult}}$
+\begin_inset Formula $W_{\mathrm{tot\,mult}}$
\end_inset
es
\begin_inset Formula
\begin{equation}
-W_{\mathrm{tot\, mult}}=W_{g\,\mathrm{mult}}+2\cdot\backslash\mbox{tabcolsep}+2\cdot\backslash\mbox{arrayrulewidth}\label{eq:Wtot_mult}
+W_{\mathrm{tot\,mult}}=W_{g\,\mathrm{mult}}+2\cdot\backslash\mbox{tabcolsep}+2\cdot\backslash\mbox{arrayrulewidth}\label{eq:Wtot_mult}
\end{equation}
\end_inset
\end_inset
podemos calcular el ancho dado necesario
-\begin_inset Formula $W_{g\, n}$
+\begin_inset Formula $W_{g\,n}$
\end_inset
cuando se expanden
n
\emph default
columnas, de forma que cada una de ellas tiene una anchura total
-\begin_inset Formula $W_{\mathrm{tot\, mult}}/n$
+\begin_inset Formula $W_{\mathrm{tot\,mult}}/n$
\end_inset
:
\begin_inset Formula
\begin{equation}
-W_{g\, n}=\frac{W_{g\,\mathrm{mult}}+(1-n)\cdot(2\cdot\backslash\mbox{tabcolsep}+\backslash\mbox{arrayrulewidth})}{n}
+W_{g\,n}=\frac{W_{g\,\mathrm{mult}}+(1-n)\cdot(2\cdot\backslash\mbox{tabcolsep}+\backslash\mbox{arrayrulewidth})}{n}
\end{equation}
\end_inset
\begin_inset CommandInset href
LatexCommand href
name "KOMA-Script"
-target "http://mirror.ctan.org/macros/latex/contrib/koma-script/scrguien.pdf"
+target "http://mirror.ctan.org/macros/latex/contrib/koma-script/doc/scrguien.pdf"
\end_inset
\begin_layout Standard
La largeur nécessaire
-\begin_inset Formula $W_{g\, n}$
+\begin_inset Formula $W_{g\,n}$
\end_inset
quand
\emph default
colonnes sont couvertes peut être calculée de façon à ce que chaque colonne
ait une largeur totale de
-\begin_inset Formula $W_{\mathrm{tot\, multicolonne}}/n$
+\begin_inset Formula $W_{\mathrm{tot\,multicolonne}}/n$
\end_inset
:
\begin_inset Formula
\begin{equation}
-W_{g\, n}=(W_{g\,\mathrm{multicolonne}}+(1-n)\cdot(12.4\,\mathrm{pt}))/n\label{eq:Wgn}
+W_{g\,n}=(W_{g\,\mathrm{multicolonne}}+(1-n)\cdot(12.4\,\mathrm{pt}))/n\label{eq:Wgn}
\end{equation}
\end_inset
\begin_layout Standard
\begin_inset Formula
\begin{align}
-\backslash\mbox{columnwidth} & =3\, L_{\mathrm{colonne}}+2\cdot0.75\, L_{\mathrm{colonne}}+\backslash\mbox{arrayrulewidth}\nonumber \\
+\backslash\mbox{columnwidth} & =3\,L_{\mathrm{colonne}}+2\cdot0.75\,L_{\mathrm{colonne}}+\backslash\mbox{arrayrulewidth}\nonumber \\
& \phantom{=\,}+5\left(2\backslash\mbox{tabcolsep}+\backslash\mbox{arrayrulewidth}\right)\nonumber \\
- & =4.5\, L_{\mathrm{colonne}}+62.4\,\mathrm{pt}\nonumber \\
+ & =4.5\,L_{\mathrm{colonne}}+62.4\,\mathrm{pt}\nonumber \\
L_{\mathrm{colonne}} & =\frac{\backslash\mbox{columnwidth}-62.4\,\mathrm{pt}}{4.5}
\end{align}
\begin_inset Text
\begin_layout Plain Layout
-\begin_inset Formula $\: B_{\mathrm{red}}$
+\begin_inset Formula $\:B_{\mathrm{red}}$
\end_inset
n
\emph default
cellules de tableau
-\begin_inset Formula $L_{\mathrm{tot\, n}}$
+\begin_inset Formula $L_{\mathrm{tot\,n}}$
\end_inset
peut être calculée avec
\begin_inset Formula
\begin{equation}
-L_{\mathrm{tot}\, n}=n\cdot(L_{g\, n}+2\cdot\backslash\mbox{tabcolsep})+(n+1)\cdot\backslash\mbox{arrayrulewidth}\label{eq:Wtot_n}
+L_{\mathrm{tot}\,n}=n\cdot(L_{g\,n}+2\cdot\backslash\mbox{tabcolsep})+(n+1)\cdot\backslash\mbox{arrayrulewidth}\label{eq:Wtot_n}
\end{equation}
\end_inset
\begin_layout Standard
où
-\begin_inset Formula $L_{g\, n}$
+\begin_inset Formula $L_{g\,n}$
\end_inset
est la largeur fixe de toutes les cellules.
\end_inset
, la largeur totale d'une multi-colonnes,
-\begin_inset Formula $L_{\mathrm{tot\, mult}}$
+\begin_inset Formula $L_{\mathrm{tot\,mult}}$
\end_inset
est
\begin_inset Formula
\begin{equation}
-L_{\mathrm{tot\, mult}}=L_{g\,\mathrm{mult}}+2\cdot\backslash\mbox{tabcolsep}+2\cdot\backslash\mbox{arrayrulewidth}\label{eq:Wtot_mult}
+L_{\mathrm{tot\,mult}}=L_{g\,\mathrm{mult}}+2\cdot\backslash\mbox{tabcolsep}+2\cdot\backslash\mbox{arrayrulewidth}\label{eq:Wtot_mult}
\end{equation}
\end_inset
\end_inset
sont égales, on peut calculer la largeur nécessaire
-\begin_inset Formula $L_{g\, n}$
+\begin_inset Formula $L_{g\,n}$
\end_inset
quand
\emph default
colonnes sont couvertes, de façon à ce que chaque colonne ait une largeur
de
-\begin_inset Formula $L_{\mathrm{tot\, mult}}/n$
+\begin_inset Formula $L_{\mathrm{tot\,mult}}/n$
\end_inset
:
\begin_inset Formula
\begin{equation}
-L_{g\, n}=\frac{L_{g\,\mathrm{mult}}+(1-n)\cdot(2\cdot\backslash\mbox{tabcolsep}+\backslash\mbox{arrayrulewidth})}{n}
+L_{g\,n}=\frac{L_{g\,\mathrm{mult}}+(1-n)\cdot(2\cdot\backslash\mbox{tabcolsep}+\backslash\mbox{arrayrulewidth})}{n}
\end{equation}
\end_inset
\begin_inset CommandInset href
LatexCommand href
name "KOMA-Script"
-target "http://mirror.ctan.org/macros/latex/contrib/koma-script/scrguien.pdf"
+target "http://mirror.ctan.org/macros/latex/contrib/koma-script/doc/scrguien.pdf"
\end_inset
というコマンドを入力します。5列の表で、うち2列が他の3列の幅の0.75倍であるような表の場合には、計算は
\begin_inset Formula
\begin{align}
-\backslash\mbox{columnwidth} & =3\, W_{\text{列}}+2\cdot0.75\, W_{\text{列}}+\backslash\mbox{arrayrulewidth}\nonumber \\
+\backslash\mbox{columnwidth} & =3\,W_{\text{列}}+2\cdot0.75\,W_{\text{列}}+\backslash\mbox{arrayrulewidth}\nonumber \\
& \phantom{=\,}+5\left(2\backslash\mbox{tabcolsep}+\backslash\mbox{arrayrulewidth}\right)\nonumber \\
- & =4.5\, W_{\text{列}}+62.4\,\mathrm{pt}\nonumber \\
+ & =4.5\,W_{\text{列}}+62.4\,\mathrm{pt}\nonumber \\
W_{\text{列}} & =\frac{\backslash\mbox{columnwidth}-62.4\,\mathrm{pt}}{4.5}
\end{align}
\begin_inset Text
\begin_layout Plain Layout
-\begin_inset Formula $\: B_{\mathrm{red}}$
+\begin_inset Formula $\:B_{\mathrm{red}}$
\end_inset
\end_inset
個の表セルの全幅
-\begin_inset Formula $W_{\mathrm{tot\, n}}$
+\begin_inset Formula $W_{\mathrm{tot\,n}}$
\end_inset
は
\begin_inset Formula
\begin{equation}
-W_{\mathrm{tot}\, n}=n\cdot(W_{g\, n}+2\cdot\backslash\mbox{tabcolsep})+(n+1)\cdot\backslash\mbox{arrayrulewidth}\label{eq:Wtot_n}
+W_{\mathrm{tot}\,n}=n\cdot(W_{g\,n}+2\cdot\backslash\mbox{tabcolsep})+(n+1)\cdot\backslash\mbox{arrayrulewidth}\label{eq:Wtot_n}
\end{equation}
\end_inset
\begin_layout Standard
で計算できます。ここで
-\begin_inset Formula $W_{g\, n}$
+\begin_inset Formula $W_{g\,n}$
\end_inset
は、すべてのセルが持つ固定幅です。
\end_inset
式にしたがえば、連結列の全幅
-\begin_inset Formula $W_{\mathrm{tot\, mult}}$
+\begin_inset Formula $W_{\mathrm{tot\,mult}}$
\end_inset
は
\begin_inset Formula
\begin{equation}
-W_{\mathrm{tot\, mult}}=W_{g\,\mathrm{mult}}+2\cdot\backslash\mbox{tabcolsep}+2\cdot\backslash\mbox{arrayrulewidth}\label{eq:Wtot_mult}
+W_{\mathrm{tot\,mult}}=W_{g\,\mathrm{mult}}+2\cdot\backslash\mbox{tabcolsep}+2\cdot\backslash\mbox{arrayrulewidth}\label{eq:Wtot_mult}
\end{equation}
\end_inset
\end_inset
列を連結する時には各列の全幅は
-\begin_inset Formula $W_{\mathrm{tot\, mult}}/n$
+\begin_inset Formula $W_{\mathrm{tot\,mult}}/n$
\end_inset
となるので、第
\end_inset
式が等しいものと置けば、必要となる固定幅
-\begin_inset Formula $W_{g\, n}$
+\begin_inset Formula $W_{g\,n}$
\end_inset
を計算することができて、
\begin_inset Formula
\begin{equation}
-W_{g\, n}=\frac{W_{g\,\mathrm{mult}}+(1-n)\cdot(2\cdot\backslash\mbox{tabcolsep}+\backslash\mbox{arrayrulewidth})}{n}
+W_{g\,n}=\frac{W_{g\,\mathrm{mult}}+(1-n)\cdot(2\cdot\backslash\mbox{tabcolsep}+\backslash\mbox{arrayrulewidth})}{n}
\end{equation}
\end_inset
\begin_inset CommandInset href
LatexCommand href
name "KOMA-script"
-target "http://mirror.ctan.org/macros/latex/contrib/koma-script/scrguien.pdf"
+target "http://mirror.ctan.org/macros/latex/contrib/koma-script/doc/scrguien.pdf"
\end_inset