#include using namespace std; template map count(const T& t) { map res; for (const auto& i : t) ++res[i]; return res; } template inline T gcd(T a, T b) { return __gcd(a, b); } template inline T lcm(T a, T b) { return a / gcd(a, b) * b; } template inline T floor(T a, T b) { return floor(a / b) * b <= a ? floor(a / b) : floor(a / b) - 1; } template inline T ceil(T a, T b) { return floor(a + b - 1, b); } template inline T round(T a, T b) { return floor(a + b / 2); } template inline T mod(T a, T b) { return a - floor(a, b) * b; } template inline T factorial(T n) { return n <= 1 ? 1 : factorial(n - 1) * n; } template class Combination { private: vector> comb; public: Combination(int n = 0) : comb(n, vector(n, 0)) { for (int i = 0; i < n; ++i) comb[i][0] = 1; for (int i = 1; i < n; ++i) { for (int j = 1; j < n; ++j) { comb[i][j] = comb[i - 1][j] + comb[i - 1][j - 1]; } } } T combination(int n, int m) { if (n < m) return 0; if (n < (int)comb.size()) return comb[n][m]; T res = 1; for (int i = 0; i < min(m, n - m); ++i) res = res * (n - i) / (i + 1); return res; } T combination_safety(int n, int m) { if (n < m) return 0; if (n < (int)comb.size()) return comb[n][m]; m = min(m, n - m); vector a(m), b(m); iota(a.begin(), a.end(), n - m + 1); iota(b.begin(), b.end(), 1); for (auto i : b) { for (auto& j : a) { auto g = gcd(i, j); i /= g; j /= g; if (i == 1) break; } } return accumulate(a.begin(), a.end(), T(1), multiplies()); } T repetition(int n, int r) { return combination(n + r - 1, r); } }; namespace arithmetic { template class Addition { public: template T operator+(const V& v) const { return T(static_cast(*this)) += v; } }; template class Subtraction { public: template T operator-(const V& v) const { return T(static_cast(*this)) -= v; } }; template class Multiplication { public: template T operator*(const V& v) const { return T(static_cast(*this)) *= v; } }; template class Division { public: template T operator/(const V& v) const { return T(static_cast(*this)) /= v; } }; template class Modulus { public: template T operator%(const V& v) const { return T(static_cast(*this)) %= v; } }; } template class IndivisibleArithmetic : public arithmetic::Addition, public arithmetic::Subtraction, public arithmetic::Multiplication {}; template class Arithmetic : public IndivisibleArithmetic, public arithmetic::Division {}; class Inverse { private: long long mod; vector inv; public: Inverse() {} Inverse(long long mod, long long n = 1000000) : mod(mod) { inv = vector(n, 1); for (int i = 2; i < n; ++i) inv[i] = inv[mod % i] * (mod - mod / i) % mod; } long long operator()(long long a) const { if (a < (int)inv.size()) return inv[a]; long long b = mod, x = 1, y = 0; while (b) { long long t = a / b; swap(a -= t * b, b); swap(x -= t * y, y); } return (x %= mod) < 0 ? x + mod : x; } }; class Mint : public Arithmetic { private: static long long mod; static Inverse inverse; long long val; public: Mint() {} Mint(const long long& val) { this->val = val % mod; if (this->val < 0) this->val += mod; } static void setMod(const long long& m) { mod = m; inverse = Inverse(m); } Mint operator+=(const Mint& m) { val += m.val; if (val >= mod) val -= mod; return *this; } Mint operator-=(const Mint& m) { val -= m.val; if (val < 0) val += mod; return *this; } Mint operator*=(const Mint& m) { val *= m.val; val %= mod; return *this; } Mint operator/=(const Mint& m) { val *= inverse(m.val); val %= mod; return *this; } Mint operator++() {return val += 1;} operator long long() { return val; } Mint identity() const { return 1; } }; long long Mint::mod = 1000000007; Inverse Mint::inverse(1000000007); ostream& operator<<(ostream& os, Mint a) { os << (long long)a; return os; } istream& operator>>(istream& is, Mint& a) { long long n; is >> n; a = n; return is; } int main() { string s; cin >> s; auto m = count(s); Mint::setMod(573); Combination comb; int n = s.size(); Mint res = 1; for (auto k : m) { res *= comb.combination_safety(n, k.second); n -= k.second; } cout << res - 1 << endl; }