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Coordinate geometry (or analytical geometry) allows the algebraic representation of geometric shapes. This then allows algebraic concepts to be applied to geometry.

Q: How can algebraic concepts be applied to geometry?

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Algebraic Geometry - book - was created in 1977.

Analytical geometry is more commonly known as coordinate geometry. Using Cartesian, Polar or other coordinates systems, geometric shapes can be represented in algebraic terms. This bringing together of algebra and geometry enables the results in one branch of mathematics to be applied to finding solutions in the other.

Algebraic Geometry is the study of Geometry using simple algebraic equations. For example, some questions look a bit like this: You have a rectangle. It's area is 56cm squared. If it's length is 2x+2, and its breadth is x, solve for x. You would do 56-2=54/3=18, so x would be equal to 18.

"Can I passed" needs to be "Can I pass" And yes, I believe you can. It is my opinion that trigonometry is loosely based on Geometry. There are also new concepts introduced in Trig that don't require much algebra skills.

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You can do so using coordinate (or analytical) geometry.

An algebraic geometer is a mathematician who specializes in algebraic geometry.

Kendig has written: 'Elementary algebraic geometry' -- subject(s): Algebraic Geometry, Commutative algebra, Geometry, Algebraic

Algebraic Geometry - book - was created in 1977.

Shreeram Shankar Abhyankar has written: 'Algebraic space curves' -- subject(s): Algebraic Curves, Curves, Algebraic 'Lectures on algebra' 'Local analytic geometry' -- subject(s): Analytic Geometry, Geometry, Analytic 'Enumerative Combinatorics of Young Tableaux (Pure and Applied Mathematics (Marcel Dekker))'

W. E. Jenner has written: 'Rudiments of algebraic geometry' -- subject(s): Algebraic Geometry, Geometry, Algebraic

William Elliott Jenner has written: 'Rudiments of algebraic geometry' -- subject(s): Algebraic Geometry, Geometry, Algebraic

Annette Klute has written: 'Real algebraic geometry and the Pierce-Birkhoff conjecture' -- subject(s): Algebraic Geometry, Geometry, Algebraic

Daniel Huybrechts has written: 'Fourier-Mukai Transforms in Algebraic Geometry (Oxford Mathematical Monographs)' 'The geometry of moduli spaces of sheaves' -- subject(s): Sheaf theory, Moduli theory, Algebraic Surfaces 'The geometry of moduli spaces of sheaves' -- subject(s): Algebraic Surfaces, Moduli theory, Sheaf theory, Surfaces, Algebraic 'Fourier-Mukai transforms in algebraic geometry' -- subject(s): Algebraic Geometry, Fourier transformations, Geometry, Algebraic

Otto Haupt has written: 'Geometrische Ordnungen' -- subject(s): Algebraic Geometry, Differential Geometry, Geometry, Algebraic, Geometry, Differential

An algebraic geometer is a mathematician who specializes in algebraic geometry.

It allowed points in space to be described algebraically. This allowed lines and curves to be described using algebra. Bringing together algebra and geometry meant that tools that mathematicians had developed for solving algebraic problems could be applied to problems in geometry and tools from geometry could be applied to algebra.