Consider the function f(x,y)= x^4+y^4-4 xy+2. on D = [-3,3]x[-3,3] a. Find the absolute and relative maxim a and minima if they exist. Proceed as follow b. Compute the first-order partial derivatives c. Find the critical points d. Compute the second-order partial derivatives e. Use the second derivatives test to classify the critical points f. Find the value of the function at the local extrema if they exist g. Find the absolute maxima and minimum by evaluation f on the boundary of D

Find the local and absolute extrema of the function

f(x,y)=y³+3x²y-6x²-6y²+2 on [-3,3]x[-1,5]

Find the absolute and relative maxima and minima if they exist. Proceed as follow

Compute the first-order partial derivatives
Find the critical points
Compute the second-order partial derivatives
Use the second derivatives test to classify the critical points
Find the value of the function at the local extrema if they exist
Find the absolute maxima and minimum by evaluation f on the boundary of D

Consider the function: f(x,y)=x^4+y^4-4xy+2

on D = [-3,3]x[-3,3]

*Find the absolute and relative maxima and minima if they exist.

*Find the Critical Points