Big-Theta is an asymptotic notation which means that a function is loosely bounded from above and from below by another function. In other words, a function f is Big-Theta of a function g if f is Big-Oh of g and Big-Omega of g.

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How can the worst case for an algorithm have different bounds?

I've been trying to figure this out all day. Some other threads address this, but I really don't understand the answers. There are also many answers that contradict one another. I understand that an ...
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3answers
264 views

Is an algorithm with asymptotic runtime complexity of θ(n) always faster runtime than a similar algorithm with runtime complexity of θ(n^2 )?

If so can you provide explicit examples? I understand that an algorithm like Quicksort can have O(n log n) expected running time, but O(n^2) in the worse case. I presume that if the same principle of ...
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2answers
647 views

Θ notation for the sum of a geometric series

I have a question about geometric series. Why is 1 + c + c2 + ... + cn = Θ(cn) when c > 1? I understand why it is Θ(n) if c = 1 and it is Θ(1) if c < 1, but I just can't figure out why it is ...
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2answers
64 views

Running time of piece of Java code

I'm trying to figure out the running time of the following snippet of Java code: static void counter(int N) { int count = 0; for (int i = 0; i < N; i += 1) { for (int j = i + 1; j ...
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1answer
653 views

Expressing (x^3)/1000 - 100*x^2 - 100*x + 3 in big theta notation

Hello can somebody help me in expressing (x^3)/1000 - 100*x^2 - 100*x + 3 in big theta notation. It looks like of x^3 to me, but obviously at x = 0 obviously this polynomial gives a value of 3. ...
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1answer
307 views

How do I prove theta(log n)=o(log n)?

I'm solving a question from CLRS where we need to prove that (ceil(lg lg n))! is polynomially bounded. Let g(n)=(ceil(lg lg n))! lg(g(n))=lg((ceil(lg lg n))!) =theta(ceil(lg lg n) * lg ...
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1answer
29 views

How do decide whether 5^n o, Θ, or ω of 7^n?

As a homework problem, I need to decide whether 5n is little-o, Θ, or little-ω of 7n with mathematical justification. I then need to repeat this after taking the logarithms of both sides. ...
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695 views

Big Theta Notation and Selection Sort

What would be the best-case and worst-case complexity in Big-Theta (T) notation of the selection sort algorithm when the array grows by repeatedly appending a 19? For instance: [ 19, 13, 7, 19, 12, ...
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1answer
38 views

How to find the recurrence formula of an algorithm?

I'm currently talking an algorithms class and really struggling to understand how to even come up with recurrence formulas. say i have a a double nested for loop algorithm for finding the sum of ...
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39 views

Ordering a list of Functions using Big O

I am currently working on some algorithms homework and I have a few questions I would like clarified so that I can make sure that the work I am doing is correct. One of the questions asks us to ...
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1answer
28 views

Show the following is correct using big O and big Omega

I'm a little confused on how to go about solving this problem Show that the following is correct: 5n^2 - 6n = Theta(n^2) I understand that I'm supposed to set up an inequality but not sure where to ...
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138 views

big theta notation of harmonic series

i am want to prove that big theta notation of the harmonic series is theta(logn). i wnat to use with integral to show that. i'm tried to show this in the way: **ln(n)=integral [1 to n] dx/x <= ...
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1answer
100 views

Finding the big theta bound

Give big theta bound for: for (int i = 0; i < n; i++) { if (i * i < n) { for (int j = 0; j < n; j++) { count++; } } else { int k = i; ...
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1answer
48 views

Given a set of intervals, why is the average case for computing pred[i] theta(n logn)?

So I was reading my notes and I don't really get this part: Define f, s as the starting and finishing time of an interval. Sort all intervals by finish time. So suppose we have a set of intervals ...
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lg(n!) = Θ(nlgn) Solving for Big-theta

Show that lg(n!) = Θ(nlgn) how to prove it? I used limit to determine order but I stuck at some point limn to +inf lg(n^n)/lg(n!)
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1answer
51 views

Why small theta asymtotic notation doesn't exists?

This question was asked by our professor and I didn't understand why small theta doesn't exists/ I think I understand this, but how can we mathematically prove that it doesn't exists.
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Trouble analyzing complexity of arbitrary algorithm

I've been reading the CLRS algorithm book and I decided to try out a problem for myself. I've been trying to use a new method to help understand the complexity of the arbitrary algorithm, displayed ...
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37 views

step by step process of finding selection sort big theta notation

I'm having trouble figuring the process of finding the big theta notation for this selection sort sample. I've read online that and the tl;dr's that nested loops means it will = O(n^2)however, I don't ...
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31 views

Calculating time complexity of some pseudocode

Assuming lists N and M have the same length n and s, r, g are constants. What might be the time- and space-complexity in big-theta notation in the following pseudocode? int g(int[] N, int[] M){ ...
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36 views

Finding a theta notation for the following pseudo code

Finding the number of times x=x+1 will be printed in the following code for i=1 to n-1 do for j=1 to 2^i do x=x+1; This is how I did it. When i=1 it would print 2^1 times ...
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20 views

proving or disproving a property of AVL tree

let T be an AVL tree, let Tr and Tl be the and right and left subtrees of the root, let |Tr| and |Tl| be the number of nodes in the sub trees, then |Tl|=Big-Theta(|Tr|). I thought that I proved it ...
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Asymptotic time complexity of recursive function (Theta)

I have been asked to analyze the asymptotic time complexity of the following recursion function: for-all k >= 1 : T(n) = n + T(n/2) + T(n/4) + T(n/8) + .... + T(n/2^k) I was able to prove that: ...
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Better Understanding Big O and Big Theta with a divide and conquer search

A divide and conquer algorithm takes an array of size n as input and makes two recursive calls on arrays of size n/2. Then, after an additional O(n) work, it produces an output. The running ...