Graphs Data Structure Questions

To determine the order in which nodes are visited during the search.

To calculate the exact cost of the path from the start node to the current node.

To store the visited nodes to avoid cycles.

To estimate the cost of the cheapest path from the current node to the goal node.

Bellman-Ford algorithm and Floyd-Warshall algorithm

Dijkstra's algorithm and Bellman-Ford algorithm

Depth-First Search and Breadth-First Search

A* search algorithm and Dijkstra's algorithm

n

1

n - 1

n/2

It improves the time complexity for sparse graphs.

It allows the algorithm to handle negative edge weights.

It reduces the space complexity of the algorithm.

It simplifies the implementation of the algorithm.

O(E^2 * V)

O(V * E)

O(V^2 * E)

O(V + E)

Transforming a directed graph into an undirected graph.

Updating the distance to a node if a shorter path is found.

Reducing the priority of a node in the priority queue.

Removing edges that cannot contribute to the shortest path.

12 units

10 units

Cannot be determined

11 units

A* and Dijkstra's algorithm are entirely unrelated.

A* is only applicable to unweighted graphs, while Dijkstra's algorithm works for weighted graphs.

Dijkstra's algorithm is a special case of A* search.

A* is a generalization of Dijkstra's algorithm.

O(V log V)

O(V^2)

O(V^3)

O(E log V)

Finding all possible paths between two vertices in a graph.

Determining if a graph is connected.

Finding the shortest path in an unweighted, undirected graph.

Finding the shortest path in a weighted graph with a known heuristic estimate to the goal.