About: Euclidean plane   Sponge Permalink

An Entity of Type : dbkwik:resource/NFb8hEdf4aO8B5_L5xml2w==, within Data Space : 134.155.108.49:8890 associated with source dataset(s)

The Euclidean plane is a flat, infinitely large two-dimensional space following the rules of two-dimensional Euclidean geometry. It can be formed from the Cartesian product of two copies of the Euclidean line. A plane can be used to bisect a cell, and cells can have planes of symmetry through which they are reflected. The place at which a cell intersects a plane gives a two-dimensional shape and the change in shape as the cell passes through the plane can give information about the structure of the cell.

AttributesValues
rdf:type
rdfs:label
  • Euclidean plane
rdfs:comment
  • The Euclidean plane is a flat, infinitely large two-dimensional space following the rules of two-dimensional Euclidean geometry. It can be formed from the Cartesian product of two copies of the Euclidean line. A plane can be used to bisect a cell, and cells can have planes of symmetry through which they are reflected. The place at which a cell intersects a plane gives a two-dimensional shape and the change in shape as the cell passes through the plane can give information about the structure of the cell.
dcterms:subject
dimensionality
  • 2(xsd:integer)
faces
  • 1(xsd:integer)
dbkwik:verse-and-d...iPageUsesTemplate
Image
  • Cartesian-coordinate-system.svg.png
equivalent manifold
  • Euclidean plane
abstract
  • The Euclidean plane is a flat, infinitely large two-dimensional space following the rules of two-dimensional Euclidean geometry. It can be formed from the Cartesian product of two copies of the Euclidean line. A plane can be used to bisect a cell, and cells can have planes of symmetry through which they are reflected. The place at which a cell intersects a plane gives a two-dimensional shape and the change in shape as the cell passes through the plane can give information about the structure of the cell. There is more than one way to make a 2D Cartesian plane. You could say the lines should be slightly slanted, as long as they parallel.
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