Algorithm Question 5. Below is a graph with edge lengths. Apply Dijkstra's algorithm to find the shortest paths, starting at vertex A, to all other vertices. Write down the sequence in which the...
You're running Dijkstra's algorithm to find all shortest paths starting with vertex A in the graph below, but you pause after vertex E has been added to the solution (and the relaxation step for vertex E has been performed). Annotate the graph as follows: (1) label each node with its current dist value, (2) darken the edges that are part of the current spanning tree (i.e., the parent links), (3) draw a dotted circle around the "cloud'' of vertices that...
Apply Dijkstra's algorithm to find the shortest distance from vertex 0 to every other vertex in the graph shown in Figure 1 below. You must show supporting. You need to list the paths and the minimum distances.
Consider the graph below. Use Dijkstra's algorithm to find the shortest path from vertex A to vertex F. Write your answer as a sequence of nodes separated by commas (no blank spaces) starting with the source node: _______ What's the weight of the shortest path? _______
Implement Dijkstra's algorithm to find the shortest path from vertex O to all other vertices in the graph below. Use the adjacency list representation to store and use the graph in memory. Do not use any other representation Use vertex 'A' as your source vertex (begin the algorithm from A). Your output should be of the following format with the second column filled out. The distance from the source vertex (second column) is the sum of weights on the shortest...
Consider the graph below. Use Dijkstra's algorithm to find the shortest path from vertex A to vertex C. Write your answer as a sequence of nodes with no blank spaces or any separators in between, starting with the source node: What's the weight of the shortest path?
Using the following graph and Dijkstra's algorithm, calculate the shortest distance to each other vertex starting from vertex A. Label all vertices with the total distance (from A). Indicate the order nodes are added to cloud. Draw a Minimum Spanning Tree for the graph. You should label all nodes in the tree, but you do not need to indicate edge weights or total distance. 2 D C L 7 6 2 7 2 A K B 4 7 4 1...
Consider the problem of finding the shortest paths in a weighted directed graph using Dijkstra's algorithm. Denote the set of vertices as V, the number of vertices as |V|, the set of edges as E, and the number of edges as |E|. Answer the following questions.Below is a pseudo-code of the algorithm that computes the length c[v] of the shortest path from the start node s to each node v. Answer code to fill in the blank _______ .
Question 5 (5 points) Apply Dijkstra's Algorithm to the following graph, computing the shortest path for al vertices from vertex A. Present the results after each vertex has been processed 3 20 B 47 20 You may wish to present the results in the format of the following table: Stage Current Vertex Labels and Distances A 0 A 0 D 231 A 213 E 4 F21 A 90 Each row states (a) the current stage, (b) the vertex just added...
2. Find the minimum weight paths from the black vertex to all the other vertices in the graph below using Dijkstra's algorithm. Show the value of the distance vector after each step. 8 14 20 25 2 18 11 16 10 16 6 17 2. Find the minimum weight paths from the black vertex to all the other vertices in the graph below using Dijkstra's algorithm. Show the value of the distance vector after each step. 8 14 20 25...
Run Dijkstra's algorithm on the graph G below, where s is the source vertex. Draw a table that shows the vertices in Q at each iteration. Write thed and I values of each vertex. Color the edges in the shortest-path tree, similar to the example from the notes. List the order in which vertices are added to S. Use the algorithm learned in class.