Elliptical geometry has a considerable application in cosmology, astronomy, and navigation. It studies three-dimensional figures, unlike Euclidean geometry. It doesn't satisfy Euclid's parallel postulate. It is the study of the figures created on the surface of an ellipse. The area and surface formulas of hyperbolic geometry are different from the Euclidean geometry.Īnother type of non Euclid geometry is elliptical geometry. The sum of angles of a triangle is less than 180 degrees in this branch. The sum of angles in Euclidean geometry is 180. The properties of a triangle are different from the Euclidean geometry. There are at least two lines in hyperbolic geometry that are parallel with a given line through a point, not a line. The fifth postulate states that one given line is parallel with only one other line through a point, not a line. It is not valid for the fifth parallel postulate of Euclid. Hyperbolic geometry is a branch of non Euclidean geometry. These two branches discuss the characteristics of the respective figures. Non Euclidean geometry is classified based on the shape of the figures, elliptical geometry, and hyperbolic geometry. These figures are mainly of two types – hyperbola and ellipse. The figures that do not satisfy the parallel postulate are non euclidean. In geometry, two types of figures are there based on Euclid's parallel postulate. These are the figures of non Euclid geometry, which are different from the Euclidean figures for the theorems and axioms. Sphere, hyperbola, and other non Euclidean figures do not satisfy Euclid's parallel postulate. Hence, it is also known as hyperbolic geometry. Sphere and hyperbola are the main two figures of non Euclidean geometry. Hyperbolic geometry is to study the behaviour of pseudospherical surfaces and saddle surfaces. The study of the two-dimensional surfaces of the sphere is spherical geometry. Sphere and hyperbola are two significant figures of geometry. Gauss described those figures as non-Euclidean, and thus the concept of non Euclidean space arrived in geometry. The figures that don't satisfy Euclid's parallel postulate are non euclidean. The great mathematician Carl Friedrich Gauss realized that all the geometrical figures could not satisfy Euclid's parallel postulate. Here comes the concept of non euclidean geometry. A wrong idea was present that all the geometrical figures satisfy Euclid's parallel postulate. At that time, people used to think that there is only one type of geometry called euclidean. Greek mathematician Euclid presented the concept of Euclidean geometry. In this article, we are going to discuss non-Euclidean geometry in detail. It is the main reason for the existence of non-Euclidean geometry. The figures of non-Euclidean geometry do not satisfy Euclid's parallel postulate. It discusses the hyperbolic and spherical figures. Non Euclid geometry is a part of non Euclid mathematics. Non Euclidean geometry is the opposite of euclidean geometry. Greek mathematician Euclid employed a type of geometry, which studies the plane and solid figure of geometry with the help of theorems and axioms. It discusses the shape and structure of different geometrical figures.
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