public class Solution
extends Object
1971 - Find if Path Exists in Graph\.
Easy
There is a **bi-directional** graph with `n` vertices, where each vertex is labeled from `0` to `n - 1` ( **inclusive** ). The edges in the graph are represented as a 2D integer array `edges`, where each edges[i] = [ui, vi] denotes a bi-directional edge between vertex ui and vertex vi. Every vertex pair is connected by **at most one** edge, and no vertex has an edge to itself.
You want to determine if there is a **valid path** that exists from vertex `source` to vertex `destination`.
Given `edges` and the integers `n`, `source`, and `destination`, return `true` _if there is a **valid path** from_ `source` _to_ `destination`_, or_ `false` _otherwise__._
**Example 1:**
**Input:** n = 3, edges = \[\[0,1],[1,2],[2,0]], source = 0, destination = 2
**Output:** true
**Explanation:** There are two paths from vertex 0 to vertex 2: - 0 → 1 → 2 - 0 → 2
**Example 2:**
**Input:** n = 6, edges = \[\[0,1],[0,2],[3,5],[5,4],[4,3]], source = 0, destination = 5
**Output:** false
**Explanation:** There is no path from vertex 0 to vertex 5.
**Constraints:**
* 1 <= n <= 2 * 105
* 0 <= edges.length <= 2 * 105
* `edges[i].length == 2`
* 0 <= ui, vi <= n - 1
* ui != vi
* `0 <= source, destination <= n - 1`
* There are no duplicate edges.
* There are no self edges.