Thingiverse
MonkeySaddle by osj1961
by Thingiverse
Last crawled date: 4 years, 7 months ago
A classic example of a function of 2 variables having a critical point (where the gradient is 0) that is neither a maximum nor a minimum. At the critical point the Hessian determinant is zero, thus the multi-variable version of the 2nd derivative test is inconclusive.
The equation is f(x,y) = x^3--3xy^2. The gradient of this function is <3x^2 - 3y^2, -6xy>. The Hessian determinant is -36x^2 - 36y^2 which evaluates to zero at the origin (which is where the lone critical point is located).
The equation is f(x,y) = x^3--3xy^2. The gradient of this function is <3x^2 - 3y^2, -6xy>. The Hessian determinant is -36x^2 - 36y^2 which evaluates to zero at the origin (which is where the lone critical point is located).