Environmental Economics & Management (4th ed.).
Assume that a small town uses a referendum to overcome the free-ridership problem and determine how its residents might value a new water filtration system for its public water supply. The voting results are aggregated by the town's two districts, yielding the following demand estimates:
District 1: Q = 160 - 20P1District 2: Q = 60 - 5P2, where Q is the expected percent of copper to be filtered by the system and Pis the price in millions of dollars.
- Based on these estimates, determine the town's market demand for this public good, the new filtration system.
- Because this is a public good, the two demands must first be written in inverse form and then summed. The reasoning is that, for a public good, each demander is expressing a willingness to pay for the same quantity. The inverse demand equations are:
- P1 = 8 - 0.05Q P2 =12-0.2Q
- Summing these yields the market demand, which is
- P +P =(8+12)-(0.05Q+0.2Q)12
- ⇒ P = 20 - 0.25Q . [Define, P ≡ P + P ]12