- 11 Linear Homogeneous Equations Problem 2 1 Point Suppose You Solved A Second Order Equation By Rewriting It As A Sys 1 (35.79 KiB) Viewed 26 times
11 Linear homogeneous equations: Problem 2 (1 point) Suppose you solved a second-order equation by rewriting it as a sys
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11 Linear homogeneous equations: Problem 2 (1 point) Suppose you solved a second-order equation by rewriting it as a sys
11 Linear homogeneous equations: Problem 2 (1 point) Suppose you solved a second-order equation by rewriting it as a system and found two scalar solutions: y = ex and z=e3r. Think of the corresponding vector solutions y, and y, and use the Wronskian to show that the solutions are linearly independent Wronskian = det These solutions are linearly independent because the Wronskian is Choose y for all x.
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