Possible Duplicate: What is the difference between Θ(n) and O(n)? It seems to me like when people talk about algorithm complexity informally, they talk about big-oh. But in formal ...
Could someone please give me a NON MATHEMATICAL (put the answer in words rather than formulas) of what exactly the difference between Big O, Big Omega, and Big Theta are? I have looked at many ...
When people explain Theta notation, they just start talking about a function T(n) without explaining what it is. Is it just a given function? Why is it Theta(f(n)) instead of Theta(n)? Where did the ...
I am currently learning about Big O Notation running times and amortized times. I understand the notion of O(n) linear time, meaning that the size of the input affects the growth of the algorithm ...
Are there any O(1/n) algorithms? Or anything else which is less than O(1)?
I have seen this term "O(1) access time" used to mean "quickly" but I don't understand what it means. The other term that I see with it in the same context is "O(n) access time". Could someone please ...
With the reference of this answer, what is Theta (tight bound)? Omega is lower bound, quite understood, the minimum time an algorithm may take. And we know Big-O is for upper bound, means the maximum ...
I missed the class where big-O was introduced thinking that it was pretty straight forward. It still seems to be however the teacher said something about O(n) deviating from the function when n gets ...
This is an interview question that I am using as a programming exercise. Input: Two sorted integer arrays A and B in increasing order and of different sizes N and M, respectively Output: A sorted ...
I'm learning programming using YouTube and whatever I can find. I stumbled upon some Big O problems and I'm quite confused on one of them. for (int i = 0; i < n; i++) for (int j = 0; j < 2; ...
So I've been trying to understand Big O notation as well as I can, but there are still some things I'm confused about. So I keep reading that if something is O(n), it usually is referring to the ...
I have come across this in multiple sources (online and books) - Running time of square matrix multiplication is O(n^3) for matrices of size nXn. (example - matrix multiplication algorithm time ...
I'm studying asymptotic notations from the book and I can't understand what the author means. I know that if f(n) = Θ(n^2) then f(n) = O(n^2). However, I understand from the author's words that for ...
Big Omega is supposed to be the opposite of Big O, but they can always have the same value, because by definition Big O means: g(x) so that cg(x) is bigger or equal to f(x) and Big Omega means ...