Question

How do you solve `lnx-ln(x+1)=2`?

Answer 1

`therefore x = \frac{e^2}{1 - e^2}`

Explanation:

Use the property of logarithms

`log(a)-log(b) = log(a/b)`

to write

`ln(x)-ln(x+1)=2 \iff ln(x/(x+1)) = 2`

Consider both sides as exponents of `e`:

`e^{ln(x/(x+1))} = e^2`

By definition, `e^ln(z)=z`, so

`x/(x+1) = e^2`

`therefore x = (x+1)e^2`

`therefore x = e^2x+e^2`

`therefore x - e^2x = e^2`

`therefore x(1 - e^2) = e^2`

`therefore x = \frac{e^2}{1 - e^2}`

Answer 2

`lnx-ln(x+1)=2`

Using logarithmic rules we have `ln(x/(x+1))=2=lne^2`

Then `x/(x+1)=e^2`

`x=e^2x+e^2`
`x-e^2x=e^2`
`x(1-e^2)=e^2`
`x=e^2/(1-e^2)`