The word ** line** apparently derives from the Latin

*linum*, meaning flax plant from which linen is produced; at one time, a stretched linen thread was the most reliable way to determine a straight line. Also see liner and lining.

The word **line** can refer to a queue area.

## Electrical engineering

In electrical engineering, a **line** is, more generally, any circuit (or loop) of an electrical system. This electric circuit loop (or electrical network), consists of electrical elements (or components) connected directly by conductor terminals to other devices in series.

In telecommunications, a telephone **line** is a single-user circuit on a telephone communications system.

## Mathematics

A **line**, or **straight line**, is, roughly speaking, an (infinitely) thin, (infinitely) long, straight geometrical object. Given two points, one can always find exactly one line that passes through the two points; the line provides the shortest connection between the points. Two different lines can intersect in at most one point; two different planes can intersect in at most one line. This intuitive concept of a line can be formalized in various ways.

If geometry is developed axiomatically (as in Euclid's *Elements* and later in David Hilbert's *Foundations of Geometry*), then lines are not defined at all, but characterized axiomatically by their properties. "Everything that satisfies the axioms for a line is a line." While Euclid did define a line as "length without breadth", he did not use this rather obscure definition in his later development.

In Euclidean space **R**^{n} (and analogously in all other vector spaces), we define a line *L* as a subset of the form

**a**and

**b**are given vectorss in

**R**

^{n}with

**b**non-zero. The vector

**b**describes the direction of the line, and

**a**is a point on the line. Different choices of

**a**and

**b**can yield the same line.

One can show that in **R**^{2}, every line *L* is described by a linear equation of the form

*a*,

*b*and

*c*such that

*a*and

*b*are not both zero. An important property of these lines is their slope.

More abstractly, one usually thinks of the real line as the prototype of a line, and assumes that the points on a line stand in a one-to-one correspondence with the real numbers. However, one could also use the hyperreal numbers for this purpose, or even the long line of topology.

The "straightness" of a line, interpreted as the property that it minimizes distances between its points, can be generalized and leads to the concept of geodesics on differentiable manifolds.