Bet(The 2016 ACM-ICPC Asia China-Final Contest 思路题)
题目:
The Codejamon game is on fire! Fans across the world are predicting and betting on which team will win the game.
A gambling company is providing betting odds for all teams; the odds for the ith team is Ai :Bi . For each team, you can bet any positive amount of money, and you do not have to bet the same amount on each team. If the ith team wins, you get your bet on that team back, plus Bi / Ai times your bet on that team.
For example, suppose that there are two teams, with odds of 5:3 and 2:7 and you bet ¥20 on the first team and ¥10 on the second team. If the first team wins, you will lose your ¥10 bet on the second team, but you will receive your ¥20 bet back, plus 3/5 × 20 = 12, so you will have a total of ¥32 at the end. If the second team wins, you will lose your ¥20 bet on the first team, but you will receive your ¥10 bet back, plus 7/2 × 10 = 35, so you will have a total of ¥45 at the end. Either way, you will have more money than you bet (¥20+¥10=¥30).
As a greedy fan, you want to bet on as many teams as possible to make sure that as long as one of them wins, you will always end up with more money than you bet. Can you figure out how many teams you can bet on?
Input:
The input starts with one line containing exactly one integer T, which is the number of test cases. Each test case starts with one line containing an integer N: the number of teams in the game. Then, N more lines follow. Each line is a pair of numbers in the form Ai :Bi (that is, a number Ai, followed by a colon, then a number Bi , with no spaces in between), indicating the odds for the ith team.
Output:
For each test case, output one line containing “Case #x: y”, where x is the test case number (starting from 1) and y is the maximum number of teams that you can bet on, under the conditions specified in the problem statement.
Note:
In sample case #1, one optimal strategy is to bet 1.5 dollars on the first team and 1.5 dollars on the third team. If the first team wins, you will get 1.5 + 1.5 × (1.1/1) = 3.15 dollars back, and if the third team wins, you will get 1.5 + (1.7/1.5) × 1.5 = 3.2 dollars back. Both of these are higher than the total money that you bet (1.5 + 1.5 = 3 dollars). However, there is no way to bet on all three teams and be guaranteed a profit.
题意:
有n个队伍,你现在对某些队伍下注,要求下注的队伍的个数尽量多,而且只要下注的队伍中有一支队伍获胜就能赚回本来,问最多可以下注多少支队伍。
思路:
要想一支队伍赢就能赚回本来,那每支队伍赢了至少要赚回本来。所以可以用本钱来求下注的钱数。设下注的钱数为x,则sum = x*(1+b/a);,之后对数组排序求和,当和大于等于本钱时退出。
PS:
这个题卡long double,卡到怀疑思路错了,最后队友题意试一下long double,竟然过了!!!
long double 要比double表示的范围大,表示的精度也更大。相应的计算的时候速度也就慢了点。
#include <iostream> #include <cstring> #include <cstdio> #include <algorithm> #include <queue> #include <map> #include <set> #include <vector> using namespace std; typedef long long ll; const int maxn = 1e5+10; long double a[110]; int main() { ios::sync_with_stdio(false); int T,n,cnt=1; char ch; cin>>T; while(T--) { memset(a,0,sizeof(a)); long double sum = 1.0,aa,b; cin>>n; for(int i = 0; i<n; i++) { cin>>aa>>ch>>b; a[i] = sum/(1.0+b/aa); } sort(a,a+n); int ans = 0; long double res = 0.0; for(int i = 0; i<n; i++) { res += a[i]; if(res<sum) ans++; else break; } cout<<"Case #"<<cnt++<<": "<<ans<<endl; } return 0; } /* 样例输入: 1 3 1:1.1 1:0.2 1.5:1.7 样例输出: Case #1: 2 */