EBK PRINCIPLES OF MICROECONOMICS (SECON
2nd Edition
ISBN: 9780393616149
Author: Mateer
Publisher: W.W.NORTON+CO. (CC)
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Question
Chapter 17, Problem 2SP
To determine
Winning the roulette and the risk nature of the individual.
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What type of risk behavior does the person exhibit who is willing to bet $60 on a game where 20% of the time the bet returns $100, and 80% of the time returns $50? Is this a fair bet? Explain.
In 'the dictator' game, one player (the dictator) chooses how to divide a pot of $10 between herself and another player (the recipient). The recipient does not have an opportunity to reject the proposed distribution. As such, if the dictator only cares about how much money she makes, she should keep all $10 for herself and give the recipient nothing. However, when economists conduct experiments with the dictator game, they find that dictators often offer strictly positive amounts to the recipients.
Are dictators behaving irrationally in these experiments? Whether you think they are or not, your response should try to provide an explanation for the behavior.
9. You have a chance to play a coin flip game where if the coin comes up
heads you get $5,000; but lose $1,000 if it comes up tails. If you are
risk averse (A>0), how much would you need to be paid to walk away and i
not play the game? Explain.
Chapter 17 Solutions
EBK PRINCIPLES OF MICROECONOMICS (SECON
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- Suppose you have $35,000 in wealth. You have the opportunity to play a game called "Big Bet/Small Bet." In this game, you first choose whether you would like to make a big bet of $15,000 of a small bet of $5,000. You then roll a fair die. If you roll a 4, 5, or 6, you win the game and earn $15,000 for the big bet or $5,000 for the small bet. If you roll a 1, 2, or 3, you lose and lose $15,000 for the big bet and $5,000 for the small bet the game Utility U₂ U₁ BEL 0 11 LATE EE ARTE Are the Small Bet and Big Bet considered fair bets? O Big Bet is fair, but Small Bet is not. No, both are not fair. Yes, both are fair. 20 OSmall Bet is fair, but Big Bet is not. G HA 1 35 D E 1 1 1 1 1 F 1 U 50 Income (thousands of dollars)arrow_forwardYou and I play the following game. Hidden from you, I put a coin in my hand: with probability p it is a 10 pence coin and otherwise it is a 20 pence coin. You now guess which coin is in my hand: you guess it is 20 pence with probability s and otherwise you guess it is a 10 pence coin. You get to win the coin if you guess correctly and otherwise win nothing. What (in terms of p and s) is your expected gain in pence from playing this game once with me? Challenge: suppose we are going to play repeatedly and you want to maximise your gain and I wish to minimise my loss. What value of p should I choose and what value of s should you choose? (This question is somewhat ill-defined, but it does have an interesting possible answer.) (Note: anything labelled "challenge" will not be part of the hand-in.)arrow_forwardFor the following questions consider this setting. The deciding shot in a soccer game comes down to a penalty shot. If the goal-keeper jumps in one corner and the striker shots the ball in the other, then it is a goal. If the goalie jumps left and the striker shoots left, then it is a goal with probability 1/3. If the goalie jumps right and the striker shots right, it is goal with probability 2/3. Say the goalie's strategy is to jump left with probability 1 and the striker shoots left with probability 0.5, then the probability of a goal is (round to two digits) If the striker shoots in either corner with probability 0.5 and the goalie likewise shoots in either corner with probability 0.5, then the probability of a goal is (round to 2 digits)arrow_forward
- Jamal has a utility function U = W1/2, where W is his wealth in millions of dollars and U is the utility he obtains from that wealth. In the final stage of a game show, the host offers Jamal a choice between (A) $4 million for sure, or (B) a gamble that pays $1 million with probability 0.6 and $9 million with probability 0.4. (1) Does A or B offer Jamal a higher expected utility? Explain your reasoning with calculations. (2) Should Jamal pick A or B? Why? I would like help with the unanswered last parts of the questions.arrow_forwardConsider a game where there is a $2,520 prize if a player correctly guesses the outcome of a fair 7-sided die roll.Cindy will only play this game if there is a nonnegative expected value, even with the risk of losing the payment amount.What is the most Cindy would be willing to pay?arrow_forwardhow do you do you find the expected payback for this problem? Find the expected payback for a game in which you bet $1010 on any number from 00 to 399.399. If your number comes up, you get $400400.arrow_forward
- Consider the following game: you and a partner on a school project are asked to evaluate the other, privately rating them either "1 (Good)" or "0 (Bad)". After all the ratings have been done, a bonus pot of $1000 is given to the person with the highest number of points. If there is a tie, the pool is split evenly. Both players only get utility from money. Mark all of the following true statements: A. The best response to your partner rating you as Good is to rate them as Good as well. Your answer B. There is no best response in this game. C. Your partner's best response to you rating them as Bad is to also rate you as C Bad. D. Your best response to any strategy of your partner is to play "Good".arrow_forwardAnna is risk averse and has a utility function of the form u(w) pocket she has €9 and a lottery ticket worth €40 with a probability of 50% and nothing otherwise. She can sell this lottery ticket to Ben who is risk neutral and has €30 in his pocket. Find the range of prices that would make such a transaction possiblearrow_forwardYou are attempting to establish the utility that your boss assigns to a payoff of $1,100. You have established that the utility for a payoff of $0 is zero and the utility for a payoff of $10,000 is one. Your boss has just told you that they would be indifferent between a payoff of $1,100 and a lottery which has a payoff of $10,000 where the probability of losing is 0.4. What is your boss' utility for $1,100? (Round your answer to 1 decimal place.) Utility of $1,100arrow_forward
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