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3.2 Properties of Determinants

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Presentation on theme: "3.2 Properties of Determinants"— Presentation transcript:

1 3.2 Properties of Determinants

2 Denotation REVIEW : the submatrix by deleting the ith row and jth column of A Example:

3 Definition For , the determinant of an matrix is REVIEW

4 Denotation: (i, j)-cofactor of A : REVIEW Theorem 1

5 Theorem 2 If A is a triangular matrix, then det A is the product of the entries on the main diagonal of A. REVIEW

6 Theorem 3 Row Operations. Let A be a square matrix. If a mutiple of one row of A is added to another row to produce a matrix B, then det B=det A. If two rows of A are interchanged to produce B, then det B= - det A. If one row of A is mutiplied by k to produce B, then det B=k det A.

7 Example: Compute the determinant

8 Theorem 4.

9 Example: Find the determinant of

10 Theorem 5

11 Theorem 5 Theorem 6


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