Question

A satellite following the equation `y = 1/2x^2 - 4`, where `x` and `y` are in millions of kilometres, is surveying a far away planet, located at the origin (0,0). How close to the planet does the satellite get?

Answer 1

`2.65` million kilometers.

Explanation:

Essentially, the problem is this:

What is the point on `y = 1/2x^2 - 4` that is closest to `(0, 0)`?

By the distance formula, we have:

`d = sqrt((x_2 - x_1)^2 + (y_2 - y_1)^2)`

`d = sqrt((0 - x_1)^2 + (0 - y_1)^2)`

`d = sqrt((-x)^2 + (-y)^2)`

`d = sqrt(x^2 + y^2)`

`d = sqrt(x^2 + (1/2x^2 -4)^2)`

`d = sqrt(x^2 + 1/4x^ 4 - 4x^2 + 16)`

`d = sqrt(1/4x^4 - 3x^2 + 16)`

`d^2 = 1/4x^4 - 3x^2 + 16`

We now differentiate with respect to `x`.

`2d((dd)/dx) = x^3 - 6x`

`(dd)/dx = (x^3 - 6x)/(2d)`

`(dd)/dx = (x^3 - 6x)/(2sqrt(1/4x^4 -3 x^2 + 16))`

We're now going to find the critical points by

a) Finding where the derivative is undefined
b) Finding where the derivative is `0`

First of all, the derivative is undefined whenever the denominator is equivalent to `0`.

`2sqrt(1/4x^4 - 3x^2 + 16) = 0`

`1/4x^4 - 3x^2 + 16 = 0`

`x^4 - 12x^2 + 64 = 0`

Let `u = x^2`. Then the equation becomes.

`u^2 - 12u + 64 = 0`

`u = (-(-12) +- sqrt((-12)^2 - (4 * 1 * 64)))/(2 * 1)`

We can see very quickly that there exists no real solution to this equation.

Now for the other set of critical points.

`0 = (x^3 - 6x)/(2sqrt(1/4x^4 -3 x^2 + 16))`

`0 = x^3 - 2x`

`0 = x(x^2 - 6)`

`x = 0 and +- sqrt(6)`

Next, we must check whether these are maximums or minimums. We want to minimize distance, so we will have a minimum. Check on both sides of each critical point. If the derivative is inferior to `0` on the left-hand side and greater than `0` on the right-hand side, we have a minimum.

We don't even have to check the entire derivative. The sign of the derivative, positive or negative will only be influenced by the numerator because a `sqrt` is always positive.

Test Point `x = -1`

`(-1)^3 - 2(-1) = -1 + 2 = 1`

We can instantly eliminate `x = 0` as the minimum because the derivative is increasing to the left of the point.

Test Point: `x = -3`

`(-3)^3 - 2(-3) = -27 + 6 = -21`

Since `-3 <= -sqrt(6) <= -1`, we have that `-sqrt(6)` is a minimum.

Since quadratic functions are symmetric, `sqrt(6)` will also be a minimum. Therefore, the points `(sqrt(6), -1)` and `(-sqrt(6), -1)` are closest to `(0, 0)`.

However, we must find the distance, therefore:

`d = sqrt((x_2 - x_1)^2 + (y_2 - y_1)^2)`

`d = sqrt((sqrt(6) - 0)^2 + (-1 - 0)^2)`

`d = sqrt(6 + 1)`

`d = sqrt(7)`

Since distance is a scalar quantity, it will be this in any direction on the plane. Finally, we're talking millions of kilometers, so the closest distance is `sqrt(7)` million kilometers, which is `2.65` million kilometers, nearly.

Hopefully this helps!

Answer 2

`sqrt 7 times 10^6`km

Explanation:

Alternative approach, if you are happy with the Lagrange Multiplier.

In simple units, actual distance units quoted above...

We wish to optimise:

`f(x,y) = sqrt(x^2 + y^2)`, the distance formula applied between any point on trajectory and the Origin

• and

`g(x,y) = y - x^2/2 + 4`, the constraint, which the equation of the trajectory

Basic idea;

`nabla f = lambda nabla g`

`implies ((x/sqrt(x^2 + y^2)),(y/sqrt(x^2 + y^2))) = lambda ((-x),(1))`

`lambda = (-1)/sqrt(x^2 + y^2) = y/sqrt(x^2 + y^2)`

`implies y = -1`

`implies x = pm sqrt 6`

The optimised distance is therefore: `f(sqrt 6, 1) = sqrt 7`

In terms of showing this to be a min, note from geometry that:

`f(0,-4) = 4`

`f(pm 2 sqrt 2, 0) = 2 sqrt 2`

As `sqrt 7 < 4` and `sqrt 7 < 2 sqrt 2`, and the function is continuous throughout, this is a minimum distance.

graph{1/2x^2 - 4 [-10, 10, -5, 5]}