A minor-league baseball team is trying to predict ticket sales for the upcoming season and is considering changing ticket prices.
a. The elasticity of ticket sales with respect to the size of the local population is estimated to be about 0.7. Briefly explain what this number means. If the local population increases from 60,000 to 61,500, what is the predicted change in ticket sales?
b. Currently, a typical fan pays an average ticket price of $5. The price elasticity of demand for tickets is -0.6. Management is thinking of raising the average ticket price to $5.50. Compute the predicted percentage change in tickets sold. Would you expect ticket revenue to rise or fall?
c. The typical fan also consumes $4 worth of refreshments at the game. Thus, at the original $5 average price, each admission generates $5 + $4 = $9 in total revenue for team management. Would raising ticket prices to $5.50 increase or reduce total revenue? Provide a careful explanation of your finding. (Hint: Assume that current sales are 5,000 tickets per game. However, to answer the question you need not know current ticket sales.)