Question

How can the properties of rational exponents be applied to simplify expressions with radicals or rational exponents?

Answer 1

@Elsa213

Answer 2

@Eiwoh2

Answer 3

Oh come on. x'D

Answer 4

this isnt a call people names post x'D

Answer 5

@Shadow Sorry, but i'm trying to call people who are good at mathetmatics. x'D

Answer 6

x'D its ok

Answer 7

@dude

Answer 8

https://brainly.com/question/2905460
e.e

Answer 9

How dare yew e.e

Answer 10

Dun tell Ultrilliam, boi e.e

Answer 11

x'D

Answer 12

soooooo Dude can yew helps me

Answer 13

Elsa have you the answer in that link

Answer 14

gave*

Answer 15

Oh.......ok......it didnt really help but ill read it again

Answer 16

Breh

I just risked my 2% life on this site to answer your question and it didn't help?

Answer 17

Siimplify it, Elsa. x'D Lead the person to the answer, not direct answer it. XD

Answer 18

Sorry elsa but no it was alittle confusing but ill do my best to figure it out

Answer 19

@TheSmartOne can yew help meh

Answer 20

@TheSmartOne

Answer 21

HELP MEHHHHH!

Answer 22

TSO!!!!!!!!

Answer 23

@TheSmartOne PLEASE HELP MEHHHHHHH!

Answer 24

can you make me a radical expression so i can use it to answer this question above

Answer 25

@TheSmartOne THE HECK MAN!

Answer 26

The basic property of rational exponents

is: a^(1/n) means n√a , that is, the nth root

of a. So, for ex, 49^(1/2) means √49, or 7.

Also, 8^(1/3) means ∛8, or 2.

If the numerator is not 1, just use properties

of exponents. So, 32^(2/5) = 32^(1/5 * 2)

= [ 32^(1/5) ] ^2 = 2^2 = 4