D 6. Suppose that the demand for good Y is given by the equation: Qdy =...
1) Suppose that the demand for good Y is given by the equation: Qdy = 200- 2Py + 3Px, where Px is the price of good X and Py is the price of good Y. Based on this equation we can conclude that: A) Good X and good Y are complementary goods B) When the price of X goes down the quantity demanded of Y goes up C) Good X and good Y are substitute goods D) When the price...
1) Suppose that the demand is given by the equation: Qd = 200 - 2P. if the market price is 20, what is the consumer surplus? A) 8,100 B) 6,400 C) 81,000 D) 64,000 2) Suppose that the demand for good Y is given by the equation: Qdy = 40- 2Py + Px, where Px is the price of good X and Py is the price of good Y. If Py is $16, and Px is $8 , what is...
please calculate carefully The demand for good (Qx) is given by the following equation: Qx = 20,200 - 12.5 Px + 5 Py-M + 1.5 Ax Suppose the firm spends $3,000 per week on advertising (Ax), Px is $80, Py is $60, and income per capita (M) in the market area is $22,000. (a) Calculate the elasticity of demand for good X with respect to its own price, the price of good Y, and Income per capita. (3) (b) Calculate...
The market for good X consists of 2 consumers. Consumer 1’s demand for good X is: X1 = 15 - 3PX + 0.5PY + .02 *I1 Consumer 2's demand for X is: X2 = 10 - PX + 0.2PY + .01*I2 I1 and I2 are incomes of consumer 1 and 2, respectively. PX and PY are the prices of goods X and Y, respectively. a. What is the equation for the market demand function for X? Graph the two individual...
The demand curve is given by: Qdx=500-1.5Px-0.2I-2Py+Pz Where Qdx= quantity demanded of good X Px= Price of good X I= income (in thosands) Py= Price of good Y Pz= Price of good Z A. Is good X a normal or inferior good? Why? B. What is the relationship between goods X & Y? Why? C. What is the relationship between goods X & Z? Why? D. What is the equation of this demand curve if income is $40,000, the price...
The utility function is given by U(x, y) = xy2 . (a) Write out the demand functions for goods x and y in terms of I, px, and py. (b) What is the maximum utility the consumer can achieve as a function of I, px, and py? (c) What is the minimum the consumer needs to spend to achieve a level of utility U as a function of px, and py? (d) The initial income is $576, initial prices are...
Suppose the demand for good X is given by Xdx=20-Px+2Py+M. The price of good X is $5, the price of good Y is $15, and the income is $150. How much of good X will be purchased? Is good Y a substitute or complement of good X? Is good X a normal good or an inferior good?
Find the equilibrium prices and quantities for Good X and Good Y by simultaneously solving given the following: Qdx = 290 - 4Px + 2Py and Qsx = -20 + Px. For Good Y: Qdy = 300 - 2Px - 6Py and Qsy = -15 + 2Py.
The utility function is given by U(x, y) = xy2 . (a) Write out the demand functions for goods x and y in terms of I, px, and py. (2) (b) What is the maximum utility the consumer can achieve as a function of I, px, and py? (2) c) What is the minimum the consumer needs to spend to achieve a level of utility U as a function of px, and py? (2) (d) The initial income is $576,...
The utility function is given by U(x, y) = xy2 . (a) Write out the demand functions for goods x and y in terms of I, px, and py. (2) (b) What is the maximum utility the consumer can achieve as a function of I, px, and py? (2) (c) What is the minimum the consumer needs to spend to achieve a level of utility U as a function of px, and py? (2) (d) The initial income is $576,...