#include #include #include #include #include #define repeat(i,n) for (int i = 0; (i) < (n); ++(i)) #define whole(f,x,...) ([&](decltype((x)) y) { return (f)(begin(y), end(y), ## __VA_ARGS__); })(x) typedef long long ll; using namespace std; struct disjoint_sets { vector xs; explicit disjoint_sets(size_t n) : xs(n, -1) {} bool is_root(int i) { return xs[i] < 0; } int find_root(int i) { return is_root(i) ? i : (xs[i] = find_root(xs[i])); } int set_size(int i) { return - xs[find_root(i)]; } int union_sets(int i, int j) { i = find_root(i); j = find_root(j); if (i != j) { if (set_size(i) < set_size(j)) swap(i,j); xs[i] += xs[j]; xs[j] = i; } return i; } bool is_same(int i, int j) { return find_root(i) == find_root(j); } }; struct edge_t { int i, j; ll dist; }; bool operator < (edge_t const & a, edge_t const & b) { return a.dist < b.dist; } // weak ordering int main() { // input int n; cin >> n; vector x(n), y(n); repeat (i,n) cin >> x[i] >> y[i]; // compute vector que; repeat (j,n) { repeat (i,j) { ll dist = ceill(hypotl(x[j] - x[i], y[j] - y[i])); que.push_back((edge_t) { i, j, dist }); } } whole(sort, que); disjoint_sets t(n); ll ans = 0; for (edge_t e : que) { ans = e.dist; t.union_sets(e.i, e.j); if (t.is_same(0, n-1)) break; } assert (t.is_same(0, n-1)); // output if (ans % 10 != 0) ans += 10 - ans % 10; cout << ans << endl; return 0; }