Question

How do you evaluate and simplify `(64^(5/9)*64^(2/9))/4^(3/4)`?

Answer 1

the answer
`4^(84/36-27/36)=4^(57/36)=4^(19/12)`

`=8.9797`

Explanation:

show below

`(64^(5/9)*64^(2/9))/4^(3/4)`

`(64)^(5/9+2/9)/4^(3/4)=(64)^(7/9)/4^(3/4)`

`64=4^3`

`(4^3)^(7/9)/4^(3/4)=4^(21/9)/4^(3/4)`

`4^(21/9)*4^(-3/4)=4^(21/9-3/4)`

`4^(84/36-27/36)=4^(57/36)=4^(19/12)`

`=4^(19/12)=8.9797`

The index answer is probably better.

Answer 2

`2^(19/6)`

Explanation:

Here are some laws of indices
`x^a xx x ^b=x ^(a+b)`

`x^a -: x^b=x^(a-b)`

`(x^a)^b =x^(a xx b)`

Using the first law
`64^(5/9) xx 64^(2/9)=64^(7/9)`

using the third law
`64=2^6` so `64^(7/9)=(2^6)^(7/9)=>2^(42/9)=2^(14/3)`

`4^(3/4)=(2^2)^(3/4)=>2^(6/4)=2^(3/2)`

Putting these two together

`=> (64^(5/9) xx 64^(2/9))/4^(3/4)=(2^(14/3))/(2^(3/2))`

Using the second law
`(2^(14/3))/(2^(3/2))=2^(14/3-3/2)=2^(28/6-9/6)=2^(19/6)`