[amp_mcq option1=”TRUE” option2=”nan” option3=”nan” option4=”nan” correct=”option1″]
The correct answer is False.
A zero-sum game is a game in which the total amount of gain or loss is constant, resulting in a net loss for the players involved. In other words, one player’s gain is another player’s loss.
A game in which there are two agents whose actions must alternate is not necessarily a zero-sum game. For example, consider the game of chess. In chess, each player has a set of pieces that they can move on a board. The goal of the game is to checkmate the opponent’s king, which means to put the king in a position where it can be captured. Chess is not a zero-sum game because it is possible for both players to win or both players to lose.
The utility values at the end of a game are not always the same. In some games, one player may have a higher utility value than the other player. For example, in the game of poker, the player with the best hand at the end of the game will have a higher utility value than the other players.
In conclusion, the statement “Zero sum games are the one in which there are two agents whose actions must alternate and in which the utility values at the end of the game are always the same” is false.