The Seven Bridges of Königsberg is a classic example of an Eulerian path.
Hierholzer's algorithm, from Wikipedia:
Choose any starting vertex v, and follow a trail of edges from that
vertex until returning to v. It is not possible to get stuck at any
vertex other than v, because the even degree of all vertices ensures
that, when the trail enters another vertex w there must be an unused
edge leaving w. The tour formed in this way is a closed tour, but may
not cover all the vertices and edges of the initial graph.
As long as
there exists a vertex v that belongs to the current tour but that has
adjacent edges not part of the tour, start another trail from v,
following unused edges until returning to v, and join the tour formed
in this way to the previous tour.
By using a data structure such as a
doubly linked list to maintain the set of unused edges incident to
each vertex, to maintain the list of vertices on the current tour that
have unused edges, and to maintain the tour itself, the individual
operations of the algorithm (finding unused edges exiting each vertex,
finding a new starting vertex for a tour, and connecting two tours
that share a vertex) may be performed in constant time each, so the
overall algorithm takes linear time.