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I must find the running time of the following function.

S=0 
For i=4 to n^2 
    For j=5 to 3*i*log(i) 
       S=S+i-j 
Return S 

So far I believe the running time T(n)=((n^2)-3)*(3*i*log(i)-4) but I can't get the second part in terms of n. I've also figured out that the max it can be or the big O notation is ((n^2)-3)(3(n^2)*log(n^2)) that is if n^2 was the value of i for every iteration through the inner loop, but this is not the case, which basically tells me it can be written O((n^4)*log(n^2)). To figure out the big theta value I've been trying to calculate an average value for 3*i*log(i) to use as the value of i for every iteration but I can't seem to figure that out.

Any suggestions? Or other methods to tackle this?

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assuming i = j = 1, my works out lead to a answer roughly equal to log(BIG_PI(i^i)) where 1<=i<=n^2. I do not know how to continue but I think the answer should be way larger then you expected... –  shole Mar 11 at 6:31

1 Answer 1

Using Sigma notation is an efficient way to formally come up with your algorithm's order of growth:

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