Question

How do you find the value of `125^(-2/3)`?

Answer 1

`125^(-2/3) = 1/25`

Explanation:

`125^(-2/3)`

`=1/(125^(2/3))`

`=1/((125^(1/3))^2)`

`=1/((5)^2)`

`=1/25`

Answer 2

`1/25`

Explanation:

According to the law of indices, `a^-m=1/a^m`. So you only need to get the reciprocal to get rid of the negative exponent.

`125^(-2/3)`
`=1/(125^(2/3)`

According to the law of indices again, `a^(m/n)=root(n)(a^m)`.

`1/(125^(2/3)`
`=1/root(3)(125^2)`

Let's factor out 125 completely so we can take out any perfect cubes.

`1/root(3)(125^2)`
`=1/root(3)((5^3)^2)`
`=1/root(3)(5^3*5^3)`
`=1/(5*5)`
`=color(blue)(1/25)`

Answer 3

`1/25`

Explanation:

Note that `125=5^3`.

Thus:

`(125)^(-2/3)=(5^3)^(-2/3)`

Now we should use the rule `(a^b)^c=a^(bxxc)`, so:

`(5^3)^(-2/3)=5^((3xx-2/3))=5^-2`

Here, use the rule `a^-b=1/a^b`:

`5^-2=1/5^2=1/25`