`A` and `B` are two non-singular matrices such that `A^(6)=I` and `AB^(2)=BA(B ne I)`. A value of `k` so that `B^(k)=I`

A and B are two non - singular matrices such that A^(6) = I and AB^(2) = BA( B != I) . A value of k so that B^(k) = I is a)31 b)32 c)64 d)63

Suppose A and B are two non singular matrices such that B!=I,A^(6)=I and AB^(2)=BA. Find the least value of k for B^(k)=1

Suppose A and B are two non singular matrices such that B != I, A^6 = I and AB^2 = BA . Find the least value of k for B^k = 1

Suppose A and B are two non singular matrices such that B != I, A^6 = I and AB^2 = BA . Find the least value of k for B^k = 1

Suppose A and B are two non singular matrices such that B != I, A^6 = I and AB^2 = BA . Find the least value of k for B^k = 1

Suppose A and B are two non singular matrices such that B != I, A^6 = I and AB^2 = BA . Find the least value of k for B^k = 1

A and B are two square matrices such that A^(2)B=BA and if (AB)^(10)=A^(k)B^(10) then the value of k-1020 is.

A and B are two square matrices such that A^(2)B=BA and if (AB)^(10)=A^(k)B^(10) then the value of k-1020 is.

Let A and B are two non - singular matrices such that AB=BA^(2),B^(4)=I and A^(k)=I , then k can be equal to