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How many different diagonal matrices of ...

How many different diagonal matrices of order n can be formed which are involuntary ?

A

`2^n`

B

`2^n-1`

C

`2^(n-1)`

D

n

Text Solution

Verified by Experts

The correct Answer is:
A
Matrix A is diagonal matrix.
`:. A`=dia. `(a_(1), a_(2), ..., a_(n))`
`implies A^(2)=` dia. `((a_(1))^(2), (a_(2))^(2),..,(a_(n))^(2))`
since A involuntary, we have
`:. A^(2)=I`
`implies (a_(1))^(2), (a_(2))^(2),...,(a_(n))^(2)=1`
`implies a_(1), a_(2), ...,a_(n)=1`
Thus, number of required matrix A is `2xx2xx2xx ...n` times `=2^(n)`.
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