#line 1 "main.cpp" #include #line 2 "/home/user/Library/utils/macros.hpp" #define REP(i, n) for (int i = 0; (i) < (int)(n); ++ (i)) #define REP3(i, m, n) for (int i = (m); (i) < (int)(n); ++ (i)) #define REP_R(i, n) for (int i = (int)(n) - 1; (i) >= 0; -- (i)) #define REP3R(i, m, n) for (int i = (int)(n) - 1; (i) >= (int)(m); -- (i)) #define ALL(x) std::begin(x), std::end(x) #line 4 "/home/user/Library/modulus/modpow.hpp" inline int32_t modpow(uint_fast64_t x, uint64_t k, int32_t MOD) { assert (/* 0 <= x and */ x < (uint_fast64_t)MOD); uint_fast64_t y = 1; for (; k; k >>= 1) { if (k & 1) (y *= x) %= MOD; (x *= x) %= MOD; } assert (/* 0 <= y and */ y < (uint_fast64_t)MOD); return y; } #line 5 "/home/user/Library/modulus/modinv.hpp" inline int32_t modinv_nocheck(int32_t value, int32_t MOD) { assert (0 <= value and value < MOD); if (value == 0) return -1; int64_t a = value, b = MOD; int64_t x = 0, y = 1; for (int64_t u = 1, v = 0; a; ) { int64_t q = b / a; x -= q * u; std::swap(x, u); y -= q * v; std::swap(y, v); b -= q * a; std::swap(b, a); } if (not (value * x + MOD * y == b and b == 1)) return -1; if (x < 0) x += MOD; assert (0 <= x and x < MOD); return x; } inline int32_t modinv(int32_t x, int32_t MOD) { int32_t y = modinv_nocheck(x, MOD); assert (y != -1); return y; } #line 4 "/home/user/Library/modulus/mint_core.hpp" /** * @brief quotient ring / 剰余環 $\mathbb{Z}/n\mathbb{Z}$ */ template struct mint { int32_t value; mint() : value() {} mint(int64_t value_) : value(value_ < 0 ? value_ % MOD + MOD : value_ >= MOD ? value_ % MOD : value_) {} mint(int32_t value_, std::nullptr_t) : value(value_) {} explicit operator bool() const { return value; } inline mint operator + (mint other) const { return mint(*this) += other; } inline mint operator - (mint other) const { return mint(*this) -= other; } inline mint operator * (mint other) const { return mint(*this) *= other; } inline mint & operator += (mint other) { this->value += other.value; if (this->value >= MOD) this->value -= MOD; return *this; } inline mint & operator -= (mint other) { this->value -= other.value; if (this->value < 0) this->value += MOD; return *this; } inline mint & operator *= (mint other) { this->value = (uint_fast64_t)this->value * other.value % MOD; return *this; } inline mint operator - () const { return mint(this->value ? MOD - this->value : 0, nullptr); } inline bool operator == (mint other) const { return value == other.value; } inline bool operator != (mint other) const { return value != other.value; } inline mint pow(uint64_t k) const { return mint(modpow(value, k, MOD), nullptr); } inline mint inv() const { return mint(modinv(value, MOD), nullptr); } inline mint operator / (mint other) const { return *this * other.inv(); } inline mint & operator /= (mint other) { return *this *= other.inv(); } }; template mint operator + (int64_t value, mint n) { return mint(value) + n; } template mint operator - (int64_t value, mint n) { return mint(value) - n; } template mint operator * (int64_t value, mint n) { return mint(value) * n; } template mint operator / (int64_t value, mint n) { return mint(value) / n; } template std::istream & operator >> (std::istream & in, mint & n) { int64_t value; in >> value; n = value; return in; } template std::ostream & operator << (std::ostream & out, mint n) { return out << n.value; } #line 5 "/home/user/Library/number/matrix_template.hpp" template using matrix = std::array, H>; template matrix operator * (matrix const & a, matrix const & b) { matrix c = {}; REP (y, A) REP (z, B) REP (x, C) c[y][x] += a[y][z] * b[z][x]; return c; } template std::array operator * (matrix const & a, std::array const & b) { std::array c = {}; REP (y, H) REP (z, W) c[y] += a[y][z] * b[z]; return c; } template matrix operator + (matrix const & a, matrix const & b) { matrix c; REP (y, H) REP (x, W) c[y][x] = a[y][x] + b[y][x]; return c; } template std::array operator + (std::array const & a, std::array const & b) { std::array c; REP (i, N) c[i] = a[i] + b[i]; return c; } template matrix zero_matrix() { return {}; } template matrix unit_matrix() { matrix a = {}; REP (i, N) a[i][i] = 1; return a; } template matrix powmat(matrix x, int64_t k) { matrix y = unit_matrix(); for (; k; k >>= 1) { if (k & 1) y = y * x; x = x * x; } return y; } #line 5 "main.cpp" using namespace std; constexpr int MOD = 1000000007; mint solve(int k, int m, int64_t n, const vector & p, const vector & q, const vector & r) { constexpr int K = 6; assert (k <= K); auto pack = [&](int a, int b) { return a * K + b; }; matrix, K * K, K * K> f = {}; REP (i, m) { f[pack(q[i], r[i])][pack(p[i], q[i])] += 1; } array, K * K> x = {}; REP (b, K) { x[pack(0, b)] += 1; } array, K * K> y = powmat(f, n - 2) * x; mint ans = 0; REP (a, K) { ans += y[pack(a, 0)]; } return ans; } // generated by online-judge-template-generator v4.4.0 (https://github.com/kmyk/online-judge-template-generator) int main() { std::ios::sync_with_stdio(false); std::cin.tie(nullptr); constexpr char endl = '\n'; int K; int M; int64_t N; cin >> K >> M; vector P(M), Q(M), R(M); cin >> N; REP (i, M) { cin >> P[i] >> Q[i] >> R[i]; -- P[i]; -- Q[i]; -- R[i]; } auto ans = solve(K, M, N, P, Q, R); cout << ans << endl; return 0; }