#include using namespace std; #define rep(i, n) for(int i = 0; i < n; i++) #define rep2(i, x, n) for(int i = x; i <= n; i++) #define rep3(i, x, n) for(int i = x; i >= n; i--) #define each(e, v) for(auto &e: v) #define pb push_back #define eb emplace_back #define all(x) x.begin(), x.end() #define rall(x) x.rbegin(), x.rend() #define sz(x) (int)x.size() using ll = long long; using pii = pair; using pil = pair; using pli = pair; using pll = pair; const int MOD = 1000000007; //const int MOD = 998244353; const int inf = (1<<30)-1; const ll INF = (1LL<<60)-1; template bool chmax(T &x, const T &y) {return (x < y)? (x = y, true) : false;}; template bool chmin(T &x, const T &y) {return (x > y)? (x = y, true) : false;}; struct io_setup{ io_setup(){ ios_base::sync_with_stdio(false); cin.tie(NULL); cout << fixed << setprecision(15); } } io_setup; template struct Mod_Int{ int x; Mod_Int() : x(0) {} Mod_Int(long long y) : x(y >= 0 ? y % mod : (mod - (-y) % mod) % mod) {} Mod_Int &operator += (const Mod_Int &p){ if((x += p.x) >= mod) x -= mod; return *this; } Mod_Int &operator -= (const Mod_Int &p){ if((x += mod - p.x) >= mod) x -= mod; return *this; } Mod_Int &operator *= (const Mod_Int &p){ x = (int) (1LL * x * p.x % mod); return *this; } Mod_Int &operator /= (const Mod_Int &p){ *this *= p.inverse(); return *this; } Mod_Int &operator ++ () {return *this += Mod_Int(1);} Mod_Int operator ++ (int){ Mod_Int tmp = *this; ++*this; return tmp; } Mod_Int &operator -- () {return *this -= Mod_Int(1);} Mod_Int operator -- (int){ Mod_Int tmp = *this; --*this; return tmp; } Mod_Int operator - () const {return Mod_Int(-x);} Mod_Int operator + (const Mod_Int &p) const {return Mod_Int(*this) += p;} Mod_Int operator - (const Mod_Int &p) const {return Mod_Int(*this) -= p;} Mod_Int operator * (const Mod_Int &p) const {return Mod_Int(*this) *= p;} Mod_Int operator / (const Mod_Int &p) const {return Mod_Int(*this) /= p;} bool operator == (const Mod_Int &p) const {return x == p.x;} bool operator != (const Mod_Int &p) const {return x != p.x;} Mod_Int inverse() const{ assert(*this != Mod_Int(0)); return pow(mod-2); } Mod_Int pow(long long k) const{ Mod_Int now = *this, ret = 1; for(; k > 0; k >>= 1, now *= now){ if(k&1) ret *= now; } return ret; } friend ostream &operator << (ostream &os, const Mod_Int &p){ return os << p.x; } friend istream &operator >> (istream &is, Mod_Int &p){ long long a; is >> a; p = Mod_Int(a); return is; } }; using mint = Mod_Int; struct Random_Number_Generator{ mt19937_64 mt; Random_Number_Generator() : mt(chrono::steady_clock::now().time_since_epoch().count()) {} int64_t operator () (int64_t l, int64_t r){ //[l,r)で乱数発生 uniform_int_distribution dist(l, r-1); return dist(mt); } int64_t operator () (int64_t r){ //[0,r)で乱数発生 return (*this)(0, r); } }; long long modpow(long long x, long long n, const int &m){ long long ret = 1; for(; n > 0; n >>= 1, x *= x, x %= m){ if(n&1) ret *= x, ret %= m; } return ret; } template T Euler_Totient(T m){ //オイラーのφ関数(xとmが互いに素ならば、x^φ(m)≡1(mod m)) T ret = m; for(T i = 2; i*i <= m; i++){ if(m%i == 0) ret /= i, ret *= i-1; while(m%i == 0) m /= i; } if(m > 1) ret /= m, ret *= m-1; return ret; } int modlog(const int &x, long long y, const int &m){ //x^k=y(mod m)となる最小の非負整数k(xとmは互いに素) unordered_map mp; int n = 0; long long now = 1; for(; n*n < m; n++){ if(!mp.count(now)) mp[now] = n; now *= x, now %= m; } now = modpow(now, Euler_Totient(m)-1, m); for(int i = 0; i < n; i++){ if(mp.count(y)) return n*i+mp[y]; y *= now, y %= m; } return -1; } template T order(T x, const T &m){ //x^k=1(mod m)となる最小の正整数k(xとmは互いに素) T n = Euler_Totient(m); vector ds; for(T i = 1; i*i <= n; i++){ if(n%i == 0) ds.push_back(i), ds.push_back(n/i); } sort(begin(ds), end(ds)); for(auto &e: ds){ if(modpow(x, e, m) == 1) return e; } return -1; } template T primitive_root(const T &m){ //素数mの原始根 vector ds; for(T i = 1; i*i <= m-1; i++){ if((m-1)%i == 0) ds.push_back(i), ds.push_back((m-1)/i); } sort(begin(ds), end(ds)); Random_Number_Generator rnd; while(true){ T r = rnd(1, m); for(auto &e: ds){ if(e == m-1) return r; if(modpow(r, e, m) == 1) break; } } } int main(){ ll N; cin >> N; vector c(10); rep2(i, 1, 9) cin >> c[i]; vector ids; int K = 0, G = 0; rep2(i, 1, 9){ if(c[i] > 0){ ids.eb(i); K++; G = gcd(G, i); } } if(K == 1){ rep2(i, 1, 9){ if(c[i] > 0){ cout << (mint(10).pow(N)-1)*mint(i)/mint(9) << '\n'; return 0; } } } ll ans = G; if(G > 1){ each(e, ids) e /= G; rep2(i, 1, 9){ if(c[i] > 0){ c[i/G] = c[i]; c[i] = 0; } } } ll T = 0; rep2(i, 1, 9){ T += c[i]*i, T %= 9; } if(T == 0) ans *= 9; else if(T%3 == 0) ans *= 3; if(K >= 2){ G = 0; rep(i, K-1){ G = gcd(G, ids[i+1]-ids[i]); } if(G%3 == 0 && T == 0){ int pre = 0; ll M = 0, A = N; rep2(i, 1, 9){ if(c[i] > 0){ ll X = modpow(10, A, 243); X += 242, X %= 243; X /= 9; M += X*(i-pre), M %= 27; A -= c[i], pre = i; } } if(M%27 == 0) ans *= 3; } } if(K == 2 && ids[1]-ids[0] == 7){ ll M = modpow(10, N, 7); M += 6, M %= 7; M *= 4, M %= 7; if(M == 0) ans *= 7; } cout << ans << '\n'; }