Submission #5916058


Source Code Expand

#include <bits/stdc++.h>
#define rep(i,n) for(int i=0;i<(int)(n);i++)
#define rep1(i,n) for(int i=1;i<=(int)(n);i++)
#define all(c) c.begin(),c.end()
#define pb push_back
#define fs first
#define sc second
#define chmin(x,y) x=min(x,y)
#define chmax(x,y) x=max(x,y)
using namespace std;
template<class S,class T> ostream& operator<<(ostream& o,const pair<S,T> &p){
	return o<<"("<<p.fs<<","<<p.sc<<")";
}
template<class T> ostream& operator<<(ostream& o,const vector<T> &vc){
	o<<"{";
	for(const T& v:vc) o<<v<<",";
	o<<"}";
	return o;
}
using ll = long long;
template<class T> using V = vector<T>;
template<class T> using VV = vector<vector<T>>;
constexpr ll TEN(int n) { return (n == 0) ? 1 : 10 * TEN(n-1); }

#ifdef LOCAL
#define show(x) cerr << "LINE" << __LINE__ << " : " << #x << " = " << (x) << endl
#else
#define show(x) true
#endif

template<unsigned int mod_>
struct ModInt{
	using uint = unsigned int;
	using ll = long long;
	using ull = unsigned long long;

	constexpr static uint mod = mod_;

	uint v;
	ModInt():v(0){}
	ModInt(ll _v):v(normS(_v%mod+mod)){}
	explicit operator bool() const {return v!=0;}
	static uint normS(const uint &x){return (x<mod)?x:x-mod;}		// [0 , 2*mod-1] -> [0 , mod-1]
	static ModInt make(const uint &x){ModInt m; m.v=x; return m;}
	ModInt operator+(const ModInt& b) const { return make(normS(v+b.v));}
	ModInt operator-(const ModInt& b) const { return make(normS(v+mod-b.v));}
	ModInt operator-() const { return make(normS(mod-v)); }
	ModInt operator*(const ModInt& b) const { return make((ull)v*b.v%mod);}
	ModInt operator/(const ModInt& b) const { return *this*b.inv();}
	ModInt& operator+=(const ModInt& b){ return *this=*this+b;}
	ModInt& operator-=(const ModInt& b){ return *this=*this-b;}
	ModInt& operator*=(const ModInt& b){ return *this=*this*b;}
	ModInt& operator/=(const ModInt& b){ return *this=*this/b;}
	ModInt& operator++(int){ return *this=*this+1;}
	ModInt& operator--(int){ return *this=*this-1;}
	ll extgcd(ll a,ll b,ll &x,ll &y) const{
		ll p[]={a,1,0},q[]={b,0,1};
		while(*q){
			ll t=*p/ *q;
			rep(i,3) swap(p[i]-=t*q[i],q[i]);
		}
		if(p[0]<0) rep(i,3) p[i]=-p[i];
		x=p[1],y=p[2];
		return p[0];
	}
	ModInt inv() const {
		ll x,y;
		extgcd(v,mod,x,y);
		return make(normS(x+mod));
	}
	ModInt pow(ll p) const {
		if(p<0) return inv().pow(-p);
		ModInt a = 1;
		ModInt x = *this;
		while(p){
			if(p&1) a *= x;
			x *= x;
			p >>= 1;
		}
		return a;
	}
	bool operator==(const ModInt& b) const { return v==b.v;}
	bool operator!=(const ModInt& b) const { return v!=b.v;}
	friend istream& operator>>(istream &o,ModInt& x){
		ll tmp;
		o>>tmp;
		x=ModInt(tmp);
		return o;
	}
	friend ostream& operator<<(ostream &o,const ModInt& x){ return o<<x.v;}
};
using mint = ModInt<998244353>;

V<mint> fact,ifact;
mint Choose(int a,int b){
	if(b<0 || a<b) return 0;
	return fact[a] * ifact[b] * ifact[a-b];
}
void InitFact(int N){
	fact.resize(N);
	ifact.resize(N);
	fact[0] = 1;
	rep1(i,N-1) fact[i] = fact[i-1] * i;
	ifact[N-1] = fact[N-1].inv();
	for(int i=N-2;i>=0;i--) ifact[i] = ifact[i+1] * (i+1);
}

int bsr(int x) { return 31 - __builtin_clz(x); }
void ntt(bool type, V<mint>& c) {
	const mint G = 3;	//primitive root

	int N = int(c.size());
	int s = bsr(N);
	assert(1 << s == N);

	V<mint> a = c, b(N);
	rep1(i,s){
		int W = 1 << (s - i);
		mint base = G.pow((mint::mod - 1)>>i);
		if(type) base = base.inv();
		mint now = 1;
		for(int y = 0; y < N / 2; y += W) {
			for (int x = 0; x < W; x++) {
				auto l = a[y << 1 | x];
				auto r = now * a[y << 1 | x | W];
				b[y | x] = l + r;
				b[y | x | N >> 1] = l - r;
			}
			now *= base;
		}
		swap(a, b);
	}
	c = a;
}

V<mint> multiply_ntt(const V<mint>& a, const V<mint>& b) {
	int A = int(a.size()), B = int(b.size());
	if (!A || !B) return {};
	int lg = 0;
	while ((1 << lg) < A + B - 1) lg++;
	int N = 1 << lg;
	V<mint> ac(N), bc(N);
	for (int i = 0; i < A; i++) ac[i] = a[i];
	for (int i = 0; i < B; i++) bc[i] = b[i];
	ntt(false, ac);
	ntt(false, bc);
	for (int i = 0; i < N; i++) {
		ac[i] *= bc[i];
	}
	ntt(true, ac);
	V<mint> c(A + B - 1);
	mint iN = mint(N).inv();
	for (int i = 0; i < A + B - 1; i++) {
		c[i] = ac[i] * iN;
	}
	return c;
}

template<class D>
struct Poly{
	vector<D> v;
	int size() const{ return v.size();}	//deg+1
	Poly(){}
	Poly(vector<D> _v) : v(_v){shrink();}

	Poly& shrink(){
		while(!v.empty()&&v.back()==D(0)) v.pop_back();
		return *this;
	}
	D at(int i) const{
		return (i<size())?v[i]:D(0);
	}
	void set(int i,const D& x){		//v[i] := x
		if(i>=size() && !x) return;
		while(i>=size()) v.push_back(D(0));
		v[i]=x;
		shrink();
		return;
	}
	D operator()(D x) const {
		D res = 0;
		int n = size();
		D a = 1;
		rep(i,n){
			res += a*v[i];
			a *= x;
		}
		return res;
	}

	Poly operator+(const Poly &r) const{
		int N=max(size(),r.size());
		vector<D> ret(N);
		rep(i,N) ret[i]=at(i)+r.at(i);
		return Poly(ret);
	}
	Poly operator-(const Poly &r) const{
		int N=max(size(),r.size());
		vector<D> ret(N);
		rep(i,N) ret[i]=at(i)-r.at(i);
		return Poly(ret);
	}
	Poly operator-() const{
		int N=size();
		vector<D> ret(N);
		rep(i,N) ret[i] = -at(i);
		return Poly(ret);
	}
	Poly operator*(const Poly &r) const{
		if(size()==0||r.size()==0) return Poly();
		return mul_ntt(r);									// FFT or NTT ?
	}
	Poly operator*(const D &r) const{
		int N=size();
		vector<D> ret(N);
		rep(i,N) ret[i]=v[i]*r;
		return Poly(ret);
	}
	Poly operator/(const D &r) const{
		return *this * r.inv();
	}
	Poly operator/(const Poly &y) const{
		return div_fast(y);
	}
	Poly operator%(const Poly &y) const{
		return rem_fast(y);
//		return rem_naive(y);
	}
	Poly operator<<(const int &n) const{	// *=x^n
		assert(n>=0);
		int N=size();
		vector<D> ret(N+n);
		rep(i,N) ret[i+n]=v[i];
		return Poly(ret);
	}
	Poly operator>>(const int &n) const{	// /=x^n
		assert(n>=0);
		int N=size();
		if(N<=n) return Poly();
		vector<D> ret(N-n);
		rep(i,N-n) ret[i]=v[i+n];
		return Poly(ret);
	}
	bool operator==(const Poly &y) const{
		return v==y.v;
	}
	bool operator!=(const Poly &y) const{
		return v!=y.v;
	}

	Poly& operator+=(const Poly &r) {return *this = *this+r;}
	Poly& operator-=(const Poly &r) {return *this = *this-r;}
	Poly& operator*=(const Poly &r) {return *this = *this*r;}
	Poly& operator*=(const D &r) {return *this = *this*r;}
	Poly& operator/=(const Poly &r) {return *this = *this/r;}
	Poly& operator/=(const D &r) {return *this = *this/r;}
	Poly& operator%=(const Poly &y) {return *this = *this%y;}
	Poly& operator<<=(const int &n) {return *this = *this<<n;}
	Poly& operator>>=(const int &n) {return *this = *this>>n;}

	Poly diff() const {
		int n = size();
		if(n == 0) return Poly();
		V<D> u(n-1);
		rep(i,n-1) u[i] = at(i+1) * (i+1);
		return Poly(u);
	}
	Poly intg() const {
		int n = size();
		V<D> u(n+1);
		rep(i,n) u[i+1] = at(i) / (i+1);
		return Poly(u);
	}

	Poly pow(long long n, int L) const {		// f^n, ignoring x^L,x^{L+1},..
		Poly a({1});
		Poly x = *this;
		while(n){
			if(n&1){
				a *= x;
				a = a.strip(L);
			}
			x *= x;
			x = x.strip(L);
			n /= 2;
		}
		return a;
	}

	/*
		[x^0~n] exp(f) = 1 + f + f^2 / 2 + f^3 / 6 + ..
		f(0) should be 0

		O((N+n) log n)	(N = size())
		NTT, -O3
		- N = n = 100000 : 200 [ms]
		- N = n = 200000 : 400 [ms]
		- N = n = 500000 : 1000 [ms]
	*/
	Poly exp(int n) const {
		assert(at(0) == 0);
		Poly f({1}), g({1});
		for(int i=1;i<=n;i*=2){
			g = (g*2 - f*g*g).strip(i);
			Poly q = (this->diff()).strip(i-1);
			Poly w = (q + g * (f.diff() - f*q)) .strip(2*i-1);
			f = (f + f * (*this - w.intg()).strip(2*i)) .strip(2*i);
		}
		return f.strip(n+1);
	}

	/*
		[x^0~n] log(f) = log(1-(1-f)) = - (1-f) - (1-f)^2 / 2 - (1-f)^3 / 3 - ...
		f(0) should be 1
		O(n log n)

		NTT, -O3
		1e5 : 140 [ms]
		2e5 : 296 [ms]
		5e5 : 640 [ms]
		1e6 : 1343 [ms]
	*/
	Poly log(int n) const {
		assert(at(0) == 1);
		auto f = strip(n+1);
		return (f.diff() * f.inv(n)).strip(n).intg();
	}

	/*
		[x^0~n] sqrt(f)
		f(0) should be 1
		いや平方剰余なら何でもいいと思うけど探すのがめんどくさいので
		+- 2通りだけど 定数項が 1 の方
		O(n log n)

		NTT, -O3
		1e5 : 234 [ms]
		2e5 : 484 [ms]
		5e5 : 1000 [ms]
		1e6 : 2109 [ms]
	*/
	Poly sqrt(int n) const {
		assert(at(0) == 1);
		Poly f = strip(n+1);
		Poly g({1});
		for(int i=1; i<=n; i*=2){
			g = (g + f.strip(2*i)*g.inv(2*i-1)) / 2;
		}
		return g.strip(n+1);
	}

	/*
		[x^0~n] f^-1 = (1-(1-f))^-1 = (1-f) + (1-f)^2 + ...
		f * f.inv(n) = 1 + x^n * poly
		f(0) should be non0
		O(n log n)
	*/
	Poly inv(int n) const {
		assert(at(0) != 0);
		Poly f = strip(n+1);
		Poly g({at(0).inv()});
		for(int i=1; i<=n; i*=2){		//need to strip!!
			g *= (Poly({2}) - f.strip(2*i)*g).strip(2*i);
		}
		return g.strip(n+1);
	}	

	Poly exp_naive(int n) const {
		assert(at(0) == 0);
		Poly res;
		Poly fk({1});
		rep(k,n+1){
			res += fk;
			fk *= *this;
			fk = fk.strip(n+1) / (k+1);
		}
		return res;
	}
	Poly log_naive(int n) const {
		assert(at(0) == 1);
		Poly res;
		Poly g({1});
		rep1(k,n){
			g *= (Poly({1}) - *this);
			g = g.strip(n+1);
			res -= g / k;
		}
		return res;
	}


	Poly mul_naive(const Poly &r) const{
		int N=size(),M=r.size();
		vector<D> ret(N+M-1);
		rep(i,N) rep(j,M) ret[i+j]+=at(i)*r.at(j);
		return Poly(ret);
	}
	Poly mul_ntt(const Poly &r) const{
		return Poly(multiply_ntt(v,r.v));
	}
	Poly mul_fft(const Poly &r) const{
		return Poly(multiply_fft(v,r.v));
	}

	Poly div_fast_with_inv(const Poly &inv, int B) const {
		return (*this * inv)>>(B-1);
	}
	Poly div_fast(const Poly &y) const{
		if(size()<y.size()) return Poly();
		int n = size();
		return div_fast_with_inv(y.inv_div(n-1),n);
	}
	Poly rem_naive(const Poly &y) const{
		Poly x = *this;
		while(y.size()<=x.size()){
			int N=x.size(),M=y.size();
			D coef = x.v[N-1]/y.v[M-1];
			x -= (y<<(N-M))*coef;
		}
		return x;
	}
	Poly rem_fast(const Poly &y) const{
		return *this - y * div_fast(y);
	}
	Poly strip(int n) const {	//ignore x^n , x^n+1,...
		vector<D> res = v;
		res.resize(min(n,size()));
		return Poly(res);
	}
	Poly rev(int n = -1) const {	//ignore x^n ~  ->  return x^(n-1) * f(1/x)
		vector<D> res = v;
		if(n!=-1) res.resize(n);
		reverse(all(res));
		return Poly(res);
	}

	/*
		f.inv_div(n) = x^n / f
		f should be non0
		O((N+n) log n)

		for division
	*/
	Poly inv_div(int n) const {
		n++;
		int d = size() - 1;
		assert(d != -1);
		if(n < d) return Poly();
		Poly a = rev();
		Poly g({at(d).inv()});
		for(int i=1; i+d<=n; i*=2){		//need to strip!!
			g *= (Poly({2})-a.strip(2*i)*g).strip(2*i);
		}
		return g.rev(n-d);
	}


	friend ostream& operator<<(ostream &o,const Poly& x){
		if(x.size()==0) return o<<0;
		rep(i,x.size()) if(x.v[i]!=D(0)){
			o<<x.v[i]<<"x^"<<i;
			if(i!=x.size()-1) o<<" + ";
		}
		return o;
	}
};

mint solve(int K,int X){
	int A = K-X;
	Poly<mint> f;
	rep(i,X+1) f.set(i,ifact[i+1]);
	f = f.pow(A,X+1);
	mint ans = 0;
	rep(i,X+1){
		mint tmp = f.at(i) * fact[X];
		ans += tmp;
	}
	return ans * fact[K] * fact[A];
}

int main(){
	cin.tie(0);
	ios::sync_with_stdio(false);		//DON'T USE scanf/printf/puts !!
	cout << fixed << setprecision(20);	
	InitFact(100000);

	string A,B;
	cin >> A >> B;
	int k = 0, x = 0;
	rep(i,A.size()){
		if(A[i] == '1') k++;
		if(A[i] == '1' && B[i] == '1') x++;
	}
	cout << solve(k,x) << endl;
}

Submission Info

Submission Time
Task E - Shuffle and Swap
User sigma425
Language C++14 (GCC 5.4.1)
Score 1700
Code Size 11731 Byte
Status AC
Exec Time 75 ms
Memory 1988 KB

Judge Result

Set Name Sample Partial All
Score / Max Score 0 / 0 1200 / 1200 500 / 500
Status
AC × 4
AC × 46
AC × 88
Set Name Test Cases
Sample sample_01.txt, sample_02.txt, sample_03.txt, sample_04.txt
Partial sample_01.txt, sample_02.txt, sample_03.txt, sample_04.txt, subtask_1_01.txt, subtask_1_02.txt, subtask_1_03.txt, subtask_1_04.txt, subtask_1_05.txt, subtask_1_06.txt, subtask_1_07.txt, subtask_1_08.txt, subtask_1_09.txt, subtask_1_10.txt, subtask_1_11.txt, subtask_1_12.txt, subtask_1_13.txt, subtask_1_14.txt, subtask_1_15.txt, subtask_1_16.txt, subtask_1_17.txt, subtask_1_18.txt, subtask_1_19.txt, subtask_1_20.txt, subtask_1_21.txt, subtask_1_22.txt, subtask_1_23.txt, subtask_1_24.txt, subtask_1_25.txt, subtask_1_26.txt, subtask_1_27.txt, subtask_1_28.txt, subtask_1_29.txt, subtask_1_30.txt, subtask_1_31.txt, subtask_1_32.txt, subtask_1_33.txt, subtask_1_34.txt, subtask_1_35.txt, subtask_1_36.txt, subtask_1_37.txt, subtask_1_38.txt, subtask_1_39.txt, subtask_1_40.txt, subtask_1_41.txt, subtask_1_42.txt
All sample_01.txt, sample_02.txt, sample_03.txt, sample_04.txt, sample_01.txt, sample_02.txt, sample_03.txt, sample_04.txt, subtask_1_01.txt, subtask_1_02.txt, subtask_1_03.txt, subtask_1_04.txt, subtask_1_05.txt, subtask_1_06.txt, subtask_1_07.txt, subtask_1_08.txt, subtask_1_09.txt, subtask_1_10.txt, subtask_1_11.txt, subtask_1_12.txt, subtask_1_13.txt, subtask_1_14.txt, subtask_1_15.txt, subtask_1_16.txt, subtask_1_17.txt, subtask_1_18.txt, subtask_1_19.txt, subtask_1_20.txt, subtask_1_21.txt, subtask_1_22.txt, subtask_1_23.txt, subtask_1_24.txt, subtask_1_25.txt, subtask_1_26.txt, subtask_1_27.txt, subtask_1_28.txt, subtask_1_29.txt, subtask_1_30.txt, subtask_1_31.txt, subtask_1_32.txt, subtask_1_33.txt, subtask_1_34.txt, subtask_1_35.txt, subtask_1_36.txt, subtask_1_37.txt, subtask_1_38.txt, subtask_1_39.txt, subtask_1_40.txt, subtask_1_41.txt, subtask_1_42.txt, subtask_2_01.txt, subtask_2_02.txt, subtask_2_03.txt, subtask_2_04.txt, subtask_2_05.txt, subtask_2_06.txt, subtask_2_07.txt, subtask_2_08.txt, subtask_2_09.txt, subtask_2_10.txt, subtask_2_11.txt, subtask_2_12.txt, subtask_2_13.txt, subtask_2_14.txt, subtask_2_15.txt, subtask_2_16.txt, subtask_2_17.txt, subtask_2_18.txt, subtask_2_19.txt, subtask_2_20.txt, subtask_2_21.txt, subtask_2_22.txt, subtask_2_23.txt, subtask_2_24.txt, subtask_2_25.txt, subtask_2_26.txt, subtask_2_27.txt, subtask_2_28.txt, subtask_2_29.txt, subtask_2_30.txt, subtask_2_31.txt, subtask_2_32.txt, subtask_2_33.txt, subtask_2_34.txt, subtask_2_35.txt, subtask_2_36.txt, subtask_2_37.txt, subtask_2_38.txt
Case Name Status Exec Time Memory
sample_01.txt AC 3 ms 1024 KB
sample_02.txt AC 3 ms 1024 KB
sample_03.txt AC 3 ms 1024 KB
sample_04.txt AC 3 ms 1024 KB
subtask_1_01.txt AC 3 ms 1024 KB
subtask_1_02.txt AC 3 ms 1024 KB
subtask_1_03.txt AC 3 ms 1024 KB
subtask_1_04.txt AC 3 ms 1024 KB
subtask_1_05.txt AC 3 ms 1024 KB
subtask_1_06.txt AC 3 ms 1024 KB
subtask_1_07.txt AC 3 ms 1024 KB
subtask_1_08.txt AC 3 ms 1024 KB
subtask_1_09.txt AC 3 ms 1024 KB
subtask_1_10.txt AC 3 ms 1024 KB
subtask_1_11.txt AC 3 ms 1024 KB
subtask_1_12.txt AC 3 ms 1024 KB
subtask_1_13.txt AC 3 ms 1024 KB
subtask_1_14.txt AC 3 ms 1024 KB
subtask_1_15.txt AC 3 ms 1024 KB
subtask_1_16.txt AC 3 ms 1024 KB
subtask_1_17.txt AC 3 ms 1024 KB
subtask_1_18.txt AC 4 ms 1024 KB
subtask_1_19.txt AC 4 ms 1024 KB
subtask_1_20.txt AC 4 ms 1024 KB
subtask_1_21.txt AC 4 ms 1024 KB
subtask_1_22.txt AC 3 ms 1024 KB
subtask_1_23.txt AC 3 ms 1024 KB
subtask_1_24.txt AC 3 ms 1024 KB
subtask_1_25.txt AC 3 ms 1024 KB
subtask_1_26.txt AC 3 ms 1024 KB
subtask_1_27.txt AC 3 ms 1024 KB
subtask_1_28.txt AC 3 ms 1024 KB
subtask_1_29.txt AC 3 ms 1024 KB
subtask_1_30.txt AC 4 ms 1024 KB
subtask_1_31.txt AC 4 ms 1024 KB
subtask_1_32.txt AC 4 ms 1024 KB
subtask_1_33.txt AC 3 ms 1024 KB
subtask_1_34.txt AC 3 ms 1024 KB
subtask_1_35.txt AC 3 ms 1024 KB
subtask_1_36.txt AC 3 ms 1024 KB
subtask_1_37.txt AC 4 ms 1024 KB
subtask_1_38.txt AC 4 ms 1024 KB
subtask_1_39.txt AC 3 ms 1024 KB
subtask_1_40.txt AC 3 ms 1024 KB
subtask_1_41.txt AC 3 ms 1024 KB
subtask_1_42.txt AC 3 ms 1024 KB
subtask_2_01.txt AC 3 ms 1024 KB
subtask_2_02.txt AC 3 ms 1024 KB
subtask_2_03.txt AC 5 ms 1152 KB
subtask_2_04.txt AC 15 ms 1280 KB
subtask_2_05.txt AC 19 ms 1280 KB
subtask_2_06.txt AC 3 ms 1152 KB
subtask_2_07.txt AC 9 ms 1832 KB
subtask_2_08.txt AC 13 ms 1860 KB
subtask_2_09.txt AC 37 ms 1988 KB
subtask_2_10.txt AC 30 ms 1588 KB
subtask_2_11.txt AC 35 ms 1472 KB
subtask_2_12.txt AC 32 ms 1472 KB
subtask_2_13.txt AC 33 ms 1472 KB
subtask_2_14.txt AC 39 ms 1448 KB
subtask_2_15.txt AC 35 ms 1516 KB
subtask_2_16.txt AC 17 ms 1280 KB
subtask_2_17.txt AC 21 ms 1280 KB
subtask_2_18.txt AC 17 ms 1280 KB
subtask_2_19.txt AC 3 ms 1024 KB
subtask_2_20.txt AC 3 ms 1024 KB
subtask_2_21.txt AC 3 ms 1024 KB
subtask_2_22.txt AC 68 ms 1852 KB
subtask_2_23.txt AC 71 ms 1828 KB
subtask_2_24.txt AC 45 ms 1828 KB
subtask_2_25.txt AC 48 ms 1828 KB
subtask_2_26.txt AC 75 ms 1828 KB
subtask_2_27.txt AC 71 ms 1828 KB
subtask_2_28.txt AC 3 ms 1024 KB
subtask_2_29.txt AC 4 ms 1152 KB
subtask_2_30.txt AC 11 ms 1152 KB
subtask_2_31.txt AC 18 ms 1280 KB
subtask_2_32.txt AC 17 ms 1280 KB
subtask_2_33.txt AC 33 ms 1472 KB
subtask_2_34.txt AC 37 ms 1408 KB
subtask_2_35.txt AC 30 ms 1536 KB
subtask_2_36.txt AC 28 ms 1536 KB
subtask_2_37.txt AC 55 ms 1812 KB
subtask_2_38.txt AC 63 ms 1824 KB