Dado un número entero N , la tarea es encontrar la cuenta de 0 en un hexágono de N niveles .
Ejemplos:
Entrada: N = 2
Salida: 7
Entrada: N = 3
Salida: 19
Planteamiento: Para los valores de N = 1, 2, 3,… se puede observar que se formará una serie como 1, 7, 19, 37, 61, 91, 127, 169,… . Es una serie de diferencias donde las diferencias están en AP como 6, 12, 18, … .
Por lo tanto el término N de será 1 + {6 + 12 + 18 +…..(n – 1) términos}
= 1 + (n – 1) * (2 * 6 + (n – 1 – 1) * 6 ) / 2
= 1 + (n – 1) * (12 + (n – 2) * 6) / 2
= 1 + (n – 1) * (12 + 6n – 12) / 2
= 1 + (n – 1 ) * (6n) / 2
= 1 + (n – 1) * (3n)
A continuación se muestra la implementación del enfoque anterior:
C++
// C++ implementation of the approach
#include <bits/stdc++.h>
using namespace std;
// Function to return the count of
// 0s in an n-level hexagon
int count(int n)
{
return 3 * n * (n - 1) + 1;
}
// Driver code
int main()
{
int n = 3;
cout << count(n);
return 0;
}
Java
// Java implementation of the above approach
class GFG
{
// Function to return the count of
// 0s in an n-level hexagon
static int count(int n)
{
return 3 * n * (n - 1) + 1;
}
// Driver code
public static void main(String args[])
{
int n = 3;
System.out.println(count(n));
}
}
// This code is contributed by AnkitRai01
Python3
# Python3 implementation of the approach # Function to return the count of # 0s in an n-level hexagon def count(n): return 3 * n * (n - 1) + 1 # Driver code n = 3 print(count(n)) # This code is contributed by Mohit Kumar
C#
// C# implementation of the approach
using System;
class GFG
{
// Function to return the count of
// 0s in an n-level hexagon
static int count(int n)
{
return 3 * n * (n - 1) + 1;
}
// Driver code
static public void Main ()
{
int n = 3;
Console.Write(count(n));
}
}
// This code is contributed by ajit
Javascript
<script>
// Javascript implementation of the approach
// Function to return the count of
// 0s in an n-level hexagon
function count(n)
{
return 3 * n * (n - 1) + 1;
}
// Driver code
var n = 3;
document.write(count(n));
// This code is contributed by rutvik_56.
</script>
Producción:
19
Complejidad de tiempo: O(1)
Espacio Auxiliar: O(1)