MyWikiBiz, Author Your Legacy — Saturday November 23, 2024
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, 23:38, 17 June 2009
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| To understand the extended interpretations, that is, the conjunctions of basic and differential features that are being indicated here, it may help to note the following equivalences: | | To understand the extended interpretations, that is, the conjunctions of basic and differential features that are being indicated here, it may help to note the following equivalences: |
| | | |
− | <pre> | + | {| align="center" cellspacing="10" style="text-align:center" |
− | (dp, dq) = dp + dq = dp(dq) + (dp)dq
| + | | |
− | | + | <math>\begin{matrix} |
− | dp = dp dq + dp(dq)
| + | \texttt{(} |
− | | + | \operatorname{d}p |
− | dq = dp dq + (dp)dq
| + | \texttt{,} |
− | </pre> | + | \operatorname{d}q |
| + | \texttt{)} |
| + | & = & |
| + | \texttt{~} \operatorname{d}p \texttt{~} |
| + | \texttt{(} \operatorname{d}q \texttt{)} |
| + | & + & |
| + | \texttt{(} \operatorname{d}p \texttt{)} |
| + | \texttt{~} \operatorname{d}q \texttt{~} |
| + | \\[4pt] |
| + | dp |
| + | & = & |
| + | \texttt{~} \operatorname{d}p \texttt{~} |
| + | \texttt{~} \operatorname{d}q \texttt{~} |
| + | & + & |
| + | \texttt{~} \operatorname{d}p \texttt{~} |
| + | \texttt{(} \operatorname{d}q \texttt{)} |
| + | \\[4pt] |
| + | \operatorname{d}q |
| + | & = & |
| + | \texttt{~} \operatorname{d}p \texttt{~} |
| + | \texttt{~} \operatorname{d}q \texttt{~} |
| + | & + & |
| + | \texttt{(} \operatorname{d}p \texttt{)} |
| + | \texttt{~} \operatorname{d}q \texttt{~} |
| + | \end{matrix}</math> |
| + | |} |
| | | |
| Capping the series that analyzes the proposition <math>pq\!</math> in terms of succeeding orders of linear propositions, Figure 26-2 shows the remainder map <math>\operatorname{r}(pq) : \operatorname{E}X \to \mathbb{B},</math> that happens to be linear in pairs of variables. | | Capping the series that analyzes the proposition <math>pq\!</math> in terms of succeeding orders of linear propositions, Figure 26-2 shows the remainder map <math>\operatorname{r}(pq) : \operatorname{E}X \to \mathbb{B},</math> that happens to be linear in pairs of variables. |