We've already learnt about the power of a power law, which states:
$\left(a^x\right)^y=a^{xy}$(ax)y=axy
We can still use this rule for questions with negative exponents. We just need to apply the same rules that we learnt when we learnt to multiply negative numbers.
Simplify the following into the form $a^b$ab:
$\left(6^7\right)^{-3}$(67)−3
Simplify, expressing in positive exponential form.
$\left(4y^4\right)^{-4}$(4y4)−4
Simplify the following, giving your answer with positive exponents: $\left(\frac{a^3}{b^3}\right)^{-5}$(a3b3)−5