# (cubic in n, or logarithmic cubic in n)? Computational complexity of a function [closed]

So I've just been having a few questions. I'm unsure of my work here because we are still left with one term `log n` at the end. I'm suspicious that it might be cubic logarithmic.

The function in question is `f(n) = ((n^6+1)logn+log(n+3)-(n+1)+2)/n^3`.

Thanks for any help!

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## closed as off topic by Kendall Frey, ЯegDwight, RichardTheKiwi, Mac, Ryan BiggOct 17 '12 at 23:02

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You're right, the extra log n at the end is problematic. The value of log n is unbounded as lim n → ∞.

The function is indeed O(n3 log n).

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Yes, in your case you're left with

``````c >= log n + ...other stuff...
``````

So `c` can't be a constant. Your guess of `O(n^3)` is too low. Try `n^3 log n` and repeat, and you should be able to choose a constant `c` to satisfy the resulting equation.

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Are you asking about computational complexity? It looks to me that computational complexity is constant (`O(1)`).

If you really meant the behaviour of the function itself, I think the function would be `O(n^3 logn)`. http://math.stackexchange.com would probably get you a better answer here.

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