If the elements of a matrix A are real positive and distinct such that det `(A+A^T)^T=0` then

If A is a 3xx3 matrix such that det.A=0, then

Let A be any 3xx2 matrix. Then prove that det. (A A^(T))=0 .

If x is a non singular matrix and y is a square matrix,such that det(x^(-1)yx)=K det y ,then find K

Let A, B, C be nxxn real matrices that are pairwise commutative and ABC is a null matrix. Show that det(A + B + C) det (A^3+ B^3 + C^3) geq0,

Let t be a real number satifying 2t ^(3) -9t ^(2) + 30 -lamda =0 where t =x + 1/xand lamda in R. If the above cubic has three real and distinct solutions for x then exhaustive set of value of lamda be :

let f(x)=2+cos x for all real x Statement 1: For each real t,there exists a pointc in [t,t+pi] such that f'(c)=0 Because statement 2:f(t)=f(t+2 pi) for each real t

If A is a matrix and k is a scalar; then (kA)^(T)=k(A^(T))

If a square matrix A is such that "AA"^(T)=l=A^(T)A , then |A| is equal to