|
1. 3 scales
Weigh A against B, B against C, and C against D.
If A›B, then the switched labels were A and B, A and C, or A and D.
If A‹B, then the switched labels were B and C, B and D, or C and D.
If B›C, then the switched labels were A and C, B and C, or B and D.
If B‹C, then the switched labels were A and B, A and D, or C and D.
If C›D, then the switched labels were A and D, B and D, or C and D.
If C‹D, then the switched labels were A and B, A and C, or B and C.
You can use deductive reasoning to find which were switched from these results.
3 is the least number of weighings because there are 6 possible combinations of switched labels. Each scale can go either left or right, so there are 2^3 possible results. You can't expect the nails to balance anytime without knowing their exact weight. Less scales would have less possible results than the possible solutions.
2. 2 scales
Weigh A and D against B and C, and on another scale weigh B against C.
If A+D=B+C, then the switched labels were A and D or B and C.
If A+D‹B+C, then the switched labels were B and D or C and D.
If A+D›B+C, then the switched labels were A and B or A and C.
If B›C, then the switched labels were A and C, B and C, or B and D.
If B‹C, then the switched labels were A and B, A and D, or C and D.
Again, deductive reasoning will give you the answer.
2 is the least number of scales because there are 3^2 possible results with two weighings. Each scale can go left, right, or be balanced. This is enough to determine which of the 6 possible combinations of labels were switched. |
