Multiple Choice
Figure 1 illustrates an election in which there are seven voters (A, B, C, D, E, F, G) arrayed along a single left-right issue dimension that runs from 0 (most left) to 10 (most right) . Each voter is assumed to have a single-peaked preference ordering over the issue dimension and to vote for the party that is located closest to her ideal point. The voters are participating in a majority rule election in which there are two parties, P1 and P2, competing for office. These parties can be thought of as "office-seeking" parties since they only care about winning the election and getting into office.
Figure 1: Illustrating the Median Voter Theorem
-Let's suppose that P1 locates at Position 2 on the left-right issue dimension and that P2 locates at Position 7. Who wins the election in the situation illustrated by Figure 1?
A) The two parties tie.
B) P1 wins.
C) P2 wins.
Correct Answer:
Verified
Correct Answer:
Verified
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