The "all or nothing" situation in this mathematical billiards game is similar to the facts about fractions of integers. Either the (decimal) number is recurring or it does not repeat but is continuous. When a simple fraction does stop, it corresponds to the ball getting caught in a corner of the square cornered table.
The "all or nothing" situation in this mathematical billiards game is similar to the facts about fractions of integers. Either the (decimal) number is recurring or it does not repeat but is continuous. When a simple fraction does stop, it corresponds to the ball getting caught in a corner of the square cornered table.