If A,B and C arae three non-singular squ...

If A,B and C arae three non-singular square matrices of order 3 satisfying the equation `A^(2)=A^(-1)` let `B=A^(8) and C=A^(2)` ,find the value of det (B-C)

Text Solution

Verified by Experts

`therefore " " B=A^(8)=(A^(2))^(4)=(A^(1))^(4)`
`=(A^(4))^(-1)=(A^(2.2))^(-1)`
`=((A^(2))^2)^(-1)=((A^(2))^(-1))^(2)`
`=((A^(-1))^1)^(2)=A^(2)=C`
`So, " " B=C rArrB-C=0`
`therefore" "det(B-C)=0`

Similar Questions

Explore conceptually related problems

If A and B are non-singular square matrices of same order then adj(AB) is equal to

If there are three square matrix A,B,C of same order satisfying the equation A^(2)=A^(-1) and B=A^(2) and C=A^((n-2)) then prove that det.(B-C)=0,n in N

If A ,B,C are three non-singular matrices of same order and |A| is a function of x and A^(2)=A^(-1),B=A^(2^(n)),C=A^(2^(n-2)) , n in N .If f'(x)=det(B-C) and f(7)=5 ,then the value of f(5) is

If A and B are two non-singular matrices of order 3 such that A A^(T)=2I and A^(-1)=A^(T)-A . Adj. (2B^(-1)) , then det. (B) is equal to

Let A be a square matrix of order 3 satisfies the relation A^(3)-6A^(2)+7A-8I=O and B=A-2I . Also, det. A=8 , then

If A, B, and C are three square matrices of the same order, then AB=AC implies B=C . Then

If A, B are square matrices of order 3, A is non-singular and AB=0, then B is a

If A ,\ B ,\ C are three non-null square matrices of the same order, write the condition on A such that A B=A C=>B=Cdot

A and B are different matrices of order n satisfying A^(3)=B^(3) and A^(2)B=B^(2)A . If det. (A-B) ne 0 , then find the value of det. (A^(2)+B^(2)) .

If A, B and C are three sqare matrices of the same order such that A = B + C, then det A is equal to

If A,B and C arae three non-singular square matrices of order 3 satisfying the equation `A^(2)=A^(-1)` let `B=A^(8) and C=A^(2)` ,find the value of det (B-C)

Text Solution

Similar Questions

Recommended Questions