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Searching, Sorting, Hashing, Asymptotic worst case time and Space complexity, Algorithm design techniques: Greedy, Dynamic programming, and Divide‐and‐conquer, Graph search, Minimum spanning trees, Shortest paths.

$$\small{\overset{{\large{\textbf{Mark Distribution in Previous GATE}}}}{\begin{array}{|c|c|c|c|c|c|c|c|}\hline
\textbf{Year}&\textbf{2019}&\textbf{2018}&\textbf{2017-1}&\textbf{2017-2}&\textbf{2016-1}&\textbf{2016-2}&\textbf{Minimum}&\textbf{Average}&\textbf{Maximum}
\\\hline\textbf{1 Mark Count}&2&0&2&2&3&3&0&2&3
\\\hline\textbf{2 Marks Count}&2&4&2&3&2&3&2&2.7&4
\\\hline\textbf{Total Marks}&6&8&6&8&7&9&\bf{6}&\bf{7.3}&\bf{9}\\\hline
\end{array}}}$$

0 votes

1 answer

QUICK SORT- SELF DOUBT
In quick sort for sorting of n Numbers, the 75th greatest Element is selected as pivot using $O(n^2)$ time complexity algorithm than what is the worst case time complexity of quick sort. O($n^2$) O($n^3$) O(nlogn) O(n)

asked Sep 2 in Algorithms by ajaysoni1924 Boss (10.3k points) | 92 views

0 votes

1 answer

IIIT BLR TEST 1 : ALGORITHMS 3
Given an array of ( both positive and negative ) integers, $a_0,a_1,….a_{n-1}$ and $l, 1<l<n$. Design a linear time algorithm to compute the maximum product subarray, whose length is atmost $l$.

asked Aug 27 in Algorithms by Shaik Masthan Veteran (62.4k points) | 116 views

0 votes

1 answer

IIIT BLR TEST 1 : ALGORITHMS 2
A 3 way (ternary) min heap is a 3 way ( ternary - each node as atmost three children nodes, left, mid, right ) complete tree with min heap property ( value of the parent is less than the value of the children ) satisfied at every node ... c) In Heapsort, binary heap is preferred over ternary heap. State if this statement is true or false, you must justify your answer.

asked Aug 27 in Algorithms by Shaik Masthan Veteran (62.4k points) | 59 views

0 votes

1 answer

IIIT BLR TEST 1 : ALGORITHMS 1
Solve the following recursions ( in terms of Θ ). T(0) = T(1) = Θ(1) in all of the following. $T(n) = n + \frac{1}{n}\sum_{i=0}^{i=n-1}T(i)$ $T(n) = n + \frac{2}{n}\sum_{i=0}^{i=n-1}T(i)$ $T(n) = n + \frac{4}{n}\sum_{i=0}^{i=n/2}T(i)$ $T(n) = n + \frac{40}{n}\sum_{i=0}^{i=n/5}T(i)$

asked Aug 27 in Algorithms by Shaik Masthan Veteran (62.4k points) | 59 views

+2 votes

2 answers

UGCNET-June-2019-II-61
Match List-I with List-II: ... (d)-(ii) (a) - (ii); (b)-(i); (c)-(iv); (d)-(iii) (a) - (iii); (b)-(i); (c)-(iv); (d)-(ii)

asked Jul 2 in Algorithms by Arjun Veteran (418k points) | 97 views

+3 votes

2 answers

UGCNET-June-2019-II-62
There are many sorting algorithms based on comparison. The running time of heapsort algorithm is $O(n \text{lg}n)$. Like $P$, but unlike $Q$, heapsort sorts in place where $(P,Q)$ is equal to Merge sort, Quick sort Quick sort, insertion sort Insertion sort, Quick sort Insertion sort, Merge sort

asked Jul 2 in Algorithms by Arjun Veteran (418k points) | 77 views

+3 votes

1 answer

UGCNET-June-2019-II-64
Which of the following is best running time to sort $n$ integers in the range $0$ to $n^2-1$? $O(\text{lg } n)$ $O(n)$ $O(n\text { lg }n)$ $O(n^2)$

asked Jul 2 in Algorithms by Arjun Veteran (418k points) | 82 views

+1 vote

1 answer

UGCNET-June-2019-II-65
Which of the following is application of depth-first search? Only topological sort Only strongly connected components Both topological sort and strongly connected components Neither topological sort nor strongly connected components

asked Jul 2 in Algorithms by Arjun Veteran (418k points) | 48 views

+2 votes

2 answers

UGCNET-June-2019-II-66
Consider double hashing of the form $h(k,i)=(h_1(k)+ih_2(k)) \text{mod m}$ where $h_{1}(k) = \text{k mod m} \ , \ \ h_{2}(k)=1+(\text{k mod n})$ where $n=m-1$ and $m=701$. For $k=123456$, what is the difference between first and second probes in terms of slots? $255$ $256$ $257$ $258$

asked Jul 2 in Algorithms by Arjun Veteran (418k points) | 63 views

+1 vote

0 answers

UGCNET-June-2019-II-67
Consider the complexity class $CO-NP$ as the set of languages $L$ such that $\overline{L} \in NP$, and the following two statements: $S_1: \: P \subseteq CO-NP$ $S_2: \: \text{ If } NP \neq CO-NP, \text{ then } P \neq NP$ Which of the following is/are correct? Only $S_1$ Only $S_2$ Both $S_1$ and $S_2$ Neither $S_1$ nor $S_2$

asked Jul 2 in Algorithms by Arjun Veteran (418k points) | 30 views

+2 votes

1 answer

UGCNET-June-2019-II-68
Consider the following steps: $S_1$: Characterize the structure of an optimal solution $S_2$: Compute the value of an optimal solution in bottom-up fashion Which of the following step(s) is/are common to both dynamic programming and greedy algorithms? Only $S_1$ Only $S_2$ Both $S_1$ and $S_2$ Neither $S_1$ nor $S_2$

asked Jul 2 in Algorithms by Arjun Veteran (418k points) | 72 views

0 votes

0 answers

Cormen Edition 3 Exercise 10.2 Question 8 (Page No. 241)
Explain how to implement doubly linked lists using only one pointer value $x.np$ per item instead of the usual two (next and prev). Assume that all pointer values can be interpreted as $k$-bit integers, and define $x.np$ ... $INSERT$, and $DELETE$ operations on such a list. Also, show how to reverse such a list in $O(1)$ time.

asked Jun 30 in Algorithms by akash.dinkar12 Boss (41.4k points) | 60 views

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0 answers

Cormen Edition 3 Exercise 10.2 Question 7 (Page No. 241)
Give a $\Theta(n)$ time nonrecursive procedure that reverses a singly linked list of $n$ elements. The procedure should use no more than constant storage beyond that needed for the list itself.

asked Jun 30 in Algorithms by akash.dinkar12 Boss (41.4k points) | 17 views

0 votes

0 answers

Cormen Edition 3 Exercise 10.2 Question 6 (Page No. 241)
The dynamic-set operation $UNION$ takes two disjoint sets $S_1$ and $S_2$ as input, and it returns a set $S=S_1 \cup S_2$ consisting of all the elements of $S_1$ and $S_2$.The sets $S_1$ and $S_2$ are usually destroyed by the operation. Show how to support $UNION$ in $O(1)$ time using a suitable list data structure.

asked Jun 30 in Algorithms by akash.dinkar12 Boss (41.4k points) | 6 views

0 votes

0 answers

Cormen Edition 3 Exercise 10.2 Question 5 (Page No. 240)
Implement the dictionary operations $INSERT$, $DELETE$, and $SEARCH$ using singly linked, circular lists. What are the running times of your procedures?

asked Jun 30 in Algorithms by akash.dinkar12 Boss (41.4k points) | 13 views

0 votes

0 answers

Cormen Edition 3 Exercise 10.2 Question 4 (Page No. 240)
LIST-SEARCH’(L, k) 1 x = L.nil.next 2 while x != L.nil and x.key != k 3 x = x.next 4 return x As written, each loop iteration in the LIST-SEARCH’ procedure requires two tests: one for $x\neq L.nil$ and one for $x.key\neq k$. Show how to eliminate the test for $x\neq L.nil$ in each iteration.

asked Jun 30 in Algorithms by akash.dinkar12 Boss (41.4k points) | 3 views

0 votes

1 answer

Cormen Edition 3 Exercise 10.2 Question 3 (Page No. 240)
Implement a queue by a singly linked list $L$. The operations of $ENQUEUE$ and $DEQUEUE$ should still take $O(1)$ time.

asked Jun 30 in Algorithms by akash.dinkar12 Boss (41.4k points) | 9 views

0 votes

0 answers

Cormen Edition 3 Exercise 10.2 Question 2 (Page No. 240)
Implement a stack using a singly linked list $L$. The operations $PUSH$ and $POP$ should still take $O(1)$ time.

asked Jun 30 in Algorithms by akash.dinkar12 Boss (41.4k points) | 6 views

0 votes

0 answers

Cormen Edition 3 Exercise 10.2 Question 1 (Page No. 240)
Can you implement the dynamic-set operation $INSERT$ on a singly linked list in $O(1)$ time? How about $DELETE$?

asked Jun 30 in Algorithms by akash.dinkar12 Boss (41.4k points) | 5 views

+1 vote

1 answer

Cormen Edition 3 Exercise 10.1 Question 7 (Page No. 236)
Show how to implement a stack using two queues. Analyze the running time of the stack operations.

asked Jun 28 in Algorithms by akash.dinkar12 Boss (41.4k points) | 40 views

0 votes

0 answers

Cormen Edition 3 Exercise 10.1 Question 6 (Page No. 236)
Show how to implement a queue using two stacks. Analyze the running time of the queue operations.

asked Jun 28 in Algorithms by akash.dinkar12 Boss (41.4k points) | 11 views

0 votes

1 answer

Cormen Edition 3 Exercise 10.1 Question 5 (Page No. 236)
Whereas a stack allows insertion and deletion of elements at only one end, and a queue allows insertion at one end and deletion at the other end, a deque (double ended queue) allows insertion and deletion at both ends. Write ... time procedures to insert elements into and delete elements from both ends of a deque implemented by an array.

asked Jun 28 in Algorithms by akash.dinkar12 Boss (41.4k points) | 25 views

0 votes

0 answers

Cormen Edition 3 Exercise 10.1 Question 4 (Page No. 235)
Rewrite ENQUEUE and DEQUEUE to detect underflow and overflow of a queue.

asked Jun 28 in Algorithms by akash.dinkar12 Boss (41.4k points) | 11 views

0 votes

0 answers

Cormen Edition 3 Exercise 10.1 Question 3 (Page No. 235)
ENQUEUE(Q, x) 1 Q[Q.tail] = x 2 if Q.tail == Q.length 3 Q.tail = 1 4 else Q.tail = Q.tail + 1 DEQUEUE(Q) 1 x = Q[Q.head] 2 if Q.head == Q.length 3 Q.head = 1 4 else Q.head = Q.head + 1 5 return x illustrate the ... (Q,4),ENQUEUE(Q,1),ENQUEUE(Q,3),DEQUEUE(Q),ENQUEUE(Q,8),DEQUEUE(Q) on an initially empty queue $Q$ stored in array $Q[1...6]$.

asked Jun 28 in Algorithms by akash.dinkar12 Boss (41.4k points) | 17 views

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0 answers

Cormen Edition 3 Exercise 10.1 Question 2 (Page No. 235)
Explain how to implement two stacks in one array $A[1...n]$ in such a way that neither stack overflows unless the total number of elements in both stacks together is $n$.The $PUSH$ and $POP$ operations should run in $O(1)$ time.

asked Jun 28 in Algorithms by akash.dinkar12 Boss (41.4k points) | 14 views

0 votes

1 answer

Cormen Edition 3 Exercise 10.1 Question 1 (Page No. 235)
STACK-EMPTY(S) 1 if S.top == 0 2 return TRUE 3 else return FALSE PUSH(S , x) 1 S.top = S.top + 1 2 S[S.top] = x POP(S) 1 if STACK-EMPTY(S) 2 error underflow 3 else S.top = S.top - 1 4 return S[S.top + 1] illustrate the result of ... $S$ stored in array $S[1...6]$

asked Jun 28 in Algorithms by akash.dinkar12 Boss (41.4k points) | 26 views

0 votes

1 answer

Cormen Edition 3 Exercise 9.1 Question 2 (Page No. 215)
Prove the lower bound of $\lceil 3n/2\rceil – 2$ comparisons in the worst case to find both the maximum and minimum of $n$ numbers. (Hint: Consider how many numbers are potentially either the maximum or minimum and investigate how a comparison affects these counts.)

asked Jun 28 in Algorithms by akash.dinkar12 Boss (41.4k points) | 9 views

0 votes

1 answer

Cormen Edition 3 Exercise 9.1 Question 1 (Page No. 215)
Show that the second smallest of $n$ elements can be found with $n+\lceil lg\ n \rceil -2$ comparisons in the worst case. (Hint: Also find the smallest element.)

asked Jun 28 in Algorithms by akash.dinkar12 Boss (41.4k points) | 13 views

0 votes

0 answers

Cormen Edition 3 Exercise 8.4 Question 5 (Page No. 204)
A probability distribution function $P(x)$ for a random variable $X$ is defined by $P(x) =Pr\{X\leq x\}$.Suppose that we draw a list of $n$ random variables $X_1,X_2,…,X_n$ from a continuous probability distribution function $P$ that is computable in $O(1)$ time. Give an algorithm that sorts these numbers in linear averagecase time.

asked Jun 28 in Algorithms by akash.dinkar12 Boss (41.4k points) | 32 views

0 votes

0 answers

Cormen Edition 3 Exercise 8.4 Question 4 (Page No. 204)
We are given $n$ points in the unit circle, $P_i=(x_i,y_i)$, such that $0<x_i^2+y_i^2<1$ for $i=1,2, .,n$.Suppose that the points are uniformly distributed; that is, the probability of finding a point in ... the origin. (Hint: Design the bucket sizes in BUCKET-SORT to reflect the uniform distribution of the points in the unit circle.)

asked Jun 28 in Algorithms by akash.dinkar12 Boss (41.4k points) | 11 views

Page:

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