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Multiple Choice Vote

A multiple choice vote will be used for single-winner issues, such as choosing a new board member for the bank or deciding in which town the next new branch will be located. The ethical motivation for the common good bank™ method is that at each step it honors the preferences of as many voters as possible.

Voters grade each option according to how well they like it: A B C D E. Or they may VETO any option that they feel is wasteful, immoral, unethical, or otherwise reprehensible. If a voter gives a higher grade to one option than to another, then it is understood that the voter prefers that option. If the voter grades two options the same, then it is understood that the voter has no preference between those two options. The vetos on multiple choice votes are advisory and may ultimately result in reconsideration of the issue (see Decision Steps).

To count the votes, only the preferences are counted. This is the Condorcet voting method. When all the votes have been cast, each (direct) voter's preferences are multiplied by the number of people the voter represents, before counting the votes. The actual letter grade a voter gave to an option is ignored. If more people prefer option X to option Y than prefer Y to X, then X beats Y. When all the pairs are examined, the winning option will usually be clear.

Unless of course there is a circle of preferences. If every option is beaten by at least one other option -- for example, if voters prefer X to Y, Y to Z, and Z to X -- an additional step is required.

A circle of preferences does not necessarily mean that the voters are crazy. For example, if there are three voters and three options -- X, Y, and Z -- then there will be a circle if the voters order their preferences, quite reasonably, as follows:

• voter #1: X Y Z
• voter #2: Y Z X
• voter #3: Z X Y

Circles can usually be resolved by the Tideman method, favoring larger majorities over smaller ones, in the pairwise comparisons. For example, if X is overwhelmingly favored over Y, more so than Y over Z or Z over X, then X wins. For an illustrated example of the Tideman/Condorcet ("Ranked Pairs") method in action, see this site.

In the unlikely event that two or more pairwise victories tie for the win, then the number of vetoes and finally the actual letter grades given to each option will be used to break the tie.