题意:
给你一个n,你需要从1到n(闭区间)中选出来三个数a,b,c(可以a=b=c),用它们构成一个直角四面体的三条棱(可看图),问你从D点到下面的三角形做一条垂线h,问你1/h2的期望
题解:
那么1/h2=1/a2+1/b2+1/c2
总数就是n3
之后就是找分子怎么求,规律:
((1/a1*a1)*n*n+(1/a2*a2)*n*n+(1/an*an)*n*n)/(n*n*n)
a的取值从1到n
代码:
#include<stack> #include<queue> #include<map> #include<cstdio> #include<cstring> #include<iostream> #include<algorithm> #define fi first #define se second using namespace std; typedef long long ll; const int maxn=6e6+1; const int mod=998244353; ll dp[maxn]; ll ksc(ll a, ll b) { ll ans = 0; while( b > 0 ) { if( b&1 ) ans = (ans + a) % mod; a = ( a + a ) % mod; b >>= 1; } return ans; } ll ppow(ll a,ll b) { ll ans=1; while(b) { if(b&1) ans=(ans*a)%mod; a=(a*a)%mod; b>>=1; } return ans; } int main() { //printf("%d ",(15*ppow(8,mod-2))%mod); ll ans = 0; for (ll i = 1; i <= 6000001; i++) { ll x = ((i * i) % mod); ans = (ans + (ppow(x, mod - 2) % mod)); dp[i] = (ans * 3) % mod; } ll t; scanf("%lld",&t); while(t--) { ll n; scanf("%lld",&n); printf("%lld ",(ksc(dp[n],ppow(n,mod-2)))%mod); } return 0; }