" 8.Verify that "A=(1)/(3)[[1,2,2],[2,1,-2],[-2,2,-1]|" is orthogonal "

Prove that A=1/3[(1,2,2),(2,1,-2),(-2,2,-1)] is an orthogonal matrix.

Show that the matrix A = (1)/(3)[(1,2,2),(2,1,-2),(-2,2,-1)] is orthogonal, Hence, find A^(-1) .

Show that, A = 1/3[[1,2,2],[2,1,-2],[-2,2,-1]] are orthogonal matrix and hence find A^(-1) .

If A=(1)/(3)[[1,2,22,1,-2a,2,b]] is an orthogonal ,b=-1 d.b=1

Show that , A =1/3[[-1,2,-2],[-2,1,2],[2,2,1]] is proper orthogonal matrix .

Show that A=(1)/(3)[{:(-1,2,-2),(-2,1,2),(2,2,1):}] is proper orthogonal matrix.

STATEMENT -1 : A=(1)/(3){:[(1,-2,2),(-2,1,2),(-2,-2,-1)]:} is an orthogonal matrix and STATEMENT-2 : If A and B are otthogonal, then AB is also orthogonal.

Show the A=(1)/(3)[(-1,2,-2),(-2,1,2),(2,2,1)] is proper orthogonal matrix.