Evaluate the determinant, in which the entries are functions. Determinants of this type occur when changes of variables are made in calculus. e^5x 3^2x 3e^6x 5e^3x

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asked Nov 18, 2024 189k views

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Corazon · Answer 1 · 2024-11-24T19:43:23+0000

Answer: The determinant of the given matrix is -75e^24x.

Explanation:

To evaluate the determinant of a matrix containing functions, we can use a method called Laplace Expansion. This method involves taking the determinant of the matrix by expanding it along its first row.

Using Laplace Expansion, the determinant of the given matrix can be calculated as follows:

|e^5x 3^2x 3e^6x 5e^3x| = e^5x(3^2x5e^3x - 3e^6x3^2x) = e^5x(45e^9x - 27e^12x) = e^5x(18e^12x) = 18e^17x = -75e^24x.

Therefore, the determinant of the given matrix is -75e^24x.

Evaluate the determinant, in which the entries are functions. Determinants of this type occur when changes of variables are made in calculus. e^5x 3^2x 3e^6x 5e^3x

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