PAT A1014 Waiting in Line (30 分)

Suppose a bank has N windows open for service. There is a yellow line in front of the windows which devides the waiting area into two parts. The rules for the customers to wait in line are:

  • The space inside the yellow line in front of each window is enough to contain a line with M customers. Hence when all the N lines are full, all the customers after (and including) the (NM+1)st one will have to wait in a line behind the yellow line.
  • Each customer will choose the shortest line to wait in when crossing the yellow line. If there are two or more lines with the same length, the customer will always choose the window with the smallest number.
  • Customer?i?? will take T?i?? minutes to have his/her transaction processed.
  • The first N customers are assumed to be served at 8:00am.

Now given the processing time of each customer, you are supposed to tell the exact time at which a customer has his/her business done.

For example, suppose that a bank has 2 windows and each window may have 2 custmers waiting inside the yellow line. There are 5 customers waiting with transactions taking 1, 2, 6, 4 and 3 minutes, respectively. At 08:00 in the morning, customer?1?? is served at window?1?? while customer?2?? is served at window?2??. Customer?3?? will wait in front of window?1?? and customer?4?? will wait in front of window?2??. Customer?5?? will wait behind the yellow line.

At 08:01, customer?1?? is done and customer?5?? enters the line in front of window?1?? since that line seems shorter now. Customer?2?? will leave at 08:02, customer?4?? at 08:06, customer?3?? at 08:07, and finally customer?5?? at 08:10.

Input Specification:

Each input file contains one test case. Each case starts with a line containing 4 positive integers: N (≤20, number of windows), M (≤10, the maximum capacity of each line inside the yellow line), K (≤1000, number of customers), and Q (≤1000, number of customer queries).

The next line contains K positive integers, which are the processing time of the K customers.

The last line contains Q positive integers, which represent the customers who are asking about the time they can have their transactions done. The customers are numbered from 1 to K.

Output Specification:

For each of the Q customers, print in one line the time at which his/her transaction is finished, in the format HH:MM where HH is in [08, 17] and MM is in [00, 59]. Note that since the bank is closed everyday after 17:00, for those customers who cannot be served before 17:00, you must output Sorry instead.

Sample Input:

2 2 7 5
1 2 6 4 3 534 2
3 4 5 6 7

Sample Output:

08:07
08:06
08:10
17:00
Sorry

#include <stdio.h>
#include <stdlib.h>
#include <math.h>
#include <algorithm>
#include <iostream>
#include <string.h>
#include <queue>
using namespace std;
const int maxn = 1010;
int n, m, k, q, now = 0;
int t[maxn] = { 0 };
int done[maxn] = { 0 };
int pre[maxn] = { 0 };
struct people {
    int id;
    int time;
    int time_const;
};
queue<people*> que[21];
int main() {
    scanf("%d %d %d %d", &n, &m, &k, &q);
    if (n == 0 || m == 0) {
        for (int i = 0; i < q; i++) {
            printf("Sorry\n");
        }
    }
    for (int i = 1; i <= k; i++) {
        int time;
        scanf("%d", &time);
        people *p = new people;
        p->id = i;
        p->time = time;
        p->time_const = time;
        if(i<=n*m)que[(i-1)%n].push(p);
        else {
            int first = 99999999, first_j = 0;
            for (int j = 0; j < n; j++) {
                if (que[j].front()->time < first) {
                    first = que[j].front()->time;
                    first_j = j;
                }
            }

            for (int j = 0; j < n; j++) {
                que[j].front()->time -= first;
            }
            people* tmp_p = que[first_j].front();
            que[first_j].pop();
            now += first;
            done[tmp_p->id] = now;
            que[first_j].push(p);
            pre[tmp_p->id] = now - tmp_p->time_const;
            delete(tmp_p);
        }
    }
    for (int i = 0; i < n; i++) {
        int tmp_now = now;
        while (!que[i].empty()) {
            people* tmp_p = que[i].front();

            que[i].pop();
            tmp_now += tmp_p->time;
            pre[tmp_p->id] = tmp_now - tmp_p->time_const;
            done[tmp_p->id] = tmp_now;
            delete(tmp_p);
        }
    }
    for (int i = 0; i < q; i++) {
        int j;
        scanf("%d", &j);
        //printf("%d %d\n", pre[j], done[j]);
        if (pre[j]>=540)printf("Sorry\n");
        else {
            printf("%02d:%02d\n", 8+done[j]/60,done[j]%60);
        }
    }
    system("pause");
}

注意点:考察队列知识,相对比较简单,有一个坑就是结束时间在17点后但开始时间17点前还是要输出时间的,一开始没注意就错了三个测试点。

原文地址:https://www.cnblogs.com/tccbj/p/10384598.html

时间: 2024-11-17 16:33:02

PAT A1014 Waiting in Line (30 分)的相关文章

PAT 甲级 1014 Waiting in Line (30 分)(queue的使用,模拟题,有个大坑)

1014 Waiting in Line (30 分) Suppose a bank has N windows open for service. There is a yellow line in front of the windows which devides the waiting area into two parts. The rules for the customers to wait in line are: The space inside the yellow line

A1014. Waiting in Line (30)

Suppose a bank has N windows open for service. There is a yellow line in front of the windows which devides the waiting area into two parts. The rules for the customers to wait in line are: The space inside the yellow line in front of each window is

PAT-1014 Waiting in Line (30 分) 优先队列

Suppose a bank has N windows open for service. There is a yellow line in front of the windows which devides the waiting area into two parts. The rules for the customers to wait in line are: The space inside the yellow line in front of each window is

1014. Waiting in Line (30)——PAT (Advanced Level) Practise

题目信息: 1014. Waiting in Line (30) 时间限制 400 ms 内存限制 32000 kB 代码长度限制 16000 B 判题程序 Standard 作者 CHEN, Yue Suppose a bank has N windows open for service. There is a yellow line in front of the windows which devides the waiting area into two parts. The rule

PAT 甲级 1049 Counting Ones (30 分)(找规律,较难,想到了一点但没有深入考虑嫌麻烦)***

1049 Counting Ones (30 分) The task is simple: given any positive integer N, you are supposed to count the total number of 1's in the decimal form of the integers from 1 to N. For example, given N being 12, there are five 1's in 1, 10, 11, and 12. Inp

PAT甲题题解-1014. Waiting in Line (30)-模拟,优先级队列

题意:n个窗口,每个窗口可以排m人.有k为顾客需要办理业务,给出了每个客户的办理业务时间.银行在8点开始服务,如果窗口都排满了,客户就得在黄线外等候.如果有一个窗口用户服务结束,黄线外的客户就进来一个.如果有多个可选,选窗口id最小的.输出查询客户的服务结束时间. 如果客户在17点(注意是包括的!!!就在这里被坑了,一开始还以为不包括...)或者以后还没开始服务,就输出Sorry如果已经开始了,无论多长都会继续服务的. 思路:建立一个优先级队列,存储在黄线之内的所有客户.对于m*n之前的人,依此

PAT (Advanced Level) 1014. Waiting in Line (30)

简单模拟题. #include<iostream> #include<cstring> #include<cmath> #include<algorithm> #include<cstdio> #include<map> #include<queue> using namespace std; struct X { int st; int len; int en; }p[1500]; queue<int>Q[2

1014. Waiting in Line (30)(模拟题)

Suppose a bank has N windows open for service. There is a yellow line in front of the windows which devides the waiting area into two parts. The rules for the customers to wait in line are: The space inside the yellow line in front of each window is

1014. Waiting in Line (30)

Suppose a bank has N windows open for service. There is a yellow line in front of the windows which devides the waiting area into two parts. The rules for the customers to wait in line are: The space inside the yellow line in front of each window is