大水题,二项式定理即可(忘得差不多了)
对于一个二项式,\((a+b)^n\)的结果为
\(\sum_{k=0}^{k<=n}C_{n}^{k}a^{n-k}b^k\)
证明:
由数学归纳法,当\(n=1\),左边=\(a+b\),右边=\(C^{0}_{1}a+C_1^1b\)
设\(n=k\)时该式成立,则\(n=k+1\)时,
=\((a+b)^n*(a+b)\)=\(a*\sum_{k=0}^{k<=n}C_{n}^{k}a^{n-k}b^k+b*\sum_{k=0}^{k<=n}C_{n}^{k}a^{n-k}b^k\)
=\(\sum_{k=0}^{k<=n}C_{n}^{k}a^{n-k+1}b^k+\sum_{k=0}^{k<=n}C_{n}^{k}a^{n-k}b^{k+1}\)
=\(\sum_{k=0}^{k<=n+1}C_{n}^{k+1}a^{n-k+1}b^{k+1}\)
markdown真麻烦。。。可能打错一些东西,欢迎拍砖
所以该题代码如下:
#include <iostream>
#include <cstdio>
#include <cstring>
#define int long long
using namespace std;
const int mod=10007;
int n,m,k,a,b,inv[mod+10],fac[mod+10];
int ksm(int d,int z) {
int res=1;
while(z) {
if(z&1) res*=d,res%=mod;
d*=d;d%=mod;
z>>=1;
}
return res;
}
void getinv() {
for(int i=k-1; i>=1; i--)
inv[i]=inv[i+1]*(i+1)%mod;
}
int C(int n,int m) {
return fac[m]*inv[n]%mod*inv[m-n]%mod;
}
signed main() {
cin>>a>>b>>k>>n>>m;
inv[0]=1;
fac[0]=fac[1]=1;
for(int i=2; i<=mod; i++) fac[i]=fac[i-1]*i%mod;
inv[k]=ksm(fac[k],mod-2);
getinv();
cout<<C(n,k)*ksm(a,n)%mod*ksm(b,m)%mod;
}