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Q: What is applications of geometry?

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Pilots and captains of ship use spherical geometry to navigate their working wheel to move it. They can measure their pathway and destiny by using Spherical Geometry.

Some of the many applications that pi is used in geometry are as follows:- Finding the area of a circle Finding the circumference of a circle Finding the volume of a sphere Finding the surface area of a sphere Finding the surface area and volume of a cylinder Finding the volume of a cone

One main characteristic of non-Euclidean geometry is hyperbolic geometry. The other is elliptic geometry. Non-Euclidean geometry is still closely related to Euclidean geometry.

molecular geometry is bent, electron geometry is tetrahedral

Geometry is used in a ton of things. We are constantly surrounded by the different spaces, shapes and sizes of things. Geometry not only make things a reality, it also makes them easier to understand.I use it when I play pool. I used it when cutting wood to patch my roof the other day. There are lots of other uses that I haven't listed, but it does have real world applications.

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Fun geometry, specific geometry, monster geometry, egg geometry, trees, turtles.

in real life what are applications of alanlytical geometry

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Just take a look at a US dollar bill and you'll find many applications of coordinated geometry on it.

Analytical geometry is used widely in engineering. It set the foundation for algebraic, differential, discrete, and computational geometry. It is the study of geometry using a coordinate system.

Pilots and captains of ship use spherical geometry to navigate their working wheel to move it. They can measure their pathway and destiny by using Spherical Geometry.

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Arnold Emch has written: 'An introduction to projective geometry and its applications' -- subject(s): Accessible book, Analytic Geometry, Geometry, Analytic, Geometry, Projective, Plane, Projective Geometry 'Mathematical models' -- subject(s): Mathematics, Study and teaching

M. Francaviglia has written: 'Applications of infinite-dimensional differential geometry to general relativity' -- subject(s): Differential Geometry, Function spaces, General relativity (Physics) 'Elements of differential and Riemannian geometry' -- subject(s): Differential Geometry, Riemannian Geometry

The field emerged during the 3rd century BC from applications of geometry. Trigonometric functions were among the earliest uses for mathematical tables.

Euclidean geometry has become closely connected with computational geometry, computer graphics, convex geometry, and some area of combinatorics. Topology and geometry The field of topology, which saw massive developement in the 20th century is a technical sense of transformation geometry. Geometry is used on many other fields of science, like Algebraic geometry. Types, methodologies, and terminologies of geometry: Absolute geometry Affine geometry Algebraic geometry Analytic geometry Archimedes' use of infinitesimals Birational geometry Complex geometry Combinatorial geometry Computational geometry Conformal geometry Constructive solid geometry Contact geometry Convex geometry Descriptive geometry Differential geometry Digital geometry Discrete geometry Distance geometry Elliptic geometry Enumerative geometry Epipolar geometry Euclidean geometry Finite geometry Geometry of numbers Hyperbolic geometry Information geometry Integral geometry Inversive geometry Inversive ring geometry Klein geometry Lie sphere geometry Non-Euclidean geometry Numerical geometry Ordered geometry Parabolic geometry Plane geometry Projective geometry Quantum geometry Riemannian geometry Ruppeiner geometry Spherical geometry Symplectic geometry Synthetic geometry Systolic geometry Taxicab geometry Toric geometry Transformation geometry Tropical geometry

Manuel Schwarz has written: 'Vector analysis with applications to geometry and physics'

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