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Suppose A is a square matrix. Suppose x is an eigenvector of A with corresponding
Chapter 6, Problem 9(choose chapter or problem)
QUESTION:
Suppose A is a square matrix. Suppose x is an eigenvector of A with corresponding eigenvalue , and y is an eigenvector of AT with corresponding eigenvalue . Show that if _= , then x y = 0.
Questions & Answers
QUESTION:
Suppose A is a square matrix. Suppose x is an eigenvector of A with corresponding eigenvalue , and y is an eigenvector of AT with corresponding eigenvalue . Show that if _= , then x y = 0.
ANSWER:Step 1 of 3
Given is a square matrix. Let be an eigenvector of, then where is the eigenvalue.
Also is an eigenvector of, then where is the eigenvalue.