# Would Dijkstra's Algorithm go into dead end? [closed]

Say I have the following graph:

``````           e (destination)
|
| (1)
|
d
|
| (100)
|
(start)  a - - - b - - - c
(1)      (1)
``````

Would Dijkstra's algorithm run into a dead end? I think if I start from a, it will go a->b->c and went into dead end, therefore cannot reach e. Is that so?

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You have two `c`s in there - that does not make sense. –  us2012 Feb 12 at 4:10

## closed as not a real question by Mitch Wheat, billz, Nemo, BrokenGlass, GravitonFeb 17 at 8:30

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Obviously not. From the wikipedia description of Dijkstra's algorithm:

.3. For the current node, consider all of its unvisited neighbors and calculate their tentative distances.

That means that if you start at `a`, `b` and `d` are both examined (i.e. their tentative distances are calculated) because they are unvisited neighbours. Because `b` has the smaller tentative distance, you visit that one next.

For your update with the extra node `e`: You arrive at `c` as described above. But you're not stuck - there is still an unvisited node with a precalculated tentative distance, namely `d` - so you visit that one next.

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why? from a, you'll decide to go b, and then c. At c, all neighbors are visited. –  JASON Feb 12 at 4:18
No. As I said, starting from `a`, you immediately examine `b` and `d`. Only after that do you decide to 'go to b'. I don't know what else to say but "read the algorithm's description again". –  us2012 Feb 12 at 4:21
I think I do understand the description. Do you? if the sequence is not a->b->c, what it is? –  JASON Feb 12 at 4:23
Thanks. Now I see your point. –  JASON Feb 12 at 4:25