Question

At which point(s) does the graph of the function `f(x) = (x^2) / (x - 1)` have a horizontal tangent line?

Answer 1

`(0, 0), (2, 4)`

Explanation:

The slope of the tangent line of a graph `y=f(x)` at a point `x_0` is given by the derivative of `f` at that point, that is, `f'(x_0)`.

A horizontal tangent line implies a slope of `0`, so our goal is to find the points at which the derivative `f(x)` evaluates to `0`.

Using the quotient rule, we find the derivative as

`f'(x) = d/dx x^2/(x-1)`

`=((x-1)(d/dxx^2)-x^2(d/dx(x-1)))/(x-1)^2`

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

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

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

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

Setting this equal to zero, we get

`(x(x-2))/(x-1)^2 = 0`

`=> x(x-2) = 0`

`=> x = 0 or x = 2`

Thus, the graph of `f(x)` has a horizontal tangent line at `x=0` and `x=2`, that is, at the points

`(0, 0), (2, 4)`