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2 Properties of the Determinant The convenience of the determinant of an n nmatrix is not so much in its formula as in the properties it possesses.
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Ratings : 70 %
After looking in my book for a couple of hours, I'm still confused about what it means for a $(n\times n)$-matrix $A$ to have a determinant equal to zero, $\det(A)=0$.
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Ratings : 20 %
Determinant. Determinants are mathematical objects that are very useful in the analysis and solution of systems of linear equations. As shown by Cramer's rule, a
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Ratings : 25 %
You could think of a determinant as a volume. Think of the columns of the matrix as vectors at the origin forming the edges of a skewed box. The determinant gives the
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Ratings : 67 %
In this example, we explain how to use properties of determinants and row transformations to evaluate a determinant.
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Ratings : 9 %