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1.1 What Can We Expect

 

Reading

Chapter 1 Section 1.1 from Understanding Linear Algebra, by David Austin.

In Figure 1.1.5, there is an example of 3 planes intersecting in a point (one solution) and 3 planes having no points common to all three planes (no solutions). Can you imagine an arrangement of the 3 planes so that there are infinitely many points common to all three planes (infinitely many solutions)?

Summary:
Possible Number of Solutions of a Linear System:
  1. zero solutions
  2. one solution
  3. infinitely many solutions
Connecting to the next section:

Equation of a Line in the Plane: ax+by=c
Systems in two variables can be thought of as looking for intersections of a set of lines.

Equation of a Plane in R3:ax+by+cz=d:
Systems in three variables can be thought of as looking for intersections of a set of planes.

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Math 220, Matrices Copyright © 2018 by Kristen Pueschel is licensed under a Creative Commons Attribution 4.0 International License, except where otherwise noted.

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