題面

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題解

不知道伯努利數是什么的可以先去看看這篇文章

多項式求逆預處理伯努利數就行

因為這里模數感人，所以得用\(MTT\)

//minamoto #include<bits/stdc++.h> #define R register #define ll long long #define fp(i,a,b) for(R int i=(a),I=(b)+1;i<I;++i) #define fd(i,a,b) for(R int i=(a),I=(b)-1;i>I;--i) #define go(u) for(int i=head[u],v=e[i].v;i;i=e[i].nx,v=e[i].v) using namespace std; char buf[1<<21],*p1=buf,*p2=buf; inline char getc(){return p1==p2&&(p2=(p1=buf)+fread(buf,1,1<<21,stdin),p1==p2)?EOF:*p1++;} ll read(){R ll res,f=1;R char ch;while((ch=getc())>'9'||ch<'0')(ch=='-')&&(f=-1);for(res=ch-'0';(ch=getc())>='0'&&ch<='9';res=res*10+ch-'0');return res*f; } const int N=5e5+5,K=50005,P=1e9+7;const double Pi=acos(-1.0); inline int add(R int x,R int y){return x+y>=P?x+y-P:x+y;} inline int dec(R int x,R int y){return x-y<0?x-y+P:x-y;} inline int mul(R int x,R int y){return 1ll*x*y-1ll*x*y/P*P;} int ksm(R int x,R int y){R int res=1;for(;y;y>>=1,x=mul(x,x))if(y&1)res=mul(res,x);return res; } struct cp{double x,y;cp(){}cp(R double xx,R double yy):x(xx),y(yy){}inline cp operator +(const cp &b)const{return cp(x+b.x,y+b.y);}inline cp operator -(const cp &b)const{return cp(x-b.x,y-b.y);}inline cp operator *(const cp &b)const{return cp(x*b.x-y*b.y,x*b.y+y*b.x);} }w[2][N]; int r[N],inv[N],ifac[N],fac[N],B[N],A[N],c[N],d[N],lim,l,n,k,res,nw; inline void init(int len){lim=1,l=0;while(lim<len)lim<<=1,++l;fp(i,0,lim-1)r[i]=(r[i>>1]>>1)|((i&1)<<(l-1)); } void FFT(cp *A,int ty){fp(i,0,lim-1)if(i<r[i])swap(A[i],A[r[i]]);for(R int mid=1;mid<lim;mid<<=1)for(R int j=0;j<lim;j+=(mid<<1))fp(k,0,mid-1){R cp x=A[j+k],y=A[j+k+mid]*w[ty][mid+k];A[j+k]=x+y,A[j+k+mid]=x-y;}if(!ty){R double k=1.0/lim;fp(i,0,lim-1)A[i].x*=k;} } void MTT(int *a,int *b,int len,int *c){init(len<<1);static cp A[N],B[N],C[N],D[N],E[N],G[N],F[N];fp(i,0,len-1){A[i].x=a[i]>>15,B[i].x=a[i]&32767,C[i].x=b[i]>>15,D[i].x=b[i]&32767,A[i].y=B[i].y=C[i].y=D[i].y=0;}fp(i,len,lim-1)A[i]=B[i]=C[i]=D[i]=cp(0,0);FFT(A,1),FFT(B,1),FFT(C,1),FFT(D,1);fp(i,0,lim-1)E[i]=A[i]*C[i],F[i]=A[i]*D[i]+B[i]*C[i],G[i]=B[i]*D[i];FFT(E,0),FFT(F,0),FFT(G,0);fp(i,0,lim-1)c[i]=(((ll)(E[i].x+0.5)%P<<30)+((ll)(F[i].x+0.5)<<15)+((ll)(G[i].x+0.5)))%P; } void Inv(int *a,int *b,int len){if(len==1)return b[0]=ksm(a[0],P-2),void();Inv(a,b,len>>1);MTT(a,b,len,c),MTT(c,b,len,d);fp(i,0,len-1)b[i]=dec(add(b[i],b[i]),d[i]); } inline void init(){for(R int i=1;i<(1<<17);i<<=1)fp(k,0,i-1)w[1][i+k]=cp(cos(Pi*k/i),sin(Pi*k/i)),w[0][i+k]=cp(cos(Pi*k/i),-sin(Pi*k/i));B[0]=ifac[0]=ifac[1]=inv[0]=inv[1]=fac[0]=fac[1]=1;fp(i,2,K+5){fac[i]=mul(fac[i-1],i),inv[i]=mul(P-P/i,inv[P%i]),ifac[i]=mul(ifac[i-1],inv[i]);}fp(i,0,K)A[i]=ifac[i+1];Inv(A,B,1<<16);fp(i,0,K)B[i]=mul(B[i],fac[i]); } inline int C(R int n,R int m){return m>n?0:1ll*fac[n]*ifac[m]%P*ifac[n-m]%P;} int main(){ // freopen("testdata.in","r",stdin);init();for(int T=read();T;--T){n=read()%P,k=read(),res=0,nw=n+1;for(R int i=k;~i;--i,nw=mul(nw,n+1))res=add(res,1ll*C(k+1,i)*B[i]%P*nw%P);res=mul(res,inv[k+1]),printf("%d\n",res);}return 0; }

轉載于:https://www.cnblogs.com/bztMinamoto/p/10534982.html

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