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

\({3 a^{2} \over 7 a^{3}} = {3 \over 7} ⋅ {a^{2} \over a^{3}} = {3 \over 7} ⋅ a^{2 - 3} = {3 \over 7} a^{-1}\)

\({x^{7} \over x^{-8}} = x^{7 - -8} = x^{15}\)

\(x^{3} ⋅ x^{-9} = x^{3 + -9} = x^{-6}\)

\((a^{2})^{-7} = a^{2 ⋅ -7} = a^{-14}\)

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

\({({1 \over x^{9}}) \over x^{7}} = {x^{-9} \over x^{7}} = x^{-9 - 7} = x^{-16}\)

\({a^{6} \over ({1 \over a^{7}})} = {a^{6} \over a^{-7}} = a^{6 - -7} = a^{13}\)

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

\({a^{5} \over a^{0}} = a^{5 - 0} = a^{5}\)

\(x^{8} ⋅ \sqrt[7]{x} = x^{8} ⋅ x^{\frac{1}{7}} = x^{8 + \frac{1}{7}} = x^{8\frac{1}{7}}\)

\(p^{5} ⋅ \sqrt[9]{p^{4}} = p^{5} ⋅ p^{\frac{4}{9}} = p^{5 + \frac{4}{9}} = p^{5\frac{4}{9}}\)

\({x^{6} \over \sqrt[9]{x^{7}}} = {x^{6} \over x^{\frac{7}{9}}} = x^{6 - \frac{7}{9}} = x^{5\frac{2}{9}}\)

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

\({\sqrt[6]{a^{5}} \over \sqrt[9]{a^{4}}} = {a^{\frac{5}{6}} \over a^{\frac{4}{9}}} = a^{\frac{5}{6} - \frac{4}{9}} = a^{\frac{7}{18}}\)

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

\(\sqrt[5]{p^{25}} = p^{\frac{25}{5}} = p^{5}\)

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

\({9 \over p^{7}}\)

\({5 y^{7} \over 8 x^{8}}\)

\((3 a)^{-4} = 3^{-4} ⋅ a^{-4} = {1 \over 3^{4}} ⋅ {1 \over a^{4}} = {1 \over 81 a^{4}}\)

\(({1 \over 5} p)^{-4} = (5^{-1} ⋅ p)^{-4} = (5^{-1})^{-4} ⋅ p^{-4} = 5^{4} ⋅ p^{-4} = {625 \over p^{4}}\)

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

\(\frac{4}{5} x^{-\frac{3}{4}} y^{\frac{4}{9}} = \frac{4}{5} ⋅ {1 \over x^{\frac{3}{4}}} ⋅ y^{\frac{4}{9}} = {4 ⋅ \sqrt[9]{y^{4}} \over 5 ⋅ \sqrt[4]{x^{3}}}\)