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

0 votes

1 answer

NIELIT 2016 MAR Scientist C - Section C: 18
Two alternative package $A$ and $B$ are available for processing a database having $10^{k}$ records. Package $A$ requires $0.0001 n^{2}$ time units and package $B$ requires $10n\log _{10}n$ 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 package $A$ and $B$ are available for processing a database having $10^{k}$ records. Package $A$ requires $0.0001 n^{2}$ time units and package $B$ requires $10n\log _{10}n$ 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 Apr 2 in Algorithms Lakshman Patel RJIT 68 views

0 votes

1 answer

NIELIT 2016 MAR Scientist C - Section C: 51
The most efficient algorithm for finding the number of connected components in a $n$ undirected graph on $n$ vertices and $m$ edges has time complexity $\Theta (n)$ $\Theta (m)$ $\Theta (m+n)$ $\Theta (mn)$

The most efficient algorithm for finding the number of connected components in a $n$ undirected graph on $n$ vertices and $m$ edges has time complexity $\Theta (n)$ $\Theta (m)$ $\Theta (m+n)$ $\Theta (mn)$

asked Apr 2 in Algorithms Lakshman Patel RJIT 59 views

0 votes

1 answer

NIELIT 2016 MAR Scientist C - Section C: 53
An element in an array $X$ is called a leader if it is greater than all elements to the right of it in $X$. The best algorithm to find all leaders in an array solves it in linear time using a left to right pass of the array solves in linear time ... the array solves it using divide and conquer in time $\theta (n\log n)$ solves it in time $\theta (n^{2})$

An element in an array $X$ is called a leader if it is greater than all elements to the right of it in $X$. The best algorithm to find all leaders in an array solves it in linear time using a left to right pass of the array solves in linear time using a right to left pass of the array solves it using divide and conquer in time $\theta (n\log n)$ solves it in time $\theta (n^{2})$

asked Apr 2 in Algorithms Lakshman Patel RJIT 40 views

0 votes

1 answer

NIELIT 2017 OCT Scientific Assistant A (IT) - Section C: 2
An algorithm is made up pf two modules $M1$ and $M2.$ If order of $M1$ is $f(n)$ and $M2$ is $g(n)$ then the order of algorithm is $max(f(n),g(n))$ $min(f(n),g(n))$ $f(n) + g(n)$ $f(n) \times g(n)$ [closed]

An algorithm is made up pf two modules $M1$ and $M2.$ If order of $M1$ is $f(n)$ and $M2$ is $g(n)$ then the order of algorithm is $max(f(n),g(n))$ $min(f(n),g(n))$ $f(n) + g(n)$ $f(n) \times g(n)$

asked Apr 1 in Algorithms Lakshman Patel RJIT 248 views

0 votes

1 answer

NIELIT 2017 OCT Scientific Assistant A (IT) - Section B: 14
The running time of an algorithm $T(n),$ where $’n’$ is the input size , is given by $T(n) = 8T(n/2) + qn,$ if $n>1$ $= p,$ if $n = 1$ Where $p,q$ are constants. The order of this algorithm is $n^{2}$ $n^{n}$ $n^{3}$ $n$ [closed]

The running time of an algorithm $T(n),$ where $’n’$ is the input size , is given by $T(n) = 8T(n/2) + qn,$ if $n>1$ $= p,$ if $n = 1$ Where $p,q$ are constants. The order of this algorithm is $n^{2}$ $n^{n}$ $n^{3}$ $n$

asked Apr 1 in Algorithms Lakshman Patel RJIT 156 views

0 votes

2 answers

NIELIT 2017 OCT Scientific Assistant A (IT) - Section B: 36
The average search time for hashing with linear probing will be less if the load factor Is far less than one Equals one Is far greater than one None of the above

The average search time for hashing with linear probing will be less if the load factor Is far less than one Equals one Is far greater than one None of the above

asked Apr 1 in Algorithms Lakshman Patel RJIT 106 views

0 votes

3 answers

NIELIT 2017 OCT Scientific Assistant A (CS) - Section C: 4
The running time of an algorithm $T(n),$ where $’n’$ is the input size , is given by $T(n) = 8T(n/2) + qn,$ if $n>1$ $ = p,$ if $n = 1$ Where $p,q$ are constants. The order of this algorithm is $n^{2}$ $n^{n}$ $n^{3}$ $n$

The running time of an algorithm $T(n),$ where $’n’$ is the input size , is given by $T(n) = 8T(n/2) + qn,$ if $n>1$ $ = p,$ if $n = 1$ Where $p,q$ are constants. The order of this algorithm is $n^{2}$ $n^{n}$ $n^{3}$ $n$

asked Apr 1 in Algorithms Lakshman Patel RJIT 155 views

0 votes

2 answers

NIELIT 2017 OCT Scientific Assistant A (CS) - Section B: 8
Consider the following C code segment: int Ls Prime(n) { int i,n; for(i=2;i<=sqrt(n);i++) if(n%i ==0) { printf( NOT Prime.\n ); return 0; } return 1; } Let $T(n)$ denote the number of times the for loop is executed by the program on input $n.$ ... $T(n) = \Omega (1)$ $T(n) = O(n)$ and $T(n) = \Omega (\sqrt{n})$ None of these

Consider the following C code segment: int Ls Prime(n) { int i,n; for(i=2;i<=sqrt(n);i++) if(n%i ==0) { printf( NOT Prime.\n ); return 0; } return 1; } Let $T(n)$ denote the number of times the for loop is executed by the program on input $n.$ ... $T(n) = O(\sqrt{n})$ and $T(n) = \Omega (1)$ $T(n) = O(n)$ and $T(n) = \Omega (\sqrt{n})$ None of these

asked Apr 1 in Algorithms Lakshman Patel RJIT 142 views

0 votes

1 answer

NIELIT 2017 OCT Scientific Assistant A (CS) - Section B: 29
Which of the following algorithm solve the all-pair shortest path problem? Dijakstra’s algorithm Floyd’s algorithm Prim’s algorithm Warshall’s algorithm

Which of the following algorithm solve the all-pair shortest path problem? Dijakstra’s algorithm Floyd’s algorithm Prim’s algorithm Warshall’s algorithm

asked Apr 1 in Algorithms Lakshman Patel RJIT 84 views

0 votes

3 answers

NIELIT 2017 OCT Scientific Assistant A (CS) - Section B: 30
An algorithm is made up of two modules $M1$ and $M2.$ If order of $M1$ is $f(n)$ and $M2$ is $g(n)$ then he order of algorithm is $max(f(n),g(n))$ $min(f(n),g(n))$ $f(n) + g(n)$ $f(n) \times g(n)$

An algorithm is made up of two modules $M1$ and $M2.$ If order of $M1$ is $f(n)$ and $M2$ is $g(n)$ then he order of algorithm is $max(f(n),g(n))$ $min(f(n),g(n))$ $f(n) + g(n)$ $f(n) \times g(n)$

asked Apr 1 in Algorithms Lakshman Patel RJIT 113 views

1 vote

1 answer

NIELIT 2017 DEC Scientific Assistant A - Section B: 22
Which type of algorithm is used to solve the "$8$ Queens" problem ? Greedy Dynamic Divide and conquer Backtracking

Which type of algorithm is used to solve the "$8$ Queens" problem ? Greedy Dynamic Divide and conquer Backtracking

asked Mar 31 in Algorithms Lakshman Patel RJIT 116 views

1 vote

2 answers

NIELIT 2017 DEC Scientific Assistant A - Section B: 36
The average search time of hashing, with linear probing will be less if the load factor : is far less than $1$ equals $1$ is far greater than $1$ none of the options

The average search time of hashing, with linear probing will be less if the load factor : is far less than $1$ equals $1$ is far greater than $1$ none of the options

asked Mar 31 in Algorithms Lakshman Patel RJIT 145 views

2 votes

4 answers

NIELIT 2017 DEC Scientific Assistant A - Section B: 39
Merge sort uses : Divide-and-conquer Backtracking Heuristic approach Greedy approach

Merge sort uses : Divide-and-conquer Backtracking Heuristic approach Greedy approach

asked Mar 31 in Algorithms Lakshman Patel RJIT 189 views

1 vote

2 answers

NIELIT 2017 DEC Scientific Assistant A - Section B: 53
Given two sorted list of size '$m$' and '$n$' respectively. The number of comparisons needed in the worst case by the merge sort algorithm will be : $m^{*}n$ minimum of $m, n$ maximum of $m, n$ $m+n-1$

Given two sorted list of size '$m$' and '$n$' respectively. The number of comparisons needed in the worst case by the merge sort algorithm will be : $m^{*}n$ minimum of $m, n$ maximum of $m, n$ $m+n-1$

asked Mar 31 in Algorithms Lakshman Patel RJIT 173 views

3 votes

12 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 614 views

0 votes

2 answers

NIELIT 2016 MAR Scientist B - Section C: 17
A hash function $f$ defined as $f(\text{key})=\text{key mod }7$, with linear probing, insert the keys $37,38,72,48,98,11,56$ into a table indexed from $11$ will be stored in the location $3$ $4$ $5$ $6$

A hash function $f$ defined as $f(\text{key})=\text{key mod }7$, with linear probing, insert the keys $37,38,72,48,98,11,56$ into a table indexed from $11$ will be stored in the location $3$ $4$ $5$ $6$

asked Mar 31 in Algorithms Lakshman Patel RJIT 127 views

1 vote

1 answer

NIELIT 2016 MAR Scientist B - Section C: 20
A hash table has space for $100$ records. Then the probability of collision before the table is $10\%$ full, is $0.45$ $0.5$ $0.3$ $0.34$ (approximately)

A hash table has space for $100$ records. Then the probability of collision before the table is $10\%$ full, is $0.45$ $0.5$ $0.3$ $0.34$ (approximately)

asked Mar 31 in Algorithms Lakshman Patel RJIT 163 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 293 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 165 views

0 votes

3 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 274 views

Page:

tags	tag:apple
author	user:martin
title	title:apple
content	content:apple
exclude	-tag:apple
force match	+apple
views	views:100
score	score:10
answers	answers:2
is accepted	isaccepted:true
is closed	isclosed:true

Subjects

Network Sites

Recent questions in Algorithms

Log In

Register

Recent Posts

Subjects

Recent Blog Comments

Network Sites

Recent questions in Algorithms