a.) What is a "tanspose" b.) If A, B, C, and D are the matrices below,...

Which of the following matrices has an inverse ? a) None of the given matrices have...

Which of the following matrices has an inverse ? a) None of the given matrices have inverses b) ( 2 1 3; 1 0 -4; 0 0 0) c) (3 1; 2 5) d) ( 5 2 4 1; 1 0 8 -4) e) (3 -5; 0 2; 1 4)

write the following matrices as a product of elementary matrices: a) 1 2 4 9 b)...

write the following matrices as a product of elementary matrices: a) 1 2 4 9 b) 1 -2 -1 -1 5 6 5 -4 5 c) 1 0 -2 -3 1 4 2 -3 4

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....

CHAPTER 2 MATLAB EXERCISES QUESTION 1: Enter the matrices A=[0 -4 5] and B= [-5 6...

CHAPTER 2 MATLAB EXERCISES QUESTION 1: Enter the matrices A=[0 -4 5] and B= [-5 6 7] 3 1 -2 0  -1 2 2 1 4 4 0 -3 USE MATLAB to find a) A + B b) B - 3A c) AB d) BA QUESTION 6: ENTER THE THREE MATRICES A= [1 2 3 4] B= [4 -6 3 5] 2 3 4 5 0 -3 -6 8 3 4 5 6   3 5 0 7 4 5 6 7...

Select all statements below which are true for all invertible n×n matrices A and B A....

Select all statements below which are true for all invertible n×n matrices A and B A. AB=BA B. (A+B)^2=A^2+B^2+2AB C. (In−A)(In+A)=In−A^2 D. 7A is invertible E. (AB)^−1=A^−1*B^−1 F. A+A^−1 is invertible

Six Data Tables (A, B, C, D, E, F) are shown below. For each Table, decide...

Six Data Tables (A, B, C, D, E, F) are shown below. For each Table, decide which of two methods (table only  or   equation, graph, or table) can be used to represent the data. For the purposes of this question, assume that we only know and can use two graph forms / equations:   x= c t + d (straight line graph) and    x = b t2+ c t + d (quadratic curve graph). A    t x    0 4...

The stochastic group Σ(2, ℝ) consists of all those matrices in GL(2, ℝ) whose column sums...

The stochastic group Σ(2, ℝ) consists of all those matrices in GL(2, ℝ) whose column sums are 1; that is, Σ(2, ℝ) consists of all the nonsingular matrices [a c] [b d] with a + b = 1 = c + d Prove that the product of two stochastic matrices is again stochastic, and that the inverse of a stochastic matrix is stochastic. [abstract algebra] NOTE: the [a c] and [b d] is supposed to be a 2x2 matrix with...

Refer to the following matrices. A = 1 −8 7 −3 −18 6 5 8 6...

Refer to the following matrices. A = 1 −8 7 −3 −18 6 5 8 6 0 5 8 3 4 8 −2     B = 4 −7 4 0 1 4 9 5 3 −3 0 9 C = 1 0 3 2 8     D = 1 9 −7 0 What is the size of each matrix? A     ____× ____ B     _____× _____ C     ____× ____ D     ____× _____

Are the matrices A and B Row equivalent? Why or Why not? A= 1 1 1...

Are the matrices A and B Row equivalent? Why or Why not? A= 1 1 1 2 3 -1 -1 4 1 B = 1 0 -1 1 1 1 0 1 3

Let V be the vector space of 2 × 2 matrices over R, let <A, B>=...

Let V be the vector space of 2 × 2 matrices over R, let <A, B>= tr(ABT ) be an inner product on V , and let U ⊆ V be the subspace of symmetric 2 × 2 matrices. Compute the orthogonal projection of the matrix A = (1 2 3 4) on U, and compute the minimal distance between A and an element of U. Hint: Use the basis 1 0 0 0   0 0 0 1   0 1...