For the question below, I just need the answer for part c,d,e and f. Part a and
ID: 3015622 • Letter: F
Question
For the question below, I just need the answer for part c,d,e and f. Part a and b is ok.
Maximizing revenue and profit: 5. a. The WMA Bus Lines offers sightseeing tours of Washington, D.C. One tour prices at $7 per person, had an average demand of about 1000 customers per week. When the price was lowered to $6, the weekly demand jumped to about 1200 customers. Assuming that the demand equation is linear, find the tour price that should be charged per person to maximize the total revenue each week. b. Suppose that the demand equation for a monopolist is p 100 01x and the cost function is COx) 50x 10,000. Find the value of x that maximizes the profit and determine the corresponding price and total profit for this level of production. c. If e government imposed an excise tax of $10 per unit how would this affect your results in part b d. In part b, find the production level at which marginal revenue equals marginal cost. e. On a certain route, a regional airline carries 8000 passengers per month, each paying $50. The airline wants to increase the fair. The market research department estimates that for each $1 increase in fare the airline will lose 100 passengers. Determine the price that maximizes the airline's revenue. f. The average ticket price for a concert at the opera house was $50. The average attendance was 4000. When the ticket price was raised to $52, attendance declined to an average of 3800 persons per performance. What should the ticket price be to maximize the revenue for the opera house? (Assume a linear demand curveExplanation / Answer
b) demand ; p = 100- 0.01x
Revenue = x(100 - 0.01x) = -0.01x^2 + 100x
Cost; C(x) = 50x + 10,000
Profit : P(x) = R(x) - C(x) = -0.01x^2 +100x - (50x +10,000)
= - 0.01x^2 + 50x - 10,000
If govtt.imposes tax of $10 per item
So, P(x) = - 0.01x^2 + 50x - 10,000 - 10x = -0.01x^2 +40x - 10,000
find maximum profit for this
Profit is maximum at vertex : x = -b/2a = 2000
P(2000) = $ 30,000
Earlier in part b) max.profit was $ 52500
So, with the tax profit has deceased
d) Marginal Revnue ; dR/dx = -0.02x +100
Marginal Cost dC/dx = 50
So, -0.02x +100 = 50
x = 2500 custimers