(1 point) Use the pattern method covered in the notes to find a basis for the set S of all matric...
(1 point) Note: In this problem, use the method from class. See the lecture notes for January 12 on Brightspace. Also see Example 8.54 in the textbook. More examples (using real matrices) are in Section 8.6 of the textbook. Consider the sequence defined recursively by We can use matrix diagonalization to find an explicit formula for F (a) Find a matrix A that satisfies m+1 n+2 (b) Find the appropriate exponent k such that Fi -PDP- (c) Find a diagonal...
(1 point) Find a basis for the column space of 0 A = -1 2 3 3 - 1 2 0 - 1 -4 0 2 Basis = (1 point) Find the dimensions of the following vector spaces. (a) The vector space RS 25x4 (b) The vector space R? (c) The vector space of 6 x 6 matrices with trace 0 (d) The vector space of all diagonal 6 x 6 matrices (e) The vector space P3[x] of polynomials with...
(1 point) Note: In this problem, use the method from class. See the lecture notes for January 12 on Brightspace. Also see Example 8.54 in the textbook. More examples (using real matrices) are in Section 8.6 of the textbook. Consider the sequence defined recursively by n+2 We can use matrix diagonalization to find an explicit formula for F (a) Find a matrix A that satisfies n+1 n+2 (b) Find the appropriate exponent k such that Fh Fi (c) Find a...
Question 3: (a) (4 points) Recall that the trace of a square matrix is the sum of all its entries from the main diagonal. Show that the trace is linear, in the sense that, trace(aX + βΥ) trace(X) + β trace(Y). Let V be the space of all m × n matrices. A function <..) : V × V → R is defined as (A, B) trace(ABT), A, B E V. (a) (4 points) Using the properties of the trace,...
4 Consider the following nonsingular matrix P = a) Find P by hand. by hand. b) Use P and P-1 to find a matrix B that is similar to A c) Notice that A is a diagonal matrix (a matrix whose entries everywhere besides the main diagonal are 0). As you may recall from #5 on Lab 2, one of the many nice properties of diagonal matrices (of order n) is that 0 1k 0 a11 0 0 a11 0...
2. Find a basis for the set of all 2 x 2 symmetric ma trices. Yo s really is a basis. Use your answer to find the dimension of the set of all symmetric 2 x 2 matrices.. u should give convincing evidence that your
(1 point) The trace of a square n x n matrix A = (aii) is the sum ani + 022 + ... + ann of the entries on its main diagonal. Let V be the vector space of all 2 x 2 matrices with real entries. Let H be the set of all 2 x 2 matrices with real entries that have trace 1. Is Ha subspace of the vector space V? 1. Does H contain the zero vector of...
5. Let (a) (2 marks) Find all eigenvalues of A (b) (4 marks) Find an orthonormal basis for each eigenspace of A (you may find an orthonormal basis by inspection or use the Gram-Schmidt algorithm on each eigenspace) (c) (2 marks) Deduce that A is orthogonally diagonalizable. Write down an orthogonal matrix P and a diagonal matrix D such that D P-AP. (d) (1 mark) Use the fact that P is an orthogonal matrix to find P-1 (e) (2 marks)...
Use the solution method from this example to find a basis for the given subspace. 1 4 0 5 1 S = span -1 0 -1 4 0 5 Give the dimension of the basis.
1 point) Read 'Diagonalization Changing to a Basis of Eigenvectors' before attempting this problem. Suppose that V is a 5-dimensional vector space. Let S -(vi,... , vs) be some ordered basis of V, and let T-(wi.... . ws) be some other ordered basis of V. Let L: V → V be a linear transformation. Let M be the matrix of L in the basis Sand et N be the matrix of L in the basis T. Decide whether each of...