1
vote
3answers
81 views

Are 2^n and 4^n in the same Big-Θ complexity class?

Is 2^n = Θ(4^n)? I'm pretty sure that 2^n is not in Ω(4^n) thus not in Θ(4^n), but my university tutor says it is. This confused me a lot and I couldn't find a clear answer per Google.
-2
votes
0answers
16 views

Showing big theta, complexity/efficiency

I need to find a tight bound for 5n^2−9n=θ(n^2). I know I need to find the Big Oh and the Big Omega. For the Big OhI have: n_0 = 1 and k=5, but for the big omega I am having trouble because of the ...
1
vote
1answer
18 views

Lower Bound Omega Notation

I have to prove that some number $S$ is bigger than $\Omega(|V|)$, where |V| is the number of vertices. I read the definition of asimptotic notations, but I am still confused with the examples. Fot ...
1
vote
4answers
99 views

Performance analysis of 3 sum

I have a method that finds 3 numbers in an array that add up to a desired number. code: public static void threeSum(int[] arr, int sum) { quicksort(arr, 0, arr.length - 1); for (int i = 0; i ...
0
votes
2answers
215 views

Asymptotic Analysis questions

I found a couple questions on geeksforgeeks.org that i can't seem to understand(#1 and #3). I was hoping someone could clarify the answers for me: clarify whether true/valid or false 1.Time ...
4
votes
2answers
391 views

How to add Big O and Big omega

If an algorithm has two sub algorithm, when it is best case for sub algorithm A1 to the given input, it is the worst case for sub algorithm A2. How could I find the overall algorithm complexity? ...
2
votes
4answers
323 views

Question about big O and big Omega

I think this is probably a beginner question about big-O notation. Say, for example, I have an algorithm that breaks apart an entire list recursively(O(n)) and then puts it back together (O(n)). I ...
3
votes
1answer
1k views

Function which is Big O(1) but not Ω(1)

Can some help me with a function which is Big O(1) but not Ω(1) and the other way around? Some explanation would greatly help.