\({1 \over x^4}=x^{-4}\)

\({5a^2 \over 8a^3}={5 \over 8}⋅{a^2 \over a^3}={5 \over 8}⋅a^{2-3}={5 \over 8}a^{-1}\)

\({a^4 \over a^{-9}}=a^{4--9}=a^{13}\)

\(p^6⋅p^{-7}=p^{6+-7}=p^{-1}\)

\((x^4)^{-5}=x^{4⋅-5}=x^{-20}\)

\(x^2⋅{1 \over x^8}=x^2⋅x^{-8}=x^{2+-8}=x^{-6}\)

\({({1 \over a^9}) \over a^2}={a^{-9} \over a^2}=a^{-9-2}=a^{-11}\)

\({a^3 \over ({1 \over a^9})}={a^3 \over a^{-9}}=a^{3--9}=a^{12}\)

\({7a^6b^4 \over 3a^3b^5}={7 \over 3}⋅{a^6 \over a^3}⋅{b^4 \over b^5}={7 \over 3}⋅a^{6-3}⋅a^{4-5}=2\frac{1}{3}a^3b^{-1}\)

\({a^6 \over a^0}=a^{6-0}=a^6\)

\(x^9⋅\sqrt{x}=x^9⋅x^{\frac{1}{2}}=x^{9+\frac{1}{2}}=x^{9\frac{1}{2}}\)

\(x^6⋅\sqrt[8]{x^5}=x^6⋅x^{\frac{5}{8}}=x^{6+\frac{5}{8}}=x^{6\frac{5}{8}}\)

\({x^4 \over \sqrt[5]{x^3}}={x^4 \over x^{\frac{3}{5}}}=x^{4-\frac{3}{5}}=x^{3\frac{2}{5}}\)

\({1 \over a^6}⋅\sqrt[8]{a^5}=a^{-6}⋅a^{\frac{5}{8}}=a^{-6+\frac{5}{8}}=a^{-5\frac{3}{8}}\)

\({\sqrt[5]{a^4} \over \sqrt[5]{a^2}}={a^{\frac{4}{5}} \over a^{\frac{2}{5}}}=a^{\frac{4}{5}-\frac{2}{5}}=a^{\frac{2}{5}}\)

\(\sqrt[4]{{1 \over p^3}}=\sqrt[4]{p^{-3}}=p^{-\frac{3}{4}}\)

\(\sqrt[3]{p^{15}}=p^{\frac{15}{3}}=p^5\)

\({x^6 \over x^2⋅\sqrt[7]{x^2}}={x^6 \over x^2⋅x^{\frac{2}{7}}}={x^6 \over x^{2\frac{2}{7}}}=x^{6-2\frac{2}{7}}=x^{3\frac{5}{7}}\)

\({2 \over x^7}\)

\({4q^3 \over 5p^9}\)

\((4x)^{-5}=4^{-5}⋅x^{-5}={1 \over 4^5}⋅{1 \over x^5}={1 \over 1\,024x^5}\)

\(({1 \over 2}p)^{-5}=(2^{-1}⋅p)^{-5}=(2^{-1})^{-5}⋅p^{-5}=2^5⋅p^{-5}={32 \over p^5}\)

\(4a^{2\frac{3}{4}}=4⋅a^2⋅a^{\frac{3}{4}}=4a^2⋅\sqrt[4]{a^3}\)

\(\frac{4}{9}a^{-\frac{6}{7}}b^{\frac{2}{5}}=\frac{4}{9}⋅{1 \over a^{\frac{6}{7}}}⋅b^{\frac{2}{5}}={4⋅\sqrt[5]{b^2} \over 9⋅\sqrt[7]{a^6}}\)