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
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.