题解 (by;zjvarphi)
这是一道纯分类讨论,然后推式子的题,细节挺多,挺麻烦,但是很考验数学能力
不讲了,官方题解给的很清楚
Code:
%: pragma GCC optimize("O9")
#include<bits/stdc++.h>
#define ri register signed
#define p(i) ++i
using namespace std;
namespace IO{
char buf[1<<21],*p1=buf,*p2=buf,OPUT[100];
#define gc() p1==p2&&(p2=(p1=buf)+fread(buf,1,1<<21,stdin),p1==p2)?(-1):*p1++
template<typename T>inline void read(T &x) {
ri f=1;x=0;register char ch=gc();
while(!isdigit(ch)) {if (ch=='-') f=0;ch=gc();}
while(isdigit(ch)) {x=(x<<1)+(x<<3)+(ch^48);ch=gc();}
x=f?x:-x;
}
template<typename T>inline void print(T x,char t) {
if (x<0) putchar('-'),x=-x;
if (!x) return putchar('0'),(void)putchar(t);
ri cnt(0);
while(x) OPUT[p(cnt)]=x%10,x/=10;
for (ri i(cnt);i;--i) putchar(OPUT[i]^48);
return (void)putchar(t);
}
}
using IO::read;using IO::print;
namespace nanfeng{
#define FI FILE *IN
#define FO FILE *OUT
#define int long long
template<typename T>inline T cmax(T x,T y) {return x>y?x:y;}
template<typename T>inline T cmin(T x,T y) {return x>y?y:x;}
static const int MOD=3e5+7;
int frac[MOD+7],inv[MOD+7],n,m,k,T,ans,bs1,bs2;
inline int fpow(int x,int y) {
int res(1);
while(y) {
if (y&1) res=res*x%MOD;
x=x*x%MOD;
y>>=1;
}
return res;
}
inline void init() {
bs1=fpow(2,MOD-2),bs2=fpow(3,MOD-2);
frac[1]=1;
for (ri i(2);i<=MOD-1;p(i)) frac[i]=frac[i-1]*i%MOD;
inv[MOD-1]=fpow(frac[MOD-1],MOD-2);
for (ri i(MOD-2);i;--i) inv[i]=inv[i+1]*(i+1)%MOD;
}
inline int C(int n,int m) {
if (n<m) return 0;
if (n==m||!m) return 1;
return frac[n]*inv[n-m]%MOD*inv[m]%MOD;
}
int lucas(int n,int m) {
if (n<m) return 0;
if (n==m||!m) return 1;
return C(n%MOD,m%MOD)*lucas(n/MOD,m/MOD)%MOD;
}
inline int MD(int &x) {return x=x>=MOD?x-MOD:x;}
inline int solve0() {
int tmp1=(lucas(n,k)*(m%MOD)%MOD+lucas(m,k)*(n%MOD)%MOD)%MOD;
int tmp2=(2*lucas(m+1,k+1)+2*lucas(m,k)*((n-m)%MOD)%MOD+2*lucas(m,k+1)%MOD)%MOD;
return (tmp1+tmp2)>=MOD?(tmp1+tmp2)-MOD:tmp1+tmp2;
}
inline int calc1(int x) {return bs2*x*(x+1)%MOD*(x+bs1)%MOD;}
inline int calc2(int x) {return (x*(x+1)>>1ll)%MOD;}
inline int solve1() {return (n%MOD)*(m%MOD)%MOD;}
inline int solve3() {
int x=(cmin(n+1,(m+2)>>1)-1)%MOD;
int y=(cmin(m+1,(n+2)>>1)-1)%MOD;
n%=MOD,m%=MOD;
int tmp1=2*(n*m*(x+y)%MOD+2*(calc1(x)+calc1(y))%MOD-(2*n+m)*calc2(x)%MOD-(2*m+n)*calc2(y)%MOD+MOD)%MOD;
int tmp2=4*(n*m%MOD*(m-1)%MOD+calc1(m-1)-(n+m)*calc2(m-1)%MOD+MOD)%MOD;
return (tmp1+tmp2+MOD)%MOD;
}
inline int solve4() {
int x=(cmin(n+1,(m+2)>>1)-1)%MOD;
int y=(cmin(m+1,(n+2)>>1)-1)%MOD;
int z=(m>>1)%MOD;
n%=MOD,m%=MOD;
int tmp1=2*(n*m%MOD*(x+y)%MOD+2*(calc1(x)+calc1(y))%MOD-(2*n+m)*calc2(x)%MOD-(2*m+n)*calc2(y)%MOD+MOD)%MOD;
int tmp2=(n*m%MOD*(m-1)%MOD+calc1(m-1)-(n+m)*calc2(m-1)%MOD+MOD)%MOD;
int tmp3=5*(n*m*z%MOD-2*(n+m)*calc2(z)%MOD+4*calc1(z)+MOD)%MOD;
return (tmp1+tmp2+tmp3+MOD)%MOD;
}
inline int solve5() {
int x=(m-1>>1)%MOD;
n%=MOD,m%=MOD;
int tmp=(2*n*m*x%MOD+8*calc1(x)%MOD-4*(n+m)*calc2(x)%MOD+MOD)%MOD;
return tmp;
}
inline int main() {
//FI=freopen("nanfeng.in","r",stdin);
//FO=freopen("nanfeng.out","w",stdout);
init();
read(T);
for (ri z(1);z<=T;p(z)) {
ans=0;
read(n),read(m),read(k);
if (n<m) swap(n,m);
if (k>1) ans=solve0();
switch(k) {
case 1:ans=solve1(),MD(ans);break;
case 3:ans+=solve3(),MD(ans);break;
case 4:ans+=solve4(),MD(ans);break;
case 5:ans+=solve5(),MD(ans);break;
default:break;
}
print(ans,'
');
}
return 0;
}
#undef int
}
int main() {return nanfeng::main();}