Examples of 'elliptic' in a sentence
Meaning of "elliptic"
Elliptic (adjective): Shaped like an ellipse, often used to describe a geometric figure or mathematical equation
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- Of or pertaining to an ellipse.
- Of or pertaining to a broad field of mathematics that originates from the problem of calculating arc lengths of an ellipse.
- That has coefficients satisfying a condition analogous to the condition for the general equation for a conic section to be of an ellipse.
- Oval, with a short or no point.
How to use "elliptic" in a sentence
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elliptic
Elliptic reflector with high luminous efficiency.
It is related to elliptic curves and modular forms.
Elliptic curves are examples for abelian varieties.
The principles of elliptic and hyperbolic analysis.
Elliptic curves are widely deployed in cryptographic applications.
Its coriaceous leaves are elliptic to circular in shape.
In elliptic geometry this is not the case.
The malware uses elliptic curve encryption.
Elliptic differential operators and elliptic complexes.
The leaves are elliptic with an acuminate tip.
Elliptic functions and are also double periodical.
Construction of elliptic curves with large rank.
Elliptic and parabolic problems in unbounded domains.
The leaves are elliptic with a white underside.
Elliptic curves have nothing to do with ellipses.
See also
It can also have an elliptic or ovoid section.
That elliptic curve seems to be not modular.
The interior is an elliptic section with wall.
An elliptic cylinder is a cylinder whose directrix is an ellipse.
Topics in the theory of surfaces in elliptic spaces.
Incomplete elliptic integral of the third kindEdit.
As a degenerate orbit this is a radial elliptic trajectory.
Incomplete elliptic integral of the second kindEdit.
This results in a surface possessing elliptic geometry.
A formula of the elliptic paraboloid is expressed as follows.
There are strong analogies with elliptic fibrations.
Star base elliptic lacquered black.
The alternate leaves are ovate and elliptic.
It applies to the domain of elliptic curve cryptography.
Elliptic functions are functions of two variables.
Its primary application is in elliptic curve cryptography.
Of some elliptic operator on the point.
He also studied the arithmetic of elliptic curves.
It says that all elliptic curves should be modular.
Which is an implicit solution involving an elliptic integral.
The elliptic functions are such functions.
He was also one of the founders of elliptic cohomology.
Elliptic divisibility sequences are another class of such sequences.
It is also possible to use keys or elliptic functions.
Lectures on elliptic boundary value problems.
Value of the cofactor of the elliptic curve.
The leaves are elliptic to ovate in shape.
Elliptic functions have the property of double periodicity.
Animation about nodes of two elliptic trajectories.
I ran an elliptic curve algorithm to find the key.
The basis may be generally elliptic or polygonal.
Elliptic integrals of the first and second kind.
The standards are elliptic or narrowly obovate.
An elliptic curve everyone can trust.
The subcoriaceous leaves are elliptic to ovate or obovate in shape.
