Real function

In mathematical analysis, and applications in geometry, applied mathematics, engineering, and natural sciences, a function of a real variable is a function whose domain is the real numbers $\mathbb {R}$ , or a subset of $\mathbb {R}$ that contains an interval of positive length. Most real functions that are considered and studied are differentiable in some interval. The most widely considered such functions are the real functions, which are the real-valued functions of a real variable, that is, the functions of a real variable whose codomain is the set of real numbers.

Nevertheless, the codomain of a function of a real variable may be any set. However, it is often assumed to have a structure of $\mathbb {R}$ -vector space over the reals. That is, the codomain may be a Euclidean space, a coordinate vector, the set of matrices of real numbers of a given size, or an $\mathbb {R}$ -algebra, such as the complex numbers or the quaternions. The structure $\mathbb {R}$ -vector space of the codomain induces a structure of $\mathbb {R}$ -vector space on the functions. If the codomain has a structure of $\mathbb {R}$ -algebra, the same is true for the functions.

The image of a function of a real variable is a curve in the codomain. In this context, a function that defines curve is called a parametric equation of the curve.

When the codomain of a function of a real variable is a finite-dimensional vector space, the function may be viewed as a sequence of real functions. This is often used in applications.

Real function

A real function is a function from a subset of $\mathbb {R}$ to $\mathbb {R} ,$ where $\mathbb {R}$ denotes as usual the set of real numbers. That is, the domain of a real function is a subset $\mathbb {R}$ , and its codomain is $\mathbb {R} .$ It is generally assumed that the domain contains an interval of positive length.

Basic examples

For many commonly used real functions, the domain is the whole set of real numbers, and the function is continuous and differentiable at every point of the domain. One says that these functions are defined, continuous and differentiable everywhere. This is the case of:

All polynomial functions, including constant functions and linear functions
Sine and cosine functions
Exponential function

Some functions are defined everywhere, but not continuous at some points. For example

The Heaviside step function is defined everywhere, but not continuous at zero.

Some functions are defined and continuous everywhere, but not everywhere differentiable. For example

The absolute value is defined and continuous everywhere, and is differentiable everywhere, except for zero.
The cubic root is defined and continuous everywhere, and is differentiable everywhere, except for zero.

Many common functions are not defined everywhere, but are continuous and differentiable everywhere where they are defined. For example:

A rational function is a quotient of two polynomial functions, and is not defined at the zeros of the denominator.
The tangent function is not defined for ${\frac {\pi }{2}}+k\pi ,$ where $k$ is any integer.
The logarithm function is defined only for positive values of the variable.

Some functions are continuous in their whole domain, and not differentiable at some points. This is the case of:

The square root is defined only for nonnegative values of the variable, and not differentiable at 0 (it is differentiable for all positive values of the variable).

General definition

A real-valued function of a real variable is a function that takes as input a real number, commonly represented by the variable x, for producing another real number, the value of the function, commonly denoted f(x). For simplicity, in this article a real-valued function of a real variable will be simply called a function. To avoid any ambiguity, the other types of functions that may occur will be explicitly specified.

Some functions are defined for all real values of the variables (one says that they are everywhere defined), but some other functions are defined only if the value of the variable is taken in a subset X of $\mathbb {R}$ , the domain of the function, which is always supposed to contain an interval of positive length. In other words, a real-valued function of a real variable is a function

f:X\to \mathbb {R}

such that its domain X is a subset of $\mathbb {R}$ that contains an interval of positive length.

A simple example of a function in one variable could be:

f:X\to \mathbb {R}

X=\{x\in \mathbb {R} \,:\,x\geq 0\}

f(x)={\sqrt {x}}

which is the square root of x.

Image

The image of a function $f(x)$ is the set of all values of $f$ when the variable x runs in the whole domain of $f$ . For a continuous (see below for a definition) real-valued function with a connected domain, the image is either an interval or a single value. In the latter case, the function is a constant function.

The preimage of a given real number y is the set of the solutions of the equation y = f(x).

Domain

The domain of a function of several real variables is a subset of $\mathbb {R}$ that is sometimes explicitly defined. In fact, if one restricts the domain X of a function f to a subset Y ⊂ X, one gets formally a different function, the restriction of f to Y, which is denoted f_|Y. In practice, it is often not harmful to identify f and f_|Y, and to omit the subscript _|Y.

Conversely, it is sometimes possible to enlarge naturally the domain of a given function, for example by continuity or by analytic continuation. This means that it is not worthy to explicitly define the domain of a function of a real variable.

Algebraic structure

The arithmetic operations may be applied to the functions in the following way:

For every real number r, the constant function $(x)\mapsto r$ , is everywhere defined.
For every real number r and every function f, the function $rf:(x)\mapsto rf(x)$

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Function
$x \mapsto f (x)$
History of the function concept
Examples of domains and codomains
$X$ → $\mathbb {B}$ , $\mathbb {B}$ → $X$ , $\mathbb {B} ^{n}$ → $X$ $X$ → $\mathbb {Z}$ , $\mathbb {Z}$ → $X$ $X$ → $\mathbb {R}$ , $\mathbb {R}$ → $X$ , $\mathbb {R} ^{n}$ → $X$ $X$ → $\mathbb {C}$ , $\mathbb {C}$ → $X$ , $\mathbb {C} ^{n}$ → $X$
Classes/properties
Constant Identity Linear Polynomial Rational Algebraic Analytic Smooth Continuous Measurable Injective Surjective Bijective
Constructions
Restriction Composition λ Inverse
Generalizations
Binary relation Partial Multivalued Implicit Space
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