If A and B are square matrices of orders 3 such that `|A|=-2` and `|B|=3` find the value of `|3AB|`.

If A and B are square matrices of order 3 such that |A| = -1 and |B| = 3, find the value of |3AB|.

Let A and B are two square matrices of order 3 such that det. (A)=3 and det. (B)=2 , then the value of det. (("adj. "(B^(-1) A^(-1)))^(-1)) is equal to _______ .

If A and B are square matrices of same order such that AB=O and B ne O , then prove that |A|=0 .

If A and B are square matrices of order 3 such that det. (A) = -2 and det.(B)= 1 , then det.(A^(-1)adjB^(-1).adj(2A^(-1)) is equal to

if A and B are two matrices of order 3xx3 so that AB=A and BA=B then (A+B)^7=

If A and B are symmetric matrices of same order than AB-BA is a:

If A and B are square matrices of order 3 such that A^(3)=8 B^(3)=8I and det. (AB-A-2B+2I) ne 0 , then identify the correct statement(s), where I is idensity matrix of order 3.

If A and B are square matrices of the same order such that AB = BA, then prove by induction that AB^(n)=B^(n)A . Further, prove that (AB)^(n)=A^(n)B^(n) for all n in N .

If a and B are square matrices of same order such that AB+BA=O , then prove that A^(3)-B^(3)=(A+B) (A^(2)-AB-B^(2)) .