Best Answer

Right from the early life geometry begins. it has passed through many stages and now we got a well developed method and so many ideas about geometry.

we can simply say that it is a way or an idea of solving mathematical problems and related with shapes , angles , area, length etc.... but in ancient times geometry was commonly used in real life for astronomy, surveying, navigation etc. Euclid was referred to as the father of geometry. Many other mathematicians also introduced many methods for geometry. so because of all these we got new methods , ideas and ways for geometry.geometry is also a factor for developing a nation...........

Q: What is conclusion in geometry?

Write your answer...

Submit

Still have questions?

Continue Learning about Math & Arithmetic

A direct proof in geometry is a proof where you begin with a true hypothesis and prove that a conclusion is true.

just write 'bout wat ya think

Intuition, induction, and deduction are types of reasoning used in geometry. Deduction uses logic to form a conclusion based on given statements.

Inductive reasoning is used in geometry to arrive at a conclusion based on what one observes. It is not a method of valid proof, but can be used to arrive at conclusions, such as looking at a triangle with three sides and deducing that the three sides are the same based on the naked eye.

in geometry symbolic notation is when you substitute symbols for words. For example let your hypothesis= p and let your conclusion = q. You would write your biconditional as p if and only if q

Related questions

conclusion in geometry means the answer that you and your group came up to and that is what the word conclusion means in geometry.

A direct proof in geometry is a proof where you begin with a true hypothesis and prove that a conclusion is true.

The conclusion of molecular geometry is the three-dimensional arrangement of atoms that determines a molecule's shape. By understanding the arrangement of atoms, scientists can predict a molecule's physical and chemical properties.

just write 'bout wat ya think

Intuition, induction, and deduction are types of reasoning used in geometry. Deduction uses logic to form a conclusion based on given statements.

well idk well but i did dis project too n ya....ill just tell ya wat i wrote:P I have learned variety of things through this geometry project. I learned how geometry is a huge part of our environment and how it develops our living in many ways. Also, I now have a broader understanding of geometry and its usefulness to everyday life. Starting from the history and the background of geometry, I recognized the connections between mathematics and world history. In addition, in-depth understanding of one major historical figures in the evolution of geometry. With shapes and the terms of geometry, hope it helped u

If you are talking about Geometry, then it tricked me, too. Turns out, hypothesis is what is AFTER the "if." DO NOT INCLUDE THE "IF", IT'S WRONG. And the conclusion is everything AFTER the "then." DO NOT INCLUDE "THEN", IT'S WRONG!" And the hypothesis does NOT have to come before the conclusion. ex. If it is Monday, then we have school. hypothesis, "It is Monday." conclusion, "We have school." example of the If-Then going "Then-If" (so to speak): We have school if it is Monday. hypothesis, "It is Monday." conclusion, "We have school." See? Simple, right. But, tests can be tricky, so watch out!

Inductive reasoning is used in geometry to arrive at a conclusion based on what one observes. It is not a method of valid proof, but can be used to arrive at conclusions, such as looking at a triangle with three sides and deducing that the three sides are the same based on the naked eye.

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

Law of Detachment states if p→q is true and p is true, then q must be true. p→q p therefore, q Ex: If Charlie is a sophomore (p), then he takes Geometry(q). Charlie is a sophomore (p). Conclusion: Charlie takes Geometry(q).

* geometry in nature * for practcal use of geometry * geometry as a theory * historic practical use of geometry

Euclidean geometry, non euclidean geometry. Plane geometry. Three dimensional geometry to name but a few