Question

How do you simplify `12^(10/8)/12^(-3/8)`?

Answer 1

See a solution process below:

Explanation:

Use the following rule for exponents to simplify: `x^color(red)(a)/x^color(blue)(b) = x^(color(red)(a)-color(blue)(b))`

`12^color(red)(10/8)/12^color(blue)(-3/8) = 12^(color(red)(10/8)-color(blue)(-3/8)) = 12^(color(red)(10/8)+color(blue)(3/8)) = 12^(13/8)`

We can also rewrite this expression as:

`12^(13 xx 1/8)`

We can now use this rule of exponents to rewrite the expression again as:

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

`12^(color(red)(13) xx color(blue)(1/8)) = (12^color(red)(13))^color(blue)(1/8)`

If we want to simplify this to write the expression in radical form we can use this rule of exponents:

`(12^13)^(1/color(red)(8)) = root(color(red)(8))(12^13)`