prove that type 1 elementary matrix is a product of type 2 and 3 elementary matrices

Show/Prove that every invertible square (2x2) matrix is a product of at most four elementary matrices

Show/Prove that every invertible square (2x2) matrix is a product of at most four elementary matrices

a).For the reduction of matrix determine the elementary matrices corresponding to each operation. M= 1 0...

a).For the reduction of matrix determine the elementary matrices corresponding to each operation. M= 1 0 2 1 5    1 1 5 2 7 1 2 8 4 12 b). Calculate the product P of these elementary matrices and verify that PM is the end result.

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

Prove that any Givens rotator matrix in R2 is a product of two Householder reflector matrices....

Prove that any Givens rotator matrix in R2 is a product of two Householder reflector matrices. Can a Householder reflector matrix be a product of Givens rotator matrices?

Using elementary transformations, determine matrices B and C so that BAC=I for the matrix A. Use...

Using elementary transformations, determine matrices B and C so that BAC=I for the matrix A. Use B and C to compute the inverse of A; that is, take the inverse of both sides of the equation BAC=I and then solve for A inverse. I need to find Matrix B, Matrix C, and Inverse of matrix A A= 1   2   1   1 0   1   2   0 1   2   2   1 0   -1 1   2

True or False (Please explain) 1. If E and F are elementary matrices then C =...

True or False (Please explain) 1. If E and F are elementary matrices then C = E*F is nonsingular. 2. If A is a 3x3 matrix and a1+2a2-a3=0 then A must be singular. 3. If A is a 3x3 matrix and 3a1+a2+4a3=b is consistent.

prove that if E is elementary matrix, then E^T is also elementary matrix and det(E^T)=det(E)

prove that if E is elementary matrix, then E^T is also elementary matrix and det(E^T)=det(E)

Prove or disprove: GL2(R), the set of invertible 2x2 matrices, with operations of matrix addition and...

Prove or disprove: GL2(R), the set of invertible 2x2 matrices, with operations of matrix addition and matrix multiplication is a ring. Prove or disprove: (Z5,+, .), the set of invertible 2x2 matrices, with operations of matrix addition and matrix multiplication is a ring.

Assume all matrices are 3 × 3 prove that if two rows of A are interchanged...

Assume all matrices are 3 × 3 prove that if two rows of A are interchanged to produce B an upper triangular matrix, then det(A) = − det(B)

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...