What is $a^(1/2)b^(4/3)c^(3/4)$ in radical form?

Question

What is $a^(1/2)b^(4/3)c^(3/4)$ in radical form?

1 Answer

Impact of this question

1631 views around the world

You can reuse this answer
Creative Commons License

Answer 1 · 2017-07-20T22:02:37

See a solution process below:

Explanation:

First, rewrite the expression as:

$a^(1/2)b^(4 xx 1/3)c^(3 xx 1/4)$

We can then use this rule of exponents to rewrite the $b$ and $c$ terms:

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

$a^(1/2)b^(color(red)(4) xx color(blue)(1/3))c^(color(red)(3) xx color(blue)(1/4)) => a^(1/2)(b^color(red)(4))^color(blue)(1/3)(c^color(red)(3))^color(blue)(1/4)$

We can now use rule to write this in radical form:

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

$root(2)(a)root(3)(b^4)root(4)(c^3)$

Or

$sqrt(a)root(3)(b^4)root(4)(c^3)$

Science

Math

Humanities

... and beyond

What is $a^(1/2)b^(4/3)c^(3/4)$ in radical form?

1 Answer

Explanation:

Related questions

Impact of this question

Science

Math

Humanities

... and beyond

What is a^(1/2)b^(4/3)c^(3/4)a^(1/2)b^(4/3)c^(3/4) in radical form?

1 Answer

Explanation:

Related questions

Impact of this question

What is $a^(1/2)b^(4/3)c^(3/4)$ in radical form?