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CBSE Class 12 Math 2020 Delhi Set 3 Solved Paper

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Question : 1 of 11
Marks: +1, -0
If AA is a skew symmetric matrix of order 3, then the value of A\left|A\right| is :____
Solution:  
Since, AA is a skew symmetric matrix
AT=A\therefore A^{T} = -A
AT=A\Rightarrow \left| A^{T} \right| = \left| -A \right|
A=(1)nA\Rightarrow \left| -A \right| = (-1)^{n} \left| A \right|
where nn is the order.
A=(1)3A\therefore \left| -A \right| = (-1)^{3} \left| A \right|
=A= -\left| A \right|
Substituting in (i),
AT=A\left| A^{T} \right| = -\left| A \right|
A=AT\Rightarrow -\left| A \right| = \left| A^{T} \right|
We also know for any matrix.
A=AT\left| A \right| = \left| A^{T} \right|
replacing in (ii)
A=A\therefore \left| A \right| = -\left| A \right|
2A=0\Rightarrow 2\left| A \right| = 0
A=0\Rightarrow \left| A \right| = 0
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