Answer:
Maximum at points (8,0),(-8,0).Minimum at points (0,8), (0,-8).
Step-by-step explanation:
There are multiple ways of using lagrange multipliers. Most of them are equivalent.
Consider the function [tex]F(x,y) = x^2-y^2-\lambda(x^2+y^2-64)[/tex]. We want the following [tex]\frac{\partial F}{\partial x} = \frac{\partial F}{\partial y} = \frac{\partial F}{\partial \lambda} = 0[/tex].
Then, we have
[tex]\frac{\partial F}{\partial x} = 2x-2x\lambda= 2x(1-\lambda)=0[/tex]
[tex]\frac{\partial F}{\partial y} = -2y-2y\lambda = -2y(1+\lambda)=0[/tex]
[tex]\frac{\partial F}{\partial \lambda} = x^2+y^2-64=0[/tex]
From the first two equations, we can see that if [tex]\lambda =1[/tex] then necessarily y=0. IN that case, from the third equation (which is the restriction) gives us that [tex]x=\pm 8[/tex].
On the other hand, if [tex]\lambda=-1[/tex] then necessarily x=0. Again, using the restriction this gives us that [tex]y=\pm 8[/tex].
if we evaluate the original function in this points, we have that [tex]f(0,\pm 8) = -64, f(\pm 8,0)=64[/tex]. Then, we have Maximum at points (8,0),(-8,0) and Minimum at points (0,8), (0,-8).
