Number of pair-wise comparisons = n(n - 1)/2 = 5(5 - 1)/2 = 10 | |||||
The comparison pairs are {AB, AC, AD, AE, BC, BD, BE, CD, CE, DE} | |||||
A vs B: | A = 24 + 23 + 15 + 12 = 74 | Winner = A | |||
B = 17 + 9 = 26 | |||||
A vs C: | A = 15 | Winner = C | |||
C = 24 + 23 + 17 + 12 + 9 = 85 | |||||
A vs D: | A = 24 + 15 + 12 = 51 | Winner = A | |||
D = 23 + 17 + 9 = 49 | |||||
A vs E: | A = 15 | Winner = E | |||
E = 24 + 23 + 17 + 12 + 9 = 85 | |||||
B vs C: | B = 0 | Winner = C | |||
C = 24 + 23 + 17 + 15 + 12 + 9 = 100 | |||||
B vs D: | B = 24 + 12 = 36 | Winner = D | |||
D = 23 + 17 + 15 + 9 = 64 | |||||
B vs E: | B = 17 | Winner = E | |||
E = 24 + 23 + 15 + 12 + 9 = 83 | |||||
C vs D: | C = 24 + 15 + 12 = 51 | Winner = C | |||
D = 23 + 17 + 9 = 49 | |||||
C vs E: | C = 23 + 17 + 12 = 52 | Winner = C | |||
E = 24 + 15 + 9 = 48 | |||||
D vs E: | D = 23 + 17 + 9 = 49 | Winner = D | |||
E = 24 + 15 + 12 = 51 |
Points Table: A = 2, B = 0, C = 4, D = 2, E = 2 | |||
Winner of the election = C |
The given table shows the schedule for an election with five candidates (A, B, C, D,...
Three candidates, A, B, and C, are running for mayor. Election rules stipulate that the pairwise comparison method will determine the winner. Number of Votes 50 comma 00050,000 30 comma 00030,000 100 comma 000100,000 70 comma 00070,000 40 comma 00040,000 First Choice A C B A C Second Choice B A C C B Third Choice C B A B A In the event that the pariwise comparison method leads to a tie, the Borda count method will decide the...
Question 1 Here is the preference schedule for a recent election among four candidates: 7 10 K X S - ד Number of voters 3 22 4 10 1 1st choice K K F 2nd choice K X F JJ 3rd choice XXX 4th choice X х F F к g - חד XL K K - er How many voters voted in this election? How many first place votes are needed for a majority? Which candidate/choice had the most...
I got confused on everything here please help Below is a preference schedule of a recent election Number of voters 1st choice 2nd choice 3rd choice Answer the 12 O a) What is the total number of votes? O b) Which candidate would win under the plurality method? Oc) What percent of the voters number selected candidate C as their 1t choice? Round to the nearest whole O d) In the one-on-one match up of candidate A versus candidate 8,...
Using C language, write a program for the following: In a student representative council election, there are ten (10) candidates. A voter is required to vote a candidate of his/her choice only once. The vote is recorded as a number from 1 to 10. The number of voters are unknown beforehand, so the votes are terminated by a value of zero (0). Votes not within and not inclusive of the numbers 1 to 10 are invalid (spoilt) votes. A file,...
A preference schedule for ranking five varieties of chocolate candy is shown in the following table. A preference schedule for ranking five varieties of chocolate candy is shown in the following table. Rankings Caramel Center 5 4 4 4 2 4 Solid Chocolate 1 5 5 5 5 5 Almond Center 2 3 2 1 3 3 Vanilla Center 4 1 1 3 4 2 Toffee Center 3 2 32 1 1 Number of Voters: 16 14 9 8 6...
dont need help on the first two pictures, only need help underatanding these: number 1,2,3,4,5,6. please help:/ O Yes. The Condorcet winner is never the majority winner Yes. The Condorcet winner is not required to receive over 50% of the possible vote. O No. The Condorcet winner is automatically the majority winner. No. The Condorcet winner always receives over 50% of the possible vote. 7. Using this preference schedule, which candidate is the Condorcet winner? (1 point) number of votes...
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The parameter table given below shows the transportation problem formulation of Option 1 for the Better Products Co. problem presented in Sec. 9.3 of the textbook. As stated in the textbook, the optimal solution for this transportation problem has the following basic variables (allocations): x12 = 30, x13 = 30, x15 = 15, x24 = 15, x25 = 60, x31 = 20, x34 = 25 Verify that this optimal solution actually is optimal by applying just the optimality test portion...
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