can you derive this Engineering economy formula
can you derive this Engineering economy formula Figure 2-3 Total Revenue Function as a Function of...
Derive an expression for total revenue. Find its critical value. Is it a min or max? Explain how you know. 4. Suppose you have the following demand curve: Pa = a - bQ Derive an expression for total revenue. Find its critical value. Is this a minimum or maximum? How do you know? Explain/Show work.
Derivation and Plots of Demand, Marginal Revenue, and Revenue Curves Name Due (worth 50 points) The equation below represents a linear demand curve. Use the grid (right) for your plots. Write all derivations in the space below. 1) Plot the demand function on the top set of axes. Q = 40000-100P, 2) The price function is the inverse of the demand function. Write this inverse below. to 3) Use the price function to obtain the total revenue function (TR). Write...
Question 3-4 SESSION 13 The marginal revenue is the rate of change in total revenue per unit increase in output, Q The marginal cost is the rate of change in total cost per unit increase in output, Q AR is defined as average revenue per unit for the first Q su ccessive units sold. AR is determined by dividing total reven ue by the quantity sold, Q The AR function is equal to price, P. where Pis given by the...
Use the following demand schedule to determine total revenue and marginal revenue for each possible level of sales. Instructions: Enter your answers as whole numbers. Product Price Quantity Demanded Total Revenue Marginal Revenue NNNNNN a. What can you conclude about the structure of the industry in which this firm is operating? The industry is purely monopolistic. The industry is purely oligopolistic. The industry is monopolistically competitive. The industry is purely competitive. b. Graph the total-revenue and marginal-revenue curves for this...
Need the answer from question 5 to 9, do not put the answer from 1 to 4, please. Question1 Consider the following economy of Hicksonia. 1. The consumption function is given by C 200 + 0.75(Y-T). The investment function is 1 = 200-2500. Government purchases and taxes are both 100. Derive the IS curve 2. The money demand function in Hicksonia is (Md/P)-Y-10000 The money supply (M) is 1,000. Derive the LM curve under an arbitrary value of P (Hint:...
Industrial Engineering/Engineering Economy Question pt 3 Problem #3: How much money can be withdrawn monthly for 20 years from a retirement fund which earns a nominal 8% per year interest compounded monthly and has a present amount $360,000 in it? (Note: The effective monthly interest rate is 8/12 - .666667%. Therefore, you may not want to use the tables.)
3. The demand function for a good is given as P = 50 - 20. 1) Write down expressions for the TR and MR functions. 2) Find and classify the type of the point price elasticity at price P=10. 3) Calculate the output at which TR is a maximum, and use second order conditions to confirm that it is maximum. 4) Confirm that marginal revenue is zero at maximum point.
The equation below represents a linear demand curve. Use the grid (right) for your plots. Write all derivations in the space below. l) Plot the demand function on the top set of axes. Your demand function is: Qx = 60000 - 100Px l) Plot the demand function on the top set of axes. 2) The price function is the inverse of the demand function. Write this inverse below. 3) Use the price function to obtain the total revenue function (TR)....
Please help to answer this question. Thank you 5. The Zenith television company faces a demand function for its products which can be expressed as Q-4000 - P+0.5Y where Q is the number of televisions, P is the price per television, and is average monthly income. Average monthly income is currently equal to RM2,000 1. Express the inverse demand curve faced by Zenith at the current income level. [2 marks) At what price and quantity is Zenith's total revenue (TR)...
The equation below represents a linear demand curve. Use the grid (right) for your plots. Write all derivations in the space below. 1) Plot the demand function on the top set of axes. Qy = 15000 – 200P, 2) The price function is the inverse of the demand function. Write this inverse below. 3) Use the price function to obtain the total revenue function (TR). Write the TR function below. You will plot TR on the lower set of axes...