quadric Sentence Examples

  1. A quadric equation is a polynomial equation of degree two.
  2. The surface described by a quadric equation in three dimensions is often referred to as a quadric surface.
  3. Mathematicians study the properties and characteristics of quadric surfaces in algebraic geometry.
  4. Quadric surfaces can take various forms, including ellipsoids, hyperboloids, and paraboloids.
  5. Engineers use quadric surfaces to model the shapes of lenses, mirrors, and other optical components.
  6. The quadric cone is a type of quadric surface that includes shapes such as elliptic cones and hyperbolic cones.
  7. The equations of quadric surfaces play a crucial role in computer graphics and visualization.
  8. Quadric surfaces arise in many physical and mathematical contexts, from mechanics to calculus.
  9. Geometrically, quadric surfaces represent sets of points satisfying certain algebraic conditions.
  10. The study of quadric surfaces is an essential topic in advanced mathematics and engineering.

quadric Meaning

Wordnet

quadric (n)

a curve or surface whose equation (in Cartesian coordinates) is of the second degree

Webster

quadric (a.)

Of or pertaining to the second degree.

Webster

quadric (n.)

A quantic of the second degree. See Quantic.

A surface whose equation in three variables is of the second degree. Spheres, spheroids, ellipsoids, paraboloids, hyperboloids, also cones and cylinders with circular bases, are quadrics.

Synonyms & Antonyms of quadric

No Synonyms and anytonyms found

FAQs About the word quadric

a curve or surface whose equation (in Cartesian coordinates) is of the second degreeOf or pertaining to the second degree., A quantic of the second degree. See

No synonyms found.

No antonyms found.

A quadric equation is a polynomial equation of degree two.

The surface described by a quadric equation in three dimensions is often referred to as a quadric surface.

Mathematicians study the properties and characteristics of quadric surfaces in algebraic geometry.

Quadric surfaces can take various forms, including ellipsoids, hyperboloids, and paraboloids.