\({1 \over x^2}=x^{-2}\)

\({2a^3 \over 5a^6}={2 \over 5}⋅{a^3 \over a^6}={2 \over 5}⋅a^{3-6}={2 \over 5}a^{-3}\)

\({x^6 \over x^{-7}}=x^{6--7}=x^{13}\)

\(p^6⋅p^{-9}=p^{6+-9}=p^{-3}\)

\((a^2)^{-5}=a^{2⋅-5}=a^{-10}\)

\(p^5⋅{1 \over p^6}=p^5⋅p^{-6}=p^{5+-6}=p^{-1}\)

\({({1 \over a^6}) \over a^5}={a^{-6} \over a^5}=a^{-6-5}=a^{-11}\)

\({x^6 \over ({1 \over x^8})}={x^6 \over x^{-8}}=x^{6--8}=x^{14}\)

\({8x^8y^2 \over 7x^5y^4}={8 \over 7}⋅{x^8 \over x^5}⋅{y^2 \over y^4}={8 \over 7}⋅x^{8-5}⋅x^{2-4}=1\frac{1}{7}x^3y^{-2}\)

\({x^0 \over x^9}=x^{0-9}=x^{-9}\)

\(a^5⋅\sqrt[5]{a}=a^5⋅a^{\frac{1}{5}}=a^{5+\frac{1}{5}}=a^{5\frac{1}{5}}\)

\(x^8⋅\sqrt[9]{x^4}=x^8⋅x^{\frac{4}{9}}=x^{8+\frac{4}{9}}=x^{8\frac{4}{9}}\)

\({a^2 \over \sqrt[7]{a^3}}={a^2 \over a^{\frac{3}{7}}}=a^{2-\frac{3}{7}}=a^{1\frac{4}{7}}\)

\({1 \over a^3}⋅\sqrt[9]{a^2}=a^{-3}⋅a^{\frac{2}{9}}=a^{-3+\frac{2}{9}}=a^{-2\frac{7}{9}}\)

\({\sqrt[9]{x^8} \over \sqrt[8]{x^5}}={x^{\frac{8}{9}} \over x^{\frac{5}{8}}}=x^{\frac{8}{9}-\frac{5}{8}}=x^{\frac{19}{72}}\)

\(\sqrt[5]{{1 \over p^4}}=\sqrt[5]{p^{-4}}=p^{-\frac{4}{5}}\)

\(\sqrt[4]{a^8}=a^{\frac{8}{4}}=a^2\)

\({x^6 \over x^7⋅\sqrt[7]{x^3}}={x^6 \over x^7⋅x^{\frac{3}{7}}}={x^6 \over x^{7\frac{3}{7}}}=x^{6-7\frac{3}{7}}=x^{-1\frac{3}{7}}\)

\({8 \over x^5}\)

\({2b^8 \over 7a^9}\)

\((5p)^{-3}=5^{-3}⋅p^{-3}={1 \over 5^3}⋅{1 \over p^3}={1 \over 125p^3}\)

\(({1 \over 5}a)^{-2}=(5^{-1}⋅a)^{-2}=(5^{-1})^{-2}⋅a^{-2}=5^2⋅a^{-2}={25 \over a^2}\)

\(6p^{7\frac{2}{5}}=6⋅p^7⋅p^{\frac{2}{5}}=6p^7⋅\sqrt[5]{p^2}\)

\(\frac{1}{2}x^{-\frac{1}{8}}y^{\frac{5}{6}}=\frac{1}{2}⋅{1 \over x^{\frac{1}{8}}}⋅y^{\frac{5}{6}}={1⋅\sqrt[6]{y^5} \over 2⋅\sqrt[8]{x}}\)