Consider the function f(x, y) = (6x-x²)(2y-²). Find and classify all critical points of the function. If there are more blanks than critical points, leave the remaining entries blank. fx = fy= fxx = fxy = fyy = There are several critical points to be listed. List them lexicograhically, that is in ascending order by x-coordinates, and for equal x-coordinates in ascending coordinates (e.g., (1,1), (2, -1), (2, 3) is a correct order) The critical point with the smallest x-coordinate is ) Classification: (local minimum, local maximum, saddle point, cannot be determined) The critical point with the next smallest x-coordinate is ) Classification: The critical point with the next smallest x-coordinate is ) Classification: ( The critical point with the next smallest x-coordinate is ) Classification: ( The critical point with the next smallest x-coordinate is ) Classification: Loon garn partial credit on this problem. (local minimum, local maximum, saddle point, cannot be determined) (local minimum, local maximum, saddle point, cannot be determined) (local minimum, local maximum, saddle point, cannot be determined) (local minimum, local maximum, saddle point, cannot be determined)
Consider the function f(x, y) = (6x-x²)(2y-²). Find and classify all critical points of the function. If there are more blanks than critical points, leave the remaining entries blank. fx = fy= fxx = fxy = fyy = There are several critical points to be listed. List them lexicograhically, that is in ascending order by x-coordinates, and for equal x-coordinates in ascending coordinates (e.g., (1,1), (2, -1), (2, 3) is a correct order) The critical point with the smallest x-coordinate is ) Classification: (local minimum, local maximum, saddle point, cannot be determined) The critical point with the next smallest x-coordinate is ) Classification: The critical point with the next smallest x-coordinate is ) Classification: ( The critical point with the next smallest x-coordinate is ) Classification: ( The critical point with the next smallest x-coordinate is ) Classification: Loon garn partial credit on this problem. (local minimum, local maximum, saddle point, cannot be determined) (local minimum, local maximum, saddle point, cannot be determined) (local minimum, local maximum, saddle point, cannot be determined) (local minimum, local maximum, saddle point, cannot be determined)
Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
Problem 1RQ
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