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In an 8x8 maze, there are two players: A and B. Player A starts in the top-left corner of the maze and needs to reach the bottom-right corner. Player B starts in the bottom-right corner and needs to reach the top-left corner. The players can only move through the maze by stepping on the squares, and they can only move forward, left, or upward. Downward or diagonal movements are not allowed.

Each player can move either 1 or 2 squares at a time. At each turn, a player can choose to move either 1 or 2 squares. Players cannot occupy the same square at the same time.

1. Is there a strategy that allows both players to successfully reach their respective goals?
2. If yes, how should players A and B play in order to achieve this strategy?
3. What is the minimum number of moves required for players A and B to reach their goals?


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