Conjugate hyperbola explained

In geometry, a conjugate hyperbola to a given hyperbola shares the same asymptotes but lies in the opposite two sectors of the plane compared to the original hyperbola.

A hyperbola and its conjugate may be constructed as conic sections derived from parallel intersecting planes and cutting tangent double cones sharing the same apex.

Using analytic geometry, the hyperbolas satisfy the symmetric equations

x2
a2

-

y2
b2

=1

with vertices (a,0) and (–a,0), and
y2
b2

-

x2
a2

=1

with vertices (0,b) and (0,–b).In case a = b they are rectangular hyperbolas, and a reflection of the plane in an asymptote exchanges the conjugates.

History

Apollonius of Perga introduced the conjugate hyperbola through a geometric construction: "Given two straight lines bisecting one another at any angle, to describe two hyperbolas each with two branches such that the straight lines are conjugate diameters of both hyperbolas."[1] "The two hyperbolas so constructed are called conjugate hyperbolas, and [the] last drawn is the hyperbola conjugate to the first."

The following property was described by Apollonius: let PP', DD' be conjugate diameters of two conjugate hyperbolas, Draw the tangents at P, P', D, D'. Then ... the tangents form a parallelogram, and the diagonals of it, LM, L'M', pass through the center [C]. Also PL = PL' = P'M = P'M' = CD.[1] It is noted that the diagonals of the parallelogram are the asymptotes common to both hyperbolas. Either PP' or DD' is a transverse diameter, with the opposite one being the conjugate diameter.

Elements of Dynamic (1878) by W. K. Clifford identifies the conjugate hyperbola.[2]

In 1894 Alexander Macfarlane used an illustration of conjugate right hyperbolas in his study "Principles of elliptic and hyperbolic analysis".[3]

In 1895 W. H. Besant noted conjugate hyperbolas in his book on conic sections.[4] George Salmon illustrated a conjugate hyperbola as a dotted curve in this Treatise on Conic Sections (1900).[5]

In 1908 conjugate hyperbolas were used by Hermann Minkowski to demarcate units of duration and distance in a spacetime diagram illustrating a plane in his Minkowski space.[6]

The principle of relativity may be stated as "Any pair of conjugate diameters of conjugate hyperbolas can be taken for the axes of space and time".[7]

In 1957 Barry Spain illustrated conjugate rectangular hyperbolas.[8]

Notes and References

  1. [Thomas Heath (classicist)|Thomas Heath]
  2. [W. K. Clifford]
  3. [Alexander Macfarlane]
  4. [W. H. Besant]
  5. [George Salmon]
  6. Book: E. T. Whittaker

    . Whittaker, E.T. . E. T. Whittaker . 1910 . 1 . . 441 . Dublin . Longman, Green and Co..

  7. Barry Spain (1957) Analytical Conics via HathiTrust