Answer:
$12,250
Explanation:
The profit-maximizing output is at MC = MR
We are given with Marginal Cost we need to find Marginal Revenue
MR = additional revenue for an additional unit
P = 150 – 0.25Q
Q = (150 - P)/0.25 = 600 - 4P
Total Revenue= P x Q = (150 - 0.25Q)Q
TR = 150Q-0.25Q^2
MR = will be the slope of the total revenue function:
dTR/dQ -0.5Q + 150
Now we equalize MR and MC
-0.5Q + 150 = 10 + 0.5Q
Q = 140
P when Q = 140
P = 150 - 0.25 Q = 150 - 0.25(140) = 150 - 35 = 115
Producer surplus:(using marginal cost)
[tex]\int\limits^{140}_0 {10 + 0.50q} \, dq[/tex]
(P(140) - P(0)) x Q140
(80 - 10 ) x 140 = 9,800
Consumer surplus:
(P0 - Pm ) x Qm /2
(150 - 115) x 140 / 2 = 2.450
Total Surplus: 9,800 + 2,450 = 12,250
