Theoretically, you can implement BFS with only 2 states. There are some cases where having 3 states is useful. Two of them below:

Having three states for vertices (3 colors) is useful when computing the BFS tree. Any edge from a Discovered (D) node to an Undiscovered (U) node is a tree-edge. Any edge from a discovered node to a Processed (P) node is a back edge. Any edge from a discovered node to a discovered node is a cross edge.

As another example, lets assume you were writing a program to print out all the edges of an **undirected** graph. With 3 colors (U, D, P) you will process all edges that go from D to U (you are discovering a new vertex) and from D to D (you are discovering an edge between siblings). However, you will not process any edge from D to P. As this will be an edge that BFS used to discover the node at D. With 2 colors, you will not be able to write such a program without duplicating certain edges.

```
1----2
| |
| |
3----4
BFS starting at 1:
Tree Edges: {1, 2}, {1, 3}, {3, 4}
Cross Edge: {2, 4}
Without three states you will try to process {2, 1}, {3, 1}, {4, 3}, {4, 2}
```