How many 5 x 5 diagonal matrices A are there that satisfy A3 -5A2 + 6A...

Linear Algebra: Show that the set of all 2 x 2 diagonal matrices is a subspace...

Linear Algebra: Show that the set of all 2 x 2 diagonal matrices is a subspace of M 2x2. I know that a diagonal matrix is a square of n x n matrix whose nondiagonal entries are zero, such as the n x n identity matrix. But could you explain every step of how to prove that this diagonal matrix is a subspace of M 2x2. Thanks.

How many solutions of the equation y^(3) = x + cos(x) satisfy the following initial conditions:...

How many solutions of the equation y^(3) = x + cos(x) satisfy the following initial conditions: y(0) = y ′ (0) = y^((2))(0) = 0.5

Solve system of equations using matrices. Make a 4x4 matrix and get the diagonal to be...

Solve system of equations using matrices. Make a 4x4 matrix and get the diagonal to be ones and the rest of the numbers to be zeros 2x -3y + z + w = - 4 -x + y + 2z + w = 3 y -3z + 2w = - 5 2x + 2y -z -w = - 4

A'1(x)=2A1(x)-A2(x)-A3(x) A'2(x)=-A1(x)+2A2(x)-A3(x) A'3(x)=-A1(x)-A2(x)+2A3(x) with A1(0) = 0, A2(0) = 1, and A3(0) = 5 being initial...

A'1(x)=2A1(x)-A2(x)-A3(x) A'2(x)=-A1(x)+2A2(x)-A3(x) A'3(x)=-A1(x)-A2(x)+2A3(x) with A1(0) = 0, A2(0) = 1, and A3(0) = 5 being initial values solve linear differential equations

1. Find the orthogonal projection of the matrix [[3,2][4,5]] onto the space of diagonal 2x2 matrices...

1. Find the orthogonal projection of the matrix [[3,2][4,5]] onto the space of diagonal 2x2 matrices of the form lambda?I.   [[4.5,0][0,4.5]]  [[5.5,0][0,5.5]]  [[4,0][0,4]]  [[3.5,0][0,3.5]]  [[5,0][0,5]]  [[1.5,0][0,1.5]] 2. Find the orthogonal projection of the matrix [[2,1][2,6]] onto the space of symmetric 2x2 matrices of trace 0.   [[-1,3][3,1]]  [[1.5,1][1,-1.5]]  [[0,4][4,0]]  [[3,3.5][3.5,-3]]  [[0,1.5][1.5,0]]  [[-2,1.5][1.5,2]]  [[0.5,4.5][4.5,-0.5]]  [[-1,6][6,1]]  [[0,3.5][3.5,0]]  [[-1.5,3.5][3.5,1.5]] 3. Find the orthogonal projection of the matrix [[1,5][1,2]] onto the space of anti-symmetric 2x2 matrices.   [[0,-1] [1,0]]  [[0,2] [-2,0]]  [[0,-1.5] [1.5,0]]  [[0,2.5] [-2.5,0]]  [[0,0] [0,0]]  [[0,-0.5] [0.5,0]]  [[0,1] [-1,0]] [[0,1.5] [-1.5,0]]  [[0,-2.5] [2.5,0]]  [[0,0.5] [-0.5,0]] 4. Let p be the orthogonal projection of u=[40,-9,91]T onto the...

How many integral solutions of x1 + x2 + x3 + x4 = 33 satisfy 4...

How many integral solutions of x1 + x2 + x3 + x4 = 33 satisfy 4 ≥ x1 ≥ 2, x2 ≥ 0, x3 ≥−5, and x4 ≥ 7?

Classify all of the units in M(Z3) (2x2 matrices with entries in Z3). How many units...

Classify all of the units in M(Z3) (2x2 matrices with entries in Z3). How many units are there? (ring theory question)

We have learned that we can consider spaces of matrices, polynomials or functions as vector spaces....

We have learned that we can consider spaces of matrices, polynomials or functions as vector spaces. For the following examples, use the definition of subspace to determine whether the set in question is a subspace or not (for the given vector space), and why. 1. The set M1 of 2×2 matrices with real entries such that all entries of their diagonal are equal. That is, all 2 × 2 matrices of the form: A = a b c a 2....

In what follows, A and B denote 2 x 2 matrices. Answer each question below, with...

In what follows, A and B denote 2 x 2 matrices. Answer each question below, with justification. No one answer should be more than a few lines long. A1. If k is a scalar, how does the determinant of kA relate to the determinant of A? A2. Show that the determinant of A + B is not necessarily the same as det A + det B. (Remark: a single specific counterexample suffices!) A3. If A is singular and B is...

If  f ″(x)  =  (x − 1)^5 (x − 2)^7 (x − 3)^6, how many inflection...

If  f ″(x)  =  (x − 1)^5 (x − 2)^7 (x − 3)^6, how many inflection points does  f (x) have