Find a range of composite numbers of given length
Given an integer n, we need to find a range of positive integers such that all the number in that range are composite and length of that range is n. You may print anyone range in the case of more than one answer. A composite number is a positive integer that has at least one divisor other than 1 and itself (Source : wiki )
Examples :
Input : 3 Output : [122, 124] Explanation 122, 123, 124 are all composite numbers
The solution is little tricky. Since there are many possible answers, we discuss a generalized solution here.
Let the length of range be n and range starts from a then, a, a+1, a+2, ...., a+n-1 all should be composite. So the problem boils down to finding such 'a'. If we closely observe p! (where p is a positive integers) then we will find that, p! has factors of 2, 3, 4, ..., p-1, Hence if we add i to p! such that 1 < i < p, then p! + i has a factor i, so p! + i must be composite. So we end up finding p! + 2, p! + 3, .... p! + p-1 are all composite and continuous integers forming a range [p! + 2, p! + p-1] The above range consists of p-2 elements. For a range of n elements we need to consider (n+2)! If we take a = (n+2)! + 2, Then, a + 1 = (n+2)! + 3 Then, a + 2 = (n+2)! + 4 ... Then, a + n-1 = (n+2)! + n+1 Hence, a = (n+2)! + 2 = 2*3*....*(n+2) + 2 a has 2 as its divisor because (n+2)! and 2 both divides 2 a + 1 = 2*3*....*(n+2) + 3 a + 1 has 3 as its divisor because (n+2)! and 3 both divides 3 ... a + n-1 = 2*3*....*(n+2) + n+1 a + n-1 has n+1 as its divisor because (n+2)! and n+1 both divides n+1 Therefore range will be [ (n+2)! + 2, ( (n+2)! + 2 ) + n-1]
Example for above algorithm
n = 3 Then a = (n+2)! + 2 a = 5! + 2 a + 1 = 5! + 3 a + 2 = 5! + 4 Here a is divisible by 2 Here a + 1 is divisible by 3 Here a + 2 is divisible by 4 Hence a, a+1, a+2 are all composites
C++
// C++ program to find a range of // composite numbers of given length #include <bits/stdc++.h> using namespace std; // method to find factorial // of given number int factorial ( int n) { if (n == 0) return 1; return n * factorial(n-1); } // to print range of length n // having all composite integers int printRange( int n) { int a = factorial(n + 2) + 2; int b = a + n - 1; cout << "[" << a << ", " << b << "]" ; return 0; } // Driver method int main() { int n = 3 ; printRange(n); return 0; } // This code is contributed by Anshika Goyal |
Java
// Java program to find a range of composite // numbers of given length class Test { // method to find factorial of given number static int factorial( int n) { if (n == 0 ) return 1 ; return n*factorial(n- 1 ); } // to print range of length n // having all composite integers static void printRange( int n) { int a = factorial(n + 2 ) + 2 ; int b = a + n - 1 ; System.out.println( "[" + a + ", " + b + "]" ); } // Driver method public static void main(String args[]) throws Exception { int n = 3 ; printRange(n); } } |
Python3
# Python program to find a range of composite # numbers of given length # function to calculate factorial def factorial(n): a = 1 for i in range ( 2 , n + 1 ): a * = i return a # to print range of length n # having all composite integers def printRange(n): a = factorial(n + 2 ) + 2 b = a + n - 1 print ( "[" + str (a) + ", " + str (b) + "]" ) # driver code to test above functions n = 3 printRange(n) |
C#
// C# program to find a range of // composite numbers of given // length using System; class GFG { // method to find factorial // of given number static int factorial( int n) { if (n == 0) return 1; return n*factorial(n-1); } // to print range of length n // having all composite integers static void printRange( int n) { int a = factorial(n + 2) + 2; int b = a + n - 1; Console.WriteLine( "[" + a + ", " + b + "]" ); } // Driver method public static void Main() { int n = 3 ; printRange(n); } } // This code is contributed by anuj_67. |
PHP
<?php // PHP program to find a range of // composite numbers of given length // method to find factorial // of given number function factorial ( $n ) { if ( $n == 0) return 1; return $n * factorial( $n - 1); } // to print range of length n // having all composite integers function printRange( $n ) { $a = factorial( $n + 2) + 2; $b = $a + $n - 1; echo "[" , $a , ", " , $b , "]" ; return 0; } // Driver Code $n = 3 ; printRange( $n ); // This code is contributed by anuj_67. ?> |
Javascript
<script> // Javascript program to find a range of // composite numbers of given length // Method to find factorial // of given number function factorial(n) { if (n == 0) return 1; return n * factorial(n - 1); } // To print range of length n // having all composite integers function printRange(n) { let a = factorial(n + 2) + 2; let b = a + n - 1; document.write(`[${a}, ${b}]`); return 0; } // Driver Code let n = 3; printRange(n); // This code is contributed by _saurabh_jaiswal. </script> |
Output :
[122, 124]
Analysis of above algorithm
Time Complexity : O(n)
Auxiliary Space : O(n)
Contact Us