[USACO10MAR] Need For Speed S

题意翻译

Bassie正在为即将到来的赛车比赛作准备。 她有一辆赛车,重为M,且可以提供F的力。 现在她想要给这辆赛车安装一些零件(总共有N个零件),每个零件具有属性$M_i$和$F_i$,表示其重量以及可以提供的力。 设$X_i = 1\text{或}0$,表示第i个零件选或不选。 最大化$\frac{F+\sum_{i=1}^{n}X_i \times F_i}{M+\sum_{i=1}^{n}X_i \times M_i}$; 在此基础上最小化$\sum_{i=1}^{n}X_i \times M_i + M$。 输入格式: 第一行是三个用空格分开的数F,M,N 接下来N行,每行一个数,第i+1行的两个数代表$F_i$和$M_i$ 输出格式: 输出最终的,按照原始顺序排好序的方案$\{i | X_i = 1\}$ ,特别的,若Bassie不需要给这辆车安装零件,输出"None"(没有双引号)。 $N \le 10000 $ $M,M_i\le1000$ $F,F_i \le 1,000,000 $ 感谢@tyqtyq 提供的翻译

题目描述

Bessie is preparing her race car for the upcoming Grand Prix, but she wants to buy some extra parts to improve the car's performance. Her race car currently has mass M (1 <= M <= 1,000) and is able to push itself forward with a force of F (1 <= F <= 1,000,000). The Race Car Performance Store has N (1 <= N <= 10,000) parts conveniently numbered 1..N. Bessie can buy as many or as few parts as she wishes though the store stocks no more than one instance of each part. Part P\_i adds force F\_i (1 <= F\_i <= 1,000,000) and has mass M\_i (1 <= M\_i <= 1,000). Newton's Second Law decrees that F = MA, where F is force, M is mass, and A is acceleration. If Bessie wants to maximize the total acceleration of her race car (and minimize the mass otherwise), which extra parts should she choose? Consider a race car with initial F=1500 and M=100. Four parts are available for enhancement: i F\_i M\_i 1 250 25 2 150 9 3 120 5 4 200 8 Adding just part 2, e.g., would result in an acceleration of (1500+150)/(100+9) = 1650/109 = 15.13761. Below is a chart of showing the acceleration for all possible combinations of adding/not-adding the four parts (in column one, 1=part added, 0=part not added): Parts Aggregate Aggregate 1234 F M F/M 0000 1500 100 15.0000 0001 1700 108 15.7407 0010 1620 105 15.4286 0011 1820 113 16.1062 0100 1650 109 15.1376 0101 1850 117 15.8120 0110 1770 114 15.5263 0111 1970 122 16.1475 <-- highest F/M 1000 1750 125 14.0000 1001 1950 133 14.6617 1010 1870 130 14.3846 1011 2070 138 15.0000 1100 1900 134 14.1791 1101 2100 142 14.7887 1110 2020 139 14.5324 1111 2220 147 15.1020 Thus, the best additional part combination is parts 2, 3, and 4.

输入输出格式

输入格式


\* Line 1: Three space-separated integers: F, M, and N \* Lines 2..N+1: Line i+1 contains two space separated integers: F\_i and M\_i

输出格式


\* Lines 1..P: The index values of P extra parts, one per line, that Bessie should add to her racecar. If she should not add any, output 'NONE' (without quotes). The output should be given in increasing order, so if the optimal set of parts is {2,4,6,7}, then the output should be in the order 2,4,6,7 and not, for example, 4,2,7,6. Solutions will be unique.

输入输出样例

输入样例 #1

1500 100 4 
250 25 
150 9 
120 5 
200 8 

输出样例 #1

2 
3 
4