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in Linear Algebra edited by
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If $\text{A}$ is a skew symmetric matrix then $\text{A}^t$  is

  1. Diagonal matrix 
  2. $\text{A}$
  3. $0$
  4. $-\text{A}$
in Linear Algebra edited by
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Option D
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3 Answers

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For symmetric matrix, the condition :  A^t  = A       where t= transpose of matrix

For skew Symmetric matrix , the condition : A^t = -A

So i think option D will be answer...
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A skew symmetric matrix is a matrix where elements aij = -aji where i!=j

So transpose(A)= -A
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Answer: D

Condition for  Symmetric Matrix :   $A=A^{T}$

Condition for Skew Symmetric Matrix :   $A=-A^{T}$

So $A^{T} = -A$

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