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)

Let A, B ? Mn×n be invertible matrices. Prove the following statement: Matrix A is similar...

Let A, B ? Mn×n be invertible matrices. Prove the following statement: Matrix A is similar to B if and only if there exist matrices X, Y ? Mn×n so that A = XY and B = Y X.