Simplify \(134\times 2\) to \(268\).
\[268=boxedunderl\imath ne\times 14\]
Use Product Rule: \({x}^{a}{x}^{b}={x}^{a+b}\).
\[268=boxe{d}^{2}u{n}^{2}{e}^{2}rl\imath \times 14\]
Regroup terms.
\[268=14boxe{e}^{2}\imath {d}^{2}u{n}^{2}rl\]
Divide both sides by \(14\).
\[\frac{268}{14}=boxe{e}^{2}\imath {d}^{2}u{n}^{2}rl\]
Simplify \(\frac{268}{14}\) to \(\frac{134}{7}\).
\[\frac{134}{7}=boxe{e}^{2}\imath {d}^{2}u{n}^{2}rl\]
Divide both sides by \(boxe\).
\[\frac{\frac{134}{7}}{boxe}={e}^{2}\imath {d}^{2}u{n}^{2}rl\]
Simplify \(\frac{\frac{134}{7}}{boxe}\) to \(\frac{134}{7boxe}\).
\[\frac{134}{7boxe}={e}^{2}\imath {d}^{2}u{n}^{2}rl\]
Divide both sides by \({e}^{2}\).
\[\frac{\frac{134}{7boxe}}{{e}^{2}}=\imath {d}^{2}u{n}^{2}rl\]
Simplify \(\frac{\frac{134}{7boxe}}{{e}^{2}}\) to \(\frac{134}{7boxe{e}^{2}}\).
\[\frac{134}{7boxe{e}^{2}}=\imath {d}^{2}u{n}^{2}rl\]
Divide both sides by \(\imath \).
\[\frac{\frac{134}{7boxe{e}^{2}}}{\imath }={d}^{2}u{n}^{2}rl\]
Simplify \(\frac{\frac{134}{7boxe{e}^{2}}}{\imath }\) to \(\frac{134}{7boxe{e}^{2}\imath }\).
\[\frac{134}{7boxe{e}^{2}\imath }={d}^{2}u{n}^{2}rl\]
Divide both sides by \({d}^{2}\).
\[\frac{\frac{134}{7boxe{e}^{2}\imath }}{{d}^{2}}=u{n}^{2}rl\]
Simplify \(\frac{\frac{134}{7boxe{e}^{2}\imath }}{{d}^{2}}\) to \(\frac{134}{7boxe{e}^{2}\imath {d}^{2}}\).
\[\frac{134}{7boxe{e}^{2}\imath {d}^{2}}=u{n}^{2}rl\]
Divide both sides by \({n}^{2}\).
\[\frac{\frac{134}{7boxe{e}^{2}\imath {d}^{2}}}{{n}^{2}}=url\]
Simplify \(\frac{\frac{134}{7boxe{e}^{2}\imath {d}^{2}}}{{n}^{2}}\) to \(\frac{134}{7boxe{e}^{2}\imath {d}^{2}{n}^{2}}\).
\[\frac{134}{7boxe{e}^{2}\imath {d}^{2}{n}^{2}}=url\]
Divide both sides by \(r\).
\[\frac{\frac{134}{7boxe{e}^{2}\imath {d}^{2}{n}^{2}}}{r}=ul\]
Simplify \(\frac{\frac{134}{7boxe{e}^{2}\imath {d}^{2}{n}^{2}}}{r}\) to \(\frac{134}{7boxe{e}^{2}\imath {d}^{2}{n}^{2}r}\).
\[\frac{134}{7boxe{e}^{2}\imath {d}^{2}{n}^{2}r}=ul\]
Divide both sides by \(l\).
\[\frac{\frac{134}{7boxe{e}^{2}\imath {d}^{2}{n}^{2}r}}{l}=u\]
Simplify \(\frac{\frac{134}{7boxe{e}^{2}\imath {d}^{2}{n}^{2}r}}{l}\) to \(\frac{134}{7boxe{e}^{2}\imath {d}^{2}{n}^{2}rl}\).
\[\frac{134}{7boxe{e}^{2}\imath {d}^{2}{n}^{2}rl}=u\]
Switch sides.
\[u=\frac{134}{7boxe{e}^{2}\imath {d}^{2}{n}^{2}rl}\]
u=134/(7*boxe*e^2*IM*d^2*n^2*r*l)
