I got this formula from a data structure book in the bubble sort algorithm.
I know that we are (n1) * (n times), but why the division by 2?
Can anyone please explain this to me or give the detailed proof for it.
Thank you
closed as off topic by KennyTM, Stephan202, Johannes Schaub  litb, Pascal Thivent, Bruno Reis Mar 20 '10 at 17:17Questions on Stack Overflow are expected to relate to programming within the scope defined by the community. Consider editing the question or leaving comments for improvement if you believe the question can be reworded to fit within the scope. Read more about reopening questions here.If this question can be reworded to fit the rules in the help center, please edit the question. 

See triangle numbers. 


Try to make pairs of numbers from the set. The first + the last; the second + the one before last. It means n1 + 1; n2 + 2. The result is always n. And since you are adding two numbers together, there are only (n1)/2 pairs that can be made from (n1) numbers. So it is like (N1)/2 * N. 


Sum of arithmetical progression (A1+AN)/2*N = (1 + (N1))/2*(N1) = N*(N1)/2 


It's only
Thus you don't have to sort the whole thing every time: you only need to sort n  2 elements the second time through, n  3 elements the third time, and so on. That means that the total number of compare/swaps you have to do is Example: if the size of the list is N = 5, then you do 4 + 3 + 2 + 1 = 10 swaps  and notice that 10 is the same as 4 * 5 / 2. 





Assume n=2. Then we have 21 = 1 on the left side and 2*1/2 = 1 on the right side. Denote f(n) = (n1)+(n2)+(n3)+...+1 Now assume we have tested up to n=k. Then we have to test for n=k+1. on the left side we have k+(k1)+(k2)+...+1, so it's f(k)+k On the right side we then have (k+1)*k/2 = (k^2+k)/2 = (k^2 +2k  k)/2 = k+(k1)*k/2 = k*f(k) So this have to hold for every k, and this concludes the proof. 


Here's a proof by induction, considering For Suppose We'll prove
So the formula holds for all 


This is a pretty common proof. One way to prove this is to use mathematical induction. Here is a link: http://zimmer.csufresno.edu/~larryc/proofs/proofs.mathinduction.html 


Start with the triangle...
representing 1+2+3+4 so far. Cut the triangle in half along one dimension...
Rotate the smaller part 180 degrees, and stick it on top of the bigger part...
Close the gap to get a rectangle. At first sight this only works if the base of the rectangle has an even length  but if it has an odd length, you just cut the middle column in half  it still works with a halfunitwide twiceastall (still integer area) strip on one side of your rectangle. Whatever the base of the triangle, the width of your rectangle is However, my 


N
is added on the left side. If it's not, oneN
is missing, so2N
should be subtracted in the numerator. – Johannes Schaub  litb Mar 20 '10 at 17:16