# Use of < or ≤ in big-O [closed]

I've seen two different formal definitions of O notation:

f(n) = O(g(n)) if there are constants n0, c where for any n0, we have f(n) < cg(n)

And

f(n) O(g(n)) if there are constants n0, c where for any 0, we have f(n) ≤ cg(n)

The difference is whether f(n) is strictly less than cg(n) or less than or equal to cg(n).

Are these definitions equal? If so, how do I prove it?

## closed as off-topic by Wooble, Dukeling, chepner, Thorsten Dittmar, AD7sixOct 30 '13 at 14:12

• This question does not appear to be about programming within the scope defined in the help center.
If this question can be reworded to fit the rules in the help center, please edit the question.

• This question appears to be off-topic because it is about computer science, not programming. use cs.stackexchange.com (where they will undoubtedly ask you what you've tried.) – Wooble Oct 26 '13 at 14:59
• Perhaps you've misstated the problem, eg left out some ∃ marks and a spec for f. For the problem as stated, A and B need not be identical sets. For example, with f(n)=n and c = n0 = 1 and g(n)=n-1 if n>1 else 3, we have g(n0) ≮ c·f(n0) so this g is in A but not in B – James Waldby - jwpat7 Oct 26 '13 at 15:20
• If you want to ask a different question about big-O, we'd recommend asking a separate question rather than editing this question to change the meaning. That way, if anyone wants to find this original question, they can do so. – templatetypedef Oct 31 '13 at 21:58

For starters, if you have that

f(n) < c g(n) for any n ≥ n0

then it is also the case that

f(n) ≤ c g(n) for any n ≥ n0.

Similarly, suppose that

f(n) ≤ c g(n) for any n ≥ n0

Supposing that g(n) ≥ 1, then you get, for any n ≥ n0, that

f(n) ≤ c g(n) ≥ cg(n) + 1 ≤ c g(n) + g(n) = (c + 1)g(n)

Therefore, using the new constant c' = c + 1, we get

f(n) < c' g(n) for any n ≥ n0

Hope this helps!