#pragma GCC optimize ("O3") #pragma GCC target ("avx") #include using namespace std;using uint = unsigned int;using ll = long long; #define PU public #define PR PU #define TE template #define TY typename #define ST static #define IN inline #define OP operator #define CE constexpr #define CO const #define RE return #define NE noexcept #define VE vector #define LI list #define SZ size #define WH while #define TYPE_OF(VAR) remove_const::type >::type #define UNTIE ios_base::sync_with_stdio(false); cin.tie(nullptr) #define CEXPR(LL,BOUND,VALUE) CE CO LL BOUND = VALUE #define CIN(LL,A) LL A; cin >> A #define ASSERT(A,MIN,MAX) assert(MIN <= A && A <= MAX) #define CIN_ASSERT(A,MIN,MAX) CIN(TYPE_OF(MAX),A); ASSERT(A,MIN,MAX) #define FOR(VAR,INITIAL,FINAL_PLUS_ONE) for(TYPE_OF(FINAL_PLUS_ONE) VAR = INITIAL;VAR < FINAL_PLUS_ONE;VAR ++) #define FOREQ(VAR,INITIAL,FINAL) for(TYPE_OF(FINAL) VAR = INITIAL;VAR <= FINAL;VAR ++) #define FOREQINV(VAR,INITIAL,FINAL) for(TYPE_OF(INITIAL) VAR = INITIAL;VAR >= FINAL;VAR --) #define FOR_I(ARRAY,I,END) for(auto I = ARRAY .begin(),END = ARRAY .end();I != END;I ++) #define REPEAT(HOW_MANY_TIMES) FOR(VARIABLE_FOR_REPEAT,0,HOW_MANY_TIMES) #define QUIT RE 0 #define COUT(AN) cout << (AN) << "\n"; #define RETURN(AN) COUT(AN); QUIT #define RE_ZERO_FOR_MU_FOR_TR_POLYNOMIAL_IF(CONDITION) if(CONDITION){ RE OP=(zero); } #define RE_ZERO_FOR_TR_MU_CO_FOR_TR_POLYNOMIAL_IF(CONDITION) if(CONDITION){ RE TRPO(m_N); } #define SET_VE_FOR_AN_OF_MU_FOR_TR_POLYNOMIAL(N_OUTPUT_LIM) if(PO::m_SZ < N_OUTPUT_LIM){ for(uint i = PO::m_SZ;i < N_OUTPUT_LIM;i++){ PO::m_f.push_back(0); } PO::m_SZ = N_OUTPUT_LIM; } #define SET_VE_FOR_AN_OF_TR_MU_CO_FOR_TR_POLYNOMIAL(N_OUTPUT_LIM) VE AN(N_OUTPUT_LIM) #define SET_SUM_OF_MU_FOR_TR_POLYNOMIAL PO::m_f[i] = sum #define SET_SUM_OF_TR_MU_CO_FOR_TR_POLYNOMIAL AN[i] = sum #define SET_N_INPUT_START_FOR_MU_FOR_TR_POLYNOMIAL(F,SZ,N_INPUT_START_NUM) uint N_INPUT_START_NUM; for(uint i = 0;i < SZ && searching;i++){ if(F[i] != zero){ N_INPUT_START_NUM = i; searching = false; } } #define SET_N_INPUT_MAX_FOR_MU_FOR_TR_POLYNOMIAL(F,SZ,N_INPUT_MAX_NUM) uint N_INPUT_MAX_NUM; searching = true; for(uint i = (SZ) - 1;searching;i--){ if(F[i] != zero){ N_INPUT_MAX_NUM = i; searching = false; } } #define CONVOLUTION_FOR_MU_FOR_TR_POLYNOMIAL(J_MIN) CO uint j_max = i < N_input_max_0_start_1 ? i - N_input_start_1:N_input_max_0; T sum{ zero }; for(uint j = J_MIN;j <= j_max;j++){ sum += PO::m_f[j] * f.PO::m_f[i - j]; } PO::m_f[i] = sum; #define CONVOLUTION_FOR_TR_MU_CO_FOR_TR_POLYNOMIAL(J_MIN) CO uint j_max = i < N_input_max_0_start_1 ? i - N_input_start_1:N_input_max_0; T& m_fi = AN[i]; for(uint j = J_MIN;j <= j_max;j++){ m_fi += PO::m_f[j] * f.PO::m_f[i - j]; } #define ZEROIFICATION_FOR_MU_FOR_TR_POLYNOMIAL for(uint i = 0;i < N_input_start_0_start_1;i++){ PO::m_f[i] = 0; } #define ZEROIFICATION_FOR_TR_MU_CO_FOR_TR_POLYNOMIAL for(uint i = 0;i < N_input_start_0_start_1;i++){ AN[i] = 0; } #define CN(S1,S2) SUBSTITUTE_CN(S1,S2) #define SUBSTITUTE_CN(S1,S2) S1 ## S2 #define DF_0_OF__FOR_TR_POLYNOMIAL(MU,ACCESS_ENTRY) CN(CN(RE_ZERO_FOR_,MU),_FOR_TR_POLYNOMIAL_IF)(PO::m_SZ == 0); uint N_output_max = PO::m_SZ + f.PO::m_SZ - 2; if(N_output_max >= m_N){ N_output_max = m_N - 1; } CO uint N_output_lim = N_output_max + 1; CN(CN(SET_VE_FOR_AN_OF_,MU),_FOR_TR_POLYNOMIAL)(N_output_lim); for(uint i = N_output_max;searching;i--){ T sum{ zero }; for(uint j = 0;j <= i;j++){ sum += ACCESS_ENTRY * f.PO::OP[](i - j); } CN(CN(SET_SUM_OF_,MU),_FOR_TR_POLYNOMIAL); searching = i > 0; } #define DF_0_OF_MU_FOR_TR_POLYNOMIAL DF_0_OF__FOR_TR_POLYNOMIAL(MU,PO::m_f[j]) #define DF_0_OF_TR_MU_CO_FOR_TR_POLYNOMIAL DF_0_OF__FOR_TR_POLYNOMIAL(TR_MU_CO,PO::OP[](j)) #define DF_1_OF__FOR_TR_POLYNOMIAL(MU) SET_N_INPUT_START_FOR_MU_FOR_TR_POLYNOMIAL(PO::m_f,PO::m_SZ,N_input_start_0); CN(CN(RE_ZERO_FOR_,MU),_FOR_TR_POLYNOMIAL_IF)(searching); searching = true; SET_N_INPUT_START_FOR_MU_FOR_TR_POLYNOMIAL(f,f.PO::m_SZ,N_input_start_1); #define DF_1_OF_MU_FOR_TR_POLYNOMIAL DF_1_OF__FOR_TR_POLYNOMIAL(MU) #define DF_1_OF_TR_MU_CO_FOR_TR_POLYNOMIAL DF_1_OF__FOR_TR_POLYNOMIAL(TR_MU_CO) #define DF_2_OF_MU_FOR_TR_POLYNOMIAL SET_N_INPUT_MAX_FOR_MU_FOR_TR_POLYNOMIAL(PO::m_f,PO::m_SZ,N_input_max_0); SET_N_INPUT_MAX_FOR_MU_FOR_TR_POLYNOMIAL(f,f.PO::m_SZ < m_N ? f.PO::m_SZ:m_N,N_input_max_1); CO uint N_input_max_0_max_1 = N_input_max_0 + N_input_max_1; CO uint N_input_start_0_start_1 = N_input_start_0 + N_input_start_1; #define DF_2_OF_TR_MU_CO_FOR_TR_POLYNOMIAL DF_2_OF_MU_FOR_TR_POLYNOMIAL #define DF_3_OF__FOR_TR_POLYNOMIAL(MU) CO uint N_input_start_0_max_1 = N_input_start_0 + N_input_max_1; CO uint N_input_max_0_start_1 = N_input_max_0 + N_input_start_1; CO uint N_output_max_fixed = N_output_lim_fixed - 1; CN(CN(SET_VE_FOR_AN_OF_,MU),_FOR_TR_POLYNOMIAL)(N_output_lim_fixed); for(uint i = N_output_max_fixed;i > N_input_start_0_max_1;i--){ CN(CN(CONVOLUTION_FOR_,MU),_FOR_TR_POLYNOMIAL)(i - N_input_max_1); } searching = true; for(uint i = N_input_start_0_max_1 < N_output_max_fixed ? N_input_start_0_max_1:N_output_max_fixed;searching;i--){ CN(CN(CONVOLUTION_FOR_,MU),_FOR_TR_POLYNOMIAL)(N_input_start_0); searching = i > N_input_start_0_start_1; } CN(CN(ZEROIFICATION_FOR_,MU),_FOR_TR_POLYNOMIAL); #define DF_3_OF_MU_FOR_TR_POLYNOMIAL DF_3_OF__FOR_TR_POLYNOMIAL(MU) #define DF_3_OF_TR_MU_CO_FOR_TR_POLYNOMIAL DF_3_OF__FOR_TR_POLYNOMIAL(TR_MU_CO) #define DF_4_OF_MU_FOR_TR_POLYNOMIAL uint two_power = FFT_MU_border_1_2; uint exponent = FFT_MU_border_1_2_exponent; T two_power_inv{ FFT_MU_border_1_2_inv }; WH(N_input_truncated_deg_0_deg_1 >= two_power){ two_power *= 2; two_power_inv /= 2; exponent++; } VE f0{ move(FFT(PO::m_f,N_input_start_0,N_input_max_0 + 1,0,two_power,exponent)) }; CO VE f1{ move(FFT(f.PO::m_f,N_input_start_1,N_input_max_1 + 1,0,two_power,exponent)) }; for(uint i = 0;i < two_power;i++){ f0[i] *= f1[i]; } #define DF_4_OF_TR_MU_CO_FOR_TR_POLYNOMIAL DF_4_OF_MU_FOR_TR_POLYNOMIAL #define DF_OF_INVERSE_FOR_TR_POLYNOMIAL(TYPE,RECURSION) CO uint& N = f.GetTruncation(); uint power; uint power_2 = 1; TRPO< TYPE > f_inv{ power_2,PO< TYPE >::CO_one() / f[0] }; WH(power_2 < N){ power = power_2; power_2 *= 2; f_inv.SetTruncation(power_2); RECURSION; } f_inv.SetTruncation(N); RE f_inv #define DF_OF_EXP_FOR_TR_POLYNOMIAL(TYPE,RECURSION) CO uint& N = f.GetTruncation(); uint power; uint power_2 = 1; TRPO< TYPE > f_exp{ power_2,PO< TYPE >::CO_one() }; WH(power_2 < N){ power = power_2; power_2 *= 2; f_exp.SetTruncation(power_2); RECURSION; } f_exp.SetTruncation(N); RE f_exp #define DF_OF_PARTIAL_SPECIALISATION_OF_MU_OF_TR_POLYNOMIAL(TYPE,BORDER_0,BORDER_1,BORDER_1_2,BORDER_1_2_EXPONENT,BORDER_1_2_INV) TE <> CE CO uint FFT_MU_border_0< TYPE > = BORDER_0; TE <> CE CO uint FFT_MU_border_1< TYPE > = BORDER_1; TE <> CE CO uint FFT_MU_border_1_2< TYPE > = BORDER_1_2; TE <> CE CO uint FFT_MU_border_1_2_exponent< TYPE > = BORDER_1_2_EXPONENT; TE <> CE CO uint FFT_MU_border_1_2_inv< TYPE > = BORDER_1_2_INV; TE <> IN TRPO< TYPE >& TRPO< TYPE >::OP*=(CO PO< TYPE >& f) { RE TRPO< TYPE >::FFT_MU(f); } TE <> TRPO< TYPE > Inverse(CO TRPO< TYPE >& f) { DF_OF_INVERSE_FOR_TR_POLYNOMIAL(TYPE,f_inv.TRMinus(f_inv.FFT_TRMU_CO(f,power,power_2).FFT_TRMU(f_inv,power,power_2),power,power_2)); } TE <> TRPO< TYPE > Exp(CO TRPO< TYPE >& f) { DF_OF_EXP_FOR_TR_POLYNOMIAL(TYPE,f_exp.TRMinus((TRIntegral(Differential(f_exp).FFT_TRMU_CO(Inverse(f_exp),power - 1,power_2),power).TRMinus(f,power,power_2)).FFT_TRMU(f_exp,power,power_2),power,power_2)); } #define DF_OF_PARTIAL_SPECIALISATION_OF_MU_OF_POLYNOMIAL(TYPE) TE <> PO& PO::OP*=(CO PO& f) { if(m_SZ != 0){ VE v{}; v.swap(m_f); TRPO f_copy{ m_SZ + f.m_SZ - 1,move(v) }; f_copy *= f; m_f = move(f_copy.PO::m_f); m_SZ = m_f.SZ(); } RE *this; } #define SET_MA_MULTIPOINT_EVALUATION(SAMPLE_NUM_MAX,POINT) point = move(VE(SAMPLE_NUM_MAX + 1)); for(uint t = 0;t <= SAMPLE_NUM_MAX;t++){ point[t] = POINT; } VE eval[Y][Y] = {}; for(uint y = 0;y < Y;y++){ CO VE >& M_ref_y = M_ref[y]; VE (&eval_y)[Y] = eval[y]; for(uint x = 0;x < Y;x++){ SetMultipointEvaluation(M_ref_y[x],point,eval_y[x]); } } VE > sample(SAMPLE_NUM_MAX + 1,MA::Zero()); for(uint t = 0;t <= SAMPLE_NUM_MAX;t++){ VE >& sample_t_ref = sample[t].RefTable(); for(uint y = 0;y < Y;y++){ VE& sample_t_ref_y = sample_t_ref[y]; VE (&eval_y)[Y] = eval[y]; for(uint x = 0;x < Y;x++){ sample_t_ref_y[x] = eval_y[x][t]; } } } #define MULTIPLY_SUBPRODUCT_OF_PRECURSIVE_MA(REST_INTERVAL_LENGTH) VE > eval_odd{}; VE > eval_even{}; SetIntervalEvaluation(subinterval_num_max,subinterval_length / interval_length,REST_INTERVAL_LENGTH + subinterval_num_max + 1,sample,eval_odd); SetIntervalEvaluation(subinterval_num_max,T(subinterval_num_max + 1),REST_INTERVAL_LENGTH,sample,eval_even); for(uint t = 0;t <= subinterval_num_max;t++){ sample[t] = move(eval_odd[t] * sample[t]); } for(uint t = 0;t < REST_INTERVAL_LENGTH;t++){ sample.push_back(move(eval_odd[t + subinterval_num_max + 1] * eval_even[t])); } TE IN T Residue(CO T& a,CO T& p){ RE a >= 0 ? a % p:p - (- a - 1) % p - 1; }IN CEXPR(ll,P,998244353);TE class Mod{PR:ll m_n;ll m_inv;PU:IN Mod() NE;IN Mod(CO ll& n) NE;IN Mod(CO Mod& n) NE;IN Mod& OP=(CO ll& n) NE;Mod& OP=(CO Mod& n) NE;Mod& OP+=(CO ll& n) NE;IN Mod& OP+=(CO Mod& n) NE;IN Mod& OP-=(CO ll& n) NE;IN Mod& OP-=(CO Mod& n) NE;Mod& OP*=(CO ll& n) NE;Mod& OP*=(CO Mod& n) NE;virtual Mod& OP/=(CO ll& n);virtual Mod& OP/=(CO Mod& n);Mod& OP%=(CO ll& n);IN Mod& OP%=(CO Mod& n);IN Mod OP-() CO NE;IN Mod& OP++() NE;IN Mod& OP++(int) NE;IN Mod& OP--() NE;IN Mod& OP--(int) NE;IN CO ll& Represent() CO NE;void Invert() NE;bool CheckInvertible() NE;bool IsSmallerThan(CO ll& n) CO NE;bool IsBiggerThan(CO ll& n) CO NE;};TE IN bool OP==(CO Mod& n0,CO ll& n1) NE;TE IN bool OP==(CO ll& n0,CO Mod& n1) NE;TE IN bool OP==(CO Mod& n0,CO Mod& n1) NE;TE IN bool OP==(CO Mod& n0,CO Mod& n1) NE;TE IN bool OP!=(CO Mod& n0,CO ll& n1) NE;TE IN bool OP!=(CO ll& n0,CO Mod& n1) NE;TE IN bool OP!=(CO Mod& n0,CO Mod& n1) NE;TE IN bool OP!=(CO Mod& n0,CO Mod& n1) NE;TE IN bool OP<(CO Mod& n0,CO ll& n1) NE;TE IN bool OP<(CO ll& n0,CO Mod& n1) NE;TE IN bool OP<(CO Mod& n0,CO Mod& n1) NE;TE IN bool OP<=(CO Mod& n0,CO ll& n1) NE;TE IN bool OP<=(CO ll& n0,CO Mod& n1) NE;TE IN bool OP<=(CO Mod& n0,CO Mod& n1) NE;TE IN bool OP<=(CO Mod& n0,CO Mod& n1) NE;TE IN bool OP>(CO Mod& n0,CO ll& n1) NE;TE IN bool OP>(CO ll& n0,CO Mod& n1) NE;TE IN bool OP>(CO Mod& n0,CO Mod& n1) NE;TE IN bool OP>(CO Mod& n0,CO Mod& n1) NE;TE IN bool OP>=(CO Mod& n0,CO ll& n1) NE;TE IN bool OP>=(CO ll& n0,CO Mod& n1) NE;TE IN bool OP>=(CO Mod& n0,CO Mod& n1) NE;TE IN bool OP>=(CO Mod& n0,CO Mod& n1) NE;TE Mod OP+(CO Mod& n0,CO ll& n1) NE;TE Mod OP+(CO ll& n0,CO Mod& n1) NE;TE Mod OP+(CO Mod& n0,CO Mod& n1) NE;TE IN Mod OP-(CO Mod& n0,CO ll& n1) NE;TE Mod OP-(CO ll& n0,CO Mod& n1) NE;TE Mod OP-(CO Mod& n0,CO Mod& n1) NE;TE Mod OP*(CO Mod& n0,CO ll& n1) NE;TE Mod OP*(CO ll& n0,CO Mod& n1) NE;TE Mod OP*(CO Mod& n0,CO Mod& n1) NE;TE Mod OP/(CO Mod& n0,CO ll& n1);TE Mod OP/(CO ll& n0,CO Mod& n1);TE Mod OP/(CO Mod& n0,CO Mod& n1);TE Mod OP%(CO Mod& n0,CO ll& n1);TE IN Mod OP%(CO ll& n0,CO Mod& n1);TE IN Mod OP%(CO Mod& n0,CO Mod& n1);TE Mod Inverse(CO Mod& n);TE Mod Power(CO Mod& n,CO ll& p,CO string& method = "normal");TE <> IN Mod<2> Power(CO Mod<2>& n,CO ll& p,CO string& method);TE IN Mod Power(CO Mod& n,CO Mod& p,CO string& method = "normal");TE <> IN Mod<2> Power(CO Mod<2>& n,CO Mod<2>& p,CO string& method);TE IN T Square(CO T& t);TE <> IN Mod<2> Square >(CO Mod<2>& t);TE IN string to_string(CO Mod& n) NE;TE IN basic_ostream& OP<<(basic_ostream& os,CO Mod& n);void LazyEvaluationOfModularInverse(CO ll& M,CO ll& n,ll& m){CE CO ll border = 1000000;if(n > border){CO ll n_minus = M - n;if(n_minus <= border){LazyEvaluationOfModularInverse(M,n_minus,m);m = M - m;RE;} else {m = 1;ll exponent = M - 2;ll power_n = n;WH(exponent != 0){if(exponent % 2 == 1){(m *= power_n) %= M;}(power_n *= power_n) %= M;exponent /= 2;}RE;}}ST LI memory_M{};ST LI > memory_inverse{};auto I_M = memory_M.begin(),end_M = memory_M.end();auto I_inverse = memory_inverse.begin();VE* p_inverse = nullptr;WH(I_M != end_M && p_inverse == nullptr){if(*I_M == M){p_inverse = &(*I_inverse);}I_M++;I_inverse++;}if(p_inverse == nullptr){memory_M.push_front(M);memory_inverse.push_front(VE());p_inverse = &(memory_inverse.front());p_inverse->push_back(M);}CO ll SZ = p_inverse->SZ();for(ll i = SZ;i <= n;i++){p_inverse->push_back(0);}ll& n_inv = (*p_inverse)[n];if(n_inv != 0){m = n_inv;RE;}CO ll M_abs = M >= 0 ? M:-M;CO ll n_sub = M_abs % n;ll n_sub_inv = (*p_inverse)[n_sub];if(n_sub_inv == 0){LazyEvaluationOfModularInverse(M,n_sub,n_sub_inv);}if(n_sub_inv != M){n_inv = M_abs - ((n_sub_inv * (M_abs / n)) % M_abs);m = n_inv;RE;}for(ll i = 1;i < M_abs;i++){if((n * i) % M_abs == 1){n_inv = i;m = n_inv;RE;}}n_inv = M;m = n_inv;RE;}TE IN Mod::Mod() NE:m_n(0),m_inv(M){}TE IN Mod::Mod(CO ll& n) NE:m_n(Residue(n,M)),m_inv(0){}TE IN Mod::Mod(CO Mod& n) NE:m_n(n.m_n),m_inv(0){}TE IN Mod& Mod::OP=(CO ll& n) NE { RE OP=(Mod(n)); }TE Mod& Mod::OP=(CO Mod& n) NE{m_n = n.m_n;m_inv = n.m_inv;RE *this;}TE Mod& Mod::OP+=(CO ll& n) NE{m_n = Residue(m_n + n,M);m_inv = 0;RE *this;}TE IN Mod& Mod::OP+=(CO Mod& n) NE { RE OP+=(n.m_n); };TE IN Mod& Mod::OP-=(CO ll& n) NE { RE OP+=(-n); }TE IN Mod& Mod::OP-=(CO Mod& n) NE { RE OP-=(n.m_n); }TE Mod& Mod::OP*=(CO ll& n) NE{m_n = Residue(m_n * n,M);m_inv = 0;RE *this;}TE Mod& Mod::OP*=(CO Mod& n) NE{m_n = Residue(m_n * n.m_n,M);if(m_inv == 0 || n.m_inv == 0){m_inv = 0;} else if(m_inv == M || n.m_inv == M){m_inv = M;} else {Residue(m_inv * n.m_inv,M);}RE *this;}TE Mod& Mod::OP/=(CO ll& n){RE OP/=(Mod(n));}TE Mod& Mod::OP/=(CO Mod& n){RE OP*=(Inverse(n));}TE Mod& Mod::OP%=(CO ll& n){m_n %= Residue(n,M);m_inv = 0;RE *this;}TE IN Mod& Mod::OP%=(CO Mod& n) { RE OP%=(n.m_n); }TE IN Mod Mod::OP-() CO NE { RE Mod(0).OP-=(*this); }TE IN Mod& Mod::OP++() NE { RE OP+=(1); }TE IN Mod& Mod::OP++(int) NE { RE OP++(); }TE IN Mod& Mod::OP--() NE { RE OP-=(1); }TE IN Mod& Mod::OP--(int) NE { RE OP-=(); }TE IN CO ll& Mod::Represent() CO NE { RE m_n; }TE void Mod::Invert() NE{if(CheckInvertible()){ll i = m_inv;m_inv = m_n;m_n = i;} else {m_n = M;m_inv = M;}RE;}TE bool Mod::CheckInvertible() NE{if(m_inv == 0){LazyEvaluationOfModularInverse(M,m_n,m_inv);}RE m_inv != M;}TE IN bool Mod::IsSmallerThan(CO ll& n) CO NE { RE m_n < Residue(n,M); }TE IN bool Mod::IsBiggerThan(CO ll& n) CO NE { RE m_n > Residue(n,M); }TE IN bool OP==(CO Mod& n0,CO ll& n1) NE { RE n0 == Mod(n1); }TE IN bool OP==(CO ll& n0,CO Mod& n1) NE { RE Mod(n0) == n0; }TE IN bool OP==(CO Mod& n0,CO Mod& n1) NE { RE n0.Represent() == n1.Represent(); }TE IN bool OP!=(CO Mod& n0,CO ll& n1) NE { RE !(n0 == n1); }TE IN bool OP!=(CO ll& n0,CO Mod& n1) NE { RE !(n0 == n1); }TE IN bool OP!=(CO Mod& n0,CO Mod& n1) NE { RE !(n0 == n1); }TE IN bool OP<(CO Mod& n0,CO ll& n1) NE { RE n0.IsSmallerThan(n1); }TE IN bool OP<(CO ll& n0,CO Mod& n1) NE { RE n1.IsBiggerThan(n0); }TE IN bool OP<(CO Mod& n0,CO Mod& n1) NE { RE n0.Represent() < n1.Represent(); }TE IN bool OP<=(CO Mod& n0,CO ll& n1) NE { RE !(n1 < n0); }TE IN bool OP<=(CO ll& n0,CO Mod& n1) NE { RE !(n1 < n0); }TE IN bool OP<=(CO Mod& n0,CO Mod& n1) NE { RE !(n1 < n0); }TE IN bool OP>(CO Mod& n0,CO ll& n1) NE { RE n1 < n0; }TE IN bool OP>(CO ll& n0,CO Mod& n1) NE { RE n1 < n0; }TE IN bool OP>(CO Mod& n0,CO Mod& n1) NE { RE n1 < n0; }TE IN bool OP>=(CO Mod& n0,CO ll& n1) NE { RE !(n0 < n1); }TE IN bool OP>=(CO ll& n0,CO Mod& n1) NE { RE !(n0 < n1); }TE IN bool OP>=(CO Mod& n0,CO Mod& n1) NE { RE !(n0 < n1); }TE Mod OP+(CO Mod& n0,CO ll& n1) NE{auto n = n0;n += n1;RE n;}TE IN Mod OP+(CO ll& n0,CO Mod& n1) NE { RE n1 + n0; }TE IN Mod OP+(CO Mod& n0,CO Mod& n1) NE { RE n0 + n1.Represent(); }TE IN Mod OP-(CO Mod& n0,CO ll& n1) NE { RE n0 + (-n1); }TE IN Mod OP-(CO ll& n0,CO Mod& n1) NE { RE Mod(n0 - n1.Represent()); }TE IN Mod OP-(CO Mod& n0,CO Mod& n1) NE { RE n0 - n1.Represent(); }TE Mod OP*(CO Mod& n0,CO ll& n1) NE{auto n = n0;n *= n1;RE n;}TE IN Mod OP*(CO ll& n0,CO Mod& n1) NE { RE n1 * n0; }TE Mod OP*(CO Mod& n0,CO Mod& n1) NE{auto n = n0;n *= n1;RE n;}TE IN Mod OP/(CO Mod& n0,CO ll& n1) { RE n0 / Mod(n1); }TE IN Mod OP/(CO ll& n0,CO Mod& n1) { RE Mod(n0) / n1; }TE Mod OP/(CO Mod& n0,CO Mod& n1){auto n = n0;n /= n1;RE n;}TE Mod OP%(CO Mod& n0,CO ll& n1){auto n = n0;n %= n1;RE n;}TE IN Mod OP%(CO ll& n0,CO Mod& n1) { RE Mod(n0) % n1.Represent(); }TE IN Mod OP%(CO Mod& n0,CO Mod& n1) { RE n0 % n1.Represent(); }TE Mod Inverse(CO Mod& n){auto n_copy = n;n_copy.Invert();RE n_copy;}TE Mod Power(CO Mod& n,CO ll& p,CO string& method){if(p >= 0){RE Power,ll>(n,p,1,true,true,method);}RE Inverse(Power(n,-p,method));}TE <> IN Mod<2> Power(CO Mod<2>& n,CO ll& p,CO string& method) { RE p == 0 ? 1:n; }TE