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In mathematics a hyperbola is a type of smooth curve, lying in a plane, defined by its geometric properties or by equations for which it
Kaynak: Hyperbola
Kaynak: Hyperbola
In geometry , the unit hyperbola is the set of points (x,y) in the Cartesian plane that satisfies x^2 - y^2 1 . the unit hyperbola forms
Kaynak: Unit hyperbola
Kaynak: Unit hyperbola
Traditionally, the three types of conic section are the hyperbola , the parabola , and the ellipse . The circle is a special case of the
Kaynak: Conic section
Kaynak: Conic section
a circular cone and a plane that does not pass through its apex ; the other two (open and unbounded ) cases are parabola s and hyperbola s.
Kaynak: Ellipse
Kaynak: Ellipse
This conic is a rectangular hyperbola and it is called the Kiepert hyperbola in honor of Ludwig Kiepert (1846–1934), the mathematician
Kaynak: Napoleon points
Kaynak: Napoleon points
In mathematics , a hyperbolic angle is a geometric figure that divides a hyperbola . The science of hyperbolic angle parallels the
Kaynak: Hyperbolic angle
Kaynak: Hyperbolic angle
For example, foci can be used in defining conic section s, the four types of which are the circle , ellipse , parabola , and hyperbola .
Kaynak: Focus (geometry)
Kaynak: Focus (geometry)
Cressonia hyperbola Slosson, 1890 Cressonia robinsonii Butler, 1876 Smerinthus pallens Strecker, 1873 Cressonia juglandis alpina Clark, 1927
Kaynak: Amorpha juglandis
Kaynak: Amorpha juglandis
Hyperbolas : The eccentricity of a hyperbola can be any real number greater than 1, with no upper bound. of a rectangular hyperbola is sqrt 2.
Kaynak: Eccentricity (mathematics)
Kaynak: Eccentricity (mathematics)
The semi-major axis of a hyperbola is, depending on the convention, plus or minus one half of the distance between the two branches.
Kaynak: Semi-major axis
Kaynak: Semi-major axis
(that is, with ellipse s and hyperbola s) that is at right angle s with the semi-major axis and has one end at the center of the conic section.
Kaynak: Semi-minor axis
Kaynak: Semi-minor axis
influence of the gravitation of the Sun . Parabolic orbit s do not occur in nature; simple orbits most commonly resemble hyperbola s or ellipse s.
Kaynak: Parabola
Kaynak: Parabola
It was Apollonius who gave the ellipse , the parabola , and the hyperbola the names by which we know them. The hypothesis of eccentric
Kaynak: Apollonius of Perga
Kaynak: Apollonius of Perga
Hyperbolic refers to something related to or in shape of hyperbola (a type of curve), or to something employing the literary device of
Kaynak: Hyperbolic
Kaynak: Hyperbolic
In geometry , the director circle of an ellipse or hyperbola (also called the orthoptic circle or Fermat–Apollonius circle) is a circle
Kaynak: Director circle
Kaynak: Director circle
In plane geometry , two lines are hyperbolic orthogonal when they are reflections of each other over the asymptote of a given hyperbola .
Kaynak: Hyperbolic orthogonality
Kaynak: Hyperbolic orthogonality
The shape of a hyperbolic trajectory is a hyperbola . Planetary flybys, used for gravitational slingshots , can be described within the
Kaynak: Hyperbolic trajectory
Kaynak: Hyperbolic trajectory
as the points (cos t, sin t) form a circle with a unit radius, the points (cosh t, sinh t) form the right half of the equilateral hyperbola .
Kaynak: Hyperbolic function
Kaynak: Hyperbolic function
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