刚学了揹包,今天又看了完全揹包,非常兴奋的就去做了一道题,现将题解分享给跟我一样的小菜鸟~
题意分析:现有一个重量为E的存储罐,要求装满后重量达到F。里面有N种硬币,每种硬币的质量和价值分别为P,W,现求出储存罐装满后,可能的最小价值。
传统揹包问题中往往是求解揹包装满后的最大价值。这需要我们的逆向思维,由max 转化为 min
注意:题目要求的是在储存罐装满的情况下,故需要关注一下初始化问题
有两个重要数组:
dp[i] :存储罐的容量为I时,所装的硬币容量是否也为i(你最多能装多少是由w[i]决定的)
初始化 为零
ser[i] :重量为i时的价值
ser[0]=0,其余初始化为正无穷大
状态转移方程
dp[ j ]=max(dp[j],dp[j-w[i]]+w[i]);对重量的监控
ser[ j ] = min(ser[j],ser[j-w[i]]+P[i])//对价值的监控
题目如下:
Piggy-Bank
Time Limit: 2000/1000 MS (Java/Others) Memory Limit: 65536/32768 K (Java/Others)Total Submission(s): 10078 Accepted Submission(s): 5078
But there is a big problem with piggy-banks. It is not possible to determine how much money is inside. So we might break the pig into pieces only to find out that there is not enough money. Clearly, we want to avoid this unpleasant situation. The only possibility is to weigh the piggy-bank and try to guess how many coins are inside. Assume that we are able to determine the weight of the pig exactly and that we know the weights of all coins of a given currency. Then there is some minimum amount of money in the piggy-bank that we can guarantee. Your task is to find out this worst case and determine the minimum amount of cash inside the piggy-bank. We need your help. No more prematurely broken pigs!
现给出AC代码
#include <iostream>
#include<string.h>
#include<cstdio>
using namespace std;
const int MAX = 10000+10;
const int index = 500 + 20;
int P[index];
int W[index];
int dp[MAX];
int res[MAX];
int T,E,F,N;
int main()
{
scanf("%d",&T);
int i,j;
while(T--)
{
//求出最大的重量(符合要求的重量或是规定的重量)
memset(dp,0,sizeof(dp));
memset(res,0x3f,sizeof(res));//赋值无穷大
res[0]=0; //当储存罐里的钱是0的时候,最小价值也为0
scanf("%d%d",&E,&F);
int ans = F-E;
scanf("%d",&N);
for(int i = 1; i <= N; i++)
{
scanf("%d%d",&P[i],&W[i]);
}
for(i = 1; i <= N; i++)
{
for(j = W[i]; j <= ans; j++)
{
dp[j] = max(dp[j],dp[j-W[i]] + W[i]);
res[j]=min(res[j],res[j-W[i]]+P[i]);
}
}
if(dp[ans] == ans)
{
printf("The minimum amount of money in the piggy-bank is %d.\n",res[ans]);
}
else
{
cout << "This is impossible." << endl;
}
}
return 0;
}