A puzzle
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From: Yorba Linda, CA
A puzzle
The gentleman in the next office has been writhing over this one, and he's a mathematician. Can anyone help?
You have 12 blocks which look identical; 11 of them weigh the same amount, the twelfth is either heavier or lighter. You also have a balance.
The question is: what is the fewest number of weighings required to determine which is the odd block and whether it's too heavy or too light?
You can balance any group of blocks against any other group (1 vs 1, 2 vs 2, . . ., 6 vs 6) and mix them any way you like.
He's been told that you can do it in three weighings, but cannot figure out how.
You have 12 blocks which look identical; 11 of them weigh the same amount, the twelfth is either heavier or lighter. You also have a balance.
The question is: what is the fewest number of weighings required to determine which is the odd block and whether it's too heavy or too light?
You can balance any group of blocks against any other group (1 vs 1, 2 vs 2, . . ., 6 vs 6) and mix them any way you like.
He's been told that you can do it in three weighings, but cannot figure out how.
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From: Mountain View
this is a classic binary search problem.
weigh them 6 and 6. the heavier side has the heavier block, discard the rest.
weigh them 3 and 3. the heavier side has the heavier block, discard the rest.
of the remaining 3, pick two and weigh them against each other. if they are equal, the third block is heavier. if one side is heavier, then that is the heavy block.
weigh them 6 and 6. the heavier side has the heavier block, discard the rest.
weigh them 3 and 3. the heavier side has the heavier block, discard the rest.
of the remaining 3, pick two and weigh them against each other. if they are equal, the third block is heavier. if one side is heavier, then that is the heavy block.
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From: Ft. Campbell
Can I have a bowl of water? Then it would be easy. 
I have been puzzling this particular puzzle for the past 10 minutes.
The closest we can get here at work is to put 4 on each side of the scale. If the scales are even, then you know it is not any of those eight. Put the remaining 4 on and whichever way the scales tip will tell you whether or not the block is heavier or lighter, but then you still don't know which block it is because there are 4 on the scale. Ideas anyone? Am I on the right track?
I have been puzzling this particular puzzle for the past 10 minutes.The closest we can get here at work is to put 4 on each side of the scale. If the scales are even, then you know it is not any of those eight. Put the remaining 4 on and whichever way the scales tip will tell you whether or not the block is heavier or lighter, but then you still don't know which block it is because there are 4 on the scale. Ideas anyone? Am I on the right track?
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Originally posted by skitz
The block might be lighter... No worky worky
The block might be lighter... No worky worky
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From: Yorba Linda, CA
Originally posted by skitz
Do we get weights to measure the weight of the blocks?
Do we get weights to measure the weight of the blocks?
