Question

How do you solve `Log(x+2)+Log(x-1)=Log(88)`?

Answer 1

`x=9`

Explanation:

Use the product rule of logarithms: `log(a)+log(b)=log(ab)`

Thus, the expression can be written as

`log((x+2)(x-1)=log(88)`

Distribute.

`log(x^2+x-2)=log(88)`

Raise both sides as the power of `10`.

`10^(log(x^2+x-2))=10^(log(88))`

`x^2+x-2=88`

`x^2+x-90=0`

`(x+10)(x-9)=0`

`x+10=0`
or
`x-9=0`

`x=-10`
or
`x=9`

Plug in both potential values.

Notice that if you plug in `-10`, you'd have to take the logarithm of a negative number, which is impossible.

Thus, the `-10` answer is thrown out and all that's left is

`x=9`