Multiple Choice
Willy's only source of wealth is his chocolate factory.He has the utility function pc1/2f + (1 - p) c1/2nf, where p is the probability of a flood, 1 - p is the probability of no flood, and cf and cnf are his wealth contingent on a flood and on no flood, respectively.The probability of a flood is p = 1/13.The value of Willy's factory is $500,000 if there is no flood and 0 if there is a flood.Willy can buy insurance where if he buys $x worth of insurance, he must pay the insurance company $3x/15 whether there is a flood or not, but he gets back $x from the company if there is a flood.Willy should buy
A) no insurance since the cost per dollar of insurance exceeds the probability of a flood.
B) enough insurance so that if there is a flood, after he collects his insurance, his wealth will be 1/9 of what it would be if there is no flood.
C) enough insurance so that if there is a flood, after he collects his insurance, his wealth will be the same whether there is a flood or not.
D) enough insurance so that if there is a flood, after he collects his insurance, his wealth will be 1/4 of what it would be if there is no flood.
E) enough insurance so that if there is a flood, after he collects his insurance, his wealth will be 1/7 of what it would be if there is no flood.
Correct Answer:
Verified
Correct Answer:
Verified
Q5: Willy's only source of wealth is his
Q6: Billy has a von Neumann-Morgenstern utility function
Q7: Billy has a von Neumann-Morgenstern utility function
Q8: Sally Kink is an expected utility maximizer
Q9: Sally Kink is an expected utility maximizer
Q11: Billy has a von Neumann-Morgenstern utility function
Q12: Clancy has $4,800.He plans to bet on
Q13: Clancy has $1,800.He plans to bet on
Q14: Wilfred's expected utility function is pc<sup>1/2</sup><sub>1</sub> +
Q15: Lawrence's expected utility function is pc<sup>1/2</sup><sub>1</sub> +