Question

How do you simplify `(9p^2(3pg)^3)/(81g^(-2))`?

Answer 1

`(3p^5g^5)`

Explanation:

Several of the Properties of Exponents must be applied in order to simplify this expression. The Power of a Product Property states that if a product is raised to a power, each factor is individually raised to the power.
`(ab)^m = a^mb^m`
So, `(3pg)^3 = 3^3p^3g^3 = 27p^3g^3`.

The Product of Powers Property states that if like bases are being multiplied, the base remains the same and the exponents are added.
a^m*a^n = a^(m+n)# #9p^2 * 27p^3g^3 = 243p^5g^3#

The Quotient of Powers Property states that if like bases are being divided, the base remains the same and the powers are subtracted.
`a^m/a^n = a^(m - n)`
So, `g^3/g^-2 = g^(3 - -2) = g^5`

The numerical potion of the fraction, `243/81`, is simplified by division. `243 -: 81 = 3`.

This completes the simplification and yields the fully simplified answer: `3p^5g^5`

`9p^2 (3pg)^3/(81g^-2)`
`9p^2 (27p^3g^3)/(81g^-2)`
`(243p^5g^3)/(81g^-2)`
`(243p^5g^5)/81`
`3p^5g^5`