Question 1
Refer to the data provided in Table 17.1 below to answer the following question(s). The table shows the relationship between income and utility for Jane.
![](data:image/png;base64, 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)
Refer to Table 17.1. From the table, we can see that Jane 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 17.1 below to answer the following question(s). The table shows the relationship between income and utility for Jane.
![](data:image/png;base64, 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)
Refer to Table 17.1. Suppose Jane has a 1/3 chance of becoming disabled in any given year. If she does become disabled, she will earn $0. If Jane does not become disabled, she will earn her usual salary of $60,000. Jane has the opportunity to purchase disability insurance which will pay her her full salary in the event she becomes disabled. On average, how much would such a contract cost the insurance company (per person)?
◦ $20,000
◦ $30,000
◦ $40,000
◦ $60,000