Examples of 'hyperbolic geometry' in a sentence
Meaning of "hyperbolic geometry"
A non-Euclidean geometry that differs from the familiar Euclidean geometry in which parallel lines intersect. It is characterized by curved shapes and has applications in various fields such as physics and mathematics
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- A type of geometry that rejects the parallel postulate. Given a straight line L and a point P not on the line, more than one straight line can be drawn through P without intersecting L.
- A non-Euclidean geometry, that features the hyperbola as geodesic, and has constant negative curvature
How to use "hyperbolic geometry" in a sentence
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hyperbolic geometry
But it is easier to do hyperbolic geometry on other models.
Hyperbolic geometry is defined by axioms and postulates.
The most prevalent geometry is hyperbolic geometry.
In hyperbolic geometry any two horocycles are congruent.
An example of negatively curved space is hyperbolic geometry.
The complex hyperbolic geometry of certain moduli spaces of tori.
Known for his works on hyperbolic geometry.
Hyperbolic geometry on a hyperboloid.
This results in a surface possessing hyperbolic geometry.
Regular polygons in hyperbolic geometry have angles smaller than they do in the plane.
With energy functional for hyperbolic geometry.
Hyperbolic geometry is the most prevalent geometry in this picture and also the most complicated.
This type of geometry is called hyperbolic geometry.
So what is this hyperbolic geometry that corals and sea slugs embody?
In fact it is known as the hyperboloid model of hyperbolic geometry.
See also
Thomas precession has an interpretation in hyperbolic geometry as the negative hyperbolic triangle defect.
Trigonometry on surfaces of negative curvature is part of hyperbolic geometry.
The theorems of absolute geometry hold in hyperbolic geometry as well as in Euclidean geometry.
Hyperboloid structures are architectural structures designed with hyperbolic geometry.
So what is this hyperbolic geometry.
Hyperbolic space is the principal example of a space exhibiting hyperbolic geometry.
It 's a math problem about hyperbolic geometry in marine organisms like coral.
Any two hyperbolic lines are congruent in hyperbolic geometry.
Rather, squares in hyperbolic geometry have angles of less than right angles.
An example of such geometry is hyperbolic geometry.
The subject of hyperbolic geometry was non-Euclidean geometry, a departure from tradition.
This was not even hyperbolic geometry.
This is a contradiction because the rectangle is an impossible figure in hyperbolic geometry.
It 's a math problem about hyperbolic geometry in marine organisms like coral . I am sorry.
There are no similar triangles in hyperbolic geometry.
And in hyperbolic geometry it 's less.
An ideal triangle is the largest possible triangle in hyperbolic geometry.
And yet this happens, as in the hyperbolic geometry of Nikolai Ivanovich Lobačevskij.
He was referring to his own work which today we call hyperbolic geometry.
These forms, based on non-Euclidean hyperbolic geometry, are known today as hyperboloids of revolution.
The pseudosphere has the appropriate curvature to model hyperbolic geometry.
In hyperbolic geometry the sum of angles in a hyperbolic triangle must be less than 180 degrees.
Combining popularity and similarity of network nodes creates a hyperbolic geometry.
Again, this applies to spherical geometry and hyperbolic geometry as well as to Euclidean geometry.
The relevant structure is now called the hyperboloid model of hyperbolic geometry.
It 's a math problem about hyperbolic geometry I am sorry.
These have proven to be very important in the study of manifolds and hyperbolic geometry.
Hyperbolic geometry is frequently referred to as " Lobachevskian geometry " or " Bolyai-Lobachevskian geometry.
The area in spherical geometry can be related to the area in hyperbolic geometry.
I'm sorry. It's a math problem about hyperbolic geometry in marine organisms like coral.
Hyperbolic polygons are the analogues of Euclidean polygons in hyperbolic geometry.
The Klein model = = = An alternative model of hyperbolic geometry is on a certain domain in projective space.
Some Escher graphics are based on them for the disc model of hyperbolic geometry.
In mathematics, hyperbolic geometry ( also called Bolyai-Lobachevskian geometry or Lobachevskian geometry ) is a non-Euclidean geometry.
The first chapter introduces the basic objects of hyperbolic geometry that we will use.
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Examples of using Hyperbolic
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He was being hyperbolic to express his frustrations with parenting
Press a key to select its hyperbolic function
Hyperbolic geometry is defined by axioms and postulates
Examples of using Geometry
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The selected geometry is displayed as an active feature
Noise reduction systems with variable geometry
Measuring screen geometry and measuring grid
