Question

How do you simplify `((2x^3y^2) /( 3xy))^ -3`?

Answer 1

`27/(8x^3y^2)`

Explanation:

The equation is raised to the negative third power, flip the fraction to turn it to a positive third power:

`((2x^3y^2)/(3xy))^-3 = ((3xy)/(2x^3y^2))^3`

Then raise the numerator and the denominator by the third power:

`(3xy)^3/(2x^3y^2)^3`

Distribute the third power exponent:

`(3^3x^3y^3)/(2^3x^9y^6)`

Factor an `x^3y^3` from top and bottom:

`((x^3y^3)(3^3))/((x^3y^3)(2^3x^3y^2))`

Cancel out like terms from top and bottom:

`(3^3)/(2^3x^3y^2)`

Simplify: `27/(8x^3y^2)`

Answer 2

`27/(8x^6y^3)`

Explanation:

For a moment let us disregard the power outside the brackets.

Example:`" " 1/x^2` can be written as `" "x^(-2)`

So we have`" " 2/3xxx^3y^2xxx^(-1)y^(-1)`

This gives us:`" "2/3xx x^(3-1)y^(2-1)`

`2/3xxx^2y = (2x^2y)/3`

'~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
Example: Suppose you have`" " (1/x)^(-3)` then this is`" "(x/1)^3`

Ok, so your question has: `" "((2x^2y)/3)^(-3)`

This gives us:`" "(3/(2x^2y))^3`

`3^3= 27`

`2^3=8`

`(x^2)^3 =x^(2xx3) = x^6`

`(y)^3 = y^3`

Putting it all together

`27/(8x^6y^3)`