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13 Nov 2019
Problem # 1 : Consider the following matrix A and column vectors K1 , K2, and K3 A8 7 8 -3 Verify that K1, K2, and K3, are eigenvectors of the matrix A, and find the corresponding eigenvalues. Then use these eigenvectors, in the given order, along with the Gram-Schmidt process (where needed) to construct an orthogonal matrix P from these eigenvectors (a) Enter the eigenvalues corresponding to K1, K2, and K3 (in that order) into the answer box below, separated by commas (b) Enter the values in the first row of the matrix P into the answer box below, separated by commas -1,-1,23 Problem #1(a): 3/sqrt(14).-1/sqrt(6),1/sqr(3)Enter your answer symbolically as in these examples Problem #1(b): Just Save Submit Problem #1 for Grading Problem #1 ttempt #1 Attempt #2 Attempt #3 Attempt #4 | Attempt #5 Your Answer 1(a) -1,-1, 23 1(a) 1(b) 3 1(b) 714,-76,?| 1(b) 1(a) 1(b) 1(a) 1(b) Your Mark: 1(a) 3/3 1(a) 1(b 1(a) 1(b 1(a) 1(b 1(a) 1(b 1(b) 1/3 vX Note: Your mark on each question will be the MAXIMUM of your marks on each try (So there is no harm in making another attempt at a partially correct answer.)
Problem # 1 : Consider the following matrix A and column vectors K1 , K2, and K3 A8 7 8 -3 Verify that K1, K2, and K3, are eigenvectors of the matrix A, and find the corresponding eigenvalues. Then use these eigenvectors, in the given order, along with the Gram-Schmidt process (where needed) to construct an orthogonal matrix P from these eigenvectors (a) Enter the eigenvalues corresponding to K1, K2, and K3 (in that order) into the answer box below, separated by commas (b) Enter the values in the first row of the matrix P into the answer box below, separated by commas -1,-1,23 Problem #1(a): 3/sqrt(14).-1/sqrt(6),1/sqr(3)Enter your answer symbolically as in these examples Problem #1(b): Just Save Submit Problem #1 for Grading Problem #1 ttempt #1 Attempt #2 Attempt #3 Attempt #4 | Attempt #5 Your Answer 1(a) -1,-1, 23 1(a) 1(b) 3 1(b) 714,-76,?| 1(b) 1(a) 1(b) 1(a) 1(b) Your Mark: 1(a) 3/3 1(a) 1(b 1(a) 1(b 1(a) 1(b 1(a) 1(b 1(b) 1/3 vX Note: Your mark on each question will be the MAXIMUM of your marks on each try (So there is no harm in making another attempt at a partially correct answer.)
Nestor RutherfordLv2
18 Oct 2019