Answer the following question: If A = [2-33-2-14], B = [-3412-1-3] Verify (A + BT)T = AT + 2B - Mathematics and Statistics

Answer the following question:

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

योग

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

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

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

= `[(2, -3),(3, -2),(-1, 4)] + [(-6, 4),(8, -2),(2, -6)]`

∴ A + 2B^T = `[(-4, 1),(11, -4),(1, -2)]`

∴ (A + 2B^T)^T = `[(-4, 11, 1),(1, -4, -2)]` ...(i)

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

= `[(2, 3, -1),(-3, -2, 4)] + [(-6, 8, 2),(4, -2, -6)]`

= `[(-4, 11, 1),(1, -4, -2)]` ...(ii)

From (i) and (ii), we get

(A + 2B^T)^T = A^T + 2B

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अध्याय 4: Determinants and Matrices - Miscellaneous Exercise 4(B) [पृष्ठ १०१]

अध्याय 4 Determinants and Matrices
Miscellaneous Exercise 4(B) | Q II. (4) (i) | पृष्ठ १०१