SOL:
拉格朗日插值啊。复杂度是O(nlogn)的。
but此题卡常数,只能套一个快速幂。还有一个要预处理掉。
#pragma GCC optimize("-O2") #include<bits/stdc++.h> #define LL long long #define mo 1000000007 #define N 50007 int t; LL n,k,ni[N],fi[N],anw[N],anp,ppp,ans,p[N],q[N]; inline LL qsm(LL x,LL y=mo-2){ static LL anw; for (anw=1;y;y>>=1,x=x*x%mo) if (y&1) anw=anw*x%mo; return anw; } using namespace std; signed main() { // freopen("aa.in","r",stdin); // freopen("a.out","w",stdout); scanf("%d",&t); fi[0]=1; for (int i=1;i<N;i++) fi[i]=fi[i-1]*i%mo; ni[N-1]=qsm(fi[N-1]); for (int i=N-1;i;i--) ni[i-1]=ni[i]*i%mo; while (t--) { scanf("%lld%lld",&n,&k); n%=mo; anp=1; for (int i=1;i<=k+2;i++) anw[i]=(anw[i-1]+qsm(i,k))%mo,anp=anp*(n-i)%mo; if (n<=k+2) { printf("%lld ",anw[n]); continue; } anp=(anp+mo)%mo; p[0]=q[k+3]=1; for (int i=1;i<=k+2;i++) p[i]=p[i-1]*(n-i)%mo; for (int i=k+2;i>=1;i--) q[i]=q[i+1]*(n-i)%mo; ans=0; for (int i=1;i<=k+2;i++) { ppp=p[i-1]*q[i+1]%mo*ni[k+2-i]%mo*ni[i-1]%mo; if (((i&1))^((k&1))) ppp=mo-ppp; ans=(ans+ppp*anw[i])%mo; } printf("%lld ",ans); } }