Purchase Solution

Working With Matrices

Not what you're looking for?

Ask Custom Question

Question: Any matrix B which is formed by the eigen vectors of a matrix A reduces the given matrix A to the diagonal form
by the transformation (inverse of B)AB.

i.e., (inverse of B)AB = diagonal matrix

Please view the attachment to see the fully formatted problem.

Purchase this Solution

Solution Summary

This solution is comprised of a detailed explanation to find the eigen values, eigen vectors, and eigen spaces of a given matrix. It also explains the diagonalizable matrix concept. The solution is detailed and well presented in an attached Word document.

Solution provided by:
Education
  • BSc, Manipur University
  • MSc, Kanpur University
Recent Feedback
  • "Thanks this really helped."
  • "Sorry for the delay, I was unable to be online during the holiday. The post is very helpful."
  • "Very nice thank you"
  • "Thank you a million!!! Would happen to understand any of the other tensor problems i have posted???"
  • "You are awesome. Thank you"
Purchase this Solution


Free BrainMass Quizzes
Solving quadratic inequalities

This quiz test you on how well you are familiar with solving quadratic inequalities.

Know Your Linear Equations

Each question is a choice-summary multiple choice question that will present you with a linear equation and then make 4 statements about that equation. You must determine which of the 4 statements are true (if any) in regards to the equation.

Exponential Expressions

In this quiz, you will have a chance to practice basic terminology of exponential expressions and how to evaluate them.

Probability Quiz

Some questions on probability

Multiplying Complex Numbers

This is a short quiz to check your understanding of multiplication of complex numbers in rectangular form.