Examples of 'quintic' in a sentence
Meaning of "quintic"
quintic (adjective) - relating to a polynomial equation of the fifth degree
Show more definitions
- Of or relating to the fifth degree, such as a quintic polynomial which has the form ax⁵+bx⁴+cx³+dx²+ex+f=0 (containing a term with the independent variable raised to the fifth power).
- a quintic polynomial: ax⁵+bx⁴+cx³+dx²+ex+f
How to use "quintic" in a sentence
Basic
Advanced
quintic
Some quintic equations can be solved in terms of radicals.
Constructing the mirror of a quintic threefold.
Quintic plane curve.
Learn what is quintic equation.
He was convinced that he had found a way to solve the quintic equation.
The quintic method.
One of these is related to the original quintic by mirror symmetry.
Discusses Galois Theory in general including a proof of insolvability of the general quintic.
Finding roots of a quintic equation.
This quintic is in Bring-Jerrard normal form.
He discovered a method for solving the quintic equation by using elliptic functions.
Determination of the asymptotic density of discriminants of quartic and quintic number fields.
Charles Hermite solves the general quintic equation by means of elliptic and modular functions.
This is one of the simplest examples of a non-solvable quintic polynomial.
The development partnership between Quintic and Computervision transferred to PTC.
See also
This quintic is in Bring - Jerrard normal form.
The development partnership with Quintic also transferred.
Solved some quintic equations and higher-order polynomials.
ABEL ABEL impossibility of the solution of the general quintic equation by radicals.
In other words, a quintic function is defined by a polynomial of degree five.
As a very simple example, the quintic equation.
Quintic function, Fifth degree polynomial.
The development partnership with Quintic also transferred to CAD Schroer.
Of the quintic classification method ( Quinarian system, then forgotten taxonomy ) was used.
Nevertheless, the modern methods for solving solvable quintic equations are mainly based on Lagrange's method.
Quintic equations and the Abel - Ruffini.
A real two-dimensional slice of a quintic Calabi-Yau threefold.
An example of a quintic whose roots cannot be expressed in terms of radicals is x5 - x + 1 0.
Degree 5 are called quintic functions.
In mathematics, a quintic threefold is a degree 5 3-dimensional hypersurface in 4-dimensional projective space.
Algebraic equation Cubic plane curve Quintic equation Spline ( mathematics ).
An example of a quintic whose roots can not be expressed in terms of radicals is x5 - x + 1 = 0.
Can not be expressed in terms of radicals . ( cf . quintic equation ).
Next, we considered the quintic beam equation on 3D torus.
Ruffini ( 1799 ) attempted a proof of the impossibility of solving the quintic and higher equations.
The moduli space of lines on the quintic threefold is a discrete set of 2875 points.
There are substantial partial results for quartic and quintic number fields ( Sutherland 2012 ).
This is a result of Galois theory ( see Quintic equations and the Abel-Ruffini theorem ).
This is a result of Galois theory ( see Quintic equations and the Abel - Ruffini theorem ).
Nevertheless, the modern methods for solving solvable quintic equations are mainly based on Lagrange 's method . [ 28 ].
