# algorithmic complexity [duplicate]

``````for(int i = 0; i < n; i++)        //1
for(int j = n; j > 0; j= j/2)  //2
sum++;                      //3
``````

line 1 O(N)

Is it O(N log N)?

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Smells like homework. –  Pontus Gagge Feb 2 '11 at 16:19
Yes. Anything else? –  Beta Feb 2 '11 at 16:19
Easy way to test this would be to actually run it with a few values for n and figure out the relationship between n and sum. –  MerickOWA Feb 2 '11 at 16:24
do you know what a logarithm is? what is repeated multiplication or division equivalent to? –  jk. Feb 2 '11 at 16:32
@Maria: is your second name Annita? Quite similar question to this, this and this one... –  peoro Feb 2 '11 at 16:38
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## marked as duplicate by Linus Kleen, peoro, Suma, sbi, Toon KrijtheFeb 3 '11 at 13:38

This question has been asked before and already has an answer. If those answers do not fully address your question, please ask a new question.

## 4 Answers

A hint: `log n = x` is equivalent to `2^x = n` (assuming we talk about logarithm with base 2, which we do often in computer science). This means, to reach the number 1, you have to divide `n` (roughly) as often by 2 as `x`. If you reach 1 and divide it again by 2, it will become 0 due to integer arithmetic.

Thus, your inner loop needs (roughly) `x = log n` (more precisely `x+1`) steps until the value of `j` gets 0. Thus, you have runtime `O(log n)` for the inner loop.

Now, we summarize: The outer loop determines `j` such that we have a total runtime of:

`````` n-1
---
\
/   O(log n) = n * O(log n) = O(n log n)
---
i=0
``````

Just for your interest:

``````for (i=n; i>0; i--){ }             // O(n)
for (i=n; i>0; i/=2){ }            // O(log n)
for (i=n; i>1; i=int(sqrt(i))){ }  // O(log log n)
for (i=n; i>1; i=int(log(i))){ }   // O(log log log n)
``````
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`O(N log N)` because you do `N` times (extern loop) `logN` operations (intern loop).

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You have to explicitly note that the inner and outer loops are independent -- if the loops were linked, then you couldnt just simply multiply –  Foo Bah Feb 2 '11 at 17:36
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Yes.

Think about it this way: every time you double the size of `n`, you will have one more iteration of the inner loop. This is the typical way we think about logarithmic growth: the logarithm goes up a constant amount for every doubling (or multiplication by a fixed number).

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You have to do the complexity analysis from the inner-loop outwards:

line 3 is constant time

line 2 runs O(lg(n)) iterations [lg = log in base 2]

line 1 runs n iterations of line 2, and the iteration variable is different from the loop in line 2

Since both loops are independent, we can multiply to find the total number of iterations --> total running time is O(n lg n)

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