# Tagged Questions

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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### Throwing cats out of windows

Imagine you're in a tall building with a cat. The cat can survive a fall out of a low story window, but will die if thrown from a high floor. How can you figure out the longest drop that the cat can ...
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### How can I find a number which occurs an odd number of times in a SORTED array in O(n) time?

I have a question and I tried to think over it again and again... but got nothing so posting the question here. Maybe I could get some view-point of others, to try and make it work... The question ...
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### Example of O(n!)?

What is an example (in code) of a O(n!) function? It should take appropriate number of operations to run in reference to n; that is, I'm asking about time complexity.
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### What does it mean when it is stipulated that extra allowed space is O(1)?

If the above condition in a programming question is given and I am solving it using recursion then am I violating the constraints? It could be because recursion also uses stack? Is it right?
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### Asymptotic complexity of .NET collection classes

Are there any resources about the asymptotic complexity (big-O and the rest) of methods of .NET collection classes (Dictionary<K,V>, List<T> etc...)? I know that the C5 library's ...
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### Calculating work done by f x = (x,x)

Let's say I have this function: (Haskell syntax) f x = (x,x) What is the work (amount of calculation) performed by the function? At first I thought it was obviously constant, but what if the type ...
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### 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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### Time complexity of the program using recurrence equation

I want to find out the time complexity of the program using recurrence equations. That is .. int f(int x) { if(x<1) return 1; else return f(x-1)+g(x); } int g(int x) { if(x<2) return 1; ...
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### 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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### 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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### 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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### Hash Collision Linear Probing Running Time

I am trying to do homework with a friend and one question asks the average running time of search, add, and delete for the linear probing method. I think it's O(n) because it has to check at certain ...
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### The time complexity of counting sort

I am taking an algorithms course and there I saw that the time complexity of counting sort is O(n+k) where k is the range of numbers and n is the input size. My question is, when the difference ...
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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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### asymptotic tight bound for quadratic functions

In CLRS (Introduction to Algorithms by Cormen, Leiserson, Rivest, and Stein), for a function f(n) = an2 + bn + c they said Suppose we take the constants c1 = a/4, c2 = 7a/4, and n0 = ...
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### Asymptotic complexity of printf

Assuming that I'm printing a string, as follows: printf("%s", s); What can we assume the asymptotic complexity of this function is? Is it O(n) where n is strlen(s) - it's length? Or is it somehow ...
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### Asymptotic analysis of three nested for loops

I want to calculate the theta complexity of this nested for loop: for (int i = 0; i < n; i++) { for (int j = 0; j < i; j++) { for (int k = 0; k < j; k++) { ...
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An explanation about Threaded Binary Search Trees (skip it if you know them): We know that in a binary search tree with n nodes, there are n+1 left and right pointers that contain null. In order to ...
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### Big-O running time of various search algorithms [closed]

The method hasTwoTrueValues return true if at least two values in an array of boolean are true. Provide the Big-O running time for all three implementations proposed. // Version 1 public boolean ...
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### Big O Notation question

If I have an algorithm that takes 4n^2 + 7n moves to accomplish, what is it's O? O(4n^2)? O(n^2)? I know that 7n is cut off, but I don't know if I should keep n^2 coefficient or not. Thanks
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### Tricky Big-O complexity

public void foo (int n, int m) { int i = m; while (i > 100) i = i/3; for (int k=i ; k>=0; k--) { for (int j=1; j<n; j*=2) System.out.print(k + "\t" ...
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### Asymptotic analysis

I'm having trouble understanding how to make this into a formula. for (int i = 1; i <= N; i++) { for (int j = 1; j <= N; j += i) { I realize what happens, for every i++ you have 1 ...
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### How can I implement a collection with O(1) indexing and mutability in Haskell?

If I'm counting the occurences of characters in a string, I could easily implement this using an array in an imperative language, such as the following: char values[256]; char c; while (c = ...
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### Running time of algorithm A is at least O(n²) - Why is it meaningless?

Why is the statement: The running time of algorithm A is at least O(n²) is meaningless ? The running time of Insertion sort algorithm is at most O(n²) Is it Correct? I tried the net but ...
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### 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? ...
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### 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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### Complexity of a double for loop

I am trying to figure out the complexity of a for loop using Big O notation. I have done this before in my other classes, but this one is more rigorous than the others because it is on the actual ...
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### Asymptotic complexity of logarithmic functions

I know that in terms of complexity, O(logn) is faster than O(n), which is faster than O(nlogn), which is faster than O(n2). But what about O(n2) and O(n2log), or O(n2.001) and O(n2log): T1(n)=n^2 + ...
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### Can I say that a Θ(n^3/2)-time algorithm is asymptotically slower than an Θ(n log n)-time algorithm?

I analyzed an algorithm and for running time I got Θ(n3/2). Now I want to compare it with Θ(n log n) to see if it is asymptotically faster or slower, for that I did this: Θ(n3/2) ...
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### What are the asymptotic upper and lower bounds for T(n) = 2T(n/2) + n lg lg n?

The recurrence relation T(n) = 2T(n/2) + n lg lg n (where lg is logarithm to base 2) can be solved using the master theorem but I am not very sure about the answer. I have found my answer but am ...
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### Computational complexity of a piece of code

I have got a program, and trying to compute its complexity. I want to be sure i am not mistaken for(int i=4; i<=n; i=i*4) { cout<<"counter for first loop: "<<++count1<<endl; ...
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### How can the lower bound for matrix sorting be found?

Consider the problem of sorting an n x n matrix (i.e. the rows and columns are in ascending order). I want to find the lower and upper bound of this problem. I found that it is O(n^2 log n) by just ...
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### Fundamentals and maths required for algorithms

I have been working on RTOS and Linux driver development for quite some time. Now I am interviewing at semiconductor companies and failing to answer questions about algorithms on strings, and time ...
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### If f(n)=O(g(n)), then shouldnt f(n)∗log2(f(n)^c)=O(g(n)∗log2(g(n))) depend on the value of C?

If f(n)=O(g(n)), then shouldn't f(n)∗log2(f(n)^c)=O(g(n)∗log2(g(n))) depend on the value of C? Here C is a positive constant. According to me if C is large then the statement would become false and ...
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### Multiplying and adding different asymptotioc notations

does anyone knows how to perform such calculations Example: O(n^2) + THETA(n) + OMEGA(n^3) = ? or O(n^2) * THETA(n) * OMEGA(n^3) = ? In general, how to add and multiply different asymptotic ...
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### Algorithm Analysis, Time Complexity of algorithm

m=1; for(i=1;i<=n;i++){ m=m*2; for(j=1;j<=m;j++){ do something that is O(1) } } What will be time complexity of the above code ?? Please tell me how to solve these types of ...
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### Algorithmic complexity of o(n)

I recently started playing with algorithms from this princeton course and I observed the following pattern O(N) double max = a[0]; for (int i = 1; i < N; i++) if (a[i] > max) max = ...
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### O(lg(n)) * O(lg(n)) in complexity theory

Stuck with some dumb question in complexity. I have a loop that runs O(lg(n)) time. I have another loop inside that is also O(lg(n)) so the whole complexity is O(lg(n)) * O(lg(n)) or O(lg(n)2). Can I ...
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### 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.
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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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### 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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### Algorithm domination

Studying for a test and getting this question: Comparing two algorithms with asymptotic complexities O(n) and O(n + log(n)), which one of the following is true? A) O(n + log(n)) dominates O(n) B) ...
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### Running time(big O)) of an algorithm

i m calculating running time for this algorithm? Cost No Of Times for(j=1;j<=n-1;j++){ c1 n(loop will run for n-1 times +1 ...
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### Is there a library for programmatic manipulation of Big-O complexities?

I'm interested in programming languages that can reason about their own time complexity. To this end, it would be quite useful to have some way of representing time complexity programmatically, which ...
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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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### 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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### Do log bases matter in Big O domination?

Given two functions: f(n)=O(log2n) and g(n)=O(log10n) Does one of these dominate the other?
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### complexity for nested loops

I am trying to figure out the complexity of a for loop using Big O notation. I have done this before in my other classes, but this one is more rigorous than the others because it is on the actual ...