# Tagged Questions

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### Lower Bound Omega Notation

I have to prove that some number \$S\$ is bigger than \$\Omega(|V|)\$, where |V| is the number of vertices. I read the definition of asimptotic notations, but I am still confused with the examples. Fot ...
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### Recurrence relations and asymptotic complexity

I am trying to understand the recurrence relation of f(n) = n^cos n and g(n) = n. I am told that this relation has no asymptotic behavior related to Big O, little o, Big Omega, little omega, or Theta. ...
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### Asymptotic run time complexity of an expression

Can I say that: log n + log (n-1) + log (n-2) + .... + log (n - k) = theta(k * log n)? Formal way to write the above: Sigma (i runs from 0 to k) log (n-i) = theta (k* log n)? If the above ...
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### Runtime of a loop that decays exponentially?

Where n is the input to the function can be any integer. i = n, total = 0; while (i > 0) { for (j=0; j<i; j++) for (k=0; k<i; k++) total++; i = i/4; } What is ...
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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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### Prove f(n) is always O(f(n-1)) [closed]

Assume that f(n) goes to infinity as n goes to infinity. This is a homework problem and I would appreciate an idea/guidance instead of the complete answer.
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### Why is an + b = O(n^2)?

I need to prove that an + b = O(n2) using the formal definition of big-O notation. I have searched several textbooks I own on discrete mathematics as well as several online sources for any examples or ...
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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 many subproblems can this recurrence have while still being faster than an initial recurrence?

I'm having some trouble with an asymptotic analysis question : My Question is to calculate maximum value if 'a' as stated in my question: An Algorith A has running time T(n)= 7T(n/2) + n^2 and ...
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### Determine the asymptotic complexity

If I'm given two functions and asked to find asymptotic complexity for both, what does that mean? Is it O() or Big Theta? For example f1(n)=a^n and f2(n)=n^3+n^2 Should I say that f1 is O(a^n) and ...
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### Collatz conjecture: loose upper/lower bounds? [closed]

This is a problem from my textbook. The Collatz conjecture (or the "3n + 1" problem) works as follows (given some natural number n): while n > 1 do if n is even then n = n / 2 ...
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### Studying for my final: Asymptotic notation [closed]

I am currently studying for my final in algorithms. This is not a homework problem and comes from an old final exam. Show that f(n) = 4logn + log log n is big theta of logn. It is obvious that ...
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### Big Oh Notation prob

Is 3^n = O(2^n) how about (3/2)^n = O(2^n) ? Can you explain the answers? I got false for the first since, 3^n grows faster then 2^n no matter what constant C you multiply 2^n by. And same for the ...
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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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### Regarding complexity of an algorithm with steps C(n+r-1, r-1)

If an algorithm requires C(n+r-1, r-1) steps to solve a problem, where n is the number of input, and r is a constant, does the steps of algorithm consider exponential growth？
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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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### Asymptotic Notation

This is a problem on Asymptotic Notation from the assignment of MIT OpenCourse Introduction to Algorithm: For each of the following statements, decide whether it is always true, never true, or ...
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### What does 'log' represent in asymptotic notation?

I understand the principles of asymptotic notation, and I get what it means when something is O(1) or O(n2) for example. But what does O(log n) mean? or O(n log n) for example?
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### dynamic programming - what's the asymptotic runtime?

I'm teaching myself dynamic programming. It's almost magical. But seriously. Anyway, the problem I worked out was : Given a stairs of N steps and a child who can either take 1, 2, or 3 steps at a ...
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### Big Oh notation (how to write a sentence)

I had a test about asymptotic notations and there was a question: Consider the following: O(o(f(n)) = o(f(n)) Write in words the meaning of the statement, using conventions from asymptotic ...