# How do you determine the Big-O notation of a while loop?

Below is a binary search function.

``````int search(int a[], int v, int left, int right)
{
while (right >= left)
{
int m = (left + right)/2;
if (v == a[m])
return m;
if (v < a[m])
right = m - 1;
else left = m + 1;
}
return -1;
}
``````

How do I determine the Big-O notation for this function?

Is this search function O(n) since the while loop is dependent on the value of left?

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In each step, the range of values halves (roughly) - if you start with `right - left == 100`, then at the second step it will be 49, then 24, then 11 etc.

Assuming `n = right - left`, the complexity is O(log n). (It's dependent on the values of both right and left.)

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If this wasn't you would it have been accepted so quickly? –  ChaosPandion Jan 26 '10 at 7:11
Given the question starts 'This is a binary search...', unless the code is badly messed up, the answer is a no brainer. Rightly accepted, IMO. –  Shane MacLaughlin Jan 26 '10 at 7:17
@Shane - Well clearly this person is learning about the notation. How does he know it is correct? –  ChaosPandion Jan 26 '10 at 7:18
He justifies the answer with logic. That being said, homework questions leave one with a bad taste. –  Xorlev Jan 26 '10 at 7:28

Here I show how we can solve it mathematically.

Since in each loop we halve the range, in the worst case we'll need `steps` iterations at most.
How do we calculate the `steps` number?

"Halving the range" can be expressed as: range / 2steps

We can continue halving until `range` becomes 1.
So the equation is: range / 2steps = 1

Solution:
lg(range / 2steps) = lg(1)
lg(range) - steps*lg(2) = 0

steps = lg(range), where lg is the logarithm with base 2.

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