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| #include<cstdio> #include<math.h>
using namespace std; #define ll long long
const int N = 316250; int T, sn, id, cnt, prime[N]; ll n, g[N<<1], a[N<<1]; inline int Id(ll x){ return x<=sn?x:id-(n/x)+1;} ll S(ll a, int b){ if(a<prime[b]) return 0; ll ans=g[Id(a)]-(b-1)*4; for(int i=b, lim=sqrt(a); i<=cnt && prime[i]<=lim; ++i){ ans+=S(a/prime[i], i+1)*4+7; for(ll x=(ll)prime[i]*prime[i], j=7; x*prime[i]<=a; x*=prime[i], j+=3) ans+=S(a/x, i+1)*j+j+3; } return ans; } int main() { scanf("%d", &T); while(T--){ scanf("%lld", &n), sn=sqrt(n); cnt=id=0; for(ll i=1; i<=n; i=a[id]+1) a[++id]=n/(n/i), g[id]=(a[id]-1)*4; for(int i=2; i<=sn; ++i) if(g[i]!=g[i-1]){ prime[++cnt]=i; ll lim=(ll)i*i; for(int j=id; a[j]>=lim; --j) g[j]-=g[Id(a[j]/i)]-(cnt-1)*4; } printf("%lld\n", S(n, 1)+1); } return 0; }
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