### Examples

- In collaboration with Global Knowledge Network, The Campus, and KeyJob, Quadratrix provides in-depth training in all aspects of the OpenVMS operating system. Quadratrix has also taken an interest in porting Open Source material to the OpenVMS platform. —
*“Quadratrix - Products and Services for OpenVMS Systems”*, quadratrix.be - Quadratrix of Hippias is the first named curve other than circle and line. The curve is better known as quadratrix because it is later used to square the circle. —
*“Quadratrix Of Hippias”*, - Media in category "Quadratrix" The following 6 files are in this category, out of 6 total. Quadr02. Quadratrix.gif. 23,354 bytes. QuadratrixHippias.svg. 9,233 bytes. —
*“Category:Quadratrix - Wikimedia Commons”*, - The definition of the quadratrix is the following. A segment AB The curve traced out by the intersection of the segment and the ray is the quadratrix. —
*“Hippias' Quadratrix”*, geom.uiuc.edu - The quadratrix of Dinostratus (also called the quadratrix of Hippias) was well known to the ancient Greek geometers, and is mentioned by Proclus, who ascribes the invention of the curve to a contemporary of Socrates, probably Hippias of Elis. —
*“Quadratrix - Wikipedia, the free encyclopedia”*, - Once the quadratrix has been formed, move point E anywhere along arc BED. As one can see, the quadratrix can be used to easily reduce the problem of trisecting an angle to that of trisecting a line. —
*“Loci: Convergence | An Investigation of Historical Geometric”*, - The National Curve Bank project for students of mathematics One might even argue that the Quadratrix of Hippias introduced the geometry associated with the Calculus of Variations. —
*“Quadratrix of Hippias”*, curvebank.calstatela.edu - quadratrix of Hippias. The first curve in recorded history that was not part of a line or a circle, and the first curve known that is not constructible in the classical sense; in other words, it can't be drawn using a straightedge and a compass alone, but instead has to be plotted point by point. —
*“quadratrix of Hippias”*, - Hippias of Elis (430 BC) was a sophist who invented the quadratrix curve to trisect an angle. At each time, the two segments will intersect in a point P. The totality of all these points P is defined as the quadratrix. Drawing the quadratrix. —
*“hippias2.html”*, y.edu - The quadratrix of Dinostratus (also called the quadratrix of Hippias) was well known to the ancient Greek geometers, and is mentioned by Proclus, who ascribes the invention of the curve to a contemporary of Socrates, probably Hippias of Elis. —
*“Quadratrix definition by Babylon's free dictionary”*, - Definition of Quadratrix in the Online Dictionary. Meaning of Quadratrix. Pronunciation of Quadratrix. Translations of Quadratrix. Quadratrix synonyms, Quadratrix antonyms. Information about Quadratrix in the free online English dictionary and. —
*“Quadratrix - definition of Quadratrix by the Free Online”*, - Aspects of the topic quadratrix of Hippias are discussed in the following places at Britannica. The mechanical device, perhaps never built, creates what the ancient geometers called a quadratrix. —
*“quadratrix of Hippias (geometry) -- Britannica Online”*, - QUADRATRIX (from Lat. quadrator, squarer), in mathematics, a curve having ordinates which are a measure of the area (or quadrature) of another curve. The quadratrix of Dinostratus was well known to the ancient Greek geometers, and is mentioned by Proclus, who ascribes the invention of the curve to. —
*“Quadratrix - LoveToKnow 1911”*, 1911 - quadratrix definition from the mondofacto online medical dictionary A curve made use of in the quadrature of other curves; as the quadratrix, of Dinostratus, or of Tschirnhausen. —
*“quadratrix - Definition”*, - Quadratrix. Wikipedia [edit] Etymology. Latin quadrator, squarer [edit] quadratrix (plural quadratrices or quadratrixes) (mathematics) A curve having ordinates. —
*“quadratrix - Wiktionary”*, - quadratrix. Let the polar angle $\theta$ and the ordinate of the point $(x,\,y)$ of the plane be proportional to a parametre $t$ , e.g. such that $\theta = t$ , $y = kt The given proportionalities as locus condition, the point $(x,\,y)$ draws a plane curve called quadratrix. —
*“PlanetMath: quadratrix”*, - The quadratrix (of Hippias) is one of the curves that can be used to solve the problem of The quadratrix is the locus of the intersection points of both moving. —
*“The quadratrix”*, cage.ugent.be - Quad·ra·trix n. pl. -trixes , or -trices . [NL.] (Geom.) A curve made use of in the quadrature of other curves; as the quadratrix , of The quadratrix of Dinostratus (also called the quadratrix of Hippias) was well known to the ancient Greek geometers, and is mentioned by Proclus, who ascribes the. —
*“Quadratrix: Information from ”*, - qua quaalude quaaludes quack quacked quacker quackeries quackers quackery quacking quackish quackishly quackism quackisms quackle quackled quackles quackling quacks quacksalver quacksalvers quacksalving quacky quad quadded quadding quadplex. —
*“words that starts with qu? help me its 4 my brothers hw”*, - Dinostratus quadratrix. A transcendental plane curve which is given in orthogonal Cartesian coordinates by: The first considerations of the quadratrix are attributed to Hippias of Elis (420 B.C. —
*“Springer Online Reference Works”*, - The quadratrix was discovered by Hippias of Elis in 430 BC. It may have been used by him for trisecting an angle and squaring the circle. The curve may be used for dividing an angle into any number of equal parts. His only contribution to mathematics seems to be the quadratrix. —
*“Quadratrix”*, www-groups.dcs.st- - 31 (second part)-32: Basic argument for the rectification of circle with a quadratrix. For if there is square ABGD and the circular-arc BED about center G, and BHQ becoming a quadratrix, as was described, it is proved that as circular-arc DEB is to straight-line BG, so is BG to straight-line GQ. —
*“Quadratrix.html”*, calstatela.edu