Question 1
Refer to the data provided in Table 17.3 below to answer the following question(s). The table shows the relationship between income and utility for Terri.
![](data:image/png;base64, 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)
Refer to Table 17.3. From the table, we can see that Terri is
◦ risk-averse.
◦ risk-loving.
◦ risk-neutral.
◦ We cannot determine Jane's attitude toward risk from the table.
Question 2
Refer to the data provided in Table 17.3 below to answer the following question(s). The table shows the relationship between income and utility for Terri.
![](data:image/png;base64, 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)
Refer to Table 17.3. Suppose Terri has a 25% chance of becoming disabled in any given year. If she does become disabled, she will earn $0. If Terri does not become disabled, she will earn her usual salary of $80,000. Terri has the opportunity to purchase disability insurance for $20,000 which will pay her her full salary in the event she becomes disabled. Terri's utility with the policy is ________ and her expected utility without the policy is ________.
◦ 56.25; 45
◦ 45; 56.25
◦ 45; 18.75
◦ 18.75; 37.5