For non-negative weighted edges graph problem Dijkstra itself solves given problem.
A quote from wiki
The algorithm exists in many variants; Dijkstra's original variant
found the shortest path between two nodes, but a more common variant
fixes a single node as the "source" node and finds shortest paths from
the source to all other nodes in the graph, producing a shortest-path
Consider following pseudo code from wiki:
1 function Dijkstra(Graph, source):
3 create vertex set Q
5 for each vertex v in Graph: // Initialization
6 dist[v] ← INFINITY // Unknown distance from source to v
7 prev[v] ← UNDEFINED // Previous node in optimal path from source
8 add v to Q // All nodes initially in Q (unvisited nodes)
10 dist[source] ← 0 // Distance from source to source
12 while Q is not empty:
13 u ← vertex in Q with min dist[u] // Node with the least distance will be selected first
14 remove u from Q
16 for each neighbor v of u: // where v is still in Q.
17 alt ← dist[u] + length(u, v)
18 if alt < dist[v]: // A shorter path to v has been found
19 dist[v] ← alt
20 prev[v] ← u
22 return dist, prev
with each new iteration of
while (12), first step it to pick the vertex
u with shortest distance from the remaining set
Q (13) and then that vertex is removed from the
Q (14) notifying that shortest distance to
u has been achieved. If
u is your destination then you can halt without considering further edges.
Note that all vertices were used but not all edges and shortest path to all vertices was not yet found.