Question

Question #b7a06

Answer 1

See a solution process below"

Explanation:

Assuming you are looking for the radical form of `4^(2/3)`

We can rewrite the expression as:

`4^(2 xx 1/3)`

We can use this rule for exponents to simplify the expression giving:

`x^(color(red)(a) xx color(blue)(b)) = (x^color(red)(a))^color(blue)(b)`

`4^(color(red)(2) xx color(blue)(1/3)) => (4^color(red)(2))^color(blue)(1/3) => 16^(1/3)`

We can now use this rule for exponents to write the expression in radical form:

`x^(1/color(red)(n)) = root(color(red)(n))(x)`

`16^(1/color(red)(3)) => root(color(red)(3))(16)`

If necessary, we can use this rule for radicals to simplify the expression:

`root(n)(color(red)(a) * color(blue)(b)) = root(n)(color(red)(a)) * root(n)(color(blue)(b))`

`root(3)(16) => root(3)(color(red)(8) * color(blue)(2)) => root(3)(color(red)(8)) * root(3)(color(blue)(2)) => 2root(3)(2)`

Answer 2

`2root(3)(2)`

Explanation:

`color(blue)(4^(2/3)`

We can simplify this using the law of exponents

`color(brown)(x^(y/z)=root(z)(x^y)`

So,

`rarr4^(2/3)=root(3)(4^2)`

`color(green)(rArrroot(3)(16)` `=` `color (red)(root (3)(2×2^3)`
`color (blue)(2root (3)(2))`
Hope this helps!!! ☺☻