(If an unlimited number of steps is permitted, some otherwise-impossible constructions become possible by means of infinite sequences converging to a limit.) That is, it must have a finite number of steps, and not be the limit of ever closer approximations. "Eyeballing" distances (looking at the construction and guessing at its accuracy) or using markings on a ruler, are not permitted. In any case, the equivalence is why this feature is not stipulated in the definition of the ideal compass.Įach construction must be mathematically exact. Although the proposition is correct, its proofs have a long and checkered history. However, by the compass equivalence theorem in Proposition 2 of Book 1 of Euclid's Elements, no power is lost by using a collapsing compass. A 'collapsing compass' would appear to be a less powerful instrument. Lines and circles constructed have infinite precision and zero width.Īctual compasses do not collapse and modern geometric constructions often use this feature.fold after being taken off the page, erasing its 'stored' radius). The compass may or may not collapse (i.e. Circles and circular arcs can be drawn starting from two given points: the centre and a point on the circle. The compass can have an arbitrarily large radius with no markings on it (unlike certain real-world compasses).It can only be used to draw a line segment between two points, or to extend an existing line segment. The straightedge is an infinitely long edge with no markings on it.The "straightedge" and "compass" of straightedge-and-compass constructions are idealized versions of real-world rulers and compasses. A number is constructible if and only if it can be written using the four basic arithmetic operations and the extraction of square roots but of no higher-order roots. In terms of algebra, a length is constructible if and only if it represents a constructible number, and an angle is constructible if and only if its cosine is a constructible number. Many of these problems are easily solvable provided that other geometric transformations are allowed for example, neusis construction can be used to solve the former two problems. Some of the most famous straightedge-and-compass problems were proved impossible by Pierre Wantzel in 1837 using field theory, namely trisecting an arbitrary angle and doubling the volume of a cube (see § impossible constructions). Gauss showed that some polygons are constructible but that most are not. The ancient Greeks developed many constructions, but in some cases were unable to do so. It turns out to be the case that every point constructible using straightedge and compass may also be constructed using compass alone, or by straightedge alone if given a single circle and its center.Īncient Greek mathematicians first conceived straightedge-and-compass constructions, and a number of ancient problems in plane geometry impose this restriction. Note however that whilst a non-collapsing compass held against a straightedge might seem to be equivalent to marking it, the neusis construction is still impermissible and this is what unmarked really means: see Markable rulers below.) More formally, the only permissible constructions are those granted by the first three postulates of Euclid's Elements. (This is an unimportant restriction since, using a multi-step procedure, a distance can be transferred even with a collapsing compass see compass equivalence theorem. The compass is assumed to have no maximum or minimum radius, and is assumed to "collapse" when lifted from the page, so may not be directly used to transfer distances. The idealized ruler, known as a straightedge, is assumed to be infinite in length, have only one edge, and no markings on it. In geometry, straightedge-and-compass construction – also known as ruler-and-compass construction, Euclidean construction, or classical construction – is the construction of lengths, angles, and other geometric figures using only an idealized ruler and a pair of compasses.
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