merlin2007
New member
- Joined
- Dec 25, 2006
- Messages
- 28
Hi everyone,
I'm having a problem with finding extrema for the following function, where the system of equations is singular.
\(\displaystyle \[f\left( {x,y} \right) = x - y\]\), subject to \(\displaystyle \[x^2 - y^2 = 2\]\).
When we take the gradient of both and equalize with the Lagrange multiplier, we get
\(\displaystyle $\begin{array}{l} \nabla h = \left( {1, - 1} \right) - \lambda \left( {2x, - 2y} \right) = {\bf{0}} \\ 1 = 2x\lambda \\ - 1 = - 2y\lambda \\ \end{array}$\)
However, when we then substitute this result into our constraint equation, we get that 0 = 2.
Could someone please provide an interpretation for this result?
Thanks a lot!
I'm having a problem with finding extrema for the following function, where the system of equations is singular.
\(\displaystyle \[f\left( {x,y} \right) = x - y\]\), subject to \(\displaystyle \[x^2 - y^2 = 2\]\).
When we take the gradient of both and equalize with the Lagrange multiplier, we get
\(\displaystyle $\begin{array}{l} \nabla h = \left( {1, - 1} \right) - \lambda \left( {2x, - 2y} \right) = {\bf{0}} \\ 1 = 2x\lambda \\ - 1 = - 2y\lambda \\ \end{array}$\)
However, when we then substitute this result into our constraint equation, we get that 0 = 2.
Could someone please provide an interpretation for this result?
Thanks a lot!
