Program Description: Purpose of the problem is to show that the characteristic equation of the matrix A is λ 2 − ( a + d ) λ + ( a d − b c ) = 0 .

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Answer 1

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Chapter 5.3, Problem 39P

(a)

Program Plan Intro

Program Description: Purpose of the problem is to show that the characteristic equation of the matrix A is λ2−(a+d)λ+(ad−bc)=0 .

(b)

Program Plan Intro

Program Description: Purpose of the problem is to show that the traceT(A)=a+d is 0 and the determinant of the matrix A is positive if the eigenvalues of A are pure imaginary.

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Find the characteristic equation and the eigenvalues (and a basis for each of the corresponding eigenspaces) of the matrix. 3 -1 1 1 (a) the characteristic equation 422 – 1 = 0 (b) the eigenvalues (Enter your answers from smallest to largest.) -1 1 2 2 (2q, 22) = a basis for each of the corresponding eigenspaces X1 =1 X2 =|1

Find the characteristic equation and the eigenvalues (and a basis for each of the corresponding eigenspaces) of the matrix. (a) the characteristic equation - 1 = 0 (b) the eigenvalues (Enter your answers from smallest to largest.) 1 (22, 22) =| 2 2 a basis for each of the corresponding eigenspaces X, = X, = 1

Q4: Write the parametric equation of revolution surface in matrix form only which generated by rotate a Bezier curve defined by the coefficient parameter in one plane only, for the x-axis [0,5, 10,4], y-axis [1,4,2,2] respectively, for u-0.5 and 9=7/4. Note: [the rotation about y-axis].

Answer 2

Question

Chapter 5.3, Problem 39P

(a)

Program Plan Intro

Program Description: Purpose of the problem is to show that the characteristic equation of the matrix A is λ2−(a+d)λ+(ad−bc)=0 .

(b)

Program Plan Intro

Program Description: Purpose of the problem is to show that the traceT(A)=a+d is 0 and the determinant of the matrix A is positive if the eigenvalues of A are pure imaginary.

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Answer 3

Question

Chapter 5.3, Problem 39P

(a)

Program Plan Intro

Program Description: Purpose of the problem is to show that the characteristic equation of the matrix A is λ2−(a+d)λ+(ad−bc)=0 .

(b)

Program Plan Intro

Program Description: Purpose of the problem is to show that the traceT(A)=a+d is 0 and the determinant of the matrix A is positive if the eigenvalues of A are pure imaginary.

Expert Solution & Answer

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Answer 4

Question

Chapter 5.3, Problem 39P

(a)

Program Plan Intro

Program Description: Purpose of the problem is to show that the characteristic equation of the matrix A is λ2−(a+d)λ+(ad−bc)=0 .

(b)

Program Plan Intro

Program Description: Purpose of the problem is to show that the traceT(A)=a+d is 0 and the determinant of the matrix A is positive if the eigenvalues of A are pure imaginary.

Expert Solution & Answer

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Answer 5

Chapter 5.3, Problem 39P

(a)

Program Plan Intro

Program Description: Purpose of the problem is to show that the characteristic equation of the matrix A is λ2−(a+d)λ+(ad−bc)=0 .

(b)

Program Plan Intro

Program Description: Purpose of the problem is to show that the traceT(A)=a+d is 0 and the determinant of the matrix A is positive if the eigenvalues of A are pure imaginary.

Answer 6

Chapter 5.3, Problem 39P

(a)

Program Plan Intro

Program Description: Purpose of the problem is to show that the characteristic equation of the matrix A is λ2−(a+d)λ+(ad−bc)=0 .

Answer 7

Chapter 5.3, Problem 39P

(a)

Program Plan Intro

Program Description: Purpose of the problem is to show that the characteristic equation of the matrix A is λ2−(a+d)λ+(ad−bc)=0 .

Answer 8

(b)

Program Plan Intro

Program Description: Purpose of the problem is to show that the traceT(A)=a+d is 0 and the determinant of the matrix A is positive if the eigenvalues of A are pure imaginary.

Answer 9

(b)

Program Plan Intro

Program Description: Purpose of the problem is to show that the traceT(A)=a+d is 0 and the determinant of the matrix A is positive if the eigenvalues of A are pure imaginary.

Answer 10

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Answer 11

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Answer 12

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Answer 13

Ch. 5.1 - Let A=[2347] and B=[3451]. Find (a) 2A+3B; (b)...Ch. 5.1 - Prob. 2P Ch. 5.1 - Find AB and BA given A=[203415] and B=[137032].Ch. 5.1 - Prob. 4P Ch. 5.1 - Prob. 5P Ch. 5.1 - Prob. 6P Ch. 5.1 - Prob. 7P Ch. 5.1 - Prob. 8P Ch. 5.1 - Prob. 9P Ch. 5.1 - Prob. 10P

Program Description: Purpose of the problem is to show that the characteristic equation of the matrix A is λ 2 − ( a + d ) λ + ( a d − b c ) = 0 .

Solution Summary: The author explains that the characteristic equation of the matrix A is left|A-Iright|=0.

Program Description: Purpose of the problem is to show that the characteristic equation of the matrix A is λ2−(a+d)λ+(ad−bc)=0 .

Program Description: Purpose of the problem is to show that the traceT(A)=a+d is 0 and the determinant of the matrix A is positive if the eigenvalues of A are pure imaginary.

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Chapter 5 Solutions