2.1689   ODE No. 1689

1. Problem in Latex
2. Mathematica input
3. Maple input

$$x^4{y}^{″}(x)+{(x{y}^{\prime }(x)-y(x))}^3=0$$ ✓ Mathematica : cpu = 0.643535 (sec), leaf count = 329

$$\{\{y(x)\to -ix\log (-\frac{\sqrt{-8i{c}_1{x}^2-\sinh \left(2c_2\right)-\cosh \left(2c_2\right)}}{4c_{1}x}-\frac{i\sinh \left(c_2\right)}{4c_{1}x}-\frac{i\cosh \left(c_2\right)}{4c_{1}x})\},\{y(x)\to -ix\log (-\frac{\sqrt{-8i{c}_1{x}^2-\sinh \left(2c_2\right)-\cosh \left(2c_2\right)}}{4c_{1}x}+\frac{i\sinh \left(c_2\right)}{4c_{1}x}+\frac{i\cosh \left(c_2\right)}{4c_{1}x})\},\{y(x)\to -ix\log (\frac{\sqrt{-8i{c}_1{x}^2-\sinh \left(2c_2\right)-\cosh \left(2c_2\right)}}{4c_{1}x}-\frac{i\sinh \left(c_2\right)}{4c_{1}x}-\frac{i\cosh \left(c_2\right)}{4c_{1}x})\},\{y(x)\to -ix\log (\frac{\sqrt{-8i{c}_1{x}^2-\sinh \left(2c_2\right)-\cosh \left(2c_2\right)}}{4c_{1}x}+\frac{i\sinh \left(c_2\right)}{4c_{1}x}+\frac{i\cosh \left(c_2\right)}{4c_{1}x})\}\}$$

✓ Maple : cpu = 0.286 (sec), leaf count = 37

$$\{y\left(x\right)=(-\arctan \left(\frac{1}{\sqrt{\mathit{\_}\mathit{C}\mathit{1}{x}^2-1}}\right)+\mathit{\_}\mathit{C}\mathit{2})x,y\left(x\right)=(\arctan \left(\frac{1}{\sqrt{\mathit{\_}\mathit{C}\mathit{1}{x}^2-1}}\right)+\mathit{\_}\mathit{C}\mathit{2})x\}$$