Rule of product

The elements of the set {A, B} can combine with the elements of the set {1, 2, 3} in six different ways.

In combinatorics, the rule of product or multiplication principle is a basic counting principle (a.k.a. the fundamental principle of counting). Stated simply, it is the intuitive idea that if there are a ways of doing something and b ways of doing another thing, then there are a · b ways of performing both actions.^[1]^[2]

Examples[edit]

{\begin{matrix}&\underbrace {\left\{A,B,C\right\}} &&\underbrace {\left\{X,Y\right\}} \\\mathrm {To} \ \mathrm {choose} \ \mathrm {one} \ \mathrm {of} &\mathrm {these} &\mathrm {AND} \ \mathrm {one} \ \mathrm {of} &\mathrm {these} \end{matrix}}

{\begin{matrix}\mathrm {is} \ \mathrm {to} \ \mathrm {choose} \ \mathrm {one} \ \mathrm {of} &\mathrm {these} .\\&\overbrace {\left\{AX,AY,BX,BY,CX,CY\right\}} \end{matrix}}

In this example, the rule says: multiply 3 by 2, getting 6.

The sets {A, B, C} and {X, Y} in this example are disjoint sets, but that is not necessary. The number of ways to choose a member of {A, B, C}, and then to do so again, in effect choosing an ordered pair each of whose components are in {A, B, C}, is 3 × 3 = 9.

As another example, when you decide to order pizza, you must first choose the type of crust: thin or deep dish (2 choices). Next, you choose one topping: cheese, pepperoni, or sausage (3 choices).

Using the rule of product, you know that there are 2 × 3 = 6 possible combinations of ordering a pizza.

Applications[edit]

In set theory, this multiplication principle is often taken to be the definition of the product of cardinal numbers.^[1] We have

|S_{1}|\cdot |S_{2}|\cdots |S_{n}|=|S_{1}\times S_{2}\times \cdots \times S_{n}|

where $\times$ is the Cartesian product operator. These sets need not be finite, nor is it necessary to have only finitely many factors in the product.

An extension of the rule of product considers there are $n$ different types of objects, say sweets, to be associated with $k$ objects, say people. How many different ways can the people receive their sweets?

Each person may receive any of the $n$ sweets available, and there are $k$ people, so there are $\overbrace {n\cdots \cdot n} ^{k}=n^{k}$ ways to do this.

Related concepts[edit]

The rule of sum is another basic counting principle. Stated simply, it is the idea that if we have a ways of doing something and b ways of doing another thing and we can not do both at the same time, then there are a + b ways to choose one of the actions.^[3]

References[edit]

^ ^a ^b Johnston, William, and Alex McAllister. A transition to advanced mathematics. Oxford Univ. Press, 2009. Section 5.1
^ "College Algebra Tutorial 55: Fundamental Counting Principle". Retrieved December 20, 2014.
^ Rosen, Kenneth H., ed. Handbook of discrete and combinatorial mathematics. CRC pres, 1999.

[transition-1] Johnston, William, and Alex McAllister. A transition to advanced mathematics. Oxford Univ. Press, 2009. Section 5.1

[2] "College Algebra Tutorial 55: Fundamental Counting Principle". Retrieved December 20, 2014.

[3] Rosen, Kenneth H., ed. Handbook of discrete and combinatorial mathematics. CRC pres, 1999.

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