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There are many properties of determinants . Listed here are some properties that may be helpful in calculating the determinant of a matrix.
Illustrate each of the properties of determinants.
Property 1 states that if the matrix is in upper triangular form, the determinant is the product of the entries down the main diagonal.
Augment with the first two columns.
Then
Property 2 states that interchanging rows changes the sign. Given
Property 3 states that if two rows or two columns are identical, the determinant equals zero.
Property 4 states that if a row or column equals zero, the determinant equals zero. Thus,
Property 5 states that the determinant of an inverse matrix is the reciprocal of the determinant Thus,
Property 6 states that if any row or column of a matrix is multiplied by a constant, the determinant is multiplied by the same factor. Thus,
Find the solution to the given 3 × 3 system.
Using Cramer’s Rule , we have
Notice that the second and third columns are identical. According to Property 3, the determinant will be zero, so there is either no solution or an infinite number of solutions. We have to perform elimination to find out.
Obtaining a statement that is a contradiction means that the system has no solution.
Access these online resources for additional instruction and practice with Cramer’s Rule.
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