結果
| 問題 | No.167 N^M mod 10 |
| ユーザー |
 eQe
|
| 提出日時 | 2024-10-14 14:00:44 |
| 言語 | C++23 (gcc 13.3.0 + boost 1.87.0) |
| 結果 |
WA
|
| 実行時間 | - |
| コード長 | 9,530 bytes |
| コンパイル時間 | 7,230 ms |
| コンパイル使用メモリ | 336,060 KB |
| 実行使用メモリ | 6,820 KB |
| 最終ジャッジ日時 | 2024-10-14 14:00:56 |
| 合計ジャッジ時間 | 8,177 ms |
|
ジャッジサーバーID (参考情報) |
judge3 / judge5 |
(要ログイン)
| ファイルパターン | 結果 |
|---|---|
| sample | AC * 2 |
| other | AC * 21 WA * 6 |
ソースコード
#include<bits/stdc++.h>#include<atcoder/all>namespace my{void main();void solve();}int main(){my::main();}namespace my{#define eb emplace_back#define LL(...) ll __VA_ARGS__;lin(__VA_ARGS__)#define FO(n) for(ll ij=n;ij--;)#define FOR(i,...) for(auto[i,i##stop,i##step]=range(0,__VA_ARGS__);i<i##stop;i+=i##step)#define fo(i,...) FO##__VA_OPT__(R)(i __VA_OPT__(,__VA_ARGS__))#define fe(a,i,...) for(auto&&__VA_OPT__([)i __VA_OPT__(,__VA_ARGS__]):a)using namespace std;using ll=long long;using ull=unsigned long long;using ulll=__uint128_t;using lll=__int128_t;istream&operator>>(istream&i,ulll&x){ull t;i>>t;x=t;return i;}ostream&operator<<(ostream&o,const ulll&x){return(x<10?o:o<<x/10)<<ll(x%10);}istream&operator>>(istream&i,lll&x){ll t;i>>t;x=t;return i;}ostream&operator<<(ostream&o,const lll&x){return o<<string(x<0,'-')<<ulll(x>0?x:-x);}auto range(bool s,ll a,ll b=1e18,ll c=1){if(b==1e18)b=a,(s?b:a)=0;return array{a-s,b,c};}constexpr char nl=10;constexpr char sp=32;lll pw(lll x,ll n,ll m=0){assert(n>=0);lll r=1;while(n)n&1?r*=x:r,x*=x,m?r%=m,x%=m:r,n>>=1;return r;}template<class...A>auto max(const A&...a){return max(initializer_list<common_type_t<A...>>{a...});}template<class A,class B>struct pair{A a;B b;pair()=default;pair(A a,B b):a(a),b(b){}pair(const std::pair<A,B>&p):a(p.first),b(p.second){}bool operator==(const pair&p)const{return a==p.a&&b==p.b;}auto operator<=>(const pair&p)const{return a!=p.a?a<=>p.a:b<=>p.b;}friend ostream&operator<<(ostream&o,const pair&p){return o<<p.a<<sp<<p.b;}};template<class F=less<>>auto&sort(auto&a,const F&f={}){ranges::sort(a,f);return a;}auto pop_back(auto&a){assert(a.size());auto r=*a.rbegin();a.pop_back();return r;}template<class T,class U>ostream&operator<<(ostream&o,const std::pair<T,U>&p){return o<<p.first<<sp<<p.second;}template<class T,class U>ostream&operator<<(ostream&o,const unordered_map<T,U>&m){fe(m,e)o<<e.first<<sp<<e.second<<nl;return o;}template<class V>concept vectorial=is_base_of_v<vector<typename V::value_type>,V>;template<class T>struct core_type{using type=T;};template<vectorial V>struct core_type<V>{using type=typename core_type<typename V::value_type>::type;};template<class T>using core_t=core_type<T>::type;template<class V>istream&operator>>(istream&i,vector<V>&v){fe(v,e)i>>e;return i;}template<class V>ostream&operator<<(ostream&o,const vector<V>&v){fe(v,e)o<<e<<string(&e!=&v.back(),vectorial<V>?nl:sp);return o;}template<class V>struct vec:vector<V>{using vector<V>::vector;vec(const vector<V>&v){vector<V>::operator=(v);}vec&operator+=(const vec&u){vec&v=*this;fo(i,v.size())v[i]+=u[i];return v;}vec&operator-=(const vec&u){vec&v=*this;fo(i,v.size())v[i]-=u[i];return v;}vec&operator^=(const vec&u){this->insert(this->end(),u.begin(),u.end());return*this;}vec operator+(const vec&u)const{return vec{*this}+=u;}vec operator-(const vec&u)const{return vec{*this}-=u;}vec operator^(const vec&u)const{return vec{*this}^=u;}vec&operator++(){fe(*this,e)++e;return*this;}vec&operator--(){fe(*this,e)--e;return*this;}vec operator-()const{vec v=*this;fe(v,e)e=-e;return v;}auto scan(const auto&f)const{pair<core_t<V>,bool>r{};fe(*this,e)if constexpr(!vectorial<V>)r.b?f(r.a,e),r:r={e,1};else if(auto s=e.scan(f);s.b)r.b?f(r.a,s.a),r:r=s;return r;}auto max()const{return scan([](auto&a,const auto&b){a<b?a=b:0;}).a;}};template<bool is_negative=false>struct infinity{template<integral T>constexpr operator T()const{return numeric_limits<T>::max()*(1-is_negative*2);}template<floating_point T>constexpr operator T()const{return static_cast<ll>(*this);}template<class T>constexpr bool operator==(T x)const{return static_cast<T>(*this)==x;}constexpr auto operator-()const{return infinity<!is_negative>();}template<class A,class B>constexpr operator pair<A,B>()const{return pair<A,B>{*this,*this};}};constexpr infinity oo;void io(){cin.tie(nullptr)->sync_with_stdio(0);cout<<fixed<<setprecision(15);}void lin(auto&...a){(cin>>...>>a);}auto sinen(const string&b="a"){string s;lin(s);vec<ll>r;fe(s,e)r.eb(b.size()==1?e-b[0]:b.find_first_of(e));return r;}auto sinen(ll n,const string&b="a"){vec<vec<ll>>r;fo(n)r.eb(sinen(b));return r;}template<char c=sp>void pp(const auto&...a){ll n=sizeof...(a);((cout<<a<<string(--n>0,c)),...);cout<<nl;}template<class T,class U=T>auto rle(const vec<T>&a){vec<pair<T,U>>r;fe(a,e)r.size()&&e==r.back().a?++r.back().b:r.eb(e,1).b;return r;}template<class T,class U=T>auto rce(vec<T>a){return rle<T,U>(sort(a));}ll rand(ll l=oo,ll r=oo){if(l!=oo&&r==oo)r=l,l=0;static ll a=495;a^=a<<7,a^=a>>9;ll t=a;return l<r?((t%=(r-l))<0?t+r-l:t)+l:a;}struct montgomery64{using i64=__int64_t;using u64=__uint64_t;using u128=__uint128_t;static inline u64 N=998244353;static inline u64 N_inv;static inline u64 R2;static void set_mod(u64 N){assert(N<(1ULL<<63));assert(N&1);montgomery64::N=N;R2=-u128(N)%N;N_inv=N;fo(5)N_inv*=2-N*N_inv;assert(N*N_inv==1);}static u64 mod(){return N;}u64 a;montgomery64(const i64&a=0):a(reduce((u128)(a%(i64)N+N)*R2)){}static u64 reduce(const u128&T){u128 r=(T+u128(u64(T)*-N_inv)*N)>>64;return r>=N?r-N:r;}auto&operator+=(const montgomery64&b){if((a+=b.a)>=N)a-=N;return*this;}auto&operator-=(const montgomery64&b){if(i64(a-=b.a)<0)a+=N;return*this;}auto&operator*=(const montgomery64&b){a=reduce(u128(a)*b.a);return*this;}auto&operator/=(const montgomery64&b){*this*=b.inv();return*this;}auto operator+(const montgomery64&b)const{return montgomery64(*this)+=b;}auto operator-(const montgomery64&b)const{return montgomery64(*this)-=b;}auto operator*(const montgomery64&b)const{return montgomery64(*this)*=b;}auto operator/(const montgomery64&b)const{return montgomery64(*this)/=b;}bool operator==(const montgomery64&b)const{return a==b.a;}auto operator-()const{return montgomery64()-montgomery64(*this);}montgomery64 pow(u128 n)const{montgomery64 r{1},x{*this};while(n){if(n&1)r*=x;x*=x;n>>=1;}return r;}montgomery64 inv()const{u64 a=this->a,b=N,u=1,v=0;while(b)u-=a/b*v,swap(u,v),a-=a/b*b,swap(a,b);return u;}u64 val()const{return reduce(a);}friend istream&operator>>(istream&i,montgomery64&b){ll t;i>>t;b=t;return i;}friend ostream&operator<<(ostream&o,const montgomery64&b){return o<<b.val();}};template<class modular>bool miller_rabin(ll n,vec<ll>as){ll d=n-1;while(~d&1)d>>=1;if((ll)modular::mod()!=n)modular::set_mod(n);modular one=1,minus_one=n-1;fe(as,a){if(a%n==0)continue;ll t=d;modular y=modular(a).pow(t);while(t!=n-1&&y!=one&&y!=minus_one)y*=y,t<<=1;if(y!=minus_one&&~t&1)return 0;}return 1;}bool is_prime(ll n){if(~n&1)return n==2;if(n<=1)return 0;if(n<4759123141LL)return miller_rabin<montgomery64>(n,{2,7,61});return miller_rabin<montgomery64>(n,{2,325,9375,28178,450775,9780504,1795265022});}template<class modular>ll pollard_rho(ll n){if(~n&1)return 2;if(is_prime(n))return n;if((ll)modular::mod()!=n)modular::set_mod(n);modular R,one=1;auto f=[&](const modular&x){return x*x+R;};while(1){modular x,y,ys,q=one;R=rand(2,n),y=rand(2,n);ll g=1;constexpr ll m=128;for(ll r=1;g==1;r<<=1){x=y;fo(r)y=f(y);for(ll k=0;g==1&&k<r;k+=m){ys=y;for(ll i=0;i<m&&i<r-k;++i)q*=x-(y=f(y));g=std::gcd(q.val(),n);}}if(g==n)do g=std::gcd((x-(ys=f(ys))).val(),n);while(g==1);if(g!=n)return g;}}auto factorize(ll n){auto f=[](auto&f,ll m){if(m==1)return vec<ll>{};ll d=pollard_rho<montgomery64>(m);return d==m?vec<ll>{d}:f(f,d)^f(f,m/d);};return rce(f(f,n));}template<class T>T mod(T a,T m){return(a%=m)<0?a+m:a;}template<class T>T gcd(T a,T b){return b?gcd(b,a%b):a;}template<class...A>auto gcd(const A&...a){common_type_t<A...>r=0;((r=gcd(r,a)),...);return r;}template<class T>pair<T,T>ax_by_g(T a,T b){if(b==0)return{1,0};auto[s,t]=ax_by_g(b,a%b);return{t,s-a/b*t};}ll inv_mod(ll a,ll m){assert(gcd(a,m)==1);auto[x,y]=ax_by_g(a,m);return mod(x,m);}template<class T>T chinese_remainder_theorem_coprime(const vec<T>&a,vec<T>&m,T M=0){ll K=a.size();m.eb(M);vec<T>t(K),S(K+1),P(K+1,1);fo(i,K){t[i]=mod((a[i]-S[i])*inv_mod(P[i],m[i]),m[i]);fo(j,i+1,K+1){S[j]+=t[i]*P[j];P[j]*=m[i];if(m[j])S[j]%=m[j],P[j]%=m[j];}}ll r=S.back();m.pop_back();return S.back();}template<class T>T chinese_remainder_theorem(const vec<T>&a,const vec<T>&m,T M=0){ll K=a.size();fo(i,K)fo(j,i+1,K)if((a[i]-a[j])%gcd(m[i],m[j]))return-1;unordered_map<T,pair<T,T>>exponent_max_congruence;fo(i,K)fe(factorize(m[i]),p,b)if(exponent_max_congruence[p].b<b)exponent_max_congruence[p]={a[i],b};vec<T>a_mod_prime_pow,m_mod_prime_pow;fe(exponent_max_congruence,p,v){T pq=pw(p,v.b);a_mod_prime_pow.eb(v.a%pq);m_mod_prime_pow.eb(pq);}return chinese_remainder_theorem_coprime(a_mod_prime_pow,m_mod_prime_pow,M);}void main(){io();ll T=1;fo(T)solve();}void solve(){auto s=sinen("0");auto t=sinen("0");ll N=s.back();ll M=t.back();if(s.size()>=2)N+=s.end()[-2]*10;if(t.size()>=2)M+=t.end()[-2]*10;ll r2=pw(N,M,2);ll r5=pw(N,M,5);pp(chinese_remainder_theorem(vec<ll>{r2,r5},vec<ll>{2,5}));}}