B、Basic Gcd Problem

$首先你需要了解题目给出的式子意义是什么$
$f(n) = \begin{cases} max_{i=1...n-1} c*f(gcd(i,n)), & n>1\\ 1, & n=1 \end{cases}$

$很明显最终的答案一定是c^x表现形式，如何让x最大就是我们需要求解的问题$
$根据唯一分解定理可以得知，一个合数可以拆成一系列的质数幂积$
$n=p_1^{w_1}+p_2^{w_2}...+p_n^{w_n}，这样我们容易发现题目中分解出来的x，只要我们按照质数去分解一定是最大的幂级$
$因为质数不能再次分解，那用个欧拉筛O(N)筛到素数，在最大O(log_2(n))的情况下分解质因数出来$
$再用快速幂求道 c^{\sum_{1\leq i\leq n}w_i}就是答案了$

#pragma GCC target("avx,sse2,sse3,sse4,popcnt")
#pragma GCC optimize("O2,O3,Ofast,inline,unroll-all-loops,-ffast-math")
#include <bits/stdc++.h>
using namespace std;
#define js ios::sync_with_stdio(false);cin.tie(0); cout.tie(0)
#define all(__vv__) (__vv__).begin(), (__vv__).end()
#define endl "\n"
#define pai pair<int, int>
#define mk(__x__,__y__) make_pair(__x__,__y__)
#define ms(__x__,__val__) memset(__x__, __val__, sizeof(__x__))
typedef long long ll; typedef unsigned long long ull; typedef long double ld;
inline ll read() { ll s = 0, w = 1; char ch = getchar(); for (; !isdigit(ch); ch = getchar()) if (ch == '-') w = -1; for (; isdigit(ch); ch = getchar())    s = (s << 1) + (s << 3) + (ch ^ 48); return s * w; }
inline void print(ll x) { if (!x) { putchar('0'); return; } char F[40]; ll tmp = x > 0 ? x : -x; if (x < 0)putchar('-');    int cnt = 0;    while (tmp > 0) { F[cnt++] = tmp % 10 + '0';        tmp /= 10; }    while (cnt > 0)putchar(F[--cnt]); }
inline ll gcd(ll x, ll y) { return y ? gcd(y, x % y) : x; }
ll qpow(ll a, ll b) { ll ans = 1;    while (b) { if (b & 1)    ans *= a;        b >>= 1;        a *= a; }    return ans; }    ll qpow(ll a, ll b, ll mod) { ll ans = 1; while (b) { if (b & 1)(ans *= a) %= mod; b >>= 1; (a *= a) %= mod; }return ans % mod; }
inline int lowbit(int x) { return x & (-x); }
const int dir[][2] = { {0,1},{1,0},{0,-1},{-1,0},{1,1},{1,-1},{-1,1},{-1,-1} };
const int MOD = 1e9 + 7;
const int INF = 0x3f3f3f3f;

const int N = 1e6 + 7;

vector<int>    prime;
bool vis[N];
int cnt, n, m;

void getprime() { // 欧拉筛法求素数表O(n)
    memset(vis, true, sizeof(vis));
    cnt = 0;
    for (int i = 2; i < N; ++i) {
        if (vis[i]) prime.push_back(i), ++cnt;
        for (int j = 0; j < cnt; ++j) {
            if (i * prime[j] > n) break;
            vis[i * prime[j]] = false;
            if (i % prime[j] == 0) break;
        }
    }
}

map<int, int> fun(int x) {
    map<int, int> res;
    for (int i = 0; prime[i] * prime[i] <= x and i < cnt; ++i) {
        while (x % prime[i] == 0)
            ++res[prime[i]], x /= prime[i];
    }
    if (x != 1)    ++res[x];
    return res;
}

int main() {
    getprime();
    int T = read();
    while (T--) {
        int n = read(), c = read();
        auto mp = fun(n);
        int m = 0;
        for (auto it : mp)    m += it.second;
        print(qpow(c, m, MOD)), putchar(10);
    }
    return 0;
}

F、Finding the Order

$依次给你AC，AD，BC，BD的长度，叫你判断这个梯形是AC为腰还是AD为腰？$
$连接对角线，假设AD是一条腰，过点C做BD的平行线交AB为点E的话$
$四边形DBEC是平行四边形，所以CD=BE$
$所以AE=CD+AB$
$又因为三角形ACE中，两边之和大于第三边所以AC+CE>AE$
$所以替换过来就是AC+BD>AB+CD，推导出梯形的对角线之和大于腰之和$
$接着直接去判断答案即可$

#pragma GCC target("avx,sse2,sse3,sse4,popcnt")
#pragma GCC optimize("O2,O3,Ofast,inline,unroll-all-loops,-ffast-math")
#include <bits/stdc++.h>
using namespace std;
#define js ios::sync_with_stdio(false);cin.tie(0); cout.tie(0)
#define all(__vv__) (__vv__).begin(), (__vv__).end()
#define endl "\n"
#define pai pair<int, int>
#define mk(__x__,__y__) make_pair(__x__,__y__)
#define ms(__x__,__val__) memset(__x__, __val__, sizeof(__x__))
typedef long long ll; typedef unsigned long long ull; typedef long double ld;
inline ll read() { ll s = 0, w = 1; char ch = getchar(); for (; !isdigit(ch); ch = getchar()) if (ch == '-') w = -1; for (; isdigit(ch); ch = getchar())    s = (s << 1) + (s << 3) + (ch ^ 48); return s * w; }
inline void print(ll x) { if (!x) { putchar('0'); return; } char F[40]; ll tmp = x > 0 ? x : -x; if (x < 0)putchar('-');    int cnt = 0;    while (tmp > 0) { F[cnt++] = tmp % 10 + '0';        tmp /= 10; }    while (cnt > 0)putchar(F[--cnt]); }
inline ll gcd(ll x, ll y) { return y ? gcd(y, x % y) : x; }
ll qpow(ll a, ll b) { ll ans = 1;    while (b) { if (b & 1)    ans *= a;        b >>= 1;        a *= a; }    return ans; }    ll qpow(ll a, ll b, ll mod) { ll ans = 1; while (b) { if (b & 1)(ans *= a) %= mod; b >>= 1; (a *= a) %= mod; }return ans % mod; }
inline int lowbit(int x) { return x & (-x); }
const int dir[][2] = { {0,1},{1,0},{0,-1},{-1,0},{1,1},{1,-1},{-1,1},{-1,-1} };
const int MOD = 1e9 + 7;
const int INF = 0x3f3f3f3f;

const int N = 1e5 + 7;

int main() {
    int T = read();
    while (T--) {
        int a = read(), b = read(), c = read(), d = read();
        if (b + c > a + d) puts("AB//CD");
        else puts("AB//DC");
    }
    return 0;
}

2020牛客暑期多校训练营（第四场）

B、Basic Gcd Problem

F、Finding the Order