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| One is the sum of the other two (Posted on 2005-07-31) |
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Show that, given any subset A of more than 1+½n numbers from the set {1,...,n}, for some three of the given numbers, one is the sum of the other two.
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Submitted by McWorter
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Rating: 2.3333 (3 votes)
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Solution:
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Alexander Bogomolny's proof.
Let m be the largest integer in (n+2)/2 and let x be the smallest of the m+1 selected integers. Form the m differences between x and the other selected integers. We claim that one of these m differences is a selected integer other than x, thus showing that some selected integer is the sum of two other selected integers. To see this, the differences are, of course, between 1 and n. There are n-(m+1) unselected integers plus the integer x. That's n-m integers. But m>n-m because 2m>n. Hence one of the differences must be a selected integer other than x.
Second proof.
We may assume that A contains n; for, otherwise the problem reduces to looking at A as a subset of {1,...,m}, where m is the largest number in A, with |A|>(n+2)/2>(m+2)/2.
Split the numbers 1 to n-1 into pairs {i,n-i}, for i=1 to the largest integer less or equal (n-1)/2. If n is odd, that's (n-1)/2 pairs. If n is even, that's (n-2)/2 pairs with the singleton {n/2}. Thus, in either case that's no more sets than the greatest integer less or equal n/2. Since |A|>(n+2)/2, there are more than (n/2)+1 numbers in A among these sets. Hence, by the pigeonhole principle, at least two numbers in A belong to one of these sets. These two numbers sum to n, which we assumed is in A, so we are done. |
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