Reference no: EM132314660

The demand for good X is given by the following equation:

Q_X = 325 - P_X - 1.5 P_W + 1.25 P_G + 0.8 P_Y - 0.1 M

where Q_X is the number of X sold per week; P_X, P_W, P_G, P_Y are the prices of the respective goods and M is the average monthly income.

Currently P_X = 200, P_W = 50, P_G = 80, P_Y= 125, and M = 2000.

(a) Should P_X be increased or decreased to maximize revenue? How do you know?

(b) Calculate the elasticity of demand for good X with respect to P_W, P_G, P_Y and M. In less than two sentences, explain precisely what each elasticity measure means.

(c) Calculate the price range over which the demand for good X is elastic.

(d) If the cost per X is 100 and the manufacturer behaves as a monopolist, how many X will be sold and at what price?

(e) By how much must the price of X change if there is a 1% increase in the average monthly income (M) and the goal is to keep Q_X constant?