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What is the application of coordinate geometry in computers? - Quora. Coordinate geometry is mainly used for developing and/or visualizing different objects in two dimensional or three dimensional space. It helps identify where we can put things and how far or close objects are.
- What are the practical applications of coordinates in real life?
- Why coordinate geometry is important?
- What are the applications of analytical geometry?
- What is the use of coordinate geometry in astrology?
- What is the importance of the analytical geometry?
- What is the difference between geometry and coordinate geometry?
- How is coordinate geometry used in engineering?
- Which coordinate system is used to develop geometry?
- What is the history of coordinate geometry?
- What is the fundamental principle of analytic geometry?
- How do algebra and geometry work together to get geometric results within the coordinate plane?
- Is 3D geometry and coordinate geometry same?
- Is plane geometry and coordinate geometry same?
What are the practical applications of coordinates in real life?
The Cartesian coordinate plane of x and y works well with many simple situations in real life. For instance, if you are planning where to place different pieces of furniture in a room, you can draw a two-dimensional grid representing the room and use an appropriate unit of measurement.
Why coordinate geometry is important?
Coordinate geometry is one of the most important and exciting ideas of mathematics. ... It provides a connection between algebra and geometry through graphs of lines and curves. This enables geometric problems to be solved algebraically and provides geometric insights into algebra.
What are the applications of analytical geometry?
Analytic geometry is used in physics and engineering, and also in aviation, rocketry, space science, and spaceflight. It is the foundation of most modern fields of geometry, including algebraic, differential, discrete and computational geometry.
What is the use of coordinate geometry in astrology?
Knowing the positions of the planets around the Sun, we can then use simple coordinate geometry to transform their position with respect to an observer on Earth. Our task becomes simple since the orbits of all planets more or less lie in the same plane, viz. the ecliptic plane.
What is the importance of the analytical geometry?
analytic geometry, also called coordinate geometry, mathematical subject in which algebraic symbolism and methods are used to represent and solve problems in geometry. The importance of analytic geometry is that it establishes a correspondence between geometric curves and algebraic equations.
What is the difference between geometry and coordinate geometry?
Classical Euclidean geometry is primarily about points, lines and circles. In coordinate geometry, points are ordered pairs (x,y), lines are given by equations ax+by+c=0 and circles by equations (x−a)2+(y−b)2=r2.
How is coordinate geometry used in engineering?
On changing any shape or adding different colours changes the points on the coordinate plane. Scanner and photo copying machine also uses coordinate geometry to produce the exact image of the original image provided to it.
Which coordinate system is used to develop geometry?
Using the Cartesian coordinate system, geometric shapes (such as curves) can be described by Cartesian equations: algebraic equations involving the coordinates of the points lying on the shape.
What is the history of coordinate geometry?
History. The method of describing the location of points in this way was proposed by the French mathematician René Descartes (1596 - 1650). (Pronounced "day CART"). He proposed further that curves and lines could be described by equations using this technique, thus being the first to link algebra and geometry.
What is the fundamental principle of analytic geometry?
By means of this construction Fermat was able to formulate the fundamental principle of analytic geometry: Whenever two unknown quantities are found in final equality, there results a locus fixed in place, and the endpoint of one of these unknown quantities describes a straight line or a curve.
How do algebra and geometry work together to get geometric results within the coordinate plane?
Coordinate Geometry:
One way that algebra and geometry can be related is through the use of equations in graphs. We can plot a set of points (x, y) according to an equation (for example, the line graph on the left!) to form a graph. That's one way that algebra is related to geometry.
Is 3D geometry and coordinate geometry same?
3D geometry involves the mathematics of shapes in 3D space and involving 3 coordinates which are x-coordinate, y-coordinate and z-coordinate. In a 3d space, three parameters are required to find the exact location of a point.
Is plane geometry and coordinate geometry same?
Co-ordinate geometry treats shapes algebraically. Plane geometry uses lines and angules to work out relationships. For example: y= 3x +4 is the equation of a line with a slope of 3 units and which intersects the y-axis at the point (0,4).
