Originally Posted by
sakonpure6 When multiplying exponents with the same base, we add them together, so $\displaystyle 2^4 * 2^2
$ is the same as$\displaystyle 2^6$
a) $\displaystyle f^3g^2h^4 * f^2gh^3$
$\displaystyle = f^5g^3h^7$
When you have any power to the power of a power, like $\displaystyle (2^6)^4$ you multiply the exponents so you would get $\displaystyle 2^24$
b) $\displaystyle (a^3b^2)^3$
=$\displaystyle a^9b^6$
When you are dividing with the same base, we subtract exponents so $\displaystyle 2^3/2^2$ is equal to $\displaystyle 2^1$ or $\displaystyle 2$
c) $\displaystyle a^4bc^-2/a^5b^2c^3$
=$\displaystyle a^-1b^-1c^-5$ those are negative exponents btw.
or =$\displaystyle 1/a^1b^1c^5$