# Calculating mid in binary search

I was reading an algorithms book which had the following algorithm for binary search:

public class BinSearch {
static int search ( int [ ] A, int K ) {
int l = 0 ;
int u = A. length −1;
int m;
while (l <= u ) {
m = (l+u) /2;
if (A[m] < K) {
l = m + 1 ;
} else if (A[m] == K) {
return m;
} else {
u = m−1;
}
}
return −1;
}
}


The author says "The error is in the assignment m = (l+u)/2; it can lead to overflow and should be replaced by m = l + (u-l)/2."

I can't see how that would cause an overflow. When I run the algorithm in my mind for a few different inputs, I don't see the mid's value going out of the array index. So, in which cases would the overflow occur?

Thank you.

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This post covers this famous bug in a lot of detail. As others have said it's an overflow issue. The fix recommended on the link is as follows:

int mid = low + ((high - low) / 2);

// Alternatively
int mid = (low + high) >>> 1;

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The link you provided has a clear explanation of the issue. Thanks! –  Bharat Jul 18 '11 at 16:20
+1 for the interesting link. –  Randy Howard Aug 30 '14 at 14:07

The potential overflow is in the l+u addition itself.

This was actually a bug in early versions of binary search in the JDK.

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The problem is that (l+u) is evaluated first, and could overflow int, so (l+u)/2 would return the wrong value.

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