Normal Form for Plane Equations
Definition
The normal form of a plane equation is a representation of a plane in Cartesian coordinates using a normal vector and a distance from the origin.
Equation
The equation of a plane in normal form is given by: ``` n · (x - p) = d ``` where * **n** is the normal vector to the plane, with components (a, b, c). * **p** is a point on the plane, with coordinates (x
0, y
0, z
0). * **d** is the directed distance from the origin to the plane, which is positive if **n** points away from the origin and negative if **n** points towards the origin.
Applications
The normal form of a plane equation is useful for various applications, including: * Determining whether a point lies on a plane * Finding the intersection of planes * Computing the distance between a point and a plane * Determining the direction of a plane's normal vector
Conclusion
The normal form of a plane equation provides a concise and geometrically intuitive way to represent planes in Cartesian coordinates. Its simplicity and versatility make it a valuable tool for a wide range of mathematical and engineering applications. By understanding the concept of the normal form, individuals can effectively analyze and manipulate planes in three-dimensional space.
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