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What would be the growth rate of the following function in terms of Big O notation??

f (n) = Comb(1000,n) for n = 0,1,2,…


int Comb(int m, int n)
{
    int pracResult = 1;
    int i;

    if (m > n/2) m = n-m;

    for (i=1; i<= m; i++)
    {
        pracResult *= n-m+i;
        pracResult /= i;
        practicalCounter++;
    }

    return pracResult;

}

Recursive:

int combRecursive (int m, int n)
{
    recursiveCounter++;
    if (n == m) return 1;
    if (m == 1) return n;
    return combRecursive(n-1, m) + combRecursive(n-1, m-1);

}

I would guess n^2??? I am probably wrong though... I have always struggled to figure out how efficient things are...

Thank you in advanced.

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I take back my words. If what you have written is correct the your function runs in O(1). –  Ajeet Mar 9 '13 at 5:30
    
need more info on Comb() –  Amitd Mar 9 '13 at 5:33
    
I apologize. I will update the question shortly. –  JLott Mar 9 '13 at 5:34
    
I have updated the code. –  JLott Mar 9 '13 at 5:40
    
@JLott : Are you 100% sure you are using variable m and n in the correct order ? You pass n as second param , but the first param is named n. –  Ajeet Mar 9 '13 at 5:46

2 Answers 2

up vote 0 down vote accepted

It's O(1).

By definition, f(n) = O(g(n)) if there exists a c such that for all n, f(n) <= c*g(n)

Let c = Comb(1000,500)

For all n, Comb(1000, n) < c * 1. Hence Comb(1000, n) = O(1)

share|improve this answer
    
YOu really think this is the answer she was looking for ? :) –  Ajeet Mar 9 '13 at 5:36
    
@Ajeet, I think it is the answer to the question posed. Surprisingly often, people ask questions not actually expecting the correct answer. Sometimes this even leads them to accept incorrect answers. This happens often in politics, too. –  rici Mar 9 '13 at 5:39
    
Haha. I updated the code. –  JLott Mar 9 '13 at 5:40
    
That is impossible I feel... This function basically finds the number of combinations given m and n.. I can tell by how my code runs that it does not find it on the first go around because I put a counter in. However, the way I did it is much more efficient than if you were to do it recursively. –  JLott Mar 9 '13 at 5:46
1  
@JLott: if you want to model the execution time of your program, you probably need to take into account the size of the numbers, since they will get very big. If you did that, and you asked what the execution time of Comb(n, n/2) was, you'd probably get O(n^2), as you originally suggested. –  rici Mar 9 '13 at 5:55

For n = 1 to 2000 there will operations proportional to n

For all n > 2000, total operations are constant.

Hence function complexity is O (1)

And I have to tell you that you gotta read some books. :)
Data-structure and algorithm by Sahni is very light read. Algorithms by Knuth is very heavy, but amongst best.

share|improve this answer
    
Code has been updated –  JLott Mar 9 '13 at 5:41
    
Yeah I am actually very surprised haha. –  JLott Mar 9 '13 at 5:56
    
And thanks, I will look into it :) Algorithms have never really been my thing. I am a trial and error type person when it comes to them hahaha. –  JLott Mar 9 '13 at 5:57

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