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show that n2/log(n) + 105×n×log(n5)) = O(n2/log(n))

I am having a hard time solving this. If someone could explain to me why that is true, that would be fantastic.

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closed as off topic by Erik Philips, Björn, ᾠῗᵲᄐᶌ, Jeroen, Blue Moon Oct 8 '12 at 20:59

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This is better suited for Math SE, perhaps? –  Jeroen Oct 8 '12 at 20:57
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1 Answer

up vote 3 down vote accepted

When you consider the order of complexity of functions, you can drop out multiplicative constants. So n^2 / logn + 10^5nlogn^5 goes to n^2 / logn + n logn^5. Now logn^5 is 5 logn so drop out that constant as well: n^2 / logn + n logn. Next, since (n/logn)/logn grows indefinitely large as n increases, the n^2 / logn term swamps n logn, leaving just O(n^2 / logn). (To see that (n/logn)/logn grows indefinitely large, consider (sqrt(n)/logn)^2.)

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ahhhh this was way easier explained by you. leave it to teachers who cant speak english. thank you! –  user1729967 Oct 8 '12 at 21:03
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