时间限制:10000ms
单点时限:1000ms
内存限制:256MB
描述
Given two positive integers N and M, please divide N into several integers A1, A2, ..., Ak (k >= 1), so that:
1. 0 < A1 < A2 < ... < Ak;
2. A1 + A2 + ... + Ak = N;
3. A1, A2, ..., Ak are different with each other;
4. The product of them P = A1 * A2 * ... * Ak is a multiple of M;
How many different ways can you achieve this goal?
输入
Two integers N and M. 1 <= N <= 100, 1 <= M <= 50.
输出
Output one integer -- the number of different ways to achieve this goal, module 1,000,000,007.
样例提示
There are 4 different ways to achieve this goal for the sample:
A1=1, A2=2, A3=4;
A1=1, A2=6;
A1=2, A2=5;
A1=3, A2=4.
- 样例输入
-
7 2
- 样例输出
-
4
说好的这题是动规呢?想了半天动规没想出来,写了个DFS,然后居然通过了。有空再想想。
#include <iostream>
#include <vector>
#include <algorithm>
using namespace std; typedef long long ll;
const ll MOD = ; int N, M; void dfs(ll &res, ll idx, ll sum, ll pro) {
if (sum == N) {
if (pro % M == ) ++res;
return;
}
for (int i = idx + ; i <= N - sum; ++i) {
dfs(res, i, sum + i, pro * i);
}
} void solve() {
ll res = ;
dfs(res, , , );
cout << res << endl;
} int main() {
while (cin >> N >> M) {
solve();
}
}