Simplify the expression $\displaystyle \left(2u^2 v^3 \right)^3 \left( 3u^{-3}v \right)^2$ and eliminate any negative exponents.
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\begin{equation}
\begin{aligned}
\left(2u^2 v^3 \right)^3 \left( 3u^{-3}v \right)^2 &= \left[ 2^3(u^2)^3(v^3)^3 \right] \left[ 3^2(u^{-3})^2 v^2 \right] && \text{Law: } (ab)^n = a^n b^n\\
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&= \left( 8u^6 v^9 \right) \left( 9u^{-6} v^2 \right) && \text{Law: } (a^m)^n = a^{mn}\\
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&= (8) (9) u^6 u^{-6} v^9 v^2 && \text{Group factors with same base}\\
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&= 72 u^{6+(-6)} v^{9+2} && \text{Law: } a^m a^n = a^{m+n}\\
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&= 72u^0 v^{11} && \text{Simplify}\\
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&= 73v^{11}
\end{aligned}
\end{equation}
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