Question 1
Refer to the information provided in Table 13.3 below to answer the question(s) that follow.
![](data:image/png;base64, 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)
Refer to Table 13.3. If a monopoly faces the demand schedule given in the table, its marginal revenue is positive
◦ at prices above $2.00.
◦ at all prices.
◦ at prices below $2.00.
◦ at all price but $2.00.
Question 2
Refer to the information provided in Table 13.3 below to answer the question(s) that follow.
![](data:image/png;base64, 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)
Refer to Table 13.3. If a monopoly faces the demand schedule given in the table and has a constant marginal and average cost of $1 per unit of providing the product, what is the level of output that would maximize its profits?
◦ 200
◦ 400
◦ 500
◦ 600