A society is composed of 3 individuals: i, j, k. There exists 4 alternatives: A, B, C, D. Individual preferences are given by A>i B >i C>i D B>j D >j C > ; A A>k B >k C>k D. For each of the methods below, find the resulting social ranking. 1.1 Start with the entire set of alternatives and count how many voters prefer each alternative the most. If one alternative is preferred the most by more individuals than any other alternative, then place this alternative at the top of the social ranking. Now consider only the set of remaining alternatives and repeat the process to find the second best alternative in the social ranking. Continue until all alternatives are ranked. 1.2 First, each individual eliminates the alternative he or she prefers the least. If more than one alternative is eliminated, place last the one eliminated by more individuals. Repeat until you have ranked all alterna- tives. You might have noticed that both systems violate Universal Domain.