Simplify \({9}^{13}\) to \(2.541866\times {10}^{12}\).
\[RATIONALNUMBERSONTHE\times 4.5underl\imath ne>2.541866\times {10}^{12}\]
Use Product Rule: \({x}^{a}{x}^{b}={x}^{a+b}\).
\[RATIONALNUMBERSONTHE\times 4.5u{n}^{2}d{e}^{2}rl\imath >2.541866\times {10}^{12}\]
Regroup terms.
\[4.5RATIONALNUMBERSONTHE{e}^{2}\imath u{n}^{2}drl>2.541866\times {10}^{12}\]
Divide both sides by \(4.5\).
\[RATIONALNUMBERSONTHE{e}^{2}\imath u{n}^{2}drl>\frac{2.541866\times {10}^{12}}{4.5}\]
Divide both sides by \(RATIONALNUMBERSONTHE\).
\[{e}^{2}\imath u{n}^{2}drl>\frac{\frac{2.541866\times {10}^{12}}{4.5}}{RATIONALNUMBERSONTHE}\]
Simplify \(\frac{\frac{2.541866\times {10}^{12}}{4.5}}{RATIONALNUMBERSONTHE}\) to \(\frac{2.541866\times {10}^{12}}{4.5RATIONALNUMBERSONTHE}\).
\[{e}^{2}\imath u{n}^{2}drl>\frac{2.541866\times {10}^{12}}{4.5RATIONALNUMBERSONTHE}\]
Simplify \(\frac{2.541866\times {10}^{12}}{4.5RATIONALNUMBERSONTHE}\) to \(\frac{0.564859\times {10}^{12}}{RATIONALNUMBERSONTHE}\).
\[{e}^{2}\imath u{n}^{2}drl>\frac{0.564859\times {10}^{12}}{RATIONALNUMBERSONTHE}\]
Divide both sides by \({e}^{2}\).
\[\imath u{n}^{2}drl>\frac{\frac{0.564859\times {10}^{12}}{RATIONALNUMBERSONTHE}}{{e}^{2}}\]
Simplify \(\frac{\frac{0.564859\times {10}^{12}}{RATIONALNUMBERSONTHE}}{{e}^{2}}\) to \(\frac{0.564859\times {10}^{12}}{RATIONALNUMBERSONTHE{e}^{2}}\).
\[\imath u{n}^{2}drl>\frac{0.564859\times {10}^{12}}{RATIONALNUMBERSONTHE{e}^{2}}\]
Divide both sides by \(\imath \).
\[u{n}^{2}drl>\frac{\frac{0.564859\times {10}^{12}}{RATIONALNUMBERSONTHE{e}^{2}}}{\imath }\]
Simplify \(\frac{\frac{0.564859\times {10}^{12}}{RATIONALNUMBERSONTHE{e}^{2}}}{\imath }\) to \(\frac{0.564859\times {10}^{12}}{RATIONALNUMBERSONTHE{e}^{2}\imath }\).
\[u{n}^{2}drl>\frac{0.564859\times {10}^{12}}{RATIONALNUMBERSONTHE{e}^{2}\imath }\]
Divide both sides by \({n}^{2}\).
\[udrl>\frac{\frac{0.564859\times {10}^{12}}{RATIONALNUMBERSONTHE{e}^{2}\imath }}{{n}^{2}}\]
Simplify \(\frac{\frac{0.564859\times {10}^{12}}{RATIONALNUMBERSONTHE{e}^{2}\imath }}{{n}^{2}}\) to \(\frac{0.564859\times {10}^{12}}{RATIONALNUMBERSONTHE{e}^{2}\imath {n}^{2}}\).
\[udrl>\frac{0.564859\times {10}^{12}}{RATIONALNUMBERSONTHE{e}^{2}\imath {n}^{2}}\]
Divide both sides by \(d\).
\[url>\frac{\frac{0.564859\times {10}^{12}}{RATIONALNUMBERSONTHE{e}^{2}\imath {n}^{2}}}{d}\]
Simplify \(\frac{\frac{0.564859\times {10}^{12}}{RATIONALNUMBERSONTHE{e}^{2}\imath {n}^{2}}}{d}\) to \(\frac{0.564859\times {10}^{12}}{RATIONALNUMBERSONTHE{e}^{2}\imath {n}^{2}d}\).
\[url>\frac{0.564859\times {10}^{12}}{RATIONALNUMBERSONTHE{e}^{2}\imath {n}^{2}d}\]
Divide both sides by \(r\).
\[ul>\frac{\frac{0.564859\times {10}^{12}}{RATIONALNUMBERSONTHE{e}^{2}\imath {n}^{2}d}}{r}\]
Simplify \(\frac{\frac{0.564859\times {10}^{12}}{RATIONALNUMBERSONTHE{e}^{2}\imath {n}^{2}d}}{r}\) to \(\frac{0.564859\times {10}^{12}}{RATIONALNUMBERSONTHE{e}^{2}\imath {n}^{2}dr}\).
\[ul>\frac{0.564859\times {10}^{12}}{RATIONALNUMBERSONTHE{e}^{2}\imath {n}^{2}dr}\]
Divide both sides by \(l\).
\[u>\frac{\frac{0.564859\times {10}^{12}}{RATIONALNUMBERSONTHE{e}^{2}\imath {n}^{2}dr}}{l}\]
Simplify \(\frac{\frac{0.564859\times {10}^{12}}{RATIONALNUMBERSONTHE{e}^{2}\imath {n}^{2}dr}}{l}\) to \(\frac{0.564859\times {10}^{12}}{RATIONALNUMBERSONTHE{e}^{2}\imath {n}^{2}drl}\).
\[u>\frac{0.564859\times {10}^{12}}{RATIONALNUMBERSONTHE{e}^{2}\imath {n}^{2}drl}\]
u>(0.564859072962*10^12)/(RATIONALNUMBERSONTHE*e^2*IM*n^2*d*r*l)
