题目大意:求$lcm(1,2,3,cdots,n)pmod{100000007}$,$nleqslant10^8$
题解:先线性筛出质数,然后求每个质数最多出现的次数,可以用$log_in$来求,$i$为该质数。使用换底公式$log_in=dfrac{log_2n}{log_2i}$。
卡点:模数是$10^8+7$,看成$10^9+7$
C++ Code:
#include <algorithm>
#include <bitset>
#include <cstdio>
#include <cmath>
const int mod = 1e8 + 7;
inline int pw(int base, int p) {
static int res;
for (res = 1; p; p >>= 1, base = static_cast<long long> (base) * base % mod) if (p & 1) res = static_cast<long long> (res) * base % mod;
return res;
}
std::bitset<100000010> npri;
int plist[5761460], ptot;
void sieve(const int n) {
for (register int i = 2; i <= n; ++i) {
if (!npri[i]) plist[ptot++] = i;
for (register int j = 0, t; (t = plist[j] * i) <= n; ++j) {
npri.set(t);
if (i % plist[j] == 0) break;
}
}
}
int n;
long long ans = 1;
int main() {
scanf("%d", &n);
sieve(n);
for (register int i = 0; i < ptot; ++i) {
ans = ans * pw(plist[i], static_cast<int> (log2(n) / log2(plist[i]))) % mod;
}
printf("%lld
", ans);
return 0;
}