The demand equation for Good Y is given by
P = 900/q - 0.48q + 100 q > 0
In this question use derivatives to explore the relationship between the demand for Good Y, total revenue and elasticity.
Task
- Find an expression for the total revenue, TR.
- Find an expression for marginal revenue, MR.
- Find and interpret the marginal revenue when q = 60
- What price must be charged to achieve a demand of q = 60
- Find an expression for dp/dq and evaluate at q = 60
- Use the relationship dp/dq = 1/dp/dq and the result of (4) and (5) to determine
Whether the demand is elastic, unit elastic or inelastic when q = 60, and interpret the result.
7. Determine value of q which maximizes total revenue.
8. What price must be charged to maximize total revenue?
9. Complete the following table, giving the corresponding rang or value for price and quantity, and whether marginal revenue is positive, negative or zero for corresponding range or value.
Demand
|
Inelastic
|
Unit Elastic
|
Elastic
|
Price
|
|
|
|
Quantity
|
|
|
|
Marginal Revenue
|
|
|
|
Hints:
- Do Not attempt to obtain an equation for dq/dp in terms of p.
- A second derivative is required in question 7 to verify a maximum.
- Graph TR to check/verify your algebraic answers.