# Work A

## Differential Logic Tables • Conjunction PQR

### Summary Tables

#### LaTeX Tables

$\begin{array}{|*{8}{c}|} \multicolumn{8}{c}{\text{Difference Map}~\text{D}(pqr)} \\[4pt] \hline&&&&&&& \\ \texttt{~}p\texttt{~~}q\texttt{~~}r\texttt{~}& \texttt{(}p\texttt{)~}q\texttt{~~}r\texttt{~}& \texttt{~}p\texttt{~(}q\texttt{)~}r\texttt{~}& \texttt{~}p\texttt{~~}q\texttt{~(}r\texttt{)}& \texttt{(}p\texttt{)(}q\texttt{)~}r\texttt{~}& \texttt{(}p\texttt{)~}q\texttt{~(}r\texttt{)}& \texttt{~}p\texttt{~(}q\texttt{)(}r\texttt{)}& \texttt{(}p\texttt{)(}q\texttt{)(}r\texttt{)} \\[8pt] \hline&&&&&&& \\ 0&&&&&&& \\ \texttt{~}\text{d}p\texttt{~(}\text{d}q\texttt{)(}\text{d}r\texttt{)}& \text{d}p\texttt{(}\text{d}q\texttt{)(}\text{d}r\texttt{)}&&&&&& \\ \texttt{(}\text{d}p\texttt{)~}\text{d}q\texttt{~(}\text{d}r\texttt{)}&& \texttt{(}\text{d}p\texttt{)}\text{d}q\texttt{(}\text{d}r\texttt{)}&&&&& \\ \texttt{(}\text{d}p\texttt{)(}\text{d}q\texttt{)~}\text{d}r\texttt{~}&&& \texttt{(}\text{d}p\texttt{)(}\text{d}q\texttt{)}\text{d}r&&&& \\ \texttt{~}\text{d}p\texttt{~~}\text{d}q\texttt{~(}\text{d}r\texttt{)}&&&& \text{d}p~\text{d}q\texttt{(}\text{d}r\texttt{)}&&& \\ \texttt{~}\text{d}p\texttt{~(}\text{d}q\texttt{)~}\text{d}r\texttt{~}&&&&& \text{d}p\texttt{(}\text{d}q\texttt{)}\text{d}r&& \\ \texttt{(}\text{d}p\texttt{)~}\text{d}q\texttt{~~}\text{d}r\texttt{~}&&&&&& \texttt{(}\text{d}p\texttt{)}\text{d}q~\text{d}r& \\ \texttt{~}\text{d}p\texttt{~~}\text{d}q\texttt{~~}\text{d}r\texttt{~}&&&&&&& \text{d}p~\text{d}q~\text{d}r \\[8pt] \hline&&&&&&& \\ \texttt{((}\text{d}p\texttt{)(}\text{d}q\texttt{)(}\text{d}r\texttt{))}& \text{d}p\texttt{(}\text{d}q\texttt{)(}\text{d}r\texttt{)}& \texttt{(}\text{d}p\texttt{)}\text{d}q\texttt{(}\text{d}r\texttt{)}& \texttt{(}\text{d}p\texttt{)(}\text{d}q\texttt{)}\text{d}r& \text{d}p~\text{d}q\texttt{(}\text{d}r\texttt{)}& \text{d}p\texttt{(}\text{d}q\texttt{)}\text{d}r& \texttt{(}\text{d}p\texttt{)}\text{d}q~\text{d}r& \text{d}p~\text{d}q~\text{d}r \\[8pt] \hline \end{array}$