Lines: Vector Equation
Only one line can pass through any two distinct points in 3-space. Assume that we have two points, and , and there is a point that lies in the same line. If , , and , then a vector equation for the line is
(1)
is called a parameter and the non-zero vector is called a direction vector. The components of the ditection vector are known as the direction numbers for the line.
There is an alternative vector equation for the line: .
Parametric Equations
Consider the aforementioned vectors having the following components:
and we know that . So,
These equations are called parametric equations for the line passing through and .
Symmetric Equation
Symmetric equations for the line passing through and are defined as
(2)
Planes: Vector Equation
There is only one plane containing point with a vector normal to the plane. If is any point on , and and , then a vector equation of the plane is
(3)
Cartesian Equation
If a plane has the normal vector of and contains the point , then the point-normal form of the equation of the plane is
(4)
8-Minute Lecture on Lines and Planes in 3D
Reference
Dennis G. Zill. Advanced Engineering Mathematics, edition. Jones Bartlett Learning. 2016.