Hyperbola
In general, a hyperbola is defined as the Locus of all points in the Plane the difference ofwhose distances from two fixed points (the Foci 
and 
) separated by a distance 
, where
 | (1) |
parallel to the x-Axis and Semiminor Axis 
parallel to they-Axis is given by | (2) |
determined the vertical scaling of the hyperbola. The Eccentricity of the hyperbola is defined as | (3) |
In the standard equation of the hyperbola, the center is located at 
, the Foci are at
, and the vertices are at 
. The so-called Asymptotes (shown as thedashed lines in the above figures) can be found by substituting 0 for the 1 on the right side of the general equation(2),
 | (4) |
.The special case 
(the left diagram above) is known as a Right Hyperbola because theAsymptotes are Perpendicular.
In Polar Coordinates, the equation of a hyperbola centered at the Origin (i.e., with 
) is
 | (5) |
 | (6) |
 | (7) |
 |  |  | (8) |
 | |  | (9) |
The Curvature and Tangential Angle are
 | |  | (10) |
 | |  | (11) |
The special case of the Menaechmus. 
Euclid andAristaeus wrote about the general hyperbola, but only studied one branch of it. The hyperbola was given its present nameby Apollonius, who was the first to study both branches. The MacTutor Archive). The hyperbola is the shape of an orbit of a body on anescape trajectory (i.e., a body with positive energy), such as some comets, about a fixed mass, such as the sun.
The Locus of the apex of a variable Cone containing an Ellipse fixed in 3-space is a hyperbolathrough the Foci of the Ellipse. In addition, the Locus of the apex of a Conecontaining that hyperbola is the original Ellipse. Furthermore, theEccentricities of the Ellipse and hyperbola are reciprocals.
See also Conic Section, Ellipse, Hyperboloid, Jerabek's Hyperbola, Kiepert's Hyperbola, Parabola, QuadraticCurve,Rectangular Hyperbola, Reflection Property, Right Hyperbola
References
Beyer, W. H. CRC Standard Mathematical Tables, 28th ed. Boca Raton, FL: CRC Press, pp. 199-200, 1987. Casey, J. ``The Hyperbola.'' Ch. 7 in A Treatise on the Analytical Geometry of the Point, Line, Circle, and Conic Sections, Containing an Account of Its Most Recent Extensions, with Numerous Examples, 2nd ed., rev. enl. Dublin: Hodges, Figgis, & Co., pp. 250-284, 1893. Courant, R. and Robbins, H. What is Mathematics?: An Elementary Approach to Ideas and Methods, 2nd ed. Oxford, England: Oxford University Press, pp. 75-76, 1996. Lawrence, J. D. A Catalog of Special Plane Curves. New York: Dover, pp. 79-82, 1972. Lee, X. ``Hyperbola.''http://www.best.com/~xah/SpecialPlaneCurves_dir/Hyperbola_dir/hyperbola.html. Lockwood, E. H. ``The Hyperbola.'' Ch. 3 in A Book of Curves. Cambridge, England: Cambridge University Press, pp. 24-33, 1967. MacTutor History of Mathematics Archive. ``Hyperbola.''http://www-groups.dcs.st-and.ac.uk/~history/Curves/Hyperbola.html.
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