noun a curve formed by a flexible chain or string hanging freely from two points and forming a U shape
adjective relating to or resembling a catenary
In mathematics, a catenary is the curve that a hanging chain or cable assumes under its own weight when supported only at its ends. It is a shape that is often used in various mathematical models and calculations.
In civil engineering, catenary curves are important in the design and construction of overhead power lines and other suspended structures.
In architecture, the catenary shape is sometimes used in the design of roofs and domes to create a visually appealing and structurally sound form.
In engineering, catenary curves are used in the design of structures such as bridges, arches, and suspension bridges to ensure stability and proper weight distribution.
In physics, the catenary curve is studied in relation to the principles of equilibrium and tension in flexible structures.
In computer graphics, catenary curves are used to create realistic simulations of hanging objects and natural forms in virtual environments.
In architecture, the catenary curve is often used to design structures such as bridges and arches to ensure they can support their own weight and the weight of any loads placed on them.
Engineers use the catenary curve in the design of suspension bridges, power lines, and other structures that require a strong, stable shape that can distribute weight evenly.
Mathematicians study the catenary curve as a specific type of curve formed by a hanging chain or cable, and analyze its properties and equations.