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As you can see I'm still pretty new with all these run time analyses and want to make sure each step I'm calculating is right.. Also I hate writing in pseudocode form so I did this in Python instead.. here goes

def mean(n):
    sum = 0               #cost = 1
    for i in n:           #cost = n
        sum += i          #cost = n
    return sum/len(n)     #cost = 1

Therefore overall running time for mean (correct me if im wrong) = O(1) + O(n) + O(n) + O(1) = O(n)

def variance(n):
    var = 0                    #cost = 1
    for i in n:                #cost = n
        var += (i-mean(n))**2  #cost = n*n or n+n ??
    return var / len(n)        #cost = 1

Question is what is the overall running time for variance? Can you show all workings please?

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1 Answer 1

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O(N^2), since you're performing an O(N) operation N times.

In general, loops are multiplicative when determining runtime; had your variance loop been "for i in lg(n)" then your runtime would be O(N * lg(N)) since you'd be performing an O(N) operation lg(N) times; likewise had your inner operation been O(2^N) with an outer loop of "for i in n" then your runtime would be O(N * 2^N)

Another common loop format is

for(int i = 0; i < N; i++) {
    for(int j = i; j < N; j++) {
        // O(1) operation
    }
}

This is still O(N^2), but the analysis is a bit trickier: you need to take the sum of the arithmetic series "1 + 2 + 3 + ... + n-1 + n" which is n * (n - 1) / 2, or O(N^2)

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  • hmm even if the mean value is always the same it would do that? O(n) times n times
    – compski
    Jun 29, 2013 at 14:28
  • @user1186038 If you're recomputing the mean each time then it would be O(N^2), because the loop's inner operation would be O(N); if you're only computing the mean once, storing it in a local variable, and retrieving the local variable inside the loop, then the loop's inner operation would be O(1) and therefore the entire loop would be O(N) Jun 29, 2013 at 14:30
  • I get it =) so regardless what the code is it will still be O(n^2) ? i.e. it can't get anymore efficient than O(n^2)?
    – compski
    Jun 29, 2013 at 14:35
  • @user1186038 No, you can improve your code's runtime to O(N) by caching the (i-mean(n))**2 statement. In fact, you can improve your code's runtime to O(1) by replacing the entire loop with var = n * (i-mean(n))**2. However, I don't know enough statistics to know if your variance implementation is correct; but, given the implementation in your question, you can improve it to O(1). Jun 29, 2013 at 14:40

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