Misplaced Pages

Three cups problem

Article snapshot taken from Wikipedia with creative commons attribution-sharealike license. Give it a read and then ask your questions in the chat. We can research this topic together.
This article needs additional citations for verification. Please help improve this article by adding citations to reliable sources. Unsourced material may be challenged and removed.
Find sources: "Three cups problem" – news · newspapers · books · scholar · JSTOR (May 2024) (Learn how and when to remove this message)
The standard, unsolvable, arrangement of the three cups. Here, cups A and C are upright and B is upside down.
The solvable version of the problem. Here, cups A and C are upside down, and cup B is upright.

The three cups problem, also known as the three cup challenge and other variants, is a mathematical puzzle that, in its most common form, cannot be solved.

In the beginning position of the problem, one cup is upside-down and the other two are right-side up. The objective is to turn all cups right-side up in no more than six moves, turning over exactly two cups at each move.

The solvable (but trivial) version of this puzzle begins with one cup right-side up and two cups upside-down. To solve the puzzle in a single move, turn up the two cups that are upside down — after which all three cups are facing up. As a magic trick, a magician can perform the solvable version in a convoluted way, and then ask an audience member to solve the unsolvable version.

Proof of impossibility

To see that the problem is insolvable (when starting with just one cup upside down), it suffices to concentrate on the number of cups the wrong way up. Denoting this number by W {\displaystyle W} , the goal of the problem is to change W {\displaystyle W} from 1 to 0, i.e. by 1 {\displaystyle -1} . The problem is insolvable because any move changes W {\displaystyle W} by an even number. Since a move inverts two cups and each inversion changes W {\displaystyle W} by + 1 {\displaystyle +1} (if the cup was the right way up) or 1 {\displaystyle -1} (otherwise), a move changes W {\displaystyle W} by the sum of two odd numbers, which is even, completing the proof.

Another way of looking is that, at the start, 2 cups are in the "right" orientation and 1 is "wrong". Changing 1 right cup and 1 wrong cup, the situation remains the same. Changing 2 right cups results in a situation with 3 wrong cups, after which the next move restores the original status of 1 wrong cup. Thus, any number of moves results in a situation either with 3 wrongs or with 1 wrong, and never with 0 wrongs.

More generally, this argument shows that for any number of cups, it is impossible to reduce W {\displaystyle W} to 0 if it is initially odd. On the other hand, if W {\displaystyle W} is even, inverting cups two at a time will eventually result in W {\displaystyle W} equaling 0.

References

  1. Lane, Mike (2012). Close-Up Magic. The Rosen Publishing Group, Inc. ISBN 9781615335152.

See also

Categories: