Answer:
$10
Explanation:
We are to account for external costs in production, since we are asked to find optimal tax.
Given:
[tex] C(A) = \frac{A^2}{10}[/tex]
We now have:
[tex] C(A) = \frac{A^2}{10} + \frac{A^2}{20}[/tex]
A represents number of aluminum units produced, let's find A, since the margnal cost is $30.
Thus,
[tex] 30 = \frac{A}{5} + \frac{A}{10} [/tex]
[tex] 30 = \frac{2A + A}{10} [/tex]
[tex] 300 = 3A [/tex]
[tex] A = \frac{300}{3} [/tex]
[tex] A = 100 [/tex]
Let's equate the private marginal cost with the marginal revenue of each unit in order to achieve this amount of produced units with tax, t.
We have:
[tex] 30 - t = \frac{A}{5}[/tex]
Substituting 100 for A above, we have:
[tex] 30 - t = \frac{100}{5}[/tex]
30 - t = 20
t = 30 - 20
t = 10
Therefore, the socially optimal tax on aluminum is $10 per unit
