In ajperfect competition. the cost function of each of 100 firms is given as: +0.2q + 4q +10 300 The market demand function is given by: O-8000-200P.
Answers
Answer:
The correct answer is a.) 15
C = \frac{1}{300}q^{3} +0.2 q^{2}+4q+103001q3+0.2q2+4q+10
Derive the short-run marginal cost:
MC = \frac{\partial TC} {\partial Q} = \frac{q^{2} } {100} + 0.4q+4∂Q∂TC=100q2+0.4q+4
Calculate the short-run supply function:
Short run supply function is where P = MC(Q):
P = \frac{q^{2} } {100} + 0.4q+4P=100q2+0.4q+4
Multiply both sides by 100:
100P = q2 + 40q + 400
Q = 10√P – 20
Short run supply function (Qs) = 10√P – 20
Derive the market or industry short run supply curve:
Qs = 100q = 100(10√P – 20) = 1000√P – 2000
The market short-run supply curve (Qs) = 1000√P – 2000
Finally, derive the short run equilibrium price and quantity:
At equilibrium: Qd = Qs
Qd = 8000 – 200P
Qs = 1000√P – 2000
8000 – 200P = 1000√P – 2000
1000√P – 200P – 10000 = 0
P + 5√P – 50 = 0
(√P + 5/2)2 = 225/4
P = 25
Equilibrium price = 25
Substitute in the demand function to get the equilibrium quantity:
Qd = 8000 – 200P = 8000 – 200(25) = 8000 – 5000 = 3000
Equilibrium quantity = 3000