Question

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

Answer 1

`x=1+sqrt(1+e)`

Explanation:

We can simplify the left hand side by using the logarithmic rule: `ln(a)+ln(b)=ln(ab)`

`ln[x(x-2)]=1`

`ln(x^2-2x)=1`

To undo the natural logarithm, exponentiate both sides with base `e`.

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

`x^2-2x=e`

Move the `e` to the left side and solve with the quadratic equation.

`x^2-2x-e=0`

`x=(2+-sqrt(4+4e))/2`

Factor a `4` from inside the square root, which can be pulled out as a `2`.

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

`x=1+sqrt(1+e)`

Notice that the negative root has been taken away, since for `ln(a),a>0` (if we are forgoing complex roots).