Question

Which point on the parabola `y=x^2` is nearest to (1,0)?

Answer 1

Approximately `(0.58975, 0.34781)`

Explanation:

I'm just going to solve this by the first method that comes to me, rather than trying to use any special geometric properties of parabolas.

If `(x, y)` is a point on the parabola, then the distance between `(x, y)` and `(1, 0)` is:

`sqrt((x-1)^2+(y-0)^2) = sqrt(x^4+x^2-2x+1)`

To minimize this, we want to minimize `f(x) = x^4+x^2-2x+1`

The minimum will occur at a zero of:

`f'(x) = 4x^3+2x-2 = 2(2x^3+x-1)`

graph{2x^3+x-1 [-10, 10, -5, 5]}

Using Cardano's method, find

`x = root(3)(1/4 + sqrt(87)/36) + root(3)(1/4 - sqrt(87)/36) ~= 0.58975`

`y = x^2 ~= 0.34781`