English

If A is a skew-symmetric matrix and n is an odd natural number, write whether A^n is symmetric or skew-symmetric or neither of the two.

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Question

If A is a skew-symmetric matrix and n is an odd natural number, write whether An is symmetric or skew-symmetric or neither of the two.

Sum
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Solution

Since A is given as a skew-symmetric matrix, it satisfies the property:

AT = −A

Taking the Transpose of An:

Using the laws of matrix transposes, the transpose operation can be swapped with the exponent:

(An)T = (AT)n

Substituting AT = −A

(AT)n = (−A)n

Applying the property of the odd power:

Since n is an odd natural number, (−1)n = −1.

Therefore, (A)n = (−1)n . An

Because (An)T = −An, the matrix An satisfies the definition of a skew-symmetric matrix.

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Chapter 4: Algebra of Matrices - Exercise 5.6 [Page 63]

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R.D. Sharma Mathematics Volume 1 and 2 [English] Class 12
Chapter 4 Algebra of Matrices
Exercise 5.6 | Q 29 | Page 63
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