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Given the cost function C(x)=30000+100xC(x)=30000+100x for producing xx auto body frames
Given the cost function C(x)=30000+100xC(x)=30000+100x for producing xx auto body frames.
a. Find the average cost per unit if 500 units are produced.
b. Find the marginal average cost at the production level of 500 units and interpret the results.
Expert Solution
A)
The average cost is the total cost divided by the number of units produced. Therefore the average cost of producing 500 units are:
C(500)500=30000+100∗500500=160C(500)500=30000+100∗500500=160
Thus, the average cost is $160.
B)
For this part, we need to first find the marginal average cost function. The marginal average cost function is the first derivative of the average cost function. The average cost function will be:
AC=C(x)x=30000x−1+100∴MAC=−30000x−2The marginal average cost at production level of 500 units will be:MAC=−0.12AC=C(x)x=30000x−1+100∴MAC=−30000x−2The marginal average cost at production level of 500 units will be:MAC=−0.12
The average costs of the firm fall by $0.12 with the production of the 500th unit.
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