# Tagged Questions

In the analysis of algorithms, the Master theorem provides a cookbook solution in asymptotic terms (using Big O notation) for recurrence relations of types that occur in the analysis of many divide and conquer algorithms.

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### Verify solutions using induction/substitution in recurrence equations

I have a few problems that I have been trying to figure out but I can't for the life of me. I know they are supposed to be easy but I am finding this stuff difficult to grasp. Any help with the ...
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### Divide and conquer algorithm to find the counterfeit coin in O(logn)

Hi !! I tried to find information and examples to solve this problem but couldn't find it.. This is my preparation questions for exam and not assignment.Could someone explain the steps to solve this ...
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### Master Theorem. Really confused

I thought that I understood how to use Master Theorem but apparently I don't. So here it is: T(n) = 16 T(n/2) +2(n^4) T(n) = aT(n/b) + f(n^c) a=16 b=2 log base b of a = log ...
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### Time complexity of a Divide and Conquer

I have Master theorem for finding complexities but the problem is Master theorem says For a recurrence of form T(n) = aT(n/b) + f(n) where a >= 1 and b > 1 There are following three cases: ...
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### complexity analysis of recursive code

function(int n) { if(n<=1) return; for(int i=1;i<=3;i++) function(n-1); } now to calculate complexity of this question we have to use master theorem of subtraction.Now I deduced the ...
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### Creating a recursive formula for a piece of code

I'm doing some homework and I'm struggling with a specific question. There is a similar question in my assignment so I need to get the hang of this. Here's the code: public static double ...
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### How to calculate time complexity for recursion

def findChange(availableChanges, amonut): if amonut == 0: return 1 if amonut < 0 or not availableChanges: return 0 curChange = availableChanges[-1] return ...
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### Is (log n)^2 same as log(^2) n? [closed]

Is log(^2) n = log (log n) or (log n)^2? I was reading about masters theorem and then encountered a video here. Here, Mr Ravula said that log(^2) n is not (log n * log n), but later in his video, ...
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### Solving master theorem with log n - confusion

I'm currently trying to solve this relation with the master theorem: T(n) = 2T(n/4) + log n I already figured out that a = 2 and b = 4, but I'm confused about the log n. My script say: c(n) ...
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### Master Theorem Case 3 Example Algorithms

While learning the Master theorem I'm having trouble coming up with a real-world algorithm as an example, whose recurrence strategy would fall into Case 3. Can you suggest any links where I can read ...
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### time complexity of relation T(n) = T(n-1) + T(n/2) + n

for the relation T(n) = T(n-1) + T(n/2) + n can I first solve the term (T(n-1) + n) which gives O(n^2), then solve the term T(n/2) + O(n^2) ? according to the master theorem which also gives ...
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### Run-time of these recurrence relations

How do you calculate a tight bound run time for these relations? T(n)=T(n-3)+n^2 T(n) = 4T(n/4)+log^3(n) For the first one I used the substitution method which gave me n^2 but wasn't right and the ...
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### Master Theorem with constant

Is this Formula a case 2 from the Master Theorem T(n) = 2 * T(n/2) + 3 a = 2; b = 2; (f(n) = 3^1) ? so logba = 1 and c = 1 in this case is it master theorem case 2 ? or should i ignore the ...
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### Solving T (n) = √2*T(n/2) + log n using master theorem

The question is : T(n) = √2*T(n/2) + log n I'm not sure whether the master theorem works here, and kinda stuck. Thanks in advance!
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### Runtime Complexity | Recursive calculation using Master's Theorem

So I've encountered a case where I have 2 recursive calls - rather than one. I do know how to solve for one recursive call, but in this case I'm not sure whether I'm right or wrong. I have the ...
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### Master theorem with logn

Here's a problem. I am really confused about the c being equal to 0.5 part. Actually overall I am confused how the logn can become n^(0.5). Couldn't I just let c be equal to 100 which would mean ...
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### Find the running cost of the algorithm

I am unable to solve the following recurrence T(n) = 3T(n/5) + lg^2 n my work: applying master theorem a=3 b=5 n^log5^3n= n^log^0.65 this leads to n^0=1 this isn't comparable with log^2n I ...
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### complexity of the function T(N)=T(n/2)+2^n

I am a student taking the algorithm course at university. I know how to apply a few recursive techniques to find the running cost of simpler functions but the 2^n in this question is causing me ...
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### Complexity of trominoes algorithm

What is or what should be complexity of (divide and conquer) trominoes algorithm and why? I've been given a 2^k * 2^k sized board, and one of the tiles is randomly removed making it a deficient ...
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### need a definition in Isabelle to show that two partial functions never produce the same output

I'm using the mathematical toolkit in HOL-Z to discharge some Isabelle predicates. specifically I'm using the partial function definition to define some of the relations in a Z specification that I'm ...
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### Codesnippet with runtime t(n) ∈ Θ(n^3/2 )

I'm trying to solve an excercise, where I have to write a codesnippet with a t(n) ∈ Θ(n^3/2) runtime. I'm allowed to use recursions, addition, subtraction, division of integers by 2, for loops, if ...
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### Master theorem cases

My question is about Master theorem. Are there any cases in which a >= 1 and b > 1, but Master theorem does not work? Can you give an example, please?
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### Applying Master Theorem

I am trying to study for my exams by using looking at my midterm. One thing I do not understand fully is the Master Theorem. I understand that there are three cases, and can apply them when they are ...
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### Recurrance relation: T (n/16) + n log n

Can the master theorem be applied? Or say for T (n) = 2T (n/16) + n log n, how is the master theorem applied here? I get a = 2, b = 16 and I am not sure about c and k.
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### Is nlog(n) Big Theta(n)? Master Theorem

Is n⋅log(n) in Θ(n)? Im asking this because I am solving reccurrences using the master theorem. The equation is T(n) = 2T(n/2) + n log n The solution says that it fulfills case 2, meaning T(n) = ...
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### Apply master theorem on T(n) = T(n/2) + n

I was just trying my hand on Master Theorem and got a little confused when I was trying to evaluate T(n) = T(n/2) + n. Using Master theorem, the answer evaluates to O(n). But just go through the ...
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### How do I calculate the worst-case (theoretical) running time of this recursive function?

I am analyzing this block of code to review how to calculate the worst-case theoretical running time. I am using the Master Theorem. Could someone give me a step-by-step solution as to how to arrive ...
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### issues in the proof of master theorem

I am reading the book CLRS(Introduction To Alglorithms , 3rd edition) , and find there seems to be a error in the proof of master theorem . In page 104 , in order to extend the proof to all integer, ...
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### Finding all heavy coins in 0(log^2(n)) [duplicate]

Suppose you are given n coins, some of which are heavy and the others light. All heavy coins have the same weight, as do all the light coins, and the weight of a heavy coin is strictly greater than ...
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### If f(n) contains some term of log(n), is it possible to solve this by the Master Method?

The Master Method is a direct way to get the solution. The Master Method works only for following type of recurrences or for recurrences that can be transformed to following type. T(n) = a T(n / b) + ...
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### Master Theorem and substitution method on (n-1)

Which method should I use to solve this recurrence ? T(n)= { Θ(1) if n = 1 { T(n-1) + Θ(n) if n > 1
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### Guessing asymptotic upper bound by recursion tree. Verifying by substutution method and by Master Theorem

My assignment is as follows: Find a guress for an asymptotic upper bound for the recurrence by using recursion trees. Verify the asymptotic upper bound by: 1: Substitution method 2: Master Theorem ...
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### Recurence related to master theorem T(n)=T(n^(1/2))+1

In masters theorem were given a "plug-in" formula to find the big O, given it satisfies some condition. However, what if we have problems like the following below? Can anyone show me how to do a step ...
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### Applying the Master Theorem when there are three terms?

How would I go about solving this kind of recurrence using the Master Theorem? T(n) = 4T(n/2) + n2 + logn I have no idea how to go about doing this, but I'm pretty sure it is possible to solve ...
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### Algorithm complexity, solving recursive equation

I'm taking Data Structures and Algorithm course and I'm stuck at this recursive equation: T(n) = logn*T(logn) + n obviously this can't be handled with the use of the Master Theorem, so I was ...
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### Solving a complex recurrence relation

How to solve the below recurrence relation? T(n) = 2T(root(n)) + logn/loglogn if n > 4 T(n) = 1 if n <= 4 Preferably by master theorem otherwise by any method. I know Master Theorem fails,But ...
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### What is the runtime of the following recursive algorithm using the Master Theorem?

I'm not particularly sure about the runtime of the following algorithm: T(n) = 2T(n/2) + n/logn I think this would be O(n) by the Master Theorem but I don't know whether n/logn is asymptotically ...
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### Master theorem - second case issue

Given the following recursive equations: T(n) = 5T(n/5)+(5sin^5(5n^5)+5)*n T(n) = T(n/4)+2sin^2(n^4) I can easily see that both equations fit the 2nd case of the master theorem, but due to the ...
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### how to find the time complexity of this algorithm?

int multiply(int a[],int low,int high,int modulus) { if(low==high) return (a[low]); else { int mid = (low+high)/2; int x = multiply(a, low, mid, modulus) % modulus; ...
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### Randomized Quick Sort Pivot selection with 25%-75% split

I came to know that in case of Randomized quick sort, if we choose the pivot in such a way that it will at least give the split in the ration 25%-75%, then the run time is O(n log n). Now I also came ...
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### Master method algorithm analysis of pseudocode

How do you find the c/d constant used in the master theorem by examining this pseudo-code? FastPower(a,b) : if b = 1 return a otherwise c := a*a ans := ...
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### Polynomial greatness in the Master-Theorem

given the equation T(n)=sqrt(2)T(n/2)+log(n). The solution points to case 1 of the M.T. with a complexity class of O(sqrt(n)). However after my understanding log(n) is polynomial greater then sqrt(n). ...
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### Solving the recurrence T(n) = T(n / 2) + O(1) using the Master Theorem? [closed]

I'm trying to solve a recurrence relation to find out the complexity of an algorithm using the Master Theorem and its recurrences concepts, how can I prove that: T(n) = T(n/2)+O(1) is T(n) = ...
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### How to calculate complexity from special Mergesort

i try to calculate the complexity from Mergesort. Standard Mergesort has the recursion T(n) = T(n/2)+T(n/2)+n So its easy to calculate with the Master-theorem. But my question is, how to calculate a ...
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### Master Theorem with Log n recombination

How I understand the master theorem, an algorithm can be defined recursively as: a T(n/b) + O(n^d) Where a is the number of subproblems, n/b is the size of the subproblems, and O(n^d) is the ...
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### Big Theta Notation - simplifying

I have used the Master Theorem to solve recurrence relations. I have gotten it down to Θ(3n2-9n). Does this equal Θ(n2)? I have another recurrence for which the solution is Θ(2n3 - 1002). In BigTheta ...
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### Master's theorem with f(n)=log n

For master's theorem T(n) = a*T(n/b) + f(n) I am using 3 cases: If a*f(n/b) = c*f(n) for some constant c > 1 then T(n) = (n^log(b) a) If a*f(n/b) = f(n) then T(n) = (f(n) log(b) n) If a*f(n/b) = ...
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### Runtime of Recurrence relation [closed]

Just had this on a quiz: T(n) = 4T(sqrt(n)) + 5 I simplified it using substitution and got F(k) = 4F(k/2) + 5 Using the master theorem I guessed it was O(logn). Is this accurate?