Let `A = [[0,1],[0,0]]` , show that `(aI + bA)^n = a^nI + na^(n-1) bA`, where I is the identity matrix of order 2 and`n in N`

Let A=[[0,1],[0,0]] , prove that: (aI+bA)^n = a^(n-1) bA , where I is the unit matrix of order 2 and n is a positive integer.

Matrix A such that A^(2)=2A-I , where I is the identity matrix, then for n ge 2, A^(n) is equal to

Let A and B be matrices of order n. Prove that if (I - AB) is invertible, (I - BA) is also invertible and (I-BA)^(-1) = I + B (I- AB)^(-1)A, where I be the identity matrix of order n.

Suppose A and B be two ono-singular matrices such that AB= BA^(m), B^(n) = I and A^(p) = I , where I is an identity matrix. If m = 2 and n = 5 then p equals to

Suppose A and B be two ono-singular matrices such that AB= BA^(m), B^(n) = I and A^(p) = I , where I is an identity matrix. Which of the following orderd triplet (m, n, p) is false?

If A=[[i,0],[0,-i]] and B=[[0,i],[i,0]] , show that AB !=BA .

If A^(n) = 0 , then evaluate (i) I+A+A^(2)+A^(3)+…+A^(n-1) (ii) I-A + A^(2) - A^(3) +... + (-1) A^(n-1) for odd 'n' where I is the identity matrix having the same order of A.

If M is a 3xx3 matrix, where det M=1a n dM M^T=1,w h e r eI is an identity matrix, prove theat det (M-I)=0.

Let A be a nxxn matrix such that A ^(n) = alpha A, where alpha is a real number different from 1 and - 1. The matrix A + I_(n) is

Let A and B are two matrices such that AB = BA, then for every n in N