Use Product Rule: \({x}^{a}{x}^{b}={x}^{a+b}\).
\[IFTheSid{e}^{2}ofa{s}^{2}qur\imath \times 10cm,f\imath nd\imath tsarea\]
Regroup terms.
\[10IFTheSi{e}^{2}\imath dofa{s}^{2}qurcm,f\imath nd\imath tsarea\]
Use Product Rule: \({x}^{a}{x}^{b}={x}^{a+b}\).
\[10IFTheSi{e}^{2}\imath dofa{s}^{2}qurcm,f{\imath }^{2}ndts{a}^{2}re\]
Use Square Rule: \({i}^{2}=-1\).
\[10IFTheSi{e}^{2}\imath dofa{s}^{2}qurcm,f\times -1\times ndts{a}^{2}re\]
Simplify \(f\times -1\times ndts{a}^{2}re\) to \(f\times -ndts{a}^{2}re\).
\[10IFTheSi{e}^{2}\imath dofa{s}^{2}qurcm,f\times -ndts{a}^{2}re\]
Regroup terms.
\[10IFTheSi{e}^{2}\imath dofa{s}^{2}qurcm,-efndts{a}^{2}r\]
10*IFTh*eSi*e^2*IM*d*o*f*a*s^2*q*u*r*c*m,-e*f*n*d*t*s*a^2*r
