Graphs of two linear (polynomial) functions.
The
integral of a function is a linear map from the vector space of integrable functions to the real numbers.
In mathematics, the term linear function refers to two distinct, although related, notions:^{[1]}
Contents

As a polynomial function 1

As a linear map 2

See also 3

Notes 4

References 5

External links 6
As a polynomial function
In calculus, analytic geometry and related areas, a linear function is a polynomial of degree one or less, including the zero polynomial (the latter not being considered to have degree zero).
When the function is of only one variable, it is of the form

f(x)=ax+b,
where a and b are constants, often real numbers. The graph of such a function of one variable is a nonvertical line. a is frequently referred to as the slope of the line, and b as the intercept.
For a function f(x_1, \ldots, x_k) of any finite number of independent variables, the general formula is

f(x_1, \ldots, x_k) = b + a_1 x_1 + \ldots + a_k x_k,
and the graph is a hyperplane of dimension k.
A constant function is also considered linear in this context, as it is a polynomial of degree zero or is the zero polynomial. Its graph, when there is only one independent variable, is a horizontal line.
In this context, the other meaning (a linear map) may be referred to as a homogeneous linear function or a linear form. In the context of linear algebra, this meaning (polynomial functions of degree 0 or 1) is a special kind of affine map.
As a linear map
In linear algebra, a linear function is a map f between two vector spaces that preserves vector addition and scalar multiplication:

f(\mathbf{x} + \mathbf{y}) = f(\mathbf{x}) + f(\mathbf{y})

f(a\mathbf{x}) = af(\mathbf{x}).
Here a denotes a constant belonging to some field K of scalars (for example, the real numbers) and x and y are elements of a vector space, which might be K itself.
Some authors use "linear function" only for linear maps that take values in the scalar field;^{[4]} these are also called linear functionals.
The "linear functions" of calculus qualify as "linear maps" when (and only when) f(0[,\ldots,0]) = 0, or, equivalently, when the constant b = 0. Geometrically, the graph of the function must pass through the origin.
See also
Notes

^ "The term linear function, which is not used here, means a linear form in some textbooks and an affine function in others." Vaserstein 2006, p. 501

^ Stewart 2012, p. 23

^ Shores 2007, p. 71

^ Gelfand 1961
References

Izrail Moiseevich Gelfand (1961), Lectures on Linear Algebra, Interscience Publishers, Inc., New York. Reprinted by Dover, 1989. ISBN 0486660826

Thomas S. Shores (2007), Applied Linear Algebra and Matrix Analysis, Undergraduate Texts in Mathematics, Springer. ISBN 0387331956

James Stewart (2012), Calculus: Early Transcendentals, edition 7E, Brooks/Cole. ISBN 9780538497909

Leonid N. Vaserstein (2006), "Linear Programming", in Leslie Hogben, ed., Handbook of Linear Algebra, Discrete Mathematics and Its Applications, Chapman and Hall/CRC, chap. 50. ISBN 1584885106
External links
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