# Writing tips for Big O notation

Is there a difference between saying that `f(n)=O(g(n))` and `f(n) ∈ O(g(n))`?

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Looking at your username, I'd have assumed you have read the wikipedia article. It clearly states that both are equivalent, and that the second is more technically correct. –  Anirudh Ramanathan Feb 23 '13 at 15:44
I wonder what is unclear about his question, why i got negative marks so that it looks -3 now? –  bigO Feb 23 '13 at 15:50
It isn't that it is unclear. It doesn't fit on stackoverflow, and is probably better suited for mathematics.stackexchange.com –  Anirudh Ramanathan Feb 23 '13 at 15:52

"=" is not meant to express "is equal to" in its normal mathematical sense, but rather a more colloquial "is", so the second expression is technically accurate!

http://en.wikipedia.org/wiki/Big_O_notation

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The notations with = and ∈ mean the same thing, but the former is the one that most writers actually use.

I took a look at half a dozen books that are close to hand. These books use =:

• de Berg et al., Computational Geometry
• Dasgupta et al., Algorithms
• Knuth, The Art of Computer Programming
• Papadimitriou & Stieglitz, Combinatorial Optimization

In these books I found no uses of either notation: all occurrences of O/o/Θ/Ω that I spotted were in contexts like "algorithm A is O(n)":

• Aho et al, The Design and Analysis of Computer Algorithms
• Ericson, Real-Time Collision Detection

I didn't find any occurrences of ∈.

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• The relation "f(n) ∈ O(g(n))" is read as "f(x) is little-o of
g(x)".it means that g(x) grows much faster than f(x), or similarly,
the growth of f(x) is nothing compared to that of g(x).
• It assumes that f and g are both functions of one variable. Formally, f(n) = o(g(n)) as n → ∞ means that for every positive constant ε there exists a constant N such that f(n)<=ɛ(g(n).