Asymptotic complexity is an approximation of the edge case performance of an algorithm used to determine best and worst case scenarios.

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Finding the average case complexity for an algorithm?

I'm very lost on finding average case complexity, just pulling a random problem...like. For a sentinel sequential search, find the average case if the probability is 0 <= p <= 1. I get the ...
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Big O(n logn) is not preferable over the O(n^2)

Any Algorithms example when do we prefer Big O(n^2) time complexity over the O(n logn)? I have seen this question somewhere but did not find answer.
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Asymptotic Analysis Inequalities

I have a problem understanding how the following inequalities highlighted in red were derived for this asymptotic analysis problem. Could someone explain the nature of these inequalities and how they ...
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Show Asymptotic relationships using definitions

I am very solid at the understanding of definitions of Big-O notation along with Big-Omega and big-Theta notation. However, I struggle with actually determining through proof based reasoning using the ...
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Algorithms with O(n/log(n)) complexity

Are there any famous algorithms with this complexity? I was thinking maybe a skip list where levels of the nodes are not determined by the number of tails coin tosses, but instead are use a number ...
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3answers
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Calculating time complexity for simple programs

I am new to programming and I came across this problem in my text book. I have to find the worst case running time using Theta notation for this program : 1 i = 1, total = 0 2 while i < n/2 : ...
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Unable to understand execution time in an algorithm

I have difficulty determining the execution time of each step in an algorithm. I just can't understand the logic. We all know prior to determining the Big O or Theta in an algorithm, we have to ...
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3answers
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Is Big Oh the only notation used to measure complexity in STL

I have started reading C++ STL and also found a book for that!. while i was reading the complexity,which plays major role in choosing algorithms and data structures i have been seeing that the Big Oh ...
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4answers
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Algorithm to sum a triple?

We have an array A with m positive integer numbers, what's an algorithm that will return true if there's a triple (x,y,z) in A such that A[x] + A[y] + A[z] = 200 Otherwise return false. Numbers in ...
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1answer
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Prove that 5^n = o(n!)

Please help me providing a direction on how to prove this. I can prove by randomly finding value of n that makes n! greater than 5^n. But can someone help me prove mathematically.
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time and space complexity

I have a doubt related with time and space complexity in following 2 case Blockquote Case I: Recurion: Factorial calculation. int fact(int n) { if(n==0) return 1; else ...
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2answers
43 views

Which Big-O grows faster asymptotically

I have gotten into an argument/debate recently and I am trying to get a clear verdict of the correct solution. It is well known that n! grows very quickly, but exactly how quickly, enough to "hide" ...
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46 views

Big O or Big Omega?

Here's my answers to Is A O or Ω of B ? Do you think I got it right? A B O Ω (log n)^3 N No Yes 2n^2+4n 4n^2 Yes No n! 2^n ...
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Algorithm Analysis: Big-O explanation

I'm currently taking a class in algorithms. The following is a question I got wrong from a quiz: Basically, we have to indicate the worst case running time in Big O notation: int foo(int n) { m ...
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0answers
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Algorithm running time notation True/False?

Learning about algorithm running time at the moment and got the questions in the form of "are the following statements true or false?" (n + 4)^2 = Ɵ(n^2) n + √n = Ɵ(n log(n)) 2^2n = O(2^n) 500n + ...
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4answers
642 views

Sum of order of O(1)+O(2)+ … +O(n)

What does the sum O(1)+O(2)+ .... +O(n) evaluate to? I have seen its solution somewhere it was written: O(n(n+1) / 2) = O(n^2) but I am not satisfied with it because O(1) = O(2) = constant, so ...
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2answers
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How to get the time complexity of this recurrence: T(n) = sqrt(n) * T(sqrt(n)) + n

This recurrence: T(n) = sqrt(n) * T(sqrt(n)) + n It does not appear to be solvable with Master theorem. It also does not appear to be solvable with Akra-Bazzi. Even if I set n = 2^k so that T(2^k) = ...
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4answers
548 views

Interview questions

This is an interview question: Given: f(n) = O(n) g(n) = O(n²) find f(n) + g(n) and f(n)⋅g(n)? What would be the answer for this question?
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When can the Master Theorem actually be applied?

I am quite frustrated over this. In CLRS 3rd edition, page 95 (chapter 4.5), it mentions that recurrences like T(n) = 2T(n/2) + n lg n cannot be solved with the Master Theorem because the ...
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1answer
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what is the time complexity of below code fragment?

Let A[1, …n] be an array storing a bit (1 or 0) at each location, and f(m) is a function whose time complexity is Θ(m). Consider the following program fragment written in a C like language: counter = ...
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When we will consider the constants in asymptotic notations?

I think that : ignoring the constants should has a limit ! When the constant become too big we should consider it because it make a huge difference Is there any rules for that?
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44 views

Complexity of algorithm including dynamically allocated array

I wrote a program that gets from user-interface an array of numbers (natural numbers) and injects them into a dynamically allocated array. I'm getting stuck with calculating the big-O of the program ...
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How to evaluate below expression involving asymptotic notations?

If f(n)=ϴ(n),g(n)=ϴ(n) and h(n)=Ω(n) Then how to evaluate f(n)g(n)+h(n)? I approached like f(n)g(n)=ϴ(n^2), now what will be Ω(n)+ϴ(n^2). According to me the lower bound of this expression ...
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1answer
56 views

Koch snowflake rendering time (and how to draw a snowflake using turtle)

I'm currently working through the online course material for the MIT 6.006 course for fun. I'm on problem set #2 (found here) and had a question about the calculations for the asymptotic rendering ...
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181 views

Is O(n) greater than O(2^log n)

I read in a data structures book complexity hierarchy diagram that n is greater than 2log n. But cannot understand how and why. On using simple examples in power of 2 as n, I get values equal to n. ...
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Which code performs better for any value of 5,3, and 1000?

Find the sum of all numbers below 1000 that are divisible by 3 or 5. Code 1: sum=0 for (int j = 0; j <=1000; j++) { if((j%5==0)||(j%3==0)) { ...
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Time complexity for dependent functions

I have this method public static void primeSort( String[] list, HashMap< Integer, ArrayList< String >> hm ){ for( int x=0; x<list.length; x++ ){ if( list[ x ] == null ) ...
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Role of lower order terms in big O notation

In big O notation, we always say that we should ignore constant factors for most cases. That is, rather than writing, 3n^2-100n+6 we are almost always satisfied with n^2 since that term is the ...
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How can an algorithm that is O(n) also be O(n^2), O(n^1000000), O(2^n)?

So the answer to this question What is the difference between Θ(n) and O(n)? states that "Basically when we say an algorithm is of O(n), it's also O(n2), O(n1000000), O(2n), ... but a Θ(n) algorithm ...
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4answers
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Confused on big O notation

According to this book, big O means: f(n) = O(g(n)) means c · g(n) is an upper bound on f(n). Thus there exists some constant c such that f(n) is always ≤ c · g(n), for large enough n (i.e. , n ≥ n0 ...
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Finding n0 in big O notation

This is a continuation of my previous question here. I learned how to validate if the relationship holds for 3n2 − 100n + 6 = O(n2), because I choose c = 3 and 3n2 > 3n2 − 100n + 6; ...
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How to solve for this recurrence T(n) = T(n − 1) + lg(1 + 1/n), T(1) = 1?

I got stuck in this recurrence: T(n) = T(n − 1) + lg(1 + 1/n), T(1) = 1? for a while and it seems the master method cannot be applied on this one.
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1answer
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What is the difference between O(N) + O(M) and O(N + M). Is there any?

I'm solving problems for interview practice and I can't seem to figure out the answer to the time and space complexity of the following problem: Given two sorted Linked Lists, merge them into a ...
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Complexity of the recursion: T(n) = T(n-1) + T(n-2) + C

I want to understand how to arrive at the complexity of the below recurrence relation. T(n) = T(n-1) + T(n-2) + C Given T(1) = C and T(2) = 2C; Generally for equations like T(n) = 2T(n/2) + C (Given ...
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Confused on how to find c and k for big O notation if f(x) = x^2+2x+1

I am studying big O notation from this book. The deffinition of big O notation is: We say that f (x) is O(g(x)) if there are constants C and k such that |f (x)| ≤ C|g(x)| whenever x > k. Now here ...
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The Recurrence T(n)= 2T(n/2) + (n-1)

I have this recurrence: T(n)= 2T(n/2) + (n-1) My try is as follow: the tree is like this: T(n) = 2T(n/2) + (n-1) T(n/2) = 2T(n/4) + ((n/2)-1) T(n/4) = 2T(n/8) + ((n/4)-1) ... the hight of the ...
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T(n) = T(n/2) + T(n/4) + O(1), what is T(n)?

How to solve this recurrence: T(n) = T(n/2) + T(n/4) + O(1) It doesn't seem like Master Method will help, as this is not in the form of T(n) = aT(n/b) + f(n). And I got stuck for quite a while.
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Cost of a java method with multiple recursion

We have the following Java method: static void comb(int[] a, int i, int max) { if(i < 0) { for(int h = 0; h < a.length; h++) System.out.print((char)(’a’+a[h])); ...
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complexity calculation for ω(f(n)) / o(f(n))

I have to aproximate the complexity of the following fraction: ω(f(n)) / o(f(n)) Where ω is little-omega notation and o is little-o notation. Assuming we have 2 functions: f1:N->N and ...
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2answers
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Solving the recurrence T(n) = T(n/2) + T(n/4) + T(n/8)?

I'm trying to solve a recurrence T(n) = T(n/8) + T(n/2) + T(n/4). I thought it would be a good idea to first try a recurrence tree method, and then use that as my guess for substitution method. ...
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2answers
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solving recurrence examples of form T(n-i) + f(n) [closed]

I've been working on a problem set for a bit now and I seem to have gotten the master method down for recurrence examples. However, I find myself having difficulties with other methods (recurrence ...
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Calculate asymptotic limit for log(n) + Ө( sqrt(n))

Assuming f(n) = Ө(sqrt(n)). By the definition of Big-theta Ө, we can say: There exists two constants c1 and c2, both real positive numbers such that: c1*sqrt(n) <= f(n) <= c2*sqrt(n) So, we ...
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Solving recurrence T(n) = T(n/2) + 2T(n/4) + n?

I am studying about recurrences using my friend's pdf (Algorithms Unlocked) and trying to solve the problems about recurrences and it is not yet clear to me about the mechanics of the recursion tree(I ...
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1answer
29 views

Order the following functions by rate of growth

How can I order the following functions by rate of growth? n^(logn), 3^n, (logn)^n, n choose n-4, and n^3 ? What I have is: n^3, n choose n-4, n^logn, 3^n, (logn)^n but I'm not sure if this is right. ...
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How to solve the recurrence T(n) = T(n/2) + T(n/4), T(1) = 0, T(2) = 1 is T(n) = Θ(n lg φ ), where φ is the golden ratio?

I tried recursion tree method since the master method is not applicable for this recurrence but it seems that it is not the right method also, any help would be appreciated !
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2answers
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When do floors and ceilings matter while solving recurrences?

I came across places where floors and ceilings are neglected while solving recurrences. Example from CLRS (chapter 4, pg.83) where floor is neglected: Here (pg.2, exercise 4.1–1) is an example ...
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506 views

What are sublinear algorithms?

I have been asked the following question by one of my fellow mates. Which of the following expressions is not sublinear? O(log log n) O(n) O(logn) O(root(n)) I have gone through ...
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Determine Big-oh notation

In my preparations for the Algorithms exam I tried to solve the following Big-Oh questions, so can you check them for me for(i=1; i<n; i++){ i=i*3; for(j=15; j>=6; j--){ ...
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1answer
21 views

Determine complexity for a recursive function

I have a problem in determining the recurrence relations of the following code: public static void Method1(String S){ if(S.length()>1){ System.out.print(S.charAt(S.length()-1)); ...
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48 views

How can I make the performance O(N) instead of O(N^2)?

I'm trying to understand how to make the time complexity better for this problem: A non-empty zero-indexed array A consisting of N integers is given. The consecutive elements of array A ...