Recent activity in Graph Theory / GATE Overflow for GATE CSE

0 votes

1 answer

1

ISI kolkata MTech CS 2019
Let $K_n$ denote the complete graph on $n$ vertices, with $n ≥ 3$, and let $u$, $v$, $w$ be three distinct vertices of $K_n$. Determine the number of distinct paths from $u$ to $v$ that do not contain the vertex $w$.

Let $K_n$ denote the complete graph on $n$ vertices, with $n ≥ 3$, and let $u$, $v$, $w$ be three distinct vertices of $K_n$. Determine the number of distinct paths fro...

suvasish114

37 views

suvasish114 answer edited 2 days ago

16 votes

3 answers

2

number of perfect matching in complete graph
Is there a way to find no of perfect matchings in a complete graph Kn where n could be either even or odd..?

Is there a way to find no of perfect matchings in a complete graph Kn where n could be either even or odd..?

Priyam Garg

10.8k views

Priyam Garg answer edited 6 days ago

60 votes

10 answers

3

GATE CSE 2003 | Question: 36
How many perfect matching are there in a complete graph of $6$ vertices? $15$ $24$ $30$ $60$

How many perfect matching are there in a complete graph of $6$ vertices?$15$$24$$30$$60$

Priyam Garg

50.4k views

Priyam Garg answered 6 days ago

0 votes

1 answer

4

GATE CSE 2024 | Set 1 | Question: 41
The chromatic number of a graph is the minimum number of colours used in a proper colouring of the graph. Let $G$ be any graph with $n$ vertices and chromatic number $k$. Which of the following statements is/are always TRUE? $G$ contains a complete subgraph with ... $n/k$ $G$ contains at least $k(k-1) / 2$ edges $G$ contains a vertex of degree at least $k$

The chromatic number of a graph is the minimum number of colours used in a proper colouring of the graph. Let $G$ be any graph with $n$ vertices and chromatic nu...

Vijay Devagonda

2.0k views

Vijay Devagonda commented Apr 11

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1 answer

5

Practice Material Question
If G is a connected graph with 6 vertices and maximum number of edges, then which of the following is true ? (a) Euler path exists, but Euler circuit does not exist in G. (b) Only Euler path exists in G. (c) Euler circuit does not exists in G (d) G is not traversable.

If G is a connected graph with 6 vertices and maximum number of edges, then which of the following is true ? (a) Euler path exists, but Euler circuit does not exist in G....

Sidd1425

97 views

Sidd1425 answered Apr 11

1 votes

1 answer

6

DRDO CSE 2022 Paper 1 | Question: 10
Given a tree $\text{T}$ and $\lambda \geq 2$ colours $\left(c_{1}, c_{2}, \ldots, c_{\lambda}\right),$ how many proper colourings of the tree $\text{T}$ are possible?

Given a tree $\text{T}$ and $\lambda \geq 2$ colours $\left(c_{1}, c_{2}, \ldots, c_{\lambda}\right),$ how many proper colourings of the tree $\text{T}$ are possible?

Deepa_125478

308 views

Deepa_125478 answered Apr 8

9 votes

1 answer

7

Graph Colouring
The minimum number of colours required to colour the following graph, such that no two adjacent vertices are assigned the same color, is

The minimum number of colours required to colour the following graph, such that no two adjacent vertices are assigned the same color, is

Deepa_125478

1.1k views

Deepa_125478 answered Apr 8

1 votes

3 answers

8

GATE CSE 2024 | Set 2 | Question: 50
The chromatic number of a graph is the minimum number of colours used in a proper colouring of the graph. The chromatic number of the following graph is __________.

The chromatic number of a graph is the minimum number of colours used in a proper colouring of the graph. The chromatic number of the following graph is __________.

ssingla

1.9k views

ssingla answered Mar 31

2 votes

2 answers

9

GATE CSE 2024 | Set 2 | Question: 7
Let $\text{A}$ be the adjacency matrix of a simple undirected graph $\text{G}$. Suppose $\text{A}$ is its own inverse. Which one of the following statements is always TRUE? $\text{G}$ is a cycle $\text{G}$ is a perfect matching $\text{G}$ is a complete graph There is no such graph $\text{G}$

Let $\text{A}$ be the adjacency matrix of a simple undirected graph $\text{G}$. Suppose $\text{A}$ is its own inverse. Which one of the following statements i...

Counsellor

2.8k views

Counsellor edited Mar 6

0 votes

1 answer

10

DISCRETE
Let T be a tree with n vertices and k be the maximum size of an independent set in T. Then the size of maximum matching in T is (A) k (B) n−k (C) (n−1)/2

Let T be a tree with n vertices and k be the maximum size of an independent set in T. Then the size of maximum matching in T is(A) k(B) n−k(C) (n−1)/2

ks824

468 views

ks824 answered Feb 21

31 votes

4 answers

11

GATE CSE 1989 | Question: 3-vi
Which of the following graphs is/are planar?

Which of the following graphs is/are planar?

Counsellor

7.8k views

Counsellor edited Feb 15

1 votes

0 answers

12

Gate 2016
The minimum number of colours that is sufficient to vertex-colour any planar graph is ________. I am confused with the question's language. please correct me if I have a wrong assumption. We need to tell the minimum colors required for a planar graph. Suppose I start ... is only fixed to 4. I understand the answer not to be less than 4. What does the word "any" means here?

The minimum number of colours that is sufficient to vertex-colour any planar graph is ________.I am confused with the question's language.please correct me if I have a wr...

shishir__roy

203 views

shishir__roy commented Feb 11

13 votes

1 answer

13

GO Classes Test Series 2024 | Mock GATE | Test 14 | Question: 15
Let $\mathrm{G}$ be a simple undirected graph on 8 vertices such that there is a vertex of degree 1 , a vertex of degree 2 , a vertex of degree 3 , a vertex of degree 4, a vertex of degree 5 , a vertex of degree 6 and ... of degree 7. Which of the following can be the degree of the last vertex? (Select all that are possible) 0 3 4 8

Let $\mathrm{G}$ be a simple undirected graph on 8 vertices such that there is a vertex of degree 1 , a vertex of degree 2 , a vertex of degree 3 , a vertex of degree 4, ...

24aaaa23

651 views

24aaaa23 commented Feb 10

3 votes

1 answer

14

GO Classes Test Series 2024 | Mock GATE | Test 13 | Question: 63
For an undirected graph $G$, let $\overline{G}$ refer to the complement (a graph on the same vertex set as $G$, with $(i, j)$ as an edge in $\overline{G}$ if and only if it is not an edge in $G$ ). Consider the following ... is equivalent to (iii) and (v). (i) is equivalent to (ii) and (iv). (i) is equivalent to (ii) and (v)

For an undirected graph $G$, let $\overline{G}$ refer to the complement (a graph on the same vertex set as $G$, with $(i, j)$ as an edge in $\overline{G}$ if and only if ...

Abhay123

444 views

Abhay123 commented Feb 7

6 votes

1 answer

15

GO Classes Test Series 2024 | Mock GATE | Test 14 | Question: 57
A strongly connected component $(\mathrm{SCC})$ of a directed graph $\mathrm{G}=(\mathrm{V}, \mathrm{E})$ ... ; edges in its associated directed acyclic graph $G^{\prime}$ be $A, B$ respectively, then what is $A+B?$

A strongly connected component $(\mathrm{SCC})$ of a directed graph $\mathrm{G}=(\mathrm{V}, \mathrm{E})$ is a maximal set of vertices such that any two vertices in the s...

Deepak Poonia

553 views

Deepak Poonia edited Feb 6

1 votes

0 answers

16

Memory Based GATE DA 2024 | Question: 64
Minimum Number of colors in concentric circles.

Minimum Number of colors in concentric circles.

Lakshman Bhaiya

137 views

Lakshman Bhaiya retagged Feb 4

40 votes

6 answers

17

GATE CSE 2019 | Question: 38
Let $G$ be any connected, weighted, undirected graph. $G$ has a unique minimum spanning tree, if no two edges of $G$ have the same weight. $G$ 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 following statements is/are TRUE? I only II only Both I and II Neither I nor II

Let $G$ be any connected, weighted, undirected graph.$G$ has a unique minimum spanning tree, if no two edges of $G$ have the same weight.$G$ has a unique minimum spanning...

viral8702

20.5k views

viral8702 commented Feb 3

16 votes

4 answers

18

GATE CSE 2022 | Question: 42
Which of the properties hold for the adjacency matrix $A$ of a simple undirected unweighted graph having $n$ vertices? The diagonal entries of $A^{2}$ ... . If there is at least a $1$ in each of $A\text{'s}$ rows and columns, then the graph must be connected.

Which of the properties hold for the adjacency matrix $A$ of a simple undirected unweighted graph having $n$ vertices?The diagonal entries of $A^{2}$ are the degrees of t...

John_Smith

7.4k views

John_Smith comment edited Feb 2

1 votes

1 answer

19

#self doubt
In the above figure, how many topological sorts are possible, I tried the following method, if we include 5 _ _ _ _ _ for 5 space 5c3 for (2,3,1) then 2 position is 4,0 so a total of 10 if we do like 4 5 _ _ _ _ then only ... GFG the total possible sorts are 13 can someone why this difference is coming ? https://www.geeksforgeeks.org/all-topological-sorts-of-a-directed-acyclic-graph/

In the above figure, how many topological sorts are possible,I tried the following method,if we include 5 _ _ _ _ _ for 5 space 5c3 for (2,3,1) then 2 position is 4,0 so ...

Dknights

146 views

Dknights commented Feb 1

4 votes

1 answer

20

GO Classes Test Series 2024 | Mock GATE | Test 12 | Question: 46
Assume the following graph is a labeled graph i.e. every vertex has a unique label. In how many ways can we color the following labeled graph $\mathrm{G}$ with six colors $\{R, G, B, W, Y, M\}$ such that no two adjacent vertices are assigned the same color?

Assume the following graph is a labeled graph i.e. every vertex has a unique label.In how many ways can we color the following labeled graph $\mathrm{G}$ with six colors ...

GO Classes Support

635 views

GO Classes Support commented Jan 25

73 votes

6 answers

21

GATE IT 2007 | Question: 25
What is the largest integer $m$ such that every simple connected graph with $n$ vertices and $n$ edges contains at least $m$ different spanning trees ? $1$ $2$ $3$ $n$

What is the largest integer $m$ such that every simple connected graph with $n$ vertices and $n$ edges contains at least $m$ different spanning trees ?$1$$2$$3$$n$

lijo

21.5k views

lijo commented Jan 25

7 votes

3 answers

22

ISRO2018-38
The number of edges in a regular graph of degree: $d$ and $n$ vertices is: maximum of $n$ and $d$ $n +d$ $nd$ $nd/2$

The number of edges in a regular graph of degree: $d$ and $n$ vertices is:maximum of $n$ and $d$ $n +d$$nd$$nd/2$

makhdoom ghaya

14.0k views

makhdoom ghaya edited Jan 24

65 votes

5 answers

23

GATE CSE 2003 | Question: 8, ISRO2009-53
Let $\text{G}$ be an arbitrary graph with $n$ nodes and $k$ components. If a vertex is removed from $\text{G}$, the number of components in the resultant graph must necessarily lie down between $k$ and $n$ $k-1$ and $k+1$ $k-1$ and $n-1$ $k+1$ and $n-k$

Let $\text{G}$ be an arbitrary graph with $n$ nodes and $k$ components. If a vertex is removed from $\text{G}$, the number of components in the resultant graph must neces...

makhdoom ghaya

15.4k views

makhdoom ghaya edited Jan 24

7 votes

2 answers

24

ISRO2007-62
Let $X$ be the adjacency matrix of a graph $G$ with no self loops. The entries along the principal diagonal of $X$ are all zeros all ones both zeros and ones different

Let $X$ be the adjacency matrix of a graph $G$ with no self loops. The entries along the principal diagonal of $X$ areall zerosall onesboth zeros and onesdifferent

makhdoom ghaya

3.7k views

makhdoom ghaya edited Jan 24

10 votes

5 answers

25

ISRO2011-35
How many edges are there in a forest with $v$ vertices and $k$ components? $(v+1) - k$ $(v+1)/2 - k$ $v - k$ $v + k$

How many edges are there in a forest with $v$ vertices and $k$ components?$(v+1) - k$$(v+1)/2 - k$$v - k$$v + k$

makhdoom ghaya

4.2k views

makhdoom ghaya edited Jan 24

2 votes

3 answers

26

N cube Graph
In N-cube graph we have no. of vertices = $2^N$ and no. of edges = $N*2^{N-1}$ Can anyone explain how we get this no. of edges?

In N-cube graph we have no. of vertices = $2^N$ and no. of edges = $N*2^{N-1}$Can anyone explain how we get this no. of edges?

ajayraho

7.5k views

ajayraho commented Jan 23

35 votes

6 answers

27

GATE CSE 2021 Set 1 | Question: 36
Let $G=(V, E)$ be an undirected unweighted connected graph. The diameter of $G$ is defined as: $\text{diam}(G)=\displaystyle \max_{u,v\in V} \{\text{the length of shortest path between $u$ and $v$}\}$ Let $M$ be the adjacency matrix of $G$. Define graph $G_2$ ... $\text{diam}(G_2) = \text{diam}(G)$ $\text{diam}(G)< \text{diam}(G_2)\leq 2\; \text{diam}(G)$

Let $G=(V, E)$ be an undirected unweighted connected graph. The diameter of $G$ is defined as:$$\text{diam}(G)=\displaystyle \max_{u,v\in V} \{\text{the length of shortes...

Ray Tomlinson

9.9k views

Ray Tomlinson commented Jan 22

28 votes

6 answers

28

GATE CSE 2020 | Question: 52
Graph $G$ is obtained by adding vertex $s$ to $K_{3,4}$ and making $s$ adjacent to every vertex of $K_{3,4}$. The minimum number of colours required to edge-colour $G$ is _______

Graph $G$ is obtained by adding vertex $s$ to $K_{3,4}$ and making $s$ adjacent to every vertex of $K_{3,4}$. The minimum number of colours required to edge-colour $G$ is...

Ray Tomlinson

13.6k views

Ray Tomlinson commented Jan 20

0 votes

0 answers

29

NIELIT 2017 July Scientist B (CS) - Section B: 2
Which of the following statements is/are TRUE for an undirected graph? Number of odd degree vertices is even Sum of degrees of all vertices is even P only Q only Both P and Q Neither P nor Q

Which of the following statements is/are TRUE for an undirected graph?Number of odd degree vertices is evenSum of degrees of all vertices is evenP onlyQ onlyBoth P and QN...

makhdoom ghaya

1.2k views

makhdoom ghaya edited Jan 18

0 votes

7 answers

30

NIELIT 2017 July Scientist B (CS) - Section B: 13
For the graph shown, which of the following paths is a Hamilton circuit? $ABCDCFDEFAEA$ $AEDCBAF$ $AEFDCBA$ $AFCDEBA$

For the graph shown, which of the following paths is a Hamilton circuit?$ABCDCFDEFAEA$$AEDCBAF$$AEFDCBA$$AFCDEBA$

makhdoom ghaya

2.1k views

makhdoom ghaya edited Jan 18

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