How to use in-sentence of “euclidean”:
+ In the Euclidean plane, their angles would sum to 450°; i.e., a circle and a quarter.
+ It is Euclidean geometry, but not plane geometry.
+ The field of geometry which follows all of Euclid’s axioms is called Euclidean geometry.
+ In Euclidean space, a region is a convex set if the following is true.
+ Some theorems of Euclidean geometry cannot be used on the sphere, many of them have been adapted though.
+ Today that system is referred to as Euclidean geometry to distinguish it from other so-called non-Euclidean geometries which mathematicians developed in the 19th century.
Example sentences of “euclidean”:
+ On the average, space is very nearly flat, meaning that Euclidean geometry is experimentally true with high accuracy throughout most of the Universe.
+ The name cartesian comes from the French peopleFrench mathematician and philosopher René Descartes, who worked to merge algebra and Euclidean geometry.
+ On the average, space is very nearly flat, meaning that Euclidean geometry is experimentally true with high accuracy throughout most of the Universe.
+ The name cartesian comes from the French peopleFrench mathematician and philosopher René Descartes, who worked to merge algebra and Euclidean geometry.
+ Non-Euclidean geometry is more complicated than Euclidean geometry but has many uses.
+ In Euclidean geometryEuclidean plane geometry, a quadrilateral is a edges.
+ The smallest possible polygon in a Euclidean geometry or “flat geometry” is the triangle, but on a sphere, there can be a digon and a henagon.
+ A straight line from plane Euclidean geometry corresponds to a Great Circle in non-Euclidean spherical geometry.
+ One can tessellationtessellate 4-dimensional Euclidean space by regular 16-cells.
+ Underlying this explanation is the fact that Euclidean geometry is not the actual geometry of space, but an approximation which works well at the level of human life.
+ All normal Euclidean spaces are also Hilbert spaces.
+ Linear algebraVector algebra and Euclidean plane and three-dimensional space.
+ The geometry of the universe is therefore not the ordinary Euclidean geometry of our everyday lives.
+ Very often, the spheres all have the same size, and the space used is usually three-dimensional Euclidean space.