If the trace of a matrix A is 5 then the trace of `3A` is

Let A= [[1,0,0],[2,1,0],[3,2,1]] be a square matrix and C_(1), C_(2), C_(3) be three column matrices satisfying AC_(1) = [[1],[0],[0]], AC_(2) = [[2],[3],[0]] and AC_(3)= [[2],[3],[1]] of matrix B. If the matrix C= 1/3 (AcdotB). The ratio of the trace of the matrix B to the matrix C, is

The value of the determinant of a matrix A of order 3 times 3 is 4. Find the value of |5A|.

If A is a 3x3 matrix and B is its adjoint matrix the determinant of B is 64 then determinant of A is

Let A=[(1,0,0),(1,0,1),(0,1,0)] satisfies A^(n)=A^(n-2)+A^(2)-I for n ge 3 . And trace of a square matrix X is equal to the sum of elements in its proncipal diagonal. Further consider a matrix underset(3xx3)(uu) with its column as uu_(1), uu_(2), uu_(3) such that A^(50) uu_(1)=[(1),(25),(25)], A^(50) uu_(2)=[(0),(1),(0)], A^(50) uu_(3)=[(0),(0),(1)] Then answer the following question : Trace of A^(50) equals

If the determinant of the adjoint of a (real) matrix of order 3 is 25, then the determinant of the inverse of the matrix is

If A= (a_(ij) ) is a scalar matrix of order nxx n such that a_(ii)=k for all i, then trace of A is equal to

A ray of light grazes the top surface of a glass slab. Can it be traced along the opposite bottom surface of the glass slab?

If each element of a 3xx3 matrix A is multiplied by 3 , then the determinant of the newly formed matrix is :

Aldehydes react with ammonia in the presence of traces of acids to give :

If determinant of A = 5 and A is a square matrix of order 3 then find the determinant of adj(A)