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.

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

Recent questions in Algorithms

2 votes

9 answers

NIELIT 2016 MAR Scientist B - Section C: 12
Which of the following sorting algorithms does not have a worst case running time of $O(n^2)$? Insertion sort. Merge sort. Quick sort. Bubble sort.

Which of the following sorting algorithms does not have a worst case running time of $O(n^2)$? Insertion sort. Merge sort. Quick sort. Bubble sort.

asked Mar 31 in Algorithms Lakshman Patel RJIT 391 views

0 votes

1 answer

NIELIT 2016 MAR Scientist B - Section C: 19
If there is in NP-Complete language L whose complement is in NP, then complement of any language in NP is in P NP both (A) and (B) None of these

If there is in NP-Complete language L whose complement is in NP, then complement of any language in NP is in P NP both (A) and (B) None of these

asked Mar 31 in Algorithms Lakshman Patel RJIT 154 views

0 votes

3 answers

NIELIT 2016 MAR Scientist B - Section C: 22
Time complexity of an algorithm $T(n)$, where $n$ is the input size is given by $\begin{array}{ll}T(n) & =T(n-1)+1/n, \text{ if }n>1\\ & =1, \text{ otherwise} \end{array}$ The order of this algorithm is $\log n$ $n$ $n^2$ $n^n$

Time complexity of an algorithm $T(n)$, where $n$ is the input size is given by $\begin{array}{ll}T(n) & =T(n-1)+1/n, \text{ if }n>1\\ & =1, \text{ otherwise} \end{array}$ The order of this algorithm is $\log n$ $n$ $n^2$ $n^n$

asked Mar 31 in Algorithms Lakshman Patel RJIT 160 views

0 votes

1 answer

NIELIT 2016 DEC Scientist B (IT) - Section B: 5
Two alternative packages $A$ and $B$ are available for processing a database having $10k$ records. Package $A$ requires $0.0001n2$ time units and package $B$ requires $10 n \log 10n$ time units to process $n$ records. What is the smallest value of $k$ for which package $B$ will be preferred over $A$? $12$ $10$ $6$ $5$

Two alternative packages $A$ and $B$ are available for processing a database having $10k$ records. Package $A$ requires $0.0001n2$ time units and package $B$ requires $10 n \log 10n$ time units to process $n$ records. What is the smallest value of $k$ for which package $B$ will be preferred over $A$? $12$ $10$ $6$ $5$

asked Mar 31 in Algorithms Lakshman Patel RJIT 97 views

0 votes

1 answer

NIELIT 2016 DEC Scientist B (IT) - Section B: 7
What is the type of the algorithm used in solving the $4$ Queens problem? Greedy Branch and Bound Dynamic Backtracking

What is the type of the algorithm used in solving the $4$ Queens problem? Greedy Branch and Bound Dynamic Backtracking

asked Mar 31 in Algorithms Lakshman Patel RJIT 94 views

0 votes

2 answers

NIELIT 2016 DEC Scientist B (IT) - Section B: 8
Selection sort, quick sort is a stable sorting method True,True False,False True,False False,True

Selection sort, quick sort is a stable sorting method True,True False,False True,False False,True

asked Mar 31 in Algorithms Lakshman Patel RJIT 111 views

0 votes

1 answer

NIELIT 2016 DEC Scientist B (IT) - Section B: 12
Which of the following sorting procedures is the slowest? Quick Sort Merge Sort Shell Sort Bubble Sort

Which of the following sorting procedures is the slowest? Quick Sort Merge Sort Shell Sort Bubble Sort

asked Mar 31 in Algorithms Lakshman Patel RJIT 79 views

0 votes

1 answer

NIELIT 2016 DEC Scientist B (IT) - Section B: 16
The recurrence relation capturing the optimal execution time of the Towers of Hanoi problem with $n$ discs is: $T(n)=2T(n-2)+2$ $T(n)=2T(n/2)+1$ $T(n)=2T(n-1)+n$ $T(n)=2T(n-1)+1$

The recurrence relation capturing the optimal execution time of the Towers of Hanoi problem with $n$ discs is: $T(n)=2T(n-2)+2$ $T(n)=2T(n/2)+1$ $T(n)=2T(n-1)+n$ $T(n)=2T(n-1)+1$

asked Mar 31 in Algorithms Lakshman Patel RJIT 80 views

0 votes

1 answer

NIELIT 2016 DEC Scientist B (IT) - Section B: 27
Complexity of Kruskal's algorithm for finding minimum spanning tree of an undirected graph containing $n$ vertices and $m$ edges if the edges are sorted is: $O(mn)$ $O(m)$ $O(m+n)$ $O(n)$

Complexity of Kruskal's algorithm for finding minimum spanning tree of an undirected graph containing $n$ vertices and $m$ edges if the edges are sorted is: $O(mn)$ $O(m)$ $O(m+n)$ $O(n)$

asked Mar 31 in Algorithms Lakshman Patel RJIT 81 views

0 votes

1 answer

NIELIT 2016 DEC Scientist B (IT) - Section B: 52
Find the odd one out Merge Sort TVSP Problem Knapsack Problem OBST Problem

Find the odd one out Merge Sort TVSP Problem Knapsack Problem OBST Problem

asked Mar 31 in Algorithms Lakshman Patel RJIT 85 views

0 votes

1 answer

NIELIT 2016 DEC Scientist B (CS) - Section B: 7
The Knapsack problem belongs to which domain of problems? Optimization NP complete Linear Solution Sorting

The Knapsack problem belongs to which domain of problems? Optimization NP complete Linear Solution Sorting

asked Mar 31 in Algorithms Lakshman Patel RJIT 135 views

0 votes

2 answers

NIELIT 2016 DEC Scientist B (CS) - Section B: 12
The running time of Quick sort algorithm depends heavily on the selection of: No. of inputs Arrangement of elements in an array Size of elements Pivot Element

The running time of Quick sort algorithm depends heavily on the selection of: No. of inputs Arrangement of elements in an array Size of elements Pivot Element

asked Mar 31 in Algorithms Lakshman Patel RJIT 83 views

0 votes

2 answers

NIELIT 2016 DEC Scientist B (CS) - Section B: 16
Two main measures for the efficiency of an algorithm are: Processor and Memory Complexity and Capacity Time and Space Data and Space

Two main measures for the efficiency of an algorithm are: Processor and Memory Complexity and Capacity Time and Space Data and Space

asked Mar 31 in Algorithms Lakshman Patel RJIT 71 views

0 votes

1 answer

NIELIT 2016 DEC Scientist B (CS) - Section B: 27
What is the solution to the recurrence $T(n)=T \bigg (\dfrac{n}{2} \bigg )+n$? $O(\log n)$ $O(n)$ $O(n\log n)$ None of these

What is the solution to the recurrence $T(n)=T \bigg (\dfrac{n}{2} \bigg )+n$? $O(\log n)$ $O(n)$ $O(n\log n)$ None of these

asked Mar 31 in Algorithms Lakshman Patel RJIT 91 views

0 votes

1 answer

NIELIT 2016 DEC Scientist B (CS) - Section B: 52
The concept of order Big O is important because It can be used to decide the best algorithm that solves a given problem It is the lower bound of the growth rate of algorithm It determines the maximum size of a problem that can be solved in a given amount of time Both (A) and (B)

The concept of order Big O is important because It can be used to decide the best algorithm that solves a given problem It is the lower bound of the growth rate of algorithm It determines the maximum size of a problem that can be solved in a given amount of time Both (A) and (B)

asked Mar 31 in Algorithms Lakshman Patel RJIT 72 views

0 votes

2 answers

NIELIT 2017 July Scientist B (IT) - Section B: 59
What is the running time of the following function (specified as a function of the input value)? void Function(int n){ int i=1; int s=1; while(s<=n){ i++; s=s+i; } } $O(n)$ $O(n^2)$ $O(1)$ $O(\sqrt n)$

What is the running time of the following function (specified as a function of the input value)? void Function(int n){ int i=1; int s=1; while(s<=n){ i++; s=s+i; } } $O(n)$ $O(n^2)$ $O(1)$ $O(\sqrt n)$

asked Mar 30 in Algorithms Lakshman Patel RJIT 189 views

0 votes

1 answer

NIELIT 2017 July Scientist B (IT) - Section B: 60
$0/1$-Knapsack is a well known problem where, it is desired to get the maximum total profit by placing $n$ items (each item is having some weight and associated profit) into a knapsack of capacity $W$. The table given below shows the weights and associated ... $19$ $18$ $17$ $20$

$0/1$-Knapsack is a well known problem where, it is desired to get the maximum total profit by placing $n$ items (each item is having some weight and associated profit) into a knapsack of capacity $W$. The table given below shows the weights and associated profits for $5$ items, where one unit of ... $19$ $18$ $17$ $20$

asked Mar 30 in Algorithms Lakshman Patel RJIT 59 views

0 votes

1 answer

NIELIT 2017 July Scientist B (CS) - Section B: 9
The worst case running times of Insertion sort, Merge sort and Quick sort, respectively, are $\Theta(n \log n),\Theta(n \log n) \text{ and } \Theta(n^2)$ $\Theta(n^2),\Theta(n^2)\text{ and } \Theta(n \log n)$ $\Theta(n^2), \Theta(n \log n)\text{ and } \Theta(n \log n)$ $\Theta(n^2),\Theta(n\log n) \text{ and } \Theta(n^2)$

The worst case running times of Insertion sort, Merge sort and Quick sort, respectively, are $\Theta(n \log n),\Theta(n \log n) \text{ and } \Theta(n^2)$ $\Theta(n^2),\Theta(n^2)\text{ and } \Theta(n \log n)$ $\Theta(n^2), \Theta(n \log n)\text{ and } \Theta(n \log n)$ $\Theta(n^2),\Theta(n\log n) \text{ and } \Theta(n^2)$

asked Mar 30 in Algorithms Lakshman Patel RJIT 73 views

0 votes

1 answer

NIELIT 2017 July Scientist B (CS) - Section B: 39
Which of the following standard algorithms is not Dynamic Programming based? Bellman-Ford Algorithm for single source shortest path Floyd Warshall Algorithm for all pairs shortest paths $0-1$ Knapsack problem Prim’s Minimum Spanning Tree

Which of the following standard algorithms is not Dynamic Programming based? Bellman-Ford Algorithm for single source shortest path Floyd Warshall Algorithm for all pairs shortest paths $0-1$ Knapsack problem Prim’s Minimum Spanning Tree

asked Mar 30 in Algorithms Lakshman Patel RJIT 91 views

0 votes

0 answers

NIELIT 2017 July Scientist B (CS) - Section B: 41
Four Matrices $M_1, M_2, M_3$ and $M_4$ of dimensions $ p \times q$, $q \times r$, $r \times s$ and $s \times t$ respectively can be multiplied in several ways with different number of total scalar multiplications. For example, when ... $t=80$, then the number of scalar multiplications needed is $248000$ $44000$ $19000$ $25000$

Four Matrices $M_1, M_2, M_3$ and $M_4$ of dimensions $ p \times q$, $q \times r$, $r \times s$ and $s \times t$ ... $t=80$, then the number of scalar multiplications needed is $248000$ $44000$ $19000$ $25000$

asked Mar 30 in Algorithms Lakshman Patel RJIT 57 views

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