链接: 点击打开链接 ,密码xx316,Problem D
这个是我们队内练习比赛时出现过的一道题,比较有代表性的分步处理。思路比较好懂,同队的ZH同学WA了若干次,只是因为问号的位置不能笼统的认为是进或者是出,应该通过比较最大可进值(就是说在当前情况下最多能进入的人数,满足以后出去的人起码要等于进去的人。这样的话,对每一步的最大理论进人数进行比较即可得出最后的结果。
Description
The University administration plans to build a new dinner hall, to replace the several small (and rather inadequate) dinner halls spread over the campus. To estimate the number of places needed in the new dinner hall, they performed an experiment to measure the maximum total number of clients inside the existing dinner halls at any time. They hired several students as pollers , and positioned one poller at each entrance and each exit of the existing dinner halls. The pollers' task was to note in small cards the time each client entered or exited the hall (one card for each event). In each card they wrote the time, in the format HH:MM:SS, and the associated event (letter ` E ' for an entry, letter ` X ' for and exit).
The experiment started in the morning, before breakfast, and ended in the evening, after dinner. The pollers had their watches synchronized, and the halls were empty both before and after the experiment (that is, no client was inside a hall before the experiment began, and no client remained in a hall after the experiment ended). The pollers wrote exactly one card for every client who entered a hall and for every client who exited a hall.
After the experiment, the cards were collected and sent to the administration for processing. The task, however, was not as easy as planned, because two problems were detected. Firstly, the cards were bunched together in no particular order and therefore needed sorting; that is fairly easy, but time-consuming to do by hand. But what is worse is that, although all cards had a valid time, some pollers forgot to write the letter specifying the event. The University administration decided they needed help from an expert!
Given a set of cards with times and the indication of the event (the indication of the event may be missing), write a program to determine the maximum number of clients that could possibly had been inside the dinner halls in a given instant of time.
Input
The input contains several test cases. The first line of a test case contains one integer N indicating the number of cards collected in the experiment (2 N 64800) . Each of the next N lines contains the information written in a card, consisting of a time specification , followed by a single space, followed by an event specification . A time specification has the format HH : MM : SS , where HH represents hours (06 HH 23) , MM represents minutes (00 MM 59) and SS represents seconds (00 SS 59) . Within a test case, no two cards have the same time. An event specification is a single character: uppercase ` E ' for entry, uppercase ` X ' for exit and ` ? ' for unknown. Information may be missing, but the information given is always correct. That is, the times noted in all cards are valid. Also, if a card describes an entry, then a client did enter a hall at the informed time; if a card describes an exit, then a client did leave a hall at the informed time; and if a card describes an unknown event, then a client did enter or leave a hall at the informed time.
The last test case is followed by a line containing a single zero.
Output
For each test case in the input, your program must print a single line, containing one single integer, the maximum total number of clients that could have been inside the dinner halls in a given instant of time.
Sample Input
4 07:22:03 X 07:13:22 E 08:30:51 E 21:59:02 X 4 09:00:00 E 20:00:01 X 09:05:00 ? 20:00:00 ? 8 10:21:00 E 10:25:00 X 10:23:00 E 10:24:00 X 10:26:00 X 10:27:00 ? 10:22:00 ? 10:20:00 ? 0
Sample Output
1 2 4
代码重写了一遍,用的vector
#include <iostream> #include <vector> #include <algorithm> using namespace std; int max(int a,int b) { if(a>b) return a; else return b; } class student { public: int s; char t; }; bool cmp(student a,student b) { return a.s < b.s; } bool isentry(student n) { if(n.t=='E') return true; else return false; } bool isexit(student n) { if(n.t=='X') return true; else return false; } bool isunknown(student n) { if(n.t=='?') return true; else return false; } vector<student> dinner; int main() { int testcase; while(cin>>testcase && testcase!=0) { int jin=0,chu=0,unknown=0; int hour,min,sec; char tmp,t; dinner.clear(); for(int i=0;i<testcase;i++) { student needin; cin>>hour>>tmp>>min>>tmp>>sec>>t; needin.s=hour*3600+min*60+sec; needin.t=t; if(isentry(needin)) jin++; if(isexit(needin)) chu++; if(isunknown(needin)) unknown++; dinner.push_back(needin); } sort(dinner.begin(),dinner.end(),cmp); int maxin = (unknown-(jin-chu))/2; int currentin=0; int currmax=0; for(int i=0;i<dinner.size();i++) { if(isentry(dinner[i])) currentin++; if(isexit(dinner[i])) currentin--; if(isunknown(dinner[i])) { if(maxin!=0) { currentin++; maxin--; } else currentin--; } currmax=max(currmax,currentin); } cout<<currmax<<endl; } return 0; }