-3
votes
1answer
38 views

Order the growth rate of an Algorithm

I have come across some of the difficulties during doing this question. The Question is, Rank the following by growth rate: n, √n, log n, log(log n), log^2 n, (1/3)^n, n! What is the Order for ...
1
vote
2answers
55 views

Complexity .. Big O

I have to determine the time complexity (big O) of the following function: void BET::makeEmpty(BinaryNode* &n) { if(n != NULL) { makeEmpty(n->left); ...
1
vote
1answer
31 views

Can a probabilty function be used as part of calculating the complexity of a code

How can you incorporate a probability function as part of complexity analysis of code. if (cond1(l,n)) { for (int r=l;r<n;r++) for (int m=r;m<n;m++) for (int k=m;k<n;k++) ...
-6
votes
2answers
66 views

what is the answer for : n! = Θ( )?

How do I find the answer? Even Big O is enough. All clues i found are complex math ideas. any help? What would be the correct approach to tackle this problem? recursion tree seems too much of a work ...
2
votes
3answers
117 views

Calculating the Recurrence Relation T(n)=T(n-1)+logn

We are to solve the recurrence relation through repeating substitution: T(n)=T(n-1)+logn I started the substitution and got the following. T(n)=T(n-2)+log(n)+log(n-1) By logarithm product rule, ...
0
votes
1answer
40 views

How to find constants c1, c2 and n0 in a theta proof?

Assume that I want to find out if a function is part of theta group n^3. After some algebraic steps I manage to get the following function: c1 <= 4 / n - 4/n^2.5 + 4/n^4 <= c2 At that step I ...
-6
votes
3answers
133 views

Big O operation (attempted answer provided) [closed]

Describe any operation that takes O(1) time. The above is pretty much the question (not technically i know) but it's what i've been asked to do. My answer is the following: An O(1) operation ...
0
votes
0answers
73 views

Better Algorithm, Better Complexity [duplicate]

You are given an unsorted array of n integers, and you would like to find if there are any duplicates in the array (i.e. any integer appearing more than once). The complexity that i've found O (N^2) = ...
-1
votes
1answer
85 views

Big O complexity of the cases (answers provided- confirmation would be awesome!) [closed]

Question: We have a chain (or a linked list) of integers with 2-field records: an integer field and a pointer field. If there are n items in a given list, what is the Big O complexity of each of the ...
0
votes
4answers
43 views

Complexity of O(M+N)

I've computed complexity of below algorithm as for i = 0 to m for j = 0 to n //Process of O(1) Complexity: O( m * n) This is simple example of O( m * n). But I'm not able to figure ...
3
votes
2answers
76 views

How can I find Big-O notation for my loops?

I am having trouble finding out the Big-O notation for this fragment of code. I need to find the notation for both for loops. public static int fragment(int n) { int sum = 0; for (int i = n; i ...
0
votes
1answer
58 views

How is the cost of suffix array generation O(n^2 log n)?

To build a suffis array on a string of n characters, we first generate the n suffixes O(n) and then sort them O(n log n) the total time complexity apprears to be O(n) + O(nlogn) = O(nlogn). But I ...
-8
votes
1answer
59 views

Big O notation complexity for GF (Galois Fields) multiplication between array and matrix [duplicate]

Suppose A = [1 0 1 0], B = [1 0 1 0 0 0 0 0; 0 1 1 0 0 0 1 1; 0 0 1 0 0 1 0 0; 1 0 1 0 1 1 1 1] Consider A and B are in the ...
1
vote
2answers
30 views

Recursive Runtime of T(n-k)

I am trying to find the runtime of the equation; T(n) = T(n-2) + n^3. When I am solving it I arrive at the summation T(n) = T(n-k) + SUM {from k = 0 to k = n/2} of (n-2k)^3. solving that sum I get ...
127
votes
5answers
6k views

Are 2^n and n*2^n in the same time complexity?

Resources I've found on time complexity are unclear about when it is okay to ignore terms in a time complexity equation, specifically with non-polynomial examples. It's clear to me that given ...
1
vote
3answers
37 views

Can I use Big-O notation to compare performance of optimised and unoptimised implementation of same algorithm?

I'm writing about an optimisation about an algorithm which has O(n) complexity. It still has O(n) complexity but the execution time has improved tremendously. Is it correct for me to say that I've ...
1
vote
2answers
188 views

how to calculate time complexity in big O notation of this algorithm

i need help finding time complexity of this function in big O notation: int myfunction(bool exists) { int var=0; int k,j,n; if (exists) for(k=1; k<=n; k*=2) for(j=1; ...
1
vote
2answers
30 views

Lower-bound Runtime of this pseudo-code

for i = 0 to n do for j = n to 0 do for k = 1 to j-i do print (k) I'm wondering about the lower-bound runtime of the above code. In the notes I am reading it explains the lower bound runtime to be ...
1
vote
1answer
269 views

Time complexity analysis. while loop with inner for loop [duplicate]

I'm trying to find the number of times this code runs. On the right I have my attempt at the code. I'm am not sure about the loops. Here is the code: times sum = 0 ...
0
votes
1answer
119 views

Finding complexity of recursive algorithm?

I'm having trouble with finding the complexity of recursive methods. I have an algorithm that sorts the elements of an array in ascending order. Basically what I did is write down each step in the ...
0
votes
1answer
65 views

Calculating algorithm complexity using Big O

I am trying to calculate the complexity of different variations of an algorithm using Big O. A simplified description of the algorithm follows: Let's consider a "converter" a function that takes ...
0
votes
3answers
142 views

Big O notation, Complexity

So we're just beginning Big O notation, and we have a question asking this: What is the worst time complexity for the following loop, if someWork has complexity of O(i), noting that this means that i ...
-4
votes
1answer
85 views

Complexity of algorithms in Big O notation [duplicate]

What is Big O notation and why do we measure complexity of any algorithm in Big O notation? An example will do the good.
0
votes
2answers
56 views

Complexity of a triple for loop

for(I = 0; I < n; I++) for(j = I; j < n; j++) for(k = I; k < n; k++) statement; outer loop runs n times. 2nd loop runs (n - I) times = n(n-1)/2 times. 3rd loop runs (n- I) times = ...
-3
votes
1answer
68 views

what is polynomial and exponential time?

I am trying to understand what polynomial and exponential time is in relation to the big O notation. I understand the basics of O notation such as linear is O(n) and O(n^2) is quadratic etc. The ...
0
votes
5answers
1k views

what is order of complexity in Big O notation?

Question Hi I am trying to understand what order of complexity in terms of Big O notation is. I have read many articles and am yet to find anything explaining exactly 'order of complexity', even on ...
0
votes
0answers
33 views

Build-Heap Time Complexity Analysis

I have a practice question here that is asking if the following is TRUE or FALSE. The question is: To build a heap it takes O(nlogn) in the worst case where the size is n and it makes n insertions. ...
2
votes
2answers
76 views

Big O Notation, when can we drop constants legally?

I know in Big O Notation we only consider the highest order, leading polynomial term because we are basically placing this theoretic worst case bound on compute-time complexity but sometimes I get ...
0
votes
2answers
72 views

Which algorithm is better?

I have two algorithms. The complexity of the first one is somewhere between Ω(n^2*(logn)^2) and O(n^3). The complexity of the second is ω(n*log(logn)). I know that O(n^3) tells me ...
0
votes
1answer
67 views

Big Theta Proof

I got a practice exam question here asking if the following is true/false. Let f , g, and h be functions from the natural numbers to the positive real numbers. Then if g is an element of Big Omega( ...
3
votes
3answers
101 views

If algorithm time complexity is theta(n^2), is it possible that for one input it will run in O(n)?

If algorithm time complexity is theta(n^2), is it possible that for one input it will run in O(n)? by the definition of theta it seems to be that no input will run in O(n). however some say that its ...
0
votes
0answers
158 views

On Dual Pivot Quicksort

Quicksort is well known as one of the most powerful sorting algorithms. I was thinking how we can improve the algorithm by adding a second pivot. I did a bit of research and found out that it's ...
1
vote
2answers
216 views

Algorithm complexity, log^k n vs n log n

I am developing some algorithm with takes up O(log^3 n). (NOTE: Take O as Big Theta, though Big O would be fine too) I am unsure whereas O(log^3 n), or even O(log^2 n), is considered to be ...
3
votes
2answers
81 views

Is this function O(N+M) or O(N*M)?

def solution(M, A): result = [0] * M maxCount = 0 setAll = 0 for i in range(0,len(A)): if (A[i] == M + 1): setAll += maxCount maxCount = 0 ...
0
votes
0answers
68 views

find the max in less that linear time?

In a civil engineering company, a drafting engineer saves a drawing file once the engineer is done with a task. The productivity of an engineer is measured by how long the engineer spends to ...
1
vote
1answer
72 views

Can an element x, be found in a sorted array of size n using n Common CREW processors in constant time O(1)?

Given an n-element array, how to find position of element x in that array using common CRCW processors in constant time? Let's assume x is not in the given array. Is it even possible to find the ...
1
vote
1answer
71 views

Big O Algorithm efficiency comparison

Maybe this is a stupid question, but I am trying to find the math rule to prove that: O(n^2.3) is less efficient than O(n^2logn)
0
votes
3answers
209 views

How to calculate the algorithmic complexity of Python functions?

When required to show how efficient the algorithm is, we need to show the algorithmic complexity of functions - Big O and so on. In Python code, how can we show or calculate the bounds of functions?
1
vote
1answer
319 views

Time complexity of this primality testing algorithm?

I have the following code which determines whether a number is prime: public static boolean isPrime(int n){ boolean answer = (n>1)? true: false; for(int i = 2; i*i <= n; ++i) { ...
0
votes
1answer
72 views

BIG-O Proof To Solve

I asked a question about Big-Oh / Big-Theta but they acquired constants in them It is Big Oh and does not have any visible constants in it so I don't know where to start off with this since it is a ...
2
votes
1answer
616 views

Big Oh Notation Proof [closed]

The question is to prove that f(n) = 4n5 - 17n4 - 33n3 - 13n2 is in Θ(n5) What I tried to do what split up 4n5 into two separate constants (2n5 + 2n5) and make that whole equation greater than ...
2
votes
1answer
314 views

The complexity of n choose 2 is in Theta (n^2)?

I'm reading Introduction to Algorithms 3rd Edition (Cormen and Rivest) and on page 69 in the "A brute-force solution" they state that n choose 2 = Theta (n^2). I would think it would be in Theta (n!) ...
0
votes
2answers
54 views

Why is O(n) equal to O(2n)

I understand that O(N) is essentially equal to O(cN) where c='some constant'. But if N = c. Doesn't that make it O(N)^2. Does this hold as c increases, or is there some formal limit.
-1
votes
1answer
81 views

What is the complexity of this code that repeatedly subtracts values?

I have this code and want to know its time complexity: int N,M; // let N and M be any two numbers while(N != M && N > 0 && M > 0){ if(N > M)N -= M; ...
0
votes
1answer
340 views

average case complexity of ternary search

I need to solve for the average case complexity of ternary search. In the worst case you would do two comparisons so I assume worst case complexity looks like this: C(n) = C(n/3) + 2 which can ...
3
votes
2answers
145 views

Complexity of inefficient divide and conquer algorithm

An instance of size n is divided into p≥2 instances each of size n-a where a is a small integer and p is a constant. The computation cost of this operation (i.e. dividing into instances) is a unit, ...
2
votes
1answer
140 views

Complexity of a particular divide and conquer algorithm

An algorithm decomposes (divides) a problem of size n into b sub-problems each of size n/b where b is an integer. The cost of decomposition is n, and C(1)=1. Show, using repeated substitution, that ...
1
vote
1answer
369 views

Big-O notation for if statements?

I was wondering what the Big O notation for this would be. I know the for loop is O(n). I wasn't sure if the if statements were O(n log n). If so, doesn't that make the run time complexity (n)*((n log ...
-2
votes
2answers
246 views

What is the tight bound for big O? [closed]

When referring to big o, what is considered the tight bound? For example, in the function, f(n) = 10c7n^3 + 10c4nlog(n)) // This function represents the number of operations in terms of n // ...
0
votes
3answers
194 views

Best and Worst case Complexity

Please help me finding the complexity of following code: public static int method(int[] array, int n) { for (i = 1; i < n; i++) for (j = 1; j <= i; j++) if (array[j] ...