Question

How do you find the equation of the tangent line to the graph of `y = (ln x)/x` at the points (1,0)?

Answer 1

The equation is `y = x - 1`.

Explanation:

Differentiate using the quotient rule.

`y = lnx/x`

`y' = (1/x xx x - lnx xx 1)/x^2`

`y' = (1 - lnx)/x^2`

Now, we find the slope of the tangent by inserting the point `x = 1` into the derivative.

`m_"tangent" = (1- ln(1))/1^2`

`m_"tangent" = (1 - 0)/1`

`m_"tangent" = 1`

We can now find the equation, because we know the slope and a point.

`y - y_1 = m(x - x_1)`

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

`y - 0 = x - 1`

`y = x - 1`

Hopefully this helps!