notes3-2 - A )(det B ). EXAMPLES. Compute " 1 3 2 4 #...

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SECTION 3.2 PROPERTIES OF DETERMINANTS Adding a multiple of one row to another row does not change the determinant. Multiplying a row by a constant also multiplies the determinant by that constant. Switching two rows multiplies the determinant by - 1. A square matrix A is invertible if and only if det A 6 = 0, so we have yet another part of the Invertible Matrix Theorem. det A = det A T , so we can do column operations to find det A if we want. For square matrices det AB = (det
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Unformatted text preview: A )(det B ). EXAMPLES. Compute " 1 3 2 4 # Compute ± ± ± ± ± ± ± ± ± 7 3 5 2 4 3-1 5 1-3 2 6-18-9-14 1 ± ± ± ± ± ± ± ± ± Are the vectors 4 6-7 , -7 2 , -3-5 6 linearly independent? Let A and P be square matrices of the same size, with P invertible. Show that 1. det( P-1 ) = 1 / det P , and 2. det( PAP-1 ) = det A. HOMEWORK. SECTION 3.2...
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This note was uploaded on 05/07/2010 for the course M 56945 taught by Professor Danielallcock during the Spring '09 term at University of Texas at Austin.

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notes3-2 - A )(det B ). EXAMPLES. Compute " 1 3 2 4 #...

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