Fraction

A fraction represents a part of a whole or, more generally, any number of equal parts. When spoken in everyday English, a fraction describes how many parts of a certain size there are, for example, one-half, eight-fifths, three-quarters. A common, vulgar, or simple fraction consists of an integer numerator, displayed above a line, and a non-zero integer denominator, displayed below that line. If these integers are positive, then the numerator represents a number of equal parts, and the denominator indicates how many of those parts make up a unit or a whole. For example, in the fraction, the numerator 3 indicates that the fraction represents 3 equal parts, and the denominator 4 indicates that 4 parts make up a whole. The picture to the right illustrates of a cake.
Fractions can be used to represent ratios and division. Thus the fraction can be used to represent the ratio 3:4, and the division .
We can also write negative fractions, which represent the opposite of a positive fraction. For example, if represents a half-dollar profit, then − represents a half-dollar loss. Because of the rules of division of signed numbers, −, and all represent the same fraction negative one-half. And because a negative divided by a negative produces a positive, represents positive one-half.
In mathematics a rational number is a number that can be represented by a fraction of the form, where a and b are integers and b is not zero; the set of all rational numbers is commonly represented by the symbol or Q, which stands for quotient. The term fraction and the notation can also be used for mathematical expressions that do not represent a rational number, or even do not represent any number.
A rational number, expressed as where p and q are coprime integers and is in base, has a terminating representation in base if and only if q divides a power of b, or,for some and some integer > 0.
By cross multiplying, the equality is equivalent to. Because q doesn't divide p, it must divide, and the expansion will not continue.

Vocabulary

In a fraction, the number of equal parts being described is the numerator, and the type or variety of the parts is the denominator. As an example, the fraction amounts to eight parts, each of which is of the type named fifth. In terms of division, the numerator corresponds to the dividend, and the denominator corresponds to the divisor.
Informally, the numerator and denominator may be distinguished by placement alone, but in formal contexts they are usually separated by a fraction bar. The fraction bar may be horizontal, oblique, or diagonal. These marks are respectively known as the horizontal bar; the virgule, slash, or stroke ; and the fraction bar, solidus, or fraction slash. In typography, fractions stacked vertically are also known as en or nut fractions, and diagonal ones as em or mutton fractions, based on whether a fraction with a single-digit numerator and denominator occupies the proportion of a narrow en square, or a wider em square. In traditional typefounding, a piece of type bearing a complete fraction was known as a case fraction, while those representing only parts of fractions were called piece fractions.
The denominators of English fractions are generally expressed as ordinal numbers, in the plural if the numerator is not 1. Exceptions include the denominator 2, which is always read half or halves, the denominator 4, which may be alternatively expressed as quarter/''quarters or as fourth/fourths, and the denominator 100, which may be alternatively expressed as hundredth/hundredths or percent.
When the denominator is 1, it may be expressed in terms of wholes but is more commonly ignored, with the numerator read out as a whole number. For example, may be described as three wholes, or simply as three. When the numerator is 1, it may be omitted.
The entire fraction may be expressed as a single composition, in which case it is hyphenated, or as a number of fractions with a numerator of one, in which case they are not. Fractions should always be hyphenated when used as adjectives. Alternatively, a fraction may be described by reading it out as the numerator over the denominator, with the denominator expressed as a cardinal number. The term over is used even in the case of solidus fractions, where the numbers are placed left and right of a slash mark. Fractions with large denominators that are not'' powers of ten are often rendered in this fashion, while those with denominators divisible by ten are typically read in the normal ordinal fashion.

Forms of fractions

Simple, common, or vulgar fractions

A simple fraction is a rational number written as a/''b or, where a'' and b are both integers. As with other fractions, the denominator cannot be zero. Examples include, −,, and. The term was originally used to distinguish this type of fraction from the sexagesimal fraction used in astronomy.
Common fractions can be positive or negative, and they can be proper or improper. Compound fractions, complex fractions, mixed numerals, and decimal expressions are not common fractions; though, unless irrational, they can be evaluated to a common fraction.

A unit fraction is a common fraction with a numerator of 1. Unit fractions can also be expressed using negative exponents, as in 2⁻¹, which represents 1/2, and 2⁻², which represents 1/ or 1/4.
A dyadic fraction is a common fraction in which the denominator is a power of two, e.g. =.

In Unicode, precomposed fraction characters are in the Number Forms block.

Proper and improper fractions

Common fractions can be classified as either proper or improper. When the numerator and the denominator are both positive, the fraction is called proper if the numerator is less than the denominator, and improper otherwise. The concept of an improper fraction is a late development, with the terminology deriving from the fact that fraction means "piece", so a proper fraction must be less than 1. This was explained in the 17th century textbook The Ground of Arts.
In general, a common fraction is said to be a proper fraction if the absolute value of the fraction is strictly less than one—that is, if the fraction is greater than −1 and less than 1. It is said to be an improper fraction, or sometimes top-heavy fraction, if the absolute value of the fraction is greater than or equal to 1. Examples of proper fractions are 2/3, −3/4, and 4/9, whereas examples of improper fractions are 9/4, −4/3, and 3/3. [|As described below], any improper fraction can be converted to a mixed number, and vice versa.

Reciprocals and the invisible denominator

The reciprocal of a fraction is another fraction with the numerator and denominator exchanged. The reciprocal of, for instance, is. The product of a non-zero fraction and its reciprocal is 1, hence the reciprocal is the multiplicative inverse of a fraction. The reciprocal of a proper fraction is improper, and the reciprocal of an improper fraction not equal to 1 is a proper fraction.
When the numerator and denominator of a fraction are equal, its value is 1, and the fraction therefore is improper. Its reciprocal is identical and hence also equal to 1 and improper.
Any integer can be written as a fraction with the number one as denominator. For example, 17 can be written as, where 1 is sometimes referred to as the invisible denominator. Therefore, every fraction and every integer, except for zero, has a reciprocal. For example, the reciprocal of 17 is.

Ratios

A ratio is a relationship between two or more numbers that can be sometimes expressed as a fraction. Typically, a number of items are grouped and compared in a ratio, specifying numerically the relationship between each group. Ratios are expressed as "group 1 to group 2... to group n". For example, if a car lot had 12 vehicles, of which

2 are white,
6 are red, and
4 are yellow,

then the ratio of red to white to yellow cars is 6 to 2 to 4. The ratio of yellow cars to white cars is 4 to 2 and may be expressed as 4:2 or 2:1.
A ratio is often converted to a fraction when it is expressed as a ratio to the whole. In the above example, the ratio of yellow cars to all the cars on the lot is 4:12 or 1:3. We can convert these ratios to a fraction, and say that of the cars or of the cars in the lot are yellow. Therefore, if a person randomly chose one car on the lot, then there is a one in three chance or probability that it would be yellow.

Decimal fractions and percentages

A decimal fraction is a fraction whose denominator is an integer power of ten, commonly expressed using decimal notation, in which the denominator is not given explicitly but is implied by the number of digits to the right of a decimal separator. The separator can be a period ⟨.⟩, interpunct ⟨·⟩, or comma ⟨,⟩, depending on locale. Thus, for 0.75 the numerator is 75 and the implied denominator is 10 to the second power, namely, 100, because there are two digits to the right of the decimal separator. In decimal numbers greater than 1, the fractional part of the number is expressed by the digits to the right of the separator. 3.75 can be written either as an improper fraction,, or as a mixed number,.
Decimal fractions can also be expressed using scientific notation with negative exponents, such as, a convenient alternative to the unwieldy 0.0000006023. The represents a denominator of. Dividing by moves the decimal point seven places to the left.
A decimal fraction with infinitely many digits to the right of the decimal separator represents an infinite series. For example, = 0.333... represents the infinite series 3/10 + 3/100 + 3/1000 +....
Another kind of fraction is the percentage, in which the implied denominator is always 100. Thus, 51% means. Percentages greater than 100 or less than zero are treated in the same way, e.g. 311% means and −27% means.
The related concept of permille, or parts per thousand, means a denominator of 1000, and this parts-per notation is commonly used with larger denominators, such as million and billion, e.g. 75 parts per million means that the proportion is.
The choice between fraction and decimal notation is often a matter of taste and context. Fractions are used most often when the denominator is relatively small. By mental calculation, it is easier to multiply 16 by than to do the same calculation using the fraction's decimal equivalent. And it is more precise to multiply 15 by, for example, than it is to multiply 15 by any decimal approximation of one third. Monetary values are commonly expressed as decimal fractions with denominator 100, i.e., with two digits after the decimal separator, for example $3.75. However, as noted above, in pre-decimal British currency, shillings and pence were often given the form of a fraction, as, for example, "3/6", commonly read three and six, means three shillings and sixpence and has no relationship to the fraction three sixths.