(a) Explanation Given information: Consider a 5 × 5 matrix A and a vector v → in ℝ 5 . Suppose the vectors v → , A v → , A 2 v → are linearly independent, while A 3 v → = a v → + b A v → + c A 2 v → for some a , b , c (b) To determine To explain: f A ( λ ) = f B ( λ ) = h ( λ ) ( − λ 3 + c λ 2 + b λ + a ) , for some quadratic polynomial h ( λ ) . (c) To determine To explain: f A ( A ) v → = 0 → .

Linear Algebra With Applications (classic Version)

5th Edition

ISBN: 9780135162972

Author: BRETSCHER, OTTO

Publisher: Pearson Education, Inc.,

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In mathematics, problems can be solved by the arithmetic operators like addition, subtraction, multiplication, and division. In algebra, we represent the numbers by any letter called a variable. If these variables are of degree 1, then it is studied unde…

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Chapter 7.3, Problem 53E

(a)

To determine

To write: the entries of the first three columns of B .

(b)

To determine

To explain: fA(λ)=fB(λ)=h(λ)(−λ3+cλ2+bλ+a), for some quadratic polynomial h(λ) .

(c)

To determine

To explain: fA(A)v→=0→ .

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Chapter 7.3, Problem 52E

Chapter 7.3, Problem 54E

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Chapter 7 Solutions

Linear Algebra With Applications (classic Version)

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the entries of the first three columns of B .

Solution Summary: The author explains that Av can be obtained from v simply by multiplying with A; same with A2v.

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To write: the entries of the first three columns of B .

To explain: fA(λ)=fB(λ)=h(λ)(−λ3+cλ2+bλ+a), for some quadratic polynomial h(λ) .

To explain: fA(A)v→=0→ .

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Chapter 7 Solutions