Question

Question #3aa6d

Answer 1

`32^(1/5)=2`
`32^(3/5)=8`

Explanation:

PROBLEM ONE
`32^n=(2^5)^n=2^1`
Hence,
`2^(5n)=2^1`
and
`5n=1`
`n=1/5`
PROBLEM TWO
`32^n=(2^5)^n=8=2^3`
Hence,
`2^(5n)=2^3`
and
`5n=3`
`n=3/5`

Hope it helps :)

Answer 2

a)`->n=ln(2)/ln(32)` as an exact answer

Now that I have shown you one of the ways of calculating this I will let you solve part b of the question.

Explanation:

Consider question (a)

Taking logs of both sides

`ln(32^n)=ln(2)`

but this is the same as:

`nln(32)=ln(2)`

Divide both sides by `ln(32)` giving:

`n=ln(2)/ln(32)`
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