If `A^(2) - A = I + O`, then the inverse of A is

Find the inverse of A=[[2,-6],[1,-2]]

If A is matrix such that A^(2) +A + 2I = O then which of the following is not true ?a)A is symmetric b)A is non - singular c) |A| ne O d) A^(-1) = - (1)/(2) (A+ I)

Show that - a is not the inverse of a in N for the addition operation '+' on N and 1/a is not the inverse of a in N for multiplication operation 'X' on N for a ne1

i) In which range is the inverse of sine defined? ii) What is the range for the inverse of cosine function? iii) Evaluate cos [sin ^(-1)((-4)/5)]

Let A=[[2,4],[-1,1]] Find the inverse of A by elementary transformation.

If A^(3) = O , then I + A + A^(2) equals a)I - A b) (I + A^(-1)) c) (I - A)^(-1) d)none of these

Using elementry transformation, find the inverse of the matrices. A = [(2,-6),(1,-2)]

Using elementry transformation, find the inverse of the matrices. A = [(7,-10),(-2,3)]

Using elementry transformation, find the inverse of the matrices. A=[(1,3),(2,7)]