Complete Reference for Bitwise Operators in Programming/Coding
Last Updated :
28 Dec, 2023
There exists no programming language that doesn’t use Bit Manipulations. Bit manipulation is all about these bitwise operations. They improve the efficiency of programs by being primitive, fast actions. There are different bitwise operations used in bit manipulation. These Bitwise Operators operate on the individual bits of the bit patterns. Bit operations are fast and can be used in optimizing time complexity.
Some common bit operators are:
Bitwise Operator Truth Table
1. Bitwise AND Operator (&)
The bitwise AND operator is denoted using a single ampersand symbol, i.e. &. The & operator takes two equal-length bit patterns as parameters. The two-bit integers are compared. If the bits in the compared positions of the bit patterns are 1, then the resulting bit is 1. If not, it is 0.
Truth table of AND operator
Example:Â
Take two bit values X and Y, where X = 7= (111)2 and Y = 4 = (100)2 . Take Bitwise and of both X & y
Bitwise ANDof (7 & 4)
Implementation of AND operator:
C++
#include <bits/stdc++.h>
using namespace std;
int main()
{
int a = 7, b = 4;
int result = a & b;
cout << result << endl;
return 0;
}
|
Java
import java.io.*;
class GFG {
public static void main (String[] args) {
int a = 7 , b = 4 ;
int result = a & b;
System.out.println(result);
}
}
|
Python3
a = 7
b = 4
result = a & b
print (result)
|
C#
using System;
public class GFG{
static public void Main (){
int a = 7, b = 4;
int result = a & b;
Console.WriteLine(result);
}
}
|
Javascript
let a = 7, b = 4;
let result = a & b;
console.log(result);
|
Time Complexity: O(1)Â
Auxiliary Space: O(1)
2. ​Bitwise OR Operator (|)
The | Operator takes two equivalent length bit designs as boundaries; if the two bits in the looked-at position are 0, the next bit is zero. If not, it is 1.
Example:Â
Take two bit values X and Y, where X = 7= (111)2 and Y = 4 = (100)2 . Take Bitwise OR of both X, y
Bitwise OR of (7 | 4)
Explanation: On the basis of truth table of bitwise OR operator we can conclude that the result ofÂ
1 | 1 Â = 1
1 | 0 = 1
0 | 1 = 1
0 | 0 = 0
We used the similar concept of bitwise operator that are show in the image.
Implementation of OR operator:
C++
#include <bits/stdc++.h>
using namespace std;
int main()
{
int a = 12, b = 25;
int result = a | b;
cout << result;
return 0;
}
|
Java
import java.io.*;
class GFG {
public static void main(String[] args)
{
int a = 12 , b = 25 ;
int result = a | b;
System.out.println(result);
}
}
|
Python3
a = 12
b = 25
result = a | b
print (result)
|
C#
using System;
public class GFG{
static public void Main (){
int a = 12, b = 25;
int result = a | b;
Console.WriteLine(result);
}
}
|
Javascript
let a = 12, b = 25;
let result = a | b;
document.write(result);
|
Time Complexity: O(1)Â
Auxiliary Space: O(1)
3. ​Bitwise XOR Operator (^)
The ^ operator (also known as the XOR operator) stands for Exclusive Or. Here, if bits in the compared position do not match their resulting bit is 1. i.e, The result of the bitwise XOR operator is 1 if the corresponding bits of two operands are opposite, otherwise 0.
Example:Â
Take two bit values X and Y, where X = 7= (111)2 and Y = 4 = (100)2 . Take Bitwise and of both X & y
Bitwise OR of (7 ^ 4)
Explanation: On the basis of truth table of bitwise XOR operator we can conclude that the result ofÂ
1 ^ 1 Â = 0
1 ^ 0 = 1
0 ^ 1 = 1
0 ^ 0 = 0
We used the similar concept of bitwise operator that are show in the image.
Implementation of XOR operator:
C++
#include <iostream>
using namespace std;
int main()
{
int a = 12, b = 25;
cout << (a ^ b);
return 0;
}
|
Java
import java.io.*;
class GFG {
public static void main(String[] args)
{
int a = 12 , b = 25 ;
int result = a ^ b;
System.out.println(result);
}
}
|
Python3
a = 12
b = 25
result = a ^ b
print (result)
|
C#
using System;
public class GFG {
static public void Main()
{
int a = 12, b = 25;
int result = a ^ b;
Console.WriteLine(result);
}
}
|
Javascript
let a = 12;
let b = 25;
console.log((a ^ b));
|
Time Complexity: O(1)Â
Auxiliary Space: O(1)
4. ​Bitwise NOT Operator (!~)
All the above three bitwise operators are binary operators (i.e, requiring two operands in order to operate). Unlike other bitwise operators, this one requires only one operand to operate.
The bitwise Not Operator takes a single value and returns its one’s complement. The one’s complement of a binary number is obtained by toggling all bits in it, i.e, transforming the 0 bit to 1 and the 1 bit to 0.
Truth Table of Bitwise Operator NOT
Example:Â
Take two bit values X and Y, where X = 5= (101)2 . Take Bitwise NOT of X.
Explanation: On the basis of truth table of bitwise NOT operator we can conclude that the result ofÂ
~1 Â = 0
~0 = 1
We used the similar concept of bitwise operator that are show in the image.
Implementation of NOT operator:
C++
#include <iostream>
using namespace std;
int main()
{
int a = 0;
cout << "Value of a without using NOT operator: " << a;
cout << "\nInverting using NOT operator (with sign bit): " << (~a);
cout << "\nInverting using NOT operator (without sign bit): " << (!a);
return 0;
}
|
Java
import java.io.*;
class GFG {
public static void main(String[] args)
{
int a = 0 ;
System.out.println(
"Value of a without using NOT operator: " + a);
System.out.println(
"Inverting using NOT operator (with sign bit): "
+ (~a));
if (a != 1 )
System.out.println(
"Inverting using NOT operator (without sign bit): 1 ");
else
System.out.println(
"Inverting using NOT operator (without sign bit): 0 ");
}
}
|
Python3
a = 0
print ("Value of a without using NOT operator: " , a)
print ("Inverting using NOT operator (with sign bit): " , (~a))
print ("Inverting using NOT operator (without sign bit): " , int ( not (a)))
|
C#
using System;
public class GFG {
static public void Main()
{
int a = 0;
Console.WriteLine(
"Value of a without using NOT operator : " + a);
Console.WriteLine(
"Inverting using NOT operator (with sign bit): "
+ (~a));
if (a != 1)
Console.WriteLine(
"Inverting using NOT operator (without sign bit): 1");
else
Console.WriteLine(
"Inverting using NOT operator (without sign bit): 0");
}
}
|
Javascript
let a =0;
document.write("Value of a without using NOT operator: " + a);
document.write( "Inverting using NOT operator ( with sign bit): " + (~a));
if (!a)
document.write( "Inverting using NOT operator (without sign bit): 1" );
else
document.write( "Inverting using NOT operator (without sign bit): 0" );
|
Output
Value of a without using NOT operator: 0
Inverting using NOT operator (with sign bit): -1
Inverting using NOT operator (without sign bit): 1
Time Complexity: O(1)Â
Auxiliary Space: O(1)
5. Left-Shift (<<)
The left shift operator is denoted by the double left arrow key (<<). The general syntax for left shift is shift-expression << k. The left-shift operator causes the bits in shift expression to be shifted to the left by the number of positions specified by k. The bit positions that the shift operation has vacated are zero-filled.Â
Note: Every time we shift a number towards the left by 1 bit it multiply that number by 2.
Logical left Shift
Example:
Input: Left shift of 5 by 1.
Binary representation of 5 = 00101 and Left shift of 001012 by 1 (i.e, 00101 << 1)
Â
Left shift of 5 by 1
Output: 10
Explanation: All bit of 5 will be shifted by 1 to left side and this result in 010102, Which is equivalent to 10
Input: Left shift of 5 by 2.
Binary representation of 5 = 00101 and Left shift of 001012 by 1 (i.e, 00101 << 2)
Left shift of 5 by 2
Output: 20
Explanation: All bit of 5 will be shifted by 1 to left side and this result in 101002, Which is equivalent to 20
Input: Left shift of 5 by 3.
Binary representation of 5 = 00101 and Left shift of 001012 by 1 (i.e, 00101 << 3)
Left shift of 5 by 3
Output: 40
Explanation: All bit of 5 will be shifted by 1 to left side and this result in 010002, Which is equivalent to 40
Implementation of Left shift operator:
C++
#include <bits/stdc++.h>
using namespace std;
int main()
{
unsigned int num1 = 1024;
bitset<32> bt1(num1);
cout << bt1 << endl;
unsigned int num2 = num1 << 1;
bitset<32> bt2(num2);
cout << bt2 << endl;
unsigned int num3 = num1 << 2;
bitset<16> bitset13{ num3 };
cout << bitset13 << endl;
}
|
Java
import java.io.*;
class GFG {
public static void main(String[] args)
{
int num1 = 1024 ;
String bt1 = Integer.toBinaryString(num1);
bt1 = String.format("%32s", bt1).replace( ' ' , '0' );
System.out.println(bt1);
int num2 = num1 << 1 ;
String bt2 = Integer.toBinaryString(num2);
bt2 = String.format("%32s", bt2).replace( ' ' , '0' );
System.out.println(bt2);
int num3 = num1 << 2 ;
String bitset13 = Integer.toBinaryString(num3);
bitset13 = String.format("%16s", bitset13)
.replace( ' ' , '0' );
System.out.println(bitset13);
}
}
|
Python3
num1 = 1024
bt1 = bin (num1)[ 2 :].zfill( 32 )
print (bt1)
num2 = num1 << 1
bt2 = bin (num2)[ 2 :].zfill( 32 )
print (bt2)
num3 = num1 << 2
bitset13 = bin (num3)[ 2 :].zfill( 16 )
print (bitset13)
|
C#
using System;
class GFG {
public static void Main( string [] args)
{
int num1 = 1024;
string bt1 = Convert.ToString(num1, 2);
bt1 = bt1.PadLeft(32, '0' );
Console.WriteLine(bt1);
int num2 = num1 << 1;
string bt2 = Convert.ToString(num2, 2);
bt2 = bt2.PadLeft(32, '0' );
Console.WriteLine(bt2);
int num3 = num1 << 2;
string bitset13 = Convert.ToString(num3, 2);
bitset13 = bitset13.PadLeft(16, '0' );
Console.WriteLine(bitset13);
}
}
|
Javascript
let num1 = 1024;
let bt1 = num1.toString(2).padStart(32, '0' );
console.log(bt1);
let num2 = num1 << 1;
let bt2 = num2.toString(2).padStart(32, '0' );
console.log(bt2);
let num3 = num1 << 2;
let bitset13 = num3.toString(2).padStart(16, '0' );
console.log(bitset13);
|
Output
00000000000000000000010000000000
00000000000000000000100000000000
0001000000000000
Time Complexity: O(1)Â
Auxiliary Space: O(1)
6. Right-Shift (>>)
The right shift operator is denoted by the double right arrow key (>>). The general syntax for the right shift is “shift-expression >> k”. The right-shift operator causes the bits in shift expression to be shifted to the right by the number of positions specified by k. For unsigned numbers, the bit positions that the shift operation has vacated are zero-filled. For signed numbers, the sign bit is used to fill the vacated bit positions. In other words, if the number is positive, 0 is used, and if the number is negative, 1 is used.
Note: Every time we shift a number towards the right by 1 bit it divides that number by 2.
Logical Right Shift
Example:
Input: Left shift of 5 by 1.
Binary representation of 5 = 00101 and Left shift of 001012 by 1 (i.e, 00101 << 1)
Right shift of 5 by 1
Output: 10
Explanation: All bit of 5 will be shifted by 1 to left side and this result in 010102, Which is equivalent to 10
Input: Left shift of 5 by 2.
Binary representation of 5 = 00101 and Left shift of 001012 by 1 (i.e, 00101 << 2)
Right shift of 5 by 2
Output: 20
Explanation: All bit of 5 will be shifted by 1 to left side and this result in 101002, Which is equivalent to 20
Input: Left shift of 5 by 3.
Binary representation of 5 = 00101 and Left shift of 001012 by 1 (i.e, 00101 << 3)
Right shift of 5 by 3
Output: 40
Explanation: All bit of 5 will be shifted by 1 to left side and this result in 010002, Which is equivalent to 40
Implementation of Right shift operator:
C++
#include <bitset>
#include <iostream>
using namespace std;
int main()
{
unsigned int num1 = 1024;
bitset<32> bt1(num1);
cout << bt1 << endl;
unsigned int num2 = num1 >> 1;
bitset<32> bt2(num2);
cout << bt2 << endl;
unsigned int num3 = num1 >> 2;
bitset<16> bitset13{ num3 };
cout << bitset13 << endl;
}
|
Java
class GFG {
public static void main(String[] args)
{
int num1 = 1024 ;
String bt1
= String
.format( "%32s" ,
Integer.toBinaryString(num1))
.replace( ' ' , '0' );
System.out.println(bt1);
int num2 = num1 >> 1 ;
String bt2
= String
.format( "%32s" ,
Integer.toBinaryString(num2))
.replace( ' ' , '0' );
System.out.println(bt2);
int num3 = num1 >> 2 ;
String bitset13
= String
.format( "%16s" ,
Integer.toBinaryString(num3))
.replace( ' ' , '0' );
System.out.println(bitset13);
}
}
|
Python
num1 = 1024
bt1 = bin (num1)[ 2 :].zfill( 32 )
print (bt1)
num2 = num1 >> 1
bt2 = bin (num2)[ 2 :].zfill( 32 )
print (bt2)
num3 = num1 >> 2
bitset13 = bin (num3)[ 2 :].zfill( 16 )
print (bitset13)
|
C#
using System;
class Program
{
static void Main()
{
int num1 = 1024;
int num2 = num1 >> 1;
int num3 = num1 >> 2;
string bt1 = Convert.ToString(num1, 2).PadLeft(32, '0' );
string bt2 = Convert.ToString(num2, 2).PadLeft(32, '0' );
string bitset13 = Convert.ToString(num3, 2).PadLeft(16, '0' );
Console.WriteLine(bt1);
Console.WriteLine(bt2);
Console.WriteLine(bitset13);
}
}
|
Javascript
let num1 = 1024;
let bt1 = num1.toString(2).padStart(32, '0' );
console.log(bt1);
let num2 = num1 >> 1;
let bt2 = num2.toString(2).padStart(32, '0' );
console.log(bt2);
let num3 = num1 >> 2;
let bitset13 = num3.toString(2).padStart(16, '0' );
console.log(bitset13);
|
Output
00000000000000000000010000000000
00000000000000000000001000000000
0000000100000000
Time Complexity: O(1)Â
Auxiliary Space: O(1)
Application of BIT Operators
- Bit operations are used for the optimization of embedded systems.
- The Exclusive-or operator can be used to confirm the integrity of a file, making sure it has not been corrupted, especially after it has been in transit.
- Bitwise operations are used in Data encryption and compression.
- Bits are used in the area of networking, framing the packets of numerous bits which are sent to another system generally through any type of serial interface.
- Digital Image Processors use bitwise operations to enhance image pixels and to extract different sections of a microscopic image.
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