# Big O notation O(p^2 log p)

Θ(p^2 log p^2) = Θ(p^2 log p)

I really got stun on it.

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@Klaus Byskov Hofmann Haha. Best laugh of today :) –  alex Jan 24 '11 at 12:29

log (p^2) = 2 log p (as in general, log (n^m) = m log n)

Since 2 is just a constant, we have that Θ(log p^2) = Θ(log p).

Therefore, we get Θ(p^2 log p^2) = Θ(p^2 log p).

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If `x = log p^2` that means that `e^x = p^2`. That means that `sqrt(e^x) = p`, and so `e^(x*1/2) = p`. So `(log p^2)/2 = log p`. This means that `p^2 log p^2 = 2 p^2 log p`; since this is big-theta constant multipliers can be discarded, so they turn out equivalent.

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Big-O notation describes the limiting behavior of a function when the argument tends towards a particular value or infinity

Limiting behavior is same for functions `f` and `g`, if `g = C*f`. Asymptotically they behave the same. Now to `log`. Remeber the formula:

logbxy = y logbx

It means that they are different only by constant, which doesn't change limitting behavior.

But it is importand to remember that their speed and amount of operations are still different (by constant).

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