f(p) is the demand curve

R(p) formula = p * d(p) 

p = price

d = demand

R(p): Revenue = 500p/e^0.1p

R'(p) = - (50p - 500) e^-p/10

Q13: 

- R'(p) = 0

critical point at p = 10

Maximum revenue = 1839.397

Q14: Please solve this question

Transcribed Image Text:

1. Which of the two curves in this graph, f(p) or g(p), makes more sense as a demand curve? Explain why in a sentence or two. (Economists often use price on the vertical axis, but for this revenue example we will use price as the independent variable on the horizontal axis.) 500 400 300 200 100 f(p) 8 10 12 14 16 18 20 22 24 26 28 2. A function like d(p) = 500e¬0.1p is a good model for a demand curve. Suppose this equation gives the demand for large cheese pizzas at Augie's Pizza Pies.

Transcribed Image Text:

13. Keep going with the calculations to determine the point of maximum revenue exactly. What is the amount of the maximum revenue? How can you demonstrate that you have found a maximum? 14. Finally, take the equation d = 500e-0.1p and solve for p. Then create a new revenue function r(d) which gives the revenue in terms of the quantity demanded, d. Use this equation to maximize revenue, and show that you get the same answer as above. Again demonstrate that this is a maximum.