Answer:
[tex]\displaystyle \frac{81\, p^{6}\, q^{2}}{3\, p^{2} \, q^{5}} = \frac{27\, p^{4}}{q^{3}}[/tex].
Step-by-step explanation:
Make use of the fact that for any [tex]x \ne 0[/tex] and integer [tex]n[/tex]:
[tex]\displaystyle \frac{1}{x^{n}} = x^{-n}[/tex].
For example, in this question:
[tex]\displaystyle \frac{1}{p^{2}} = p^{-2}[/tex].
[tex]\displaystyle \frac{1}{q^{5}} = q^{-5}[/tex].
Thus, the original expression would be equivalent to:
[tex]\begin{aligned}& \frac{81\, p^{6}\, q^{2}}{3\, p^{2} \, q^{5}} \\ =\; & \frac{81}{3}\, (p^{6}\, p^{-2})\, (q^{2}\, q^{-5}) \\ =\; & 27\, (p^{6}\, p^{-2})\, (q^{2}\, q^{-5})\end{aligned}[/tex].
Also make use of the fact that for any [tex]x \ne 0[/tex], integer [tex]m[/tex], and integer [tex]n[/tex]:
[tex]x^{m}\, x^{n} = x^{m + n}[/tex].
Thus:
[tex]\begin{aligned}& 27\, (p^{6}\, p^{-2})\, (q^{2}\, q^{-5}) \\=\; & 27\, p^{6 + (-2)}\, q^{2 + (-5)} \\ =\; & 27\, p^{4}\, q^{-3} \\ =\; & \frac{27\, p^{4}}{q^{3}}\end{aligned}[/tex].
