11 Linear homogeneous equations: Problem 7 (1 point) It can be shown that yı 3 and y2 = cos(6x) + sin(6x) are solutions

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11 Linear Homogeneous Equations Problem 7 1 Point It Can Be Shown That Yi 3 And Y2 Cos 6x Sin 6x Are Solutions 1 (35.41 KiB) Viewed 20 times

11 Linear homogeneous equations: Problem 7 (1 point) It can be shown that yı 3 and y2 = cos(6x) + sin(6x) are solutions to the differential equation 6x sin(3x)D'y - 3x cos(6x)Dy = 0 on (0, 8/6). What does the Wronskian of y1, y2 equal on 0,7/6)? W(91, y2) = on (0,/6). Yes 1. Is {91, y2} a fundamental set for 6c" sin(3x)D'y-3x cos(6x)Dy = 0 on (0, 7/6)?