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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.

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

+1 vote

1 answer

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 (413k points) | 20 views

+2 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 (413k points) | 18 views

+1 vote

0 answers

UGCNET-June-2019-II-64

asked Jul 2 in Algorithms by Arjun Veteran (413k points) | 22 views

0 votes

1 answer

UGCNET-June-2019-II-65

asked Jul 2 in Algorithms by Arjun Veteran (413k points) | 16 views

+1 vote

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 $h_1(k)=1+(k\text{mod}n)$ 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 (413k points) | 19 views

0 votes

0 answers

UGCNET-June-2019-II-67

asked Jul 2 in Algorithms by Arjun Veteran (413k points) | 13 views

0 votes

0 answers

UGCNET-June-2019-II-68

asked Jul 2 in Algorithms by Arjun Veteran (413k points) | 13 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 (40.9k points) | 30 views

0 votes

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 (40.9k points) | 5 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 (40.9k points) | 1 view

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 (40.9k points) | 4 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 (40.9k points) | 1 view

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 (40.9k points) | 2 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 (40.9k points) | 3 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 (40.9k points) | 1 view

0 votes

0 answers

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 (40.9k points) | 22 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 (40.9k points) | 2 views

0 votes

0 answers

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 (40.9k points) | 6 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 (40.9k points) | 4 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 (40.9k points) | 8 views

0 votes

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 (40.9k points) | 5 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 (40.9k points) | 6 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 (40.9k points) | 3 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 (40.9k points) | 6 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 (40.9k points) | 15 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 (40.9k points) | 5 views

0 votes

1 answer

Cormen Edition 3 Exercise 8.4 Question 3 (Page No. 204)
Let $X$ be a random variable that is equal to the number of heads in two flips of a fair coin. What is $E[X^2]$? What is $E^2[X]$?

asked Jun 28 in Algorithms by akash.dinkar12 Boss (40.9k points) | 7 views

0 votes

0 answers

Cormen Edition 3 Exercise 8.4 Question 2 (Page No. 204)
Explain why the worst-case running time for bucket sort is $\Theta(n^2)$. What simple change to the algorithm preserves its linear average-case running time and makes its worst-case running time $O(n\ lg\ n)$?

asked Jun 28 in Algorithms by akash.dinkar12 Boss (40.9k points) | 6 views

0 votes

1 answer

Cormen Edition 3 Exercise 8.4 Question 1 (Page No. 204)
BUCKET-SORT(A) 1 let B[0...n-1] be a new array 2 n = A.length 3 for i - 0 to n - 1 4 make B[i] an empty list 5 for i = 1 to n 6 insert A[i] into list B[nA[i]] 7 for i = 0 to n - 1 8 sort list B[i] with ... ,B[n-1] together in order illustrate the operation of BUCKET-SORT on the array $A=\langle .79,.13,.16,.64,.39,.20,.89,.53,.71,.42\rangle$

asked Jun 28 in Algorithms by akash.dinkar12 Boss (40.9k points) | 5 views

+1 vote

1 answer

Cormen Edition 3 Exercise 8.3 Question 4 (Page No. 200)
Show how to sort $n$ integers in the range $0$ to $n^3-1$ in $O(n)$ time.

asked Jun 28 in Algorithms by akash.dinkar12 Boss (40.9k points) | 21 views

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title	title:apple
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force match	+apple
views	views:100
score	score:10
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is accepted	isaccepted:true
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