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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How this program has time complexity Big Oh (n^2logn)?

int unknown(int n) { int i,j,k=0; for(i=n/2;i<=n;i++) for(j=2;j<=n;j=j+2) k=k+n/2; return k; } Is the complexity mentioned by me is right ?If yes, how ? ...
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Asymptotic Analysis: How to calculate Theta notation value?

What is omega value of 2^n? How do you calculate theta value? I know what the case is for theta but how do they calculate a definite value? Big O and Big Omega are easy as they are highest and lowest ...
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Solving recurrences

Am trying to solve the given recursion, using recursion tree, T(n) = 3T(n/3) + n/lg n. In the first level (n/3)/(log(n/3)) + (n/3)/(log(n/3)) + (n/3)/(log(n/3)) = n/(log(n/3)). In the second level ...
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Diffrence between F(n)=O(n) and F(n) <= O(n)?

In a research paper (published by some renowned names), they wrote F(n) ≤ O(g(n)) and F(n) ≥ Ω(h(n)). Isn't this the same as F(n) = O(g(n)) and F(n) = Ω(h(n)). Is their even any minute difference?
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31 views

Have I properly sorted these runtimes in order of growth?

I am doing this small task which I have to arrange asymptotic runtime in ascending order. Here are the runtimes: Here is the order I believe they should go in: log10(n^4), n^3, 2^((log4n)), ...
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272 views

What is the complexity of the code to find word in a set of cubes

I have solved the program here. Previously I thought complexity was O(n!) where n were characters in the word. But today I feel it is wrong. It should be (6)^(characters in the word) where 6 is the ...
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27 views

Algorithm, Substitution method

There is given T(n)=2T(n/2)+n2 My guess is: T(n) =O(n2) or T(n)≤ c * n2 Hence; T(n) = 2T(n/2)+n2 ≤ 2*(c*(n/2)2+n2         = 2*c*((n2)/4)+n2 ...
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46 views

Time complexity of if-else statements in a for loop

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: Case 1 ...
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27 views

Asymptotic complexity for typical expressions

The increasing order of following functions shown in the picture below in terms of asymptotic complexity is: (A) f1(n); f4(n); f2(n); f3(n) (B) f1(n); f2(n); f3(n); f4(n); (C) f2(n); f1(n); f4(n); ...
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Why does this loop return a value that's O(n log log n) and not O(n log n)?

Consider the following C function: int fun1 (int n) { int i, j, k, p, q = 0; for (i = 1; i<n; ++i) { p = 0; for (j=n; j>1; j=j/2) ++p; for ...
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26 views

TIme complexity of various nested for loops

Time Complexity of a loop is considered as O(Logn) if the loop variables is divided / multiplied by a constant amount. loop 1 ---- for (int i = 1; i <=n; i *= c) { // some O(1) expressions } ...
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407 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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4answers
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HRW rendezvous hashing in log time?

The Wikipedia page for Rendezvous hashing (Highest Random Weight "HRW") makes the following claim: While it might first appear that the HRW algorithm runs in O(n) time, this is not the case. The ...
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36 views

what is the time complexity of finding k successors in red black tree?

Given a pointer to a node in a red black tree, what is the time complexity of finding all k successors of that node? The easy bounds are O(klgn) & O(n). Is there a tighter bound? I feel it is ...
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132 views

Storing pairwise sums in linear space

If we have two arrays of size n each and want to sort their sums, the naive approach would be to store their sums in O(n^2) space and sort it in O(n^2 logn) time. Suppose we're allowed to have the ...
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45 views

How can I find the complexity of this code segment?

Here's the pseudocode of the code segment I'm talking about, temp = 1 repeat for i = 1 to n temp = temp+1; n = n/2; until n<=1 I know the outer loop (repeat) executes n times. What ...
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Would this algorithm run in O(n)?

Note: This is problem 4.3 from Cracking the Coding Interview 5th Edition Problem:Given a sorted(increasing order) array, write an algorithm to create a binary search tree with minimal height Here is ...
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3answers
610 views

Finding time complexity of a program

I'm solving the following programming question: Given a sorted integer array and a number, find the start and end indexes of the number in the array. Ex1: Array = {0,0,2,3,3,3,3,4,7,7,9} and ...
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140 views

Why is SortedDictionary<K, V>.GetEnumerator O(log n) but SortedSet<T>.GetEnumerator O(1)?

From the SortedSet<T>.GetEnumerator documentation: This method is an O(1) operation From the SortedDictionary<K, V>.GetEnumerator documentation: This method is an O(log n) ...
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What is the time complexity of the given algorthm?

x=0 for i=1 to ceiling(log(n)) for j=1 to i for k=1 to 10 x=x+1 I've included the answer I've come up with here: I think the time complexity is θ(n^2 log(n)), but I am not ...
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For the following loops, find a tight bound θ as a function of n

x=0 for i=1 to n^2 for j=1 to ceiling(log(i)) x=x+1 What I have so far is that the inner loop's operations don't depend on the input (n) so they are constant time. I think this gives me ...
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Algorithms Asymptotic running times

What are the best case and worst case asymptotic running times for sorting an array of size n using mergesort ?
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Big-O Computational Resources

I know that measuring asymptotic complexity can be based on any resources you have, whether it's time, memory usage, number of comparisons, etc. But when it comes to sorting something, I realize we ...
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107 views

Best algorithm to find N unique random numbers in VERY large array

I have an array with, for example, 1000000000000 of elements (integers). What is the best approach to pick, for example, only 3 random and unique elements from this array? Elements must be unique in ...
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108 views

is O(n) greater than O(pow(2,logn))

I read in a DS book complexity hierarchy diagram that n is greater than pow(2,log n). But cannot understand how and why. On using simple examples in power of 2 as n, i get values equal to n. It is ...
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76 views

HashMap vs. ArrayList insertion performance confusion

From my understanding a hashmap insertion is O(1) and for an arraylist the insertion is O(n) since for the hashmap the hashfunction computes the hashcode and index and inserts the entry and an array ...
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how to find time complexity using substract and conquer algorithm?

How to find the complexity of the recurrence: T(n)=2T(root(n))+logn. Is there any general formula for solving these kind of problems?
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21 views

Analyze theta relation between sum of sqrt(i) and n*sq-root(n)

i want try to prove that: sum of i^1/2 with i = 1 to n and n^3/2 are equal as asymptotic. How can I prove this relation?
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Why does log appear so frequently in algorithmic complexity?

This question is about whether there is some abstract similarity between the solutions that leads to the appearance of log in problems such as sorting and searching. Or, more simply, why does log ...
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Radix sort explanation

Based on this radix sort article http://www.geeksforgeeks.org/radix-sort/ I'm struggling to understand what is being explained in terms of the time complexity of certain methods in the sort. From the ...
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Analysis of Algorithms - Find missing Integer in Sorted Array better than O(n)

I am working through analysis of algorithms class for the first time, and was wondering if anyone could assist with the below example. I believe I have solved it for an O(n) complexity, but was ...
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Identify Lonely Edge in Graph Theory - Analysis of Algorithms (Graphs)

Please see the below example A lonely edge in a simple undirected Graph is an edge e = (u,v) for which the edge e is the only edge adjacent to the vertices u and v. For a given graph G = (V,E), ...
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1answer
21 views

runtime analysis of bubble sort similar algorithm

I'm having a lot of trouble finding the running time of the following algorithm. I would thank very much if someone could help me to solve it explicitly line per line with the corresponding cost and ...
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63 views

Are the following functions in O(x³)?

I'm trying to decide whether the following functions are or can be O(x³) assuming k = 1. I have what I think are the right answers but I'm confused on a few so I figured someone on here could look ...
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Big O notation on some examples [duplicate]

The professor gave us a few examples to try at home but never gave us the answers and now when revising for the exams I would really like to go a bit more into detail with this. We have 3 "algorithms" ...
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Minimum-Maximum recursive algorithm with a non-even partition, complexity

So I have been trying to find the recurrence relation of the following algorithm in order to compute its complexity. The following algorithm describes how to find the minimum-maximum element in an ...
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Asymptotic time complexity of inserting n elements to a binary heap already containing n elements

Suppose we have a binary heap of n elements and wish to insert n more elements(not necessarily one after other). What would be the total time required for this? I think it's theta (n logn) as one ...
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1answer
44 views

Average cost of successful search in hash table in chaining

I have searched every where for this but I can't understand why is it O(1+a/2) where a is the load factor. Can some one explain this step by step.
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How to calculate Best case time complexity

How does one go about finding the best case time complexities for formulae like 2n², 3⋅log₂(n) and 2n² + 10n? What is the exact procedure?
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Homework: Prove or disprove: (5n)!=O(n!^5)

I have this question in my h.w: Prove or disprove: (5n)!=O(n!^5). I don't know how to approach this (of course I know the O notation definition but I don't have a clue how to solve it).. any help ...
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a HashSet.contains() returning an Object

Suppose i'm working a type A in Collections. class A { ThisType thisField; ThatType thatField; String otherField; } Only thisField and thatField are relevant to identify the ...
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28 views

Asymptotic Bounds: Upper and Lower

I have some examples for both Asymptotic Bounds: Upper and Lower and I can't understand why we are considering the dominant terms or the n terms in each of them. Can someone please explain them to me? ...
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39 views

Algorithmic Analysis of Insertion Sort case

I'm studying for an exam I have tomorrow and I can't seem to understand this problem. (This is an old assignment that I already have the answers to). I don't quite understand parts b and parts c. ...
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Depth first search and proving valid bounds

(Question) The runtime of dfs on a graph G = ( V, E ) is Θ( | V | + | E | ) This question asks you to show formally that in some sense this is the best possible runtime we can hope for, for general ...
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Functions in o(n) and ω(1)

I was solving some question and I came across this one. Give a function which is both in o(n) (little-oh) and in ω(1) (little-omega), or state that none exists. I thought of functions like logn or ...
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f(n)/log(n) = O(g(n)) ⇒ g(n) = Θ(f(n))?

Is it possible to show, that f(n)/log(n) = O(g(n)) => g(n) = Θ(f(n))? Right now I'm standing here: f(n)/log(n) = O(g(n)) ⇒ f(n)/log(n) ≤ c₁⋅g(n) ⇒ f(n)/(c₁⋅log(n)) ≤ g(n) g(n) = Θ(f(n)) ⇒ ...
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Is there any implementation to Remove by Key and get the Value at the same time?

I'm doing a performance critical program (little academic stuff) and I'm looking to optimize wherever possible (not like it proved "this is the" bottleneck). I have a custom dictionary structure (a ...
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4answers
874 views

Alorithmic complexity of recursive function

Here is my function. It is a simple one, I'm just not confident on what the answer is. int calcul( int n) { if(n=1) return 1; else return calcul(n/2) + 1; } Now, to get the ...
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How to compare exponential complexities?

I have an algorithm that runs in O(√x), where x is my input. Now, instead of using x, I would like to use the number of bits of x, i.e. n. I know that x = O(2ⁿ), therefore my algorithm should be ...
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27 views

Total complexity of a program

I wrote a program which performs a BFS (Breadth First Search) on a graph. The program's execution is divided into an initialization phase and the algorithm phase. Given that V is the number of ...