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Big O when adding together different routines

What does O(n) + O(log(n)) reduce to? My guess is O(n) but can not give a rigorous reasoning.

I understand O(n) + O(1) should reduce to O(n) since O(1) is just a constant.

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marked as duplicate by woodchips, Yuck, Nishant, PHeiberg, Hristo Iliev Oct 18 '12 at 8:58

This question has been asked before and already has an answer. If those answers do not fully address your question, please ask a new question.

Shouldn't you do your own homework? – user85109 Oct 18 '12 at 3:34
@Yuck Sorry I did not find out that post.. Thanks – Will Best Oct 18 '12 at 3:43
up vote 7 down vote accepted

Well since O( f(n) ) + O( g(n) ) = O ( f(n) + g(n) ) We are simply trying to calculate an f(n) such that f(n) > n + log(n)

Since as n grows sufficiently log(n) < n we can say that f(n) > 2n > n + log(n)

Therefore O(f(n)) = O(2n) = O(n)

In a more general sense, O( f(n) ) + O( g(n) ) = O( f(n) ) if c*f(n)>g(n) for some constant c. Why? Because in this case f(n) will "dominate" our algorithm and dictate its time complexity.

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Order is always reduced to higher order terms. I can give you intuitive reasoning. Suppose you have O(n + n^2). Then which part would play more important role in run time? n or n^2. Obviously n^2. Because where there n^2 you won't notice effect of n when n is increased or decreased.

As example,

let n = 100, then n^2 = 10000
means n is 0.99% and n^2 is 99.01% of total running time.
What would you consider for runtime?
if n is increased then this difference is clearer.

I think you understand now,

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the answer is O(n). O(log n) is less than O(n). so their addition sums the maximum value that is O(n).

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