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QOJ
| ID | 题目 | 提交者 | 结果 | 用时 | 内存 | 语言 | 文件大小 | 提交时间 | 测评时间 |
|---|---|---|---|---|---|---|---|---|---|
| #280286 | #7785. Three Rectangles | ucup-team133# | WA | 5ms | 5456kb | C++17 | 41.5kb | 2023-12-09 14:55:58 | 2023-12-09 14:55:59 |
Judging History
answer
// -fsanitize=undefined,
// #define _GLIBCXX_DEBUG
#pragma GCC target("avx2")
#pragma GCC optimize("O3")
#pragma GCC optimize("unroll-loops")
#include <iostream>
#include <vector>
#include <string>
#include <map>
#include <set>
#include <queue>
#include <algorithm>
#include <cmath>
#include <iomanip>
#include <random>
#include <stdio.h>
#include <fstream>
#include <functional>
#include <cassert>
#include <unordered_map>
#include <bitset>
#include <chrono>
#include <utility>
namespace atcoder {
namespace internal {
// @param m `1 <= m`
// @return x mod m
constexpr long long safe_mod(long long x, long long m) {
x %= m;
if (x < 0) x += m;
return x;
}
// Fast modular multiplication by barrett reduction
// Reference: https://en.wikipedia.org/wiki/Barrett_reduction
// NOTE: reconsider after Ice Lake
struct barrett {
unsigned int _m;
unsigned long long im;
// @param m `1 <= m < 2^31`
barrett(unsigned int m) : _m(m), im((unsigned long long)(-1) / m + 1) {}
// @return m
unsigned int umod() const { return _m; }
// @param a `0 <= a < m`
// @param b `0 <= b < m`
// @return `a * b % m`
unsigned int mul(unsigned int a, unsigned int b) const {
// [1] m = 1
// a = b = im = 0, so okay
// [2] m >= 2
// im = ceil(2^64 / m)
// -> im * m = 2^64 + r (0 <= r < m)
// let z = a*b = c*m + d (0 <= c, d < m)
// a*b * im = (c*m + d) * im = c*(im*m) + d*im = c*2^64 + c*r + d*im
// c*r + d*im < m * m + m * im < m * m + 2^64 + m <= 2^64 + m * (m + 1) < 2^64 * 2
// ((ab * im) >> 64) == c or c + 1
unsigned long long z = a;
z *= b;
#ifdef _MSC_VER
unsigned long long x;
_umul128(z, im, &x);
#else
unsigned long long x =
(unsigned long long)(((unsigned __int128)(z)*im) >> 64);
#endif
unsigned int v = (unsigned int)(z - x * _m);
if (_m <= v) v += _m;
return v;
}
};
// @param n `0 <= n`
// @param m `1 <= m`
// @return `(x ** n) % m`
constexpr long long pow_mod_constexpr(long long x, long long n, int m) {
if (m == 1) return 0;
unsigned int _m = (unsigned int)(m);
unsigned long long r = 1;
unsigned long long y = safe_mod(x, m);
while (n) {
if (n & 1) r = (r * y) % _m;
y = (y * y) % _m;
n >>= 1;
}
return r;
}
// Reference:
// M. Forisek and J. Jancina,
// Fast Primality Testing for Integers That Fit into a Machine Word
// @param n `0 <= n`
constexpr bool is_prime_constexpr(int n) {
if (n <= 1) return false;
if (n == 2 || n == 7 || n == 61) return true;
if (n % 2 == 0) return false;
long long d = n - 1;
while (d % 2 == 0) d /= 2;
constexpr long long bases[3] = {2, 7, 61};
for (long long a : bases) {
long long t = d;
long long y = pow_mod_constexpr(a, t, n);
while (t != n - 1 && y != 1 && y != n - 1) {
y = y * y % n;
t <<= 1;
}
if (y != n - 1 && t % 2 == 0) {
return false;
}
}
return true;
}
template <int n> constexpr bool is_prime = is_prime_constexpr(n);
// @param b `1 <= b`
// @return pair(g, x) s.t. g = gcd(a, b), xa = g (mod b), 0 <= x < b/g
constexpr std::pair<long long, long long> inv_gcd(long long a, long long b) {
a = safe_mod(a, b);
if (a == 0) return {b, 0};
// Contracts:
// [1] s - m0 * a = 0 (mod b)
// [2] t - m1 * a = 0 (mod b)
// [3] s * |m1| + t * |m0| <= b
long long s = b, t = a;
long long m0 = 0, m1 = 1;
while (t) {
long long u = s / t;
s -= t * u;
m0 -= m1 * u; // |m1 * u| <= |m1| * s <= b
// [3]:
// (s - t * u) * |m1| + t * |m0 - m1 * u|
// <= s * |m1| - t * u * |m1| + t * (|m0| + |m1| * u)
// = s * |m1| + t * |m0| <= b
auto tmp = s;
s = t;
t = tmp;
tmp = m0;
m0 = m1;
m1 = tmp;
}
// by [3]: |m0| <= b/g
// by g != b: |m0| < b/g
if (m0 < 0) m0 += b / s;
return {s, m0};
}
// Compile time primitive root
// @param m must be prime
// @return primitive root (and minimum in now)
constexpr int primitive_root_constexpr(int m) {
if (m == 2) return 1;
if (m == 167772161) return 3;
if (m == 469762049) return 3;
if (m == 754974721) return 11;
if (m == 998244353) return 3;
int divs[20] = {};
divs[0] = 2;
int cnt = 1;
int x = (m - 1) / 2;
while (x % 2 == 0) x /= 2;
for (int i = 3; (long long)(i)*i <= x; i += 2) {
if (x % i == 0) {
divs[cnt++] = i;
while (x % i == 0) {
x /= i;
}
}
}
if (x > 1) {
divs[cnt++] = x;
}
for (int g = 2;; g++) {
bool ok = true;
for (int i = 0; i < cnt; i++) {
if (pow_mod_constexpr(g, (m - 1) / divs[i], m) == 1) {
ok = false;
break;
}
}
if (ok) return g;
}
}
template <int m> constexpr int primitive_root = primitive_root_constexpr(m);
} // namespace internal
} // namespace atcoder
#include <cassert>
#include <numeric>
#include <type_traits>
namespace atcoder {
namespace internal {
#ifndef _MSC_VER
template <class T>
using is_signed_int128 =
typename std::conditional<std::is_same<T, __int128_t>::value ||
std::is_same<T, __int128>::value,
std::true_type,
std::false_type>::type;
template <class T>
using is_unsigned_int128 =
typename std::conditional<std::is_same<T, __uint128_t>::value ||
std::is_same<T, unsigned __int128>::value,
std::true_type,
std::false_type>::type;
template <class T>
using make_unsigned_int128 =
typename std::conditional<std::is_same<T, __int128_t>::value,
__uint128_t,
unsigned __int128>;
template <class T>
using is_integral = typename std::conditional<std::is_integral<T>::value ||
is_signed_int128<T>::value ||
is_unsigned_int128<T>::value,
std::true_type,
std::false_type>::type;
template <class T>
using is_signed_int = typename std::conditional<(is_integral<T>::value &&
std::is_signed<T>::value) ||
is_signed_int128<T>::value,
std::true_type,
std::false_type>::type;
template <class T>
using is_unsigned_int =
typename std::conditional<(is_integral<T>::value &&
std::is_unsigned<T>::value) ||
is_unsigned_int128<T>::value,
std::true_type,
std::false_type>::type;
template <class T>
using to_unsigned = typename std::conditional<
is_signed_int128<T>::value,
make_unsigned_int128<T>,
typename std::conditional<std::is_signed<T>::value,
std::make_unsigned<T>,
std::common_type<T>>::type>::type;
#else
template <class T> using is_integral = typename std::is_integral<T>;
template <class T>
using is_signed_int =
typename std::conditional<is_integral<T>::value && std::is_signed<T>::value,
std::true_type,
std::false_type>::type;
template <class T>
using is_unsigned_int =
typename std::conditional<is_integral<T>::value &&
std::is_unsigned<T>::value,
std::true_type,
std::false_type>::type;
template <class T>
using to_unsigned = typename std::conditional<is_signed_int<T>::value,
std::make_unsigned<T>,
std::common_type<T>>::type;
#endif
template <class T>
using is_signed_int_t = std::enable_if_t<is_signed_int<T>::value>;
template <class T>
using is_unsigned_int_t = std::enable_if_t<is_unsigned_int<T>::value>;
template <class T> using to_unsigned_t = typename to_unsigned<T>::type;
} // namespace internal
} // namespace atcoder
#include <cassert>
#include <numeric>
#include <type_traits>
#ifdef _MSC_VER
#include <intrin.h>
#endif
namespace atcoder {
namespace internal {
struct modint_base {};
struct static_modint_base : modint_base {};
template <class T> using is_modint = std::is_base_of<modint_base, T>;
template <class T> using is_modint_t = std::enable_if_t<is_modint<T>::value>;
} // namespace internal
template <int m, std::enable_if_t<(1 <= m)>* = nullptr>
struct static_modint : internal::static_modint_base {
using mint = static_modint;
public:
static constexpr int mod() { return m; }
static mint raw(int v) {
mint x;
x._v = v;
return x;
}
static_modint() : _v(0) {}
template <class T, internal::is_signed_int_t<T>* = nullptr>
static_modint(T v) {
long long x = (long long)(v % (long long)(umod()));
if (x < 0) x += umod();
_v = (unsigned int)(x);
}
template <class T, internal::is_unsigned_int_t<T>* = nullptr>
static_modint(T v) {
_v = (unsigned int)(v % umod());
}
static_modint(bool v) { _v = ((unsigned int)(v) % umod()); }
unsigned int val() const { return _v; }
mint& operator++() {
_v++;
if (_v == umod()) _v = 0;
return *this;
}
mint& operator--() {
if (_v == 0) _v = umod();
_v--;
return *this;
}
mint operator++(int) {
mint result = *this;
++*this;
return result;
}
mint operator--(int) {
mint result = *this;
--*this;
return result;
}
mint& operator+=(const mint& rhs) {
_v += rhs._v;
if (_v >= umod()) _v -= umod();
return *this;
}
mint& operator-=(const mint& rhs) {
_v -= rhs._v;
if (_v >= umod()) _v += umod();
return *this;
}
mint& operator*=(const mint& rhs) {
unsigned long long z = _v;
z *= rhs._v;
_v = (unsigned int)(z % umod());
return *this;
}
mint& operator/=(const mint& rhs) { return *this = *this * rhs.inv(); }
mint operator+() const { return *this; }
mint operator-() const { return mint() - *this; }
mint pow(long long n) const {
assert(0 <= n);
mint x = *this, r = 1;
while (n) {
if (n & 1) r *= x;
x *= x;
n >>= 1;
}
return r;
}
mint inv() const {
if (prime) {
assert(_v);
return pow(umod() - 2);
} else {
auto eg = internal::inv_gcd(_v, m);
assert(eg.first == 1);
return eg.second;
}
}
friend mint operator+(const mint& lhs, const mint& rhs) {
return mint(lhs) += rhs;
}
friend mint operator-(const mint& lhs, const mint& rhs) {
return mint(lhs) -= rhs;
}
friend mint operator*(const mint& lhs, const mint& rhs) {
return mint(lhs) *= rhs;
}
friend mint operator/(const mint& lhs, const mint& rhs) {
return mint(lhs) /= rhs;
}
friend bool operator==(const mint& lhs, const mint& rhs) {
return lhs._v == rhs._v;
}
friend bool operator!=(const mint& lhs, const mint& rhs) {
return lhs._v != rhs._v;
}
private:
unsigned int _v;
static constexpr unsigned int umod() { return m; }
static constexpr bool prime = internal::is_prime<m>;
};
template <int id> struct dynamic_modint : internal::modint_base {
using mint = dynamic_modint;
public:
static int mod() { return (int)(bt.umod()); }
static void set_mod(int m) {
assert(1 <= m);
bt = internal::barrett(m);
}
static mint raw(int v) {
mint x;
x._v = v;
return x;
}
dynamic_modint() : _v(0) {}
template <class T, internal::is_signed_int_t<T>* = nullptr>
dynamic_modint(T v) {
long long x = (long long)(v % (long long)(mod()));
if (x < 0) x += mod();
_v = (unsigned int)(x);
}
template <class T, internal::is_unsigned_int_t<T>* = nullptr>
dynamic_modint(T v) {
_v = (unsigned int)(v % mod());
}
dynamic_modint(bool v) { _v = ((unsigned int)(v) % mod()); }
unsigned int val() const { return _v; }
mint& operator++() {
_v++;
if (_v == umod()) _v = 0;
return *this;
}
mint& operator--() {
if (_v == 0) _v = umod();
_v--;
return *this;
}
mint operator++(int) {
mint result = *this;
++*this;
return result;
}
mint operator--(int) {
mint result = *this;
--*this;
return result;
}
mint& operator+=(const mint& rhs) {
_v += rhs._v;
if (_v >= umod()) _v -= umod();
return *this;
}
mint& operator-=(const mint& rhs) {
_v += mod() - rhs._v;
if (_v >= umod()) _v -= umod();
return *this;
}
mint& operator*=(const mint& rhs) {
_v = bt.mul(_v, rhs._v);
return *this;
}
mint& operator/=(const mint& rhs) { return *this = *this * rhs.inv(); }
mint operator+() const { return *this; }
mint operator-() const { return mint() - *this; }
mint pow(long long n) const {
assert(0 <= n);
mint x = *this, r = 1;
while (n) {
if (n & 1) r *= x;
x *= x;
n >>= 1;
}
return r;
}
mint inv() const {
auto eg = internal::inv_gcd(_v, mod());
assert(eg.first == 1);
return eg.second;
}
friend mint operator+(const mint& lhs, const mint& rhs) {
return mint(lhs) += rhs;
}
friend mint operator-(const mint& lhs, const mint& rhs) {
return mint(lhs) -= rhs;
}
friend mint operator*(const mint& lhs, const mint& rhs) {
return mint(lhs) *= rhs;
}
friend mint operator/(const mint& lhs, const mint& rhs) {
return mint(lhs) /= rhs;
}
friend bool operator==(const mint& lhs, const mint& rhs) {
return lhs._v == rhs._v;
}
friend bool operator!=(const mint& lhs, const mint& rhs) {
return lhs._v != rhs._v;
}
private:
unsigned int _v;
static internal::barrett bt;
static unsigned int umod() { return bt.umod(); }
};
template <int id> internal::barrett dynamic_modint<id>::bt = 998244353;
using modint998244353 = static_modint<998244353>;
using modint1000000007 = static_modint<1000000007>;
using modint = dynamic_modint<-1>;
namespace internal {
template <class T>
using is_static_modint = std::is_base_of<internal::static_modint_base, T>;
template <class T>
using is_static_modint_t = std::enable_if_t<is_static_modint<T>::value>;
template <class> struct is_dynamic_modint : public std::false_type {};
template <int id>
struct is_dynamic_modint<dynamic_modint<id>> : public std::true_type {};
template <class T>
using is_dynamic_modint_t = std::enable_if_t<is_dynamic_modint<T>::value>;
} // namespace internal
} // namespace atcoder
#include <algorithm>
#include <array>
#ifdef _MSC_VER
#include <intrin.h>
#endif
namespace atcoder {
namespace internal {
// @param n `0 <= n`
// @return minimum non-negative `x` s.t. `n <= 2**x`
int ceil_pow2(int n) {
int x = 0;
while ((1U << x) < (unsigned int)(n)) x++;
return x;
}
// @param n `1 <= n`
// @return minimum non-negative `x` s.t. `(n & (1 << x)) != 0`
int bsf(unsigned int n) {
#ifdef _MSC_VER
unsigned long index;
_BitScanForward(&index, n);
return index;
#else
return __builtin_ctz(n);
#endif
}
} // namespace internal
} // namespace atcoder
#include <cassert>
#include <type_traits>
#include <vector>
namespace atcoder {
namespace internal {
template <class mint, internal::is_static_modint_t<mint>* = nullptr>
void butterfly(std::vector<mint>& a) {
static constexpr int g = internal::primitive_root<mint::mod()>;
int n = int(a.size());
int h = internal::ceil_pow2(n);
static bool first = true;
static mint sum_e[30]; // sum_e[i] = ies[0] * ... * ies[i - 1] * es[i]
if (first) {
first = false;
mint es[30], ies[30]; // es[i]^(2^(2+i)) == 1
int cnt2 = bsf(mint::mod() - 1);
mint e = mint(g).pow((mint::mod() - 1) >> cnt2), ie = e.inv();
for (int i = cnt2; i >= 2; i--) {
// e^(2^i) == 1
es[i - 2] = e;
ies[i - 2] = ie;
e *= e;
ie *= ie;
}
mint now = 1;
for (int i = 0; i <= cnt2 - 2; i++) {
sum_e[i] = es[i] * now;
now *= ies[i];
}
}
for (int ph = 1; ph <= h; ph++) {
int w = 1 << (ph - 1), p = 1 << (h - ph);
mint now = 1;
for (int s = 0; s < w; s++) {
int offset = s << (h - ph + 1);
for (int i = 0; i < p; i++) {
auto l = a[i + offset];
auto r = a[i + offset + p] * now;
a[i + offset] = l + r;
a[i + offset + p] = l - r;
}
now *= sum_e[bsf(~(unsigned int)(s))];
}
}
}
template <class mint, internal::is_static_modint_t<mint>* = nullptr>
void butterfly_inv(std::vector<mint>& a) {
static constexpr int g = internal::primitive_root<mint::mod()>;
int n = int(a.size());
int h = internal::ceil_pow2(n);
static bool first = true;
static mint sum_ie[30]; // sum_ie[i] = es[0] * ... * es[i - 1] * ies[i]
if (first) {
first = false;
mint es[30], ies[30]; // es[i]^(2^(2+i)) == 1
int cnt2 = bsf(mint::mod() - 1);
mint e = mint(g).pow((mint::mod() - 1) >> cnt2), ie = e.inv();
for (int i = cnt2; i >= 2; i--) {
// e^(2^i) == 1
es[i - 2] = e;
ies[i - 2] = ie;
e *= e;
ie *= ie;
}
mint now = 1;
for (int i = 0; i <= cnt2 - 2; i++) {
sum_ie[i] = ies[i] * now;
now *= es[i];
}
}
for (int ph = h; ph >= 1; ph--) {
int w = 1 << (ph - 1), p = 1 << (h - ph);
mint inow = 1;
for (int s = 0; s < w; s++) {
int offset = s << (h - ph + 1);
for (int i = 0; i < p; i++) {
auto l = a[i + offset];
auto r = a[i + offset + p];
a[i + offset] = l + r;
a[i + offset + p] =
(unsigned long long)(mint::mod() + l.val() - r.val()) *
inow.val();
}
inow *= sum_ie[bsf(~(unsigned int)(s))];
}
}
}
} // namespace internal
template <class mint, internal::is_static_modint_t<mint>* = nullptr>
std::vector<mint> convolution(std::vector<mint> a, std::vector<mint> b) {
int n = int(a.size()), m = int(b.size());
if (!n || !m) return {};
if (std::min(n, m) <= 60) {
if (n < m) {
std::swap(n, m);
std::swap(a, b);
}
std::vector<mint> ans(n + m - 1);
for (int i = 0; i < n; i++) {
for (int j = 0; j < m; j++) {
ans[i + j] += a[i] * b[j];
}
}
return ans;
}
int z = 1 << internal::ceil_pow2(n + m - 1);
a.resize(z);
internal::butterfly(a);
b.resize(z);
internal::butterfly(b);
for (int i = 0; i < z; i++) {
a[i] *= b[i];
}
internal::butterfly_inv(a);
a.resize(n + m - 1);
mint iz = mint(z).inv();
for (int i = 0; i < n + m - 1; i++) a[i] *= iz;
return a;
}
template <unsigned int mod = 998244353,
class T,
std::enable_if_t<internal::is_integral<T>::value>* = nullptr>
std::vector<T> convolution(const std::vector<T>& a, const std::vector<T>& b) {
int n = int(a.size()), m = int(b.size());
if (!n || !m) return {};
using mint = static_modint<mod>;
std::vector<mint> a2(n), b2(m);
for (int i = 0; i < n; i++) {
a2[i] = mint(a[i]);
}
for (int i = 0; i < m; i++) {
b2[i] = mint(b[i]);
}
auto c2 = convolution(move(a2), move(b2));
std::vector<T> c(n + m - 1);
for (int i = 0; i < n + m - 1; i++) {
c[i] = c2[i].val();
}
return c;
}
std::vector<long long> convolution_ll(const std::vector<long long>& a,
const std::vector<long long>& b) {
int n = int(a.size()), m = int(b.size());
if (!n || !m) return {};
static constexpr unsigned long long MOD1 = 754974721; // 2^24
static constexpr unsigned long long MOD2 = 167772161; // 2^25
static constexpr unsigned long long MOD3 = 469762049; // 2^26
static constexpr unsigned long long M2M3 = MOD2 * MOD3;
static constexpr unsigned long long M1M3 = MOD1 * MOD3;
static constexpr unsigned long long M1M2 = MOD1 * MOD2;
static constexpr unsigned long long M1M2M3 = MOD1 * MOD2 * MOD3;
static constexpr unsigned long long i1 =
internal::inv_gcd(MOD2 * MOD3, MOD1).second;
static constexpr unsigned long long i2 =
internal::inv_gcd(MOD1 * MOD3, MOD2).second;
static constexpr unsigned long long i3 =
internal::inv_gcd(MOD1 * MOD2, MOD3).second;
auto c1 = convolution<MOD1>(a, b);
auto c2 = convolution<MOD2>(a, b);
auto c3 = convolution<MOD3>(a, b);
std::vector<long long> c(n + m - 1);
for (int i = 0; i < n + m - 1; i++) {
unsigned long long x = 0;
x += (c1[i] * i1) % MOD1 * M2M3;
x += (c2[i] * i2) % MOD2 * M1M3;
x += (c3[i] * i3) % MOD3 * M1M2;
// B = 2^63, -B <= x, r(real value) < B
// (x, x - M, x - 2M, or x - 3M) = r (mod 2B)
// r = c1[i] (mod MOD1)
// focus on MOD1
// r = x, x - M', x - 2M', x - 3M' (M' = M % 2^64) (mod 2B)
// r = x,
// x - M' + (0 or 2B),
// x - 2M' + (0, 2B or 4B),
// x - 3M' + (0, 2B, 4B or 6B) (without mod!)
// (r - x) = 0, (0)
// - M' + (0 or 2B), (1)
// -2M' + (0 or 2B or 4B), (2)
// -3M' + (0 or 2B or 4B or 6B) (3) (mod MOD1)
// we checked that
// ((1) mod MOD1) mod 5 = 2
// ((2) mod MOD1) mod 5 = 3
// ((3) mod MOD1) mod 5 = 4
long long diff =
c1[i] - internal::safe_mod((long long)(x), (long long)(MOD1));
if (diff < 0) diff += MOD1;
static constexpr unsigned long long offset[5] = {
0, 0, M1M2M3, 2 * M1M2M3, 3 * M1M2M3};
x -= offset[diff % 5];
c[i] = x;
}
return c;
}
} // namespace atcoder
using namespace std;
using namespace atcoder;
#define rep(i,n) for (int i=0;i<n;i+=1)
#define rrep(i,n) for (int i=n-1;i>-1;i--)
#define pb push_back
#define all(x) (x).begin(), (x).end()
#define debug(x) cerr << #x << " = " << (x) << " (L" << __LINE__ << " )\n";
template<class T>
using vec = vector<T>;
template<class T>
using vvec = vec<vec<T>>;
template<class T>
using vvvec = vec<vvec<T>>;
using ll = long long;
using pii = pair<int,int>;
using pll = pair<ll,ll>;
template<class T>
bool chmin(T &a, T b){
if (a>b){
a = b;
return true;
}
return false;
}
template<class T>
bool chmax(T &a, T b){
if (a<b){
a = b;
return true;
}
return false;
}
template<class T>
T sum(vec<T> x){
T res=0;
for (auto e:x){
res += e;
}
return res;
}
template<class T>
void printv(vec<T> x){
for (auto e:x){
cout<<e<<" ";
}
cout<<endl;
}
template<class T,class U>
ostream& operator<<(ostream& os, const pair<T,U>& A){
os << "(" << A.first <<", " << A.second << ")";
return os;
}
template<class T>
ostream& operator<<(ostream& os, const set<T>& S){
os << "set{";
for (auto a:S){
os << a;
auto it = S.find(a);
it++;
if (it!=S.end()){
os << ", ";
}
}
os << "}";
return os;
}
using mint = modint1000000007;
ostream& operator<<(ostream& os, const mint& a){
os << a.val();
return os;
}
template<class T>
ostream& operator<<(ostream& os, const vec<T>& A){
os << "[";
rep(i,A.size()){
os << A[i];
if (i!=A.size()-1){
os << ", ";
}
}
os << "]" ;
return os;
}
const int M = 100000;
mint g1[M],g2[M],inv[M],finv[M];
void init_mint(){
g1[0] = 1; g1[1] = 1;
g2[0] = 1; g2[1] = 1;
finv[0] = 1; finv[1] = 1;
inv[1] = 1;
for (int n=2;n<M;n++){
g1[n] = g1[n-1] * n;
inv[n] = (-inv[998244353%n]) * (998244353/n);
g2[n] = inv[n] * g2[n-1];
finv[n] = g2[n];
}
}
mint comb(int n,int r){
if (r < 0 || n < r) return 0;
return g1[n] * g2[r] * g2[n-r];
}
vec<int> bigint_quotient(vec<int> A,int b){
int n = A.size();
vec<int> Q(n,0);
int R = 0;
for (int i=0;i<n;i++){
R = 10 * R + A[i];
Q[i] = R/b;
R = R % b;
}
return Q;
}
/**
* inverse が普通の逆数。
* operator/ とは別であるので注意。
* / と % は 最後の要素 つまり 最大次数の係数 が 0 かもしれないので注意
* a / b * b + a % b == a (たぶん)
*
* power は2種類
* 片方は mod c (多項式、遅い)
* もう片方は mod x^n
*
* log は a[0] == 1
* exp は a[0] == 0
* sqrt は a[0] == 1
* がそれぞれ必要
*
* sqrt は library checker (https://judge.yosupo.jp/submission/87669) に a[0] != 1 の場合の実装がある(使うか?)
*
* multiply -> 多項式を全て掛ける いわゆる分割統治FFT
* evaluate -> a(x) を同時に求める
* faulhaber -> f[i] = 1^i + 2^i + ... + up^i
* sequence -> (x + 1) * (x + 2) * ... * (x + n)
* taylor_shift -> f(x) -> f(x + c)
* stirling_number -> OEIS で出てきたら使おうね
**/
template <typename T> vector<T>& operator+=(vector<T>& a, const vector<T>& b) {
if (a.size() < b.size()) {
a.resize(b.size());
}
for (int i = 0; i < (int)b.size(); i++) {
a[i] += b[i];
}
return a;
}
template <typename T> vector<T> operator+(const vector<T>& a, const vector<T>& b) {
vector<T> c = a;
return c += b;
}
template <typename T> vector<T>& operator-=(vector<T>& a, const vector<T>& b) {
if (a.size() < b.size()) {
a.resize(b.size());
}
for (int i = 0; i < (int)b.size(); i++) {
a[i] -= b[i];
}
return a;
}
template <typename T> vector<T> operator-(const vector<T>& a, const vector<T>& b) {
vector<T> c = a;
return c -= b;
}
template <typename T> vector<T>& operator*=(vector<T>& a, const vector<T>& b) {
if (a.empty() || b.empty()) {
a.clear();
} else {
vector<T> c = a;
a = convolution(b,c);
}
return a;
}
template <typename T> vector<T> operator*(const vector<T>& a, const vector<T>& b) {
vector<T> c = a;
return c *= b;
}
template <typename T> vector<T> inverse(const vector<T>& a) {
assert(!a.empty() && a[0] != T(0));
vector<T> h(a);
int n = (int)h.size();
T invh0 = T(1) / h[0];
vector<T> u(1, invh0);
while ((int)u.size() < n) {
int t = (int)u.size();
vector<T> h0;
for (int i = 0; i < t; i++) {
h0.emplace_back(i < (int)h.size() ? h[i] : 0);
}
vector<T> c = h0 * u;
vector<T> h1;
for (int i = t; i < 2 * t; i++) {
h1.emplace_back(i < (int)h.size() ? h[i] : 0);
}
vector<T> aux = u * h1;
aux.resize(t);
for (int i = 0; i < t; i++) {
aux[i] += (i + t < (int)c.size() ? c[i + t] : 0);
}
vector<T> v = aux * u;
v.resize(t);
for (int i = 0; i < t; i++) {
u.emplace_back(-v[i]);
}
}
u.resize(n);
return u;
}
template <typename T> vector<T>& operator/=(vector<T>& a, const vector<T>& b) {
int n = (int)a.size();
int m = (int)b.size();
if (n < m) {
a.clear();
} else {
vector<T> d = b;
reverse(a.begin(), a.end());
reverse(d.begin(), d.end());
d.resize(n - m + 1);
a *= inverse(d);
a.erase(a.begin() + n - m + 1, a.end());
reverse(a.begin(), a.end());
}
return a;
}
template <typename T> vector<T> operator/(const vector<T>& a, const vector<T>& b) {
vector<T> c = a;
return c /= b;
}
template <typename T> vector<T>& operator%=(vector<T>& a, const vector<T>& b) {
int n = (int)a.size();
int m = (int)b.size();
if (n >= m) {
vector<T> c = (a / b) * b;
a.resize(m - 1);
for (int i = 0; i < m - 1; i++) {
a[i] -= c[i];
}
}
return a;
}
template <typename T> vector<T> operator%(const vector<T>& a, const vector<T>& b) {
vector<T> c = a;
return c %= b;
}
template <typename T, typename U> vector<T> power(const vector<T>& a, const U& b, const vector<T>& c) {
assert(b >= 0);
vector<U> binary;
U bb = b;
while (bb > 0) {
binary.emplace_back(bb & 1);
bb >>= 1;
}
vector<T> res = vector<T>{1} % c;
for (int j = (int)binary.size() - 1; j >= 0; j--) {
res = res * res % c;
if (binary[j] == 1) {
res = res * a % c;
}
}
return res;
}
template <typename T, typename U> vector<T> power(const vector<T>& a, const U& b) {
assert(b >= 0);
vector<U> binary;
U bb = b;
while (bb > 0) {
binary.emplace_back(bb & 1);
bb >>= 1;
}
vector<T> res = vector<T>{1};
for (int j = (int)binary.size() - 1; j >= 0; j--) {
res = res * res;
res.resize(a.size());
if (binary[j] == 1) {
res = res * a;
res.resize(a.size());
}
}
return res;
}
template <typename T> vector<T> derivative(const vector<T>& a) {
vector<T> c = a;
for (int i = 0; i < (int)c.size(); i++) {
c[i] *= i;
}
if (!c.empty()) {
c.erase(c.begin());
}
return c;
}
template <typename T> vector<T> primitive(const vector<T>& a) {
vector<T> c = a;
c.insert(c.begin(), 0);
for (int i = 1; i < (int)c.size(); i++) {
c[i] /= i;
}
return c;
}
template <typename T> vector<T> logarithm(const vector<T>& a) {
assert(!a.empty() && a[0] == T(1));
vector<T> u = primitive(derivative(a) * inverse(a));
u.resize(a.size());
return u;
}
template <typename T> vector<T> exponent(const vector<T>& a) {
assert(!a.empty() && a[0] == T(0));
int n = (int)a.size();
vector<T> b = {1};
while ((int)b.size() < n) {
vector<T> x(a.begin(), a.begin() + min(a.size(), b.size() << 1));
x[0] += 1;
vector<T> old_b = b;
b.resize(b.size() << 1);
x -= logarithm(b);
x *= old_b;
for (int i = (int)b.size() >> 1; i < (int)min(x.size(), b.size()); i++) {
b[i] = x[i];
}
}
b.resize(n);
return b;
}
template <typename T> vector<T> sqrt(const vector<T>& a) {
assert(!a.empty() && a[0] == T(1));
int n = (int)a.size();
vector<T> b = {1};
while ((int)b.size() < n) {
vector<T> x(a.begin(), a.begin() + min(a.size(), b.size() << 1));
b.resize(b.size() << 1);
x *= inverse(b);
T inv2 = T(1) / 2;
for (int i = (int)b.size() >> 1; i < (int)min(x.size(), b.size()); i++) {
b[i] = x[i] * inv2;
}
}
b.resize(n);
return b;
}
template <typename T> vector<T> multiply(const vector<vector<T>>& a) {
if (a.empty()) {
return {0};
}
function<vector<T>(int, int)> mult = [&](int l, int r) {
if (l == r) {
return a[l];
}
int y = (l + r) >> 1;
return mult(l, y) * mult(y + 1, r);
};
return mult(0, (int)a.size() - 1);
}
template <typename T> T evaluate(const vector<T>& a, const T& x) {
T res = 0;
for (int i = (int)a.size() - 1; i >= 0; i--) {
res = res * x + a[i];
}
return res;
}
template <typename T> vector<T> evaluate(const vector<T>& a, const vector<T>& x) {
if (x.empty()) {
return {};
}
if (a.empty()) {
return vector<T>(x.size(), 0);
}
int n = (int)x.size();
vector<vector<T>> st((n << 1) - 1);
function<void(int, int, int)> build = [&](int v, int l, int r) {
if (l == r) {
st[v] = vector<T>{-x[l], 1};
} else {
int y = (l + r) >> 1;
int z = v + ((y - l + 1) << 1);
build(v + 1, l, y);
build(z, y + 1, r);
st[v] = st[v + 1] * st[z];
}
};
build(0, 0, n - 1);
vector<T> res(n);
function<void(int, int, int, vector<T>)> eval = [&](int v, int l, int r, vector<T> f) {
f %= st[v];
if ((int)f.size() < 150) {
for (int i = l; i <= r; i++) {
res[i] = evaluate(f, x[i]);
}
return;
}
if (l == r) {
res[l] = f[0];
} else {
int y = (l + r) >> 1;
int z = v + ((y - l + 1) << 1);
eval(v + 1, l, y, f);
eval(z, y + 1, r, f);
}
};
eval(0, 0, n - 1, a);
return res;
}
template <typename T> vector<T> interpolate(const vector<T>& x, const vector<T>& y) {
if (x.empty()) {
return {};
}
assert(x.size() == y.size());
int n = (int)x.size();
vector<vector<T>> st((n << 1) - 1);
function<void(int, int, int)> build = [&](int v, int l, int r) {
if (l == r) {
st[v] = vector<T>{-x[l], 1};
} else {
int w = (l + r) >> 1;
int z = v + ((w - l + 1) << 1);
build(v + 1, l, w);
build(z, w + 1, r);
st[v] = st[v + 1] * st[z];
}
};
build(0, 0, n - 1);
vector<T> m = st[0];
vector<T> dm = derivative(m);
vector<T> val(n);
function<void(int, int, int, vector<T>)> eval = [&](int v, int l, int r, vector<T> f) {
f %= st[v];
if ((int)f.size() < 150) {
for (int i = l; i <= r; i++) {
val[i] = evaluate(f, x[i]);
}
return;
}
if (l == r) {
val[l] = f[0];
} else {
int w = (l + r) >> 1;
int z = v + ((w - l + 1) << 1);
eval(v + 1, l, w, f);
eval(z, w + 1, r, f);
}
};
eval(0, 0, n - 1, dm);
for (int i = 0; i < n; i++) {
val[i] = y[i] / val[i];
}
function<vector<T>(int, int, int)> calc = [&](int v, int l, int r) {
if (l == r) {
return vector<T>{val[l]};
}
int w = (l + r) >> 1;
int z = v + ((w - l + 1) << 1);
return calc(v + 1, l, w) * st[z] + calc(z, w + 1, r) * st[v + 1];
};
return calc(0, 0, n - 1);
}
template <typename T> vector<T> faulhaber(const T& up, int n) {
vector<T> ex(n + 1);
T e = 1;
for (int i = 0; i <= n; i++) {
ex[i] = e;
e /= i + 1;
}
vector<T> den = ex;
den.erase(den.begin());
for (auto& d : den) {
d = -d;
}
vector<T> num(n);
T p = 1;
for (int i = 0; i < n; i++) {
p *= up + 1;
num[i] = ex[i + 1] * (T(1) - p);
}
vector<T> res = num * inverse(den);
res.resize(n);
T f = 1;
for (int i = 0; i < n; i++) {
res[i] *= f;
f *= i + 1;
}
return res;
}
template <typename T> vector<T> sequence(int n) {
if (n == 0) {
return {1};
}
if (n % 2 == 1) {
return sequence<T>(n - 1) * vector<T>{n, 1};
}
vector<T> c = sequence<T>(n / 2);
vector<T> a = c;
reverse(a.begin(), a.end());
T f = 1;
for (int i = n / 2 - 1; i >= 0; i--) {
f *= n / 2 - i;
a[i] *= f;
}
vector<T> b(n / 2 + 1);
b[0] = 1;
for (int i = 1; i <= n / 2; i++) {
b[i] = b[i - 1] * (n / 2) / i;
}
vector<T> h = a * b;
h.resize(n / 2 + 1);
reverse(h.begin(), h.end());
f = 1;
for (int i = 1; i <= n / 2; i++) {
f /= i;
h[i] *= f;
}
vector<T> res = c * h;
return res;
}
template <typename T> vector<T> taylor_shift(vector<T> a, T c) {
int n = (int)a.size();
vector<T> f(n);
f[0] = 1;
for (int i = 1; i < n; i++) {
f[i] = f[i - 1] * i;
}
for (int i = 0; i < n; i++) {
a[i] *= f[i];
}
vector<T> b(n);
b[0] = 1;
for (int i = 0; i < n; i++) {
if (i < n - 1) {
b[i + 1] = b[i] * c;
}
b[i] /= f[i];
}
reverse(a.begin(), a.end());
auto res = a * b;
res.resize(n);
reverse(res.begin(), res.end());
for (int i = 0; i < n; i++) {
res[i] /= f[i];
}
return res;
}
// =====================
vector<mint> stirling_number_1(int n) {
if (n == 0) {
return {1};
}
if (n == 1) {
return {0, 1};
}
auto f = stirling_number_1(n / 2);
auto g = taylor_shift(f, -mint(n / 2));
f = f * g;
if (n & 1) {
g = {-(n - 1), 1};
f = f * g;
}
return f;
}
mint bigint_to_mint(vector<int> A){
mint res = 0;
for (auto a:A){
res = res * 10 + mint(a);
}
return res;
}
vector<int> bigint_prod(vector<int> A,int b){
reverse(all(A));
vector<int> res;
int Q = 0;
for (auto a:A){
Q += a * b;
res.push_back(Q%10);
Q /= 10;
}
while (Q){
res.push_back(Q%10);
Q /= 10;
}
reverse(all(res));
return res;
}
vector<int> bigint_add(vector<int> A,vector<int> B){
reverse(all(A)); reverse(all(B));
int K = max(int(A.size()),int(B.size()));
A.resize(K+1);
B.resize(K+1);
vector<int> res(K+1);
int up = 0;
for (int i=0;i<K+1;i++){
up += A[i] + B[i];
res[i] = up % 10;
up /= 10;
}
reverse(all(res));
return res;
}
mint sub_solve(int H,vec<int> h){
vector<int> idx = {0,1,2};
mint res = 0;
do{
/*
0 <= i <= H-b
i <= a
H-c <= i+b
max(H-c-b,0) <= i <= min(H-b,a)
*/
int L = max(H-h[idx[2]]-h[idx[1]],0), R = min(H-h[idx[1]],h[idx[0]]);
if (h[idx[0]]+h[idx[2]] >= H){
res += mint(H-h[idx[1]]+1);
}
else if (L <= R){
res += mint(R-L+1);
}
}while(next_permutation(all(idx)));
if (H <= max(h[0],h[1])+h[2]){
res -= 2;
}
if (H <= max(h[0],h[2])+h[1]){
res -= 2;
}
if (H <= max(h[2],h[1])+h[0]){
res -= 2;
}
return res;
}
mint solve(int H,int W,vector<pii> sr){
int HW_flg = 0;
int H_flg = 0, W_flg = 0;
for (int i=0;i<3;i++){
auto [h,w] = sr[i];
if (h == H && w == W){
HW_flg++;
}
else if (h == H){
H_flg++;
}
else if (w == W){
W_flg++;
}
}
if (HW_flg){
for (int i=1;i<3;i++){
if (sr[i] == make_pair(H,W)){
swap(sr[i],sr[0]);
}
}
mint res = 1;
for (int i=1;i<3;i++){
auto [h,w] = sr[i];
res *= mint(H-h+1) * mint(W-w+1);
}
return res;
}
if (W_flg == 0 && H_flg == 0){
return 0;
}
if (W_flg == 0){
swap(H,W);
swap(H_flg,W_flg);
for (int i=0;i<3;i++){
auto [h,w] = sr[i];
sr[i] = {w,h};
}
}
if (W_flg == 2){
int H_sum = 0;
mint res = 2;
for (auto [h,w]:sr){
if (w == W) H_sum += h;
else res *= mint(H-h+1) * mint(W-w+1);
}
if (H_sum < H){
return 0;
}
else{
return res;
}
}
if (W_flg == 1){
if (H_flg == 2){
swap(H,W);
swap(H_flg,W_flg);
for (int i=0;i<3;i++){
auto [h,w] = sr[i];
sr[i] = {w,h};
}
return solve(H,W,sr);
}
for (int i=1;i<3;i++){
auto [h,w] = sr[i];
if (w == W) swap(sr[i],sr[0]);
}
if (sr[1].first+sr[0].first >= H && sr[2].first+sr[0].first >= H){
return 4;
}
else{
return 0;
}
}
return sub_solve(H,{sr[0].first,sr[1].first,sr[2].first});
}
int main(){
ios::sync_with_stdio(false);
std::cin.tie(nullptr);
int T;
cin>>T;
while (T--){
int H,W;
cin>>H>>W;
vector<pii> sr;
rep(i,3){
int h,w;
cin>>h>>w;
sr.push_back({h,w});
}
cout << solve(H,W,sr).val() << "\n";
}
}
详细
Test #1:
score: 100
Accepted
time: 1ms
memory: 5456kb
input:
5 2 2 1 1 1 1 1 1 2 2 1 1 1 2 1 2 2 2 1 1 1 2 2 1 2 2 1 2 1 2 1 2 2 2 1 2 1 2 2 1
output:
0 8 4 6 4
result:
ok 5 number(s): "0 8 4 6 4"
Test #2:
score: 0
Accepted
time: 1ms
memory: 5196kb
input:
4 1 3 1 1 1 2 1 3 1 4 1 1 1 2 1 3 1 5 1 1 1 2 1 3 1 6 1 1 1 2 1 3
output:
6 12 14 6
result:
ok 4 number(s): "6 12 14 6"
Test #3:
score: 0
Accepted
time: 0ms
memory: 5144kb
input:
1 1000000000 1000000000 1 1 1 1 1000000000 1000000000
output:
2401
result:
ok 1 number(s): "2401"
Test #4:
score: 0
Accepted
time: 2ms
memory: 5260kb
input:
729 999999999 111111111 111111111 111111111 111111111 111111111 111111111 111111111 999999999 111111111 111111111 111111111 222222222 111111111 111111111 111111111 999999999 111111111 111111111 111111111 111111111 111111111 333333333 111111111 999999999 111111111 111111111 111111111 444444444 111111...
output:
0 0 0 0 0 0 6 777777753 456790164 0 0 0 0 0 6 222222208 555555531 135802502 0 0 0 0 6 222222208 222222208 333333309 814814847 0 0 0 6 222222208 222222208 222222208 111111087 493827185 0 0 6 222222208 222222208 222222208 222222208 888888872 172839523 0 6 222222208 222222208 222222208 222222208 222222...
result:
ok 729 numbers
Test #5:
score: -100
Wrong Answer
time: 5ms
memory: 5208kb
input:
5832 999999999 222222222 111111111 111111111 111111111 111111111 111111111 111111111 222222222 999999999 111111111 111111111 111111111 111111111 111111111 222222222 222222222 999999999 111111111 111111111 111111111 111111111 111111111 333333333 999999999 222222222 111111111 111111111 111111111 11111...
output:
0 0 0 0 0 0 0 0 4 0 0 0 0 0 0 0 4 413046795 0 0 0 0 0 0 0 0 4 0 0 0 0 0 0 0 4 989330902 0 0 0 0 0 0 0 0 4 0 0 0 0 0 0 0 4 565615002 0 0 0 0 0 0 0 0 4 0 0 0 0 0 0 0 4 141899102 0 0 0 0 0 0 0 0 4 0 0 0 0 0 0 0 4 718183209 0 0 0 0 0 0 0 0 4 0 0 0 0 0 0 0 4 294467309 0 0 0 0 0 0 0 0 4 0 0 0 0 0 0 0 4 87...
result:
wrong answer 9th numbers differ - expected: '0', found: '4'