Suppose that the profit from the sale of Kisses and Kreams is given by the following, where x is the number of pounds of Kisses and y is the number of pounds of Kreams. P(x,y) - 14x + 6.8y - 0.001x2 -0.025y2 dollars You know from previous experience that, for such a profit function, profit will be maximized at the critical point of P(x,y). (a) Determine the amounts of Kisses and Kreams that will maximize profit. pounds of Kisses pounds of Kreams (b) What is the maximum profit? (Round your answer to two decimal places.) $ (-/3 Points] DETAILS MY NOTES ASK YOUR TEACHER Suppose that P = 1.8x2 + 1.5y2 -0.05x? -0.01y3 tons is the production function for a product with x units of one input and y units of a second input. This function has two critical points, the origin (0,0) and one other. The critical point with positive values of x and y yield the maximum production. Find the values of x and y that will maximize production. units y = units What is the maximum production? (Round your answer to the nearest whole number.) tons