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If A and B are 3x3 matrices and A = 1, |B 3, compute the determinant If A and B are 3x3 matrices and A = 1, |B 3, compute the determinant
(1 point) Compute the determinant of the matrix -1 -2 -4 -6 -7 -7 7 7 A= 0 0 0 0 -4 -5 7 det(A) (1 point) Find the determinant of the matrix 6 A- 6 -9 -7 det(A) (1 point) Find the determinant of the matrix 2 2 -2 B= 1 -1 2 3 -2 det (B)
1. (1 point) Evaluate the integral using the FTC 1 Answer(s) submitted: (incorrect) 2. (1 point) Calculate the derivative: Answer(s) submitted. (incorrect) 3. (1 point) Find area of the region u 3x3-5 and above the x-axis, for 2 nder the curve y 4. x area Answerfs) submitted: incorrect) 4. (1 point) The value of (x+5)2dx is 0. Answerts) submitted (incorrect) 5. (1 point) The value of ^ ^dx i Answerts) submitted: (incorrect) 6. (1 point) Evaluate the definite integral (16-x*)dx...
1. Use the cofactor expansion formula to calculate the determinant of the following matrix. 1-2 5 2 0 0 0 2 -6 -7 5 5 0 4 4 درا
7 -4 8 Consider the 3x3 matrix A= 4 -1 8 -4 4 - 5 (a) Find the eigenvalues of A. Show every step of your work. The key to successful factorization is not to distribute anything in the determinant until you have factored out everything you possibly can from all terms. When your factorization is complete, it should show the algebraic multiplicity of each eigenvalue. (b) What is/are the eigenvector(s) corresponding to each eigenvalue? (c) What are the eigenspaces?
(1 point) Given the matrix [2 A = 4 (1 3 -3 5 3 1 5 , -3] find its determinant. The determinant is
(1 point) Find the determinant of the matrix [1 0 0 -2] M-1 0 3 0 To 3 0 Lo 1 -3 2 o det(M) =
Evaluate the determinant of the matrix and state whether the matrix is invertible. 1 -3 17 E=1-17 2 -5 29 Part: 0/2 Part 1 of 2 The determinant is
Evaluate the determinant. 1 2 0 -5 4 0 -2 2 -4 1 2 0 - 54 0 = - 2 2 - 4
1-4 8. Find the value of the determinant -5 2 3 -