// C++ implementation to find n'th smart number #include   using namespace std; // Limit on result const int MAX = 3000; // Function to calculate n'th smart number int smartNumber(int n) {  // Initialize all numbers as not prime  int primes[MAX] = {0};  // iterate to mark all primes and smart number  vector<int> result;  // Traverse all numbers till maximum limit  for (int i=2; i<MAX; i++)  {  // 'i' is maked as prime number because  // it is not multiple of any other prime  if (primes[i] == 0)  {  primes[i] = 1;  // mark all multiples of 'i' as non prime  for (int j=i*2; j<MAX; j=j+i)  {  primes[j] -= 1;  // If i is the third prime factor of j  // then add it to result as it has at  // least three prime factors.  if ( (primes[j] + 3) == 0)  result.push_back(j);  }  }  }  // Sort all smart numbers  sort(result.begin() result.end());  // return n'th smart number  return result[n-1]; } // Driver program to run the case int main() {  int n = 50;  cout << smartNumber(n);  return 0; } 

// Java implementation to find n'th smart number import java.util.*; import java.lang.*; class GFG {  // Limit on result  static int MAX = 3000;  // Function to calculate n'th smart number  public static int smartNumber(int n)  {    // Initialize all numbers as not prime  Integer[] primes = new Integer[MAX];  Arrays.fill(primes new Integer(0));  // iterate to mark all primes and smart  // number  Vector<Integer> result = new Vector<>();  // Traverse all numbers till maximum  // limit  for (int i = 2; i < MAX; i++)  {    // 'i' is maked as prime number  // because it is not multiple of  // any other prime  if (primes[i] == 0)  {  primes[i] = 1;  // mark all multiples of 'i'   // as non prime  for (int j = i*2; j < MAX; j = j+i)  {  primes[j] -= 1;    // If i is the third prime  // factor of j then add it  // to result as it has at  // least three prime factors.  if ( (primes[j] + 3) == 0)  result.add(j);  }  }  }  // Sort all smart numbers  Collections.sort(result);  // return n'th smart number  return result.get(n-1);  }  // Driver program to run the case  public static void main(String[] args)  {  int n = 50;  System.out.println(smartNumber(n));  } } // This code is contributed by Prasad Kshirsagar 

# Python3 implementation to find # n'th smart number  # Limit on result  MAX = 3000; # Function to calculate n'th # smart number  def smartNumber(n): # Initialize all numbers as not prime  primes = [0] * MAX; # iterate to mark all primes  # and smart number  result = []; # Traverse all numbers till maximum limit  for i in range(2 MAX): # 'i' is maked as prime number because  # it is not multiple of any other prime  if (primes[i] == 0): primes[i] = 1; # mark all multiples of 'i' as non prime j = i * 2; while (j < MAX): primes[j] -= 1; # If i is the third prime factor of j  # then add it to result as it has at  # least three prime factors.  if ( (primes[j] + 3) == 0): result.append(j); j = j + i; # Sort all smart numbers  result.sort(); # return n'th smart number  return result[n - 1]; # Driver Code n = 50; print(smartNumber(n)); # This code is contributed by mits  

// C# implementation to find n'th smart number using System.Collections.Generic; class GFG {  // Limit on result  static int MAX = 3000;  // Function to calculate n'th smart number  public static int smartNumber(int n)  {    // Initialize all numbers as not prime  int[] primes = new int[MAX];  // iterate to mark all primes and smart  // number  List<int> result = new List<int>();  // Traverse all numbers till maximum  // limit  for (int i = 2; i < MAX; i++)  {    // 'i' is maked as prime number  // because it is not multiple of  // any other prime  if (primes[i] == 0)  {  primes[i] = 1;  // mark all multiples of 'i'   // as non prime  for (int j = i*2; j < MAX; j = j+i)  {  primes[j] -= 1;    // If i is the third prime  // factor of j then add it  // to result as it has at  // least three prime factors.  if ( (primes[j] + 3) == 0)  result.Add(j);  }  }  }  // Sort all smart numbers  result.Sort();  // return n'th smart number  return result[n-1];  }  // Driver program to run the case  public static void Main()  {  int n = 50;  System.Console.WriteLine(smartNumber(n));  } } // This code is contributed by mits 

 // PHP implementation to find n'th smart number  // Limit on result  $MAX = 3000; // Function to calculate n'th smart number  function smartNumber($n) { global $MAX; // Initialize all numbers as not prime  $primes=array_fill(0$MAX0); // iterate to mark all primes and smart number  $result=array(); // Traverse all numbers till maximum limit  for ($i=2; $i<$MAX; $i++) { // 'i' is maked as prime number because  // it is not multiple of any other prime  if ($primes[$i] == 0) { $primes[$i] = 1; // mark all multiples of 'i' as non prime  for ($j=$i*2; $j<$MAX; $j=$j+$i) { $primes[$j] -= 1; // If i is the third prime factor of j  // then add it to result as it has at  // least three prime factors.  if ( ($primes[$j] + 3) == 0) array_push($result$j); } } } // Sort all smart numbers  sort($result); // return n'th smart number  return $result[$n-1]; } // Driver program to run the case  $n = 50; echo smartNumber($n); // This code is contributed by mits  ?> 

<script> // JavaScript implementation to find n'th smart number // Limit on result const MAX = 3000; // Function to calculate n'th smart number function smartNumber(n) {  // Initialize all numbers as not prime  let primes = new Array(MAX).fill(0);  // iterate to mark all primes and smart number  let result = [];  // Traverse all numbers till maximum limit  for (let i=2; i<MAX; i++)  {  // 'i' is maked as prime number because  // it is not multiple of any other prime  if (primes[i] == 0)  {  primes[i] = 1;  // mark all multiples of 'i' as non prime  for (let j=i*2; j<MAX; j=j+i)  {  primes[j] -= 1;  // If i is the third prime factor of j  // then add it to result as it has at  // least three prime factors.  if ( (primes[j] + 3) == 0)  result.push(j);  }  }  }  // Sort all smart numbers  result.sort((ab)=>a-b);  // return n'th smart number  return result[n-1]; } // Driver program to run the case let n = 50; document.write(smartNumber(n)); // This code is contributed by shinjanpatra </script>