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C# Program to Rotate bits of a number

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Bit Rotation: A rotation (or circular shift) is an operation similar to shift except that the bits that fall off at one end are put back to the other end. 
In left rotation, the bits that fall off at left end are put back at right end. 
In right rotation, the bits that fall off at right end are put back at left end.

Example: 
Let n is stored using 8 bits. Left rotation of n = 11100101 by 3 makes n = 00101111 (Left shifted by 3 and first 3 bits are put back in last ). If n is stored using 16 bits or 32 bits then left rotation of n (000…11100101) becomes 00..0011100101000. 
Right rotation of n = 11100101 by 3 makes n = 10111100 (Right shifted by 3 and last 3 bits are put back in first ) if n is stored using 8 bits. If n is stored using 16 bits or 32 bits then right rotation of n (000…11100101) by 3 becomes 101000..0011100

C#




// C# program to rotate 
// bits of a number
using System;
  
class GFG
{
    static int INT_BITS = 32;
  
    /* Function to left rotate n by d bits*/
    static int leftRotate(int n, int d) {
          
        /* In n<<d, last d bits are 0. 
        To put first 3 bits of n at
        last, do bitwise or of n<<d with
        n >>(INT_BITS - d) */
        return (n << d) | (n >> (INT_BITS - d));
    }
      
    /*Function to right rotate n by d bits*/
    static int rightRotate(int n, int d) {
          
        /* In n>>d, first d bits are 0. 
        To put last 3 bits of at
        first, do bitwise or of n>>d 
        with n <<(INT_BITS - d) */
        return (n >> d) | (n << (INT_BITS - d));
    }
      
    // Driver code
    public static void Main() 
    {
        int n = 16;
        int d = 2;
          
        Console.Write("Left Rotation of " + n
                      + " by " + d + " is ");
        Console.WriteLine(leftRotate(n, d));
          
        Console.Write("Right Rotation of " + n 
                       + " by " + d + " is ");
        Console.Write(rightRotate(n, d));
    }
}
  
// This code is contributed by Sam007


Output

Left Rotation of 16 by 2 is 64
Right Rotation of 16 by 2 is 4

Time Complexity: O(1)
Auxiliary Space: O(1)

Please refer complete article on Rotate bits of a number for more details!



Last Updated : 18 Aug, 2023
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