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I was trying to find the time complexity for a for loop. below is loop detail.

for(int i=N;i>1;i=i/2)
{
   for(int k=0;k<i;k++){
     sum++;
   }
}

Below is any find for the problem. Please correct me if i am going worng.

Inner loop will be exceute N+N/2+N/4+N/8....

so tn=ar^(n-1). So replacing Tn=1, a=N and r=1/2

1=N(1/2)^(n-1)

therefore

1/2N=(1/2)^n

So sum of inner loop is a GP. Sn=a(1-r^n)/(1-r) Replacing a=N,r=1/2, we get

Sn=N(1-(1/2N))/(1-1/2)

therefore Sn=2N-1

I am not sure if complexity is N.

Please help

Thanks.

share|improve this question
    
You would like to find out how much time this loop takes? –  user2579857 Mar 14 '14 at 18:55
    
Just count the number of times the code in the inner loop is executed: N + N/2 + N/4 + ... –  trogdor Mar 14 '14 at 18:57
6  
On a piece of paper, make two columns, with headers "N" and "count". When N=1, how many times is sum++ executed? For N=2, 3, 4, etc.? This will give you a start, and if you have questions, you can at least show this attempt. –  Matt Mar 14 '14 at 18:57
1  
Is this homework? It smells like homework. –  Emmet Mar 14 '14 at 19:13
    
Actually I wouldn't really recommend what @Matt said as such (although some attempt is always better than no attempt for Stack Overflow questions) - having a bunch of values and mapping a function to that is not an easy task - rather write down how many times the inner loop executes for each iteration of the outer loop - this will give you something like a + b + c + d + e + ... (some of these will depend on N). Then you need to have a bit of familiarity with finding a formula for a sum, which gives you your answer. –  Dukeling Mar 14 '14 at 19:20

1 Answer 1

Below is the formal way (Sigma Notation) to infer the order of growth related to your algorithm (corroborated with experiments, using C's MinGW2.95 compiler).

enter image description here

share|improve this answer
    
I did not get the upper bound for second summation. How it is 2^i - 1. Could you please explain in detail –  user3264197 Mar 14 '14 at 22:42
    
Well, you know that Sigma from i = k to n = (n - k) + 1? Since the terms of the second summation are independent, therefore, you just replace n with 2^{i - 1} and k with 0. I should end up with 2^{i - 1} - 0 + 1 (I will correct it). –  Mohamed Ennahdi El Idrissi Mar 14 '14 at 22:46
    
Also, check this link. –  Mohamed Ennahdi El Idrissi Mar 14 '14 at 22:50
    
Also, check the last slide of this .ppt for a thorough understand of logarithmic loops. –  Mohamed Ennahdi El Idrissi Mar 14 '14 at 22:57
1  
I see your point. My aim is to allow interlocutors to discover that such a methodology does exist. I was thrilled when I discovered it, and where? in an algorithm analysis (and data structures) book of Mark Allen Weiss. I believe this is the right step toward the accurate learning path. –  Mohamed Ennahdi El Idrissi Mar 15 '14 at 0:57

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