Given the differential equation: y (4)_2y"+y=xe* Choose All Correct Answers Below A There is duplication with the complementary function. The complimentary function is given by: y = A e + Bx e* (B) D (E) F There is no duplication with the complementary function. A patrticular solution is given by: y = - P 24 The complementary function is given by: y = P A patrticular solution is given by: 1 24 1 --x 8 y = (A + Bx) e¯* + (C+Dx) e* x³ et 1

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Given the differential equation: \[ y^{(4)} - 2y'' + y = x \, e^x \] **Choose All Correct Answers Below** A) There is duplication with the complementary function. B) The complementary function is given by: \[ y_c = A \, e^{-x} + B \, e^x \] C) There is no duplication with the complementary function. D) A particular solution is given by: \[ y_p = \frac{1}{24} x^2 e^x - \frac{1}{8} x \, e^x \] E) The complementary function is given by: \[ y_c = (A + Bx) \, e^{-x} + (C + Dx) \, e^x \] F) A particular solution is given by: \[ y_p = \frac{1}{24} x^3 e^x - \frac{1}{8} x^2 e^x \]