6. Find and classify all the critical points of the function
Find all critical points of 3.22 12x3 and classify them.
9y3 + 3x2y-6y + 2 . 3. Find and classify all the critical points of f(x,y)
9y3 + 3x2y-6y + 2 . 3. Find and classify all the critical points of f(x,y)
Find the critical points of and use the second derivative test to classify these points as saddle, local minimum and local maximum points.
(a) Find and classify all of the critical points of the function X f(x, y, z) = (x2 +42 + x2)3/2 on the unit sphere. (b) Find and classify all of the critical points of the function f(x, y, z) = x sin(x2 + y2 +22) on the sphere of radius
(5) (20p) Find and classify the critical points of f(x, y) = 7x - 8y + 2xy - x + y®
(1 point) Find and classify the critical points of)(x) = 7x*(3 - 2)* as local maxima and minima. Critical points: Classifications: (Enter your critical points and classifications as comma-separated lists, and enter the types in the same order as your critical points. Note that you must enter something in both blanks for either to be evaluated. For the types, enter min, max, or neither
Find and classify all critical points of the function. If there are more blanks than critical points, leave the remaining entries blank The critical point with the smallest x-coordinate is (local minimum, local maximum, saddie point, cannot ) Classification be determined) The cnitical point with the next smallest x-coordinate is Classification "(local minimum, local maximum, saddle point cannot be determined) is ) Classification (local minimum, local maximum, saddle point cannot
Find and classify all critical points of the function. If...
Problem 1. Let f (r, y) 102y5a2-4-4 2y (1) Find and classify the critical points of f. (2) Find the highest point on the graph of f.
Problem 1. Let f (r, y) 102y5a2-4-4 2y (1) Find and classify the critical points of f. (2) Find the highest point on the graph of f.
2. Find and classify all critical points for f(x,y) = -22 + y? (x - 8)