There are n employees, each with a unique id from 0 to n - 1.
You are given a 2D integer array logs where logs[i] = [idi, leaveTimei] where:
idiis the id of the employee that worked on theithtask, andleaveTimeiis the time at which the employee finished theithtask. All the valuesleaveTimeiare unique.
Note that the ith task starts the moment right after the (i - 1)th task ends, and the 0th task starts at time 0.
Return the id of the employee that worked the task with the longest time. If there is a tie between two or more employees, return the smallest id among them.
Example 1:
Input: n = 10, logs = [[0,3],[2,5],[0,9],[1,15]] Output: 1 Explanation: Task 0 started at 0 and ended at 3 with 3 units of times. Task 1 started at 3 and ended at 5 with 2 units of times. Task 2 started at 5 and ended at 9 with 4 units of times. Task 3 started at 9 and ended at 15 with 6 units of times. The task with the longest time is task 3 and the employee with id 1 is the one that worked on it, so we return 1.
Example 2:
Input: n = 26, logs = [[1,1],[3,7],[2,12],[7,17]] Output: 3 Explanation: Task 0 started at 0 and ended at 1 with 1 unit of times. Task 1 started at 1 and ended at 7 with 6 units of times. Task 2 started at 7 and ended at 12 with 5 units of times. Task 3 started at 12 and ended at 17 with 5 units of times. The tasks with the longest time is task 1. The employees that worked on it is 3, so we return 3.
Example 3:
Input: n = 2, logs = [[0,10],[1,20]] Output: 0 Explanation: Task 0 started at 0 and ended at 10 with 10 units of times. Task 1 started at 10 and ended at 20 with 10 units of times. The tasks with the longest time are tasks 0 and 1. The employees that worked on them are 0 and 1, so we return the smallest id 0.
Constraints:
2 <= n <= 5001 <= logs.length <= 500logs[i].length == 20 <= idi <= n - 11 <= leaveTimei <= 500idi != idi+1leaveTimeiare sorted in a strictly increasing order.
class Solution:
def hardestWorker(self, n: int, logs: List[List[int]]) -> int:
ans = mx = last = 0
for uid, t in logs:
x = t - last
if mx < x:
mx = x
ans = uid
elif mx == x and ans > uid:
ans = uid
last = t
return ansclass Solution {
public int hardestWorker(int n, int[][] logs) {
int ans = 0, mx = 0, last = 0;
for (var e : logs) {
int uid = e[0], t = e[1];
int x = t - last;
if (mx < x) {
mx = x;
ans = uid;
} else if (mx == x && ans > uid) {
ans = uid;
}
last = t;
}
return ans;
}
}class Solution {
public:
int hardestWorker(int n, vector<vector<int>>& logs) {
int ans = 0, mx = 0, last = 0;
for (auto& e : logs) {
int uid = e[0], t = e[1];
int x = t - last;
if (mx < x) {
mx = x;
ans = uid;
} else if (mx == x && ans > uid) {
ans = uid;
}
last = t;
}
return ans;
}
};func hardestWorker(n int, logs [][]int) int {
ans, mx, last := 0, 0, 0
for _, e := range logs {
uid, t := e[0], e[1]
x := t - last
if mx < x {
mx, ans = x, uid
} else if mx == x && ans > uid {
ans = uid
}
last = t
}
return ans
}#define min(a,b) (((a) < (b)) ? (a) : (b))
int hardestWorker(int n, int **logs, int logsSize, int *logsColSize) {
int res = 0;
int max = 0;
int pre = 0;
for (int i = 0; i < logsSize; i++) {
int t = logs[i][1] - pre;
if (t > max || (t == max && res > logs[i][0])) {
res = logs[i][0];
max = t;
}
pre = logs[i][1];
}
return res;
}function hardestWorker(n: number, logs: number[][]): number {
let [ans, max_num] = logs[0];
for (let i = 1; i < logs.length; i++) {
let duration = logs[i][1] - logs[i - 1][1];
let id = logs[i][0];
if (duration > max_num || (duration == max_num && id < ans)) {
ans = id;
max_num = duration;
}
}
return ans;
}impl Solution {
pub fn hardest_worker(n: i32, logs: Vec<Vec<i32>>) -> i32 {
let mut res = 0;
let mut max = 0;
let mut pre = 0;
for log in logs.iter() {
let t = log[1] - pre;
if t > max || t == max && res > log[0] {
res = log[0];
max = t;
}
pre = log[1];
}
res
}
}