Amy, Mark, and Hannah are playing a game with the given spinner. If the spinner lands on red, Amy wins $1. If the spinner lands on blue, Mark wins $2. If the spinner lands on green, Hannah wins $3. Is this a fair game? If not, who has the advantage?
To determine if this is a fair game, we need to compare the probabilities of each outcome occurring with the associated winnings. However, without the information about the actual probabilities of the spinner landing on each color, we cannot determine if this is a fair game or not.
