adjective relating to or in the shape of a parabola; having the form or characteristics of a parabola
In mathematics, a parabolic curve is a type of conic section that is U-shaped and symmetric. It is described by the equation y = ax^2 + bx + c, where a, b, and c are constants.
In optics, a parabolic mirror is a type of curved mirror that reflects light to a single point known as the focal point. This property is used in telescopes and satellite dishes.
In architecture, a parabolic arch is a curved structure used in bridges and buildings to distribute weight and provide support. It is known for its strength and stability.
In engineering, parabolic antennas are used for satellite communication to focus radio waves onto a narrow beam for efficient transmission and reception.
In physics, a parabolic trajectory is the path followed by an object thrown or launched near the surface of the Earth. It is characterized by its shape resembling a parabola.
In literature, the term 'parabolic' is used to describe a story or narrative that uses allegorical or symbolic elements to convey a deeper meaning or moral lesson.
In psychology, 'parabolic' may be used to describe a type of behavior or pattern that follows a curved or U-shaped trajectory, such as in the context of learning or development.
In mathematics, a 'parabolic' curve or function is a type of conic section that is U-shaped and is characterized by its equation containing a squared term but no higher degree terms.
In physics, 'parabolic' may refer to the shape of a trajectory followed by an object under the influence of gravity, such as a projectile launched at an angle.
In engineering, 'parabolic' shapes or structures may be used in the design of antennas, reflectors, or other components to focus or direct energy or signals.