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Line 1: {{Short description\|Part of a line that is bounded by two distinct end points; line with two endpoints}} [[Image:Segment definition.svg\|thumb~~\|250px\|right~~\|The geometric definition of a closed line segment: the [[intersection (Euclidean geometry)\|intersection]] of all points at or to the right of {{mvar\|A}} with all points at or to the left of {{mvar\|B}}]]▼ ~~{{Distinguish\|arc (geometry)}}~~ [[File:Fotothek df tg 0003359 Geometrie ^ Konstruktion ^ Strecke ^ Messinstrument.jpg\|thumb\|~~historical~~Historical image –of ~~create~~1699 - creating a line segment ~~(1699)~~]]▼ ▲[[Image:Segment definition.svg\|thumb\|250px\|right\|The geometric definition of a closed line segment: the [[intersection (Euclidean geometry)\|intersection]] of all points at or to the right of {{mvar\|A}} with all points at or to the left of {{mvar\|B}}]] ▲[[File:Fotothek df tg 0003359 Geometrie ^ Konstruktion ^ Strecke ^ Messinstrument.jpg\|thumb\|historical image – create a line segment (1699)]] {{General geometry}} In [[geometry]], a '''line segment''' is a part of a [[line (mathematics)\|straight line]] that is bounded by two distinct ~~end~~'''endpoints''' (its [[~~Point~~extreme ~~(geometry)\|points~~point]]s), and contains every [[Point (geometry)\|point]] on the line that is between its endpoints. It is a special case of an ''[[arc (geometry)\|arc]]'', with zero [[curvature]]. The [[length]] of a line segment is given by the [[Euclidean distance]] between its endpoints. A '''closed line segment''' includes both endpoints, while an '''open line segment''' excludes both endpoints; a '''half-open line segment''' includes exactly one of the endpoints. In [[geometry]], a line segment is often denoted using aan ~~line~~[[overline]] ([[vinculum (symbol)\|vinculum]]) above the symbols for the two endpoints, (such as in {{mvar\|{{overline\|AB}}}}).<ref>{{Cite web\|title=Line Segment Definition - Math Open Reference\|url=https://www.mathopenref.com/linesegment.html\|access-date=2020-09-01\|website=www.mathopenref.com}}</ref> Examples of line segments include the sides of a triangle or square. More generally, when both of the segment's end points are vertices of a [[polygon]] or [[polyhedron]], the line segment is either an [[edge (geometry)\|edge]] (of that polygon or polyhedron) if they are adjacent vertices, or a [[diagonal]]. When the end points both lie on a [[curve]] (such as a [[circle]]), a line segment is called a [[chord (geometry)\|chord]] (of that curve). Line 13 ⟶ 12: :<math>L = \{ \mathbf{u} + t\mathbf{v} \mid t \in [0,1]\}</math> for some vectors <math>\mathbf{u}, \mathbf{v} \in V.</math> Inwhere ~~which~~{{math\|'''v'''}} ~~case,~~is nonzero. The endpoints of {{mvar\|L}} are then the vectors {{math\|'''u'''}} and {{math\|'''u''' + '''v'''~~}} are called the end points of {{mvar\|L~~}}. Sometimes, one needs to distinguish between "open" and "closed" line segments. In this case, one would define a '''closed line segment''' as above, and an '''open line segment''' as a subset {{mvar\|L}} that can be parametrized as Line 37 ⟶ 36: ==As a degenerate ellipse== A line segment can be viewed as a [[Degenerate conic\|degenerate case]] of an [[Ellipse#Line segment as a type of degenerate ellipse\|ellipse]], in which the semiminor axis goes to zero, the [[Focus (geometry)\|foci]] go to the endpoints, and the eccentricity goes to one. A standard definition of an ellipse is the set of points for which the sum of a point's distances to two ~~[[focus (geometry)\|~~foci]] is a constant; if this constant equals the distance between the foci, the line segment is the result. A complete orbit of this ellipse traverses the line segment twice. As a degenerate orbit, this is a [[Elliptic orbit#Radial elliptic trajectory\|radial elliptic trajectory]]. ==In other geometric shapes== Line 63 ⟶ 62: {{see also\|Relative position}} When a line segment is given an [[orientation (vector space)\|orientation]] ([[direction (geometry)\|direction]]) it is called a '''directed line segment''' or '''oriented line segment'''. It suggests a [[translation (geometry)\|translation]] or [[displacement (geometry)\|displacement]] (perhaps caused by a [[force]]). The magnitude and direction are indicative of a potential change. Extending a directed line segment semi-infinitely produces a ''[[~~ray~~directed ~~(geometry)\|ray~~half-line]]'' and infinitely in both directions produces a ''[[directed line]]''. This suggestion has been absorbed into [[mathematical physics]] through the concept of a [[Euclidean vector]].<ref>Harry F. Davis & Arthur David Snider (1988) ''Introduction to Vector Analysis'', 5th edition, page 1, Wm. C. Brown Publishers {{isbn\|0-697-06814-5}}</ref><ref>Matiur Rahman & Isaac Mulolani (2001) ''Applied Vector Analysis'', pages 9 & 10, [[CRC Press]] {{isbn\|0-8493-1088-1}}</ref> The collection of all directed line segments is usually reduced by making ~~"equivalent"~~[[equipollent (geometry)\|equipollent]] any pair having the same length and orientation.<ref>Eutiquio C. Young (1978) ''Vector and Tensor Analysis'', pages 2 & 3, [[Marcel Dekker]] {{isbn\|0-8247-6671-7}}</ref> This application of an [[equivalence relation]] ~~dates~~was ~~from~~introduced by [[Giusto Bellavitis]]~~'s introduction of the concept of [[equipollence (geometry)\|equipollence]] of directed line segments~~ in 1835. ==Generalizations== Line 69 ⟶ 68: In one-dimensional space, a ''[[ball (mathematics)\|ball]]'' is a line segment. An [[oriented plane segment]] or ''[[bivector]]'' generalizes the directed line segment. Beyond Euclidean geometry, [[geodesic segment]]s play the role of line segments. A line segment is a one-dimensional ''[[simplex]]''; a two-dimensional simplex is a triangle. ==Types of line segments== Line 87 ⟶ 92: ==External links== {{commons~~\|Line segment\|Line segment~~}} {{Wiktionary\|line segment}} *{{mathworld \|urlname=LineSegment \|title=Line segment }} Line 99 ⟶ 104: [[Category:Elementary geometry]] [[Category:Linear algebra]] [[Category:Line (geometry)]]