A is a real skew symmetric such that A^2...

`A` is a real skew symmetric such that `A^2 +I =0` then

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If A is a skew symmetric matrix, then A^(2) is a ……

If A is a skew -symmetric matrix , then show that A^(2) is a symmetric matrix .

If A be a real skew-symmetric matrix of order n such that A^(2)+I=0 , I being the identity matrix of the same order as that of A, then what is the order of A?

If S is a real skew-symmetric matrix, then prove that I-S is non-singular and the matrix A=(I+S)(I-S)^(-1) is orthogonal.

If S is a real skew-symmetric matrix, then prove that I-S is non-singular and the matrix A=(I+S)(I-S)^(-1) is orthogonal.

If S is a real skew-symmetric matrix, then prove that I-S is non-singular and the matrix A=(I+S)(I-S)^(-1) is orthogonal.

If S is a real skew-symmetric matrix, then prove that I-S is non-singular and the matrix A=(I+S)(I-S)^(-1) is orthogonal.

If S is a real skew-symmetric matrix, then prove that I-S is non-singular and the matrix A=(I+S)(I-S)^(-1) is orthogonal.

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