[Solved] MATH307 Group Homework7

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File Name: MATH307_Group_Homework7.zip
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Instructions: Read textbook pages 145 to 147 before working on the homework problems. Show all steps to get full credits.

  1. Let A be a matrix such that the entries in each row add up to 1. Show that the vector with all entries qual to 1 is an eigenvector. What is the corresponding eigenvalue?
  2. For an n n matrix A prove that:
    • If is an eigenvalue, u a corresponding eigenvector c a scalar, then +c is an eigenvalue of A+cI and u is a corresponding eigenvector.
    • If the entries of each row of A add up to 0, then 0 is an eigenvalue, and thus the matrix is not invertible.
  3. Let Q be a unitary matrix and be an eigenvalue of Q, prove that || =1.

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[Solved] MATH307 Group Homework7
$25