Refer to the information provided in Figure 17.1 below to answer the question(s) that follow.
![](data:image/png;base64, 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)
![](data:image/png;base64, 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)
Refer to Figure 17.1. Dmitri has two job offers when he graduates from college. Dmitri views the offers as identical, except for the salary terms. The first offer is at a fixed annual salary of $40,000. The second offer is at a fixed salary of $20,000 plus a possible bonus of $40,000. Dmitri believes that he has a 50-50 chance of earning the bonus. Dmitri's expected utility from the first job offer is ________ and it is ________ from the second job offer.
◦ 180; 210
◦ 180; 110
◦ 180; 160
◦ 90; 160