/* #region Head */ // #include #include #include #include #include // assert.h #include // math.h #include #include #include #include #include #include #include #include #include #include #include #include #include #include #include #include #include #include #include #include using namespace std; using ll = long long; using ull = unsigned long long; using ld = long double; using pll = pair; template using vc = vector; template using vvc = vc>; using vll = vc; using vvll = vvc; using vld = vc; using vvld = vvc; using vs = vc; using vvs = vvc; template using um = unordered_map; template using pq = priority_queue; template using pqa = priority_queue, greater>; template using us = unordered_set; #define TREP(T, i, m, n) for (T i = (m), i##_len = (T)(n); i < i##_len; ++(i)) #define TREPM(T, i, m, n) for (T i = (m), i##_max = (T)(n); i <= i##_max; ++(i)) #define TREPR(T, i, m, n) for (T i = (m), i##_min = (T)(n); i >= i##_min; --(i)) #define TREPD(T, i, m, n, d) for (T i = (m), i##_len = (T)(n); i < i##_len; i += (d)) #define TREPMD(T, i, m, n, d) for (T i = (m), i##_max = (T)(n); i <= i##_max; i += (d)) #define REP(i, m, n) for (ll i = (m), i##_len = (ll)(n); i < i##_len; ++(i)) #define REPM(i, m, n) for (ll i = (m), i##_max = (ll)(n); i <= i##_max; ++(i)) #define REPR(i, m, n) for (ll i = (m), i##_min = (ll)(n); i >= i##_min; --(i)) #define REPD(i, m, n, d) for (ll i = (m), i##_len = (ll)(n); i < i##_len; i += (d)) #define REPMD(i, m, n, d) for (ll i = (m), i##_max = (ll)(n); i <= i##_max; i += (d)) #define REPI(itr, ds) for (auto itr = ds.begin(); itr != ds.end(); itr++) #define REPIR(itr, ds) for (auto itr = ds.rbegin(); itr != ds.rend(); itr++) #define ALL(x) begin(x), end(x) #define SIZE(x) ((ll)(x).size()) #define PERM(c) \ sort(ALL(c)); \ for (bool c##p = 1; c##p; c##p = next_permutation(ALL(c))) #define UNIQ(v) v.erase(unique(ALL(v)), v.end()); #define CEIL(a, b) (((a) + (b)-1) / (b)) #define endl '\n' constexpr ll INF = 1'010'000'000'000'000'017LL; constexpr int IINF = 1'000'000'007LL; constexpr ll MOD = 1'000'000'007LL; // 1e9 + 7 // constexpr ll MOD = 998244353; constexpr ld EPS = 1e-12; constexpr ld PI = 3.14159265358979323846; template istream &operator>>(istream &is, vc &vec) { // vector 入力 for (T &x : vec) is >> x; return is; } template ostream &operator<<(ostream &os, const vc &vec) { // vector 出力 (for dump) os << "{"; REP(i, 0, SIZE(vec)) os << vec[i] << (i == i_len - 1 ? "" : ", "); os << "}"; return os; } template ostream &operator>>(ostream &os, const vc &vec) { // vector 出力 (inline) REP(i, 0, SIZE(vec)) os << vec[i] << (i == i_len - 1 ? "\n" : " "); return os; } template istream &operator>>(istream &is, array &arr) { // array 入力 REP(i, 0, SIZE(arr)) is >> arr[i]; return is; } template ostream &operator<<(ostream &os, const array &arr) { // array 出力 (for dump) os << "{"; REP(i, 0, SIZE(arr)) os << arr[i] << (i == i_len - 1 ? "" : ", "); os << "}"; return os; } template istream &operator>>(istream &is, pair &pair_var) { // pair 入力 is >> pair_var.first >> pair_var.second; return is; } template ostream &operator<<(ostream &os, const pair &pair_var) { // pair 出力 os << "(" << pair_var.first << ", " << pair_var.second << ")"; return os; } // map, um, set, us 出力 template ostream &out_iter(ostream &os, const T &map_var) { os << "{"; REPI(itr, map_var) { os << *itr; auto itrcp = itr; if (++itrcp != map_var.end()) os << ", "; } return os << "}"; } template ostream &operator<<(ostream &os, const map &map_var) { return out_iter(os, map_var); } template ostream &operator<<(ostream &os, const um &map_var) { os << "{"; REPI(itr, map_var) { auto [key, value] = *itr; os << "(" << key << ", " << value << ")"; auto itrcp = itr; if (++itrcp != map_var.end()) os << ", "; } os << "}"; return os; } template ostream &operator<<(ostream &os, const set &set_var) { return out_iter(os, set_var); } template ostream &operator<<(ostream &os, const us &set_var) { return out_iter(os, set_var); } template ostream &operator<<(ostream &os, const pq &pq_var) { pq pq_cp(pq_var); os << "{"; if (!pq_cp.empty()) { os << pq_cp.top(), pq_cp.pop(); while (!pq_cp.empty()) os << ", " << pq_cp.top(), pq_cp.pop(); } return os << "}"; } // tuple 出力 template ostream &operator<<(ostream &os, tuple &a) { if constexpr (N < std::tuple_size_v>) { os << get(a); if constexpr (N + 1 < std::tuple_size_v>) { os << ' '; } else if constexpr (end_line) { os << '\n'; } return operator<<(os, a); } return os; } template void print_tuple(tuple &a) { operator<<<0, true>(cout, a); } void pprint() { cout << endl; } template void pprint(Head &&head, Tail &&...tail) { cout << head; if (sizeof...(Tail) > 0) cout << ' '; pprint(move(tail)...); } // dump #define DUMPOUT cerr void dump_func() { DUMPOUT << endl; } template void dump_func(Head &&head, Tail &&...tail) { DUMPOUT << head; if (sizeof...(Tail) > 0) DUMPOUT << ", "; dump_func(move(tail)...); } // chmax (更新「される」かもしれない値が前) template > bool chmax(T &xmax, const U &x, Comp comp = {}) { if (comp(xmax, x)) { xmax = x; return true; } return false; } // chmin (更新「される」かもしれない値が前) template > bool chmin(T &xmin, const U &x, Comp comp = {}) { if (comp(x, xmin)) { xmin = x; return true; } return false; } // ローカル用 #ifndef ONLINE_JUDGE #define DEBUG_ #endif #ifdef DEBUG_ #define DEB #define dump(...) \ DUMPOUT << " " << string(#__VA_ARGS__) << ": " \ << "[" << to_string(__LINE__) << ":" << __FUNCTION__ << "]" << endl \ << " ", \ dump_func(__VA_ARGS__) #else #define DEB if (false) #define dump(...) #endif #define VAR(type, ...) \ type __VA_ARGS__; \ cin >> __VA_ARGS__; template istream &operator,(istream &is, T &rhs) { return is >> rhs; } template ostream &operator,(ostream &os, const T &rhs) { return os << ' ' << rhs; } struct AtCoderInitialize { static constexpr int IOS_PREC = 15; static constexpr bool AUTOFLUSH = false; AtCoderInitialize() { ios_base::sync_with_stdio(false), cin.tie(nullptr), cout.tie(nullptr); cout << fixed << setprecision(IOS_PREC); if (AUTOFLUSH) cout << unitbuf; } } ATCODER_INITIALIZE; void Yn(bool p) { cout << (p ? "Yes" : "No") << endl; } void YN(bool p) { cout << (p ? "YES" : "NO") << endl; } /* #endregion */ // #include // using namespace atcoder; template vc get_primes_eratosthenes(T n) { vc iscomposite(n + 1, 0); // 合成数だとフラグが立つ vc res; REPM(i, 2, n) { if (iscomposite[i]) continue; res.emplace_back(i); REPMD(j, i * i, n, i) iscomposite[j] = 1; } return res; } template T binarySearchIntMax(T left, T right, tProposition p) { if (right < left) return -1; T mid; while (left + 1 < right) { mid = (left + right) / 2; if (p(mid)) left = mid; else // fn > 0 right = mid - 1; } if (p(right)) return right; else if (p(left)) return left; else return -1; } template T binarySearchIntMin(T left, T right, tProposition p) { if (right < left) return -1; T mid; while (left + 1 < right) { mid = (left + right) / 2; if (p(mid)) right = mid; else // fn > 0 left = mid + 1; } if (p(left)) return left; else if (p(right)) return right; else return -1; } template inline constexpr T add_overflow(T x, T y) { T result = 0; if (__builtin_add_overflow(x, y, &result)) return std::numeric_limits::max(); return result; } template inline constexpr T mul_overflow(T x, T y) { T result = 0; if (__builtin_mul_overflow(x, y, &result)) return std::numeric_limits::max(); return result; } template T powll(T n, T t) { if (!t) return 1; // if (t == 1) return n; // dump(n, t, t >> 1); // assert(t >= 0); T a = powll(n, t >> 1); // ⌊t/2⌋ 乗 a = mul_overflow(a, a); // ⌊t/2⌋*2 乗 if (t & 1) // ⌊t/2⌋*2 == t-1 のとき a = mul_overflow(a, n); // ⌊t/2⌋*2+1 乗 => t 乗 return a; } vll pn = { 1, 4, 8, 9, 16, 25, 27, 32, 36, 49, 64, 81, 100, 121, 125, 128, 144, 169, 196, 216, 225, 243, 256, 289, 324, 343, 361, 400, 441, 484, 512, 529, 576, 625, 676, 729, 784, 841, 900, 961, 1000, 1024, 1089, 1156, 1225, 1296, 1331, 1369, 1444, 1521, 1600, 1681, 1728, 1764, 1849, 1936, 2025, 2048, 2116, 2187, 2197, 2209, 2304, 2401, 2500, 2601, 2704, 2744, 2809, 2916, 3025, 3125, 3136, 3249, 3364, 3375, 3481, 3600, 3721, 3844, 3969, 4096, 4225, 4356, 4489, 4624, 4761, 4900, 4913, 5041, 5184, 5329, 5476, 5625, 5776, 5832, 5929, 6084, 6241, 6400, 6561, 6724, 6859, 6889, 7056, 7225, 7396, 7569, 7744, 7776, 7921, 8000, 8100, 8192, 8281, 8464, 8649, 8836, 9025, 9216, 9261, 9409, 9604, 9801, 10000, 10201, 10404, 10609, 10648, 10816, 11025, 11236, 11449, 11664, 11881, 12100, 12167, 12321, 12544, 12769, 12996, 13225, 13456, 13689, 13824, 13924, 14161, 14400, 14641, 14884, 15129, 15376, 15625, 15876, 16129, 16384, 16641, 16807, 16900, 17161, 17424, 17576, 17689, 17956, 18225, 18496, 18769, 19044, 19321, 19600, 19683, 19881, 20164, 20449, 20736, 21025, 21316, 21609, 21904, 21952, 22201, 22500, 22801, 23104, 23409, 23716, 24025, 24336, 24389, 24649, 24964, 25281, 25600, 25921, 26244, 26569, 26896, 27000, 27225, 27556, 27889, 28224, 28561, 28900, 29241, 29584, 29791, 29929, 30276, 30625, 30976, 31329, 31684, 32041, 32400, 32761, 32768, 33124, 33489, 33856, 34225, 34596, 34969, 35344, 35721, 35937, 36100, 36481, 36864, 37249, 37636, 38025, 38416, 38809, 39204, 39304, 39601, 40000, 40401, 40804, 41209, 41616, 42025, 42436, 42849, 42875, 43264, 43681, 44100, 44521, 44944, 45369, 45796, 46225, 46656, 47089, 47524, 47961, 48400, 48841, 49284, 49729, 50176, 50625, 50653, 51076, 51529, 51984, 52441, 52900, 53361, 53824, 54289, 54756, 54872, 55225, 55696, 56169, 56644, 57121, 57600, 58081, 58564, 59049, 59319, 59536, 60025, 60516, 61009, 61504, 62001, 62500, 63001, 63504, 64000, 64009, 64516, 65025, 65536, 66049, 66564, 67081, 67600, 68121, 68644, 68921, 69169, 69696, 70225, 70756, 71289, 71824, 72361, 72900, 73441, 73984, 74088, 74529, 75076, 75625, 76176, 76729, 77284, 77841, 78125, 78400, 78961, 79507, 79524, 80089, 80656, 81225, 81796, 82369, 82944, 83521, 84100, 84681, 85184, 85264, 85849, 86436, 87025, 87616, 88209, 88804, 89401, 90000, 90601, 91125, 91204, 91809, 92416, 93025, 93636, 94249, 94864, 95481, 96100, 96721, 97336, 97344, 97969, 98596, 99225, 99856, 100000, 100489, 101124, 101761, 102400, 103041, 103684, 103823, 104329, 104976, 105625, 106276, 106929, 107584, 108241, 108900, 109561, 110224, 110592, 110889, 111556, 112225, 112896, 113569, 114244, 114921, 115600, 116281, 116964, 117649, 118336, 119025, 119716, 120409, 121104, 121801, 122500, 123201, 123904, 124609, 125000, 125316, 126025, 126736, 127449, 128164, 128881, 129600, 130321, 131044, 131072, 131769, 132496, 132651, 133225, 133956, 134689, 135424, 136161, 136900, 137641, 138384, 139129, 139876, 140608, 140625, 141376, 142129, 142884, 143641, 144400, 145161, 145924, 146689, 147456, 148225, 148877, 148996, 149769, 150544, 151321, 152100, 152881, 153664, 154449, 155236, 156025, 156816, 157464, 157609, 158404, 159201, 160000, 160801, 161051, 161604, 162409, 163216, 164025, 164836, 165649, 166375, 166464, 167281, 168100, 168921, 169744, 170569, 171396, 172225, 173056, 173889, 174724, 175561, 175616, 176400, 177147, 177241, 178084, 178929, 179776, 180625, 181476, 182329, 183184, 184041, 184900, 185193, 185761, 186624, 187489, 188356, 189225, 190096, 190969, 191844, 192721, 193600, 194481, 195112, 195364, 196249, 197136, 198025, 198916, 199809, 200704, 201601, 202500, 203401, 204304, 205209, 205379, 206116, 207025, 207936, 208849, 209764, 210681, 211600, 212521, 213444, 214369, 215296, 216000, 216225, 217156, 218089, 219024, 219961, 220900, 221841, 222784, 223729, 224676, 225625, 226576, 226981, 227529, 228484, 229441, 230400, 231361, 232324, 233289, 234256, 235225, 236196, 237169, 238144, 238328, 239121, 240100, 241081, 242064, 243049, 244036, 245025, 246016, 247009, 248004, 248832, 249001, 250000, 250047, 251001, 252004, 253009, 254016, 255025, 256036, 257049, 258064, 259081, 260100, 261121, 262144, 263169, 264196, 265225, 266256, 267289, 268324, 269361, 270400, 271441, 272484, 273529, 274576, 274625, 275625, 276676, 277729, 278784}; ll get_kth_perfect_power(const ll k, const vll &primes) { // a^p <= n となる a がいくつあるか数える // それをすべての p について足す // 合計個数が k 個以上になるような最小の n が答え ll sz = SIZE(primes); ll n = binarySearchIntMin(1LL, INF, [&](ll mid) -> bool { ll cnt = 1; auto dfs = [&](auto &&dfs, ll val = 1, ll cnt_p = 0, ll ptr = 0) -> void { if (val > 64) return; if (ptr == sz) { if (val == 1) return; ll bmax = binarySearchIntMax(1LL, INF, [&](ll mid2) -> bool { return powll(mid2, val) <= mid; }); if (bmax == -1) return; ll dif = bmax - 1; // 1 を除く cnt += (cnt_p % 2 == 0 ? -dif : dif); return; } else { dfs(dfs, val, cnt_p, ptr + 1); dfs(dfs, val * primes[ptr], cnt_p + 1, ptr + 1); } }; dfs(dfs); return cnt >= k; }); assert(n != -1); return n; } void check(const vll &primes) { dump(SIZE(pn), primes); REPM(i, 1, 600) { ll target = pn[i - 1]; ll ans = get_kth_perfect_power(i, primes); pprint(i, target, ans); std::flush(std::cout); assert(ans == target); } } // ★ 指数部を素数に限定しても，複数通りの表し方がある // 包除で適切に取り除く必要がある // Problem void solve() { vll primes = get_primes_eratosthenes(64LL); // check(primes); // return; VAR(ll, t); REP(_case, 0, t) { VAR(ll, k); // ll n = get_kth_perfect_power(k, primes); pprint(n); } } // entry point int main() { solve(); return 0; }