Consider a country with a non-renewable resource. There are 150 units of the resource. Suppose there are two periods [you can think of them as the present and the future, but analytically, we will call them period 0 and period 1]. Suppose both the private and social discount rates are 10% (i.e. r = 0.1). There is no international trade and suppose that the inverse demand curve for the resource (in each period) is p = 200 - x, where x is the amount of the resource available for use in the relevant period. The marginal cost of extracting q units of the resource in each period is c(q) = q^₂/2. Note that this means that marginal cost is increasing in q.

Let q₀ be the amount of the resource extracted in period 0, and let q₁ be the amount of the resource extracted in period 1.

Suppose the resource is durable and is fully reusable (think for example of diamonds for jewelry - once dug up and cut and polished they can be used in both periods). So in the demand curve above, x is the total amount ever extracted up to that time. In period 0, x₀ = q₀, but in period 1, it is the sum of the amount extracted in both periods: x1 = q₀ + q₁.

Recall that if the total benefit of consuming x in any period is B(x), then the marginal benefit, B'(x), is the price in that period. So B'(x) = 200 - x, where x is consumption in that period.

(a) How much would a benevolent social planner choose to extract in each period? Does the price rise over time? Why?

(b) Suppose that instead of having a benevolent planner, there is a competitive market. Demonstrate how intertemporal arbitrage will yield the efficient solution that you found in (1).