[5 marks] Locate all relative maxima, relative minima and saddle points of thefunction f (x, y) = xy − x3 − y2.

For the function of two variables, f (x, y) = x3 − y2 + 9xy + 5. Find the critical points and determine their nature to complete the following sentences (making sure you use at least 3 decimal places in your answer): • the left-most stationary point (the one with the lower value of x) is located at x = and y = and is a point. • the right-most stationary point (the one with the higher value of x) is located at x = and y = and is a point

1: Find the local extreme values of the functionf x, y = x3 + y3 − 3x − 12y + 20.

Compute all the first and second partial derivatives of the function. We assume that y>0𝑦>0 .f(x,y)=xy−3x−ln(y6) .

Consider the following function.h(x) = x3 − 4x2 − 6x(a) Write the derivative formula.h'(x) = 3x2−8x−6 (b) Locate any relative extreme points. (Round your answers to three decimal places. If an answer does not exist, enter DNE.)relative maximum     (x, y) =

Use the graph to state the absolute and local maximum and minimum values of the function. (Assume each point lies on the gridlines. Enter your answers as a comma-separated list. If an answer does not exist, enter DNE.)A function with two curves, three closed points, and three open points is graphed on the x y coordinate plane. The first curve begins at the closed point (0, 2) increases to the open point (1, 4) decreases to (2, 2) increases to (4, 5) decreases to (5, 3) then turns sharply and increases to the closed point (6, 4). The second curve begins at the open point (6, 3) and decreases to the open point (7, 1). The closed point (1, 3) is graphed.absolute maximum value 5 absolute minimum value 2 local maximum value(s) 5 local minimum value(s) 2,3