Question

What are the extrema and saddle points of `f(x, y) = x^2 + y^2+27xy+9x+3y`?

Answer 1

A saddle point is located at `{x = -63/725, y = -237/725}`

Explanation:

The stationary poins are determined solving for `{x,y}`

`grad f(x,y) = ((9 + 2 x + 27 y),( 3 + 27 x + 2 y)) = vec 0`

obtaining the result

`{x = -63/725, y = -237/725}`

The qualification of this stationary point is done after observing the roots from the charasteristic polynomial associated to its Hessian matrix.

The Hessian matrix is obtained doing

`H = grad(grad f(x,y)) = ((2,27),(27,2))`

with charasteristic polynomial

`p(lambda) = lambda^2- "trace"(H)lambda + det(H) = lambda^2-4 lambda-725`

Solving for `lambda` we obtain

`lambda = {-25,29}` which are non zero with opposite sign characterizing a saddle point.