Question

How do you simplify the following expression?

Answer 1

See below for the detailed steps.

The simplified form is `4root(6)(x^11y^7)`

Explanation:

We can write a root as a fractional exponent or vice versa, so let's start here:

`(4x^3y)^(1/2)*(8xy^2)^(1/3)`

When we have an exponent on an expression in brackets we mutiply exponents:

`(4^(1/2)x^(3/2)y^(1/2))*(8^(1/3)x^(1/3)y^(2/3))`

Now `4^(1/2)=2` and `8^(1/3)=2` with that we can collect like terms by multiplying, and to multiply we add exponents:

`(2x^(3/2)y^(1/2))*(2x^(1/3)y^(2/3))`

`=4x^((3/2+1/3))y^((1/2+2/3))`

`=4x^((9/6+2/6))y^((3/6+4/6))`

`=4x^((11/6))y^((7/6))`

`=4root(6)(x^11y^7)`