Search results
Rotten Oranges. Difficulty: Medium Accuracy: 46.02% Submissions: 139K+ Points: 4. Given a grid of dimension nxm where each cell in the grid can have values 0, 1 or 2 which has the following meaning: 0 : Empty cell. 1 : Cells have fresh oranges. 2 : Cells have rotten oranges.
Apr 25, 2024 · 2: Cells have rotten oranges; The task is to the minimum time required so that all the oranges become rotten. A rotten orange at index (i,j ) can rot other fresh oranges which are its neighbors (up, down, left, and right). If it is impossible to rot every orange then simply return -1.
Dec 26, 2022 · Given a matrix of dimension m * n where each cell in the matrix can have values 0, 1, or 2 which has the following meaning: 0: Empty cell. 1: Cells have fresh oranges. 2: Cells have rotten oranges. So the task is to determine what is the minimum time required so that all the oranges become rotten.
We would like to show you a description here but the site won’t allow us.
We would like to show you a description here but the site won’t allow us.
Nov 11, 2021 · The key observation is that fresh oranges adjacent to rotten oranges are rotten on day 1, those adjacent to those oranges are rotten on day 2, and so on. The phenomenon is similar to a level order traversal on a graph, where all the initial rotten oranges act as root nodes.
Rotting Oranges - You are given an m x n grid where each cell can have one of three values: * 0 representing an empty cell, * 1 representing a fresh orange, or * 2 representing a rotten orange. Every minute, any fresh orange that is 4-directionally adjacent to a rotten orange becomes rotten.
Can you solve this real interview question? Rotting Oranges - Level up your coding skills and quickly land a job. This is the best place to expand your knowledge and get prepared for your next interview.
Sep 13, 2020 · Problem statement. You have been given a grid containing some oranges. Each cell of this grid has one of the three integers values: Value 0 - representing an empty cell. Value 1 - representing a fresh orange. Value 2 - representing a rotten orange. Every second, any fresh orange that is adjacent (4-directionally) to a rotten orange becomes rotten.
Jan 15, 2024 · Approach. I approach this problem using a breadth-first search (BFS) strategy. I iterate through the grid, identifying initially rotten oranges and enqueueing their positions. Additionally, I count the number of initially fresh oranges.
