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Half-balls


TimeSpaceLightForce
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Assuming that all heavy halves are identical (and therefore all light halves are identical too), so we can pair any heavy half with any light half to create a sphere.

Using the balance scale it can be done with 5 tries. You need to distinguish from 8C4=70 possible distributions (HHHHLLLL, HLHLHLHL, etc.), but we don't always have to identify every H and L. As soon as we found a HL pair we can make a sphere, so it may be possible to do it in 4 tries, but I seriously doubt it can be done in 3.

Using the digital scale, it can be done in 3 tries. Here is how...

Take any 6 halves and weigh them on the digital scale. Based on the result you can distinguish from 3 possible heavy to light (H:L) ratios - 4:2, 3:3,  and 2:4. Note that 4:2 and 2:4 cases are symmetrical, so I will only cover 4:2 case as the other can be resolved the same way.


4:2 case 

The remaining 2 halves that we didn't weigh are light, so put them aside. Take any 4 of the initial 6 and weigh them on the digital scale. Possible results are 4:0, 3:1, and 2:2. 

-- 4:0 case is trivial as we've identified all heavy and all light halves and can put them together.
-- In 3:1 case we know that the 2 halves we didn't weigh the second time make up a sphere, so put them together. Weigh any 2 from 3:1 group to complete the remaining 3 spheres.
-- In 2:2 case we've already identified 2 heavy and 2 light halves, so we can put together 2 spheres. Weigh any 2 of the remaining 4 to complete the remaining 2 spheres.


3:3 case

The remaining 2 halves that we didn't weigh make up a sphere, so put them together. Take any 4 of the 6 and weigh them on the digital scale. Possible results are 3:1, 2:2 and 1:3. Again, 3:1 and 1:3 are symmetrical, so we don't need to review both of them.

-- In 3:1 case we've identified 2 light halves, so one more weighing of 2 will identify the third. 
-- In 2:2 case we can construct another sphere, so it's the same as the 2:2 case above.

Solved in 3 weighings.

Edited by k-man
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well Harey, if you have a balance scale, with the first try - if the scale is balance that means, we can make one sphere with those 2 halves.

If the scale is not balanced, keep them aside and take another pair. If the scale is still unbalanced, that means you got 2 halves which are heavier and 2 which are lighter. Likewise if you continue, u can get all the pairs.

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