# minimum number of comparisons needed

what is the minimum number of comparisons needed to find the largest element from 4 distinct elements? I know for 5 distinct numbers it is 6, floor(5/2) * 3; this is from clrs book. but I know there is no one general formula for finding this, or is there?

edit clarification

these 4 elements could be in any different order(for all permutations of these 4 elements) im not interested in a counting technique to keep track of the largest element as you traverse the elements, but comparisons like > or <.

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@AShelly: not relevant. –  Karoly Horvath Mar 13 '12 at 21:47

for 4 elements the min. number of comparisons is 3.

In general, to find largest of `N` elements you need `N-1` comparisons. This gives you 4 for 5 numbers, not 6.

Proof:

1. there is always a solution with `N-1` comparisons: just compare first two and then select the larger and compare with next one, select the larger and compare with next one etc....

2. there cannot be shorter solution because this solution would not compare all the elements.

QED.

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can you explain please? –  David Mar 13 '12 at 21:48
Please see my updated answer, @David. –  TMS Mar 13 '12 at 21:58
the second part of the proof is quite sloppy. check my answer, based on that it's easy to proof that part. –  Karoly Horvath Mar 13 '12 at 21:59
Karoly, you have not proved anything in your current answer, you just state the theorem to be proven. What I showed is typical and clear proof in used in informatics. –  TMS Mar 13 '12 at 22:04
actually you need 6 for 5 elements using a decision tree, but my intuition was like you first –  David Mar 13 '12 at 22:39

Think of it as a competition. By comparing two elements you have a looser and a winner.

So if you have `n` elements and need 1 final winner you need `n-1` comparisons to rule out the other ones.

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please see the above comments –  David Mar 13 '12 at 23:04

I know it does not answer the original question, but I enjoyed reading this not-so-intuitive post on the minimum number of comparisons needed to find the smallest AND the largest number from an unsorted array (with proof).

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for elements a,b,c,d

if a>b+c+d, then it only required one comparison to know that a is the biggest.

You do have to get lucky though.

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please see the edit I made above –  David Mar 13 '12 at 23:40