2 seperate questions the last picture is part of the second question ( multiple choice) Let...
three seperate questions multiple choice 13 and B= Find A -B. 2 . [4:1 Let A= -1 6 2 6 7 177 15 12 1 5 5 30 1 5 3 30 7 17 15 36 Let A and B be 3 x 3 matrices with det(A) = 2 and det(B) = -3. Then find det(-A2B). -6 -12 6 12 [5 2 -2 3 -47 0 4 21 _0 Find the determinant of the matrix, A= 10 0 -2 3...
three seperate questions multiple choice Given A= -(-18)and B=(1-32] Find the matrix product AB, if it is defined. 0-6 21 1 -18 12 [-28 - 3 6-71 -20 -1 19 (3 7-11 -20 19 AB is undefined. The sizes of two matrices A and B are given. Find the sizes of the product AB and the product BA, if the products are defined A is 2 * 3, B is 3 * 2. AB is 3 x 3, BA is...
2 seperate questions multiple choice The augmented matrix for a system is given as, (9-3631 Find the general solution or state that there is no solution No solution 5 = 7 T. N (-5,7) For the given matrix A, find a basis for the corresponding eigenspace for the given eigenvalue. 1-4-4 A-4 4. A = -3 4 -4 -7 1
3 seperate questions multiple choice Determine which of the following matrices are in RREF. ſi 0 0 27 i) 0 2 0 3 0 1 1 4 ſi 0 1 0] i) 0 1 1 0 0 0 0 1 [1 0 -1 2 ii) 0 1 07 0 o [1 0 0 2 iv) 0 1 0 1 0 0 1 0 0 0 1 iv only ii and iii ii and iv i and ii For the given...
Question 5 True of False part II: 5 problems, 2 points each. (6). Let w be the x-y plain of R3, then wlis any line that is orthogonal to w. (Select) (7). Let A be a 3 x 3 non-invertible matrix. If Ahas eigenvalues 1 and 2, then A is diagonalizable. Sele (8). If an x n matrix A is diagonalizable, then n eigenvectors of A form a basis of " [Select] (9). Letzbean x 1 vector. Then all matrices...
Verify the following properties, using any distinct, invertible A, B, 4×4 upper triangular matrices of your choice: 3. (0.5 marks each) Verify the following properties, using any distinct, invertible A, B, 4 x 4 upper triangular matrices of your choice: (a) The inverse of an upper triangular matrix is upper triangular; (b) (AB)- B-1A-1 (e) trace(AB) trace(BA); (d) det(AB) det (BA) example of matrices A, B such that det(AB) det(BA) (BONUS 1 mark) Give an 3. (0.5 marks each) Verify...
two seperate questions multiple choice Determine which of the following matrices are in RREF. ſi 0 -1 0 ſi 0 0 27 in) 0 1 2 0 [1 0 1 0] ii) 0 1 1 0 0 0 0 1 ſi 0 0 2 iv) 0 1 0 1 0 0 1 0 i) 02 03 0 0 1 0 0 14 iv only ii and iii ii and iv i and ii For the given matrix and eigenvalue, find...
the second picture is part of the first question there is 3 questions all multiple choice Find the general solution to the system : ix+y=3 ix - y = 2 MINIO II 10.- 11 1 2 -- 2 ex Il -- 1 2 N - N1 . Use polar form to calculate (-1 + 3iy9 O 64 512 0-64 -512 1+ 3i Express in standard form. 3+i 10 3 3 4. O 1 + i O il Unit 01
two seperate questions multiple choice Calculate the following: [3+i 2-i [ [ 3 2 2-i| 2 ས 3 2- 2i - 3 2- 2i 2 - 1 Determine the real and imaginary parts of the complex number by first writing the number in standard form. z=(5-3i)(5 + 3i) Re(z) = 30 and Im(z) = 4 Re(z) = 32 and Im(z) = 2 Re(z) = 34 and Im(z) = 6 Re(z) = 34 and Im(z) = 0
sorry I thought it would look for similar questions after taking a picture. but it posted I also need help with these questions plus what the picture had. Thank you! d)deduce that the matrix A is invertible e) solve the linear system S1 by Gauss Elimination f) find the inverse A^-1 of A g)deduce the solution of S1 h) find the LU decomposition of the matrix A I) solve the linear system of equation S1 by using the LU j)...