Let A be square matrix prove that A^2 = I if and only if rank(I+A)+rank(I-A)=n

Let A be an nxn matrix. Prove that A is invertible if and only if rank(A)...

Let A be an nxn matrix. Prove that A is invertible if and only if rank(A) = n.

Let A,B be a m by n matrix, Prove that |rank(A)-rank(B)|<=rank(A-B)

Let A,B be a m by n matrix, Prove that |rank(A)-rank(B)|<=rank(A-B)

Let A be a square matrix with A^2 = A. Prove that A is diagonisable and...

Let A be a square matrix with A^2 = A. Prove that A is diagonisable and that 1 and 0 are the only 2 possible eigenvalues

(3 pts) Let A be a square n × n matrix whose rows are orthogonal. Prove...

(3 pts) Let A be a square n × n matrix whose rows are orthogonal. Prove that the columns of A are also orthogonal. Hint: The orthogonality of rows is equivalent to AAT = I ⇒ ATAAT = AT

Prove the following: Given k x m matrix A, m x n matrix B. Then rank(A)=m...

Prove the following: Given k x m matrix A, m x n matrix B. Then rank(A)=m --> rank(AB)=rank(B)

Let |a| = n. Prove that <a^i> = <a^j> if and only if gcd(n,i) = gcd...

Let |a| = n. Prove that <a^i> = <a^j> if and only if gcd(n,i) = gcd (n,j) and |a^i| = |a^j| if and only if gcd(n,i) = gcd(n,j).

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

For n>=3 given the n x n matrix A with elements: A_ij=(i+j-2)^2. Determine the rank of...

For n>=3 given the n x n matrix A with elements: A_ij=(i+j-2)^2. Determine the rank of A.

Let A be an nxn matrix. Show that if Rank(A) = n, then Ax = b...

Let A be an nxn matrix. Show that if Rank(A) = n, then Ax = b has a unique solution for any nx1 matrix b.

Let A be an m × n matrix, and Q be an n × n invertible...

Let A be an m × n matrix, and Q be an n × n invertible matrix. (1) Show that R(A) = R(AQ), and use this result to show that rank(AQ) = rank(A); (2) Show that rank(AQ) = rank(A).