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4.III. Other Formulas 4.III.1. Laplace’s Expansion Definition 1.2:Minor & Cofactor For any n n matrix T, the (n 1) (n 1) matrix formed by deleting row i and column j of T is the i, j minor of T. The i, j cofactor T i, j of T is ( 1) i+j times the determinant of the i, j minor of T. Example 1.4:
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Theorem 1.5:Laplace Expansion of Determinants Where T is an n n matrix, the determinant can be found by expanding by cofactors on row i or column j. for any i for any j Proof: Write row/column as a vector sum.
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Example 1.6 : We can compute the determinant by expanding along the first row, Or expand down the second column: Example 1.7: A row or column with many zeroes suggests a Laplace expansion.
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if k i → T k j contains 2 identical rows. Definition 1.8 : Adjoint The matrix adjoint to the square matrix T is i.e. Theorem 1.9: Where T is a square matrix, Corollary 1.11: If |T| 0, then
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Exercises 4.III.1. 1. Find the adjoint of 2. Prove or disprove: adj (adj(T) ) = T.
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