Answer:
The total profit is 612.5
Explanation:
First we need to find the profit maximizing quantity. Since the monopolist faces the entire demand his profit ([tex]\Pi[/tex])equation would be
[tex]\Pi=Q\times P- 10 Q[/tex]
where PxQ is his revenue and 10Q is his total cost.
We can replace P in the above equation from the equation demand[tex]Q=40-\frac{P}{2}\rightarrow P=80-2Q[/tex]
Then
[tex]\Pi=Q\times (80-2Q)- 10 Q=80Q-2Q^2-10Q[/tex]
taking derivatives with respect to Q
[tex]\frac{\partial \Pi}{\partial Q}=80-4Q-10=0[/tex]
then Q=17.5 and P=45.
The total profit is then 612.5
