A fraction (from Latin: fractus, "broken") 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 (examples: $\backslash tfrac\{1\}\{2\}$ and 17/3) consists of an integer numerator, displayed above a line (or before a slash), and a non-zero integer denominator, displayed below (or after) that line.
Numerators and denominators are also used in fractions that are not common, including compound fractions, complex fractions, and mixed numerals.
The numerator represents a number of equal parts, and the denominator, which cannot be zero, indicates how many of those parts make up a unit or a whole. For example, in the fraction 3/4, the numerator, 3, tells us that the fraction represents 3 equal parts, and the denominator, 4, tells us that 4 parts make up a whole. The picture to the right illustrates $\backslash tfrac\{3\}\{4\}$ or 3/4 of a cake.
Fractional numbers can also be written without using explicit numerators or denominators, by using decimals, percent signs, or negative exponents (as in 0.01, 1%, and 10^{−2} respectively, all of which are equivalent to 1/100). An integer such as the number 7 can be thought of as having an implied denominator of one: 7 equals 7/1.
Other uses for fractions are to represent ratios and to represent division.^{[1]}
Thus the fraction 3/4 is also used to represent the ratio 3:4 (the ratio of the part to the whole) and the division 3 ÷ 4 (three divided by four).
In mathematics the set of all numbers which can be expressed in the form a/b, where a and b are integers and b is not zero, is called the set of rational numbers and is represented by the symbol Q, which stands for quotient. The test for a number being a rational number is that it can be written in that form (i.e., as a common fraction). However, the word fraction is also used to describe mathematical expressions that are not rational numbers, for example algebraic fractions (quotients of algebraic expressions), and expressions that contain irrational numbers, such as √2/2 (see square root of 2) and π/4 (see proof that π is irrational).
Vocabulary
In the examples 2/5 and 7/3, the slanting line is called a solidus or forward slash. In the examples $\backslash tfrac\{2\}\{5\}$ and $\backslash tfrac\{7\}\{3\}$, the horizontal line is called a vinculum or, informally, a "fraction bar".
When reading fractions it is customary in English to pronounce the denominator using the corresponding ordinal number, in plural if the numerator is not one, as in "fifths" for fractions with a 5 in the denominator. Thus 3/5 is rendered as three fifths and 5/32 as five thirty-seconds. This generally applies to whole number denominators greater than 2, though large denominators that are not powers of ten are often rendered using the cardinal number. Thus, 5/123 might be rendered as "five one-hundred-twenty-thirds", but is often "five over one hundred twenty-three". In contrast, because one million is a power of ten, 6/1,000,000 is usually expressed as "six millionths" or "six one-millionths", rather than as "six over one million".
The denominators 1, 2, and 4 are special cases. The fraction 3/1 may be spoken of as three wholes. The denominator 2 is expressed as half (plural halves); "−^{3}⁄_{2}" is minus three-halves or negative three-halves. The fraction 3/4 may be either "three fourths" or "three quarters". Furthermore, since most fractions in prose function as adjectives, the fractional modifier is hyphenated. This is evident in standard prose in which one might write about "every two-tenths of a mile", "the quarter-mile run", or the Three-Fifths Compromise. When the fraction's numerator is 1, then the word one may be omitted, such as "every tenth of a second" or "during the final quarter of the year".
Forms of fractions
Simple, common, or vulgar fractions
A simple fraction (also known as a common fraction or vulgar fraction) is a rational number written as a/b or $\backslash tfrac\{a\}\{b\}$, where a and b are both integers.^{[2]}
As with other fractions, the denominator (b) cannot be zero. Examples include $\backslash tfrac\{1\}\{2\}$, $-\backslash tfrac\{8\}\{5\}$, $\backslash tfrac\{-8\}\{5\}$, $\backslash tfrac\{8\}\{-5\}$, and 3/17.
Simple fractions can be positive or negative, proper or improper (see below). Compound fractions, complex fractions, mixed numerals, and decimals (see below) are not simple fractions, though, unless irrational, they can be evaluated to a simple fraction.
Proper and improper common 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.^{[3]}^{[4]} 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.^{[5]}^{[6]}
It is said to be an improper fraction, or sometimes informally 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; examples of improper fractions are 9/4, -4/3, and 3/3.
Mixed numbers
A mixed numeral (often called a mixed number, also called a mixed fraction) is the sum of a non-zero integer and a proper fraction. This sum is implied without the use of any visible operator such as "+". For example, in referring to two entire cakes and three quarters of another cake, the whole and fractional parts of the number are written next to each other: $2+\backslash frac\{3\}\{4\}=2\backslash tfrac\{3\}\{4\}$.
This is not to be confused with the algebra rule of implied multiplication. When two algebraic expressions are written next to each other, the operation of multiplication is said to be "understood". In algebra, $a\; \backslash tfrac\{b\}\{c\}$ for example is not a mixed number. Instead, multiplication is understood where $a\; \backslash tfrac\{b\}\{c\}\; =\; a\; \backslash times\; \backslash tfrac\{b\}\{c\}$.
To avoid confusion, the multiplication is often explicitly expressed. So $a\; \backslash tfrac\{b\}\{c\}$ may be written as
$a\; \backslash times\; \backslash tfrac\{b\}\{c\}$,
$a\; \backslash cdot\; \backslash tfrac\{b\}\{c\}$, or
$a\; (\backslash tfrac\{b\}\{c\})$.
An improper fraction is another way to write a whole plus a part. A mixed number can be converted to an improper fraction as follows:
- Write the mixed number $2\backslash tfrac\{3\}\{4\}$ as a sum $2+\backslash tfrac\{3\}\{4\}$.
- Convert the whole number to an improper fraction with the same denominator as the fractional part, $2=\backslash tfrac\{8\}\{4\}$.
- Add the fractions. The resulting sum is the improper fraction. In the example, $2\backslash tfrac\{3\}\{4\}=\backslash tfrac\{8\}\{4\}+\backslash tfrac\{3\}\{4\}=\backslash tfrac\{11\}\{4\}$.
Similarly, an improper fraction can be converted to a mixed number as follows:
- Divide the numerator by the denominator. In the example, $\backslash tfrac\{11\}\{4\}$, divide 11 by 4. 11 ÷ 4 = 2 with remainder 3.
- The quotient (without the remainder) becomes the whole number part of the mixed number. The remainder becomes the numerator of the fractional part. In the example, 2 is the whole number part and 3 is the numerator of the fractional part.
- The new denominator is the same as the denominator of the improper fraction. In the example, they are both 4. Thus $\backslash tfrac\{11\}\{4\}\; =2\backslash tfrac\{3\}\{4\}$.
Mixed numbers can also be negative, as in $-2\backslash tfrac\{3\}\{4\}$, which equals $-(2+\backslash tfrac\{3\}\{4\})\; =\; -2-\backslash tfrac\{3\}\{4\}$.
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 4/12 of the cars or 1/3 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.
Reciprocals and the "invisible denominator"
The reciprocal of a fraction is another fraction with the numerator and denominator exchanged. The reciprocal of $\backslash tfrac\{3\}\{7\}$, for instance, is $\backslash tfrac\{7\}\{3\}$. The product of a fraction and its reciprocal is 1, hence the reciprocal is the multiplicative inverse of a fraction. Any integer can be written as a fraction with the number one as denominator. For example, 17 can be written as $\backslash tfrac\{17\}\{1\}$, where 1 is sometimes referred to as the invisible denominator. Therefore, every fraction or integer except for zero has a reciprocal. The reciprocal of 17 is $\backslash tfrac\{1\}\{17\}$.
Complex fractions
In a complex fraction, either the numerator, or the denominator, or both, is a fraction or a mixed number,^{[7]}^{[8]} corresponding to division of fractions. For example, $\backslash frac\{\backslash tfrac\{1\}\{2\}\}\{\backslash tfrac\{1\}\{3\}\}$ and $\backslash frac\{12\backslash tfrac\{3\}\{4\}\}\{26\}$ are complex fractions. To reduce a complex fraction to a simple fraction, treat the longest fraction line as representing division. For example:
- $\backslash frac\{\backslash tfrac\{1\}\{2\}\}\{\backslash tfrac\{1\}\{3\}\}=\backslash tfrac\{1\}\{2\}\backslash times\backslash tfrac\{3\}\{1\}=\backslash tfrac\{3\}\{2\}=1\backslash tfrac\{1\}\{2\}$
- $\backslash frac\{12\backslash tfrac\{3\}\{4\}\}\{26\}\; =\; 12\backslash tfrac\{3\}\{4\}\; \backslash cdot\; \backslash tfrac\{1\}\{26\}\; =\; \backslash tfrac\{12\; \backslash cdot\; 4\; +\; 3\}\{4\}\; \backslash cdot\; \backslash tfrac\{1\}\{26\}\; =\; \backslash tfrac\{51\}\{4\}\; \backslash cdot\; \backslash tfrac\{1\}\{26\}\; =\; \backslash tfrac\{51\}\{104\}$
- $\backslash frac\{\backslash tfrac\{3\}\{2\}\}5=\backslash tfrac\{3\}\{2\}\backslash times\backslash tfrac\{1\}\{5\}=\backslash tfrac\{3\}\{10\}$
- $\backslash frac\{8\}\{\backslash tfrac\{1\}\{3\}\}=8\backslash times\backslash tfrac\{3\}\{1\}=24$.
If, in a complex fraction, there is no clear way to tell which fraction lines takes precedence, then the expression is improperly formed, and ambiguous. Thus 5/10/20/40 is a poorly constructed mathematical expression, with multiple possible values.
Compound fractions
A compound fraction is a fraction of a fraction, or any number of fractions connected with the word of,^{[7]}^{[8]} corresponding to multiplication of fractions. To reduce a compound fraction to a simple fraction, just carry out the multiplication (see the section on multiplication). For example, $\backslash tfrac\{3\}\{4\}$ of $\backslash tfrac\{5\}\{7\}$ is a compound fraction, corresponding to $\backslash tfrac\{3\}\{4\}\; \backslash times\; \backslash tfrac\{5\}\{7\}\; =\; \backslash tfrac\{15\}\{28\}$. The terms compound fraction and complex fraction are closely related and sometimes one is used as a synonym for the other.
Decimal fractions and percentages
A decimal fraction is a fraction whose denominator is not given explicitly, but is understood to be an integer power of ten. Decimal fractions are commonly expressed using decimal notation in which the implied denominator is determined by the number of digits to the right of a decimal separator, the appearance of which (e.g., a period, a raised period (•), a comma) depends on the locale (for examples, see decimal separator). Thus for 0.75 the numerator is 75 and the implied denominator is 10 to the second power, viz. 100, because there are two digits to the right of the decimal separator. In decimal numbers greater than 1 (such as 3.75), the fractional part of the number is expressed by the digits to the right of the decimal (with a value of 0.75 in this case). 3.75 can be written either as an improper fraction, 375/100, or as a mixed number, $3\backslash tfrac\{75\}\{100\}$.
Decimal fractions can also be expressed using scientific notation with negative exponents, such as 6.023×10^{Template:Val/delimitnum/gaps11}, which represents 0.0000006023. The 10^{Template:Val/delimitnum/gaps11} represents a denominator of 10^{7}. Dividing by 10^{7} moves the decimal point 7 places to the left.
Decimal fractions with infinitely many digits to the right of the decimal separator represent an infinite series. For example, 1/3 = 0.333... represents the infinite series 3/10 + 3/100 + 3/1000 + ... .
Another kind of fraction is the percentage (Latin per centum meaning "per hundred", represented by the symbol %), in which the implied denominator is always 100. Thus, 51% means 51/100. Percentages greater than 100 or less than zero are treated in the same way, e.g. 311% equals 311/100, and -27% equals -27/100.
The related concept of permille or parts per thousand has an implied denominator of 1000, while the more general parts-per notation, as in 75 parts per million, means that the proportion is 75/1,000,000.
Whether common fractions or decimal fractions are used is often a matter of taste and context. Common fractions are used most often when the denominator is relatively small. By mental calculation, it is easier to multiply 16 by 3/16 than to do the same calculation using the fraction's decimal equivalent (0.1875). And it is more accurate to multiply 15 by 1/3, for example, than it is to multiply 15 by any decimal approximation of one third. Monetary values are commonly expressed as decimal fractions, for example $3.75. However, as noted above, in pre-decimal British currency, shillings and pence were often given the form (but not the meaning) of a fraction, as, for example 3/6 (read "three and six") meaning 3 shillings and 6 pence, and having no relationship to the fraction 3/6.
Special cases
- A unit fraction is a vulgar fraction with a numerator of 1, e.g. $\backslash tfrac\{1\}\{7\}$. Unit fractions can also be expressed using negative exponents, as in 2^{−1} which represents 1/2, and 2^{−2} which represents 1/(2^{2}) or 1/4.
- An Egyptian fraction is the sum of distinct positive unit fractions, for example $\backslash tfrac\{1\}\{2\}+\backslash tfrac\{1\}\{3\}$. This definition derives from the fact that the ancient Egyptians expressed all fractions except $\backslash tfrac\{1\}\{2\}$, $\backslash tfrac\{2\}\{3\}$ and $\backslash tfrac\{3\}\{4\}$ in this manner. Every positive rational number can be expanded as an Egyptian fraction. For example, $\backslash tfrac\{5\}\{7\}$ can be written as $\backslash tfrac\{1\}\{2\}\; +\; \backslash tfrac\{1\}\{6\}\; +\; \backslash tfrac\{1\}\{21\}.$ Any positive rational number can be written as a sum of unit fractions in infinitely many ways. Two ways to write $\backslash tfrac\{13\}\{17\}$ are $\backslash tfrac\{1\}\{2\}+\backslash tfrac\{1\}\{4\}+\backslash tfrac\{1\}\{68\}$ and $\backslash tfrac\{1\}\{3\}+\backslash tfrac\{1\}\{4\}+\backslash tfrac\{1\}\{6\}+\backslash tfrac\{1\}\{68\}$.
Arithmetic with fractions
Like whole numbers, fractions obey the commutative, associative, and distributive laws, and the rule against division by zero.
Equivalent fractions
Multiplying the numerator and denominator of a fraction by the same (non-zero) number results in a fraction that is equivalent to the original fraction. This is true because for any non-zero number $n$, the fraction $\backslash tfrac\{n\}\{n\}\; =\; 1$. Therefore, multiplying by $\backslash tfrac\{n\}\{n\}$ is equivalent to multiplying by one, and any number multiplied by one has the same value as the original number. By way of an example, start with the fraction $\backslash tfrac\{1\}\{2\}$. When the numerator and denominator are both multiplied by 2, the result is $\backslash tfrac\{2\}\{4\}$, which has the same value (0.5) as $\backslash tfrac\{1\}\{2\}$. To picture this visually, imagine cutting a cake into four pieces; two of the pieces together ($\backslash tfrac\{2\}\{4\}$) make up half the cake ($\backslash tfrac\{1\}\{2\}$).
Dividing the numerator and denominator of a fraction by the same non-zero number will also yield an equivalent fraction. This is called reducing or simplifying the fraction. A simple fraction in which the numerator and denominator are coprime (that is, the only positive integer that goes into both the numerator and denominator evenly is 1) is said to be irreducible, in lowest terms, or in simplest terms. For example, $\backslash tfrac\{3\}\{9\}$ is not in lowest terms because both 3 and 9 can be exactly divided by 3. In contrast, $\backslash tfrac\{3\}\{8\}$ is in lowest terms—the only positive integer that goes into both 3 and 8 evenly is 1.
Using these rules, we can show that $\backslash tfrac\{5\}\{10\}$ = $\backslash tfrac\{1\}\{2\}$ = $\backslash tfrac\{10\}\{20\}$ = $\backslash tfrac\{50\}\{100\}$.
A common fraction can be reduced to lowest terms by dividing both the numerator and denominator by their greatest common divisor. For example, as the greatest common divisor of 63 and 462 is 21, the fraction $\backslash tfrac\{63\}\{462\}$ can be reduced to lowest terms by dividing the numerator and denominator by 21:
- $\backslash tfrac\{63\}\{462\}\; =\; \backslash tfrac\{63\; \backslash div\; 21\}\{462\; \backslash div\; 21\}=\; \backslash tfrac\{3\}\{22\}$
The Euclidean algorithm gives a method for finding the greatest common divisor of any two positive integers.
Comparing fractions
Comparing fractions with the same denominator only requires comparing the numerators.
- $\backslash tfrac\{3\}\{4\}>\backslash tfrac\{2\}\{4\}$ because 3>2.
If two positive fractions have the same numerator, then the fraction with the smaller denominator is the larger number. When a whole is divided into equal pieces, if fewer equal pieces are needed to make up the whole, then each piece must be larger. When two positive fractions have the same numerator, they represent the same number of parts, but in the fraction with the smaller denominator, the parts are larger.
One way to compare fractions with different numerators and denominators is to find a common denominator. To compare $\backslash tfrac\{a\}\{b\}$ and $\backslash tfrac\{c\}\{d\}$, these are converted to $\backslash tfrac\{ad\}\{bd\}$ and $\backslash tfrac\{bc\}\{bd\}$. Then bd is a common denominator and the numerators ad and bc can be compared.
- $\backslash tfrac\{2\}\{3\}$ ? $\backslash tfrac\{1\}\{2\}$ gives $\backslash tfrac\{4\}\{6\}>\backslash tfrac\{3\}\{6\}$
It is not necessary to determine the value of the common denominator to compare fractions. This short cut is known as "cross multiplying" – you can just compare ad and bc, without computing the denominator.
- $\backslash tfrac\{5\}\{18\}$ ? $\backslash tfrac\{4\}\{17\}$
Multiply top and bottom of each fraction by the denominator of the other fraction, to get a common denominator:
- $\backslash tfrac\{5\; \backslash times\; 17\}\{18\; \backslash times\; 17\}$ ? $\backslash tfrac\{4\; \backslash times\; 18\}\{17\; \backslash times\; 18\}$
The denominators are now the same, but it is not necessary to calculate their value – only the numerators need to be compared. Since 5×17 (= 85) is greater than 4×18 (= 72), $\backslash tfrac\{5\}\{18\}>\backslash tfrac\{4\}\{17\}$.
Also note that every negative number, including negative fractions, is less than zero, and every positive number, including positive fractions, is greater than zero, so every negative fraction is less than any positive fraction.
Addition
The first rule of addition is that only like quantities can be added; for example, various quantities of quarters. Unlike quantities, such as adding thirds to quarters, must first be converted to like quantities as described below:
Imagine a pocket containing two quarters, and another pocket containing three quarters; in total, there are five quarters. Since four quarters is equivalent to one (dollar), this can be represented as follows:
- $\backslash tfrac24+\backslash tfrac34=\backslash tfrac54=1\backslash tfrac14$.
Adding unlike quantities
To add fractions containing unlike quantities (e.g. quarters and thirds), it is necessary to convert all amounts to like quantities. It is easy to work out the chosen type of fraction to convert to; simply multiply together the two denominators (bottom number) of each fraction.
For adding quarters to thirds, both types of fraction are converted to twelfths, thus: $\backslash tfrac14\backslash \; +\; \backslash tfrac13=\backslash tfrac\{1*3\}\{4*3\}\backslash \; +\; \backslash tfrac\{1*4\}\{3*4\}=\backslash tfrac3\{12\}\backslash \; +\; \backslash tfrac4\{12\}=\backslash tfrac7\{12\}$.
Consider adding the following two quantities:
- $\backslash tfrac35+\backslash tfrac23$
First, convert $\backslash tfrac35$ into fifteenths by multiplying both the numerator and denominator by three: $\backslash tfrac35\backslash times\backslash tfrac33=\backslash tfrac9\{15\}$. Since $\backslash tfrac33$ equals 1, multiplication by $\backslash tfrac33$ does not change the value of the fraction.
Second, convert $\backslash tfrac23$ into fifteenths by multiplying both the numerator and denominator by five: $\backslash tfrac23\backslash times\backslash tfrac55=\backslash tfrac\{10\}\{15\}$.
Now it can be seen that:
- $\backslash tfrac35+\backslash tfrac23$
is equivalent to:
- $\backslash tfrac9\{15\}+\backslash tfrac\{10\}\{15\}=\backslash tfrac\{19\}\{15\}=1\backslash tfrac4\{15\}$
This method can be expressed algebraically:
- $\backslash tfrac\{a\}\{b\}\; +\; \backslash tfrac\; \{c\}\{d\}\; =\; \backslash tfrac\{ad+cb\}\{bd\}$
And for expressions consisting of the addition of three fractions:
- $\backslash tfrac\{a\}\{b\}\; +\; \backslash tfrac\; \{c\}\{d\}\; +\; \backslash tfrac\{e\}\{f\}\; =\; \backslash tfrac\{a(df)+c(bf)+e(bd)\}\{bdf\}$
This method always works, but sometimes there is a smaller denominator that can be used (a least common denominator). For example, to add $\backslash tfrac\{3\}\{4\}$ and $\backslash tfrac\{5\}\{12\}$ the denominator 48 can be used (the product of 4 and 12), but the smaller denominator 12 may also be used, being the least common multiple of 4 and 12.
- $\backslash tfrac34+\backslash tfrac\{5\}\{12\}=\backslash tfrac\{9\}\{12\}+\backslash tfrac\{5\}\{12\}=\backslash tfrac\{14\}\{12\}=\backslash tfrac76=1\backslash tfrac16$
Subtraction
The process for subtracting fractions is, in essence, the same as that of adding them: find a common denominator, and change each fraction to an equivalent fraction with the chosen common denominator. The resulting fraction will have that denominator, and its numerator will be the result of subtracting the numerators of the original fractions. For instance,
- $\backslash tfrac23-\backslash tfrac12=\backslash tfrac46-\backslash tfrac36=\backslash tfrac16$
Multiplication
Multiplying a fraction by another fraction
To multiply fractions, multiply the numerators and multiply the denominators. Thus:
- $\backslash tfrac\{2\}\{3\}\; \backslash times\; \backslash tfrac\{3\}\{4\}\; =\; \backslash tfrac\{6\}\{12\}$
Why does this work? First, consider one third of one quarter. Using the example of a cake, if three small slices of equal size make up a quarter, and four quarters make up a whole, twelve of these small, equal slices make up a whole. Therefore a third of a quarter is a twelfth. Now consider the numerators. The first fraction, two thirds, is twice as large as one third. Since one third of a quarter is one twelfth, two thirds of a quarter is two twelfth. The second fraction, three quarters, is three times as large as one quarter, so two thirds of three quarters is three times as large as two thirds of one quarter. Thus two thirds times three quarters is six twelfths.
A short cut for multiplying fractions is called "cancellation". In effect, we reduce the answer to lowest terms during multiplication. For example:
- $\backslash tfrac\{2\}\{3\}\; \backslash times\; \backslash tfrac\{3\}\{4\}\; =\; \backslash tfrac\{\backslash cancel\{2\}\; ^\{~1\}\}\{\backslash cancel\{3\}\; ^\{~1\}\}\; \backslash times\; \backslash tfrac\{\backslash cancel\{3\}\; ^\{~1\}\}\{\backslash cancel\{4\}\; ^\{~2\}\}\; =\; \backslash tfrac\{1\}\{1\}\; \backslash times\; \backslash tfrac\{1\}\{2\}\; =\; \backslash tfrac\{1\}\{2\}$
A two is a common factor in both the numerator of the left fraction and the denominator of the right and is divided out of both. Three is a common factor of the left denominator and right numerator and is divided out of both.
Multiplying a fraction by a whole number
Place the whole number over one and multiply.
- $6\; \backslash times\; \backslash tfrac\{3\}\{4\}\; =\; \backslash tfrac\{6\}\{1\}\; \backslash times\; \backslash tfrac\{3\}\{4\}\; =\; \backslash tfrac\{18\}\{4\}$
This method works because the fraction 6/1 means six equal parts, each one of which is a whole.
Mixed numbers
When multiplying mixed numbers, it's best to convert the mixed number into an improper fraction. For example:
- $3\; \backslash times\; 2\backslash tfrac\{3\}\{4\}\; =\; 3\; \backslash times\; \backslash left\; (\backslash tfrac\{8\}\{4\}\; +\; \backslash tfrac\{3\}\{4\}\; \backslash right\; )\; =\; 3\; \backslash times\; \backslash tfrac\{11\}\{4\}\; =\; \backslash tfrac\{33\}\{4\}\; =\; 8\backslash tfrac\{1\}\{4\}$
In other words, $2\backslash tfrac\{3\}\{4\}$ is the same as $\backslash tfrac\{8\}\{4\}\; +\; \backslash tfrac\{3\}\{4\}$, making 11 quarters in total (because 2 cakes, each split into quarters makes 8 quarters total) and 33 quarters is $8\backslash tfrac\{1\}\{4\}$, since 8 cakes, each made of quarters, is 32 quarters in total.
Division
To divide a fraction by a whole number, you may either divide the numerator by the number, if it goes evenly into the numerator, or multiply the denominator by the number. For example, $\backslash tfrac\{10\}\{3\}\; \backslash div\; 5$ equals $\backslash tfrac\{2\}\{3\}$ and also equals $\backslash tfrac\{10\}\{3\; \backslash cdot\; 5\}\; =\; \backslash tfrac\{10\}\{15\}$, which reduces to $\backslash tfrac\{2\}\{3\}$. To divide a number by a fraction, multiply that number by the reciprocal of that fraction. Thus, $\backslash tfrac\{1\}\{2\}\; \backslash div\; \backslash tfrac\{3\}\{4\}\; =\; \backslash tfrac\{1\}\{2\}\; \backslash times\; \backslash tfrac\{4\}\{3\}\; =\; \backslash tfrac\{1\; \backslash cdot\; 4\}\{2\; \backslash cdot\; 3\}\; =\; \backslash tfrac\{2\}\{3\}$.
Converting between decimals and fractions
To change a common fraction to a decimal, divide the denominator into the numerator. Round the answer to the desired accuracy. For example, to change 1/4 to a decimal, divide 4 into 1.00, to obtain 0.25. To change 1/3 to a decimal, divide 3 into 1.0000..., and stop when the desired accuracy is obtained. Note that 1/4 can be written exactly with two decimal digits, while 1/3 cannot be written exactly with any finite number of decimal digits.
To change a decimal to a fraction, write in the denominator a 1 followed by as many zeroes as there are digits to the right of the decimal point, and write in the numerator all the digits in the original decimal, omitting the decimal point. Thus 12.3456 = 123456/10000.
Converting repeating decimals to fractions
Decimal numbers, while arguably more useful to work with when performing calculations, sometimes lack the precision that common fractions have. Sometimes an infinite number of repeating decimals is required to convey the same kind of precision. Thus, it is often useful to convert repeating decimals into fractions.
The preferred way to indicate a repeating decimal is to place a bar over the digits that repeat, for example 0.789 = 0.789789789… For repeating patterns where the repeating pattern begins immediately after the decimal point, a simple division of the pattern by the same number of nines as numbers it has will suffice. For example:
- 0.5 = 5/9
- 0.62 = 62/99
- 0.264 = 264/999
- 0.6291 = 6291/9999
In case leading zeros precede the pattern, the nines are suffixed by the same number of trailing zeros:
- 0.05 = 5/90
- 0.000392 = 392/999000
- 0.0012 = 12/9900
In case a non-repeating set of decimals precede the pattern (such as 0.1523987), we can write it as the sum of the non-repeating and repeating parts, respectively:
- 0.1523 + 0.0000987
Then, convert the repeating part to a fraction:
- 0.1523 + 987/9990000
Fractions in abstract mathematics
In addition to being of great practical importance, fractions are also studied by mathematicians, who check that the rules for fractions given above are consistent and reliable. Mathematicians define a fraction as an ordered pair (a, b) of integers a and b ≠ 0, for which the operations addition, subtraction, multiplication, and division are defined as follows:^{[9]}
- $(a,b)\; +\; (c,d)\; =\; (ad+bc,bd)\; \backslash ,$
- $(a,b)\; -\; (c,d)\; =\; (ad-bc,bd)\; \backslash ,$
- $(a,b)\; \backslash cdot\; (c,d)\; =\; (ac,bd)$
- $(a,b)\; \backslash div\; (c,d)\; =\; (ad,bc)$ (when c ≠ 0)
In addition, an equivalence relation is specified as follows: $(a,\; b)$ ~ $(c,\; d)$ if and only if $ad=bc$.
These definitions agree in every case with the definitions given above; only the notation is different.
More generally, a and b may be elements of any integral domain R, in which case a fraction is an element of the field of fractions of R. For example, when a and b are polynomials in one indeterminate, the field of fractions is the field of rational fractions (also known as the field of rational functions). When a and b are integers, the field of fractions is the field of rational numbers.
Algebraic fractions
An algebraic fraction is the indicated quotient of two algebraic expressions. Two examples of algebraic fractions are $\backslash frac\{3x\}\{x^2+2x-3\}$ and $\backslash frac\{\backslash sqrt\{x+2\}\}\{x^2-3\}$. Algebraic fractions are subject to the same laws as arithmetic fractions.
If the numerator and the denominator are polynomials, as in $\backslash frac\{3x\}\{x^2+2x-3\}$, the algebraic fraction is called a rational fraction (or rational expression). An irrational fraction is one that contains the variable under a fractional exponent or root, as in $\backslash frac\{\backslash sqrt\{x+2\}\}\{x^2-3\}$.
The terminology used to describe algebraic fractions is similar to that used for ordinary fractions. For example, an algebraic fraction is in lowest terms if the only factors common to the numerator and the denominator are 1 and –1. An algebraic fraction whose numerator or denominator, or both, contain a fraction, such as $\backslash frac\{1\; +\; \backslash tfrac\{1\}\{x\}\}\{1\; -\; \backslash tfrac\{1\}\{x\}\}$, is called a complex fraction.
Rational numbers are the quotient field of integers. Rational expressions are the quotient field of the polynomials (over some integral domain). Since a coefficient is a polynomial of degree zero, a radical expression such as √2/2 is a rational fraction. Another example (over the reals) is $\backslash textstyle\{\backslash tfrac\{\backslash pi\}\{2\}\}$, the radian measure of a right angle.
The term partial fraction is used when decomposing rational expressions into sums. The goal is to write the rational expression as the sum of other rational expressions with denominators of lesser degree. For example, the rational expression $\backslash textstyle\{2x\; \backslash over\; x^2-1\}$ can be rewritten as the sum of two fractions: $\backslash textstyle\{1\; \backslash over\; x+1\}$ + $\backslash textstyle\{1\; \backslash over\; x-1\}$. This is useful in many areas such as integral calculus and differential equations.
Radical expressions
A fraction may also contain radicals in the numerator and/or the denominator. If the denominator contains radicals, it can be helpful to rationalize it (compare Simplified form of a radical expression), especially if further operations, such as adding or comparing that fraction to another, are to be carried out. It is also more convenient if division is to be done manually. When the denominator is a monomial square root, it can be rationalized by multiplying both the top and the bottom of the fraction by the denominator:
- $\backslash frac\{3\}\{\backslash sqrt\{7\}\}\; =\; \backslash frac\{3\}\{\backslash sqrt\{7\}\}\; \backslash cdot\; \backslash frac\{\backslash sqrt\{7\}\}\{\backslash sqrt\{7\}\}\; =\; \backslash frac\{3\backslash sqrt\{7\}\}\{7\}$
The process of rationalization of binomial denominators involves multiplying the top and the bottom of a fraction by the conjugate of the denominator so that the denominator becomes a rational number. For example:
- $\backslash frac\{3\}\{3-2\backslash sqrt\{5\}\}\; =\; \backslash frac\{3\}\{3-2\backslash sqrt\{5\}\}\; \backslash cdot\; \backslash frac\{3+2\backslash sqrt\{5\}\}\{3+2\backslash sqrt\{5\}\}\; =\; \backslash frac\{3(3+2\backslash sqrt\{5\})\}\; =\; \backslash frac\{3\}\{3+2\backslash sqrt\{5\}\}\; \backslash cdot\; \backslash frac\{3-2\backslash sqrt\{5\}\}\{3-2\backslash sqrt\{5\}\}\; =\; \backslash frac\{3(3-2\backslash sqrt\{5\})\}\{\{3\}^2\; -\; (2\backslash sqrt\{5\})^2\}\; =\; \backslash frac\{\; 3\; (3\; -\; 2\backslash sqrt\{5\}\; )\; \}\{\; 9\; -\; 20\; \}\; =\; -\; \backslash frac\{\; 9-6\; \backslash sqrt\{5\}\; \}\{11\}$
Even if this process results in the numerator being irrational, like in the examples above, the process may still facilitate subsequent manipulations by reducing the number of irrationals one has to work with in the denominator.
Typographical variations
In computer displays and typography, simple fractions are sometimes printed as a single character, e.g. ½ (one half). See the article on Number Forms for information on doing this in Unicode.
Scientific publishing distinguishes four ways to set fractions, together with guidelines on use:^{[10]}
- special fractions: fractions that are presented as a single character with a slanted bar, with roughly the same height and width as other characters in the text. Generally used for simple fractions, such as: ½, ⅓, ⅔, ¼, and ¾. Since the numerals are smaller, legibility can be an issue, especially for small-sized fonts. These are not used in modern mathematical notation, but in other contexts.
- case fractions: similar to special fractions, these are rendered as a single typographical character, but with a horizontal bar, thus making them upright. An example would be $\backslash tfrac\{1\}\{2\}$, but rendered with the same height as other characters. Some sources include all rendering of fractions as case fractions if they take only one typographical space, regardless of the direction of the bar.^{[11]}
- shilling fractions: 1/2, so called because this notation was used for pre-decimal British currency (£sd), as in 2/6 for a half crown, meaning two shillings and six pence. While the notation "two shillings and six pence" did not represent a fraction, the forward slash is now used in fractions, especially for fractions inline with prose (rather than displayed), to avoid uneven lines. It is also used for fractions within fractions (complex fractions) or within exponents to increase legibility. Fractions written this way, also known as piece fractions,^{[12]} are written all on one typographical line, but take 3 or more typographical spaces.
- built-up fractions: $\backslash frac\{1\}\{2\}$. This notation uses two or more lines of ordinary text, and results in a variation in spacing between lines when included within other text. While large and legible, these can be disruptive, particularly for simple fractions or within complex fractions.
History
The earliest fractions were reciprocals of integers: ancient symbols representing one part of two, one part of three, one part of four, and so on.^{[13]} The Egyptians used Egyptian fractions ca. 1000 BC. About 4,000 years ago Egyptians divided with fractions using slightly different methods. They used least common multiples with unit fractions. Their methods gave the same answer as modern methods.^{[14]} The Egyptians also had a different notation for dyadic fractions in the Akhmim Wooden Tablet and several Rhind Mathematical Papyrus problems.
The Greeks used unit fractions and later continued fractions and followers of the Greek philosopher Pythagoras, ca. 530 BC, discovered that the square root of two cannot be expressed as a fraction. In 150 BC Jain mathematicians in India wrote the "Sthananga Sutra", which contains work on the theory of numbers, arithmetical operations, operations with fractions.
The method of putting one number below the other and computing fractions first appeared in Aryabhatta's work around 499 CE.
In Sanskrit literature, fractions, or rational numbers were always expressed by an integer followed by a fraction. When the integer is written on a line, the fraction is placed below it and is itself written on two lines, the numerator called amsa part on the first line, the denominator called cheda “divisor” on the second below. If the fraction is written without any particular additional sign, one understands that it is added to the integer above it. If it is marked by a small circle or a cross (the shape of the “plus” sign in the West) placed on its right, one understands that it is subtracted from the integer. For example (to be read vertically),
Bhaskara I writes^{[15]}
- ६ १ २
- १ १ १_{०}
- ४ ५ ९
That is,
- 6 1 2
- 1 1 1_{०}
- 4 5 9
to denote 6+1/4, 1+1/5, and 2–1/9.
Al-Hassār, a Muslim mathematician from Fez, Morocco specializing in Islamic inheritance jurisprudence during the 12th century, first mentions the use of a fractional bar, where numerators and denominators are separated by a horizontal bar. In his discussion he writes, "... for example, if you are told to write three-fifths and a third of a fifth, write thus, $\backslash frac\{3\; \backslash quad\; 1\}\{5\; \backslash quad\; 3\}$."^{[16]}
This same fractional notation appears soon after in the work of Leonardo Fibonacci in the 13th century.^{[17]}
In discussing the origins of decimal fractions, Dirk Jan Struik states:^{[18]}
"The introduction of decimal fractions as a common computational practice can be dated back to the Flemish pamphlet De Thiende, published at Leyden in 1585, together with a French translation, La Disme, by the Flemish mathematician Simon Stevin (1548-1620), then settled in the Northern Netherlands. It is true that decimal fractions were used by the Chinese many centuries before Stevin and that the Persian astronomer Al-Kāshī used both decimal and sexagesimal fractions with great ease in his Key to arithmetic (Samarkand, early fifteenth century)."^{[19]}
While the Persian mathematician Jamshīd al-Kāshī claimed to have discovered decimal fractions himself in the 15th century, J. Lennart Berggren notes that he was mistaken, as decimal fractions were first used five centuries before him by the Baghdadi mathematician Abu'l-Hasan al-Uqlidisi as early as the 10th century.^{[20]}^{[21]}
In formal education
Pedagogical tools
In primary schools, fractions have been demonstrated through Cuisenaire rods, fraction bars, fraction strips, fraction circles, paper (for folding or cutting), pattern blocks, pie-shaped pieces, plastic rectangles, grid paper, dot paper, geoboards, counters and computer software.
Documents for teachers
Several states in the United States have adopted learning trajectories from the Common Core State Standards Initiative's guidelines for mathematics education. Aside from sequencing the learning of fractions and operations with fractions, the document provides the following definition of a fraction: "A number expressible in the form $\backslash tfrac\{a\}\{b\}$ where $a$ is a whole number and $b$ is a positive whole number. (The word fraction in the standards always refers to a non-negative number.)"^{[22]}
The document itself also refers to negative fractions.
See also
References
External links
fi:Jaollisuus
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