What is the difference between these fundamental types?

In drawings I see that the directed has arrows, but what exactly is meant by these arrows in the directed graph and the lack thereof in the undirected graph?

  • 5
    Disagree. Graphs are covered in Cracking the Coding Interview, in "Trees and Graphs" under "Data Structures" section. This is classic computer science and is squarely in the purview of SO.
    – barclay
    Jun 29, 2016 at 18:17
  • 2
    @barclay I also liked the question but just for knowledge of all of us, Stack Exchange has a fully dedicated site for computer science related questions. So it can be a better fit there.
    – RBT
    Jul 19, 2018 at 0:20

7 Answers 7


It means exactly what it sounds like. In a directed graph, direction matters. i.e. edge 2->3 means that edge is directed. There is only an edge from 2 to 3 and no edge from 3 to 2. Therefore you can go from vertex 2 to vertex 3 but not from 3 to 2.

In undirected graph 2-3 means the edge has no direction, i.e. 2-3 means you can go both from 2 to 3 and 3 to 2.

Note that in the representation of your graph, if you are using an adjacency matrix, directed 2->3 means adj[2][3]=true but adj[3][2]=false. In undirected it means adj[2][3]=adj[3][2]=true.

  • Why aren't answers like this one easier to find via Google?? I always have to battle my way through SEO-optimized wall of text articles before finding a simple and great answer like this one. Kudos!
    – Prid
    Aug 11, 2022 at 0:28

The difference is the same as between one directional and bidirectional streets - in directed graph, the direction matters and you can't use the edge in the other direction. An undirected graph can be simulated using a directed graph by using pairs of edges in both directions.


All of the answers so far are right. Typically, a graph is depicted in diagrammatic form as a set of dots for the vertices, joined by lines or curves for the edges. The edges may be directed (asymmetric) or undirected (symmetric).

Imagine if the vertices represent people at a party. If there is an edge between the two people if they shake hands, then this is an undirected graph, because if person A shook hands with person B, then person B also shook hands with person A.

On the other hand, if the vertices represent people at a party, and there is an edge from person A to person B when person A knows of person B, then this graph is directed, because knowing of someone is not necessarily a symmetric relation.


Imagine graphs as a set of pumps( the circles) which can send liquid to others when are connected.In directed graphs the arrow show from where it comes and where the liquid (data) goes and in undirected graph it goes from both ways.Also a directed graph can have multiple arrows between two vertices(the pumps ) depending always on the graph.


A graph in which every edge is directed is called a Directed graph, and a graph in which every edge is undirected is called undirected graph.


In a directed graph, there is direction but in un-directed graph there is no direction.

Think in in terms of city network , where City A-> City B represents one way from City A to City B which means you can travel from City A to City B (may be through this path). It's an example of directed graph City c - City D represents the un-directed graph where you can travel in any direction


A directed graph is a graph in which edges have orientation (given by the arrowhead). This means that an edge (u, v) is not identical to edge (v, u). An example could be nodes representing people and edges as a gift from one person to another.

An undirected graph is a graph in which edges don't have orientation (no arrowhead). This means that an edge (u, v) is identical to edge (v, u). An example for this type of graph could be nodes representing cities and edges representing roads between cities.

Your Answer

By clicking “Post Your Answer”, you agree to our terms of service and acknowledge you have read our privacy policy.

Not the answer you're looking for? Browse other questions tagged or ask your own question.