Description
Many years ago , in Teddy’s hometown there was a man who was called “Bone Collector”. This man like to collect varies of bones , such as dog’s , cow’s , also he went to the grave …
The bone collector had a big bag with a volume of V ,and along his trip of collecting there are a lot of bones , obviously , different bone has different value and different volume, now given the each bone’s value along his trip , can you calculate out the maximum of the total value the bone collector can get ?
The bone collector had a big bag with a volume of V ,and along his trip of collecting there are a lot of bones , obviously , different bone has different value and different volume, now given the each bone’s value along his trip , can you calculate out the maximum of the total value the bone collector can get ?
Input
The first line contain a integer T , the number of cases.
Followed by T cases , each case three lines , the first line contain two integer N , V, (N <= 1000 , V <= 1000 )representing the number of bones and the volume of his bag. And the second line contain N integers representing the value of each bone. The third line contain N integers representing the volume of each bone.
Followed by T cases , each case three lines , the first line contain two integer N , V, (N <= 1000 , V <= 1000 )representing the number of bones and the volume of his bag. And the second line contain N integers representing the value of each bone. The third line contain N integers representing the volume of each bone.
Output
One integer per line representing the maximum of the total value (this number will be less than 2 31).
Sample Input
1
5 10
1 2 3 4 5
5 4 3 2 1
Sample Output
14
解题思路:
题目大意就是,给定一定数目的物体这些都有一定的体积和价值,需要我们将这些物体装到一个体积固定的背包中去,问我们需要怎样放才能使这个背包装的价值最大,需要我们输出这个最大的价值。这是一个01背包问题,我们对于一个物体只有放和不放这两种选择,套用01背包的模版可以解决这个问题.
程序代码:
#include<stdio.h> #include<stdlib.h> int DP(int w[],int v[],int N,int M) { int f[1024]={0}; for( int i=1; i<=N; i++ ) { for( int j=M; j>=0; j-- ) { if( j>=v[i]&&f[ j ]<f[j-v[i]]+w[i] ) f[ j ]= f[ j-v[i] ] + w[i]; } } return f[M]; } int main() { int n,N,M; int v[1005],w[1005]; scanf( "%d",&n ); for( int i=0; i<n; i++ ) { scanf( "%d%d",&N,&M ); for( int j=1; j<=N; j++ ) scanf( "%d",&w[j] ); for( int k=1; k<=N; k++ ) scanf( "%d",&v[k] ); printf( "%d ",DP( w , v, N ,M ) ); } return 0; }