What is the (worst-case) time analysis for the following loop?

Here is some code for an integer variable n:

``````while (n > 0)
{
n = n/10; // Use integer division
}
``````

I am trying to find the worst-case time analysis for this loop. O(n) is new to me and I am having difficulty with it. Wouldn't this just be O(n)?

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`O(log<10>n`) ------ –  Grijesh Chauhan Apr 26 '14 at 7:37
If the loop works as expected it would be on `O(log_10 n)` on average and in worst case, which is not as bad `O(n)`. Having said that - not sure whether there is some pathological edge case where something goes wrong ... –  Paul Delhanty Apr 26 '14 at 7:42
In what case could this scale as O(n)? –  azurefrog Apr 26 '14 at 7:47

Actually that algorithm would be O(log(n)). You are dividing by 10 (knocking off a 0 each time through the loop).

Generally an algorithm is O(n) if it scales linearly with the size of n, but for this, if you increase the size of n by a factor of 10, you only have one more iteration, instead of 10x as many iterations through the loop.

As requested here are a couple of sites with a brief primer. A quick google search will turn up many more:

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is that log base 2 or log base 10? in math, plain log usually means the latter, but in cs, the former. –  Tutti Frutti Jacuzzi Apr 26 '14 at 7:39
@ValekHalfHeart 10 –  Grijesh Chauhan Apr 26 '14 at 7:39
Generally in big O notation you don't care about the base. –  azurefrog Apr 26 '14 at 7:40
Do you know of anywhere i can read further into "Big O of n" to further my knowledge. I understand the idea behind it, but actually determining what the time case analysis is throws me off. I feel like I may be over thinking it. I am new to java, but I have completed Java 1, Java 2, and this past week finished algorithms. –  Ken Apr 26 '14 at 7:43
Since `log_2(x)=log_10(x)*3.3219` it doesn't matter in Big-o notation if its log2 or log10. –  Mathias Apr 26 '14 at 7:44