Examples of 'euclidean' in a sentence
Meaning of "euclidean"
Euclidean is an adjective that refers to the mathematical principles and geometry developed by the ancient Greek mathematician Euclid. It pertains to a system of geometry based on assumptions of straight lines, planes, and points
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- Adhering to the principles of traditional geometry, in which parallel lines are equidistant.
- Of or relating to Euclid's Elements, especially to Euclidean geometry.
- Of or relating to Euclidean zoning.
- Alternative spelling of Euclidean
How to use "euclidean" in a sentence
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euclidean
Euclidean spaces also generalize to higher dimensions.
In this experiment the euclidean distance was used.
Euclidean distance is invariant under orthogonal transformations.
The remainder of the euclidean division of by.
Euclidean distance and complete linkage method.
These spaces can be viewed as extensions of euclidean space.
Euclidean vectors are an example of a vector space.
And this holds for any euclidean domain.
Euclidean geometry can be axiomatically described in several ways.
This is the euclidean demonstration.
Euclidean distance is used to measure differences between segments.
Lobachevskii categorised euclidean as a special case of this more general geometry.
Euclidean space poses the indeformability of moving figures.
Lorentzian and euclidean.
Euclidean algorithm and the greatest common divisor.
See also
We also study the topology of a certain class of submanifolds of euclidean space.
Euclidean distance was used as a measure of distance.
The target is to maximize the euclidean distance between the transmitted signals.
Euclidean geometry is not true in the real world.
When the seating chart at your wedding looks more like a euclidean.
Euclidean geometry is based on a set of axioms.
Multivariate analysis was performed using hierarchical clustering based on average euclidean distance.
Euclidean space contains only the spatial coordinates.
The regular enneagon can tessellate the euclidean tiling with gaps.
Euclidean and affine vectors.
The main object of this work is study some elementary comcepts in euclidean geometry.
Euclidean geometry is assumed throughout.
We define a language of visual geometry and describe an analogue of the euclidean exponential map.
Euclidean distance between x and y.
The relative way to determine the position of a point in space is called euclidean space.
Euclidean geometry of the plane.
It is then obtained a formula relating the euclidean curvatures of gamma with its focal curvatures.
Euclidean distance is a statistical measure of distance between two points.
Distance geometry is the study of euclidean geometry based on the distances between certain objects.
Euclidean distances are used.
Initially some elements of vector algebra that will guide the study in euclidean space.
A the euclidean distance between.
This work aims to show some basic applications of complex numbers in plane euclidean geometry.
Euclidean quantum gravity.
Automorphisms of a Euclidean space are motions and reflections.
Euclidean vector spaces.
It supports an analogue of the Euclidean division of polynomials.
Euclidean geometry is one of.
Lebesgue measure on Euclidean space is locally finite.
Euclidean vector space.
The property of being Euclidean is different from transitivity.
Euclidean plane isometries.
Popular choice is the Euclidean distance given by.
Euclidean plane isometry.
The solution is constant under Euclidean transforms.
