Use Product Rule: \({x}^{a}{x}^{b}={x}^{a+b}\).
\[ov{e}^{2}rl\imath nx=50-3635\times 10\]
Regroup terms.
\[{e}^{2}\imath ovrlnx=50-3635\times 10\]
Simplify \(3635\times 10\) to \(36350\).
\[{e}^{2}\imath ovrlnx=50-36350\]
Simplify \(50-36350\) to \(-36300\).
\[{e}^{2}\imath ovrlnx=-36300\]
Divide both sides by \({e}^{2}\).
\[\imath ovrlnx=-\frac{36300}{{e}^{2}}\]
Divide both sides by \(\imath \).
\[ovrlnx=-\frac{\frac{36300}{{e}^{2}}}{\imath }\]
Simplify \(\frac{\frac{36300}{{e}^{2}}}{\imath }\) to \(\frac{36300}{{e}^{2}\imath }\).
\[ovrlnx=-\frac{36300}{{e}^{2}\imath }\]
Divide both sides by \(o\).
\[vrlnx=-\frac{\frac{36300}{{e}^{2}\imath }}{o}\]
Simplify \(\frac{\frac{36300}{{e}^{2}\imath }}{o}\) to \(\frac{36300}{{e}^{2}\imath o}\).
\[vrlnx=-\frac{36300}{{e}^{2}\imath o}\]
Divide both sides by \(v\).
\[rlnx=-\frac{\frac{36300}{{e}^{2}\imath o}}{v}\]
Simplify \(\frac{\frac{36300}{{e}^{2}\imath o}}{v}\) to \(\frac{36300}{{e}^{2}\imath ov}\).
\[rlnx=-\frac{36300}{{e}^{2}\imath ov}\]
Divide both sides by \(r\).
\[lnx=-\frac{\frac{36300}{{e}^{2}\imath ov}}{r}\]
Simplify \(\frac{\frac{36300}{{e}^{2}\imath ov}}{r}\) to \(\frac{36300}{{e}^{2}\imath ovr}\).
\[lnx=-\frac{36300}{{e}^{2}\imath ovr}\]
Divide both sides by \(l\).
\[nx=-\frac{\frac{36300}{{e}^{2}\imath ovr}}{l}\]
Simplify \(\frac{\frac{36300}{{e}^{2}\imath ovr}}{l}\) to \(\frac{36300}{{e}^{2}\imath ovrl}\).
\[nx=-\frac{36300}{{e}^{2}\imath ovrl}\]
Divide both sides by \(n\).
\[x=-\frac{\frac{36300}{{e}^{2}\imath ovrl}}{n}\]
Simplify \(\frac{\frac{36300}{{e}^{2}\imath ovrl}}{n}\) to \(\frac{36300}{{e}^{2}\imath ovrln}\).
\[x=-\frac{36300}{{e}^{2}\imath ovrln}\]
x=-36300/(e^2*IM*o*v*r*l*n)
