Algebra 61 - Gauss-Jordan Elimination with Inconsistent Systems | Summary and Q&A

TL;DR

Systems of linear equations with parallel planes or triangular tubes are inconsistent and have no solutions.

Key Insights

• ✈️ Inconsistent systems have no solutions and are characterized by parallel planes or triangular tubes.
• ✈️ Parallel planes can be identified in the equations by the same variable coefficients and different constants.
• 🤨 Gauss-Jordan elimination transforms the matrix representing the system to reduced row echelon form, indicating inconsistency.
• 🫥 Triangular tubes occur when three planes' intersections form parallel lines, resulting in an inconsistent system.

Transcript

Hello. I'm Professor Von Schmohawk and welcome to Why U. So far, we have studied systems of linear equations which have single unique solutions infinitely many solutions or no solutions. And we have seen that when those systems are represented as augmented matrices it is easy to tell which type of solutions the system has once the matrix has been t... Read More

Questions & Answers

Q: How can we determine if a system of linear equations has no solutions?

A system is inconsistent if it contains parallel planes or triangular tubes, as no point can satisfy all equations simultaneously.

Q: Can we identify parallel planes without performing Gauss-Jordan elimination?

Yes, if two equations in a system have the same coefficients but different constants, they describe parallel planes.

Q: What happens during Gauss-Jordan elimination when reducing an inconsistent system?

A row with all zero coefficient entries and a non-zero constant entry is produced, indicating inconsistency.

Q: Are parallel planes the only configuration that can lead to an inconsistent system?

No, a system with three planes forming a triangular tube can also be inconsistent, as there is no point that lies on all three planes.

Summary & Key Takeaways

• Systems of linear equations with no solutions are called "inconsistent" and have no variable values that satisfy all equations.

• Parallel planes or triangular tubes in a system indicate inconsistency, as no point can lie on all planes simultaneously.

• Gauss-Jordan elimination can transform the matrix representing the system to reduced row echelon form, indicating inconsistency.