Question

How do you find the critical points for `f(x, y) = x^2 + 4x + y^2` and the local max and min?

Answer 1

The point `(-2,0)` is a minimum for the function.

Explanation:

Evaluate the partial derivatives of the first order:

`(del f)/dx =2x+4`

`(del f)/dy =2y`

so the critical points are the solutions of the equations:

`{(2x+4=0),(2y=0):}`

`{(x=-2),(y=0):}`

We have therefore a single critical point: `(-2,0)`. To determine the character of the point we have to look at the Hessian matrix:

`(del^2 f)/(dx^2) = 2`

`(del^2 f)/(dx dy) = 0`

`(del^2 f)/(dy^2) = 2`

`abs H = 2 xx 2 -0 = 4`

so we have that:

`abs H > 0`

`[(del^2 f)/(dx^2)]_((x,y) = (-2,0)) >0`

then the point `(-2,0)` is a minimum.