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I am studying an algorithm that in the worst case performs a number of operations like this:

N + (N -1) + (N - 2) + (N - 3) + ... + [N - (N -1)] + (N -N)

In the Big O notation analysis is this algorithm Linear, quadratic or something else?

Thank you very much.

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What do you think? Give us some analysis. –  Achrome Feb 7 '13 at 10:23
    
It isn't a homework.. and sorry if the question is stupid. I found a good answer here : stackoverflow.com/questions/8261895/big-oh-notation –  user1515248 Feb 7 '13 at 10:27
    
that's a link to this post :) –  UmNyobe Feb 7 '13 at 10:29
    
Sorry :) I meant stackoverflow.com/questions/8261895/big-oh-notation –  user1515248 Feb 7 '13 at 10:31
    
For future reference, Wolfram|Alpha is your friend in these kinds of things. –  Nuclearman Feb 7 '13 at 19:14

2 Answers 2

up vote 3 down vote accepted

Your formula is the "small Gauss". It equals to n(n+1)/2.

Gauss' Trick equation

This is O( (n*n + n)/2 ) = O(n2)

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This is math. Your sum is exactly equal to N*(N+1)/2

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Thanks. After your answer i found this useful link stackoverflow.com/questions/8261895/big-oh-notation –  user1515248 Feb 7 '13 at 10:28

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