# Big Oh Notation Confusion

I'm not sure if this is a problem with my understanding but this aspect of Big Oh notation seems strange to me. Say you have two algorithms - the first preforms n^2 operations and the second performs n^2-n operations. Because of the dominance of the quadratic term, both algorithms would have complexity O(n^2), yet the second algorithm will always be better than the first. That seems weird to me, Big Oh notation makes it seem like they are same. I dunno...

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Look at the graphs of `y = x²` and `y = x² - x`, as `x` gets really, really, REALLY big. –  Matt Ball Apr 29 '13 at 20:29
They are "the same" in the sense that they are both better than, say, O(n) (e.g. 10000*n) and worse than, say, O(n^3) (e.g. .0001*n^3) when n gets large enough. That is all "big-O" is trying to capture. –  Nemo Apr 29 '13 at 20:32
Hypothetically, say you were asked to provide an algorithm that does better than O(n^2). I guess the n^2-n algorithm would not be correct then, even though it does better than n^2. –  user1893354 Apr 29 '13 at 21:02