2006-08-10 11:41:20 · 7 answers · asked by babylac 1 in Education & Reference ➔ Homework Help
Geometry (Greek γεωμετρία; geo = earth, metria = measure) arose as the field of knowledge dealing with spatial relationships. Geometry was one of the two fields of pre-modern mathematics, the other being the study of numbers. In modern times, geometric concepts have been generalized to a high level of abstraction and complexity, and have been subjected to the methods of calculus and abstract algebra, so that many modern branches of the field are barely recognizable as the descendants of early geometry. (See areas of mathematics and algebraic geometry.)............
Or else :
1. The mathematics of the properties, measurement, and relationships of points, lines, angles, surfaces, and solids.
2. A system of geometry: Euclidean geometry.
3. A geometry restricted to a class of problems or objects: solid geometry.
4. A book on geometry
5. Configuration; arrangement.
6. A surface shape.
7. A physical arrangement suggesting geometric forms or lines.
2006-08-10 11:45:54 · answer #1 · answered by inatuk 4 · 1⤊ 0⤋
Geometry is the study of shape and size. Geometry was probably first developed to measure the earth and its objects. The word "geometry" geo + metry means "earth + to measure." Surveying land, designing buildings, and measuring commodities were probably important early on in people's history.
Today, geometry is useful in the study of chemistry, astronomy, and other sciences. A knowledge of basic geometry is useful in everyday life too. It is useful for measuring and designing. For example, carpeting a room, painting a house, building a picture frame, etc.
2006-08-10 11:46:32 · answer #2 · answered by ♥♫♥ÇHÅTHÜ®ÏKÃ♥♫♥ 5 · 0⤊ 1⤋
in fact, the only factor that i can discover in subject-unfastened with sacred geometry and alchemy is they the two handle forms of spirituality. Sacred geometry deals with using geometric types and shapes interior the layout and shape of church homes, temples, mosques or everywhere of non secular accumulating. those specific shapes propose specific issues, finding on the religion or theory device. as an occasion, the pentagram in Christianity refers back to the 5 senses. In Catholicism, it may each and every each and every now and then examine with the devil, or the Evil One. Alchemy deals with the technique of turning metals into gold, utilising chemical compounds and technology. despite the fact that, Alchemy is likewise a theory in looking the appropriate information by using chemistry. for this reason, alchemy is a spirituality all its very own. All in all, the only factor that i can work out in subject-unfastened between the two is they the two handle a sort, or types, of spirituality.
2016-12-11 11:42:34 · answer #3 · answered by beisler 3 · 0⤊ 0⤋
In basic terms, Geometry is the study of shapes and space (not outer space, but space in general) If you're going to be studying it, you will be studying shapes, theoroms, and you will be applying some algebraic comcepts.
2006-08-10 11:49:17 · answer #4 · answered by mrscharleybrown 2 · 0⤊ 0⤋
Good luck I hope this helps.
What is Geometry?
Geometry is the study of shapes and configurations. It attempts to understand and classify spaces in various mathematical contexts. For a space with lots of symmetries, the study naturally focuses on properties which are invariant (remaining the same) under the symmetries.
Euclidean Geometry
An example is the study of flat space, or Euclidean geometry. Between every pair of points there is a unique line segment, which is the shortest curve between those two points. These line segments can be extended to lines. Lines are infinitely long in both directions and, for every pair of points on the line, the segment of the line between them is the shortest curve that can be drawn between them. Furthermore, if you have a line and a point which isn't on the line, there is a second line running through the point, which is parallel to the first line (i.e. never hits it). All of these ideas can be described by a drawing on a flat piece of paper. From the laws of Euclidean Geometry, we get the famous theorem of Pythagoras, and all the formulas you learn in trigonometry. In Euclidean geometry, you also learned how to find the circumference and area of a circle.
Riemannian Geometry
Now suppose we are on the surface of a sphere, which is no longer flat, but curved. A shortest curve between any pair of points on a surface is called a minimal geodesic. You can find a minimal geodesic between two points by stretching a rubber band between them. The first thing that you will notice is that sometimes there is more than one minimal geodesic between two points. For example, there are many minimal geodesics between the north and south poles of a globe. As in Euclidean space, we can look for lines with the property that the segment between every pair of points on the line is a minimal geodesic. Curved surfaces are harder to study than flat surfaces, but there are still theorems that can be used to estimate the length of the hypotenuse of a triangle, the circumference of a circle, and the area inside the circle. These estimates depend on the amount that the surface is curved or bent. One of the basic topics in Riemannian Geometry is the study of such curved surfaces.
Gravitational Lensing
Riemannian Geometers also study higher dimensional spaces. The universe can be described as a three dimensional space. Near the earth, the universe looks roughly like three dimensional Euclidean space. However, near very heavy stars and black holes, the space is curved and bent. The Hubble Telescope has discovered points in space that have more than one minimal geodesic to the telescope. This is called gravitational lensing. The amount that space is curved can be estimated by using theorems from Riemannian Geometry and measurements taken by astronomers. Physicists believe that the curvature of space is related to the gravitational field of a star, according to a partial differential equation called Einstein's Equation. So using the results from the theorems in Riemannian Geometry, they can estimate the mass of the star or black hole which causes the gravitational lensing.
Other Types of Geometry
In general, any mathematical construction which has a notion of curvature falls under the study of geometry. Examples include:
Differential geometry which is a natural extension of calculus and linear algebra, and is known in its simplest form as vector calculus.
Algebraic geometry which studies objects defined by polynomial equations. This was vital to recent solutions of many difficult problems in number theory, such as the finiteness of solutions to the polynomial equations considered in Fermat's Last Theorem.
Semi-Riemannian geometry which Einstein used to study the four dimensional geometry of space and time.
Symplectic geometry which originated with the study of the evolution of simple mechanical systems, but now pervades all aspects of theoretical physics.
Courses
Our geometry courses reflect this immense range from the study of configuration of points and lines in flat and curved spaces to the geometry of objects defined by polynomial equations. Courses we offer beyond vector calculus include differential geometry of curves and surfaces, tensor calculus, differential geometry and general relativity, as well as projective and non-Euclidean geometry.
2006-08-10 12:18:08 · answer #5 · answered by Tennis_Ace 1 · 0⤊ 0⤋
http://www.answers.com/geometry&r=67
2006-08-10 12:10:33 · answer #6 · answered by Watermelon Punch 3 · 0⤊ 0⤋
The study of shapes and the math of shapes.
2006-08-10 11:48:26 · answer #7 · answered by Stephanie S 6 · 0⤊ 1⤋