# graph data structure

What is the difference between the terms `edge` and `path` in graph data structure?

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Is this homework? –  Anthony Forloney Oct 1 '10 at 15:48

An edge is something that connects two nodes. A path is a series of edges in sequence that defines a "path" from node A to node B.

http://en.wikipedia.org/wiki/Graph_(data_structure)

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Edge: connects node one node to another. So there no nodes present between node A and B. eg. A<-->B or A-->B or A<---B.

Path: Connects 1 or more nodes to each other. So path contains 1 or more edges. eg. 1.) A---B---C : here path is ABC

``````2.)
A
/ \
``````

B C / D

Here different paths are A-B-C and A-C. Different edges are: A-B, B-C, A-C.

I hope this clears your doubt

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Edge is a connection between two vertices of the graph.

``````Consider the graph        a    b
6---4----5
|    | \ e
c |   d|  1
|    | / f
3----2
g
``````

a,b,c,d,e represents the edges of the graphs where as a path can be path from a to g that can be a,b,d,g or a,c,g.

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Edge is a point/dot ( maybe starting point, mid point, ending point).

Path is a line( sequence of point/dot makes a line).

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A graph is two tuple G = (V, E), where:

V -> set of vertices (points/nodes or whatever you call it)

E -> set of edges (a line which connects any two vertices)

Such that: (v,u) belongs to E (set of edges) => v, u belongs to V (set of vertices).

Now, when we talk about paths: These are series of connected edges, which starts from a vertex and ends in another vertex.

Then you have several types of graphs : i.e. Connected/disconnected directed/undirected weighted/unweighted graphs.