hyperbolic

Adjective

 * 1) Of or relating to hyperbole.
 * 2) Using hyperbole: exaggerated.
 * 3)  Having a saturation exceeding 100%.
 * 1)  Having a saturation exceeding 100%.
 * 1)  Having a saturation exceeding 100%.

Translations

 * Afrikaans: hiperbolies
 * Catalan: hiperbòlic
 * Czech: nadsazený, nadnesený
 * Esperanto: hiperbola
 * Finnish:
 * French:
 * Galician: hiperbólico
 * German: hyperbolisch,
 * Irish: áibhéalach, urtheilgeach
 * Italian:
 * Manx: ard-vooadagh
 * Portuguese: hiperbólico
 * Russian: ,
 * Spanish:
 * Swedish:

Adjective

 * 1) Of or pertaining to a hyperbola.
 * 2) * 1988, R. F. Leftwich, "Wide-Band Radiation Thermometers", chapter 7 of, David P. DeWitt and Gene D. Nutter, editors, Theory and Practice of Radiation Thermometry, ISBN 0471610186, page 512 :
 * In this configuration the on-axis image is produced at the real hyperbolic focus (fs2) but off-axis performance suffers.
 * The hyperbolic cosine of zero is one.
 * 1)  Having negative curvature or sectional curvature.
 * 2) * 1998, Katsuhiko Matsuzaki and Masahiko Taniguchi, Hyperbolic Manifolds and Kleinian Groups, 2002 reprint, Oxford, ISBN 0198500629, page 8, proposition 0.10 :
 * There is a universal constant $$m_0>0$$ such that every hyperbolic surface $$R$$ has an embedded hyperbolic disk with radius greater than $$m_0$$.
 * 1)  Whose domain has two (possibly ideal) fixed points joined by a line mapped to itself by translation.
 * 2) * 2001, A. F. Beardon, "The Geometry of Riemann Surfaces", in, E. Bujalance, A. F. Costa, and E. Martínez, editors, Topics on Riemann Surfaces and Fuchsian Groups, Cambridge, ISBN 0521003504, page 6 :
 * A hyperbolic isometry $$f$$ has two (distinct) fixed points on $$\partial\mathcal H$$.
 * 1)  Of, pertaining to, or in a hyperbolic space a space having negative curvature or sectional curvature.
 * 2) * 2001, A. F. Beardon, "The Geometry of Riemann Surfaces", in, E. Bujalance, A. F. Costa, and E. Martínez, editors, Topics on Riemann Surfaces and Fuchsian Groups, Cambridge, ISBN 0521003504, page 6 :
 * Exactly one hypercycle is a hyperbolic geodesic, and this is called the axis $$A_f$$ of $$f$$.
 * Exactly one hypercycle is a hyperbolic geodesic, and this is called the axis $$A_f$$ of $$f$$.

Translations

 * Catalan: hiperbòlic
 * Czech: hyperbolický
 * Danish: hyperbolsk
 * Dutch:
 * French:
 * Galician: hiperbólico
 * German: hyperbolisch
 * Gujarati: અતિવલયાકાર
 * Hindi: अतिपरवलयिक
 * Icelandic: breiðger
 * Irish: hipearbóileach
 * Kazakh: гиперболалық
 * Polish: hiperboliczny
 * Portuguese: hiperbólico
 * Russian:
 * Spanish:
 * Swedish: