\left\{\begin{matrix}a=-\frac{bxe^{\left(1-2i\right)x}+bxe^{\left(1+2i\right)x}-2y}{x\left(ie^{\left(1-2i\right)x}-ie^{\left(1+2i\right)x}\right)}\text{, }&\nexists n_{1}\in \mathrm{Z}\text{ : }x=\frac{\pi n_{1}}{2}\\a\in \mathrm{C}\text{, }&y=\frac{bx\left(e^{\left(1-2i\right)x}+e^{\left(1+2i\right)x}\right)}{2}\text{ and }\left(\left(y=\frac{bx\left(e^{\left(1-2i\right)x}+e^{\left(1+2i\right)x}\right)}{2}\text{ and }ixe^{\left(1-2i\right)x}-ixe^{\left(1+2i\right)x}=0\right)\text{ or }\exists n_{1}\in \mathrm{Z}\text{ : }x=\frac{\pi n_{1}}{2}\right)\end{matrix}\right,

\left\{\begin{matrix}b=-\frac{iaxe^{\left(1-2i\right)x}-iaxe^{\left(1+2i\right)x}-2y}{x\left(e^{\left(1-2i\right)x}+e^{\left(1+2i\right)x}\right)}\text{, }&x\neq 0\text{ and }\nexists n_{1}\in \mathrm{Z}\text{ : }x=\frac{\pi n_{1}}{2}+\frac{\pi }{4}\text{ and }xe^{\left(1-2i\right)x}+xe^{\left(1+2i\right)x}\neq 0\\b\in \mathrm{C}\text{, }&\left(y=0\text{ and }x=0\right)\text{ or }\left(y=\frac{ax\left(ie^{\left(1-2i\right)x}-ie^{\left(1+2i\right)x}\right)}{2}\text{ and }\exists n_{1}\in \mathrm{Z}\text{ : }x=\frac{\pi n_{1}}{2}+\frac{\pi }{4}\right)\end{matrix}\right,

\left\{\begin{matrix}a=-\frac{bx\cos(2x)e^{x}-y}{x\sin(2x)e^{x}}\text{, }&\nexists n_{1}\in \mathrm{Z}\text{ : }x=\frac{\pi n_{1}}{2}\\a\in \mathrm{R}\text{, }&y=bx\left(\cos(x)-\sin(x)\right)\left(\sin(x)+\cos(x)\right)e^{x}\text{ and }\exists n_{1}\in \mathrm{Z}\text{ : }x=\frac{\pi n_{1}}{2}\end{matrix}\right,

\left\{\begin{matrix}b=-\frac{ax\sin(2x)e^{x}-y}{x\cos(2x)e^{x}}\text{, }&\nexists n_{1}\in \mathrm{Z}\text{ : }x=\frac{\pi n_{1}}{2}+\frac{\pi }{4}\text{ and }x\neq 0\\b\in \mathrm{R}\text{, }&\left(y=0\text{ and }x=0\right)\text{ or }\left(y=ax\sin(2x)e^{x}\text{ and }\exists n_{1}\in \mathrm{Z}\text{ : }x=\frac{\pi \left(2n_{1}+1\right)}{4}\right)\end{matrix}\right,