If A = [(1, 2),(3, 4)], prove that A · (adj A) = (adj A) · A = |A| · I

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If A = `[(1, 2),(3, 4)]`, prove that A &middot; (adj A) = (adj A) &middot; A = |A| &middot; I

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Given: A = `[(1, 2),(3, 4)]` Step 1: Find |A| (Determinant) |A| = (1)(4) &ndash; (2)(3) = 4 &ndash; 6 = &ndash;2 Step 2: Find adj A For a 2 &times; 2 matrix A = `[(a, b),(c, d)]` adj A = `[(d, -b),(-c, a)]` So, adj A = `[(4, -2),(-3, 1)]` Step 3: Find A &middot; adj A A &middot; adj A = `[(1, 2),(3, 4)] [(4, -2),(-3, 1)]` Multiply: First row: (1)(4) + (2)(&ndash;3) = 4 &ndash; 6 = &ndash;2 (1)(&ndash;2) + (2)(1) = &ndash;2 + 2 = 0 Second row: (3)(4) + (4)(&ndash;3) = 12 &ndash; 12 = 0 (3)(&ndash;2) + (4)(1) = &ndash;6 + 4 = &ndash;2 So, A &middot; adj A = `[(-2, 0),(0, -2)]` = `-2[(1, 0),(0, 1)]` = |A| I Step 4: Find adj A &middot; A `[(4, -2),(-3, 1)][(1, 2),(3, 4)]` First row: (4)(1) + (&ndash;2)(3) = 4 &ndash; 6 = &ndash;2 (4)(2) + (&ndash;2)(4) = 8 &ndash; 8 = 0 Second row: (&ndash;3)(1) + (1)(3) = &ndash;3 + 3 = 0 (&ndash;3)(2) + (1)(4) = &ndash;6 + 4 = &ndash;2 adj A &middot; A = `[(-2, 0),(0, -2)]` = |A| I Hence Proved A &middot; (adj A) = (adj A) &middot; A = |A| &middot; I for the given matrix.

If A = [(1, 2),(3, 4)], prove that A · (adj A) = (adj A) · A = |A| · I - Mathematics and Statistics

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If A = [(1, 2),(3, 4)], prove that A · (adj A) = (adj A) · A = |A| · I - Mathematics and Statistics

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