Question

How do you simplify `sqrt(36 a^2 b^-8)`?

Answer 1

Convert out of radical form and solve using the rules for exponents. See the full explanation below:

Explanation:

First we can rewrite this expression from radical form into exponent form:

`sqrt(36a^2b^-8) = (36a^2b^-8)^(1/2)`

Next we can use this rule for exponents to simplify the parenthesis term:

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

`36^(1/2)a^(2xx1/2)b^(-8xx1/2)`

`6a^1b^(-4)`

We can now use two other rules for exponents to finalize the simplification:

`x^color(red)(1) = x`

`x^color(red)(a) = 1/x^color(red)(-a)`

`(6a)/b^(-(-4))`

`(6a)/b^4`