The History And Contributions :: essays research papers

Greek GeometryAlthough the original roots of geometry can be traced to the Egyptians, the Greeks built on close Egyptian theories that we use today. Greek uranology and Greek geometry were both used in order to answer numerous difficult questions of the time. Without geometry, the study of astronomy would have been almost impossible, and vice versa. eve though legion(predicate) Greek theorems and principles were later built on by geniuses such as Einstein and Lobachevsky, the basis still remains the same. The festering of Greek geometry is said to be started by Thales of Miletus. Thales came from Egypt with a number of nonrepresentational principles that the Greeks were able to use for practical purposes. He lived towards the beginning of the sixth century B.C, and has been credited with many geometric theorems. Some of the most important theorems real by Thales included-If two triangles have two angles and one office is respectively equal, then both triangles are congruen t to each other. -Angles at the base of any isosceles triangle are equal. -If two directly lines intersect, then the opposite angles formed are equal. Thales also did much pull in with the height of pyramids by measuring the height of the pyramids shadow only at a specific time of the day. While most of his theorems were proven, some that were not pertained to a ships distance from shore and the bisector of a circle. His discoveries lead to the formation of many other theorems by later Greeks such as Pythagoras and Plato. These two work force (next to Thales) contributed the most to Greek geometry. Pythagoras discovered and proved many different theorems and ideas that contributed greatly to the growth of geometry. Some of Pythagorass proven discoveries included -All of the angles in a triangle add up to the sum of two right angles. -The development and use of geometrical algebra.-The theorem of Pythagoras. a2 + b2 = c2 Pythagoras also did many studies with triangles and develop ing or editing shapes. His most famous discovery was the Pythagorean theorem (listed above). This theorem combined the sides of a right triangle, and this led to the development of irrational numbers by Pythagoras later on. Pythagoras discovered that the substantial root of 2 was an irrational number. Plato, another great mind of Greece, did to a greater extent than just develop theorems for geometry, he stressed that geometry was essential. Plato believed that everyone should be well educated in mathematics as well as geometry.