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Current Location > Math Formulas > Linear Algebra > Cartesian Coordinate

Cartesian Coordinate

The invention of Cartesian coordinates in the 17th century by René Descartes revolutionized mathematics by providing the first systematic link between Euclidean geometry and algebra.

A coordinate system consists of four basic elements:
Choice of origin
Choice of axes
Choice of positive direction for each ax
Choice of unit vectors for each axes

Infinitesimal Line Element:
Consider a small infinitesimal displacement ds between two points P₁and P₂ (Figure1). In Cartesian coordinates this vector can be decomposed into:

Figure 1: Displacement between two points.

Infinitesimal Area Element:
An infinitesimal area element of the surface of a small cube is given by
dA= (dx) (dy)
Area elements are actually vectors where the direction of the vector

is perpendicular to the plane defined by the area. Since there is a choice of direction, we shall choose the area vector to always point outwards from a closed surface, defined by the right-hand rule. So for the above, the infinitesimal area vector is:

Infinitesimal Volume Element:
An infinitesimal volume element in Cartesian coordinates is given by
dV = dx dy dz

The position of any point on the Cartesian plane is described by using two numbers: (x, y). The first number x is the horizontal position of the point from the origin. It is called the x-coordinate. The second number, y, is the vertical position of the point from the origin. It is called the y-coordinate. Since a specific order is used to represent the coordinates, they are called ordered pairs

For example, the ordered pair (5, 9) represents point 5 units to the right of the origin in the direction of the x-axis and 9 units above the origin in the direction of the y-axis.

In a system formed by a point, O, and an orthonormal basis at each point, P, there is a corresponding vector

in the plane such that:

The coefficients x and y of the linear combination are called coordinates of point P.
The first x is the abscissa and the second y is the ordinate. As the linear combination is unique, each point corresponds to a pair of numbers and each pair of numbers to a point.

Using Cartesian coordinates on the plane, the distance between two points (x₁, y₁) and (x₂, y₂) is defined by the formula

,
which can be viewed as a version of the Pythagorean Theorem. Similarly, the angle that a line makes with the horizontal can be defined by the formula
θ = tan-1(m),
where m is the slope of the line.

Midpoint formula
If (x₁,y₁) and (x₂,y₂) are two points, the midpoint of the line joining these two points is given by:

Example 1: Plot the graph of Cartesian coordinate points A (2, − 4), B (4, 3), C (−2, 3) and D (−3, −4).
Solution:
As shown in the figure:
A (2, − 4) lies in the fourth quadrant,
B (4, 3) lies in the first quadrant,
C (−2, 3) lies in the second quadrant,
D (−3, −4) lies in the third quadrant.

Example 2: Find the Cartesian coordinate distance between the points A (3, 6) and B (6, 3).
Solution:
Let "d" be the distance between A and B.
(x₁,y₁) = (3, 6) and (x₂,y₂) = (6,3)
Then d (A, B) is determined by:

Example 3: Find the equation of the line having slope 7 and y-intercept -3
Solution:
Applying the slope-intercept formula, the equation of the line is given by: y = mx + c, where m = 7, and c = -3.

Insert the values we have:
y = 7x + (-3)
y = 7x - 3
Rearranging the above equation, we get
7x - y - 3 = 0.

Example 4: Determine the midpoint coordinates of a line segment joining points A (6, 8) and B (-1,-5)
Solution:
We know that:
x₁ = 6
x₂ = -1
y₁ = 8
y₂ = -5

The required mid point is given by:

Let the midpoint be denoted by M (a, b), we have: