Multiplication (often denoted by the cross symbol "×") is the mathematical operation of scaling one number by another. It is one of the four basic operations in elementary arithmetic (the others being addition, subtraction and division).
Because the result of scaling by whole numbers can be thought of as consisting of some number of copies of the original, wholenumber products greater than 1 can be computed by repeated addition; for example, 3 multiplied by 4 (often said as "3 times 4") can be calculated by adding 4 copies of 3 together:
 $3\; \backslash times\; 4\; =\; 3\; +\; 3\; +\; 3\; +\; 3\; =\; 12.\backslash !\backslash ,$
Here 3 and 4 are the "factors" and 12 is the "product".
Educators differ as to which number should normally be considered as the number of copies, and whether multiplication should even be introduced as repeated addition.^{[1]} For example 3 multiplied by 4 can also be calculated by adding 3 copies of 4 together:
 $3\; \backslash times\; 4\; =\; 4\; +\; 4\; +\; 4\; =\; 12.\backslash !\backslash ,$
Multiplication of rational numbers (fractions) and real numbers is defined by systematic generalization of this basic idea.
Multiplication can also be visualized as counting objects arranged in a rectangle (for whole numbers) or as finding the area of a rectangle whose sides have given lengths (for numbers generally). The area of a rectangle does not depend on which side you measure first, which illustrates that the order numbers are multiplied together in doesn't matter.
In general the result of multiplying two measurements gives a result of a new type depending on the measurements. For instance:
 $2.5\; \backslash mbox\{\; meters\}\; \backslash times\; 4.5\; \backslash mbox\{\; meters\}\; =\; 11.25\; \backslash mbox\{\; square\; meters\},\backslash !\backslash ,$
 $11\; \backslash mbox\{\; meters/second\}\; \backslash times\; 9\; \backslash mbox\{\; seconds\}\; =\; 99\; \backslash mbox\{\; meters\}.\backslash !\backslash ,$
The inverse operation of multiplication is division. For example, 4 multiplied by 3 equals 12. Then 12 divided by 3 equals 4. Multiplication by 3, followed by division by 3, yields the original number.
Multiplication is also defined for other types of numbers (such as complex numbers), and for more abstract constructs such as matrices. For these more abstract constructs, the order that the operands are multiplied in sometimes does matter.
Notation and terminology
Multiplication is often written using the multiplication sign "×" between the terms; that is, in infix notation. The result is expressed with an equals sign. For example,
 $2\backslash times\; 3\; =\; 6$ (verbally, "two times three equals six")
 $3\backslash times\; 4\; =\; 12$
 $2\backslash times\; 3\backslash times\; 5\; =\; 6\backslash times\; 5\; =\; 30$
 $2\backslash times\; 2\backslash times\; 2\backslash times\; 2\backslash times\; 2\; =\; 32$
There are several other common notations for multiplication. Many of these are intended to reduce confusion between the multiplication sign × and the commonly used variable x:
 $5\; \backslash cdot\; 2\; \backslash quad\backslash text\{or\}\backslash quad\; 5\backslash ,.\backslash ,2$
 The middle dot is standard in the United States, the United Kingdom, and other countries where the period is used as a decimal point. In other countries that use a comma as a decimal point, either the period or a middle dot is used for multiplication. Internationally, the middle dot is commonly connotated with a more advanced or scientific use.
 In algebra, multiplication involving variables is often written as a juxtaposition (e.g., xy for x times y or 5x for five times x). This notation can also be used for quantities that are surrounded by parentheses (e.g., 5(2) or (5)(2) for five times two).
 In matrix multiplication, there is actually a distinction between the cross and the dot symbols. The cross symbol generally denotes a vector multiplication, while the dot denotes a scalar multiplication. A similar convention distinguishes between the cross product and the dot product of two vectors.
The numbers to be multiplied are generally called the "factors" or "multiplicands". When thinking of multiplication as repeated addition, the number to be multiplied is called the "multiplicand", while the number of multiples is called the "multiplier". In algebra, a number that is the multiplier of a variable or expression (e.g., the 3 in 3xy^{2}) is called a coefficient.
The result of a multiplication is called a product, and is a multiple of each factor if the other factor is an integer. For example, 15 is the product of 3 and 5, and is both a multiple of 3 and a multiple of 5.
Computation
The common methods for multiplying numbers using pencil and paper require a multiplication table of memorized or consulted products of small numbers (typically any two numbers from 0 to 9), however one method, the peasant multiplication algorithm, does not.
Multiplying numbers to more than a couple of decimal places by hand is tedious and error prone. Common logarithms were invented to simplify such calculations. The slide rule allowed numbers to be quickly multiplied to about three places of accuracy. Beginning in the early twentieth century, mechanical calculators, such as the Marchant, automated multiplication of up to 10 digit numbers. Modern electronic computers and calculators have greatly reduced the need for multiplication by hand.
Historical algorithms
Methods of multiplication were documented in the Egyptian, Greek, Indian and Chinese civilizations.
The Ishango bone, dated to about 18,000 to 20,000 BC, hints at a knowledge of multiplication in the Upper Paleolithic era in Central Africa.
Egyptians
The Egyptian method of multiplication of integers and fractions, documented in the Ahmes Papyrus, was by successive additions and doubling. For instance, to find the product of 13 and 21 one had to double 21 three times, obtaining 1 × 21 = 21, 4 × 21 = 84, 8 × 21 = 168. The full product could then be found by adding the appropriate terms found in the doubling sequence:
 13 × 21 = (1 + 4 + 8) × 21 = (1 × 21) + (4 × 21) + (8 × 21) = 21 + 84 + 168 = 273.
Babylonians
The Babylonians used a sexagesimal positional number system, analogous to the modern day decimal system. Thus, Babylonian multiplication was very similar to modern decimal multiplication. Because of the relative difficulty of remembering 60 × 60 different products, Babylonian mathematicians employed multiplication tables. These tables consisted of a list of the first twenty multiples of a certain principal number n: n, 2n, ..., 20n; followed by the multiples of 10n: 30n 40n, and 50n. Then to compute any sexagesimal product, say 53n, one only needed to add 50n and 3n computed from the table.
Chinese
In the mathematical text Zhou Bi Suan Jing, dated prior to 300 BC, and the Nine Chapters on the Mathematical Art, multiplication calculations were written out in words, although the early Chinese mathematicians employed Rod calculus involving place value addition, subtraction, multiplication and division. These place value decimal arithmetic algorithms were introduced by Al Khwarizmi to Arab countries in the early 9th century.
Modern method
The modern method of multiplication based on the Hindu–Arabic numeral system was first described by Brahmagupta. Brahmagupta gave rules for addition, subtraction, multiplication and division. Henry Burchard Fine, then professor of Mathematics at Princeton University, wrote the following:
 The Indians are the inventors not only of the positional decimal system itself, but of most of the processes involved in elementary reckoning with the system. Addition and subtraction they performed quite as they are performed nowadays; multiplication they effected in many ways, ours among them, but division they did cumbrously.^{[2]}
Computer algorithms
The standard method of multiplying two ndigit numbers requires n^{2} simple multiplications. Multiplication algorithms have been designed that reduce the computation time considerably when multiplying large numbers. In particular for very large numbers methods based on the Discrete Fourier Transform can reduce the number of simple multiplications to the order of n log_{2}(n).
Products of measurements
When two measurements are multiplied together the product is of a type depending on the types of the measurements. The general theory is given by dimensional analysis. This analysis is routinely applied in physics but has also found applications in finance. One can only meaningfully add or subtract quantities of the same type but can multiply or divide quantities of different types.
A common example is multiplying speed by time gives distance, so
 50 kilometers per hour × 3 hours = 150 kilometers.
Products of sequences
Capital Pi notation
The product of a sequence of terms can be written with the product symbol, which derives from the capital letter Π (Pi) in the Greek alphabet. Unicode position U+220F (∏) contains a glyph for denoting such a product, distinct from U+03A0 (Π), the letter. The meaning of this notation is given by:
 $\backslash prod\_\{i=m\}^n\; x\_i\; =\; x\_m\; \backslash cdot\; x\_\{m+1\}\; \backslash cdot\; x\_\{m+2\}\; \backslash cdot\; \backslash ,\backslash ,\backslash cdots\backslash ,\backslash ,\; \backslash cdot\; x\_\{n1\}\; \backslash cdot\; x\_n.$
The subscript gives the symbol for a dummy variable (i in this case), called the "index of multiplication" together with its lower bound (m), whereas the superscript (here n) gives its upper bound. The lower and upper bound are expressions denoting integers. The factors of the product are obtained by taking the expression following the product operator, with successive integer values substituted for the index of multiplication, starting from the lower bound and incremented by 1 up to and including the upper bound. So, for example:
 $\backslash prod\_\{i=2\}^6\; \backslash left(1\; +\; \{1\backslash over\; i\}\backslash right)\; =\; \backslash left(1\; +\; \{1\backslash over\; 2\}\backslash right)\; \backslash cdot\; \backslash left(1\; +\; \{1\backslash over\; 3\}\backslash right)\; \backslash cdot\; \backslash left(1\; +\; \{1\backslash over\; 4\}\backslash right)\; \backslash cdot\; \backslash left(1\; +\; \{1\backslash over\; 5\}\backslash right)\; \backslash cdot\; \backslash left(1\; +\; \{1\backslash over\; 6\}\backslash right)\; =\; \{7\backslash over\; 2\}.$
In case m = n, the value of the product is the same as that of the single factor x_{m}. If m > n, the product is the empty product, with the value 1.
Infinite products
One may also consider products of infinitely many terms; these are called infinite products. Notationally, we would replace n above by the lemniscate ∞. The product of such a series is defined as the limit of the product of the first n terms, as n grows without bound. That is, by definition,
 $\backslash prod\_\{i=m\}^\{\backslash infty\}\; x\_\{i\}\; =\; \backslash lim\_\{n\backslash to\backslash infty\}\; \backslash prod\_\{i=m\}^\{n\}\; x\_\{i\}.$
One can similarly replace m with negative infinity, and define:
 $\backslash prod\_\{i=\backslash infty\}^\backslash infty\; x\_i\; =\; \backslash left(\backslash lim\_\{m\backslash to\backslash infty\}\backslash prod\_\{i=m\}^0\; x\_i\backslash right)\; \backslash cdot\; \backslash left(\backslash lim\_\{n\backslash to\backslash infty\}\backslash prod\_\{i=1\}^n\; x\_i\backslash right),$
provided both limits exist.
Properties
For the real and complex numbers, which includes for example natural numbers, integers and fractions, multiplication has certain properties:
 Commutative property
 The order in which two numbers are multiplied does not matter:
 $x\backslash cdot\; y\; =\; y\backslash cdot\; x$.
 Associative property
 Expressions solely involving multiplication or addition are invariant with respect to order of operations:
 $(x\backslash cdot\; y)\backslash cdot\; z\; =\; x\backslash cdot(y\backslash cdot\; z)$
 Distributive property
 Holds with respect to multiplication over addition. This identity is of prime importance in simplifying algebraic expressions:
 $x\backslash cdot(y\; +\; z)\; =\; x\backslash cdot\; y\; +\; x\backslash cdot\; z$
 Identity element
 The multiplicative identity is 1; anything multiplied by one is itself. This is known as the identity property:
 $x\backslash cdot\; 1\; =\; x$
 Zero element
 Any number multiplied by zero is zero. This is known as the zero property of multiplication:
 $x\backslash cdot\; 0\; =\; 0$
 Zero is sometimes not included amongst the natural numbers.
There are a number of further properties of multiplication not satisfied by all types of numbers.
 Negation
 Negative one times any number is equal to the additive inverse of that number.
 $(1)\backslash cdot\; x\; =\; (x)$
 Negative one times negative one is positive one.
 $(1)\backslash cdot\; (1)\; =\; 1$
 The natural numbers do not include negative numbers.
 Inverse element
 Every number x, except zero, has a multiplicative inverse, $\backslash frac\{1\}\{x\}$, such that $x\backslash cdot\backslash left(\backslash frac\{1\}\{x\}\backslash right)\; =\; 1$.
 Order preservation
 Multiplication by a positive number preserves order:
 if a > 0, then if b > c then ab > ac.
 Multiplication by a negative number reverses order:
 if a < 0 and b > c then ab < ac.
 The complex numbers do not have an order predicate.
Other mathematical systems that include a multiplication operation may not have all these properties. For example, multiplication is not, in general, commutative for matrices and quaternions.
Axioms
Main article:
Peano axioms
In the book Arithmetices principia, nova methodo exposita, Giuseppe Peano proposed axioms for arithmetic based on his axioms for natural numbers.^{[3]} Peano arithmetic has two axioms for multiplication:
 $x\; \backslash times\; 0\; =\; 0$
 $x\; \backslash times\; S(y)\; =\; (x\; \backslash times\; y)\; +\; x$
Here S(y) represents the successor of y, or the natural number that follows y. The various properties like associativity can be proved from these and the other axioms of Peano arithmetic including induction. For instance S(0). denoted by 1, is a multiplicative identity because
 $x\; \backslash times\; 1\; =\; x\; \backslash times\; S(0)\; =\; (x\; \backslash times\; 0)\; +\; x\; =\; 0\; +\; x\; =\; x$
The axioms for integers typically define them as equivalence classes of ordered pairs of natural numbers. The model is based on treating (x,y) as equivalent to x−y when x and y are treated as integers. Thus both (0,1) and (1,2) are equivalent to −1. The multiplication axiom for integers defined this way is
 $(x\_p,\backslash ,\; x\_m)\; \backslash times\; (y\_p,\backslash ,\; y\_m)\; =\; (x\_p\; \backslash times\; y\_p\; +\; x\_m\; \backslash times\; y\_m,\backslash ;\; x\_p\; \backslash times\; y\_m\; +\; x\_m\; \backslash times\; y\_p)$
The rule that −1 × −1 = 1 can then be deduced from
 $(0,\; 1)\; \backslash times\; (0,\; 1)\; =\; (0\; \backslash times\; 0\; +\; 1\; \backslash times\; 1,\backslash ,\; 0\; \backslash times\; 1\; +\; 1\; \backslash times\; 0)\; =\; (1,0)$
Multiplication is extended in a similar way to rational numbers and then to real numbers.
Multiplication with set theory
It is possible, though difficult, to create a recursive definition of multiplication with set theory. Such a system usually relies on the Peano definition of multiplication.
Cartesian product
The definition of multiplication as repeated addition provides a way to arrive at a settheoretic interpretation of multiplication of cardinal numbers. In the expression
 $\backslash displaystyle\; n\; \backslash cdot\; a\; =\; \backslash underbrace\{a\; +\; \backslash cdots\; +\; a\}\_\{n\},$
if the n copies of a are to be combined in disjoint union then clearly they must be made disjoint; an obvious way to do this is to use either a or n as the indexing set for the other. Then, the members of $n\; \backslash cdot\; a\backslash ,$ are exactly those of the Cartesian product $n\; \backslash times\; a\backslash ,$. The properties of the multiplicative operation as applying to natural numbers then follow trivially from the corresponding properties of the Cartesian product.
Multiplication in group theory
There are many sets that, under the operation of multiplication, satisfy the axioms that define group structure. These axioms are closure, associativity, and the inclusion of an identity element and inverses.
A simple example is the set of nonzero rational numbers. Here we have identity 1, as opposed to groups under addition where the identity is typically 0. Note that with the rationals, we must exclude zero because, under multiplication, it does not have an inverse: there is no rational number that can be multiplied by zero to result in 1. In this example we have an abelian group, but that is not always the case.
To see this, look at the set of invertible square matrices of a given dimension, over a given field. Now it is straightforward to verify closure, associativity, and inclusion of identity (the identity matrix) and inverses. However, matrix multiplication is not commutative, therefore this group is nonabelian.
Another fact of note is that the integers under multiplication is not a group, even if we exclude zero. This is easily seen by the nonexistence of an inverse for all elements other than 1 and 1.
Multiplication in group theory is typically notated either by a dot, or by juxtaposition (the omission of an operation symbol between elements). So multiplying element a by element b could be notated a $\backslash cdot$ b or ab. When referring to a group via the indication of the set and operation, the dot is used, e.g., our first example could be indicated by $\backslash left(\; \backslash mathbb\{Q\}\backslash smallsetminus\; \backslash \{\; 0\; \backslash \}\; ,\backslash cdot\; \backslash right)$
Multiplication of different kinds of numbers
Numbers can count (3 apples), order (the 3rd apple), or measure (3.5 feet high); as the history of mathematics has progressed from counting on our fingers to modelling quantum mechanics, multiplication has been generalized to more complicated and abstract types of numbers, and to things that are not numbers (such as matrices) or do not look much like numbers (such as quaternions).
 Integers
 $N\backslash times\; M$ is the sum of M copies of N when N and M are positive whole numbers. This gives the number of things in an array N wide and M high. Generalization to negative numbers can be done by $N\backslash times\; (M)\; =\; (N)\backslash times\; M\; =\; \; (N\backslash times\; M)$ and $(N)\backslash times\; (M)\; =\; N\backslash times\; M$. The same sign rules apply to rational and real numbers.
 Rational numbers
 Generalization to fractions $\backslash frac\{A\}\{B\}\backslash times\; \backslash frac\{C\}\{D\}$ is by multiplying the numerators and denominators respectively: $\backslash frac\{A\}\{B\}\backslash times\; \backslash frac\{C\}\{D\}\; =\; \backslash frac\{(A\backslash times\; C)\}\{(B\backslash times\; D)\}$. This gives the area of a rectangle $\backslash frac\{A\}\{B\}$ high and $\backslash frac\{C\}\{D\}$ wide, and is the same as the number of things in an array when the rational numbers happen to be whole numbers.
 Real numbers
 $(x)(y)$ is the limit of the products of the corresponding terms in certain sequences of rationals that converge to x and y, respectively, and is significant in calculus. This gives the area of a rectangle x high and y wide. See Products of sequences, above.
 Complex numbers
 Considering complex numbers $z\_1$ and $z\_2$ as ordered pairs of real numbers $(a\_1,\; b\_1)$ and $(a\_2,\; b\_2)$, the product $z\_1\backslash times\; z\_2$ is $(a\_1\backslash times\; a\_2\; \; b\_1\backslash times\; b\_2,\; a\_1\backslash times\; b\_2\; +\; a\_2\backslash times\; b\_1)$. This is the same as for reals, $a\_1\backslash times\; a\_2$, when the imaginary parts $b\_1$ and $b\_2$ are zero.
 Further generalizations
 See Multiplication in group theory, above, and Multiplicative Group, which for example includes matrix multiplication. A very general, and abstract, concept of multiplication is as the "multiplicatively denoted" (second) binary operation in a ring. An example of a ring that is not any of the above number systems is a polynomial ring (you can add and multiply polynomials, but polynomials are not numbers in any usual sense.)
 Division
 Often division, $\backslash frac\{x\}\{y\}$, is the same as multiplication by an inverse, $x\backslash left(\backslash frac\{1\}\{y\}\backslash right)$. Multiplication for some types of "numbers" may have corresponding division, without inverses; in an integral domain x may have no inverse "$\backslash frac\{1\}\{x\}$" but $\backslash frac\{x\}\{y\}$ may be defined. In a division ring there are inverses but they are not commutative (since $\backslash left(\backslash frac\{1\}\{x\}\backslash right)\backslash left(\backslash frac\{1\}\{y\}\backslash right)$ is not the same as $\backslash left(\backslash frac\{1\}\{y\}\backslash right)\backslash left(\backslash frac\{1\}\{x\}\backslash right)$, $\backslash frac\{x\}\{y\}$ may be ambiguous).
Exponentiation
Main article:
Exponentiation
When multiplication is repeated, the resulting operation is known as exponentiation. For instance, the product of three factors of two (2×2×2) is "two raised to the third power", and is denoted by 2^{3}, a two with a superscript three. In this example, the number two is the base, and three is the exponent. In general, the exponent (or superscript) indicates how many times to multiply base by itself, so that the expression
 $a^n\; =\; \backslash underbrace\{a\backslash times\; a\; \backslash times\; \backslash cdots\; \backslash times\; a\}\_n$
indicates that the base a to be multiplied by itself n times.
See also
Notes
References
External links
 cuttheknot
 Modern Chinese Multiplication Techniques on an Abacus


   
Multiplication ×
 


sn:Maunga Mhande
This article was sourced from Creative Commons AttributionShareAlike License; additional terms may apply. World Heritage Encyclopedia content is assembled from numerous content providers, Open Access Publishing, and in compliance with The Fair Access to Science and Technology Research Act (FASTR), Wikimedia Foundation, Inc., Public Library of Science, The Encyclopedia of Life, Open Book Publishers (OBP), PubMed, U.S. National Library of Medicine, National Center for Biotechnology Information, U.S. National Library of Medicine, National Institutes of Health (NIH), U.S. Department of Health & Human Services, and USA.gov, which sources content from all federal, state, local, tribal, and territorial government publication portals (.gov, .mil, .edu). Funding for USA.gov and content contributors is made possible from the U.S. Congress, EGovernment Act of 2002.
Crowd sourced content that is contributed to World Heritage Encyclopedia is peer reviewed and edited by our editorial staff to ensure quality scholarly research articles.
By using this site, you agree to the Terms of Use and Privacy Policy. World Heritage Encyclopedia™ is a registered trademark of the World Public Library Association, a nonprofit organization.