Question

How do you solve `2log_3y-log_3(y+4)=2`?

Answer 1

`y=12`

Explanation:

Recall that:

`{(bloga=loga^b),(loga-logb=log(a/b)):}`

`2log_3y-log_3(y+4)=2`

`log_3(y^2)-log_3(y+4)=2`

`log_3(y^2/(y+4))=2`

`y^2/(y+4)=3^2=9`

`y^2=9(y+4)=9y+36`

`y^2-9y-36=0`

`(y-12)(y+3)=0`

`y=12` or `color(red)cancel(y=-3`

(In `loga`, `a>0`.)