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Why is Cartesian geometry so important?
Cartesian geometry, developed by René Descartes, is crucial because it establishes a systematic framework for representing geometric shapes algebraically through coordinates. This integration of algebra and geometry allows for the formulation of geometric problems using equations, facilitating calculations and enabling the application of algebraic techniques. Additionally, it laid the foundation for analytic geometry and calculus, significantly advancing mathematical analysis and its applications in physics, engineering, and computer science. Its influence is evident in various fields, making it a cornerstone of modern mathematics.
What are the five branches of mathematics?
geometry, Algebra , trigonometry calculus, physics
Who invented coordinate geomtry?
Coordinate geometry, also known as analytic geometry, was developed by the French mathematician René Descartes in the 17th century. He introduced the idea of using a coordinate system to represent geometric shapes algebraically, allowing for the analysis of geometric problems using algebraic equations. This innovative approach laid the foundation for much of modern mathematics and has had a profound impact on various fields, including physics and engineering.
How is basketball related to geometry and physics?
That's a hard question. The only thing I can think of is when Quinn says that Basketball is Basic Geometry & Physics on Zoey 101. I'm not sure how they're related. Good question.
If you're good at geometry does that mean you will be good at physics?
it really depends, because math basically connects with everything. But it will help if you are good at geometry
Why is Cartesian geometry so important?
Cartesian geometry, developed by René Descartes, is crucial because it establishes a systematic framework for representing geometric shapes algebraically through coordinates. This integration of algebra and geometry allows for the formulation of geometric problems using equations, facilitating calculations and enabling the application of algebraic techniques. Additionally, it laid the foundation for analytic geometry and calculus, significantly advancing mathematical analysis and its applications in physics, engineering, and computer science. Its influence is evident in various fields, making it a cornerstone of modern mathematics.
Do I have a chance in physics chemistry and engineering if I'm good at math?
Yes. In fact you need to be very good at mathematics. Both physics and engineering (the practical application of, primarily, physics) are essentially mathematical.
Trace the history of geometry or tell something about the development of geometry?
The Development of Analytic Geometry Overview The fundamental idea of analytic geometry, the representation of curved lines by algebraic equations relating two variables, was developed in the seventeenth century by two French scholars, Pierre de Fermat and René Descartes. Their invention followed the modernization of algebra and algebraic notation by François Viète and provided the essential framework for the calculus of Isaac Newton and Gottfried Leibniz. The calculus, in turn, would become an indispensable mathematical tool in the development of physics, astronomy, and engineering over the next two centuries.
What is geometry vital for?
engineering and physics.
What has the author Roberto Torretti written?
Roberto Torretti has written: 'The Philosophy of Physics (The Evolution of Modern Philosophy)' 'Relativity and geometry' -- subject(s): Differential Geometry, Geometry, Geometry, Differential, Philosophy, Relativity (Physics)
What is the value of di?
If you mean 'pi,' the value of pi necessary for almost all practical mathematics is: 3.14159265 Further than that is only necessary for very delicate geometry and physics.
What is the meaning of pure physics?
the gathering of physics related information that adds to the knowledge of human body. Not directly concerned with the practical use and application of the information branches of pure physics bio-physics, cryogenics, electricity, electronics, magnetism, geo-physics, mathematical, mechanics, sound, nuclear physics, quantum physics, plasma physics, particle physics, statistical and thermodynamics.
What has the author C Zwikker written?
C. Zwikker has written: 'Technische physik der werkstoffe' -- subject(s): Materials, Mathematical physics, Nuclear physics, Physics 'The advanced geometry of plane curves and their applications' -- subject(s): Curves, Plane Geometry 'Advanced plane geometry' -- subject(s): Plane Geometry
Define and differentiate science and technology?
science means studying about anything like physics,biology or anything whereas technology means the application of science in a practical way to have a better life
What are the five branches of mathematics?
geometry, Algebra , trigonometry calculus, physics
What is the application of physics in mathematics?
there is none
How is basketball related to geometry and physics?
That's a hard question. The only thing I can think of is when Quinn says that Basketball is Basic Geometry & Physics on Zoey 101. I'm not sure how they're related. Good question.
