# Bubble sort performance

If bubble sort takes 200 sec to sort 200 names then how many items it can sort in 800 secs?

Calculating number of comparisons can give us the solution. How can we calculate the number of comparisons it takes to sort 200 names ? Do we have to consider the best case ?

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Is it Homework?? –  Rohit Jain Oct 8 '12 at 9:37
The time bubblesort takes depends not only on the length of the input but also on its structure, so you can't make a calculation like that. –  harold Oct 8 '12 at 9:38
@rohit jain: yes it is .. but i know i need to calculate the number of comparisons only thing is i don't know how to do it in case of bubble sort!? :| –  user975234 Oct 8 '12 at 9:38
@user975234: you need to read the code (or at least a description of the algorithm). Unfortunately you don't have enough information anyway, because all you know is that 200s was somewhere in the range of possibilities for 200 names. You don't know whether it was a best case or a worst case, and the difference between the two is a factor of approximately 100 times as many comparisons. –  Steve Jessop Oct 8 '12 at 9:40

1. Bubble sort is O(n2). Do your maths. Big O just gives an idea of relative time, you can guess rough estimate of time. Not exact.
2. BubbleSort takes n-1 comparisons in first go, n-2 in second, and so on. So you have total `(n-1) + (n-2) + .. +1`. Do some maths again?
3. Bubble Sort is so pathetic that there is no best case![1]

(obviously you can write a smart bubble sort that does not sort an already sorted array)

``````BUBBLESORT A
for i = 1 to A.length 1
for j = A.length downto i+1
if A[j]  < A[j - 1]
exchange A[j] with A[j-1]
``````

from The Introduction to Algorithms - CLRS

[1] On #3. See http://en.wikipedia.org/wiki/Bubble_sort it mentions an optimized inner loop that identified the sorted remaining array and makes a best case O(n) -- sorry about that.

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(3) is false. The best case for bubble sort is when the input is already sorted, in which case it does only a single scan over the data performing n-1 comparisons and no swaps. –  larsmans Oct 8 '12 at 9:41
@larsmans I guess the algorithm I pasted here would take O(n*n) anyway. Isn't it? Assuming comparison is O(1) –  Nishant Oct 8 '12 at 9:48
@Nishant: if we take number of comparisons n-1 + n-2 + n-3 ... we get total number of comparisons as, n(1-n)/2 .. now making use of this equations gives me -ve number of comparisons for 200 names as, 200*(-199)/2 ?? :| –  user975234 Oct 8 '12 at 9:54
1+2+3+..+199 = ?? –  Nishant Oct 8 '12 at 9:56
@Nishant: yes, the CLRS version always takes Θ(n²) time. The version on Wikipedia is smarter. –  larsmans Oct 8 '12 at 9:59

800 is 4 x 200. Bubble sort is O(n*n), so on average you can sort twice as many items in 4 times the time, so the expectation is 400 names, on average, if 200 was an average case.

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