`(AB)^(T)`=

(AB)^(-1) =

Let A and B be two invertible matrices of order 3xx3 . If det. (ABA^(T)) = 8 and det. (AB^(-1)) = 8, then det. (BA^(-1)B^(T)) is equal to

Let A=[[2,0,7] , [0,1,0], [1,-2,1]] and B=[[-x,14x,7x] , [0,1,0] , [x,-4x,-2x]] are two matrices such that AB=(AB)^(-1) and AB!=I then Tr((AB)+(AB)^2+(AB)^3+(AB)^4+(AB)^5+(AB)^6)=

Let A and B be two non-singular skew symmetric matrices such that AB = BA, then A^(2)B^(2)(A^(T)B)^(-1)(AB^(-1))^(T) is equal to

Let B is an invertible square matrix and B is the adjoint of matrix A such that AB=B^(T) . Then

If A and B are symmetric matrices of the same order and X=AB+BA and Y=AB-BA , then (XY)^(T) is equal to

If z=x+iy and x^(2)+y^(2)=16 , then the range of abs(abs(x)-abs(y)) is

Let ABCDEFGHIJKL be a regular dodecagon. Then the value of (AB)/(AF) + (AF)/(AB) is equal to ____

Prove the following boolean relations. bar(bar(A)+AB+bar(AB)) = 0

If the normals at P(t_(1))andQ(t_(2)) on the parabola meet on the same parabola, then (A) t_(1)t_(2)=-1 (B) t_(2)=-t_(1)-(2)/(t_(1)) (C) t_(1)t_(2)=1 (D) t_(1)t_(2)=2