What is a Coordinate System?
Mathematics in ancient days was divided into two branches namely ‘Algebra’ and ‘Geometry’. Algebraic equations weren't utilized in geometry and geometrical figures weren't utilized in algebra. But these two branches were put together by the French mathematician Rene Descartes for the primary time. He introduced the concept of the plane or frame of reference to elucidate geometry and algebra together.Most coordinate systems use two numbers, a coordinate, to spot the situation to some extent. Each of those numbers indicates the distance between the purpose and a few fixed points of reference, known as the origin. The primary number, referred to as the X value, indicates how left or right the purpose is from the origin. The second number, referred to as the Y value, indicates how far above or below the purpose is from the origin. The origin features a coordinate of 0, 0.
What is a Number Line?
The simplest example of a coordinate system can be the identification of points on a line with real numbers using the concept of the number line. In the system of number lines, an arbitrary point O (the origin) is chosen on a given line. The coordinate of a point namely P is defined as the signed distance from point O to point P, where the signed distance is the distance taken as positive(+ve) or negative (-ve) depending on which side of the line named P lies. Each point on the number line is assigned a unique coordinate and each real number is the coordinate of a unique point on the number line.
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Different Types of Coordinate Systems
1. Cartesian Coordinate System
The prototypical example of a coordinate system can be the Cartesian Coordinate System. In the plane, any two perpendicular lines are chosen and then the coordinates of a point are taken to be the signed distances to the lines.
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In three dimensions, we generally need to choose mutually orthogonal planes and the three coordinates of a point are generally the signed distances to each of the planes. We can generalize to create a number of coordinates for any pointanin a n-dimensional Euclidean space.
Depending on the direction that's left or right and therefore the order of the coordinate axes, the three-dimensional system could also be a right-handed system or a left-handed system. This is often one among the various coordinate systems.
Let’s Know What is Right-Handed vs. left-Handed
In a right-handed coordinate system, the direction in which your hand closes to make a fist can be defined as the direction of a positive rotation around any axis that can be represented by the extended right-hand thumb.
In a left-handed coordinate system, the direction when your hand closes to form a fist is the direction of a positive rotation around any axis which will be represented by the extended left-hand thumb.
A coordinate system or frame of reference is used to locate the position of any point which points are often plotted as an ordered pair (x, y) referred to as Coordinates. The horizontal number line is named as X-axis and the vertical number line is understood as Y-axis and therefore the point of intersection of those two axes is understood as the origin and it's denoted as ‘ O ‘.
Note:
1. The coordinate plane is also known as a Two- dimensional plane.
2. X-axis can be named as XX’ and Y -axis can be named as YY’
Quadrants of Coordinate System
For quadrants of the coordinate system the Coordinate axes named XX’ and YY’ divides the cartesian plane into basically four quadrants. In the fig. 3 shown below, see the following:
The region XOY is known as the first quadrant.
The region X’OY is known as the second quadrant.
The region X’OY’ is known as the third quadrant.
The region Y’OX is known as the fourth quadrant.
These are the quadrants of the coordinate system.
Sign Convention
The ray named OX on the X-axis is taken as positive, and the ray named OX’ as negative X-axis, OY on Y-axis as positive and OY as negative.
Accordingly, the distance measured along OX will be taken as positive and along OX’ will be taken as negative.
I- quadrant (Positive, Positive) (+,+)
II-quadrant (Negative, Positive) (-,+)
III-quadrant(Negative,Negative) (-,-)
IV-quadrant(Positive, Negative) (+,-)
Similarly, the distance along OY can be taken as positive and along OY’ can be taken negatively.
2. Polar Coordinate System
Another common coordinate system for the plane is that coordinate system. A point is chosen because the pole and a ray from now are taken because of the polar axis. For any given angle suppose θ, there's one line through the pole whose angle with the polar axis is θ (can be measured counterclockwise from the axis to the line). Then there's a singular point on this line whose signed distance from the origin is r for given number r. For a given pair of coordinates (r, θ) there's one point, but any point is represented by many pairs of coordinates. For instance, (r, θ), (r, θ+2π) and (−r, θ+π) are all polar coordinates for an equivalent point. The pole can be represented by (0, θ) for any value of θ.
Plotting Coordinates on Graph
We always write coordinates in brackets, with a comma separating the two coordinates. The first number represents the point on the X-axis, and the second number represents the position on the Y-axis, as coordinates are ordered pairs of numbers.
When reading or plotting coordinates, we always start at the first and work our way up. This is a good way to remember it: Up the stairs and across the landing. We follow the X-axis until we reach 4 and draw a vertical line at x=4 to plot the points (4,5) in the Cartesian coordinate plane.
Similarly, we construct a horizontal line at y=5 by following the Y-axis until we reach 5. In the Cartesian plane, the intersection of these two lines equals (4,5). This position is 4 units from the Y-axis and 5 units away from the X-axis. As a result, the position of (4,5) is in the Cartesian plane.
Fun Facts
The Coordinate System has its use in Geography too.
Longitude and latitude are a special kind of coordinate system, known as a spherical coordinate system since they identify points on a sphere or globe. However, there are many other coordinate systems utilized in different places around the world to spot locations in the world. All of those coordinate systems place a grid of vertical and horizontal lines over a flat map of some part of the world.
A complete definition of a coordinate system requires the following points given below:
It is the projection that can be used to draw the earth on a flat map.
Location of the origin.
The units that can be used to measure the distance from the origin.
Questions to be solved
Question 1) In which quadrant is the point with coordinates (–3,–21)?
Answer: The point (-3, -21)in the Third Quadrant.
Question 2) In which quadrant is the point with coordinates (–3, 21)?
Answer: The point (-3, 21) lies in the Second Quadrant.
Question 3) In which quadrant do the following points lie?
(a) (3,–8)
(b) (–1,–3)
(c) (2,5)
(d) (–7,3)
Answer:
(a) The x coordinate is positive, and the coordinate is negative. So, point (3,–8) lies in the IV quadrant
(b) The x coordinate is negative, and the coordinate is negative. So, point (–1,–3) lies in the III quadrant.
(c) The x coordinate is positive, and the coordinate is positive. So point (2,5) lies in the I quadrant.
(d) The x coordinate is negative, and the coordinate is positive. So, point (–7,3) lies in the II quadrant.
Question 4) Plot the following points
A(2,2),B(–2,2),C(–2,–1),D(2,–1)
A(2,2),B(–2,2),C(–2,–1),D(2,–1) in the Cartesian plane. Discuss the type of the diagram by joining all the points taken in order.
Question 5) Calvin is required to locate the points M (3, 0), N (3,5), and P (3, -2) on a Cartesian system and check if they are collinear. Help Calvin do this.
FAQs on Coordinate System
1. What is a coordinate system in mathematics?
A coordinate system is a framework used to uniquely determine the position of a point or other geometric element in a plane or in space. It uses one or more numbers, called coordinates, which are the signed distances to the point from fixed perpendicular lines (axes). This system, famously developed by René Descartes, bridges the gap between algebra and geometry by allowing geometric shapes to be described with algebraic equations.
2. What are the key components of a Cartesian coordinate system?
The Cartesian coordinate system, also known as the rectangular coordinate system, is built upon several key components:
- The Axes: Two perpendicular number lines. The horizontal line is called the x-axis, and the vertical line is the y-axis.
- The Origin: The point where the x-axis and y-axis intersect. Its coordinates are always (0, 0).
- Coordinates: An ordered pair of numbers, written as (x, y), that specifies the location of a point. The first number (abscissa) is the horizontal position, and the second number (ordinate) is the vertical position.
3. How are the four quadrants in a coordinate plane defined by sign conventions?
The x and y axes divide the coordinate plane into four regions called quadrants. The sign of the x and y coordinates determines which quadrant a point lies in:
- Quadrant I: Both x and y are positive (+, +).
- Quadrant II: x is negative, and y is positive (-, +).
- Quadrant III: Both x and y are negative (-, -).
- Quadrant IV: x is positive, and y is negative (+, -).
4. What is the correct method for plotting a point, for example (4, 5), on a Cartesian plane?
To plot the point (4, 5), you start at the origin (0, 0). First, you move along the x-axis to the value of the first coordinate, which is 4 units to the right. From there, you move parallel to the y-axis according to the second coordinate, which is 5 units up. The location where you end up is the point (4, 5).
5. What is the main difference between the Cartesian and Polar coordinate systems?
The primary difference lies in how they locate a point. The Cartesian system uses two perpendicular distances (x, y) from two fixed axes. In contrast, the Polar system uses a distance and an angle to locate a point. It specifies a point's position by its distance 'r' from a central point (the pole) and an angle 'θ' from a fixed direction (the polar axis).
6. How is the concept of a coordinate system applied in real-world technologies like GPS?
GPS (Global Positioning System) technology relies on a spherical coordinate system to function. Your location on Earth is identified using latitude and longitude, which are angles that define a precise point on the globe's surface. This grid system allows satellites to triangulate your position and provide accurate navigation, mapping, and location services on digital devices.
7. What are the fundamental formulas used in coordinate geometry to measure distance and find a midpoint?
Two fundamental formulas in coordinate geometry are:
- Distance Formula: To find the distance 'd' between two points (x₁, y₁) and (x₂, y₂), you use the formula: d = √[(x₂ - x₁)² + (y₂ - y₁)²].
- Midpoint Formula: To find the coordinates of the midpoint of a line segment joining (x₁, y₁) and (x₂, y₂), you use: M = ( (x₁ + x₂)/2 , (y₁ + y₂)/2 ).
8. While we commonly use a 2D plane, how does a coordinate system extend to represent points in three-dimensional space?
To represent points in three-dimensional space, a third axis, the z-axis, is introduced. This z-axis is perpendicular to both the x-axis and the y-axis. A point in 3D space is then located using an ordered triplet of coordinates (x, y, z), where each value represents the signed distance from the origin along its respective axis.
9. Why was the development of the coordinate system considered a major breakthrough in mathematics?
The coordinate system was a monumental breakthrough because it unified algebra and geometry for the first time. Before its invention, these two branches of mathematics were studied separately. By assigning coordinates to points, it became possible to represent geometric figures like lines, circles, and parabolas with algebraic equations. This allowed mathematicians to use algebraic methods to solve geometric problems, leading to powerful new insights and advancements.
10. How can you use a coordinate system to determine if three given points are collinear?
To determine if three points, say A, B, and C, are collinear (lie on the same straight line), you can use the concept of slope. First, calculate the slope of the line segment AB and the slope of the line segment BC. If the slopes are identical, it means the points lie on the same line and are therefore collinear. An alternative method is to use the distance formula: if the sum of the lengths of any two segments (e.g., AB + BC) equals the length of the third segment (AC), the points are collinear.
