Table 1-26 (see Exercise 4 ) shows the preference schedule for an election with five candidates ( A, B, C and D ). In this election ties are not allowed to stand, and the following tie-breaking rule is used: Whenever there is a tie between candidates, the tie is broken in favor of the winner of a head-to-head comparison between the candidates . Use the plurality method to a. find the winner of the election. b. find the complete ranking of the candidates. Table 1-26 Number of voters 202 160 153 145 125 110 108 102 55 1st B C A D D C B A A 2nd D B C B A A C B D 3rd A A B A C D A D C 4th C D D C B B D C B
Table 1-26 (see Exercise 4 ) shows the preference schedule for an election with five candidates ( A, B, C and D ). In this election ties are not allowed to stand, and the following tie-breaking rule is used: Whenever there is a tie between candidates, the tie is broken in favor of the winner of a head-to-head comparison between the candidates . Use the plurality method to a. find the winner of the election. b. find the complete ranking of the candidates. Table 1-26 Number of voters 202 160 153 145 125 110 108 102 55 1st B C A D D C B A A 2nd D B C B A A C B D 3rd A A B A C D A D C 4th C D D C B B D C B
Table 1-26(see Exercise 4) shows the preference schedule for an election with five candidates (A, B, C and D). In this election ties are not allowed to stand, and the following tie-breaking rule is used: Whenever there is a tie between candidates, the tie is broken in favor of the winner of a head-to-head comparison between the candidates. Use the plurality method to
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