Algorithms

Question 1

A message is made up entirely of characters from the set X = {P, Q, R, S, T}. The table of probabilities for each of the characters is shown below:

If a message of 100 characters over X is encoded using Huffman coding, then the expected length of the encoded message in bits is __________.

A
225
B
226
C
227
D
228
       Algorithms       Huffman-Coding       GATE 2017 [Set-2]       Video-Explanation
Question 1 Explanation: 

General procedure to solve Huffman coding problem
Step-1: Arrange into either descending/ ascending order according to that profits.
Step-2: Apply optimal merge pattern procedure.
Step-3: Make left sub-tree value either 0 or 1, for right sub-tree, vice-versa.




= 2 × 0.34 + 2 × 0.22 + 2 × 0.19 + 3 × 0.17 + 3 × 0.08
= 2.25
∴ So, for 100 characters, 2.25 * 100 = 225
Question 2

Consider a sequence of 14 elements: A = [-5, -10, 6, 3, -1, -2, 13, 4, -9, -1, 4, 12, -3, 0]. The subsequence sum . Determine the maximum of S(i,j), where 0 ≤ i ≤ j < 14. (Divide and conquer approach may be used)

A
19
B
39
C
29
D
09
       Algorithms       Dynamic-Programming       GATE 2019       Video-Explanation
Question 2 Explanation: 
First understand the subsequence is an array is
Ex:
{A, B, C, D}
{A, AB, AC, AD, ABC, ABD, ACD, B, BC, BD, BCD, C, CD, D }
Step-1: Array of elements A = [-5, -10, 6, 3, -1, -2, 13, 4, -9, -1, 4, 12, -3, 0 ]
Step-2: As per the given question, if they want to find maximum subsequence means
{6,3,13,4,4,12}
= 42
Step-3: But according to given recurrence relation, the sequence should be continuous. {6,3,13,4,4,12}.
This is not continuous subsequence.
Step-4: The continuous sequence is {6, 3, -1, -2, 13, 4, -9, -1, 4, 12}
Total is {29}.
Note: We can’t get more than 29 maximum subsequence sum.
Question 3

An array of 25 distinct elements is to be sorted using quicksort. Assume that the pivot element is chosen uniformly at random. The probability that the pivot element gets placed in the worst possible location in the first round of partitioning (rounded off to 2 decimal places) is _____.

A
0.08
B
0.01
C
1
D
8
       Algorithms       Sorting       GATE 2019       Video-Explanation
Question 3 Explanation: 
Step-1: Given, 25 distinct elements are to be sorted using quicksort.
Step-2: Pivot element = uniformly random.
Step-3: Worst case position in the pivot element is either first (or) last.
Step-4: So total 2 possibilities among 25 distinct elements
= 2/25
= 0.08
Question 4

There are n unsorted arrays: A1, A2, …, An. Assume that n is odd. Each of A1, A2, …, An contains n distinct elements. There are no common elements between any two arrays. The worst-case time complexity of computing the median of the medians of A1, A2, …, An is

A
O(n)
B
O(n log n)
C
Ω(n2 log n)
D
O(n2)
       Algorithms       Sorting       GATE 2019       Video-Explanation
Question 4 Explanation: 
Finding the median in an unsorted array is O(n).
But it is similar to quicksort but in quicksort, partitioning will take extra time.
→ Find the median will be (i+j)/2
1. If n is odd, the value is Ceil((i+j)/2)
2. If n is even, the value is floor((i+j)/2)
-> Here, total number of arrays are
⇒ O(n)*O(n)
⇒ O(n2)
Note:
They are clearly saying that all are distinct elements.
There is no common elements between any two arrays.
Question 5
Let G be any connected, weighted, undirected graph.
I. G  has a unique minimum spanning tree, if no two edges of G have the same weight.
II. G  has a unique minimum spanning tree, if, for every cut of G, there is a unique minimum-weight edge crossing the cut.
Which of the above statements is/are TRUE?
A
I only
B
II only
C
Both I and II
D
Neither I nor II
       Algorithms       Minimum-Spanning-Tree       GATE 2019       Video-Explanation
Question 5 Explanation: 
Given G be a connected, weighted and undirected graph,
I. TRUE: G Graph is unique, no two edges of the graph is same.

Step-1: Using Kruskal’s algorithm, arrange each weights in ascending order.
17, 18, 20, 21, 22, 23, 24, 25, 26, 27, 28, 29, 30
Step-2:

Step-3: 17 + 18 + 20 + 21 + 22 + 23 + 26 = 147
Step-4: Here, all the elements are distinct. So, the possible MCST is 1.
II. TRUE: As per the above graph, if we are cut the edge, that should the be the minimum edge.
Because we are already given, all minimum edge weights if graph is distinct.
Question 6

Consider the following undirected graph G:

Choose a value for x that will maximize the number of minimum weight spanning trees (MWSTs) of G. The number of MWSTs of G for this value of x is _________.

A
4
B
5
C
6
D
7
       Algorithms       Minimum-Spanning-Tree       GATE 2018       Video-Explanation
Question 6 Explanation: 
Here, x = 5 because it is having maximum number of spanning trees.
If x = 5 then the total number of MWSTs are 4.
If r = 1

If r = 2

If r = 3

If r = 4

If r = 5

Question 7

Consider the weights and values of items listed below. Note that there is only one unit of each item.

The task is to pick a subset of these items such that their total weight is no more than 11 Kgs and their total value is maximized. Moreover, no item may be split. The total value of items picked by an optimal algorithm is denoted by Vopt. A greedy algorithm sorts the items by their value-to-weight ratios in descending order and packs them greedily, starting from the first item in the ordered list. The total value of items picked by the greedy algorithm is denoted by Vgreedy.

The value of Vopt − Vgreedy is ______ .

A
16
B
17
C
18
D
19
       Algorithms       0/1-Knapsack-and-fractional-knapsack       GATE 2018       Video-Explanation
Question 7 Explanation: 
First sort value/weight in descending order as per the question:

Vopt is clearly = 60
For Vgreedy use the table (Do not take the fraction as per the question),
Item 4 picked,
Profit = 24
Remaining weight = 11 – 2 = 9
Next item 3 picked (item 1 cannot be picked since its capacity is greater than available capacity),
Profit = 24 + 20 = 44
Remaining capacity = 9 – 4 = 5
Now no item can be picked with available capacity.
So Vgreedy = 44
∴ Vopt – Vgreedy = 60 – 44 = 16
Question 8

Consider the following functions from positives integers to real numbers

 

The CORRECT arrangement of the above functions in increasing order of asymptotic complexity is:

A
B
C
D
       Algorithms       Asymptotic-Complexity       GATE 2017 [Set-1]       Video-Explanation
Question 8 Explanation: 
In this problem, they are expecting to find us “increasing order of asymptotic complexity”.
Step-1: Take n=2048 or 211 (Always take n is very big number)
Step-2: Divide functions into 2 ways
1. Polynomial functions
2. Exponential functions
Step-3: The above functions are belongs to polynomial. So, simply substitute the value of n,
First compare with constant values.
→ 100 / 2048 = 0.048828125
→ 10 > 100/ 2048
→ log2 2048 =11
→ √n = 45.25483399593904156165403917471
→ n = 2048
So, Option B is correct
Question 9

Consider the following table

Match the algorithm to design paradigms they are based on:

A
(P)↔(ii), Q↔(iii), (R)↔(i)
B
(P)↔(iii), Q↔(i), (R)↔(ii)
C
(P)↔(ii), Q↔(i), (R)↔(iii)
D
(P)↔(i), Q↔(ii), (R)↔(iii)
       Algorithms       Dynamic-Programming       GATE 2017 [Set-1]       Video-Explanation
Question 9 Explanation: 
(P) Kruskal’s and Prim’s algorithms for finding Minimum Spanning Tree(MST). To find MST we are using greedy technique.
(Q) QuickSort is a Divide and Conquer algorithm.
(R) Floyd Warshall Algorithm is for solving the All Pairs Shortest Path problem using Dynamic Programming.
Some important points regarding Greedy Vs Dynamic Programming
Greedy: →
It always gives polynomial time complexity
→ It is not an optimal
→ It always selects only either minimum or maximum among all possibilities
→ Ex: Dijkstra’s algorithm for SSSP, Optimal Merge Pattern, Huffman coding, Fractional knapsack problem, etc..,
Dynamic Programming:
→ It gives either polynomial or exponential time complexity.
→ It gives always an optimal result.
→ It checks all possibilities of a problem.
→ Ex: Longest Common sequence, Matrix chain Multiplication, Travelling sales Problem, etc.
Question 10
Let G = (V, E) be any connected undirected edge-weighted graph. The weights of the edges in E are positive and distinct. Consider the following statements:
(I) Minimum Spanning Tree of G is always unique.
(II) Shortest path between any two vertices of G is always unique.
Which of the above statements is/are necessarily true?
A
(I) only
B
(II) only
C
both (I) and (II)
D
neither (I) nor (II)
       Algorithms       Minimum-Spanning-Tree       GATE 2017 [Set-1]       Video-Explanation
Question 10 Explanation: 
If the graph has all positive and distinct (unique values no duplicates) then Statement-I definitely correct because if we are using either prim’s or kruskal’s algorithm it gives the unique spanning tree.
Let us take an example

Step 1:
Using kruskal’s algorithm, arrange each weights in ascending order.
17, 18, 20, 21, 22, 23, 24, 25, 26, 27, 28, 29, 30
Step 2:

Step 3:
17+18+20+21+22+23+26 = 147
Step 4:
Here, all the elements are distinct. So the possible MCST is 1.
Statement-II: May or may not happen, please take an example graph and try to solve it. This is not correct always.
So, we have to pick most appropriate answer.
Question 11

Let A be an array of 31 numbers consisting of a sequence of 0’s followed by a sequence of 1’s. The problem is to find the smallest index i such that A[i] is 1 by probing the minimum number of locations in A. The worst case number of probes performed by an optimal algorithm is _________.

A
5
B
6
C
7
D
8
       Algorithms       Searching       GATE 2017 [Set-1]       Video-Explanation
Question 11 Explanation: 
→ If we apply binary search to find the first occurrence of 1 in the list, it will give us the smallest index i where 1 is stored.
→ As in this array sequence of 0’s is followed by sequence of 1’s, the array is sorted. We can apply binary search directly without sorting it.
So number of probes = ceil(log2 31) = 4.954196310386876
⇒ here we are using ceiling so it becomes 5
Question 12

Match the algorithms with their time complexities:

      Algorithm                                     Time complexity
(P) Towers of Hanoi with n disks                       (i) Θ(n2)
(Q) Binary search given n stored numbers              (ii) Θ(n log⁡ n)
(R) Heap sort given n numbers at the worst case      (iii) Θ(2n)
(S) Addition of two n×n matrices                      (iv) Θ(log⁡ n)
A
P→(iii), Q→(iv), R→(i), S→(ii)
B
P→(iv), Q→(iii), R→(i), S→(ii)
C
P→(iii), Q→(iv), R→(ii), S→(i)
D
P→(iv), Q→(iii), R→(ii), S→(i)
       Algorithms       Match-the-Following       GATE 2017 [Set-2]       Video-Explanation
Question 12 Explanation: 
In this problem, we have to find Average case of different algorithms
→ Tower of Hanoi with n disks takes θ(2n) time
It is a mathematical game or puzzle.
It consists of three rods and a number of disks of different sizes, which can slide onto any rod.
The puzzle starts with the disks in a neat stack in ascending order of size on one rod, the smallest at the top, thus making a conical shape.
The objective of the puzzle is to move the entire stack to another rod, obeying the following simple rules:
1. Only one disk can be moved at a time.
2. Each move consists of taking the upper disk from one of the stacks and placing it on top of another stack.
3. No disk may be placed on top of a smaller disk.
With 3 disks, the puzzle can be solved in 7 moves.
The minimal number of moves required to solve a Tower of Hanoi puzzle is 2n-1, where n is the number of disks.
→ Binary Search given n sorted numbers takes Ɵ(log2 n)
→ Heap sort given n numbers of the worst case takes Ɵ(n log n)
→ Addition of two n×n matrices takes Ɵ(n2)
Question 13

Consider the recurrence function

Then T(n) in terms of Θ notation is

A
Θ(log⁡log⁡n)
B
Θ(log⁡n)
C
Θ(√n)
D
Θ(n)
       Algorithms       Time-Complexity       GATE 2017 [Set-2]       Video-Explanation
Question 13 Explanation: 
T(n) = 2T(√n) + 1
(or)
T(n) = 2T(n(1⁄2)) + 1
Here, Assume n = 2k
T(2k) = 2T(2k)(1⁄2) + 1
T(2k) = 2T(2(k/2) ) + 1
Assume T(2k) = S(k)
S(k) = 2S(k/2) + 1
Apply Master’s theorem Case-1
a=2, b=2
S(k) = k(log22 )
S(k) = θ(k’)
but S(k) = T(2k)
T(2k) = θ(k’)
but n = 2k
k = log⁡n
T(n) = θ(logn)
Question 14

Consider the following C function.

int fun (int n)   {
         int i, j;
         for (i = 1; i <= n; i++)   {
                for (j = 1; j < n; j += i)   {
                        printf("%d %d",i,j);
                }
          }
}

Time complexity of fun in terms of Θ notation is

A
Θ(n√n)
B
Θ(n2)
C
Θ(n log⁡n)
D
Θ(n2 logn)
       Algorithms       Time-Complexity       GATE 2017 [Set-2]       Video-Explanation
Question 14 Explanation: 
We can solve iterative programs time complexity with the help of rollback method.
int fun(int n)
{
int i, j;
for (i = 1; i <= n ; i++)    /* It is independent loop. So, it takes O(n) time */
{
for (j = 1; j < n; j += i)     /* It is dependent loop, It always incrementing with the help of i. It will take approximately O(log n) times*/
{
printf(“%d %d”, i, j);     /* It takes O(1) time */
}
}
}
So, the overall complexity of the program is θ(n log⁡n) times.
Question 15

The worst case running times of Insertion sort, Merge sort and Quick sort, respectively, are:

A
Θ(nlogn), Θ(nlogn), and Θ(n2)
B
Θ(n2 ), Θ(n2 ), and Θ(nlogn)
C
Θ(n2), Θ(nlogn), and Θ(nlogn)
D
Θ(n2), Θ(nlogn), and Θ(n2)
       Algorithms       Sorting       GATE 2016 [Set-1]       Video-Explanation
Question 15 Explanation: 
Question 16

Let G be a complete undirected graph on 4 vertices, having 6 edges with weights being 1, 2, 3, 4, 5, and 6. The maximum possible weight that a minimum weight spanning tree of G can have is __________.

A
7
B
8
C
9
D
10
       Algorithms       Minimum-Spanning-Tree       GATE 2016 [Set-1]       Video-Explanation
Question 16 Explanation: 
Let G be a complete undirected graph with 4 vertices & 6 edges so according to graph theory, if we use Prim’s / Kruskal’s algorithm, the graph looks like

Now consider vertex A to make Minimum spanning tree with Maximum weights.
As weights are 1, 2, 3, 4, 5, 6. AB, AD, AC takes maximum weights 4, 5, 6 respectively.
Next consider vertex B, BA = 4, and minimum spanning tree with maximum weight next is BD & BC takes 2, 3 respectively.
And the last edge CD takes 1.
So, 1+2+4 in our graph will be the Minimum spanning tree with maximum weights.
Question 17
G = (V,E) is an undirected simple graph in which each edge has a distinct weight, and e is a particular edge of G. Which of the following statements about the minimum spanning trees (MSTs) of G is/are TRUE?
I. If e is the lightest edge of some cycle in G, then every MST of G includes e
II. If e is the heaviest edge of some cycle in G, then every MST of G excludes e
A
I only
B
II only
C
both I and II
D
neither I nor II
       Algorithms       Minimum-Spanning-Tree       GATE 2016 [Set-1]       Video-Explanation
Question 17 Explanation: 
Statement-1: False
The MSTs of G may or may not include the lightest edge.
Take rectangular graph labelled with P,Q,R,S.
Connect with P-Q = 5, Q-R = 6, R-S = 8, S-P = 9, P-R = 7.
When we are forming a cycle R-S-P-R. P-R is the lightest edge of the cycle.
The MST abcd with cost 11
P-Q + Q-R + R-S does not include it.
Statement-2: True
Suppose there is a minimum spanning tree which contains e. If we add one more edge to the spanning tree we will create a cycle.
Suppose we add edge e to the spanning tree which generated cycle C.
We can reduce the cost of the minimum spanning tree if we choose an edge other than e from C for removal which implies that e must not be in minimum spanning tree and we get a contradiction.
Question 18
Assume that the algorithms considered here sort the input sequences in ascending order. If the input is already in ascending order, which of the following are TRUE?
I. Quicksort runs in Θ(n2) time
II. Bubblesort runs in Θ(n2) time
III. Mergesort runs in Θ(n) time
IV. Insertion sort runs in Θ(n) time
A
I and II only
B
I and III only
C
II and IV only
D
I and IV only
       Algorithms       Sorting       GATE 2016 [Set-2]       Video-Explanation
Question 18 Explanation: 
If input sequence is already sorted then the time complexity of Quick sort will take O(n2) and Bubble sort will take O(n) and Merge sort will takes O(nlogn) and insertion sort will takes O(n).
→ The recurrence relation for Quicksort, if elements are already sorted,
T(n) = T(n-1)+O(n) with the help of substitution method it will take O(n2).
→ The recurrence relation for Merge sort, is elements are already sorted,
T(n) = 2T(n/2) + O(n) with the help of substitution method it will take O(nlogn).
We can also use master’s theorem [a=2, b=2, k=1, p=0] for above recurrence.
Question 19

The Floyd-Warshall algorithm for all-pair shortest paths computation is based on

A
Greedy paradigm.
B
Divide-and-Conquer paradigm.
C
Dynamic Programming paradigm.
D
Neither Greedy nor Divide-and-Conquer nor Dynamic Programming paradigm.
       Algorithms       Floyd-Warshall-Algorithm       GATE 2016 [Set-2]       Video-Explanation
Question 19 Explanation: 
→ All Pair shortest path algorithm is using Dynamic Programming technique.
It takes worst case time complexity is O(|V|3) and worst case space complexity is O(|V|2).
→ The Floyd–Warshall algorithm is an algorithm for finding shortest paths in a weighted graph with positive or negative edge weights (but with no negative cycles).
→ A single execution of the algorithm will find the lengths (summed weights) of the shortest paths between all pairs of vertices.
Although it does not return details of the paths themselves, it is possible to reconstruct the paths with simple modifications to the algorithm.
Question 20

Let A1, A2, A3 and A4 be four matrices of dimensions 10 × 5, 5 × 20, 20 × 10, and 10 × 5, respectively. The minimum number of scalar multiplications required to find the product A1A2A3A4 using the basic matrix multiplication method is _________.

A
1500
B
1501
C
1502
D
1503
       Algorithms       Matrix-Chain-Multiplication       GATE 2016 [Set-2]       Video-Explanation
Question 20 Explanation: 
→ The minimum number of scalar multiplications required is 1500.
The optimal parenthesized sequence is A1((A2A3)A4) out of many possibilities, the possibilities are
1. ((A1A2)A3)A4
2. ((A1(A2A3))A4)
3. (A1A2)(A3A4)
4. A1((A2A3)A4)
5. A1(A2(A3A4))
→ A1((A2A3)A4) = (5 x 20 x 10) + (5 x 10 x 5) + (10 x 5 x 5) = 1000 + 250 + 250 = 1500
Question 21

The given diagram shows the flowchart for a recursive function A(n). Assume that all statements, except for the recursive calls, have O(1) time complexity. If the worst case time complexity of this function is O(nα), then the least possible value (accurate upto two decimal  positions) of α is _________.

A
2.3219280
B
2.3219281
C
2.3219282
D
2.3219283
       Algorithms       Time-Complexity       GATE 2016 [Set-2]       Video-Explanation
Question 21 Explanation: 
This type of problem, we have to consider worst case time complexity, it mean that all possibilities.
According to flow chart total 5 worst case possibilities of function calls.

The remaining function calls/return statements will execute only constant amount of time.
So, total function calls 5.
The Recurrence will be
A(n) = 5A(n/2) + O(1)
Apply Master’s theorem,
A=5, b=2, k=0, p=0
a > bk case
A(n) = n(logba ) = n(log25) = n2.3219280
∴α = 2.3219280
Question 22

Which one of the following is the recurrence equation for the worst case time complexity of the Quicksort algorithm for sorting n(≥ 2) numbers? In the recurrence equations given in the options below, c is a constant.

A
T(n) = 2T(n/2) + cn
B
T(n) = T(n – 1) + T(1) + cn
C
T(n) = 2T(n – 1) + cn
D
T(n) = T(n/2) + cn
       Algorithms       Quick-Sort       GATE 2015 [Set-1]
Question 22 Explanation: 
When the pivot is the smallest (or largest) element at partitioning on a block of size n the result yields one empty sub-block, one element (pivot) in the correct place and sub block of size n-1.
Hence recurrence relation T(n) = T(n – 1) + T(1) + cn.
Question 23

Match the following:

(P) Prim's algorithm for minimum spanning tree               (i) Backtracking
(Q) Floyd-Warshall algorithm for all pairs shortest paths   (ii) Greedy method
(R) Mergesort                                              (iii) Dynamic programming
(S) Hamiltonian circuit                                     (iv) Divide and conquer
A
P-iii, Q-ii, R-iv, S-i
B
P-i, Q-ii, R-iv, S-iii
C
P-ii, Q-iii, R-iv, S-i
D
P-ii, Q-i, R-iii, S-iv
       Algorithms       Algorithms       GATE 2015 [Set-1]
Question 23 Explanation: 
Prim’s algorithm always select minimum distance between two of its sets which is nothing but greedy method.
Floyd-warshall always changes it distance at each iteration which is nothing but dynamic programming.
Merge sort in merge sort first we always divide and merge to perform sorting hence divide and conquer.
Hamiltonian circuit used to reach the entire vertex once, if some vertex is repeating in its path it will backtrack.
Question 24

An algorithm performs (log N)1/2 find operations, N insert operations, (log N)1/2 delete operations, and (log N)1/2 decrease-key operations on a set of data items with keys drawn from a linearly ordered set. For a delete operation, a pointer is provided to the record that must be deleted. For the decrease-key operation, a pointer is provided to the record that has its key decreased. Which one of the following data structures is the most suited for the algorithm to use, if the goal is to achieve the best total asymptotic complexity considering all the operations?

A
Unsorted array
B
Min-heap
C
Sorted array
D
Sorted doubly linked list
       Algorithms       Time-Complexity       GATE 2015 [Set-1]
Question 24 Explanation: 
Question 25

The graph shown below 8 edges with distinct integer edge weights. The minimum spanning tree (MST) is of weight 36 and contains the edges: {(A, C), (B, C), (B, E), (E, F), (D, F)}. The edge weights of only those edges which are in the MST are given in the figure shown below. The minimum possible sum of weights of all 8 edges of this graph is ______________.

A
69
B
70
C
71
D
72
       Algorithms       Minimum-Spanning-Tree       GATE 2015 [Set-1]
Question 25 Explanation: 

⇒ Total sum = 10 + 9 + 2 + 15 + 7 + 16 + 4 + 6 = 69

–> First we compare A-C and A-B we find 9 at A-C it means A-B must greater than A-C and for minimum possible greater value than 9 will be 10
-> Second we compare B-E and C-D in which we select B-E is 15 which C-D possible weight 16.
-> Third, we compare E-D and F-D in which we select F-D 6 means E-D must be greater than 6 so possible value greater than 6 is 7 .
Note: Add First+Second+Third=(A-B=10)+(C-D=16)+(E-D=7)
Question 26

Given below are some algorithms, and some algorithm design paradigms 

A. Dijkstra’s Shortest Path                     1. Divide and Conquer
B. Floyd-Warshall algorithm to                  2. Dynamic Programming                 
   compute all pairs shortest path
C. Binary search on a sorted array              3. Greedy design
D. Backtracking search on a graph               4. Depth-first search
                                                5. Breadth-first search

Match the above algorithms on the left to the corresponding design paradigm they follow Codes:

A
1-i, 2-iii, 3-i, 4-v.
B
1-iii, 2-iii, 3-i, 4-v.
C
1-iii, 2-ii, 3-i, 4-iv.
D
1-iii, 2-ii, 3-i, 4-v.
       Algorithms       Algorithm-Paradigms       GATE 2015 [Set-2]
Question 26 Explanation: 
(1) Dijkstra’s Shortest Path using to find single source shortest path. It is purely based on Greedy technique because it always selects shortest path among all.
(2) → All Pair shortest path algorithm is using Dynamic Programming technique. It takes worst case time complexity is O(|V|3) and worst case space complexity is O(|V|2).
→ The Floyd–Warshall algorithm is an algorithm for finding shortest paths in a weighted graph with positive or negative edge weights (but with no negative cycles).
→ A single execution of the algorithm will find the lengths (summed weights) of the shortest paths between all pairs of vertices. Although it does not return details of the paths themselves, it is possible to reconstruct the paths with simple modifications to the algorithm.
(3) Binary search on a sorted array:
Search a sorted array by repeatedly dividing the search interval in half. Begin with an interval covering the whole array. If the value of the search key is less than the item in the middle of the interval, narrow the interval to the lower half. Otherwise narrow it to the upper half. Repeatedly check until the value is found or the interval is empty.
(4) Backtracking search on a graph uses Depth-first search
Question 27

Suppose you are provided with the following function declaration in the C programming language.

       int partition (int a[], int n);

The function treats the first element of a[] as a pivot, and rearranges the array so that all elements less than or equal to the pivot is in the left part of the array, and all elements greater than the pivot is in the right part. In addition, it moves the pivot so that the pivot is the last element of the left part. The return value is the number of elements in the left part. The following partially given function in the C programming language is used to find the kth smallest element in an array a[ ] of size n using the partition function. We assume k ≤ n 

int kth_smallest (int a[], int n, int k)
{
   int left_end = partition (a, n);
   if (left_end+1==k)
   {
       return a [left_end];
   }
   if (left_end+1 > k)
   {
      return kth_smallest (____________________);
   }
   else
   {
      return kth_smallest (____________________);
    }
}

The missing argument lists are respectively

A
(a, left_end, k) and (a + left_end + 1, n – left_end – 1, k – left_end – 1)
B
(a, left_end, k) and (a, n – left_end – 1, k – left_end – 1)
C
(a + left_end + 1, n – left_end – 1, k – left_end – 1) and (a, left_end, k)
D
(a, n – left_end – 1, k – left_end – 1) and (a, left_end, k)
       Algorithms       Partitioning-Algorithm       GATE 2015 [Set-2]
Question 28

Consider a typical disk that rotates at 15000 rotations per minute (RPM) and has a transfer rate of 50×106 bytes/sec. If the average seek time of the disk is twice the average rotational delay and the controller’s transfer time is 10 times the disk transfer time, the average time (in milliseconds) to read or write a 512-byte sector of the disk is _____________.  

A
6
B
6.1
C
6.2
D
6.3
       Algorithms       Secondary-Storage       GATE 2015 [Set-2]
Question 28 Explanation: 
15000 rotations → 60 sec
1 rotation → 60 /15000 sec = 4 ms
∴ Average rotational delay = 1/2 × 4 ms = 2 ms
Average seek time = 2 × Average rotational delay
= 2 × 2 ms = 4 ms
Time to transfer 512 byte,
50 × 106B ——- 1s
512 B ——- 512B/ 50×106B/s = 0.01 ms
∴ Controllers transfer time
= 10 × Disk transfer time
= 10 × 0.01 ms
= 0.01 ms
∴ Avg. time = (4 + 2 + 0.1 + 0.01)ms
= 6.11 ms
Question 29

Assume that a mergesort algorithm in the worst case takes 30 seconds for an input of size 64. Which of the following most closely approximates the maximum input size of a problem that can be solved in 6 minutes?  

A
256
B
512
C
1024
D
2048
       Algorithms       Merge-Sort       GATE 2015 [Set-3]
Question 29 Explanation: 
Time complexity of merge sort = O(n log n) = an log n
where c is some constant
It is given that for n = 64,
cn log n = 30
c × 64 log 64 = 30
c × 64 × 6 = 30
c = 5/64
Now, the value of n for
c n log n = 360
5/64 × n log n = 360
n log n = 360×64/5
= 72 × 64 = 29 × 9
So for n = 29, it satisfies.
So, n = 29 = 512
Question 30

Let G be a connected undirected graph of 100 vertices and 300 edges. The weight of a minimum spanning tree of G is 500. When the weight of each edge of G is increased by five, the weight of a minimum spanning tree becomes __________.

A
995
B
996
C
997
D
998
       Algorithms       Minimum-Spanning-Tree       GATE 2015 [Set-3]
Question 30 Explanation: 
G has 100 vertices ⇒ spanning tree contain 99 edges given, weight of a minimum spanning tree of G is 500 since, each edge of G is increased by five. ∴ Weight of a minimum spanning tree becomes 500 + 5 ⨯ 99= 995
Question 31

There are 5 bags labeled 1 to 5. All the coins in a given bag have the same weight. Some bags have coins of weight 10 gm, others have coins of weight 11 gm. I pick 1, 2, 4, 8, 16 coins respectively from bags 1 to 5. Their total weight comes out to 323 gm. Then the product of the labels of the bags having 11 gm coins is _______.

A
12
B
13
C
14
D
15
       Algorithms       General       GATE 2014 [Set-1]
Question 31 Explanation: 
Bags: 1 2 3 4 5
No. of coins picked: 1 2 4 8 16
There are two types of weights of coin, i.e., 10gm and 11gm. And total weight of picked coins are 323gm.
Let there be x number of 10gm coins and y number of 11gm coins.
So, 10x + 11y = 323 —— (1)
And we also know that total number of coins picked is
1 + 2 + 4 + 8 + 16 = 31 which is equal to x + y, so,
= 31 —— (2)
Solving equation (1) and (2), we get
y = 13
Means total there are 13 coins of 11gm.
Now we can chose bag number 1, 3 and 4, we will get a total sum of 13 coins picked from them.
So product of labelled bag number = 1×3×4 = 12
Question 32

Suppose a polynomial time algorithm is discovered that correctly computes the largest clique in a given graph. In this scenario, which one of the following represents the correct Venn diagram of the complexity classes P, NP and NP Complete (NPC)?

A
B
C
D
       Algorithms       P-NP       GATE 2014 [Set-1]
Question 32 Explanation: 
The most important open question in complexity theory is whether the P = NP, which asks whether polynomial time algorithms actually exist for NP-complete and all NP problems (since a problem “C” is in NP-complete, iff C is in NP and every problem in NP is reducible to C in polynomial time). In the given question it is given that some polynomial time algorithm exists which computes the largest clique problem in the given graph which is known NP-complete problem. Hence P=NP=NP-Complete.
Question 33

The minimum number of comparisons required to find the minimum and the maximum of 100 numbers is __________.

A
148
B
149
C
150
D
151
       Algorithms       General       GATE 2014 [Set-1]
Question 33 Explanation: 
The minimum number of comparisons required to find the minimum and the maximum of 100 numbers is 3n/2 – 2 = 148.
(∵ T(n) = T(floor(n/2))+T(ceil(n/2))+2)
Question 34

Which one of the following correctly determines the solution of the recurrence relation with T(1) = 1?

     T(n) = 2T(n/2) + Logn
A
Θ(n)
B
Θ(nlog n)
C
Θ(n2)
D
Θ(log⁡n)
       Algorithms       Time-Complexity       GATE 2014 [Set-2]
Question 34 Explanation: 
T(n) = 2T(n/2)+logn
Apply Master’s theorem,
a=2, b=2, k=0, p=1
According to Master’s theorem, we can apply Case-I
(I) If a>bk, then T(n) = θ(n(logba )) = θ(n(log22)) = θ (n)
Question 35

Consider two strings A = “qpqrr” and B = “pqprqrp”. Let x be the length of the longest common subsequence (not necessarily contiguous) between A and B and let y be the number of such longest common subsequences between A and B. Then x+10y = _________.

A
34
B
35
C
36
D
37
       Algorithms       Dynamic-Programming       GATE 2014 [Set-2]
Question 35 Explanation: 
Given is
A = “qpqrr” B = “pqprqrp”
The longest common subsequence (not necessarily contiguous) between A and B is having 4 as the length, so x=4 and such common subsequences are as follows:
(1) qpqr
(2) pqrr
(3) qprr
So y = 3 (the number of longest common subsequences) hence x+10y = 4+10*3 = 34
Question 36

Suppose P, Q, R, S, T are sorted sequences having lengths 20, 24, 30, 35, 50 respectively. They are to be merged into a single sequence by merging together two sequences at a time.  The number of comparisons that will be needed in the worst case by the optimal algorithm for doing this is ______.

A
358
B
359
C
360
D
361
       Algorithms       Greedy-Algorithm       GATE 2014 [Set-2]
Question 36 Explanation: 
The implementation of optimal algorithm for merging sequences is as follows.

In the above implementation, total number of comparisons is
(44-1) + (94-1) + (65-1) + (159-1) = 358
Hint: The number of comparisons for merging two sorted sequences of length m and n is m+n-1.
Question 37

The number of distinct minimum spanning trees for the weighted graph below is _______.

A
6
B
7
C
8
D
9
       Algorithms       Minimum-Spanning-Tree       GATE 2014 [Set-2]
Question 37 Explanation: 

Minimum Spanning Tree:

From the diagram, CFDA gives the minimum weight so will not disturb them, but in order to reach BE=1 we have 3 different ways ABE/ DBE/ DEB and we have HI=1, the shortest weight, we can reach HI=1 through GHI/ GIH.
So 3*2=6 ways of forming Minimum Spanning Tree with sum as 11.
Question 38

Consider the following rooted tree with the vertex labeled P as t he root:

The order in which the nodes are visited during in-order traversal is

A
SQPTRWUV
B
SQPTUWRV
C
SQPTWUVR
D
SQPTRUWV
       Algorithms       Tree Traversal       GATE 2014 [Set-3]
Question 38 Explanation: 
The tree can be redrawn as

Inorder Traversal: Left, Root, Middle, Right.
So, during inorder traversal whenever we visit the node second time then print it.
So, output will be,
S Q P T R W U V
Question 39

Suppose depth first search is executed on the graph below starting at some unknown vertex. Assume that a recursive call to visit a vertex is made only after first checking that the vertex has not been visited earlier. Then the maximum possible recursion depth (including the initial call) is _________.

A
19
B
20
C
21
D
22
       Algorithms       Graphs       GATE 2014 [Set-3]
Question 39 Explanation: 

Note: We should not consider backtrack edges, it reduces recursion depth in stack.
So the maximum possible recursive depth will be 19.
Question 40

You have an array of n elements. Suppose you implement quicksort by always choosing the central element of the array as the pivot. Then the tightest upper bound for the worst case performance is

A
O(n2)
B
O(n log n)
C
Θ(n log⁡n)
D
O(n3)
       Algorithms       Sorting       GATE 2014 [Set-3]
Question 40 Explanation: 
The Worst case time complexity of quick sort is O (n2). This will happen when the elements of the input array are already in order (ascending or descending), irrespective of position of pivot element in array.
Question 41

Suppose we have a balanced binary search tree T holding n numbers.  We are given two numbers L and H and wish to sum up all the numbers in T that lie between L and H. Suppose there are m such numbers in T. If the tightest upper bound on the time to compute the sum is O(nalogbn + mclogdn), the value of a + 10b + 100c + 1000d is ____.

A
110
B
111
C
112
D
113
       Algorithms       Binary-Search-Tree       GATE 2014 [Set-3]
Question 41 Explanation: 
It takes (log n) time to determine numbers n1 and n2 in balanced binary search tree T such that
1. n1 is the smallest number greater than or equal to L and there is no predecessor n1‘ of >n1 such that n1‘ is equal to n1.
2. n22‘ of n2 such that is equal to n2.
Since there are m elements between n1 and n2, it takes ‘m’ time to add all elements between n1 and n2.
So time complexity is O(log n+m)
So the given expression becomes O(n0log’n+m’log0n)
And a+10b+100c+1000d = 0+10*1+100*1+1000*1 = 10+100 = 110
Because a=0, b=1, c=1 and d=0
Question 42

Consider a hash table with 100 slots. Collisions are resolved using chaining. Assuming simple uniform hashing, what is the probability that the first 3 slots are unfilled after the first 3 insertions?

A
(97×97×97)/1003
B
(99×98×97)/1003
C
(97×96×95)/1003
D
(97×96×95)/(3!×1003)
       Algorithms       Hashing       GATE 2014 [Set-3]
Question 42 Explanation: 
Given Hash table consists of 100 slots.
They are picked with equal probability of Hash function since it is uniform hashing.
So to avoid the first 3 slots to be unfilled
= 97/100*97/100*97/100 =((97*97*97))⁄1003
Question 43

Consider the pseudocode given below. The function DoSomething() takes as argument a pointer to the root of an arbitrary tree represented by the leftMostChild-rightSibling representation. Each node of the tree is of type treeNode.

typedef struct treeNode* treeptr;
struct treeNode
{
    treeptr leftMostChild, rightSibling;
};
int DoSomething (treeptr tree)
{
    int value=0;
    if (tree != NULL)
    {
        if (tree->leftMostChild == NULL)
            value = 1;
        else
            value = DoSomething(tree->leftMostChild);
        value = value + DoSomething(tree->rightSibling);
    }
    return(value);
}

When the pointer to the root of a tree is passed as the argument to DoSomething, the value returned by the function corresponds to the

A
number of internal nodes in the tree.
B
height of the tree.
C
number of nodes without a right sibling in the tree.
D
number of leaf nodes in the tree.
       Algorithms       ree Traversals       GATE 2014 [Set-3]
Question 43 Explanation: 
The key to solving such questions is to understand or detect where/by what condition the value (or the counter) is getting incremented each time.
Here, that condition is if (tree → leftMostchild = = Null)
⇒ Which means if there is no left most child of the tree (or the sub-tree or the current node as called in recursion)
⇒ Which means there is no child to that particular node (since if there is no left most child, there is no child at all).
⇒ Which means the node under consideration is a leaf node.
⇒ The function recursively counts, and adds to value, whenever a leaf node is encountered.
⇒ The function returns the number of leaf nodes in the tree.
Question 44

Consider the C function given below. Assume that the array listA contains n (> 0) elements, sorted in ascending order.

int ProcessArray(int *listA, int x, int n)
{
    int i, j, k;
    i = 0;
    j = n-1;
    do
    {
        k = (i+j)/2;
        if (x <= listA[k])
            j = k-1;
        if (listA[k] <= x)
            i = k+1;
    }
    while (i <= j);
    if (listA[k] == x)
        return(k);
    else
        return -1;
}

Which one of the following statements about the function ProcessArray is CORRECT?

A
It will run into an infinite loop when x is not in listA.
B
It is an implementation of binary search.
C
It will always find the maximum element in listA.
D
It will return −1 even when x is present in listA.
       Algorithms       Searching       GATE 2014 [Set-3]
Question 44 Explanation: 
From the above code, we can identify
k = (i+j)/2;
where k keeps track of current middle element & i, j keeps track of left & right children of current subarray.
So it is an implementation of Binary search.
Question 45

Which one of the following is the tightest upper bound that represents the number of swaps required to sort n numbers using selection sort?

A
O(log n)
B
O(n)
C
O(n log n)
D
O(n2)
       Algorithms       Sorting       GATE 2013
Question 45 Explanation: 
Best, Average and worst case will take maximum O(n) swaps.
Selection sort time complexity O(n2) in terms of number of comparisons. Each of these scans requires one swap for n-1 elements (the final element is already in place).
Question 46

Which one of the following is the tightest upper bound that represents the time complexity of inserting an object into a binary search tree of n nodes?

A
O(1)
B
O(log n)
C
O(n)
D
O(n log n)
       Algorithms       Sorting       GATE 2013
Question 46 Explanation: 
For skewed binary search tree on n nodes, the tightest upper bound to insert a node is O(n).
Question 47

Consider the languages L1 = ϕ and L= {a}. Which one of the following represents L1L2* ∪ L1*?

A
{є}
B
ϕ
C
a*
D
{є,a}
       Algorithms       Regular languages and Finite automata       GATE 2013
Question 47 Explanation: 
As we know, for any regular expression R,
Rϕ = ϕR = ϕ
So L1 L2 * = ϕ
and L1 * = {ϕ}* = {ϵ}
So L1L2* ∪ L1* = {ϵ}
Question 48

What is the time complexity of Bellman-Ford single-source shortest path algorithm on a complete graph of n vertices?

A
Θ(n2)
B
Θ(n2 log n)
C
Θ(n3)
D
Θ(n3 log n)
       Algorithms       Sorting       GATE 2013
Question 48 Explanation: 
The Bellman–Ford algorithm is an algorithm that computes shortest paths from a single source vertex to all of the other vertices in a weighted digraph. It is capable of handling graphs in which some of the edge weights are negative numbers.
Bellman–Ford runs in O(|V| * |E|) time, where |V| and |E| are the number of vertices and edges respectively.
Note: For complete graph: |E| = n(n-1)/2 = O(n2)
Question 49

Consider an undirected random graph of eight vertices. The probability that there is an edge between a pair of vertices is 1/2. What is the expected number of unordered cycles of length three?

A
1/8
B
1
C
7
D
8
       Algorithms       Graph-Theory       GATE 2013
Question 49 Explanation: 
Among available ‘8’ vertices, we need to identify the cycles of length ‘3’.

The probability that there exists one edge between two vertices = 1/2

So, the total probability that all three edges of the above exists
= 1/2 × 1/2 × 1/2 (as they are independent events)
= 1/8
Total number of ways in which we can select ‘3’ such vertices among ‘8’ vertices = 8C3 = 56
Total number of cycles of length ‘3’ out of 8 vertices = 56 × 1/8 = 7
Question 50

Which of the following statements is/are TRUE for undirected graphs?

    P: Number of odd degree vertices is even.
    Q: Sum of degrees of all vertices is even.
A
P only
B
Q only
C
Both P and Q
D
Neither P nor Q
       Algorithms       Graph-Theory       GATE 2013
Question 50 Explanation: 
Euler’s Theorem 3:
The sum of the degrees of all the vertices of a graph is an even number (exactly twice the number of edges).
In every graph, the number of vertices of odd degree must be even.
There are 50 questions to complete.

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