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Consider the problem of dividing $100 among three people. Suppose two of them agree to split that sum, with $60 going to one and $40 to the other.

PUBLIC AFFAIRS CASE STUDY 1 HOUR

MAX 250 WORDS PLEASE EXPLAIN YOUR ANSWER use theories     THANK YOU

Case study:

Consider the problem of dividing $100 among three people. Suppose two of them agree to split that sum, with $60 going to one and $40 to the other. The third person, who receives nothing, has an incentive to strike a bargain with the second, offering a split of, say, $50 each, which makes them both better off than under the initial proposal. Faced with desertion, the first person can destabilize the new coalition by offering to accept $45, leaving $55 for one of the others. And so on. The game has three possible (and equally likely) outcomes in which two of the three players accept payments of $50 each, but the third player can always upset the equilibrium by cutting another deal. The same endless series of changing winning coalitions or vote “cycles” can emerge in elections involving three or more candidates or ballot issues when no one of them is strongly preferred by a simple majority of the voters.

Question: It has been recognized at least since the time of the Marquis de Condorcet (1785) that voting among three or more candidates or alternatives may fail to select the majority’s most preferred outcome or may be prone to vote “cycles” producing no clear winner.  Which behavioral science theory is relevant to this case and how might solutions be implemented in this case? 


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Categories
Writers Solution

Consider the problem of dividing $100 among three people. Suppose two of them agree to split that sum, with $60 going to one and $40 to the other.

 PUBLIC AFFAIRS CASE STUDY 1 HOUR

MAX 250 WORDS PLEASE EXPLAIN YOUR ANSWER use theories     THANK YOU

Case study:

Consider the problem of dividing $100 among three people. Suppose two of them agree to split that sum, with $60 going to one and $40 to the other. The third person, who receives nothing, has an incentive to strike a bargain with the second, offering a split of, say, $50 each, which makes them both better off than under the initial proposal. Faced with desertion, the first person can destabilize the new coalition by offering to accept $45, leaving $55 for one of the others. And so on. The game has three possible (and equally likely) outcomes in which two of the three players accept payments of $50 each, but the third player can always upset the equilibrium by cutting another deal. The same endless series of changing winning coalitions or vote “cycles” can emerge in elections involving three or more candidates or ballot issues when no one of them is strongly preferred by a simple majority of the voters.

Question: It has been recognized at least since the time of the Marquis de Condorcet (1785) that voting among three or more candidates or alternatives may fail to select the majority’s most preferred outcome or may be prone to vote “cycles” producing no clear winner.  Which behavioral science theory is relevant to this case and how might solutions be implemented in this case? 

Categories
Writers Solution

Consider the problem of dividing $100 among three people. Suppose two of them agree to split that sum, with $60 going to one and $40 to the other.

 PUBLIC AFFAIRS CASE STUDY 1 HOUR

MAX 250 WORDS PLEASE EXPLAIN YOUR ANSWER use theories     

Case study:

Consider the problem of dividing $100 among three people. Suppose two of them agree to split that sum, with $60 going to one and $40 to the other. The third person, who receives nothing, has an incentive to strike a bargain with the second, offering a split of, say, $50 each, which makes them both better off than under the initial proposal. Faced with desertion, the first person can destabilize the new coalition by offering to accept $45, leaving $55 for one of the others. And so on. The game has three possible (and equally likely) outcomes in which two of the three players accept payments of $50 each, but the third player can always upset the equilibrium by cutting another deal. The same endless series of changing winning coalitions or vote “cycles” can emerge in elections involving three or more candidates or ballot issues when no one of them is strongly preferred by a simple majority of the voters.

Question: It has been recognized at least since the time of the Marquis de Condorcet (1785) that voting among three or more candidates or alternatives may fail to select the majority’s most preferred outcome or may be prone to vote “cycles” producing no clear winner.  Which behavioral science theory is relevant to this case and how might solutions be implemented in this case? 

Assignment statusSolved by our Writing Team at PrimeWritersBay.comCLICK HERE TO ORDER THIS PAPER AT PrimeWritersBay.com