Nine weights: Difference between revisions
Oscarlevin (talk | contribs) No edit summary |
Oscarlevin (talk | contribs) No edit summary |
||
Line 1: | Line 1: | ||
A classic logic puzzle. | A classic logic puzzle. | ||
[[File:Eo-scale of justice.gif|right|150px]] | |||
==Puzzle== | ==Puzzle== | ||
On the table sit nine identical looking nuggets of gold. However, you know that one of the nine is a clever forgery. The only difference between the fake and the real nuggets is in weight: the fake gold weighs slightly less than the true gold. Unfortunately, this weight difference is not great enough to be noticed in human hands. Fortunately, you have a standard balance scale. Unfortunately, you may only use the balance scale twice. Fortunately, there is a way to find the fake gold even with these restrictions. How? | On the table sit nine identical looking nuggets of gold. However, you know that one of the nine is a clever forgery. The only difference between the fake and the real nuggets is in weight: the fake gold weighs slightly less than the true gold. Unfortunately, this weight difference is not great enough to be noticed in human hands. Fortunately, you have a standard balance scale. Unfortunately, you may only use the balance scale twice. Fortunately, there is a way to find the fake gold even with these restrictions. How? |
Current revision as of 08:45, 7 July 2013
A classic logic puzzle.
Puzzle
On the table sit nine identical looking nuggets of gold. However, you know that one of the nine is a clever forgery. The only difference between the fake and the real nuggets is in weight: the fake gold weighs slightly less than the true gold. Unfortunately, this weight difference is not great enough to be noticed in human hands. Fortunately, you have a standard balance scale. Unfortunately, you may only use the balance scale twice. Fortunately, there is a way to find the fake gold even with these restrictions. How?
See also
Twelve weights - you can use the scale three times to find a weight that is either lighter or heavier. Quite a challenge.
Six weights - you can use the scale twice to locate the heavy weight in each of three colors.