he weighted voting systems for the voters A, B, C, ... are given in the form {g: w1, W2, W3, W4. .., Wn. The weight of voter A is w1, the weight of voter B is w2, the weight of voter C is 3, and so on. onsider the weighted voting system {56: 3, 53, 55}. (a) Compute the Banzhaf power index for each voter in this system. (Round your answers to the nearest hundredth.) BPI(A) = BPI(B) = BPI(C) = (b) Voter B has a weight of 53 compared to only 3 for voter A, yet the results of part (a) show that voter A and voter B both have the same Banzhaf power index. Explain why it seems reasonable, in this voting system, to assign voters A and B the same Banzhaf power index. O Despite the varied weights, in this system, all voters are dummy voters. No voter is critical to a successful outcome. O Despite the varied weights, in this system, all of the voters are needed for a quota. O Despite the varied weights, this is a majority system. Any two of the three voters are needed for a quota. O Despite the varied weights, this is a dictator system. Voter C controls the outcome, while voters A and B are dummy voters. O Despite the varied weights, this is a minority system. Any one of the three voters can stop a quota.

The weighted voting systems for the voters A, B, C, ... are given in the form 

{q: w₁, w₂, w₃, w₄, ..., w_n}.

 The weight of voter A is w₁, the weight of voter B is w₂, the weight of voter C is w₃, and so on.

Consider the weighted voting system {56: 3, 53, 55}.

(A) Compute the Banzhaf power index for each voter in this system. (Round your answers to the nearest hundredth.)

BPI(A)	=
BPI(B)	=
BPI(C)	=

(B) Voter B has a weight of 53 compared to only 3 for voter A, yet the results of part (a) show that voter A and voter B both have the same Banzhaf power index. Explain why it seems reasonable, in this voting system, to assign voters A and B the same Banzhaf power index.

 

Pick the correct answer:

A) Despite the varied weights, in this system, all voters are dummy voters. No voter is critical to a successful outcome.

B) Despite the varied weights, in this system, all of the voters are needed for a quota.

C) Despite the varied weights, this is a majority system. Any two of the three voters are needed for a quota.

D) Despite the varied weights, this is a dictator system. Voter C controls the outcome, while voters A and B are dummy voters.

E) Despite the varied weights, this is a minority system. Any one of the three voters can stop a quota.

Transcribed Image Text:

The weighted voting systems for the voters A, B, C, ... are given in the form {q: w1, w2, W3, Wa, ..., wn}. The weight of voter A is w1, the weight of voter B is w,, the weight of voter C is W3, and so on. Consider the weighted voting system {56: 3, 53, 55}. (a) Compute the Banzhaf power index for each voter in this system. (Round your answers to the nearest hundredth.) BPI(A) = BPI(B) = BPI(C) = (b) Voter B has a weight of 53 compared to only 3 for voter A, yet the results of part (a) show that voter A and voter B both have the same Banzhaf power index. Explain why it seems reasonable, in this voting system, to assign voters A and B the same Banzhaf power index. O Despite the varied weights, in this system, all voters are dummy voters. No voter is critical to a successful outcome. O Despite the varied weights, in this system, all of the voters are needed for a quota. O Despite the varied weights, this is a majority system. Any two of the three voters are needed for a quota. O Despite the varied weights, this is a dictator system. Voter C controls the outcome, while voters A and B are dummy voters. O Despite the varied weights, this is a minority system. Any one of the three voters can stop a quota.