Let `p` be a non singular matrix, and `I + P + p^2 + ... + p^n = 0,` then find `p^-1`.

Let P be a non - singular matrix such that I+P+P^(2)+…….P^(n)=O (where O denotes the null matrix), then P^(-1) is

If P is a non-singular matrix, with (P^-1) in terms of 'P', then show that adj (Q^(-1) BP^-1) = PAQ . Given that adjB = A and abs(P) = abs(Q) = 1.

Define a relation R over a class of n xx n real matrices A and B as ARB iff there exists a non-singular matrix P such that A=P^(-1)BP Then which of the following is true?

P is a non-singular matrix and A, B are two matrices such that B=P^(-1) AP . The true statements among the following are

Let B be a skew symmetric matrix of order 3times3 with real entries. Given I-B and I+B are non-singular matrices. If A=(I+B)(I-B)^(-1), where det (A)>0 ,then find the value of det(2A)-det(adj(A)) [Note: det(P) denotes determinant of square matrix P and det(adj (P)) denotes determinant of adjoint of square matrix P respectively.]

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

Let P be an m xx m matrix such that P^(2)=P . Then (1+P)^(n) equals