Question

How do you find the slope of the line tangent to the graph of `ln(xy)-x=0` at the point where x=-1?

Answer 1

The slope of the line tangent is `-2/e`.

Explanation:

Simplify the function and then differentiate.

`ln(xy) - x =0`

`ln(xy) = x`

`xy = e^x`

`y + x(dy/dx) = e^x`

`x(dy/dx) =e^x - y`

`dy/dx = (e^x- y)/x`

The slope of the tangent is given by evaluating the point `(x, y)` within the derivative.

We will need to find the y-coordinate of the point of contact.

`ln(-1y) - (-1) = 0`

`ln(-y) + 1 = 0`

`ln(-y) = -1`

`-y = e^-1`

`-y = 1/e`

`y = -1/e`

So,

`m_"tangent" = (e^-1 - (-1/e))/-1`

`m_"tangent" = (1/e + 1/e)/-1`

`m_"tangent" = (2/e)/-1`

`m_"tangent" = -2/e`

Hopefully this helps!