Question

How do you simplify `root4 32`?

Answer 1

`32 = 16 * 2`
`32^(1/4) = 16^(1/4) * 2^(1/4)`
`= 2 * 2^(1/4)`

Answer 2

`root4 32=2^("5/4")=2root4 2`

Explanation:

We should first note that `32=2^5`.

`=root4(2^5)`

To simplify this, use the rule:

`rootb(x^a)=x^(a"/"b)`

Thus, the expression is equal to

`=2^("5/4")`

This is simplified. However, if you wish, there is another way to simplify it:

`=2^(4"/"4+"1/4")`

`=2^(1+"1/4")`

Use the rule:

`x^(a+b)=x^a(x^b)`

So the expression can be split up into:

`=2^1(2^(1/4))`

Which equals

`=2root4 2`

Another way of approaching this problem is to say that `root4 32` equals

`=root4(2^4*2)`

The `2^4` can be brought out of the root:

`=2root4 2`