(a) Construct the matrix A=[Ajj] if A is 2x3 and Aij= -i+6j (b) Construct the 2*4...

1. (a) Construct the matrix Upper A equals left bracket Upper A Subscript ij right bracketA=Aij...

1. (a) Construct the matrix Upper A equals left bracket Upper A Subscript ij right bracketA=Aij if A is 2*3 and Upper A Subscript ij Baseline equals negative i plus 4 jAij=−i+4j. ​(b) Construct the 2*4 matrix Upper C equals left bracket left parenthesis 3 i plus j right parenthesis squared right bracketC=(3i+j)2. 2. Solve the following matrix equation. left bracket Start 2 By 2 Matrix 1st Row 1st Column 3 x 2nd Column 4 y minus 5 2nd Row...

a)Assume that you are given a matrix A = [aij ] ∈ R n×n with (1...

a)Assume that you are given a matrix A = [aij ] ∈ R n×n with (1 ≤ i, j ≤ n) and having the following interesting property: ai1 + ai2 + ..... + ain = 0 for each i = 1, 2, ...., n Based on this information, prove that rank(A) < n. b) Let A ∈ R m×n be a matrix of rank r. Suppose there are right hand sides b for which Ax = b has no solution,...

Let B = [ aij ] 20×17 be a matrix with real entries. Let x be...

Let B = [ aij ] 20×17 be a matrix with real entries. Let x be in R 17 , c be in R 20, and 0 be the vector with all zero entries. Show that each of the following statements implies the other. (a) Bx = 0 has only the trivial solution x = 0 n R 17, then (b) If Bx = c has a solution for some vector c in R 20, then the solution is unique.

A graph on the vertex set{1,2,...,n} is often described by a matrix A of size n,...

A graph on the vertex set{1,2,...,n} is often described by a matrix A of size n, where aij and aji are equal to the number of edges with ends i and j. What is the combinatorial interpretation of the entries of the matrix A^2?

The trace of a square n×nn×n matrix A=(aij)A=(aij) is the sum a11+a22+⋯+anna11+a22+⋯+ann of the entries on...

The trace of a square n×nn×n matrix A=(aij)A=(aij) is the sum a11+a22+⋯+anna11+a22+⋯+ann of the entries on its main diagonal. Let VV be the vector space of all 2×22×2 matrices with real entries. Let HH be the set of all 2×22×2 matrices with real entries that have trace 11. Is HH a subspace of the vector space VV? Does HH contain the zero vector of VV? choose H contains the zero vector of V H does not contain the zero vector...

8. Consider a 4 × 2 matrix A and a 2 × 5 matrix B ....

8. Consider a 4 × 2 matrix A and a 2 × 5 matrix B . (a) What are the possible dimensions of the null space of AB? Justify your answer. (b) What are the possible dimensions of the range of AB Justify your answer. (c) Can the linear transformation define by A be one to one? Justify your answer. (d) Can the linear transformation define by B be onto? Justify your answer.

If the matrix A is 4×2, B is 3×4, C is 2×4, D is 4×3, and...

If the matrix A is 4×2, B is 3×4, C is 2×4, D is 4×3, and E is 2×5, what are the dimensions of the following expressions a) A^TD + CB^T b) (B + D^T ) A c) CA + CB^T

Let A be an n×n matrix, I be n×n identity matrix. Define Lij =I+Mij, (1) i...

Let A be an n×n matrix, I be n×n identity matrix. Define Lij =I+Mij, (1) i > j, where the only non-zero element of Mij is mij on i-th row, j-th column. 1. Calculate LijA. What is the relationship between LijA and A? 2. Calculate L−1. ij 3. Suppose now we have a series of nonzero real numbers mi+1,i, mi+2,i, · · · , mn,i. Define Li+1,i , Li+2,i , · · · , Ln,i in the fashion of equation...

A) Find the inverse of the following square matrix. I 5 0 I I 0 10...

A) Find the inverse of the following square matrix. I 5 0 I I 0 10 I (b) Find the inverse of the following square matrix. I 4 9 I I 2 5 I c) Find the determinant of the following square matrix. I 5 0 0 I I 0 10 0 I I 0 0 4 I (d) Is the square matrix in (c) invertible? Why or why not?

(a) Find the inverse of the following square matrix. I 5 0 I I 0 10...

(a) Find the inverse of the following square matrix. I 5 0 I I 0 10 I (b) Find the inverse of the following square matrix. I 4 9 I I 2 5 I (c) Find the determinant of the following square matrix. I 5 0 0 I I 0 10 0 I I 0 0 4 I (d) Is the square matrix in (c) invertible? Why or why not?