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Suppose that a firm’s production function is



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Ch07
Ch03, sol 03, sol 03
11. Suppose that a firm’s production function is
1
1
2
2
10
q
L K

. The cost of a unit of labor is $20 and
the cost of a unit of capital is $80.
a. The firm is currently producing 100 units of output and has determined that the cost-
minimizing quantities of labor and capital are 20 and 5, respectively. Graphically illustrate
this using isoquants and isocost lines.
To graph the isoquant, set q  100 in the production function and solve it for K. Solving for K:
1/2 1/2 10
q
K
L

Substitute 100 for q and square both sides. The isoquant is K  100/L. Choose various combinations of L and K and plot them. The isoquant is convex. The optimal quantities of labor and capital are given by the point where the isocost line is tangent to the isoquant. The isocost line has a slope of 1/4, given labor is on the horizontal axis. The total cost is
TC  ($20)(20)  ($80)(5)  $800, so the isocost line has the equation 20L  80K  800, or
K  10  0.25L, with intercepts K  10 and L  40. The optimal point is labeled A on the graph.

Chapter 7
The Cost of Production 113 Copyright © 2013 Pearson Education, Inc. Publishing as Prentice Hall.

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