# Binary Search in Array

How would I implement a binary search using just an array?

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Why did I ever ask this question? It makes no sense... what would you use besides an array? –  Claudiu May 25 '13 at 4:21
Check this link –  ARJUN Sep 17 '14 at 5:55
makes perfect sense to me. besides an array you could use a binary tree. –  symbiont Nov 24 '14 at 7:20

Ensure that your array is sorted since this is the crux of a binary search.

Any indexed/random-access data structure can be binary searched. So when you say using "just an array", I would say arrays are the most basic/common data structure that a binary search is employed on.

You can do it recursively (easiest) or iteratively. Time complexity of a binary search is O(log N) which is considerably faster than a linear search of checking each element at O(N). Here are some examples from Wikipedia: Binary Search Algorithm:

Recursive:

``````BinarySearch(A[0..N-1], value, low, high) {
if (high < low)
mid = low + ((high - low) / 2)
if (A[mid] > value)
return BinarySearch(A, value, low, mid-1)
else if (A[mid] < value)
return BinarySearch(A, value, mid+1, high)
else
return mid // found
}
``````

Iterative:

``````  BinarySearch(A[0..N-1], value) {
low = 0
high = N - 1
while (low <= high) {
mid = low + ((high - low) / 2)
if (A[mid] > value)
high = mid - 1
else if (A[mid] < value)
low = mid + 1
else
return mid // found
}
}
``````
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Remember to watch for overflow when calculating mid. (see googleresearch.blogspot.com/2006/06/… ) –  Firas Assaad Oct 30 '08 at 6:55
@Firas Assad, Thanks, updated code to show the fix associated with preventing the overflow –  Simucal Oct 30 '08 at 14:49
`mid = low + ((high - low) / 2)` is the same as `mid = (low + high) / 2`. Not sure with integer division in play, but the algorithm works nevertheless with both formulas. –  Niklas R Feb 3 at 16:26

Assuming you're looking for a language-independant answer, Wikipedia has all the info...

http://en.wikipedia.org/wiki/Binary_search

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The single comparison version is fast and concise

``````int bsearch_double(const double a[], int n, double v) {
int low = 0, mid;
while (n - low > 1) {
mid = low + (n - low) / 2;
if (v < a[mid]) n   = mid;
else            low = mid;
}
return (a[low] == v) ? low : -1;
}
``````
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doesn't work on an empty array –  user102008 Apr 6 '11 at 10:58
It's one `if` statement if that is a requirement. –  Jed Apr 8 '11 at 6:32