ACM-ICPC 2018 焦作网络预赛K-Transport Ship（多重背包）

ACM-ICPC 2018 焦作网络预赛K-Transport Ship

There are NNN different kinds of transport ships on the port. The ithi^{th}ith kind of ship can carry the weight of V[i]V[i]V[i] and the number of the ithi^{th}ith kind of ship is 2C[i]−12^{C[i]} - 12C[i]−1. How many different schemes there are if you want to use these ships to transport cargo with a total weight of SSS?

It is required that each ship must be full-filled. Two schemes are considered to be the same if they use the same kinds of ships and the same number for each kind.
Input

The first line contains an integer T(1≤T≤20)T(1 \le T \le 20)T(1≤T≤20), which is the number of test cases.

For each test case:

The first line contains two integers: N(1≤N≤20),Q(1≤Q≤10000)N(1 \le N \le 20), Q(1 \le Q \le 10000)N(1≤N≤20),Q(1≤Q≤10000), representing the number of kinds of ships and the number of queries.

For the next NNN lines, each line contains two integers: Vi,CiV[i](1 \le V[i] \le 20), C[i](1 \le C[i] \le 20)Vi,Ci, representing the weight the ithi^{th}ith kind of ship can carry, and the number of the ithi^{th}ith kind of ship is 2C[i]−12^{C[i]} - 12C[i]−1.

For the next QQQ lines, each line contains a single integer: S(1≤S≤10000)S(1 \le S \le 10000)S(1≤S≤10000), representing the queried weight.
Output

For each query, output one line containing a single integer which represents the number of schemes for arranging ships. Since the answer may be very large, output the answer modulo 100000000710000000071000000007.
样例输入

1
1 2
2 1
1
2

样例输出

0
1

题目来源

ACM-ICPC 2018 焦作赛区网络预赛

多重背包求方案数

code：

#include 
using namespace std;
typedef long long ll;
const int mod = 1e9+7;
const int maxn = 25;
const int maxm = 10010;
int v[maxn],c[maxn];
ll dp[maxm];

int main(){
    int T;
    scanf("%d",&T);
    while(T--){
        int n,q;
        scanf("%d%d",&n,&q);
        memset(dp,0,sizeof(dp));
        dp[0] = 1;
        for(int i = 1; i <= n; i++){
            scanf("%d%d",&v[i],&c[i]);
            ll cur = 1;
            for(int j = 1; j <= c[i]; j++){
                for(int k = 10000; k >= cur * v[i]; k--){
                    dp[k] = (dp[k] + dp[k-cur*v[i]]) % mod;
                }
                cur <<= 1;
            }
        }
        for(int i = 1; i <= q; i++){
            int s;
            scanf("%d",&s);
            printf("%lld\n",dp[s]);
        }
    }
    return 0;
}

多重背包详细讲解