Prove that A + AT is a symmetric and A – AT is a skew symmetric matrix, where A = [124321-2-32] - Mathematics and Statistics

Prove that A + A^T is a symmetric and A – A^T is a skew symmetric matrix, where

A = `[(1, 2, 4),(3, 2, 1),(-2, -3, 2)]`

योग

A = `[(1, 2, 4),(3, 2, 1),(-2, -3, 2)]`

∴ A^T = `[(1, 3, -2),(2, 2, -3),(4, 1, 2)]`

∴ A + A^T = `[(1, 2, 4),(3, 2, 1),(-2, -3, 2)] + [(1, 3, -2),(2, 2, -3),(4, 1, 2)]`

= `[(1 + 1, 2 + 3, 4 - 2),(3 + 2, 2 + 2, 1 - 3),(-2 + 4, -3 + 1, 2 + 2)]`

= `[(2, 5, 2),(5, 4, -2),(2, -2, 4)]`

∴ (A + A^T)^T = `[(2, 5, 2),(5, 4, -2),(2, -2, 4)]`

∴ (A + A^T)^T = A + A^T

∴ A + A^T is symmetric matrix.

Also, A – A^T = `[(1, 2, 4),(3, 2, 1),(-2, -3, 2)] - [(1, 3, -2),(2, 2, -3),(4, 1, 2)]`

= `[(1 - 1, 2 - 3, 4 - (-2)),(3 - 2, 2 - 2, 1 - (-3)),(-2 - 4, -3 - 1, 2 - 2)]`

= `[(0, -1, 6),(1, 0, 4),(-6, -4, 0)]`

∴ (A – A^T)^T = `[(0, 1, -6),(-1, 0, -4),(6, 4, 0)]`

and – (A – A^T) = `- [(0, -1, 6),(1, 0, 4),(-6, -4, 0)]`

= `[(0, 1, -6),(-1, 0, -4),(6, 4, 0)]`

∴ (A – A^T)^T = – (A – A^T)

∴ A – A^T is a skew-symmetric matrix.

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अध्याय 4: Determinants and Matrices - Exercise 4.7 [पृष्ठ ९८]

अध्याय 4 Determinants and Matrices
Exercise 4.7 | Q 11. (i) | पृष्ठ ९८