Algebra 59 - A Geometric View of Gauss-Jordan with Dependent Systems
By Why UFrom boclips.com
609.2K views
86.9K likes
This lecture examines an example of Gauss-Jordan elimination on a dependent system from Algebra chapter 58, and follows how the planes are geometrically transformed step by step, from a system of three planes, representing three equations, each containing three variables, to a system of two planes representing two equations, each containing only two variables. The result is a simpler system from which a parametric representation of the infinite solution set can then be easily written.
Tags
Application
Explainer
Calculus
Mathematics
Algebra
Computer Science
Geometry
Advanced Secondary
Comments
Leave a Comment
Comments are loading... If you don't see any, be the first to comment!
Related Videos
Algebra 43 - Types of Linear Systems in Three Variables
Why U
Algebra 44 - Solving Systems of Equations in Three Variables
Why U
Algebra 61 - Gauss-Jordan Elimination with Inconsistent Systems
Why U
Algebra 56 - A Geometrical View of Gauss-Jordan Elimination -
Why U
Solving Systems of Linear Equations by Elimination
LearnZillion Math
Using Systems of Equations to Model Real Life Situations
LearnZillion Math
Algebra 47 - Describing Infinte Solution Sets Parametrically
Why U
Algebra 57 - Dependent Equations and Systems
Why U
Algebra 49 - Three Variable Systems in the Real World - Problem 1
Why U
Solve Two-Step Equations Using a Number Line
Lincoln Learning Mathematics