Convert Binary to Text / English or ASCII Binary Translator. Enter binary numbers (E.g: 01000101 01111000 01100001 01101101 01110000 01101100 01100101) and click the Convert button
Using a binary translator, you can convert binary code into text for reading or printing. Binary can be translated into English using two methods: ASCII and Unicode.
Number 2 (radix) is the basis for the binary decoding system. In the base-2 numeral system, there are only two numbers: 0 and 1.
In ancient Egypt, China, and India, the binary system was used for a variety of purposes; however, it is now the language of electronic and computer technology in the modern world. The method described here is the most efficient method for detecting the state of an electrical signal when it is off (0) or on (1). As well as being the basis for binary code to text conversion, it is also used by computer-based machines to compose data. Currently, you are reading digital text that consists of binary numbers. As a result of decoding binary using binary to word code, you are able to read this text.
Binary numbers are easier to read than they appear: they are based on a positional system; therefore, every digit is increased by 2 starting with 20 from the right. There is one bit associated with each binary digit in the binary code converter.
The American Standard Code for Information Interchange is a standard for character encoding in electronic communication. Computers, telecommunications equipment, and other devices use ASCII codes to represent text. The majority of modern character encoding schemes are based on ASCII, although many additional characters are supported.
The Internet Assigned Numbers Authority (IANA) prefers the updated U.S.-ASCII name since it clarifies that this system was developed in the United States and is based on commonly used typographic symbols.
IEEE is well known for its ASCII standards.
Based on the English alphabet, ASCII encodes 128 specified seven-bit integer characters. There are 95 encoded characters available for printing, including the digits 0 to 9, lower case letters A to Z, upper case letters A to Z, and punctuation marks. Also included in the original ASCII specification were 33 non-printing control codes originating with Teletype machines; many of these codes are now obsolete, however some are still commonly used, such as carriage returns, line feeds, and tabs.
In ASCII encoding, binary 1101001 = hexadecimal 69 (I is the ninth letter) = decimal 105 would represent a lowercase I.
The ASCII code can be used to translate computer text into human language. In simple terms, it is a binary to English translator.
The binary series of 0 and 1 is used by all computers to receive messages. Nevertheless, computers also have their own language version, just as English and Spanish share the same alphabet, but use different words for many similar things. Documents and files are shared in the same language through ASCII, which is used as a method of transferring data between computers.
The development of ASCII gave computers a common language.
As a seven-bit teleprinter code, ASCII was first used commercially by American Telephone & Telegraph in 1963. At the beginning, TWX used the previous five-bit ITA2 teleprinter system, which was also used by Telex, the competitor. It was Bob Bemer who introduced features such as the sequence of escapes. A British colleague, Hugh McGregor Ross, helped popularize this work-"so much so that the code that became ASCII was initially called the Bemer-Ross Code in Europe," according to Bemer. He was known as "ASCII's father" due to his extensive work on ASCII.
ASCII encoding was the most popular character encoding on the World Wide Web until December 2007, when UTF-8 surpassed it. UTF-8 is backward compatible with ASCII.
In addition to being compact as ASCII, UTF-8 can contain any Unicode character (with an increase in file size).
The Unicode Transformation Format is also known as UTF. In this context, the '8' refers to the representation of a character in 8-bit blocks. It varies from one to four blocks for a character to be represented.
One of the most useful features of UTF-8 is its compatibility with null-terminated strings. No character will have a null byte (0) when encoded.
ISO / IEC 10646 and Unicode have a wider range of characters, and their various encoding forms have begun to replace ISO / IEC 8859 and ASCII in many instances. Unicode and UCS are able to support more characters with the separation of unique identification concepts (using natural numbers called code points) and encoding (up to UTF-8, UTF-16, and UTF-32-bit binary formats).
The ASCII character set was incorporated as the first 128 symbols in Unicode (1991), so the 7-bit ASCII characters have the same numerical code in both sets. It enables UTF-8 to be compatible with 7-bit ASCII, since a UTF-8 file containing only ASCII characters is exactly the same as an ASCII file containing the same sequence of characters. In addition, forward compatibility is assured since only 7-bit ASCII characters are recognized as special, and bytes with the highest bit set are not altered (as is often done to support 8-bit ASCII extensions like ISO-8859-1) will remain unchanged when converted to UTF-8.
This number system is most commonly used in the field of computer technology. Computer language and programming are based on a two-digit number system that is used in digital encoding.
By taking data and displaying it with restricted bits of information, digital encoding is created. Binary information consists of zeros and ones. Images displayed on your computer screen are an example of this. For each pixel, a binary line is used to encode the image.
If a screen uses sixteen-bit code, each pixel is instructed to display a color based on the bits that are 0s and 1s. This results in more than 65,000 colors, which can be represented by two times sixteen. Furthermore, the binary number system is also applied in the field of Boolean algebra.
In this field of mathematics, logic and truth are of the utmost importance. Based on whether a statement is true or false, it is assigned a score of 0 or 1. Consider using a binary to text converter, such as Decimal to Binary, Binary to Decimal Converter, if you are looking for a solution.
Binary numbers are useful for a variety of purposes. In order to add numbers, a computer flips switches. In order to stimulate computer addition, binary numbers can be added to the system. This computer number system is now used for two main reasons. Firstly, it is capable of providing a range of reliability and safety. As a secondary benefit, it minimizes the amount of circuitry required. As a result, less space is required, less energy is consumed, and less expense is incurred.
It is possible to encode or translate binary messages written in binary numerals. By way of example,
An encoded message is (01101001)(01101100011011111110111011001100101)(011110010110111101110101). By copying and pasting these numbers into our binary translator, you will receive the following English text:
My love for you
As a result,
This is what I love about you (01101001) (01101100011011110111011001100101) (011110010110111101110101)
| Binary | Hexadecimal | ASCII |
|---|---|---|
| 00000000 | 00 | NUL |
| 00000001 | 01 | SOH |
| 00000010 | 02 | STX |
| 00000011 | 03 | ETX |
| 00000100 | 04 | EOT |
| 00000101 | 05 | ENQ |
| 00000110 | 06 | ACK |
| 00000111 | 07 | BEL |
| 00001000 | 08 | BS |
| 00001001 | 09 | HT |
| 00001010 | 0A | LF |
| 00001011 | 0B | VT |
| 00001100 | 0C | FF |
| 00001101 | 0D | CR |
| 00001110 | 0E | SO |
| 00001111 | 0F | SI |
| 00010000 | 10 | DLE |
| 00010001 | 11 | DC1 |
| 00010010 | 12 | DC2 |
| 00010011 | 13 | DC3 |
| 00010100 | 14 | DC4 |
| 00010101 | 15 | NAK |
| 00010110 | 16 | SYN |
| 00010111 | 17 | ETB |
| 00011000 | 18 | CAN |
| 00011001 | 19 | EM |
| 00011010 | 1A | SUB |
| 00011011 | 1B | ESC |
| 00011100 | 1C | FS |
| 00011101 | 1D | GS |
| 00011110 | 1E | RS |
| 00011111 | 1F | US |
| 00100000 | 20 | Space |
| 00100001 | 21 | ! |
| 00100010 | 22 | " |
| 00100011 | 23 | # |
| 00100100 | 24 | $ |
| 00100101 | 25 | % |
| 00100110 | 26 | & |
| 00100111 | 27 | ' |
| 00101000 | 28 | ( |
| 00101001 | 29 | ) |
| 00101010 | 2A | * |
| 00101011 | 2B | + |
| 00101100 | 2C | , |
| 00101101 | 2D | - |
| 00101110 | 2E | . |
| 00101111 | 2F | / |
| 00110000 | 30 | 0 |
| 00110001 | 31 | 1 |
| 00110010 | 32 | 2 |
| 00110011 | 33 | 3 |
| 00110100 | 34 | 4 |
| 00110101 | 35 | 5 |
| 00110110 | 36 | 6 |
| 00110111 | 37 | 7 |
| 00111000 | 38 | 8 |
| 00111001 | 39 | 9 |
| 00111010 | 3A | : |
| 00111011 | 3B | ; |
| 00111100 | 3C | < |
| 00111101 | 3D | = |
| 00111110 | 3E | > |
| 00111111 | 3F | ? |
| 01000000 | 40 | @ |
| 01000001 | 41 | A |
| 01000010 | 42 | B |
| 01000011 | 43 | C |
| 01000100 | 44 | D |
| 01000101 | 45 | E |
| 01000110 | 46 | F |
| 01000111 | 47 | G |
| 01001000 | 48 | H |
| 01001001 | 49 | I |
| 01001010 | 4A | J |
| 01001011 | 4B | K |
| 01001100 | 4C | L |
| 01001101 | 4D | M |
| 01001110 | 4E | N |
| 01001111 | 4F | O |
| 01010000 | 50 | P |
| 01010001 | 51 | Q |
| 01010010 | 52 | R |
| 01010011 | 53 | S |
| 01010100 | 54 | T |
| 01010101 | 55 | U |
| 01010110 | 56 | V |
| 01010111 | 57 | W |
| 01011000 | 58 | X |
| 01011001 | 59 | Y |
| 01011010 | 5A | Z |
| 01011011 | 5B | [ |
| 01011100 | 5C | \ |
| 01011101 | 5D | ] |
| 01011110 | 5E | ^ |
| 01011111 | 5F | _ |
| 01100000 | 60 | ` |
| 01100001 | 61 | a |
| 01100010 | 62 | b |
| 01100011 | 63 | c |
| 01100100 | 64 | d |
| 01100101 | 65 | e |
| 01100110 | 66 | f |
| 01100111 | 67 | g |
| 01101000 | 68 | h |
| 01101001 | 69 | i |
| 01101010 | 6A | j |
| 01101011 | 6B | k |
| 01101100 | 6C | l |
| 01101101 | 6D | m |
| 01101110 | 6E | n |
| 01101111 | 6F | o |
| 01110000 | 70 | p |
| 01110001 | 71 | q |
| 01110010 | 72 | r |
| 01110011 | 73 | s |
| 01110100 | 74 | t |
| 01110101 | 75 | u |
| 01110110 | 76 | v |
| 01110111 | 77 | w |
| 01111000 | 78 | x |
| 01111001 | 79 | y |
| 01111010 | 7A | z |
| 01111011 | 7B | { |
| 01111100 | 7C | | |
| 01111101 | 7D | } |
| 01111110 | 7E | ~ |
| 01111111 | 7F | DEL |
