1) A graph is a collection of.... ?
a.    Row and columns
b.    Vertices and edges
c.    Equations
d.    None of these
Answer = B
 
2)  The degree of any vertex of graph is .... ?
a.    The number of edges incident with vertex
b.    Number of vertex in a graph
c.    Number of vertices adjacent to that vertex
d.    Number of edges in a graph
 
Answer = A
Explanation: The number of edges connected on a vertex v with the self loop counted twice is called the degree of vertex.

3) If for some positive integer k, degree of vertex d(v)=k for every vertex v of the graph G, then G is called... ?
a.    K graph
b.    K-regular graph
c.    Empty graph
d.    All of above
Answer = B
Explanation:  A graph in which all vertices are of equal degree is called regular graph.

4) A graph with no edges is known as empty graph. Empty graph is also known as... ?
a.    Trivial graph
b.    Regular graph
c.    Bipartite graph
d.    None of these
 
Answer = A
Explanation: Trivial graph is the second name for empty graph.

5) Length of the walk of a graph is .... ?
a.    The number of vertices in walk W
b.    The number of edges in walk W
c.    Total number of edges in a graph
d.    Total number of vertices in a graph
 
Answer = B
Explanation:  A walk is defined as finite altering sequence of vertices and edges. No Edges appear more than once but vertex may appear more than once.

6) If the origin and terminus of a walk are same, the walk is known as... ?
a.    Open
b.    Closed
c.    Path
d.    None of these
 
Answer = B
Explanation:  A walk which  begins and ends with same vertex is called closed walk otherwise it is open.

7) A graph G is called a ..... if it is a connected acyclic graph ?
a.    Cyclic graph
b.    Regular graph
c.    Tree
d.    Not a graph
 
Answer = C
Explanation: No explanation for this question.

8) Eccentricity of a vertex denoted by e(v) is defined by.... ?
a.    max { d(u,v): u belongs to v, u does not equal to v : where d(u,v) is the distance between u&v}
b.    min { d(u,v): u belongs to v, u does not equal to v }
c.    Both A and B
d.    None of these
 
Answer = A
Explanation:  The eccentricity E(v) of a vertex V in the graph is the distance from v to the vertex farthest from v in G.

9) Radius of a graph, denoted by rad(G) is defined by.... ?
a.    max {e(v): v belongs to V }
b.    min { e(v):  v belongs to V}
c.    max { d(u,v): u belongs to v, u does not equal to v }
d.    min { d(u,v): u belongs to v, u does not equal to v }
 
Answer = A
Explanation:  The diameter or radius of a graph G is largest distance between two vertices in the graph G.

10) The complete graph K, has... different spanning trees?
a.    n^n-2
b.    n*n
c.    n^n
d.    n^2
  ^ = raised to for exponent
Answer = A

11) A tour of G is a closed walk of graph G which includes every edge G at least once. A ..... tour of G is a tour which includes every edge of G exactly once ?
a.    Hamiltonian
b.    Planar
c.    Isomorphic
d.    Euler
 
Answer = D
Explanation: If some closed walk in a graph contains all the edges then the walk is called Euler.

12) Which of the following is not a type of graph ?
a.    Euler
b.    Hamiltonian
c.    Tree
d.    Path
 
Answer = D
Explanation:Path is a way from one node no another but not a graph.

13) Choose the most appropriate definition of plane graph ?
a.    A graph drawn in a plane in such a way that any pair of edges meet only at their end vertices
b.    A graph drawn in a plane in such a way that if the vertex set of graph can be partitioned into two non - empty disjoint subset X and Y in such a way that each edge of G has one end in X and one end in Y.
c.    A simple graph which is Isomorphic to Hamiltonian graph
d.    None of these
 
Answer = A
Explanation: No explanation for this question.

14) A continuous non - intersecting curve in the plane whose origin and terminus coincide ?
a.    Planer
b.    Jordan
c.    Hamiltonian
d.    All of these
 
Answer = B
Explanation: The jordan graph is the set of all vertices of minimum eccentricity that is the set of all vertices A where the greatest distance to other vertex B is minimal.

15) Polyhedral is.... ?
a.    A simple connected graph
b.    A plane graph
c.    A graph in which the degree of every vertex and every face is atleast 3
d.    All of above
 
Answer = D
Explanation: A polyhedral graph is the undirected graph formed from the vertices and edges of a convex polyhedron

16) A path in graph G, which contains every vertex of G once and only once ?
a.    Eulartour
b.    Hamiltonian Path
c.    Eular trail
d.    Hamiltonian tour
 
Answer = B
Explanation:A Hamiltonian circuit in a connected graph is defined as a closed walk that traverse every vertex of G exactly once except the starting vertex.

17) A minimal spanning tree of a graph G is.... ?
a.    A spanning sub graph
b.    A tree
c.    Minimum weights
d.    All of above
 
Answer = D
Explanation: A tree is said to be spanning tree of connected graph G if it is subgraph of G and contains all the vertices of G.

18) A tree having a main node, which has no predecessor is.... ?
a.    Spanning tree
b.    Rooted tree
c.    Weighted tree
d.    None of these
 
Answer = B
Explanation:A tree in which one vertex distinguish from all other is called rooted tree.

19) Diameter of a graph is denoted by diam(G) is defined by.... ?
a.    max (e(v) : v belongs to V)
b.    max( d(u,v) )
c.    Both A and B
d.    None of these
 
Answer = C
Explanation: The diameter of a graph G is largest distance between two vertices in a graph G.
 
20) A vertex of a graph is called even or odd depending upon ?
a.    Total number of edges in a graph is even or odd
b.    Total number of vertices in a graph is even or odd
c.    Its degree is even or odd
d.    None of these
 
Answer = C
Explanation: The vertex of a graph is called even or odd based on its degree.

21) Let A and B be any two arbitrary events then which one of the following is true ?
a.    P( A intersection B) = P(A). P(B)
b.    P(A union B) = P(A) + P(B)
c.    P(AB) = P(A intersection B). P(B)
d.    P(A union B) >= P(A) + P(B)
 
Answer = D

22) If X and Y be the sets. Then the set ( X - Y) union (Y- X) union (X intersection Y ) is equal to?
a.    X union Y
b.    Xc union Yc
c.    X intersection Y
d.    Xc intersection Yc
 
Answer = A

23) If G is an undirected planer graph on n vertices with e edges then ?
a.    e<=n
b.    e<=2n
c.    e<=3n
d.    None of these
 
Answer = B

24) Which of the following statement is false ?
a.    G is connected and is circuitless
b.    G is connected and has n edges
c.    G is minimally connected graph
d.    G is circuitless and has n-1 edges
 
Answer = B

25) Probability that two randomly selected cards from a set of two red and two black cards are of same color is ?
a.    1 / 2
b.    1 / 3
c.    2 / 3
d.    None of these
 
Answer = B

26) The number of circuits that can be created by adding an edge between any two vertices in a tree is ?
a.    Two
b.    Exactly one
c.    At least two
d.    None
 
Answer = B

27) In a tree between every pair of vertices there is ?
a.    Exactly one path
b.    A self loop
c.    Two circuits
d.    n number of paths
 
Answer = A