A group of seven young men named Arun, Binoy, Chunder, Dev, Edward, Fakruddin and Govind were recently engaged in a game. They had agreed that whenever a player won a game he should double the money of each of the other players, in other words he was to give the players just as much money as they had already in their pockets. In all they played seven games and, strangely, each won a game in turn in the order in which their names are given. But what was even stranger was that when they had finished the game each of the seven young men had exactly the same amount, $32 in his pocket. Can you find out how much money each person had with him before they began the game?