This is an example of binary code. 

A binary code represents text, computer processor instructions, and other data using any two-symbol system, however often the binary number system's 0 and 1. The binary code assigns a pattern of binary digits (bits) to each character, instruction, etc. For example, a binary string of eight bits can represent any of 256 possible values and can therefore represent a variety of different items.

Such as binary code translated could be similar to this.  01001000 01101001.

01001000 is the equivalent to H in the English alphabet, while 01101001= a lowercase I.

01001000 01101001 00101100 00100000 01101000 01101111 01110111 00100000 01100001 01110010 01100101 00100000 01111001 01101111 01110101 00111111 

What you see above, is merely a simple: Hi, how are you?  Each set of numbers represents a letter, punctuation mark, and space in order of the characters.

In computing, binary codes are generally used for various methods of encoding data, such as character strings, into bit strings. Those methods may use fixed-width or variable-width strings. In a fixed-width binary code, each letter, digit, or other character is represented by a bit string of the same length; that bit string,which is interpreted as a binary number, is usually displayed in code tables in decimal, octal or hexadecimal notation. There are many character sets and many character encodings to be used on them.

 Almost all computers these days use binary encoding for data and instruction. CDs, DVDs, and Blu-ray Discs represent sound and video digitally in binary form. Telephone calls are carried digitally on long-distance as well as pulse code modulation via mobile phone networks, and on voice over IP networks.

Braille is also a type of binary code that is widely used by blind people to read and write by touch, It was named after its creator, Louis Braille.   This system consists of grids of six dots each, three per column, in which each dot has two states: raised or not raised. The different combinations of raised and flattened dots are capable of representing all letters, numbers, and punctuation signs.     

The binary number system that we use today or the basis for binary code, was invented by a man named Gottfried Leibniz in 1679, and was published in his book. The full title is translated into English as  "Explanation of the binary arithmetic", which only used the characters 1 and 0, with some remarks on its usefulness, and on the light it throws on the ancient Chinese figures of Fu Xi." (1703). Leibniz's system uses 0 and 1, like the modern binary numeral system. Leibniz encountered the I Ching through French Jesuit Joachim Bouvet and noted with fascination how its hexagrams  to the binary numbers from 0 to 111111, and concluded that this mapping was evidence of major Chinese accomplishments in a sort of philosophical mathematics, which he admired quite a bit.  But Leibniz saw the hexagrams as an affirmation of the universality of his own religious beliefs.

                                                            Gottfried Leibniz.  The creator of binary code.

Anyway,Leibniz's theology was centered to the binary numerals. He believed that binary numbers were a symbol of the Christian belief  of creation out of nothing. Which led to Leibniz trying to find a system that turns logic's verbal statements into a pure mathematical one. After his ideas were ignored, he stumbled across a classic Chinese text which used a type of binary code called I Ching or 'Book of Changes', The book had confirmed his theory that life could be simplified or reduced down to a series of straightforward propositions. He created a system consisting of rows of zeros and ones. Even though Leibniz had yet to find a use for this system.

Binary systems predating Leibniz also existed in the ancient world. The aforementioned I Ching that Leibniz encountered, is one that dates from the 9th century BC in China.

Well, hope you enjoyed my little report on binary code. All this information is true, And I hope you know me enough by now to guess what the numbers below translate into. 😆

01010011 01101001 01101110 01100011 01100101 01110010 01100101 01101100 01111001 00101100 00100000 01110100 01101000 01100101 01101100 01100001 01110011 01110100 01001011 01101110 01101001 01100111 01101000 01110100 01110111 01100001 01101100 01101011 01100101 01110010 00101110 

ありがとう