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could you help me to determine whether the following function of complexity:

f(n)=5n^3+1800nlogn+18

is of order O(n^2), O(n^4), OMEGA(n^3),OMEGA(n^5),TETA(n^3),TETA(n^5)

I think it is O(n^4), TETA(n^3) is right? I arrived at this solution because I calculated the limit n-> inf f (n) / g (n) in the various orders!

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1 Answer

up vote 0 down vote accepted

It is actually O(n^3): n^3 being the highest power in your function.

(and nlogn < n^2 < n^3, and 18 being a constant)

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I actually only these choices O(n^2), O(n^4), OMEGA(n^3),OMEGA(n^5),TETA(n^3),TETA(n^5) –  Enzo Feb 7 '13 at 11:03
    
So it is both O(n^4), TETA(n^3), OMEGA(n^3). –  Vakh Feb 7 '13 at 11:06
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