Find the solution for the given Higher Order Differential Equation. \(2(3x+5)^2 \frac{d^2 y}{dx^2}+(3x+5) \frac{dy}{dx}+
Posted: Thu Jul 14, 2022 9:29 am
a) \(c_1(3x+5)^{0.76}+ c_2(3x+5)^{0.073}+\frac{-(15(cos(log(3x+5))+17 sin(log(3x+5)))))}{64}\)
b) \(c_1(3x+5)^{0.76}+ c_2(3x+7)^{0.073}+\frac{-(15(cos(log(3x+5))+17 sin(log(3x+5)))))}{64} \)
c) \(c_1(3x+5)^{0.76}+ c_2(3x+7)^{0.073}+\frac{-(15(cos(log(3x+5))+17 sin(log(3x+5)))))}{16} \)
d) \(c_1(3x+5)^{0.76}+ c_2(3x+5)^{0.073}+\frac{-(15(cos(log(3x+5))+17 sin(log(3x+5)))))}{16} \)
b) \(c_1(3x+5)^{0.76}+ c_2(3x+7)^{0.073}+\frac{-(15(cos(log(3x+5))+17 sin(log(3x+5)))))}{64} \)
c) \(c_1(3x+5)^{0.76}+ c_2(3x+7)^{0.073}+\frac{-(15(cos(log(3x+5))+17 sin(log(3x+5)))))}{16} \)
d) \(c_1(3x+5)^{0.76}+ c_2(3x+5)^{0.073}+\frac{-(15(cos(log(3x+5))+17 sin(log(3x+5)))))}{16} \)