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Solve the 2nd-order homogeneous Cauchy-Euler equation x?y' + 7xy' + 73y = 0 The linearly independent solutions are y1 = 1/x^3cos(8log(x)) X y2 = 1/x^3sin(8log(x))

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Solve the 2nd-order homogeneous Cauchy-Euler equation x?y' + 7xy' + 73y = 0 The linearly independent solutions are y1 = 1/x^3cos(8log(x)) X y2 = 1/x^3sin(8log(x)) and the general solution of the equation is y (x) = 1/x^3(c1cos(8log(x))+c2sin(8log(x))) where C1, and C2 are arbitrary constants. (Note: Let 721 and 1712 be two solutions of the auxiliary (characteristic) equation. (i) If mi

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