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

5. (a) Prove that det(AAT ) = (det(A))2. (b) Suppose that A is an n×n matrix...

5. (a) Prove that det(AAT ) = (det(A))2. (b) Suppose that A is an n×n matrix such that AT = −A. (Such an A is called a skew- symmetric matrix.) If n is odd, prove that det(A) = 0.

If I prove Det(A)Det(B) = Det(AB) for matrices A and B when A and B are...

If I prove Det(A)Det(B) = Det(AB) for matrices A and B when A and B are 2x2 matrices, can I use that to show that Det(A)Det(B) = Det(AB) for any n x n matrix? If so how?

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

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

Let A be an n×n nonsingular matrix. Denote by adj(A) the adjugate matrix of A. Prove:...

Let A be an n×n nonsingular matrix. Denote by adj(A) the adjugate matrix of A. Prove: 1)   det(adj(A)) = (det(A)) 2)    adj(adj(A)) = (det(A))n−2A

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

Let A be a 2x2 matrix and suppose that det(A)=3. For each of the following row...

Let A be a 2x2 matrix and suppose that det(A)=3. For each of the following row operations, determine the value of det(B), where B is the matrix obtained by applying that row operation to A. a) Multiply row 1 by -4 b) Add 4 times row 2 to row 1 c) Interchange rows 2 and 1 Resulting values for det(B): a) det(B) = b) det(B) = c) det(B) =

Consider the map φ :Mnxn (R) → R defined by φ(M) = det(M), where det(M) is...

Consider the map φ :Mnxn (R) → R defined by φ(M) = det(M), where det(M) is the determinant of the matrix M. Is φ a ring homomorphism? Prove or disprove.

Given two unitary matrices Q1, Q2 and suppose det(Q1) = -det(Q2). Show that matrix Q =...

Given two unitary matrices Q1, Q2 and suppose det(Q1) = -det(Q2). Show that matrix Q = Q1 + Q2 is singular. hint: consider Q* = Q1*(Q2 + Q1)Q2* and det(Q) .

please do on matlab Create the 10×10 elementary matrix E that would switch the rows 3...

please do on matlab Create the 10×10 elementary matrix E that would switch the rows 3 and 7. Do not enter the matrix manually, but use the command eye to create the identity matrix and modify the appropriate entry. For instance >> E(3,3)=0 with change the (3, 3) entry of E to 0. Test your matrix with a random 10 × 10 matrix.

prove or disprove that the determinant of a square matrix can also be evaluated by cofactor...

prove or disprove that the determinant of a square matrix can also be evaluated by cofactor expansion along the main diagonal of the square matrix