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![[parent]](http://images.planetmath.org:8080/images/uparrow.png)
Saccheri quadrilateral
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(Definition)
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In hyperbolic geometry, a Saccheri quadrilateral is a quadrilateral such that one set of opposite sides (called the legs) congruent, the other set of opposite sides (called the bases) disjointly parallel, and, at one of the bases, both angles are right angles. Since the angle sum of a triangle in hyperbolic geometry is strictly less than  radians, the angle sum of a quadrilateral in hyperbolic geometry is strictly less than  radians. Thus, in any Saccheri
quadrilateral, the angles that are not right angles must be acute.
The discovery of Saccheri quadrilaterals is attributed to Giovanni Saccheri.
The common perpendicular to the bases of a Saccheri quadrilateral always divides the quadrilateral into two congruent Lambert quadrilaterals. In other words, every Saccheri quadrilateral is symmetric about the common perpendicular to its bases. Thus, the two acute angles of a Saccheri quadrilateral are also congruent.
The legs of a Saccheri quadrilateral are disjointly parallel since one of the bases is a common perpendicular. Therefore, Saccheri quadrilaterals are parallelograms. Note also that Saccheri quadrilaterals are right trapezoids as well as isosceles trapezoids.
Below are some examples of Saccheri quadrilaterals in various models. In each example, the Saccheri quadrilateral is labelled as  , and the common perpendicular to the bases is drawn in cyan.
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"Saccheri quadrilateral" is owned by Wkbj79.
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(view preamble)
Cross-references: upper half plane model, Poincaré disc model, angle measures, poles, lines, Beltrami-Klein model, isosceles trapezoids, right trapezoids, parallelograms, acute angles, symmetric about, Lambert quadrilaterals, perpendicular, acute, radians, strictly, triangle, angle sum, right angles, angles, disjointly parallel, congruent, opposite sides, quadrilateral, hyperbolic geometry
There are 2 references to this entry.
This is version 13 of Saccheri quadrilateral, born on 2007-05-23, modified 2007-06-05.
Object id is 9445, canonical name is SaccheriQuadrilateral.
Accessed 1721 times total.
Classification:
| AMS MSC: | 51-00 (Geometry :: General reference works ) | | | 51M10 (Geometry :: Real and complex geometry :: Hyperbolic and elliptic geometries and generalizations) |
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Pending Errata and Addenda
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{2} \psline{o-o}(-... ...2){.} \rput[a](0.5,4){.} \psline[linecolor=cyan]{o-o}(0,-2)(0,2) \end{pspicture}](http://images.planetmath.org:8080/cache/objects/9445/l2h/img4.png "\begin{pspicture}(-3,-2)(3,4) \pscircle[linestyle=dashed](0,0){2} \psline{o-o}(-... ...2){.} \rput[a](0.5,4){.} \psline[linecolor=cyan]{o-o}(0,-2)(0,2) \end{pspicture}")
{2} \psline{o-o}(-... ...,2){.} \rput[a](0,-2){.} \psline[linecolor=cyan]{o-o}(0,-2)(0,2) \end{pspicture}](http://images.planetmath.org:8080/cache/objects/9445/l2h/img5.png "\begin{pspicture}(-2,-2)(2,2) \pscircle[linestyle=dashed](0,0){2} \psline{o-o}(-... ...,2){.} \rput[a](0,-2){.} \psline[linecolor=cyan]{o-o}(0,-2)(0,2) \end{pspicture}")
![\begin{pspicture}(-4,-0.1)(4,3.6) \psline[linestyle=dashed]{<->}(-4,0)(4,0) \psa... ....} \rput[r](4,-0.01){.} \psline[linecolor=cyan]{o->}(0,0)(0,3.6) \end{pspicture}](http://images.planetmath.org:8080/cache/objects/9445/l2h/img6.png "\begin{pspicture}(-4,-0.1)(4,3.6) \psline[linestyle=dashed]{<->}(-4,0)(4,0) \psa... ....} \rput[r](4,-0.01){.} \psline[linecolor=cyan]{o->}(0,0)(0,3.6) \end{pspicture}")