Use this rule: \(\frac{a}{b} \times \frac{c}{d}=\frac{ac}{bd}\).
\[\frac{pedroqu\imath ererepart\imath r\times 7DE\times 2400}{12}\]
Take out the constants.
\[\frac{(7\times 2400)ppdrrrrroquate\imath eee\imath DE}{12}\]
Simplify \(7\times 2400\) to \(16800\).
\[\frac{16800ppdrrrrroquate\imath eee\imath DE}{12}\]
Simplify \(16800ppdrrrrroquate\imath eee\imath DE\) to \(16800{p}^{2}d{r}^{5}oquate\imath eee\imath DE\).
\[\frac{16800{p}^{2}d{r}^{5}oquate\imath eee\imath DE}{12}\]
Use Product Rule: \({x}^{a}{x}^{b}={x}^{a+b}\).
\[\frac{16800{p}^{2}d{r}^{5}oquat{e}^{4}{\imath }^{2}DE}{12}\]
Use Square Rule: \({i}^{2}=-1\).
\[\frac{16800{p}^{2}d{r}^{5}oquat{e}^{4}\times -1\times DE}{12}\]
Simplify \(16800{p}^{2}d{r}^{5}oquat{e}^{4}\times -1\times DE\) to \(-16800{p}^{2}d{r}^{5}oquat{e}^{4}DE\).
\[\frac{-16800{p}^{2}d{r}^{5}oquat{e}^{4}DE}{12}\]
Regroup terms.
\[\frac{-16800{e}^{4}DE{p}^{2}d{r}^{5}oquat}{12}\]
Move the negative sign to the left.
\[-\frac{16800{e}^{4}DE{p}^{2}d{r}^{5}oquat}{12}\]
Simplify \(\frac{16800{e}^{4}DE{p}^{2}d{r}^{5}oquat}{12}\) to \(1400{e}^{4}DE{p}^{2}d{r}^{5}oquat\).
\[-1400{e}^{4}DE{p}^{2}d{r}^{5}oquat\]
-1400*e^4*DE*p^2*d*r^5*o*q*u*a*t
