Binary numeral system
From Academic Kids

Template:Table Numeral Systems The binary or basetwo numeral system is a system for representing numbers in which a radix of two is used; that is, each digit in a binary numeral may have either of two different values. Typically, the symbols 0 and 1 are used to represent binary numbers. Owing to its relatively straightforward implementation in electronic circuitry, the binary system is used internally by virtually all modern computers.
Contents 
History
The first known description of a binary numeral system was made by Indian mathematician Pingala in his Chhandahshastra, placed variously in the 5th century BC or the 2nd century BC. Pingala described the binary numeral system in connection with the listing of Vedic meters with short or long syllables. According to one Indian tradition, Pingala was the younger brother of the grammarian Panini.
Although the British philosopher Francis Bacon had earlier described a developed system of concealed binary encoding for encryption, the modern binary number system was first fully documented by Gottfried Leibniz in the 17th century in his article Explication de l'Arithmétique Binaire. While Pingala's system uses the symbols 1 and 2, Leibniz's uses 0 and 1, like the modern binary numeral system.
In 1854, British mathematician George Boole published a landmark paper detailing a system of logic that would become known as Boolean algebra. His logical system proved instrumental in the development of the binary system, particularly in its implementation in electronic circuitry.
In 1937, Claude Shannon produced his master's thesis at MIT that implemented Boolean algebra and binary arithmetic using electronic relays and switches for the first time in history. Entitled A Symbolic Analysis of Relay and Switching Circuits, Shannon's thesis essentially founded practical digital circuit design.
In November of 1937, George Stibitz, then working at Bell Labs, completed a relaybased computer he dubbed the "Model K" (for "kitchen", where he had assembled it), which calculated using binary addition. Bell Labs thus authorized a full research program in late 1938 with Stibitz at the helm. Their Complex Number Computer, completed January 8, 1940, was able to calculate complex numbers. In a demonstration to the American Mathematical Society conference at Dartmouth College on September 11, 1940, Stibbitz was able to send the Complex Number Calculator remote commands over telephone lines by a teletype. It was the first computing machine ever used remotely over a phone line. Some participants of the conference who witnessed the demonstration were John Von Neumann, John Mauchly, and Norbert Wiener, who wrote about it in his memoirs.
Representation
A binary number can be represented by any sequence of bits (binary digits), which in turn may be represented by any mechanism capable of being in two mutually exclusive states. The following sequences of symbols could all be interpreted as different binary numeric values:
11010011 on off off on off on             o x o o x o o x N Y N N Y N Y Y Y true false false true true false male male female male female
The numeric value represented in each case is dependent upon the value assigned to each symbol. In a computer, the numeric values may be represented by two different voltages; on a magnetic disk, magnetic polarities may be used. A "positive", "yes", or "on" state is not necessarily equivalent to the numerical value of one; it depends on the architecture in use.
In keeping with customary representation of numerals using arabic numerals, binary numbers are commonly written using the symbols 0 and 1. When written, binary numerals are often subscripted or suffixed in order to indicate their base, or radix. The following notations are equivalent:
 100101 binary (explicit statement of format)
 100101b (a suffix indicating binary format)
 bin 100101 (a prefix indicating binary format)
 100101_{2} (a subscript indicating base2 notation)
When spoken, binary numerals are usually pronounced by pronouncing each individual digit, in order to distinguish them from decimal numbers. For example, the binary numeral "100" is pronounced "one zero zero", rather than "one hundred", to make its binary nature explicit, and for purposes of correctness. Since the binary numeral "100" is equal to the decimal value four, it would be confusing, and numerically incorrect, to refer to the numeral as "one hundred."
Counting in binary
Counting in binary is similar to counting in any other number system. Beginning with a single digit, counting proceeds through each symbol, in increasing order. Decimal counting uses the symbols 0 through 9, while binary only uses the symbols 0 and 1.
When the symbols for the first digit are exhausted, the nexthigher digit (to the left) is incremented, and counting starts over at 0. In decimal, counting proceeds like so:
 00, 01, 02, ... 07, 08, 09 (rightmost digit starts over, and the 0 is incremented)
 10, 11, 12, ... 17, 18, 19 (rightmost digit starts over, and the 1 is incremented)
 20, 21, 22, ...
When the rightmost digit reaches 9, counting returns to 0, and the second digit is incremented. In binary, counting is similar, with the exception that only the two symbols 0 and 1 are used. When 1 is reached, counting begins at 0 again, with the digit to the left being incremented:
 000, 001 (rightmost digit starts over, and the second 0 is incremented)
 010, 011 (middle and rightmost digits start over, and the first 0 is incremented)
 100, 101 (rightmost digit starts over again, middle 0 is incremented)
 110, 111...
Binary arithmetic
Arithmetic in binary is much like arithmetic in other numeral systems. Addition, subtraction, multiplication, and division can be performed on binary numerals.
Addition
The simplest arithmetic operation in binary is addition. Adding two singledigit binary numbers is relatively simple:
 0 + 0 = 0
 0 + 1 = 1
 1 + 0 = 1
 1 + 1 = 10 (the 1 is carried)
Adding two "1" values produces the value "10", equivalent to the decimal value 2. This is similar to what happens in decimal when certain singledigit numbers are added together; if the result exceeds the value of the radix (10), the digit to the left is incremented:
 5 + 5 = 10
 7 + 9 = 16
This is known as carrying in most numeral systems. When the result of an addition exceeds the value of the radix, the procedure is to "carry the one" to the left, adding it to the next positional value. Carrying works the same way in binary:
1 1 1 1 1 (carry) 0 1 1 0 1 + 1 0 1 1 1  = 1 0 0 1 0 0
In this example, two numerals are being added together: 01101 (13 decimal) and 10111 (23 decimal). The top row shows the carry bits used. Starting in the rightmost column, 1 + 1 = 10. The 1 is carried to the left, and the 0 is written at the bottom of the rightmost column. The second column from the right is added: 1 + 0 + 1 = 10 again; the 1 is carried, and 0 is written at the bottom. The third column: 1 + 1 + 1 = 11. This time, a 1 is carried, and a 1 is written in the bottom row. Proceeding like this gives the final answer 100100.
Subtraction
Subtraction works in much the same way:
 0  0 = 0
 0  1 = 1 (with borrow)
 1  0 = 1
 1  1 = 0
One binary numeral can be subtracted from another as follows:
* * * * (starred columns are borrowed from) 1 1 0 1 1 1 0  1 0 1 1 1  = 1 0 1 0 1 1 1
Subtracting a positive number is equivalent to adding a negative number of equal absolute value; computers typically use the two's complement notation to represent negative values. This notation eliminates the need for a separate "subtract" operation. For further details, see two's complement.
Multiplication
Multiplication in binary is similar to its decimal counterpart. Two numbers A and B can be multiplied by partial products: for each digit in B, the product of that digit in A is calculated and written on a new line, shifted leftward so that its rightmost digit lines up with the digit in B that was used. The sum of all these partial products gives the final result.
Since there are only two digits in binary, there are only two possible outcomes of each partial multiplication:
 If the digit in B is 0, the partial product is also 0
 If the digit in B is 1, the partial product is equal to A
For example, the binary numbers 1011 and 1010 are multiplied as follows:
1 0 1 1 (A) × 1 0 1 0 (B)  0 0 0 0 ← Corresponds to a zero in B 1 0 1 1 ← Corresponds to a one in B 0 0 0 0 + 1 0 1 1  = 1 1 0 1 1 1 0
Division
Binary division is again similar to its decimal counterpart:
__________ 1 0 1  1 1 0 1 1
Here, the divisor is 101, or 5 decimal, while the dividend is 11011, or 27 decimal. The procedure is the same as that of decimal long division; here, the divisor 101 goes into the first three digits 110 of the dividend one time, so a "1" is written on the top line. This result is multiplied by the divisor, and subtracted from the first three digits of the dividend; the next digit (a "1") is included to obtain a new threedigit sequence:
1 __________ 1 0 1  1 1 0 1 1  1 0 1  0 1 1
The procedure is then repeated with the new sequence, continuing until the digits in the dividend have been exhausted:
1 0 1 __________ 1 0 1  1 1 0 1 1  1 0 1  0 1 1  0 0 0  1 1 1  1 0 1  1 0
Thus, the quotient of 11011 divided by 101 is 101_{2}, as shown on the top line, while the remainder, shown on the bottom line, is 10_{2}. In decimal, 27 divided by 5 is 5, with a remainder of 2.
Bitwise logical operations
Though not directly related to the numerical interpretation of binary symbols, sequences of bits may be manipulated using Boolean logical operators. When a string of binary symbols is manipulated in this way, it is called a bitwise operation; the logical operators AND, OR, and XOR may be performed on corresponding bits in two binary numerals provided as input. The logical NOT operation may be performed on individual bits in a single binary numeral provided as input. Sometimes, such operations may be used as arithmetic shortcuts, and may have other computational benefits as well. For example, discarding the last bit of a binary number (also known as binary shifting), is the decimal equivalent of division by two. See Bitwise operation.
Conversion to and from other numeral systems
Decimal
This method works for conversion from any base, but there are better methods for bases which are powers of two, such as octal and hexadecimal given below.
In placevalue numeral systems, digits in successively lower, or less significant, positions represent successively smaller powers of the radix. The starting exponent is one less than the number of digits in the number. A fivedigit number would start with an exponent of four. In the decimal system, the radix is 10 (ten), so the leftmost digit of a fivedigit number represents the 10^{4} (ten thousands) position. Consider:
 97352_{10} is equal to:
 9 times 10^{4} (9 × 10000 = 90000) plus
 7 times 10^{3} (7 × 1000 = 7000) plus
 3 times 10^{2} (3 × 100 = 300) plus
 5 times 10^{1} (5 × 10 = 50) plus
 2 times 10^{0} (2 × 1 = 2)
Multiplication by the radix is simple. The digits are shifted left, and a 0 is appended to the right end of the number. For example, 9735 times 10 is equal to 97350. So one way to interpret a string of digits is as the last digit added to the radix times all but the last digit. 97352 equals 9735 times 10 plus 2. An example in binary is 1101100111_{2} equals 110110011_{2} times 2 plus 1. This is the essence of the conversion method. At each step, write the number to be converted as 2*k + 0 or 2*k + 1 for an integer k, which becomes the new number to be converted.
 118_{10} equals
 59 x 2 + 0
 (29 x 2 + 1) x 2 + 0
 ((14 x 2 + 1) x 2 + 1) x 2 + 0
 (((7 x 2 + 0) x 2 + 1) x 2 + 1) x 2 + 0
 ((((3 x 2 + 1) x 2 + 0) x 2 + 1) x 2 + 1) x 2 + 0
 (((((1 x 2 + 1) x 2 + 1) x 2 + 0) x 2 + 1) x 2 + 1) x 2 + 0
 1 x 2^{6} + 1 x 2^{5} + 1 x 2^{4} + 0 x 2^{3} + 1 x 2^{2} + 1 x 2^{1} + 0 x 2^{0}
 1110110_{2}
So in the algorithm to convert from an integer decimal numeral to its binary equivalent, the number is divided by two, and the remainder written in the onesplace. The result is again divided by two, its remainder written in the next place to the left. This process repeats until the number becomes zero.
For example, 118_{10}, in binary, is:
Operation  Remainder 

118/2 = 59  0 
59/2 = 29  1 
29/2 = 14  1 
14/2 = 7  0 
7/2 = 3  1 
3/2 = 1  1 
1/2 = 0  1 
Reading the sequence of remainders from the bottom up gives the binary numeral 1110110_{2}.
To convert from binary to decimal is the reverse algorithm. Starting from the left, double the result and add the next digit until there are no more. For example to convert 110010101101_{2} to decimal:
Result  Remaining digits 

0  110010101101 
0*2 + 1 = 1  10010101101 
1*2 + 1 = 3  0010101101 
3*2 + 0 = 6  010101101 
6*2 + 0 = 12  10101101 
12*2 + 1 = 25  0101101 
25*2 + 0 = 50  101101 
50*2 + 1 = 101  01101 
101*2 + 0 = 202  1101 
202*2 + 1 = 405  101 
405*2 + 1 = 811  01 
811*2 + 0 = 1622  1 
1622*2 + 1 = 3245 
and the result is 3245_{10}.
The fractional parts of a numbers are converted with similar methods. They are again based on the equivalence of shifting with doubling or halving.
In a fractional binary number such as .11010110101_{2}, the first digit is 1/2, the second 1/2^{2}, etc. So if there is a 1 in the first place after the decimal, then the number is at least 1/2, and vice versa. Double that number is at least 1. This suggests the algorithm: Repeatedly double the number to be converted, record if the result is at least 1, and then throw away the integer part.
For example, (1/3)_{10}, in binary, is:
Converting  Result 

1/3  0. 
1/3 * 2 = 2/3 < 1  0.0 
2/3 * 2 = 1 1/3 ≥ 1  0.01 
1/3 * 2 = 2/3 < 1  0.010 
2/3 * 2 = 1 1/3 ≥ 1  0.0101 
which is the repeating fraction 0.0101..._{2}
Or for example, 0.1_{10}, in binary, is:
Converting  Result 

0.1  0. 
0.1 * 2 = 0.2 < 1  0.0 
0.2 * 2 = 0.4 < 1  0.00 
0.4* 2 = 0.8 < 1  0.000 
0.8* 2 = 1.6 ≥ 1  0.0001 
0.6 * 2 = 1.2 ≥ 1  0.00011 
0.2 * 2 = 0.4 < 1  0.000110 
0.4 * 2 = 0.8 < 1  0.0001100 
0.8 * 2 = 1.6 ≥ 1  0.00011001 
0.6 * 2 = 1.2 ≥ 1  0.000110011 
0.2 * 2 = 0.4 < 1  0.0001100110 
which is also a repeating fraction 0.000110011..._{2} It may come as a surprise that terminating decimal fractions can have repeating expansions in binary. It is for this reason that many are surprised to discover that 0.1 + ... + 0.1, (10 additions) differs from 1 in floating point arithmetic. In fact, the only binary fractions with terminating expansions are of the form of an integer divided by a power of 2, which 1/10 is not.
The final conversion is from binary to decimal fractions. The only difficulty arises with repeating fractions, but otherwise the method is to shift the fraction to an integer, convert it as above, and then divide by the appropriate power of two in the decimal base. For example,
x  =  1100  .101110011100... 
x times 2^{6}  =  1100101110  .0111001110... 
x times 2  =  11001  .0111001110... 
x times (2^{6}  2)  =  1100010101  
x  =  (781/62)_{10} 
Hexadecimal
Binary may be converted to and from hexadecimal somewhat more easily. This is due to the fact that the radix of the hexadecimal system (16) is a power of the radix of the binary system (2). More specifically, 16 = 2^{4}, so it takes exactly four digits of binary to represent one digit of hexadecimal.
The following table shows each hexadecimal digit along with the equivalent fourdigit binary sequence:
Hex  Binary  Hex  Binary  Hex  Binary  Hex  Binary 

0  0000  4  0100  8  1000  C  1100 
1  0001  5  0101  9  1001  D  1101 
2  0010  6  0110  A  1010  E  1110 
3  0011  7  0111  B  1011  F  1111 
To convert a hexadecimal number into its binary equivalent, simply substitute the corresponding binary digits:
 3A_{16} = 0011 1010_{2}
 E7_{16} = 1110 0111_{2}
To convert a binary number into its hexadecimal equivalent, divide it into groups of four bits. If the number of bits isn't a multiple of four, simply insert extra 0 bits at the left (called padding). For example:
 1010010_{2} = 0101 0010 grouped with padding = 52_{16}
 11011101_{2} = 1101 1101 grouped = DD_{16}
Octal
Binary is also easily converted to the octal numeral system, since octal uses a radix of 8, which is a power of two (namely, 2^{3}, so it takes exactly three binary digits to represent an octal digit). The correspondence between octal and binary numerals is the same as for the first eight digits of hexadecimal in the table above. Binary 000 is equivalent to the octal digit 0, binary 111 is equivalent to octal 7, and so on.
Converting from octal to decimal proceeds in the same fashion as it does for hexadecimal:
 65_{8} = 110 101_{2}
 17_{8} = 001 111_{2}
And from binary to octal:
 101100_{2} = 101 100_{2} grouped = 54_{8}
 10011_{2} = 010 011_{2} grouped with padding = 23_{8}
Representing real numbers
Nonintegers can be represented by using negative powers, which are set off from the other digits by means of a radix point (called a decimal point in the decimal system). For example, the binary number 11.01_{2} thus means:
 1 times 2^{1} (1 × 2 = 2) plus
 1 times 2^{0} (1 × 1 = 1) plus
 0 times 2^{1} (0 × (1/2) = 0) plus
 1 times 2^{2} (1 × (1/4) = 0.25)
For a total of 3.25 decimal.
All dyadic rational numbers p/2^{a} have a terminating binary numeral  the binary representation has only finitely many terms after the radix point. Other rational numbers have binary representation, but instead of terminating, they recur, with a finite sequence of digits repeating indefinitely. For instance
 1/3_{10} = 1/11_{2} = 0.0101010101..._{2}
 12_{10}/17_{10} = 1100_{2} / 10001_{2} = 0.10110100 10110100 10110100..._{2}
The phenomenon that the binary representation of any rational is either terminating or recurring also occurs in other radixbased numeral systems. See, for instance, the explanation in Decimal. Another similarity is the existence of alternative representations for any terminating representation, relying on the fact that 0.111111... is the sum of the geometric series 2^{1} + 2^{2} + 2^{3} + ... which is 1.
Binary numerals which neither terminate nor recur represent irrational numbers. For instance,
 0.10100100010000100000100.... does have a pattern, but it is not a fixedlength recurring pattern, so the number is irrational
 1.0110101000001001111001100110011111110... is the binary representation of √2, the square root of 2, another irrational. It has no discernible pattern, although a proof that √2 is irrational requires more than this. See irrational number.
Jokes
A joke regarding binary is as follows: "There are only 10 kinds of people in the world: those who understand binary and those who don't."
See also
 register
 unary numeral system
 floating pointnonadjacent form]]
External links
 Simple Conversion Methods (http://www.insidereality.net/site/content/math/base_conversion.php)
 Indian mathematics (http://wwwhistory.mcs.standrews.ac.uk/history/Projects/Pearce/index.html)
 Base Converter (http://www.cuttheknot.org/binary.shtml)
 Binary System (http://www.cuttheknot.org/do_you_know/BinaryHistory.shtml)
 Conversion of Fractions (http://www.cuttheknot.org/blue/frac_conv.shtml)
 This FireFox extension supports ASCII/Binary conversions and typing (http://leetkey.mozdev.org)ar:نظام عد ثنائي
ca:Codi binari da:Binære talsystem de:Dualsystem es:Sistema binario eo:Duuma sistemo fr:Système binaire hu:Kettes számrendszer it:Sistema numerico binario nl:Binair ja:2進数 no:Binærtall pl:Dwójkowy system liczbowy pt:Sistema binário (matemática) ro:Sistem binar fi:Binäärijärjestelmä sl:DvojiÅ¡ki_Å¡tevilski_sistem sr:Бинарни систем sv:Binära talsystemet th:เลขฐานสอง zh:二进制 yi:ביינערי ru:Двоичная система счисления