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For homework, I was given the following 8 code fragments to analyze and give a Big-Oh notation for the running time. Can anybody please tell me if I'm on the right track?

//Fragment 1
for(int i = 0; i < n; i++)
    sum++;

I'm thinking O(N) for fragment 1

//Fragment 2
for(int i = 0; i < n; i+=2)
    sum++;

O(N) for fragment 2 as well

//Fragment 3
for(int i = 0; i < n; i++)
    for( int j = 0; j < n; j++)
        sum++;

O(N^2) for fragment 3

//Fragment 4
for(int i = 0; i < n; i+=2)
    sum++;
for(int j = 0; j < n; j++)
    sum++;

O(N) for fragment 4

//Fragment 5
for(int i = 0; i < n; i++)
    for( int j = 0; j < n * n; j++)
        sum++;

O(N^2) for fragment 5 but the n * n is throwing me off a bit so I'm not quite sure

//Fragment 6
for(int i = 0; i < n; i++)
    for( int j = 0; j < i; j++)
        sum++;

O(N^2) for fragment 6 as well

//Fragment 7
for(int i = 0; i < n; i++)
    for( int j = 0; j < n * n; j++)
        for(int k = 0; k < j; k++)
            sum++;

O(N^3) for fragment 7 but once again the n * n is throwing me off

//Fragment 8
for(int i = 1; i < n; i = i * 2)
    sum++;

O(N) for fragment 8

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closed as too localized by George Stocker Sep 16 '12 at 1:37

This question is unlikely to help any future visitors; it is only relevant to a small geographic area, a specific moment in time, or an extraordinarily narrow situation that is not generally applicable to the worldwide audience of the internet. For help making this question more broadly applicable, visit the help center.If this question can be reworded to fit the rules in the help center, please edit the question.

    
I disagree with the "too localized" comment. Calculating Big-Oh is a central part of algorithm analysis. Specific code examples with estimates of Big-Oh can be extremely valuable to folks who are trying to become fluent in this area. –  JESii Sep 25 '13 at 22:53

5 Answers 5

up vote 18 down vote accepted

I think fragment 5 is O(n^3), and similarly fragment 7 is O(n^5)*. It also looks like O(log(n)) for fragment 8.

For the n * n problems, you have to execute the body of the loop n * n times, so it would be O(n^2), then you compound that with the order of the other code. Fragment 8 actually doubles the counter instead of incrementing it, so the larger the problem, the less additional work you have to do, so it's O(log(n))

*edit: Fragment 7 is O(n^5), not O(n^4) as I previously thought. This is because both j and k go from 1 to n * n. Sorry I didn't catch this earlier.

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oh okay, I see what you're saying! So for 5, the n * n means that the body of the inner loop will be executed order of N^2 times and compounding that with the order of N for the outer loop, overall it will be O(N^3). –  VeePee Oct 19 '08 at 19:13
    
same idea for fragment 7. Man the fragment 8 went completely over my head. Sorry if this is asking too much, but I'm just curious what would the code for O(Nlog(N)) look like in case I ever run into it? –  VeePee Oct 19 '08 at 19:16
1  
For an O(nlog(n)) algorithm, imagine an outer loop that counts from 1 to n and an inner loop that goes from 1 to n by multiplying the counter by 2 each time. However, it's extremely unusual to encounter such algorithms. The most common O(nlog(n)) algorithms are the QuickSort and Merge Sort. –  Kyle Cronin Oct 19 '08 at 19:22
    
okay, so basically if I were to put an outer (1 to n) loop around fragment 8, I would end up with an O(n*log(n)) algorithm because the outer O(n) loop and inner O(log(n)) would compound to form it. Thank you for all of your help! –  VeePee Oct 19 '08 at 19:31
1  
Careful! Fragment 7 is O(n^5) not O(n^4) because the inner loop is also bounded by n^2. –  Dave L. Oct 20 '08 at 18:19

Fragment 7 is O(n^5), not O(n^4) as the currently accepted comment claims. Otherwise, it's correct.

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Thanks for catching that –  Kyle Cronin Oct 20 '08 at 18:23
    
Sure thing. That's the benefit of a collaborative site. –  Dave L. Oct 20 '08 at 20:45

For case 8 try writing out the number of iterations for some values of N and see what the pattern looks like ... it isn't O(N)

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You appear to be on the right track. With regards to the N*N what effect do you think it would have? It is another factor of N so it would likely be a higher order.

Just a warning, I saw another post like this and it was extremely down voted. Be careful. Here is the post.

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I actually upvoted the question, since he (1) obviously has made a serious attempt at solving the problems and (2) was honest about it being a homework. –  JesperE Oct 19 '08 at 19:01
    
Oh I definitely agree, this is a solid attempt at the problem and a valid question. I just want to warn him in case others react poorly. Although in this case he should be fine. –  smaclell Oct 19 '08 at 19:04

You are on the right track, but here is a tip as to how things might get clearer along the way. Suppose you have some code :

for(i = 0; i < n; i++) {
   for(j = 0; j < 100; j++){....}
}

Right, consider the fact that you have code at different levels. In this example, you can only see 3 levels so far :

  1. The outer for-loop that goes from 0-n
  2. Another for-loop that goes from 0-100
  3. Some code inside, that is marked as ...

At no point in time should you try to calculate it all in 1 go. This is where most beginners make some kind of arithmetic error. Calculate it individually for each level and then multiply it all together.

Good luck!

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